{S[-1, HarmonicSums`Private`ExpVar] :> -ln2 + (-1)^HarmonicSums`Private`ExpVar* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)), S[1, HarmonicSums`Private`ExpVar] :> sinf, S[-2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(17/(2*HarmonicSums`Private`ExpVar^9) - 3/(2*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2)) - z2/2, S[2, HarmonicSums`Private`ExpVar] :> 1/(30*HarmonicSums`Private`ExpVar^9) - 1/(42*HarmonicSums`Private`ExpVar^7) + 1/(30*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1) + z2, S[-1, -1, HarmonicSums`Private`ExpVar] :> ln2^2/2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) - 19/(64*HarmonicSums`Private`ExpVar^10) + 263/(480*HarmonicSums`Private`ExpVar^9) + 9/(128*HarmonicSums`Private`ExpVar^8) - 23/(168*HarmonicSums`Private`ExpVar^7) - 1/(32*HarmonicSums`Private`ExpVar^6) + 19/(240*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) + z2/2, S[-1, 1, HarmonicSums`Private`ExpVar] :> ln2^2/2 + (-1)^HarmonicSums`Private`ExpVar* (1185/(64*HarmonicSums`Private`ExpVar^10) + 119/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))* sinf - z2/2, S[1, -1, HarmonicSums`Private`ExpVar] :> -(ln2^2/2) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(64*HarmonicSums`Private`ExpVar^10) + 153/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) - 7/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) + 5/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) - ln2*sinf, S[1, 1, HarmonicSums`Private`ExpVar] :> 1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) + sinf^2/2 + z2/2, S[-3, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(153/(4*HarmonicSums`Private`ExpVar^10) - 21/(4*HarmonicSums`Private`ExpVar^8) + 5/(4*HarmonicSums`Private`ExpVar^6) - 3/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^3)) - (3*z3)/4, S[3, HarmonicSums`Private`ExpVar] :> 3/(20*HarmonicSums`Private`ExpVar^10) - 1/(12*HarmonicSums`Private`ExpVar^8) + 1/(12*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + z3, S[-2, -1, HarmonicSums`Private`ExpVar] :> 97/(160*HarmonicSums`Private`ExpVar^10) + 13/(80*HarmonicSums`Private`ExpVar^9) - 1/(6*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) + 5/(48*HarmonicSums`Private`ExpVar^6) + 7/(120*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(3*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + ln2*((-1)^HarmonicSums`Private`ExpVar* (-17/(2*HarmonicSums`Private`ExpVar^9) + 3/(2*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2)) + (3*z2)/2) - (5*z3)/8, S[-2, 1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(119/(8*HarmonicSums`Private`ExpVar^10) - 27/(2*HarmonicSums`Private`ExpVar^9) - 15/(8*HarmonicSums`Private`ExpVar^8) + 2/HarmonicSums`Private`ExpVar^7 + 3/(8*HarmonicSums`Private`ExpVar^6) - 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (17/(2*HarmonicSums`Private`ExpVar^9) - 3/(2*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2))*sinf - (5*z3)/8, S[2, -1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(629/(32*HarmonicSums`Private`ExpVar^10) + 39/(8*HarmonicSums`Private`ExpVar^9) - 11/(4*HarmonicSums`Private`ExpVar^8) - 13/(16*HarmonicSums`Private`ExpVar^7) + 11/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) + ln2*(-(30*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(42*HarmonicSums`Private`ExpVar^7) - 1/(30*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1) - (3*z2)/2) + z3/4, S[2, 1, HarmonicSums`Private`ExpVar] :> 7/(120*HarmonicSums`Private`ExpVar^10) - 11/(350*HarmonicSums`Private`ExpVar^9) - 5/(168*HarmonicSums`Private`ExpVar^8) + 38/(2205*HarmonicSums`Private`ExpVar^7) + 1/(40*HarmonicSums`Private`ExpVar^6) - 7/(450*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(36*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1) + (1/(30*HarmonicSums`Private`ExpVar^9) - 1/(42*HarmonicSums`Private`ExpVar^7) + 1/(30*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1))* sinf + 2*z3, S[-1, -2, HarmonicSums`Private`ExpVar] :> 173/(40*HarmonicSums`Private`ExpVar^10) + 2/(5*HarmonicSums`Private`ExpVar^9) - 19/(24*HarmonicSums`Private`ExpVar^8) - 5/(42*HarmonicSums`Private`ExpVar^7) + 7/(24*HarmonicSums`Private`ExpVar^6) + 1/(15*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 5/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) - ln2*z2 + (-1)^HarmonicSums`Private`ExpVar*(31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))* z2 + (13*z3)/8, S[-1, 2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (2297/(120*HarmonicSums`Private`ExpVar^10) - 206/(35*HarmonicSums`Private`ExpVar^9) - 443/(168*HarmonicSums`Private`ExpVar^8) + 31/(30*HarmonicSums`Private`ExpVar^7) + 77/(120*HarmonicSums`Private`ExpVar^6) - 1/(3*HarmonicSums`Private`ExpVar^5) - 11/(24*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2)) + (ln2*z2)/2 + (-1)^HarmonicSums`Private`ExpVar*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))* z2 - z3, S[1, -2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(187/(8*HarmonicSums`Private`ExpVar^10) + 27/(2*HarmonicSums`Private`ExpVar^9) - 27/(8*HarmonicSums`Private`ExpVar^8) - 2/HarmonicSums`Private`ExpVar^7 + 7/(8*HarmonicSums`Private`ExpVar^6) + 1/(2*HarmonicSums`Private`ExpVar^5) - 5/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) - (sinf*z2)/2 - z3/8, S[1, 2, HarmonicSums`Private`ExpVar] :> 11/(120*HarmonicSums`Private`ExpVar^10) + 11/(350*HarmonicSums`Private`ExpVar^9) - 3/(56*HarmonicSums`Private`ExpVar^8) - 38/(2205*HarmonicSums`Private`ExpVar^7) + 7/(120*HarmonicSums`Private`ExpVar^6) + 7/(450*HarmonicSums`Private`ExpVar^5) - 5/(24*HarmonicSums`Private`ExpVar^4) + 17/(36*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1) + sinf*z2 - z3, S[-1, -1, -1, HarmonicSums`Private`ExpVar] :> -(ln2^3/6) + (-1)^HarmonicSums`Private`ExpVar* (100969/(7680*HarmonicSums`Private`ExpVar^10) - 4213/(8960*HarmonicSums`Private`ExpVar^9) - 9923/(5376*HarmonicSums`Private`ExpVar^8) + 91/(960*HarmonicSums`Private`ExpVar^7) + 901/(1920*HarmonicSums`Private`ExpVar^6) - 5/(192*HarmonicSums`Private`ExpVar^5) - 37/(96*HarmonicSums`Private`ExpVar^4) + 7/(16*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* ln2^2*(-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar)) + ln2*(19/(64*HarmonicSums`Private`ExpVar^10) - 263/(480*HarmonicSums`Private`ExpVar^9) - 9/(128*HarmonicSums`Private`ExpVar^8) + 23/(168*HarmonicSums`Private`ExpVar^7) + 1/(32*HarmonicSums`Private`ExpVar^6) - 19/(240*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) - z2/2) + (-1)^HarmonicSums`Private`ExpVar*(-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))* z2 - z3/4, S[-1, -1, 1, HarmonicSums`Private`ExpVar] :> -(ln2^3/6) + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar)) + 19403/(7680*HarmonicSums`Private`ExpVar^10) - 44769/(44800*HarmonicSums`Private`ExpVar^9) - 9889/(21504*HarmonicSums`Private`ExpVar^8) + 439/(2205*HarmonicSums`Private`ExpVar^7) + 299/(1920*HarmonicSums`Private`ExpVar^6) - 1207/(14400*HarmonicSums`Private`ExpVar^5) - 47/(384*HarmonicSums`Private`ExpVar^4) + 23/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) + (-19/(64*HarmonicSums`Private`ExpVar^10) + 263/(480*HarmonicSums`Private`ExpVar^9) + 9/(128*HarmonicSums`Private`ExpVar^8) - 23/(168*HarmonicSums`Private`ExpVar^7) - 1/(32*HarmonicSums`Private`ExpVar^6) + 19/(240*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))* sinf - (ln2*z2)/2 + (-1)^HarmonicSums`Private`ExpVar* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))* z2 + (7*z3)/4, S[-1, 1, -1, HarmonicSums`Private`ExpVar] :> -(ln2^3/6) + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar)) + 2733/(1280*HarmonicSums`Private`ExpVar^10) + 183/(128*HarmonicSums`Private`ExpVar^9) - 641/(1536*HarmonicSums`Private`ExpVar^8) - 21/(64*HarmonicSums`Private`ExpVar^7) + 17/(96*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) - 19/(64*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar*ln2* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))* sinf + ln2*((-1)^HarmonicSums`Private`ExpVar* (-1185/(64*HarmonicSums`Private`ExpVar^10) - 119/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + z2/2) + z3/8, S[-1, 1, 1, HarmonicSums`Private`ExpVar] :> -(ln2^3/6) + (-1)^HarmonicSums`Private`ExpVar* (-32833/(3840*HarmonicSums`Private`ExpVar^10) - 38279/(4480*HarmonicSums`Private`ExpVar^9) + 937/(1344*HarmonicSums`Private`ExpVar^8) + 1231/(960*HarmonicSums`Private`ExpVar^7) - 37/(960*HarmonicSums`Private`ExpVar^6) - 31/(96*HarmonicSums`Private`ExpVar^5) - 5/(48*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (1185/(64*HarmonicSums`Private`ExpVar^10) + 119/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*sinf + (-1)^HarmonicSums`Private`ExpVar*(-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))* sinf^2 + (ln2*z2)/2 + (-1)^HarmonicSums`Private`ExpVar* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))* z2 - (7*z3)/8, S[1, -1, -1, HarmonicSums`Private`ExpVar] :> ln2^3/3 + 2071/(7680*HarmonicSums`Private`ExpVar^10) + 5919/(44800*HarmonicSums`Private`ExpVar^9) - 1745/(21504*HarmonicSums`Private`ExpVar^8) - 8251/(141120*HarmonicSums`Private`ExpVar^7) + 121/(1920*HarmonicSums`Private`ExpVar^6) + 757/(14400*HarmonicSums`Private`ExpVar^5) - 79/(384*HarmonicSums`Private`ExpVar^4) + 49/(144*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) + sinf*(ln2^2/2 + z2/2) + ln2*((-1)^HarmonicSums`Private`ExpVar* (1185/(64*HarmonicSums`Private`ExpVar^10) - 153/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) + 7/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + z2/2) - (7*z3)/8, S[1, -1, 1, HarmonicSums`Private`ExpVar] :> ln2^3/3 + (-1)^HarmonicSums`Private`ExpVar* (6543/(128*HarmonicSums`Private`ExpVar^10) - 147/(64*HarmonicSums`Private`ExpVar^9) - 189/(32*HarmonicSums`Private`ExpVar^8) + 15/(32*HarmonicSums`Private`ExpVar^7) + 35/(32*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) + sinf*(ln2^2/2 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(64*HarmonicSums`Private`ExpVar^10) + 153/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) - 7/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) + 5/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) - z2/2) - (ln2*z2)/2 + z3/8, S[1, 1, -1, HarmonicSums`Private`ExpVar] :> -(ln2^3/6) + (-1)^HarmonicSums`Private`ExpVar* (-1035/(256*HarmonicSums`Private`ExpVar^10) + 1323/(128*HarmonicSums`Private`ExpVar^9) - 7/(64*HarmonicSums`Private`ExpVar^8) - 105/(64*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 15/(32*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) - (ln2^2*sinf)/2 - (ln2*sinf^2)/2 + ln2*(-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) - z2/2), S[1, 1, 1, HarmonicSums`Private`ExpVar] :> 1/(20*HarmonicSums`Private`ExpVar^10) - 1/(36*HarmonicSums`Private`ExpVar^8) + 1/(36*HarmonicSums`Private`ExpVar^6) - 1/(12*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(6*HarmonicSums`Private`ExpVar^2) + sinf^3/6 + sinf*(1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) + z2/2) + z3/3, S[-4, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(-14/HarmonicSums`Private`ExpVar^9 + 5/(2*HarmonicSums`Private`ExpVar^7) - HarmonicSums`Private`ExpVar^(-5) + 1/(2*HarmonicSums`Private`ExpVar^4)) - (7*z2^2)/20, S[4, HarmonicSums`Private`ExpVar] :> -2/(9*HarmonicSums`Private`ExpVar^9) + 1/(6*HarmonicSums`Private`ExpVar^7) - 1/(3*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^4) - 1/(3*HarmonicSums`Private`ExpVar^3) + (2*z2^2)/5, S[-3, -1, HarmonicSums`Private`ExpVar] :> -2*li4half - ln2^4/12 + (-1)^HarmonicSums`Private`ExpVar*ln2* (-153/(4*HarmonicSums`Private`ExpVar^10) + 21/(4*HarmonicSums`Private`ExpVar^8) - 5/(4*HarmonicSums`Private`ExpVar^6) + 3/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^3)) + 47/(160*HarmonicSums`Private`ExpVar^10) - 17/(72*HarmonicSums`Private`ExpVar^9) - 11/(96*HarmonicSums`Private`ExpVar^8) + 7/(48*HarmonicSums`Private`ExpVar^7) + 1/(12*HarmonicSums`Private`ExpVar^6) - 7/(24*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + (ln2^2*z2)/2 + (3*z2^2)/5, S[-3, 1, HarmonicSums`Private`ExpVar] :> 2*li4half + ln2^4/12 + (-1)^HarmonicSums`Private`ExpVar* (-777/(16*HarmonicSums`Private`ExpVar^10) - 35/(8*HarmonicSums`Private`ExpVar^9) + 175/(32*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^7) - 15/(16*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* (153/(4*HarmonicSums`Private`ExpVar^10) - 21/(4*HarmonicSums`Private`ExpVar^8) + 5/(4*HarmonicSums`Private`ExpVar^6) - 3/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^3))*sinf - (ln2^2*z2)/2 - (11*z2^2)/10 + (7*ln2*z3)/4, S[3, -1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(39/(4*HarmonicSums`Private`ExpVar^10) - 57/(8*HarmonicSums`Private`ExpVar^9) - 21/(16*HarmonicSums`Private`ExpVar^8) + 21/(16*HarmonicSums`Private`ExpVar^7) + 5/(16*HarmonicSums`Private`ExpVar^6) - 5/(8*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4)) + z2^2/8 + ln2*(-3/(20*HarmonicSums`Private`ExpVar^10) + 1/(12*HarmonicSums`Private`ExpVar^8) - 1/(12*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - (7*z3)/4), S[3, 1, HarmonicSums`Private`ExpVar] :> -187/(1200*HarmonicSums`Private`ExpVar^10) - 5/(72*HarmonicSums`Private`ExpVar^9) + 5/(72*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^7) - 7/(144*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + (3/(20*HarmonicSums`Private`ExpVar^10) - 1/(12*HarmonicSums`Private`ExpVar^8) + 1/(12*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2))*sinf + z2^2/2, S[-2, -2, HarmonicSums`Private`ExpVar] :> 7/(8*HarmonicSums`Private`ExpVar^10) - 31/(36*HarmonicSums`Private`ExpVar^9) - 1/(4*HarmonicSums`Private`ExpVar^8) + 1/(3*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6) - 5/(12*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (-17/(4*HarmonicSums`Private`ExpVar^9) + 3/(4*HarmonicSums`Private`ExpVar^7) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (13*z2^2)/40, S[-2, 2, HarmonicSums`Private`ExpVar] :> -4*li4half - ln2^4/6 + (-1)^HarmonicSums`Private`ExpVar* (-9127/(280*HarmonicSums`Private`ExpVar^10) - 589/(84*HarmonicSums`Private`ExpVar^9) + 357/(80*HarmonicSums`Private`ExpVar^8) + 19/(15*HarmonicSums`Private`ExpVar^7) - 25/(24*HarmonicSums`Private`ExpVar^6) - 7/(12*HarmonicSums`Private`ExpVar^5) + HarmonicSums`Private`ExpVar^ (-4) - 1/(2*HarmonicSums`Private`ExpVar^3)) + ln2^2*z2 + (-1)^HarmonicSums`Private`ExpVar*(17/(2*HarmonicSums`Private`ExpVar^9) - 3/(2*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2))*z2 + (51*z2^2)/40 - (7*ln2*z3)/2, S[2, -2, HarmonicSums`Private`ExpVar] :> 4*li4half + ln2^4/6 + (-1)^HarmonicSums`Private`ExpVar*(195/(8*HarmonicSums`Private`ExpVar^10) - 31/(4*HarmonicSums`Private`ExpVar^9) - 49/(16*HarmonicSums`Private`ExpVar^8) + 3/(2*HarmonicSums`Private`ExpVar^7) + 5/(8*HarmonicSums`Private`ExpVar^6) - 3/(4*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4)) - ln2^2*z2 + (-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))* z2 - (17*z2^2)/8 + (7*ln2*z3)/2, S[2, 2, HarmonicSums`Private`ExpVar] :> -121/(4200*HarmonicSums`Private`ExpVar^10) - 31/(252*HarmonicSums`Private`ExpVar^9) + 23/(1260*HarmonicSums`Private`ExpVar^8) + 1/(10*HarmonicSums`Private`ExpVar^7) - 7/(360*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 13/(24*HarmonicSums`Private`ExpVar^4) - 2/(3*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) + (1/(30*HarmonicSums`Private`ExpVar^9) - 1/(42*HarmonicSums`Private`ExpVar^7) + 1/(30*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1))* z2 + (7*z2^2)/10, S[-1, -3, HarmonicSums`Private`ExpVar] :> 2*li4half + ln2^4/12 + 109/(80*HarmonicSums`Private`ExpVar^10) - 197/(72*HarmonicSums`Private`ExpVar^9) - 7/(24*HarmonicSums`Private`ExpVar^8) + 17/(24*HarmonicSums`Private`ExpVar^7) + 5/(48*HarmonicSums`Private`ExpVar^6) - 13/(24*HarmonicSums`Private`ExpVar^5) + 7/(16*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) - (ln2^2*z2)/2 - z2^2/5 + (3*ln2*z3)/4 + (-1)^HarmonicSums`Private`ExpVar* (93/(16*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^8) + 3/(16*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*z3, S[-1, 3, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-163/(16*HarmonicSums`Private`ExpVar^10) - 169/(24*HarmonicSums`Private`ExpVar^9) + 133/(96*HarmonicSums`Private`ExpVar^8) + 31/(24*HarmonicSums`Private`ExpVar^7) - 5/(16*HarmonicSums`Private`ExpVar^6) - 5/(8*HarmonicSums`Private`ExpVar^5) + 5/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) - (19*z2^2)/40 + (3*ln2*z3)/4 + (-1)^HarmonicSums`Private`ExpVar*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))* z3, S[1, -3, HarmonicSums`Private`ExpVar] :> -2*li4half - ln2^4/12 + (-1)^HarmonicSums`Private`ExpVar* (777/(16*HarmonicSums`Private`ExpVar^10) - 77/(8*HarmonicSums`Private`ExpVar^9) - 175/(32*HarmonicSums`Private`ExpVar^8) + 15/(8*HarmonicSums`Private`ExpVar^7) + 15/(16*HarmonicSums`Private`ExpVar^6) - 7/(8*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4)) + (ln2^2*z2)/2 + (3*z2^2)/4 - (7*ln2*z3)/4 - (3*sinf*z3)/4, S[1, 3, HarmonicSums`Private`ExpVar] :> 187/(1200*HarmonicSums`Private`ExpVar^10) - 11/(72*HarmonicSums`Private`ExpVar^9) - 5/(72*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^7) + 7/(144*HarmonicSums`Private`ExpVar^6) - 7/(24*HarmonicSums`Private`ExpVar^5) + 7/(16*HarmonicSums`Private`ExpVar^4) - 5/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - z2^2/10 + sinf*z3, S[-2, -1, -1, HarmonicSums`Private`ExpVar] :> -4*li4half - ln2^4/6 + (-1)^HarmonicSums`Private`ExpVar* (-102037/(8960*HarmonicSums`Private`ExpVar^10) - 3385/(672*HarmonicSums`Private`ExpVar^9) + 499/(320*HarmonicSums`Private`ExpVar^8) + 893/(960*HarmonicSums`Private`ExpVar^7) - 67/(192*HarmonicSums`Private`ExpVar^6) - 23/(48*HarmonicSums`Private`ExpVar^5) + 9/(16*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (17/(4*HarmonicSums`Private`ExpVar^9) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) - z2/2) + (-1)^HarmonicSums`Private`ExpVar*(17/(4*HarmonicSums`Private`ExpVar^9) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (7*z2^2)/5 + ln2*(-97/(160*HarmonicSums`Private`ExpVar^10) - 13/(80*HarmonicSums`Private`ExpVar^9) + 1/(6*HarmonicSums`Private`ExpVar^8) + 23/(336*HarmonicSums`Private`ExpVar^7) - 5/(48*HarmonicSums`Private`ExpVar^6) - 7/(120*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(3*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - (21*z3)/8), S[-2, -1, 1, HarmonicSums`Private`ExpVar] :> -3*li4half - ln2^4/8 + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (17/(4*HarmonicSums`Private`ExpVar^9) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) - 8353/(9600*HarmonicSums`Private`ExpVar^10) - 195457/(302400*HarmonicSums`Private`ExpVar^9) + 719/(4032*HarmonicSums`Private`ExpVar^8) + 3877/(17640*HarmonicSums`Private`ExpVar^7) - 61/(720*HarmonicSums`Private`ExpVar^6) - 137/(900*HarmonicSums`Private`ExpVar^5) + 17/(96*HarmonicSums`Private`ExpVar^4) - 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (97/(160*HarmonicSums`Private`ExpVar^10) + 13/(80*HarmonicSums`Private`ExpVar^9) - 1/(6*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) + 5/(48*HarmonicSums`Private`ExpVar^6) + 7/(120*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(3*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*sinf + (-1)^HarmonicSums`Private`ExpVar*(-17/(4*HarmonicSums`Private`ExpVar^9) + 3/(4*HarmonicSums`Private`ExpVar^7) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (39*z2^2)/40, S[-2, 1, -1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*ln2* (-119/(8*HarmonicSums`Private`ExpVar^10) + 27/(2*HarmonicSums`Private`ExpVar^9) + 15/(8*HarmonicSums`Private`ExpVar^8) - 2/HarmonicSums`Private`ExpVar^7 - 3/(8*HarmonicSums`Private`ExpVar^6) + 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + 1109/(640*HarmonicSums`Private`ExpVar^10) - 1003/(2880*HarmonicSums`Private`ExpVar^9) - 5/(12*HarmonicSums`Private`ExpVar^8) + 115/(672*HarmonicSums`Private`ExpVar^7) + 19/(96*HarmonicSums`Private`ExpVar^6) - 37/(120*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* ln2*(-17/(2*HarmonicSums`Private`ExpVar^9) + 3/(2*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2))*sinf + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-17/(4*HarmonicSums`Private`ExpVar^9) + 3/(4*HarmonicSums`Private`ExpVar^7) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (3*z2)/4) + (3*z2^2)/40, S[-2, 1, 1, HarmonicSums`Private`ExpVar] :> -li4half - ln2^4/24 + (-1)^HarmonicSums`Private`ExpVar* (-37889/(1120*HarmonicSums`Private`ExpVar^10) + 1783/(336*HarmonicSums`Private`ExpVar^9) + 1269/(320*HarmonicSums`Private`ExpVar^8) - 103/(240*HarmonicSums`Private`ExpVar^7) - 71/(96*HarmonicSums`Private`ExpVar^6) - 5/(48*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (119/(8*HarmonicSums`Private`ExpVar^10) - 27/(2*HarmonicSums`Private`ExpVar^9) - 15/(8*HarmonicSums`Private`ExpVar^8) + 2/HarmonicSums`Private`ExpVar^7 + 3/(8*HarmonicSums`Private`ExpVar^6) - 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3))*sinf + (-1)^HarmonicSums`Private`ExpVar*(17/(4*HarmonicSums`Private`ExpVar^9) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*sinf^2 + (ln2^2*z2)/4 + (-1)^HarmonicSums`Private`ExpVar*(17/(4*HarmonicSums`Private`ExpVar^9) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + z2^2/8 - (7*ln2*z3)/8, S[2, -1, -1, HarmonicSums`Private`ExpVar] :> li4half + ln2^4/24 + (-1)^HarmonicSums`Private`ExpVar*ln2* (-629/(32*HarmonicSums`Private`ExpVar^10) - 39/(8*HarmonicSums`Private`ExpVar^9) + 11/(4*HarmonicSums`Private`ExpVar^8) + 13/(16*HarmonicSums`Private`ExpVar^7) - 11/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + 22529/(134400*HarmonicSums`Private`ExpVar^10) - 1669/(13440*HarmonicSums`Private`ExpVar^9) - 643/(10080*HarmonicSums`Private`ExpVar^8) + 611/(6720*HarmonicSums`Private`ExpVar^7) + 137/(2880*HarmonicSums`Private`ExpVar^6) - 113/(480*HarmonicSums`Private`ExpVar^5) + 35/(96*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) + (1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))* z2 + z2^2/40 + ln2^2*(1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) + (5*z2)/4), S[2, -1, 1, HarmonicSums`Private`ExpVar] :> 4*li4half + ln2^4/6 + (-1)^HarmonicSums`Private`ExpVar* (-2007/(128*HarmonicSums`Private`ExpVar^10) - 187/(16*HarmonicSums`Private`ExpVar^9) + 59/(32*HarmonicSums`Private`ExpVar^8) + 55/(32*HarmonicSums`Private`ExpVar^7) - 3/(8*HarmonicSums`Private`ExpVar^6) - 7/(16*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* (629/(32*HarmonicSums`Private`ExpVar^10) + 39/(8*HarmonicSums`Private`ExpVar^9) - 11/(4*HarmonicSums`Private`ExpVar^8) - 13/(16*HarmonicSums`Private`ExpVar^7) + 11/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3))*sinf + ln2^2*(1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) - z2/4) + (-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))* z2 - 2*z2^2 + (21*ln2*z3)/8, S[2, 1, -1, HarmonicSums`Private`ExpVar] :> 3*li4half + ln2^4/8 + (-1)^HarmonicSums`Private`ExpVar* (2331/(128*HarmonicSums`Private`ExpVar^10) - 27/(16*HarmonicSums`Private`ExpVar^9) - 155/(64*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^7) + 9/(16*HarmonicSums`Private`ExpVar^6) - 7/(16*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) + ln2*(-(30*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(42*HarmonicSums`Private`ExpVar^7) - 1/(30*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1))* sinf + ln2^2*(-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) - (3*z2)/2) - (6*z2^2)/5 + ln2*(-7/(120*HarmonicSums`Private`ExpVar^10) + 11/(350*HarmonicSums`Private`ExpVar^9) + 5/(168*HarmonicSums`Private`ExpVar^8) - 38/(2205*HarmonicSums`Private`ExpVar^7) - 1/(40*HarmonicSums`Private`ExpVar^6) + 7/(450*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(36*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1) + (7*z3)/8), S[2, 1, 1, HarmonicSums`Private`ExpVar] :> -429/(5600*HarmonicSums`Private`ExpVar^10) - 329171/(7938000*HarmonicSums`Private`ExpVar^9) + 1243/(35280*HarmonicSums`Private`ExpVar^8) + 137353/(3704400*HarmonicSums`Private`ExpVar^7) - 21/(800*HarmonicSums`Private`ExpVar^6) - 5743/(54000*HarmonicSums`Private`ExpVar^5) + 83/(288*HarmonicSums`Private`ExpVar^4) - 97/(216*HarmonicSums`Private`ExpVar^3) + 5/(8*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1) + (7/(120*HarmonicSums`Private`ExpVar^10) - 11/(350*HarmonicSums`Private`ExpVar^9) - 5/(168*HarmonicSums`Private`ExpVar^8) + 38/(2205*HarmonicSums`Private`ExpVar^7) + 1/(40*HarmonicSums`Private`ExpVar^6) - 7/(450*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(36*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1))* sinf + (1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))* sinf^2 + (1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))* z2 + (6*z2^2)/5, S[-1, -2, -1, HarmonicSums`Private`ExpVar] :> 4*li4half + ln2^4/6 + (-1)^HarmonicSums`Private`ExpVar* (-11/(80*HarmonicSums`Private`ExpVar^10) - 883/(210*HarmonicSums`Private`ExpVar^9) + 1/(448*HarmonicSums`Private`ExpVar^8) + 383/(480*HarmonicSums`Private`ExpVar^7) + 7/(240*HarmonicSums`Private`ExpVar^6) - 11/(24*HarmonicSums`Private`ExpVar^5) + 17/(48*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (ln2^2*z2)/2 - (7*z2^2)/5 + ln2*(-173/(40*HarmonicSums`Private`ExpVar^10) - 2/(5*HarmonicSums`Private`ExpVar^9) + 19/(24*HarmonicSums`Private`ExpVar^8) + 5/(42*HarmonicSums`Private`ExpVar^7) - 7/(24*HarmonicSums`Private`ExpVar^6) - 1/(15*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 5/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-93/(8*HarmonicSums`Private`ExpVar^10) + 51/(32*HarmonicSums`Private`ExpVar^8) - 3/(8*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^2) + 3/(4*HarmonicSums`Private`ExpVar))*z2 + (5*z3)/8) + (-1)^HarmonicSums`Private`ExpVar* (155/(32*HarmonicSums`Private`ExpVar^10) - 85/(128*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^4) + 5/(32*HarmonicSums`Private`ExpVar^2) - 5/(16*HarmonicSums`Private`ExpVar))*z3, S[-1, -2, 1, HarmonicSums`Private`ExpVar] :> 3*li4half + ln2^4/8 - 476/(75*HarmonicSums`Private`ExpVar^10) - 56641/(37800*HarmonicSums`Private`ExpVar^9) + 239/(252*HarmonicSums`Private`ExpVar^8) + 5783/(17640*HarmonicSums`Private`ExpVar^7) - 23/(90*HarmonicSums`Private`ExpVar^6) - 221/(1800*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^4) + 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (173/(40*HarmonicSums`Private`ExpVar^10) + 2/(5*HarmonicSums`Private`ExpVar^9) - 19/(24*HarmonicSums`Private`ExpVar^8) - 5/(42*HarmonicSums`Private`ExpVar^7) + 7/(24*HarmonicSums`Private`ExpVar^6) + 1/(15*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 5/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*sinf - (3*ln2^2*z2)/4 - (9*z2^2)/40 + (5*ln2*z3)/8 + (-1)^HarmonicSums`Private`ExpVar* (155/(32*HarmonicSums`Private`ExpVar^10) - 85/(128*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^4) + 5/(32*HarmonicSums`Private`ExpVar^2) - 5/(16*HarmonicSums`Private`ExpVar))*z3, S[-1, 2, -1, HarmonicSums`Private`ExpVar] :> -4*li4half - ln2^4/6 + 209/(64*HarmonicSums`Private`ExpVar^10) - 473/(360*HarmonicSums`Private`ExpVar^9) - 39/(64*HarmonicSums`Private`ExpVar^8) + 253/(672*HarmonicSums`Private`ExpVar^7) + 7/(32*HarmonicSums`Private`ExpVar^6) - 23/(60*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) - (ln2^2*z2)/2 + (5*z2^2)/4 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-2297/(120*HarmonicSums`Private`ExpVar^10) + 206/(35*HarmonicSums`Private`ExpVar^9) + 443/(168*HarmonicSums`Private`ExpVar^8) - 31/(30*HarmonicSums`Private`ExpVar^7) - 77/(120*HarmonicSums`Private`ExpVar^6) + 1/(3*HarmonicSums`Private`ExpVar^5) + 11/(24*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (93/(8*HarmonicSums`Private`ExpVar^10) - 51/(32*HarmonicSums`Private`ExpVar^8) + 3/(8*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^2) - 3/(4*HarmonicSums`Private`ExpVar))*z2 - z3/4) + (-1)^HarmonicSums`Private`ExpVar* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z3, S[-1, 2, 1, HarmonicSums`Private`ExpVar] :> -li4half - ln2^4/24 + (-1)^HarmonicSums`Private`ExpVar* (-37027/(1400*HarmonicSums`Private`ExpVar^10) + 4687/(29400*HarmonicSums`Private`ExpVar^9) + 205967/(70560*HarmonicSums`Private`ExpVar^8) + 317/(1800*HarmonicSums`Private`ExpVar^7) - 839/(1800*HarmonicSums`Private`ExpVar^6) - 11/(72*HarmonicSums`Private`ExpVar^5) + 11/(144*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (2297/(120*HarmonicSums`Private`ExpVar^10) - 206/(35*HarmonicSums`Private`ExpVar^9) - 443/(168*HarmonicSums`Private`ExpVar^8) + 31/(30*HarmonicSums`Private`ExpVar^7) + 77/(120*HarmonicSums`Private`ExpVar^6) - 1/(3*HarmonicSums`Private`ExpVar^5) - 11/(24*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2))*sinf + (ln2^2*z2)/4 - z2^2/40 - (ln2*z3)/4 + (-1)^HarmonicSums`Private`ExpVar* (-31/(2*HarmonicSums`Private`ExpVar^10) + 17/(8*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1))* z3, S[-1, -1, -2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (1167/(160*HarmonicSums`Private`ExpVar^10) - 9281/(1680*HarmonicSums`Private`ExpVar^9) - 1207/(1344*HarmonicSums`Private`ExpVar^8) + 87/(80*HarmonicSums`Private`ExpVar^7) + 91/(480*HarmonicSums`Private`ExpVar^6) - 29/(48*HarmonicSums`Private`ExpVar^5) + 19/(48*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) - (ln2^2*z2)/4 + (19/(128*HarmonicSums`Private`ExpVar^10) - 263/(960*HarmonicSums`Private`ExpVar^9) - 9/(256*HarmonicSums`Private`ExpVar^8) + 23/(336*HarmonicSums`Private`ExpVar^7) + 1/(64*HarmonicSums`Private`ExpVar^6) - 19/(480*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - (3*z2^2)/5 + (-1)^HarmonicSums`Private`ExpVar* (-403/(32*HarmonicSums`Private`ExpVar^10) + 221/(128*HarmonicSums`Private`ExpVar^8) - 13/(32*HarmonicSums`Private`ExpVar^6) + 13/(64*HarmonicSums`Private`ExpVar^4) - 13/(32*HarmonicSums`Private`ExpVar^2) + 13/(16*HarmonicSums`Private`ExpVar))*z3 + ln2*((-1)^HarmonicSums`Private`ExpVar* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2 + z3), S[-1, -1, 2, HarmonicSums`Private`ExpVar] :> 3*li4half + ln2^4/8 - 38237/(16800*HarmonicSums`Private`ExpVar^10) - 563/(336*HarmonicSums`Private`ExpVar^9) + 383/(1008*HarmonicSums`Private`ExpVar^8) + 781/(1680*HarmonicSums`Private`ExpVar^7) - 179/(1440*HarmonicSums`Private`ExpVar^6) - 33/(80*HarmonicSums`Private`ExpVar^5) + 59/(96*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - (ln2^2*z2)/4 + (-19/(64*HarmonicSums`Private`ExpVar^10) + 263/(480*HarmonicSums`Private`ExpVar^9) + 9/(128*HarmonicSums`Private`ExpVar^8) - 23/(168*HarmonicSums`Private`ExpVar^7) - 1/(32*HarmonicSums`Private`ExpVar^6) + 19/(240*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))* z2 - (3*z2^2)/8 + (-1)^HarmonicSums`Private`ExpVar* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))* z3 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + z3), S[-1, 1, -2, HarmonicSums`Private`ExpVar] :> 2*li4half + ln2^4/12 + 1259/(160*HarmonicSums`Private`ExpVar^10) - 1207/(720*HarmonicSums`Private`ExpVar^9) - 61/(48*HarmonicSums`Private`ExpVar^8) + 173/(336*HarmonicSums`Private`ExpVar^7) + 35/(96*HarmonicSums`Private`ExpVar^6) - 119/(240*HarmonicSums`Private`ExpVar^5) + 9/(32*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar*(31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))* sinf*z2 - z2^2/5 + (ln2*z3)/8 + (-1)^HarmonicSums`Private`ExpVar* (31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3, S[-1, 1, 2, HarmonicSums`Private`ExpVar] :> -li4half - ln2^4/24 + (-1)^HarmonicSums`Private`ExpVar* (-17101/(800*HarmonicSums`Private`ExpVar^10) + 39307/(19600*HarmonicSums`Private`ExpVar^9) + 411413/(141120*HarmonicSums`Private`ExpVar^8) - 1129/(3600*HarmonicSums`Private`ExpVar^7) - 4819/(7200*HarmonicSums`Private`ExpVar^6) - 11/(144*HarmonicSums`Private`ExpVar^5) + 115/(144*HarmonicSums`Private`ExpVar^4) - 7/(8*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (1185/(64*HarmonicSums`Private`ExpVar^10) + 119/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))* sinf*z2 - z2^2/20 + (ln2*z3)/8 + (-1)^HarmonicSums`Private`ExpVar* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))* z3, S[1, -2, -1, HarmonicSums`Private`ExpVar] :> li4half + ln2^4/24 + (-1)^HarmonicSums`Private`ExpVar*ln2* (-187/(8*HarmonicSums`Private`ExpVar^10) - 27/(2*HarmonicSums`Private`ExpVar^9) + 27/(8*HarmonicSums`Private`ExpVar^8) + 2/HarmonicSums`Private`ExpVar^7 - 7/(8*HarmonicSums`Private`ExpVar^6) - 1/(2*HarmonicSums`Private`ExpVar^5) + 5/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + 1469/(4800*HarmonicSums`Private`ExpVar^10) - 7757/(75600*HarmonicSums`Private`ExpVar^9) - 509/(4032*HarmonicSums`Private`ExpVar^8) + 6227/(70560*HarmonicSums`Private`ExpVar^7) + 137/(1440*HarmonicSums`Private`ExpVar^6) - 223/(900*HarmonicSums`Private`ExpVar^5) + 7/(24*HarmonicSums`Private`ExpVar^4) - 17/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - (ln2^2*z2)/4 - z2^2/8 + sinf*((3*ln2*z2)/2 - (5*z3)/8), S[1, -2, 1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(-27/(2*HarmonicSums`Private`ExpVar^10) - 22/HarmonicSums`Private`ExpVar^9 + 2/HarmonicSums`Private`ExpVar^8 + 11/(4*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4)) - (3*z2^2)/40 + sinf*((-1)^HarmonicSums`Private`ExpVar* (187/(8*HarmonicSums`Private`ExpVar^10) + 27/(2*HarmonicSums`Private`ExpVar^9) - 27/(8*HarmonicSums`Private`ExpVar^8) - 2/HarmonicSums`Private`ExpVar^7 + 7/(8*HarmonicSums`Private`ExpVar^6) + 1/(2*HarmonicSums`Private`ExpVar^5) - 5/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) - (5*z3)/8), S[1, 2, -1, HarmonicSums`Private`ExpVar] :> -3*li4half - ln2^4/8 + (-1)^HarmonicSums`Private`ExpVar* (1011/(32*HarmonicSums`Private`ExpVar^10) - 3/(2*HarmonicSums`Private`ExpVar^9) - 243/(64*HarmonicSums`Private`ExpVar^8) + 19/(32*HarmonicSums`Private`ExpVar^7) + 3/(4*HarmonicSums`Private`ExpVar^6) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) + (3*ln2^2*z2)/4 + (6*z2^2)/5 + ln2*(-11/(120*HarmonicSums`Private`ExpVar^10) - 11/(350*HarmonicSums`Private`ExpVar^9) + 3/(56*HarmonicSums`Private`ExpVar^8) + 38/(2205*HarmonicSums`Private`ExpVar^7) - 7/(120*HarmonicSums`Private`ExpVar^6) - 7/(450*HarmonicSums`Private`ExpVar^5) + 5/(24*HarmonicSums`Private`ExpVar^4) - 17/(36*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1) - (7*z3)/4) + sinf*((-3*ln2*z2)/2 + z3/4), S[1, 2, 1, HarmonicSums`Private`ExpVar] :> -11/(350*HarmonicSums`Private`ExpVar^10) - 54338/(496125*HarmonicSums`Private`ExpVar^9) + 38/(2205*HarmonicSums`Private`ExpVar^8) + 62521/(926100*HarmonicSums`Private`ExpVar^7) - 7/(450*HarmonicSums`Private`ExpVar^6) - 533/(6750*HarmonicSums`Private`ExpVar^5) + 1/(36*HarmonicSums`Private`ExpVar^4) + 17/(54*HarmonicSums`Private`ExpVar^3) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar - (6*z2^2)/5 + sinf*(11/(120*HarmonicSums`Private`ExpVar^10) + 11/(350*HarmonicSums`Private`ExpVar^9) - 3/(56*HarmonicSums`Private`ExpVar^8) - 38/(2205*HarmonicSums`Private`ExpVar^7) + 7/(120*HarmonicSums`Private`ExpVar^6) + 7/(450*HarmonicSums`Private`ExpVar^5) - 5/(24*HarmonicSums`Private`ExpVar^4) + 17/(36*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1) + 2*z3), S[1, -1, -2, HarmonicSums`Private`ExpVar] :> -3*li4half - ln2^4/8 + 1717/(2400*HarmonicSums`Private`ExpVar^10) - 31933/(75600*HarmonicSums`Private`ExpVar^9) - 221/(1008*HarmonicSums`Private`ExpVar^8) + 7019/(35280*HarmonicSums`Private`ExpVar^7) + 173/(1440*HarmonicSums`Private`ExpVar^6) - 1223/(3600*HarmonicSums`Private`ExpVar^5) + 35/(96*HarmonicSums`Private`ExpVar^4) - 19/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + (ln2^2*z2)/4 + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) - 153/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (11*z2^2)/20 + sinf*(-(ln2*z2) + (13*z3)/8), S[1, -1, 2, HarmonicSums`Private`ExpVar] :> -2*li4half - ln2^4/12 + (-1)^HarmonicSums`Private`ExpVar* (1129/(224*HarmonicSums`Private`ExpVar^10) - 27247/(1680*HarmonicSums`Private`ExpVar^9) + 13/(960*HarmonicSums`Private`ExpVar^8) + 647/(240*HarmonicSums`Private`ExpVar^7) - 7/(32*HarmonicSums`Private`ExpVar^6) - 47/(48*HarmonicSums`Private`ExpVar^5) + 3/(4*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + (3*ln2^2*z2)/4 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(64*HarmonicSums`Private`ExpVar^10) + 153/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) - 7/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) + 5/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (7*z2^2)/8 + sinf*((ln2*z2)/2 - z3) - (21*ln2*z3)/8, S[1, 1, -2, HarmonicSums`Private`ExpVar] :> li4half + ln2^4/24 + (-1)^HarmonicSums`Private`ExpVar* (1383/(32*HarmonicSums`Private`ExpVar^10) + 37/(16*HarmonicSums`Private`ExpVar^9) - 337/(64*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) + 33/(32*HarmonicSums`Private`ExpVar^6) - 9/(16*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) - (ln2^2*z2)/4 + (-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))* z2 - (sinf^2*z2)/4 - (13*z2^2)/20 + (7*ln2*z3)/8 - (sinf*z3)/8, S[1, 1, 2, HarmonicSums`Private`ExpVar] :> 1331/(16800*HarmonicSums`Private`ExpVar^10) - 659921/(7938000*HarmonicSums`Private`ExpVar^9) - 1207/(35280*HarmonicSums`Private`ExpVar^8) + 291703/(3704400*HarmonicSums`Private`ExpVar^7) + 161/(7200*HarmonicSums`Private`ExpVar^6) - 12493/(54000*HarmonicSums`Private`ExpVar^5) + 137/(288*HarmonicSums`Private`ExpVar^4) - 151/(216*HarmonicSums`Private`ExpVar^3) + 7/(8*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1) + (1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))* z2 + (sinf^2*z2)/2 + (9*z2^2)/10 - sinf*z3, S[-1, -1, -1, -1, HarmonicSums`Private`ExpVar] :> ln2^4/24 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar)) + 10693/(33600*HarmonicSums`Private`ExpVar^10) - 168251/(161280*HarmonicSums`Private`ExpVar^9) - 11251/(129024*HarmonicSums`Private`ExpVar^8) + 393/(1280*HarmonicSums`Private`ExpVar^7) + 559/(11520*HarmonicSums`Private`ExpVar^6) - 1/(3*HarmonicSums`Private`ExpVar^5) + 145/(384*HarmonicSums`Private`ExpVar^4) - 13/(48*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + ln2^2*(-19/(128*HarmonicSums`Private`ExpVar^10) + 263/(960*HarmonicSums`Private`ExpVar^9) + 9/(256*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) - 1/(64*HarmonicSums`Private`ExpVar^6) + 19/(480*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) + z2/4) + (-19/(128*HarmonicSums`Private`ExpVar^10) + 263/(960*HarmonicSums`Private`ExpVar^9) + 9/(256*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) - 1/(64*HarmonicSums`Private`ExpVar^6) + 19/(480*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (9*z2^2)/40 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-100969/(7680*HarmonicSums`Private`ExpVar^10) + 4213/(8960*HarmonicSums`Private`ExpVar^9) + 9923/(5376*HarmonicSums`Private`ExpVar^8) - 91/(960*HarmonicSums`Private`ExpVar^7) - 901/(1920*HarmonicSums`Private`ExpVar^6) + 5/(192*HarmonicSums`Private`ExpVar^5) + 37/(96*HarmonicSums`Private`ExpVar^4) - 7/(16*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + z3/4) + (-1)^HarmonicSums`Private`ExpVar*(31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z3, S[-1, -1, -1, 1, HarmonicSums`Private`ExpVar] :> ln2^4/24 + (-1)^HarmonicSums`Private`ExpVar* (-10318457/(716800*HarmonicSums`Private`ExpVar^10) - 13342793/(2508800*HarmonicSums`Private`ExpVar^9) + 3771437/(2257920*HarmonicSums`Private`ExpVar^8) + 26371/(28800*HarmonicSums`Private`ExpVar^7) - 36403/(115200*HarmonicSums`Private`ExpVar^6) - 737/(2304*HarmonicSums`Private`ExpVar^5) + 109/(576*HarmonicSums`Private`ExpVar^4) + 5/(32*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* ln2^3*(31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (100969/(7680*HarmonicSums`Private`ExpVar^10) - 4213/(8960*HarmonicSums`Private`ExpVar^9) - 9923/(5376*HarmonicSums`Private`ExpVar^8) + 91/(960*HarmonicSums`Private`ExpVar^7) + 901/(1920*HarmonicSums`Private`ExpVar^6) - 5/(192*HarmonicSums`Private`ExpVar^5) - 37/(96*HarmonicSums`Private`ExpVar^4) + 7/(16*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*sinf + ln2^2*(-19/(128*HarmonicSums`Private`ExpVar^10) + 263/(960*HarmonicSums`Private`ExpVar^9) + 9/(256*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) - 1/(64*HarmonicSums`Private`ExpVar^6) + 19/(480*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) + z2/4) + (19/(128*HarmonicSums`Private`ExpVar^10) - 263/(960*HarmonicSums`Private`ExpVar^9) - 9/(256*HarmonicSums`Private`ExpVar^8) + 23/(336*HarmonicSums`Private`ExpVar^7) + 1/(64*HarmonicSums`Private`ExpVar^6) - 19/(480*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - (19*z2^2)/40 + ln2*((-1)^HarmonicSums`Private`ExpVar* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + z3/4) + (-1)^HarmonicSums`Private`ExpVar* (-217/(16*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^6) + 7/(32*HarmonicSums`Private`ExpVar^4) - 7/(16*HarmonicSums`Private`ExpVar^2) + 7/(8*HarmonicSums`Private`ExpVar))*z3, S[-1, -1, 1, -1, HarmonicSums`Private`ExpVar] :> 3*li4half + ln2^4/6 + (-1)^HarmonicSums`Private`ExpVar* (16555/(2048*HarmonicSums`Private`ExpVar^10) - 6017/(3072*HarmonicSums`Private`ExpVar^9) - 1715/(1536*HarmonicSums`Private`ExpVar^8) + 23/(48*HarmonicSums`Private`ExpVar^7) + 75/(256*HarmonicSums`Private`ExpVar^6) - 51/(128*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* ln2^3*(31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar)) + ln2*(19/(64*HarmonicSums`Private`ExpVar^10) - 263/(480*HarmonicSums`Private`ExpVar^9) - 9/(128*HarmonicSums`Private`ExpVar^8) + 23/(168*HarmonicSums`Private`ExpVar^7) + 1/(32*HarmonicSums`Private`ExpVar^6) - 19/(240*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))* sinf + ln2^2*(19/(128*HarmonicSums`Private`ExpVar^10) - 263/(960*HarmonicSums`Private`ExpVar^9) - 9/(256*HarmonicSums`Private`ExpVar^8) + 23/(336*HarmonicSums`Private`ExpVar^7) + 1/(64*HarmonicSums`Private`ExpVar^6) - 19/(480*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar) - z2/2) - (6*z2^2)/5 + ln2*(-19403/(7680*HarmonicSums`Private`ExpVar^10) + 44769/(44800*HarmonicSums`Private`ExpVar^9) + 9889/(21504*HarmonicSums`Private`ExpVar^8) - 439/(2205*HarmonicSums`Private`ExpVar^7) - 299/(1920*HarmonicSums`Private`ExpVar^6) + 1207/(14400*HarmonicSums`Private`ExpVar^5) + 47/(384*HarmonicSums`Private`ExpVar^4) - 23/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/8) + (-1)^HarmonicSums`Private`ExpVar* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3, S[-1, -1, 1, 1, HarmonicSums`Private`ExpVar] :> 3*li4half + ln2^4/6 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar)) - 9718511/(2150400*HarmonicSums`Private`ExpVar^10) - 17100359/(1016064000*HarmonicSums`Private`ExpVar^9) + 4111957/(6021120*HarmonicSums`Private`ExpVar^8) + 4818869/(59270400*HarmonicSums`Private`ExpVar^7) - 20257/(115200*HarmonicSums`Private`ExpVar^6) - 116309/(864000*HarmonicSums`Private`ExpVar^5) + 1435/(4608*HarmonicSums`Private`ExpVar^4) - 251/(864*HarmonicSums`Private`ExpVar^3) + 9/(32*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) + (19403/(7680*HarmonicSums`Private`ExpVar^10) - 44769/(44800*HarmonicSums`Private`ExpVar^9) - 9889/(21504*HarmonicSums`Private`ExpVar^8) + 439/(2205*HarmonicSums`Private`ExpVar^7) + 299/(1920*HarmonicSums`Private`ExpVar^6) - 1207/(14400*HarmonicSums`Private`ExpVar^5) - 47/(384*HarmonicSums`Private`ExpVar^4) + 23/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*sinf + (-19/(128*HarmonicSums`Private`ExpVar^10) + 263/(960*HarmonicSums`Private`ExpVar^9) + 9/(256*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) - 1/(64*HarmonicSums`Private`ExpVar^6) + 19/(480*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*sinf^2 - (ln2^2*z2)/2 + (-19/(128*HarmonicSums`Private`ExpVar^10) + 263/(960*HarmonicSums`Private`ExpVar^9) + 9/(256*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) - 1/(64*HarmonicSums`Private`ExpVar^6) + 19/(480*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/8) + (-1)^HarmonicSums`Private`ExpVar* (217/(32*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^6) - 7/(64*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3, S[-1, 1, -1, -1, HarmonicSums`Private`ExpVar] :> ln2^4/24 + (-1)^HarmonicSums`Private`ExpVar* (-956779/(102400*HarmonicSums`Private`ExpVar^10) - 523391/(7526400*HarmonicSums`Private`ExpVar^9) + 2838859/(2257920*HarmonicSums`Private`ExpVar^8) + 3073/(57600*HarmonicSums`Private`ExpVar^7) - 30347/(115200*HarmonicSums`Private`ExpVar^6) - 445/(2304*HarmonicSums`Private`ExpVar^5) + 287/(576*HarmonicSums`Private`ExpVar^4) - 15/(32*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* ln2^3*(-31/(12*HarmonicSums`Private`ExpVar^10) + 17/(48*HarmonicSums`Private`ExpVar^8) - 1/(12*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar)) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) - z2/4) + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - z2^2/8 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2) + ln2*(-2733/(1280*HarmonicSums`Private`ExpVar^10) - 183/(128*HarmonicSums`Private`ExpVar^9) + 641/(1536*HarmonicSums`Private`ExpVar^8) + 21/(64*HarmonicSums`Private`ExpVar^7) - 17/(96*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) + 19/(64*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - z3/8) + (-1)^HarmonicSums`Private`ExpVar* (217/(32*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^6) - 7/(64*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3, S[-1, 1, -1, 1, HarmonicSums`Private`ExpVar] :> ln2^4/24 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (-31/(12*HarmonicSums`Private`ExpVar^10) + 17/(48*HarmonicSums`Private`ExpVar^8) - 1/(12*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar)) - 32639/(153600*HarmonicSums`Private`ExpVar^10) - 31061/(9216*HarmonicSums`Private`ExpVar^9) + 3685/(36864*HarmonicSums`Private`ExpVar^8) + 11/(16*HarmonicSums`Private`ExpVar^7) - 193/(2304*HarmonicSums`Private`ExpVar^6) - 107/(384*HarmonicSums`Private`ExpVar^5) + 53/(256*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) - z2/4) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (3*z2^2)/8 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar)) + 2733/(1280*HarmonicSums`Private`ExpVar^10) + 183/(128*HarmonicSums`Private`ExpVar^9) - 641/(1536*HarmonicSums`Private`ExpVar^8) - 21/(64*HarmonicSums`Private`ExpVar^7) + 17/(96*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) - 19/(64*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2) + ln2*((-1)^HarmonicSums`Private`ExpVar* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 - z3/8) + (-1)^HarmonicSums`Private`ExpVar* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3, S[-1, 1, 1, -1, HarmonicSums`Private`ExpVar] :> -li4half + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (-1185/(128*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* ln2^3*(31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar)) + 3075/(512*HarmonicSums`Private`ExpVar^10) + 47/(576*HarmonicSums`Private`ExpVar^9) - 539/(512*HarmonicSums`Private`ExpVar^8) + 53/(384*HarmonicSums`Private`ExpVar^7) + 45/(128*HarmonicSums`Private`ExpVar^6) - 31/(96*HarmonicSums`Private`ExpVar^5) + 5/(32*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + ((-1)^HarmonicSums`Private`ExpVar*ln2* (-1185/(64*HarmonicSums`Private`ExpVar^10) - 119/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar)))*sinf + (-1)^HarmonicSums`Private`ExpVar*ln2* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))* sinf^2 + (2*z2^2)/5 + ln2*((-1)^HarmonicSums`Private`ExpVar* (32833/(3840*HarmonicSums`Private`ExpVar^10) + 38279/(4480*HarmonicSums`Private`ExpVar^9) - 937/(1344*HarmonicSums`Private`ExpVar^8) - 1231/(960*HarmonicSums`Private`ExpVar^7) + 37/(960*HarmonicSums`Private`ExpVar^6) + 31/(96*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2), S[-1, 1, 1, 1, HarmonicSums`Private`ExpVar] :> -li4half + (-1)^HarmonicSums`Private`ExpVar* (-319181/(26880*HarmonicSums`Private`ExpVar^10) + 232189/(40320*HarmonicSums`Private`ExpVar^9) + 19201/(11520*HarmonicSums`Private`ExpVar^8) - 3691/(5760*HarmonicSums`Private`ExpVar^7) - 35/(96*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*sinf^2 + (-1)^HarmonicSums`Private`ExpVar* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar))*sinf^3 + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + sinf*((-1)^HarmonicSums`Private`ExpVar* (-32833/(3840*HarmonicSums`Private`ExpVar^10) - 38279/(4480*HarmonicSums`Private`ExpVar^9) + 937/(1344*HarmonicSums`Private`ExpVar^8) + 1231/(960*HarmonicSums`Private`ExpVar^7) - 37/(960*HarmonicSums`Private`ExpVar^6) - 31/(96*HarmonicSums`Private`ExpVar^5) - 5/(48*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2) + (-1)^HarmonicSums`Private`ExpVar* (-31/(12*HarmonicSums`Private`ExpVar^10) + 17/(48*HarmonicSums`Private`ExpVar^8) - 1/(12*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar))*z3, S[1, -1, -1, -1, HarmonicSums`Private`ExpVar] :> -3*li4half - ln2^4/4 + (-1)^HarmonicSums`Private`ExpVar* (81883/(7168*HarmonicSums`Private`ExpVar^10) - 398887/(53760*HarmonicSums`Private`ExpVar^9) - 8813/(7680*HarmonicSums`Private`ExpVar^8) + 5251/(3840*HarmonicSums`Private`ExpVar^7) + 5/(32*HarmonicSums`Private`ExpVar^6) - 121/(192*HarmonicSums`Private`ExpVar^5) + 13/(32*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) + 153/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) + z2/4) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) + 153/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (6*z2^2)/5 + ln2*(-2071/(7680*HarmonicSums`Private`ExpVar^10) - 5919/(44800*HarmonicSums`Private`ExpVar^9) + 1745/(21504*HarmonicSums`Private`ExpVar^8) + 8251/(141120*HarmonicSums`Private`ExpVar^7) - 121/(1920*HarmonicSums`Private`ExpVar^6) - 757/(14400*HarmonicSums`Private`ExpVar^5) + 79/(384*HarmonicSums`Private`ExpVar^4) - 49/(144*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) - 2*z3) + sinf*(-(ln2^3/6) - (ln2*z2)/2 - z3/4), S[1, -1, -1, 1, HarmonicSums`Private`ExpVar] :> -3*li4half - ln2^4/4 - 10819/(44800*HarmonicSums`Private`ExpVar^10) - 13221301/(31752000*HarmonicSums`Private`ExpVar^9) + 46163/(1128960*HarmonicSums`Private`ExpVar^8) + 4812571/(29635200*HarmonicSums`Private`ExpVar^7) - 839/(28800*HarmonicSums`Private`ExpVar^6) - 15079/(108000*HarmonicSums`Private`ExpVar^5) + 37/(288*HarmonicSums`Private`ExpVar^4) + 11/(108*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) + 153/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) + z2/4) + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) - 153/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + sinf*(-(ln2^3/6) + 2071/(7680*HarmonicSums`Private`ExpVar^10) + 5919/(44800*HarmonicSums`Private`ExpVar^9) - 1745/(21504*HarmonicSums`Private`ExpVar^8) - 8251/(141120*HarmonicSums`Private`ExpVar^7) + 121/(1920*HarmonicSums`Private`ExpVar^6) + 757/(14400*HarmonicSums`Private`ExpVar^5) - 79/(384*HarmonicSums`Private`ExpVar^4) + 49/(144*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) - (ln2*z2)/2 + (7*z3)/4), S[1, -1, 1, -1, HarmonicSums`Private`ExpVar] :> -(ln2^4/8) + (-1)^HarmonicSums`Private`ExpVar*ln2* (-6543/(128*HarmonicSums`Private`ExpVar^10) + 147/(64*HarmonicSums`Private`ExpVar^9) + 189/(32*HarmonicSums`Private`ExpVar^8) - 15/(32*HarmonicSums`Private`ExpVar^7) - 35/(32*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + 164039/(153600*HarmonicSums`Private`ExpVar^10) - 1211/(9216*HarmonicSums`Private`ExpVar^9) - 10741/(36864*HarmonicSums`Private`ExpVar^8) + 19/(192*HarmonicSums`Private`ExpVar^7) + 373/(2304*HarmonicSums`Private`ExpVar^6) - 101/(384*HarmonicSums`Private`ExpVar^5) + 59/(256*HarmonicSums`Private`ExpVar^4) - 7/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) - 153/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + z2/2) - z2^2/20 + sinf*(-(ln2^3/6) + ln2*((-1)^HarmonicSums`Private`ExpVar* (1185/(64*HarmonicSums`Private`ExpVar^10) - 153/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) + 7/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + z2/2) + z3/8), S[1, -1, 1, 1, HarmonicSums`Private`ExpVar] :> -(ln2^4/8) + (-1)^HarmonicSums`Private`ExpVar* (-82487/(1792*HarmonicSums`Private`ExpVar^10) - 131773/(13440*HarmonicSums`Private`ExpVar^9) + 18431/(3840*HarmonicSums`Private`ExpVar^8) + 2603/(1920*HarmonicSums`Private`ExpVar^7) - 25/(32*HarmonicSums`Private`ExpVar^6) - 19/(48*HarmonicSums`Private`ExpVar^5) + 7/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) + 153/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*sinf^2 + (ln2^2*z2)/2 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) + 153/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + z2^2/20 + sinf*(-(ln2^3/6) + (-1)^HarmonicSums`Private`ExpVar* (6543/(128*HarmonicSums`Private`ExpVar^10) - 147/(64*HarmonicSums`Private`ExpVar^9) - 189/(32*HarmonicSums`Private`ExpVar^8) + 15/(32*HarmonicSums`Private`ExpVar^7) + 35/(32*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) + (ln2*z2)/2 - (7*z3)/8) - ln2*z3, S[1, 1, -1, -1, HarmonicSums`Private`ExpVar] :> li4half + ln2^4/6 + (-1)^HarmonicSums`Private`ExpVar*ln2* (1035/(256*HarmonicSums`Private`ExpVar^10) - 1323/(128*HarmonicSums`Private`ExpVar^9) + 7/(64*HarmonicSums`Private`ExpVar^8) + 105/(64*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) - 15/(32*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + 389887/(2150400*HarmonicSums`Private`ExpVar^10) - 51507809/(1016064000*HarmonicSums`Private`ExpVar^9) - 478069/(6021120*HarmonicSums`Private`ExpVar^8) + 3460589/(59270400*HarmonicSums`Private`ExpVar^7) + 7493/(115200*HarmonicSums`Private`ExpVar^6) - 181559/(864000*HarmonicSums`Private`ExpVar^5) + 1525/(4608*HarmonicSums`Private`ExpVar^4) - 359/(864*HarmonicSums`Private`ExpVar^3) + 15/(32*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) + sinf^2*(ln2^2/4 + z2/4) + ln2^2*(1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) + z2/4) + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))* z2 + z2^2/4 + sinf*(ln2^3/3 + (ln2*z2)/2 - (7*z3)/8), S[1, 1, -1, 1, HarmonicSums`Private`ExpVar] :> li4half + ln2^4/6 + (-1)^HarmonicSums`Private`ExpVar* (4347/(128*HarmonicSums`Private`ExpVar^10) - 1939/(128*HarmonicSums`Private`ExpVar^9) - 735/(256*HarmonicSums`Private`ExpVar^8) + 285/(128*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) - 9/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4)) + sinf^2*(ln2^2/4 - z2/4) + ln2^2*(1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) - z2/4) + (-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))* z2 - (13*z2^2)/20 + sinf*(ln2^3/3 + (-1)^HarmonicSums`Private`ExpVar* (-1035/(256*HarmonicSums`Private`ExpVar^10) + 1323/(128*HarmonicSums`Private`ExpVar^9) - 7/(64*HarmonicSums`Private`ExpVar^8) - 105/(64*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 15/(32*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) - (ln2*z2)/2 + z3/8) + ln2*z3, S[1, 1, 1, -1, HarmonicSums`Private`ExpVar] :> -(ln2^4/24) + (-1)^HarmonicSums`Private`ExpVar* (315/(16*HarmonicSums`Private`ExpVar^10) + 609/(128*HarmonicSums`Private`ExpVar^9) - 735/(256*HarmonicSums`Private`ExpVar^8) - 35/(128*HarmonicSums`Private`ExpVar^7) + 45/(64*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)) - (ln2^2*sinf^2)/4 - (ln2*sinf^3)/6 + sinf*(-(ln2^3/6) + ln2*(-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) - z2/2)) + ln2^2*(-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar) - z2/4) + ln2*(-(20*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(36*HarmonicSums`Private`ExpVar^8) - 1/(36*HarmonicSums`Private`ExpVar^6) + 1/(12*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(6*HarmonicSums`Private`ExpVar^2) - z3/3), S[1, 1, 1, 1, HarmonicSums`Private`ExpVar] :> -121/(16800*HarmonicSums`Private`ExpVar^10) - 59/(1008*HarmonicSums`Private`ExpVar^9) + 23/(5040*HarmonicSums`Private`ExpVar^8) + 11/(240*HarmonicSums`Private`ExpVar^7) - 7/(1440*HarmonicSums`Private`ExpVar^6) - 5/(48*HarmonicSums`Private`ExpVar^5) + 19/(96*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + sinf^4/24 + sinf^2*(1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) + z2/4) + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))* z2 + (9*z2^2)/40 + sinf*(1/(20*HarmonicSums`Private`ExpVar^10) - 1/(36*HarmonicSums`Private`ExpVar^8) + 1/(36*HarmonicSums`Private`ExpVar^6) - 1/(12*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(6*HarmonicSums`Private`ExpVar^2) + z3/3), S[-5, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(-63/(2*HarmonicSums`Private`ExpVar^10) + 35/(8*HarmonicSums`Private`ExpVar^8) - 5/(4*HarmonicSums`Private`ExpVar^6) + 1/(2*HarmonicSums`Private`ExpVar^5)) - (15*z5)/16, S[5, HarmonicSums`Private`ExpVar] :> -(2*HarmonicSums`Private`ExpVar^10)^(-1) + 7/(24*HarmonicSums`Private`ExpVar^8) - 5/(12*HarmonicSums`Private`ExpVar^6) + 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + z5, S[-4, -1, HarmonicSums`Private`ExpVar] :> -3/(8*HarmonicSums`Private`ExpVar^10) - 31/(180*HarmonicSums`Private`ExpVar^9) + 5/(24*HarmonicSums`Private`ExpVar^8) + 3/(28*HarmonicSums`Private`ExpVar^7) - 1/(3*HarmonicSums`Private`ExpVar^6) + 3/(10*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + ln2*((-1)^HarmonicSums`Private`ExpVar*(14/HarmonicSums`Private`ExpVar^9 - 5/(2*HarmonicSums`Private`ExpVar^7) + HarmonicSums`Private`ExpVar^ (-5) - 1/(2*HarmonicSums`Private`ExpVar^4)) + (3*z2^2)/4) + (3*z2*z3)/4 - (59*z5)/32, S[-4, 1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(-35/(4*HarmonicSums`Private`ExpVar^10) + 12/HarmonicSums`Private`ExpVar^9 + 15/(16*HarmonicSums`Private`ExpVar^8) - 3/(2*HarmonicSums`Private`ExpVar^7) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5)) + (-1)^HarmonicSums`Private`ExpVar* (-14/HarmonicSums`Private`ExpVar^9 + 5/(2*HarmonicSums`Private`ExpVar^7) - HarmonicSums`Private`ExpVar^(-5) + 1/(2*HarmonicSums`Private`ExpVar^4))*sinf + (z2*z3)/2 - (59*z5)/32, S[4, -1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(-127/(8*HarmonicSums`Private`ExpVar^10) - 2/HarmonicSums`Private`ExpVar^9 + 9/(4*HarmonicSums`Private`ExpVar^8) + 3/(8*HarmonicSums`Private`ExpVar^7) - 3/(4*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5)) + ln2*(2/(9*HarmonicSums`Private`ExpVar^9) - 1/(6*HarmonicSums`Private`ExpVar^7) + 1/(3*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^4) + 1/(3*HarmonicSums`Private`ExpVar^3) - (3*z2^2)/4) - (3*z2*z3)/8 + (17*z5)/16, S[4, 1, HarmonicSums`Private`ExpVar] :> -5/(36*HarmonicSums`Private`ExpVar^10) + 68/(405*HarmonicSums`Private`ExpVar^9) + 1/(16*HarmonicSums`Private`ExpVar^8) - 11/(126*HarmonicSums`Private`ExpVar^7) - 1/(24*HarmonicSums`Private`ExpVar^6) + 13/(180*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(9*HarmonicSums`Private`ExpVar^3) + (-2/(9*HarmonicSums`Private`ExpVar^9) + 1/(6*HarmonicSums`Private`ExpVar^7) - 1/(3*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^4) - 1/(3*HarmonicSums`Private`ExpVar^3))*sinf - z2*z3 + 3*z5, S[-3, -2, HarmonicSums`Private`ExpVar] :> -HarmonicSums`Private`ExpVar^(-10) - 2/(5*HarmonicSums`Private`ExpVar^9) + 19/(48*HarmonicSums`Private`ExpVar^8) + 5/(28*HarmonicSums`Private`ExpVar^7) - 11/(24*HarmonicSums`Private`ExpVar^6) + 7/(20*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + z2*((-1)^HarmonicSums`Private`ExpVar* (-153/(8*HarmonicSums`Private`ExpVar^10) + 21/(8*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) - (9*z3)/4) + (83*z5)/16, S[-3, 2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-331/(21*HarmonicSums`Private`ExpVar^10) + 383/(30*HarmonicSums`Private`ExpVar^9) + 529/(240*HarmonicSums`Private`ExpVar^8) - 9/(4*HarmonicSums`Private`ExpVar^7) - 17/(24*HarmonicSums`Private`ExpVar^6) + 5/(4*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^4)) + z2*((-1)^HarmonicSums`Private`ExpVar* (153/(4*HarmonicSums`Private`ExpVar^10) - 21/(4*HarmonicSums`Private`ExpVar^8) + 5/(4*HarmonicSums`Private`ExpVar^6) - 3/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^3)) - (5*z3)/8) + (11*z5)/32, S[3, -2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(-33/(2*HarmonicSums`Private`ExpVar^10) - 9/(2*HarmonicSums`Private`ExpVar^9) + 39/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^7) - 7/(8*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5)) + z2*(-3/(40*HarmonicSums`Private`ExpVar^10) + 1/(24*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) + z3/4) - (51*z5)/32, S[3, 2, HarmonicSums`Private`ExpVar] :> -11/(42*HarmonicSums`Private`ExpVar^10) + 118/(945*HarmonicSums`Private`ExpVar^9) + 13/(80*HarmonicSums`Private`ExpVar^8) - 37/(420*HarmonicSums`Private`ExpVar^7) - 7/(24*HarmonicSums`Private`ExpVar^6) + 37/(60*HarmonicSums`Private`ExpVar^5) - 5/(8*HarmonicSums`Private`ExpVar^4) + 1/(3*HarmonicSums`Private`ExpVar^3) + z2*(3/(20*HarmonicSums`Private`ExpVar^10) - 1/(12*HarmonicSums`Private`ExpVar^8) + 1/(12*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + 3*z3) - (9*z5)/2, S[-2, -3, HarmonicSums`Private`ExpVar] :> -23/(8*HarmonicSums`Private`ExpVar^10) - 3/(5*HarmonicSums`Private`ExpVar^9) + 37/(48*HarmonicSums`Private`ExpVar^8) + 11/(56*HarmonicSums`Private`ExpVar^7) - 7/(12*HarmonicSums`Private`ExpVar^6) + 2/(5*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + (-1)^HarmonicSums`Private`ExpVar* (-51/(8*HarmonicSums`Private`ExpVar^9) + 9/(8*HarmonicSums`Private`ExpVar^7) - 3/(8*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2))*z3 + (21*z2*z3)/8 - (67*z5)/16, S[-2, 3, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-379/(24*HarmonicSums`Private`ExpVar^10) + 61/(12*HarmonicSums`Private`ExpVar^9) + 107/(48*HarmonicSums`Private`ExpVar^8) - 7/(8*HarmonicSums`Private`ExpVar^7) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* (17/(2*HarmonicSums`Private`ExpVar^9) - 3/(2*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2))*z3 - (3*z2*z3)/4 + (21*z5)/32, S[2, -3, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(-147/(8*HarmonicSums`Private`ExpVar^10) - 31/(4*HarmonicSums`Private`ExpVar^9) + 45/(16*HarmonicSums`Private`ExpVar^8) + 9/(8*HarmonicSums`Private`ExpVar^7) - HarmonicSums`Private`ExpVar^(-6) + 1/(4*HarmonicSums`Private`ExpVar^5)) + (-(40*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(56*HarmonicSums`Private`ExpVar^7) - 1/(40*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 3/(4*HarmonicSums`Private`ExpVar))* z3 - (z2*z3)/8 - (41*z5)/32, S[2, 3, HarmonicSums`Private`ExpVar] :> -7/(24*HarmonicSums`Private`ExpVar^10) - 7/(135*HarmonicSums`Private`ExpVar^9) + 3/(16*HarmonicSums`Private`ExpVar^8) + 5/(168*HarmonicSums`Private`ExpVar^7) - 1/(3*HarmonicSums`Private`ExpVar^6) + 7/(15*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) + (1/(30*HarmonicSums`Private`ExpVar^9) - 1/(42*HarmonicSums`Private`ExpVar^7) + 1/(30*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1))* z3 - 2*z2*z3 + (11*z5)/2, S[-1, -4, HarmonicSums`Private`ExpVar] :> -29/(4*HarmonicSums`Private`ExpVar^10) - 26/(45*HarmonicSums`Private`ExpVar^9) + 67/(48*HarmonicSums`Private`ExpVar^8) + 1/(7*HarmonicSums`Private`ExpVar^7) - 17/(24*HarmonicSums`Private`ExpVar^6) + 9/(20*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) - (2*ln2*z2^2)/5 + (-1)^HarmonicSums`Private`ExpVar* (217/(80*HarmonicSums`Private`ExpVar^10) - 119/(320*HarmonicSums`Private`ExpVar^8) + 7/(80*HarmonicSums`Private`ExpVar^6) - 7/(160*HarmonicSums`Private`ExpVar^4) + 7/(80*HarmonicSums`Private`ExpVar^2) - 7/(40*HarmonicSums`Private`ExpVar))*z2^2 - (3*z2*z3)/4 + (91*z5)/32, S[-1, 4, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-571/(36*HarmonicSums`Private`ExpVar^10) + 2/HarmonicSums`Private`ExpVar^9 + 109/(48*HarmonicSums`Private`ExpVar^8) - 1/(3*HarmonicSums`Private`ExpVar^7) - 19/(24*HarmonicSums`Private`ExpVar^6) + 7/(12*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^4)) + (7*ln2*z2^2)/20 + (-1)^HarmonicSums`Private`ExpVar* (-31/(10*HarmonicSums`Private`ExpVar^10) + 17/(40*HarmonicSums`Private`ExpVar^8) - 1/(10*HarmonicSums`Private`ExpVar^6) + 1/(20*HarmonicSums`Private`ExpVar^4) - 1/(10*HarmonicSums`Private`ExpVar^2) + 1/(5*HarmonicSums`Private`ExpVar))*z2^2 + (3*z2*z3)/8 - 2*z5, S[1, -4, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(-91/(4*HarmonicSums`Private`ExpVar^10) - 12/HarmonicSums`Private`ExpVar^9 + 55/(16*HarmonicSums`Private`ExpVar^8) + 3/(2*HarmonicSums`Private`ExpVar^7) - 9/(8*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5)) - (7*sinf*z2^2)/20 - (z2*z3)/2 + (29*z5)/32, S[1, 4, HarmonicSums`Private`ExpVar] :> -13/(36*HarmonicSums`Private`ExpVar^10) - 68/(405*HarmonicSums`Private`ExpVar^9) + 11/(48*HarmonicSums`Private`ExpVar^8) + 11/(126*HarmonicSums`Private`ExpVar^7) - 3/(8*HarmonicSums`Private`ExpVar^6) + 77/(180*HarmonicSums`Private`ExpVar^5) - 7/(24*HarmonicSums`Private`ExpVar^4) + 1/(9*HarmonicSums`Private`ExpVar^3) + (2*sinf*z2^2)/5 + z2*z3 - 2*z5, S[-3, -1, -1, HarmonicSums`Private`ExpVar] :> ln2^5/12 + (-1)^HarmonicSums`Private`ExpVar* (-30865/(2688*HarmonicSums`Private`ExpVar^10) + 5153/(960*HarmonicSums`Private`ExpVar^9) + 3121/(1920*HarmonicSums`Private`ExpVar^8) - 59/(64*HarmonicSums`Private`ExpVar^7) - 55/(96*HarmonicSums`Private`ExpVar^6) + 11/(16*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* ln2^2*(153/(8*HarmonicSums`Private`ExpVar^10) - 21/(8*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) - (ln2^3*z2)/2 + ln2*(2*li4half - 47/(160*HarmonicSums`Private`ExpVar^10) + 17/(72*HarmonicSums`Private`ExpVar^9) + 11/(96*HarmonicSums`Private`ExpVar^8) - 7/(48*HarmonicSums`Private`ExpVar^7) - 1/(12*HarmonicSums`Private`ExpVar^6) + 7/(24*HarmonicSums`Private`ExpVar^5) - 5/(16*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) - (19*z2^2)/40) + z2*((-1)^HarmonicSums`Private`ExpVar* (153/(8*HarmonicSums`Private`ExpVar^10) - 21/(8*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) - z3/2) + (15*z5)/32, S[-3, -1, 1, HarmonicSums`Private`ExpVar] :> -2*li5half + ln2^5/60 + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (153/(8*HarmonicSums`Private`ExpVar^10) - 21/(8*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) - 26099/(28800*HarmonicSums`Private`ExpVar^10) + 569/(3240*HarmonicSums`Private`ExpVar^9) + 341/(1152*HarmonicSums`Private`ExpVar^8) - 181/(2016*HarmonicSums`Private`ExpVar^7) - 103/(576*HarmonicSums`Private`ExpVar^6) + 259/(1440*HarmonicSums`Private`ExpVar^5) - 5/(192*HarmonicSums`Private`ExpVar^4) - 1/(18*HarmonicSums`Private`ExpVar^3) + (47/(160*HarmonicSums`Private`ExpVar^10) - 17/(72*HarmonicSums`Private`ExpVar^9) - 11/(96*HarmonicSums`Private`ExpVar^8) + 7/(48*HarmonicSums`Private`ExpVar^7) + 1/(12*HarmonicSums`Private`ExpVar^6) - 7/(24*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3))*sinf - (ln2^3*z2)/6 - (ln2*z2^2)/10 + z2*((-1)^HarmonicSums`Private`ExpVar* (-153/(8*HarmonicSums`Private`ExpVar^10) + 21/(8*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) - (13*z3)/8) + (85*z5)/16, S[-3, 1, -1, HarmonicSums`Private`ExpVar] :> 4*li5half - ln2^5/30 - 99/(320*HarmonicSums`Private`ExpVar^10) - 1499/(2880*HarmonicSums`Private`ExpVar^9) + 137/(768*HarmonicSums`Private`ExpVar^8) + 53/(224*HarmonicSums`Private`ExpVar^7) - 31/(96*HarmonicSums`Private`ExpVar^6) + 1/(5*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + (-1)^HarmonicSums`Private`ExpVar* ln2*(-153/(4*HarmonicSums`Private`ExpVar^10) + 21/(4*HarmonicSums`Private`ExpVar^8) - 5/(4*HarmonicSums`Private`ExpVar^6) + 3/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^3))*sinf + (ln2^3*z2)/3 + ln2*((-1)^HarmonicSums`Private`ExpVar* (777/(16*HarmonicSums`Private`ExpVar^10) + 35/(8*HarmonicSums`Private`ExpVar^9) - 175/(32*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^7) + 15/(16*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4)) + (17*z2^2)/10) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-153/(8*HarmonicSums`Private`ExpVar^10) + 21/(8*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) - (7*z3)/8) - (3*z2*z3)/4 - (39*z5)/16, S[-3, 1, 1, HarmonicSums`Private`ExpVar] :> -2*li5half - 2*li4half*ln2 - ln2^5/15 + (-1)^HarmonicSums`Private`ExpVar* (47759/(2688*HarmonicSums`Private`ExpVar^10) + 9263/(960*HarmonicSums`Private`ExpVar^9) - 1117/(960*HarmonicSums`Private`ExpVar^8) - 45/(32*HarmonicSums`Private`ExpVar^7) - 5/(48*HarmonicSums`Private`ExpVar^6) + 5/(8*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* (-777/(16*HarmonicSums`Private`ExpVar^10) - 35/(8*HarmonicSums`Private`ExpVar^9) + 175/(32*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^7) - 15/(16*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4))*sinf + (-1)^HarmonicSums`Private`ExpVar*(153/(8*HarmonicSums`Private`ExpVar^10) - 21/(8*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3))*sinf^2 + (ln2^3*z2)/3 + z2*((-1)^HarmonicSums`Private`ExpVar* (153/(8*HarmonicSums`Private`ExpVar^10) - 21/(8*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) + (3*z3)/8) - (7*ln2^2*z3)/8 + (15*z5)/32, S[3, -1, -1, HarmonicSums`Private`ExpVar] :> 2*li5half - ln2^5/60 - 5851/(26880*HarmonicSums`Private`ExpVar^10) - 2377/(60480*HarmonicSums`Private`ExpVar^9) + 517/(3840*HarmonicSums`Private`ExpVar^8) + 169/(6720*HarmonicSums`Private`ExpVar^7) - 17/(64*HarmonicSums`Private`ExpVar^6) + 19/(48*HarmonicSums`Private`ExpVar^5) - 11/(32*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) + (ln2^3*z2)/6 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-39/(4*HarmonicSums`Private`ExpVar^10) + 57/(8*HarmonicSums`Private`ExpVar^9) + 21/(16*HarmonicSums`Private`ExpVar^8) - 21/(16*HarmonicSums`Private`ExpVar^7) - 5/(16*HarmonicSums`Private`ExpVar^6) + 5/(8*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4)) + (19*z2^2)/40) + ln2^2*(3/(40*HarmonicSums`Private`ExpVar^10) - 1/(24*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + (7*z3)/8) + z2*(3/(40*HarmonicSums`Private`ExpVar^10) - 1/(24*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + (15*z3)/8) - (311*z5)/64, S[3, -1, 1, HarmonicSums`Private`ExpVar] :> -4*li5half - ln2^5/20 + (-1)^HarmonicSums`Private`ExpVar* (-2801/(128*HarmonicSums`Private`ExpVar^10) + 297/(64*HarmonicSums`Private`ExpVar^9) + 41/(16*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5)) + (-1)^HarmonicSums`Private`ExpVar* (39/(4*HarmonicSums`Private`ExpVar^10) - 57/(8*HarmonicSums`Private`ExpVar^9) - 21/(16*HarmonicSums`Private`ExpVar^8) + 21/(16*HarmonicSums`Private`ExpVar^7) + 5/(16*HarmonicSums`Private`ExpVar^6) - 5/(8*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4))*sinf + (ln2^3*z2)/6 + ln2*(-2*li4half - (49*z2^2)/40) + z2*(-3/(40*HarmonicSums`Private`ExpVar^10) + 1/(24*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - z3/16) + ln2^2*(3/(40*HarmonicSums`Private`ExpVar^10) - 1/(24*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + (7*z3)/8) + (27*z5)/8, S[3, 1, -1, HarmonicSums`Private`ExpVar] :> 2*li5half + ln2^5/15 + (-1)^HarmonicSums`Private`ExpVar* (-677/(128*HarmonicSums`Private`ExpVar^10) - 223/(64*HarmonicSums`Private`ExpVar^9) + 59/(64*HarmonicSums`Private`ExpVar^8) + 21/(32*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5)) + ln2^2*(-3/(40*HarmonicSums`Private`ExpVar^10) + 1/(24*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + ln2*(-3/(20*HarmonicSums`Private`ExpVar^10) + 1/(12*HarmonicSums`Private`ExpVar^8) - 1/(12*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2))*sinf - (ln2^3*z2)/3 + ln2*(2*li4half + 187/(1200*HarmonicSums`Private`ExpVar^10) + 5/(72*HarmonicSums`Private`ExpVar^9) - 5/(72*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^7) + 7/(144*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - (3*z2^2)/8) - (z2*z3)/16 - (125*z5)/64, S[3, 1, 1, HarmonicSums`Private`ExpVar] :> -2567/(42000*HarmonicSums`Private`ExpVar^10) + 1013/(9072*HarmonicSums`Private`ExpVar^9) + 929/(17280*HarmonicSums`Private`ExpVar^8) - 71/(1120*HarmonicSums`Private`ExpVar^7) - 221/(1728*HarmonicSums`Private`ExpVar^6) + 451/(1440*HarmonicSums`Private`ExpVar^5) - 65/(192*HarmonicSums`Private`ExpVar^4) + 17/(72*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (-187/(1200*HarmonicSums`Private`ExpVar^10) - 5/(72*HarmonicSums`Private`ExpVar^9) + 5/(72*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^7) - 7/(144*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*sinf + (3/(40*HarmonicSums`Private`ExpVar^10) - 1/(24*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*sinf^2 + z2*(3/(40*HarmonicSums`Private`ExpVar^10) - 1/(24*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + z3) - z5/2, S[-2, -2, -1, HarmonicSums`Private`ExpVar] :> 8*li5half + ln2^5/10 + (-1)^HarmonicSums`Private`ExpVar* (-65969/(6720*HarmonicSums`Private`ExpVar^10) + 1013/(672*HarmonicSums`Private`ExpVar^9) + 169/(120*HarmonicSums`Private`ExpVar^8) - 53/(240*HarmonicSums`Private`ExpVar^7) - 13/(24*HarmonicSums`Private`ExpVar^6) + 5/(12*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) - (ln2^3*z2)/3 + ln2*(4*li4half - 7/(8*HarmonicSums`Private`ExpVar^10) + 31/(36*HarmonicSums`Private`ExpVar^9) + 1/(4*HarmonicSums`Private`ExpVar^8) - 1/(3*HarmonicSums`Private`ExpVar^7) - 1/(8*HarmonicSums`Private`ExpVar^6) + 5/(12*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (51/(4*HarmonicSums`Private`ExpVar^9) - 9/(4*HarmonicSums`Private`ExpVar^7) + 3/(4*HarmonicSums`Private`ExpVar^5) - 3/(4*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2))*z2 + (19*z2^2)/20) + (-1)^HarmonicSums`Private`ExpVar*(-85/(16*HarmonicSums`Private`ExpVar^9) + 15/(16*HarmonicSums`Private`ExpVar^7) - 5/(16*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^3) - 5/(16*HarmonicSums`Private`ExpVar^2))*z3 - (123*z5)/16, S[-2, -2, 1, HarmonicSums`Private`ExpVar] :> -307/(144*HarmonicSums`Private`ExpVar^10) + 589/(648*HarmonicSums`Private`ExpVar^9) + 89/(192*HarmonicSums`Private`ExpVar^8) - 65/(252*HarmonicSums`Private`ExpVar^7) - 5/(32*HarmonicSums`Private`ExpVar^6) + 25/(144*HarmonicSums`Private`ExpVar^5) - 1/(96*HarmonicSums`Private`ExpVar^4) - 1/(18*HarmonicSums`Private`ExpVar^3) + (7/(8*HarmonicSums`Private`ExpVar^10) - 31/(36*HarmonicSums`Private`ExpVar^9) - 1/(4*HarmonicSums`Private`ExpVar^8) + 1/(3*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6) - 5/(12*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3))*sinf + (-1)^HarmonicSums`Private`ExpVar*(-85/(16*HarmonicSums`Private`ExpVar^9) + 15/(16*HarmonicSums`Private`ExpVar^7) - 5/(16*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^3) - 5/(16*HarmonicSums`Private`ExpVar^2))*z3 + (15*z2*z3)/16 - (29*z5)/32, S[-2, 2, -1, HarmonicSums`Private`ExpVar] :> -4*li5half + ln2^5/30 - 77/(64*HarmonicSums`Private`ExpVar^10) - 1141/(1440*HarmonicSums`Private`ExpVar^9) + 143/(384*HarmonicSums`Private`ExpVar^8) + 31/(112*HarmonicSums`Private`ExpVar^7) - 19/(48*HarmonicSums`Private`ExpVar^6) + 9/(40*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) - (ln2^3*z2)/3 + ln2*((-1)^HarmonicSums`Private`ExpVar* (9127/(280*HarmonicSums`Private`ExpVar^10) + 589/(84*HarmonicSums`Private`ExpVar^9) - 357/(80*HarmonicSums`Private`ExpVar^8) - 19/(15*HarmonicSums`Private`ExpVar^7) + 25/(24*HarmonicSums`Private`ExpVar^6) + 7/(12*HarmonicSums`Private`ExpVar^5) - HarmonicSums`Private`ExpVar^ (-4) + 1/(2*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-51/(4*HarmonicSums`Private`ExpVar^9) + 9/(4*HarmonicSums`Private`ExpVar^7) - 3/(4*HarmonicSums`Private`ExpVar^5) + 3/(4*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2))*z2 - (19*z2^2)/20) + (7*ln2^2*z3)/4 + (-1)^HarmonicSums`Private`ExpVar* (17/(8*HarmonicSums`Private`ExpVar^9) - 3/(8*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z3 + (11*z2*z3)/8 + (33*z5)/32, S[-2, 2, 1, HarmonicSums`Private`ExpVar] :> 4*li5half + 4*li4half*ln2 + (2*ln2^5)/15 + (-1)^HarmonicSums`Private`ExpVar* (207019/(235200*HarmonicSums`Private`ExpVar^10) + 445871/(70560*HarmonicSums`Private`ExpVar^9) + 941/(1200*HarmonicSums`Private`ExpVar^8) - 607/(900*HarmonicSums`Private`ExpVar^7) - 17/(36*HarmonicSums`Private`ExpVar^6) + 1/(72*HarmonicSums`Private`ExpVar^5) + 5/(8*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-9127/(280*HarmonicSums`Private`ExpVar^10) - 589/(84*HarmonicSums`Private`ExpVar^9) + 357/(80*HarmonicSums`Private`ExpVar^8) + 19/(15*HarmonicSums`Private`ExpVar^7) - 25/(24*HarmonicSums`Private`ExpVar^6) - 7/(12*HarmonicSums`Private`ExpVar^5) + HarmonicSums`Private`ExpVar^ (-4) - 1/(2*HarmonicSums`Private`ExpVar^3))*sinf - (2*ln2^3*z2)/3 + (7*ln2^2*z3)/4 + (-1)^HarmonicSums`Private`ExpVar* (17/HarmonicSums`Private`ExpVar^9 - 3/HarmonicSums`Private`ExpVar^7 + HarmonicSums`Private`ExpVar^(-5) - HarmonicSums`Private`ExpVar^(-3) + HarmonicSums`Private`ExpVar^(-2))*z3 - (7*z2*z3)/4 - (89*z5)/64, S[-2, -1, -2, HarmonicSums`Private`ExpVar] :> -16*li5half - ln2^5/5 + (-1)^HarmonicSums`Private`ExpVar* (-21089/(1680*HarmonicSums`Private`ExpVar^10) + 13/(56*HarmonicSums`Private`ExpVar^9) + 889/(480*HarmonicSums`Private`ExpVar^8) - 7/(240*HarmonicSums`Private`ExpVar^7) - 17/(24*HarmonicSums`Private`ExpVar^6) + 11/(24*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) + (2*ln2^3*z2)/3 + ln2*(-8*li4half + (-1)^HarmonicSums`Private`ExpVar* (-17/(2*HarmonicSums`Private`ExpVar^9) + 3/(2*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2))*z2 - (17*z2^2)/5) + z2*(-97/(320*HarmonicSums`Private`ExpVar^10) - 13/(160*HarmonicSums`Private`ExpVar^9) + 1/(12*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) - 5/(96*HarmonicSums`Private`ExpVar^6) - 7/(240*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - (13*z3)/16) + (-1)^HarmonicSums`Private`ExpVar*(221/(16*HarmonicSums`Private`ExpVar^9) - 39/(16*HarmonicSums`Private`ExpVar^7) + 13/(16*HarmonicSums`Private`ExpVar^5) - 13/(16*HarmonicSums`Private`ExpVar^3) + 13/(16*HarmonicSums`Private`ExpVar^2))*z3 + (547*z5)/32, S[-2, -1, 2, HarmonicSums`Private`ExpVar] :> -5917/(2800*HarmonicSums`Private`ExpVar^10) + 211/(756*HarmonicSums`Private`ExpVar^9) + 871/(1440*HarmonicSums`Private`ExpVar^8) - 9/(80*HarmonicSums`Private`ExpVar^7) - 35/(72*HarmonicSums`Private`ExpVar^6) + 19/(30*HarmonicSums`Private`ExpVar^5) - 7/(16*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) + ln2*((-1)^HarmonicSums`Private`ExpVar* (17/(4*HarmonicSums`Private`ExpVar^9) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (3*z2^2)/8) + (-1)^HarmonicSums`Private`ExpVar*(-17/(2*HarmonicSums`Private`ExpVar^9) + 3/(2*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2))*z3 + z2*(97/(160*HarmonicSums`Private`ExpVar^10) + 13/(80*HarmonicSums`Private`ExpVar^9) - 1/(6*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) + 5/(48*HarmonicSums`Private`ExpVar^6) + 7/(120*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(3*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + (25*z3)/8) - (363*z5)/64, S[-2, 1, -2, HarmonicSums`Private`ExpVar] :> -21/(16*HarmonicSums`Private`ExpVar^10) - 3/(2*HarmonicSums`Private`ExpVar^9) + 15/(32*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + (-1)^HarmonicSums`Private`ExpVar* (-17/(4*HarmonicSums`Private`ExpVar^9) + 3/(4*HarmonicSums`Private`ExpVar^7) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*sinf*z2 + z2*((-1)^HarmonicSums`Private`ExpVar* (-119/(16*HarmonicSums`Private`ExpVar^10) + 27/(4*HarmonicSums`Private`ExpVar^9) + 15/(16*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-7) - 3/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + z3/16) + (-1)^HarmonicSums`Private`ExpVar*(-17/(16*HarmonicSums`Private`ExpVar^9) + 3/(16*HarmonicSums`Private`ExpVar^7) - 1/(16*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z3 + (5*z5)/8, S[-2, 1, 2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (1384759/(58800*HarmonicSums`Private`ExpVar^10) + 31457/(3528*HarmonicSums`Private`ExpVar^9) - 7637/(2400*HarmonicSums`Private`ExpVar^8) - 5597/(3600*HarmonicSums`Private`ExpVar^7) + 5/(9*HarmonicSums`Private`ExpVar^6) + 71/(72*HarmonicSums`Private`ExpVar^5) - 9/(8*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (17/(2*HarmonicSums`Private`ExpVar^9) - 3/(2*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2))*sinf*z2 + z2*((-1)^HarmonicSums`Private`ExpVar* (119/(8*HarmonicSums`Private`ExpVar^10) - 27/(2*HarmonicSums`Private`ExpVar^9) - 15/(8*HarmonicSums`Private`ExpVar^8) + 2/HarmonicSums`Private`ExpVar^7 + 3/(8*HarmonicSums`Private`ExpVar^6) - 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) + z3/16) + (-1)^HarmonicSums`Private`ExpVar*(-17/(2*HarmonicSums`Private`ExpVar^9) + 3/(2*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2))*z3 - (53*z5)/64, S[2, -2, -1, HarmonicSums`Private`ExpVar] :> 4*li5half - ln2^5/30 - 5849/(33600*HarmonicSums`Private`ExpVar^10) - 4423/(30240*HarmonicSums`Private`ExpVar^9) + 4993/(40320*HarmonicSums`Private`ExpVar^8) + 41/(420*HarmonicSums`Private`ExpVar^7) - 197/(720*HarmonicSums`Private`ExpVar^6) + 3/(10*HarmonicSums`Private`ExpVar^5) - 5/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) + (ln2^3*z2)/3 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-195/(8*HarmonicSums`Private`ExpVar^10) + 31/(4*HarmonicSums`Private`ExpVar^9) + 49/(16*HarmonicSums`Private`ExpVar^8) - 3/(2*HarmonicSums`Private`ExpVar^7) - 5/(8*HarmonicSums`Private`ExpVar^6) + 3/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4)) + (1/(20*HarmonicSums`Private`ExpVar^9) - 1/(28*HarmonicSums`Private`ExpVar^7) + 1/(20*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar))*z2 + (113*z2^2)/40) - (7*ln2^2*z3)/4 + (-(48*HarmonicSums`Private`ExpVar^9)^(-1) + 5/(336*HarmonicSums`Private`ExpVar^7) - 1/(48*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^3) - 5/(16*HarmonicSums`Private`ExpVar^2) + 5/(8*HarmonicSums`Private`ExpVar))*z3 - (7*z2*z3)/4 - (89*z5)/64, S[2, -2, 1, HarmonicSums`Private`ExpVar] :> -4*li5half - 4*li4half*ln2 - (2*ln2^5)/15 + (-1)^HarmonicSums`Private`ExpVar* (-2353/(64*HarmonicSums`Private`ExpVar^10) + 149/(32*HarmonicSums`Private`ExpVar^9) + 123/(32*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^7) - 9/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5)) + (-1)^HarmonicSums`Private`ExpVar* (195/(8*HarmonicSums`Private`ExpVar^10) - 31/(4*HarmonicSums`Private`ExpVar^9) - 49/(16*HarmonicSums`Private`ExpVar^8) + 3/(2*HarmonicSums`Private`ExpVar^7) + 5/(8*HarmonicSums`Private`ExpVar^6) - 3/(4*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4))*sinf + (2*ln2^3*z2)/3 - (7*ln2^2*z3)/4 + (-(48*HarmonicSums`Private`ExpVar^9)^(-1) + 5/(336*HarmonicSums`Private`ExpVar^7) - 1/(48*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^3) - 5/(16*HarmonicSums`Private`ExpVar^2) + 5/(8*HarmonicSums`Private`ExpVar))*z3 + (13*z2*z3)/16 + (33*z5)/32, S[2, 2, -1, HarmonicSums`Private`ExpVar] :> -8*li5half - ln2^5/10 + (-1)^HarmonicSums`Private`ExpVar* (-307/(64*HarmonicSums`Private`ExpVar^10) - 169/(32*HarmonicSums`Private`ExpVar^9) + HarmonicSums`Private`ExpVar^ (-8) + 7/(8*HarmonicSums`Private`ExpVar^7) - 9/(16*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5)) + (ln2^3*z2)/3 + ln2*(-4*li4half + 121/(4200*HarmonicSums`Private`ExpVar^10) + 31/(252*HarmonicSums`Private`ExpVar^9) - 23/(1260*HarmonicSums`Private`ExpVar^8) - 1/(10*HarmonicSums`Private`ExpVar^7) + 7/(360*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 13/(24*HarmonicSums`Private`ExpVar^4) + 2/(3*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + (-(20*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(28*HarmonicSums`Private`ExpVar^7) - 1/(20*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar))*z2 - (113*z2^2)/40) + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))* z3 + (3*z2*z3)/8 + (125*z5)/16, S[2, 2, 1, HarmonicSums`Private`ExpVar] :> -158393/(882000*HarmonicSums`Private`ExpVar^10) + 9131/(158760*HarmonicSums`Private`ExpVar^9) + 69131/(705600*HarmonicSums`Private`ExpVar^8) - 169/(6300*HarmonicSums`Private`ExpVar^7) - 713/(7200*HarmonicSums`Private`ExpVar^6) + 1/(80*HarmonicSums`Private`ExpVar^5) + 97/(288*HarmonicSums`Private`ExpVar^4) - 13/(18*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2) + (-121/(4200*HarmonicSums`Private`ExpVar^10) - 31/(252*HarmonicSums`Private`ExpVar^9) + 23/(1260*HarmonicSums`Private`ExpVar^8) + 1/(10*HarmonicSums`Private`ExpVar^7) - 7/(360*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 13/(24*HarmonicSums`Private`ExpVar^4) - 2/(3*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2))*sinf + (1/(15*HarmonicSums`Private`ExpVar^9) - 1/(21*HarmonicSums`Private`ExpVar^7) + 1/(15*HarmonicSums`Private`ExpVar^5) - 1/(3*HarmonicSums`Private`ExpVar^3) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar)*z3 + 2*z5, S[2, -1, -2, HarmonicSums`Private`ExpVar] :> -1423/(2800*HarmonicSums`Private`ExpVar^10) - 1079/(3780*HarmonicSums`Private`ExpVar^9) + 2453/(10080*HarmonicSums`Private`ExpVar^8) + 11/(80*HarmonicSums`Private`ExpVar^7) - 67/(180*HarmonicSums`Private`ExpVar^6) + 11/(30*HarmonicSums`Private`ExpVar^5) - 11/(48*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) + ln2*((-(30*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(42*HarmonicSums`Private`ExpVar^7) - 1/(30*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1))*z2 - (3*z2^2)/8) + z2*((-1)^HarmonicSums`Private`ExpVar* (-629/(64*HarmonicSums`Private`ExpVar^10) - 39/(16*HarmonicSums`Private`ExpVar^9) + 11/(8*HarmonicSums`Private`ExpVar^8) + 13/(32*HarmonicSums`Private`ExpVar^7) - 11/(32*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) - z3) + (13/(240*HarmonicSums`Private`ExpVar^9) - 13/(336*HarmonicSums`Private`ExpVar^7) + 13/(240*HarmonicSums`Private`ExpVar^5) - 13/(48*HarmonicSums`Private`ExpVar^3) + 13/(16*HarmonicSums`Private`ExpVar^2) - 13/(8*HarmonicSums`Private`ExpVar))*z3 + (257*z5)/64, S[2, -1, 2, HarmonicSums`Private`ExpVar] :> 16*li5half + ln2^5/5 + (-1)^HarmonicSums`Private`ExpVar* (-51691/(1680*HarmonicSums`Private`ExpVar^10) + 121/(40*HarmonicSums`Private`ExpVar^9) + 2009/(480*HarmonicSums`Private`ExpVar^8) - 35/(48*HarmonicSums`Private`ExpVar^7) - 7/(6*HarmonicSums`Private`ExpVar^6) + 7/(8*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4)) - (2*ln2^3*z2)/3 + ln2*(8*li4half + (1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2 + (17*z2^2)/5) + z2*((-1)^HarmonicSums`Private`ExpVar* (629/(32*HarmonicSums`Private`ExpVar^10) + 39/(8*HarmonicSums`Private`ExpVar^9) - 11/(4*HarmonicSums`Private`ExpVar^8) - 13/(16*HarmonicSums`Private`ExpVar^7) + 11/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) - z3) + (-(30*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(42*HarmonicSums`Private`ExpVar^7) - 1/(30*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1))* z3 - (507*z5)/32, S[2, 1, -2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(3/(16*HarmonicSums`Private`ExpVar^10) - 57/(8*HarmonicSums`Private`ExpVar^9) + 21/(32*HarmonicSums`Private`ExpVar^8) + 19/(16*HarmonicSums`Private`ExpVar^7) - 5/(8*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5)) + (-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))* sinf*z2 + z2*(-7/(240*HarmonicSums`Private`ExpVar^10) + 11/(700*HarmonicSums`Private`ExpVar^9) + 5/(336*HarmonicSums`Private`ExpVar^8) - 19/(2205*HarmonicSums`Private`ExpVar^7) - 1/(80*HarmonicSums`Private`ExpVar^6) + 7/(900*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) + (5*z3)/16) + (-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z3 - (177*z5)/64, S[2, 1, 2, HarmonicSums`Private`ExpVar] :> -81343/(882000*HarmonicSums`Private`ExpVar^10) + 41/(1470*HarmonicSums`Private`ExpVar^9) + 81121/(1058400*HarmonicSums`Private`ExpVar^8) - 77/(3600*HarmonicSums`Private`ExpVar^7) - 1189/(5400*HarmonicSums`Private`ExpVar^6) + 19/(36*HarmonicSums`Private`ExpVar^5) - 107/(144*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + (1/(30*HarmonicSums`Private`ExpVar^9) - 1/(42*HarmonicSums`Private`ExpVar^7) + 1/(30*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1))* sinf*z2 + z2*(7/(120*HarmonicSums`Private`ExpVar^10) - 11/(350*HarmonicSums`Private`ExpVar^9) - 5/(168*HarmonicSums`Private`ExpVar^8) + 38/(2205*HarmonicSums`Private`ExpVar^7) + 1/(40*HarmonicSums`Private`ExpVar^6) - 7/(450*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(36*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1) - z3) + (-(30*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(42*HarmonicSums`Private`ExpVar^7) - 1/(30*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1))* z3 + (9*z5)/2, S[-1, -3, -1, HarmonicSums`Private`ExpVar] :> -(ln2^5/12) + (-1)^HarmonicSums`Private`ExpVar* (-10171/(1152*HarmonicSums`Private`ExpVar^10) - 11/(192*HarmonicSums`Private`ExpVar^9) + 497/(384*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^7) - 103/(192*HarmonicSums`Private`ExpVar^6) + 31/(96*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (31/(48*HarmonicSums`Private`ExpVar^10) - 17/(192*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar)) + (ln2^3*z2)/2 + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))* z2 + (-1)^HarmonicSums`Private`ExpVar* (-93/(20*HarmonicSums`Private`ExpVar^10) + 51/(80*HarmonicSums`Private`ExpVar^8) - 3/(20*HarmonicSums`Private`ExpVar^6) + 3/(40*HarmonicSums`Private`ExpVar^4) - 3/(20*HarmonicSums`Private`ExpVar^2) + 3/(10*HarmonicSums`Private`ExpVar))*z2^2 + ln2*(-2*li4half - 109/(80*HarmonicSums`Private`ExpVar^10) + 197/(72*HarmonicSums`Private`ExpVar^9) + 7/(24*HarmonicSums`Private`ExpVar^8) - 17/(24*HarmonicSums`Private`ExpVar^7) - 5/(48*HarmonicSums`Private`ExpVar^6) + 13/(24*HarmonicSums`Private`ExpVar^5) - 7/(16*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) - (2*z2^2)/5) + (15*z5)/32, S[-1, -3, 1, HarmonicSums`Private`ExpVar] :> -2*li5half - ln2^5/15 + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(48*HarmonicSums`Private`ExpVar^10) + 17/(192*HarmonicSums`Private`ExpVar^8) - 1/(48*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-31/(2*HarmonicSums`Private`ExpVar^10) + 17/(8*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) - 105341/(28800*HarmonicSums`Private`ExpVar^10) + 69343/(25920*HarmonicSums`Private`ExpVar^9) + 1295/(2304*HarmonicSums`Private`ExpVar^8) - 71/(144*HarmonicSums`Private`ExpVar^7) - 71/(576*HarmonicSums`Private`ExpVar^6) + 241/(1440*HarmonicSums`Private`ExpVar^5) + 1/(192*HarmonicSums`Private`ExpVar^4) - 1/(18*HarmonicSums`Private`ExpVar^3) + (109/(80*HarmonicSums`Private`ExpVar^10) - 197/(72*HarmonicSums`Private`ExpVar^9) - 7/(24*HarmonicSums`Private`ExpVar^8) + 17/(24*HarmonicSums`Private`ExpVar^7) + 5/(48*HarmonicSums`Private`ExpVar^6) - 13/(24*HarmonicSums`Private`ExpVar^5) + 7/(16*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3))*sinf + (ln2^3*z2)/3 + (-1)^HarmonicSums`Private`ExpVar* (341/(40*HarmonicSums`Private`ExpVar^10) - 187/(160*HarmonicSums`Private`ExpVar^8) + 11/(40*HarmonicSums`Private`ExpVar^6) - 11/(80*HarmonicSums`Private`ExpVar^4) + 11/(40*HarmonicSums`Private`ExpVar^2) - 11/(20*HarmonicSums`Private`ExpVar))*z2^2 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 - (7*z3)/8) - (7*z2*z3)/8 + ln2*(-2*li4half - z2^2/2 + (-1)^HarmonicSums`Private`ExpVar* (-217/(16*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^6) + 7/(32*HarmonicSums`Private`ExpVar^4) - 7/(16*HarmonicSums`Private`ExpVar^2) + 7/(8*HarmonicSums`Private`ExpVar))*z3) + (85*z5)/16, S[-1, 3, -1, HarmonicSums`Private`ExpVar] :> -4*li5half + ln2^5/30 - 1107/(320*HarmonicSums`Private`ExpVar^10) - 33/(32*HarmonicSums`Private`ExpVar^9) + 91/(128*HarmonicSums`Private`ExpVar^8) + 9/(32*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) - (ln2^3*z2)/3 + (-1)^HarmonicSums`Private`ExpVar* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z2^2 + ln2*((-1)^HarmonicSums`Private`ExpVar* (163/(16*HarmonicSums`Private`ExpVar^10) + 169/(24*HarmonicSums`Private`ExpVar^9) - 133/(96*HarmonicSums`Private`ExpVar^8) - 31/(24*HarmonicSums`Private`ExpVar^7) + 5/(16*HarmonicSums`Private`ExpVar^6) + 5/(8*HarmonicSums`Private`ExpVar^5) - 5/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) - (13*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (217/(16*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^6) - 7/(32*HarmonicSums`Private`ExpVar^4) + 7/(16*HarmonicSums`Private`ExpVar^2) - 7/(8*HarmonicSums`Private`ExpVar))*z3) + (27*z5)/8, S[-1, 3, 1, HarmonicSums`Private`ExpVar] :> 2*li5half - ln2^5/60 + (-1)^HarmonicSums`Private`ExpVar* (1823/(1152*HarmonicSums`Private`ExpVar^10) + 3653/(576*HarmonicSums`Private`ExpVar^9) - 7/(1152*HarmonicSums`Private`ExpVar^8) - 113/(144*HarmonicSums`Private`ExpVar^7) - 13/(192*HarmonicSums`Private`ExpVar^6) + 13/(96*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-163/(16*HarmonicSums`Private`ExpVar^10) - 169/(24*HarmonicSums`Private`ExpVar^9) + 133/(96*HarmonicSums`Private`ExpVar^8) + 31/(24*HarmonicSums`Private`ExpVar^7) - 5/(16*HarmonicSums`Private`ExpVar^6) - 5/(8*HarmonicSums`Private`ExpVar^5) + 5/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3))*sinf + (ln2^3*z2)/6 + (11*ln2*z2^2)/10 + (-1)^HarmonicSums`Private`ExpVar* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))* z2^2 - (7*ln2^2*z3)/8 + (7*z2*z3)/8 - (311*z5)/64, S[-1, -2, -2, HarmonicSums`Private`ExpVar] :> 8*li5half + ln2^5/10 + (-1)^HarmonicSums`Private`ExpVar* (-1493/(144*HarmonicSums`Private`ExpVar^10) - 11/(8*HarmonicSums`Private`ExpVar^9) + 305/(192*HarmonicSums`Private`ExpVar^8) + 13/(48*HarmonicSums`Private`ExpVar^7) - 65/(96*HarmonicSums`Private`ExpVar^6) + 17/(48*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^4)) - (ln2^3*z2)/3 + (-1)^HarmonicSums`Private`ExpVar* (-403/(160*HarmonicSums`Private`ExpVar^10) + 221/(640*HarmonicSums`Private`ExpVar^8) - 13/(160*HarmonicSums`Private`ExpVar^6) + 13/(320*HarmonicSums`Private`ExpVar^4) - 13/(160*HarmonicSums`Private`ExpVar^2) + 13/(80*HarmonicSums`Private`ExpVar))*z2^2 + ln2*(4*li4half + (17*z2^2)/8) + z2*(-173/(80*HarmonicSums`Private`ExpVar^10) - 1/(5*HarmonicSums`Private`ExpVar^9) + 19/(48*HarmonicSums`Private`ExpVar^8) + 5/(84*HarmonicSums`Private`ExpVar^7) - 7/(48*HarmonicSums`Private`ExpVar^6) - 1/(30*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + (5*z3)/16) - (331*z5)/32, S[-1, -2, 2, HarmonicSums`Private`ExpVar] :> 4*li5half + (2*ln2^5)/15 + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar)) - 162031/(33600*HarmonicSums`Private`ExpVar^10) + 12125/(6048*HarmonicSums`Private`ExpVar^9) + 1123/(1152*HarmonicSums`Private`ExpVar^8) - 829/(1680*HarmonicSums`Private`ExpVar^7) - 77/(144*HarmonicSums`Private`ExpVar^6) + 47/(60*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) - (2*ln2^3*z2)/3 + (-1)^HarmonicSums`Private`ExpVar* (-1581/(160*HarmonicSums`Private`ExpVar^10) + 867/(640*HarmonicSums`Private`ExpVar^8) - 51/(160*HarmonicSums`Private`ExpVar^6) + 51/(320*HarmonicSums`Private`ExpVar^4) - 51/(160*HarmonicSums`Private`ExpVar^2) + 51/(80*HarmonicSums`Private`ExpVar))*z2^2 + z2*(173/(40*HarmonicSums`Private`ExpVar^10) + 2/(5*HarmonicSums`Private`ExpVar^9) - 19/(24*HarmonicSums`Private`ExpVar^8) - 5/(42*HarmonicSums`Private`ExpVar^7) + 7/(24*HarmonicSums`Private`ExpVar^6) + 1/(15*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 5/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + (9*z3)/8) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/4) + ln2*(4*li4half - (7*z2^2)/10 + (-1)^HarmonicSums`Private`ExpVar* (217/(8*HarmonicSums`Private`ExpVar^10) - 119/(32*HarmonicSums`Private`ExpVar^8) + 7/(8*HarmonicSums`Private`ExpVar^6) - 7/(16*HarmonicSums`Private`ExpVar^4) + 7/(8*HarmonicSums`Private`ExpVar^2) - 7/(4*HarmonicSums`Private`ExpVar))*z3) - (259*z5)/64, S[-1, 2, -2, HarmonicSums`Private`ExpVar] :> -4*li5half - (2*ln2^5)/15 + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) - 237/(64*HarmonicSums`Private`ExpVar^10) - 2909/(1440*HarmonicSums`Private`ExpVar^9) + 323/(384*HarmonicSums`Private`ExpVar^8) + 53/(112*HarmonicSums`Private`ExpVar^7) - 7/(12*HarmonicSums`Private`ExpVar^6) + 11/(40*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + (2*ln2^3*z2)/3 + (-1)^HarmonicSums`Private`ExpVar* (527/(32*HarmonicSums`Private`ExpVar^10) - 289/(128*HarmonicSums`Private`ExpVar^8) + 17/(32*HarmonicSums`Private`ExpVar^6) - 17/(64*HarmonicSums`Private`ExpVar^4) + 17/(32*HarmonicSums`Private`ExpVar^2) - 17/(16*HarmonicSums`Private`ExpVar))*z2^2 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2 - (7*z3)/4) + z2*((-1)^HarmonicSums`Private`ExpVar* (-2297/(240*HarmonicSums`Private`ExpVar^10) + 103/(35*HarmonicSums`Private`ExpVar^9) + 443/(336*HarmonicSums`Private`ExpVar^8) - 31/(60*HarmonicSums`Private`ExpVar^7) - 77/(240*HarmonicSums`Private`ExpVar^6) + 1/(6*HarmonicSums`Private`ExpVar^5) + 11/(48*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) - (3*z3)/2) + ln2*(-4*li4half - (13*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (-217/(8*HarmonicSums`Private`ExpVar^10) + 119/(32*HarmonicSums`Private`ExpVar^8) - 7/(8*HarmonicSums`Private`ExpVar^6) + 7/(16*HarmonicSums`Private`ExpVar^4) - 7/(8*HarmonicSums`Private`ExpVar^2) + 7/(4*HarmonicSums`Private`ExpVar))*z3) + (129*z5)/16, S[-1, 2, 2, HarmonicSums`Private`ExpVar] :> -8*li5half - ln2^5/10 + (-1)^HarmonicSums`Private`ExpVar* (8849/(5040*HarmonicSums`Private`ExpVar^10) + 18629/(2520*HarmonicSums`Private`ExpVar^9) - 493/(2880*HarmonicSums`Private`ExpVar^8) - 937/(720*HarmonicSums`Private`ExpVar^7) - 17/(96*HarmonicSums`Private`ExpVar^6) + 15/(16*HarmonicSums`Private`ExpVar^5) - 17/(24*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) + (ln2^3*z2)/3 + (-1)^HarmonicSums`Private`ExpVar* (-217/(40*HarmonicSums`Private`ExpVar^10) + 119/(160*HarmonicSums`Private`ExpVar^8) - 7/(40*HarmonicSums`Private`ExpVar^6) + 7/(80*HarmonicSums`Private`ExpVar^4) - 7/(40*HarmonicSums`Private`ExpVar^2) + 7/(20*HarmonicSums`Private`ExpVar))*z2^2 + ln2*(-4*li4half - (51*z2^2)/40) + z2*((-1)^HarmonicSums`Private`ExpVar* (2297/(120*HarmonicSums`Private`ExpVar^10) - 206/(35*HarmonicSums`Private`ExpVar^9) - 443/(168*HarmonicSums`Private`ExpVar^8) + 31/(30*HarmonicSums`Private`ExpVar^7) + 77/(120*HarmonicSums`Private`ExpVar^6) - 1/(3*HarmonicSums`Private`ExpVar^5) - 11/(24*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2)) - z3/8) + (227*z5)/32, S[-1, -1, -3, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-3859/(288*HarmonicSums`Private`ExpVar^10) - 145/(48*HarmonicSums`Private`ExpVar^9) + 267/(128*HarmonicSums`Private`ExpVar^8) + 43/(96*HarmonicSums`Private`ExpVar^7) - 157/(192*HarmonicSums`Private`ExpVar^6) + 37/(96*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(-31/(48*HarmonicSums`Private`ExpVar^10) + 17/(192*HarmonicSums`Private`ExpVar^8) - 1/(48*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-31/(2*HarmonicSums`Private`ExpVar^10) + 17/(8*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar* (31/(20*HarmonicSums`Private`ExpVar^10) - 17/(80*HarmonicSums`Private`ExpVar^8) + 1/(20*HarmonicSums`Private`ExpVar^6) - 1/(40*HarmonicSums`Private`ExpVar^4) + 1/(20*HarmonicSums`Private`ExpVar^2) - 1/(10*HarmonicSums`Private`ExpVar))*z2^2 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 - (3*z3)/8) + (57/(256*HarmonicSums`Private`ExpVar^10) - 263/(640*HarmonicSums`Private`ExpVar^9) - 27/(512*HarmonicSums`Private`ExpVar^8) + 23/(224*HarmonicSums`Private`ExpVar^7) + 3/(128*HarmonicSums`Private`ExpVar^6) - 19/(320*HarmonicSums`Private`ExpVar^5) - 3/(128*HarmonicSums`Private`ExpVar^4) + 5/(32*HarmonicSums`Private`ExpVar^3) - 9/(32*HarmonicSums`Private`ExpVar^2) + 3/(8*HarmonicSums`Private`ExpVar))*z3 + (z2*z3)/8 + ln2*((19*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (-93/(16*HarmonicSums`Private`ExpVar^10) + 51/(64*HarmonicSums`Private`ExpVar^8) - 3/(16*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^2) + 3/(8*HarmonicSums`Private`ExpVar))*z3) - (15*z5)/8, S[-1, -1, 3, HarmonicSums`Private`ExpVar] :> 2*li5half - ln2^5/60 - 7819/(1920*HarmonicSums`Private`ExpVar^10) + 653/(1728*HarmonicSums`Private`ExpVar^9) + 643/(768*HarmonicSums`Private`ExpVar^8) - 47/(672*HarmonicSums`Private`ExpVar^7) - 25/(48*HarmonicSums`Private`ExpVar^6) + 25/(48*HarmonicSums`Private`ExpVar^5) - 9/(32*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) + (ln2^3*z2)/6 + (-1)^HarmonicSums`Private`ExpVar* (589/(160*HarmonicSums`Private`ExpVar^10) - 323/(640*HarmonicSums`Private`ExpVar^8) + 19/(160*HarmonicSums`Private`ExpVar^6) - 19/(320*HarmonicSums`Private`ExpVar^4) + 19/(160*HarmonicSums`Private`ExpVar^2) - 19/(80*HarmonicSums`Private`ExpVar))*z2^2 - (3*ln2^2*z3)/8 + (-19/(64*HarmonicSums`Private`ExpVar^10) + 263/(480*HarmonicSums`Private`ExpVar^9) + 9/(128*HarmonicSums`Private`ExpVar^8) - 23/(168*HarmonicSums`Private`ExpVar^7) - 1/(32*HarmonicSums`Private`ExpVar^6) + 19/(240*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))* z3 - (11*z2*z3)/8 + ln2*(z2^2/5 + (-1)^HarmonicSums`Private`ExpVar* (-93/(16*HarmonicSums`Private`ExpVar^10) + 51/(64*HarmonicSums`Private`ExpVar^8) - 3/(16*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^2) + 3/(8*HarmonicSums`Private`ExpVar))*z3) + (159*z5)/64, S[-1, 1, -3, HarmonicSums`Private`ExpVar] :> 4*li5half + ln2^5/20 + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (31/(48*HarmonicSums`Private`ExpVar^10) - 17/(192*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar)) - 3223/(640*HarmonicSums`Private`ExpVar^10) - 9571/(2880*HarmonicSums`Private`ExpVar^9) + 881/(768*HarmonicSums`Private`ExpVar^8) + 143/(224*HarmonicSums`Private`ExpVar^7) - 67/(96*HarmonicSums`Private`ExpVar^6) + 3/(10*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) - (ln2^3*z2)/6 + (-1)^HarmonicSums`Private`ExpVar* (-93/(16*HarmonicSums`Private`ExpVar^10) + 51/(64*HarmonicSums`Private`ExpVar^8) - 3/(16*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^2) + 3/(8*HarmonicSums`Private`ExpVar))*z2^2 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + z3/2) + (-1)^HarmonicSums`Private`ExpVar* (-3555/(256*HarmonicSums`Private`ExpVar^10) - 357/(128*HarmonicSums`Private`ExpVar^9) + 441/(256*HarmonicSums`Private`ExpVar^8) + 15/(32*HarmonicSums`Private`ExpVar^7) - 45/(128*HarmonicSums`Private`ExpVar^6) - 9/(64*HarmonicSums`Private`ExpVar^5) + 9/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2))*z3 + (-1)^HarmonicSums`Private`ExpVar*(93/(16*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^8) + 3/(16*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*sinf*z3 + (9*z2*z3)/8 + ln2*(2*li4half + z2^2/5 + (-1)^HarmonicSums`Private`ExpVar* (217/(16*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^6) - 7/(32*HarmonicSums`Private`ExpVar^4) + 7/(16*HarmonicSums`Private`ExpVar^2) - 7/(8*HarmonicSums`Private`ExpVar))*z3) - (153*z5)/32, S[-1, 1, 3, HarmonicSums`Private`ExpVar] :> 2*li5half + ln2^5/15 + (-1)^HarmonicSums`Private`ExpVar* (-1045/(288*HarmonicSums`Private`ExpVar^10) + 505/(144*HarmonicSums`Private`ExpVar^9) + 667/(1152*HarmonicSums`Private`ExpVar^8) - 167/(288*HarmonicSums`Private`ExpVar^7) - 73/(192*HarmonicSums`Private`ExpVar^6) + 61/(96*HarmonicSums`Private`ExpVar^5) - 19/(48*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) - (ln2^3*z2)/3 + (-1)^HarmonicSums`Private`ExpVar*(31/(40*HarmonicSums`Private`ExpVar^10) - 17/(160*HarmonicSums`Private`ExpVar^8) + 1/(40*HarmonicSums`Private`ExpVar^6) - 1/(80*HarmonicSums`Private`ExpVar^4) + 1/(40*HarmonicSums`Private`ExpVar^2) - 1/(20*HarmonicSums`Private`ExpVar))*z2^2 + ln2*(2*li4half + (19*z2^2)/40) + (ln2^2*z3)/2 + (-1)^HarmonicSums`Private`ExpVar* (1185/(64*HarmonicSums`Private`ExpVar^10) + 119/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z3 + (-1)^HarmonicSums`Private`ExpVar*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))* sinf*z3 - (7*z2*z3)/16 - (151*z5)/64, S[1, -3, -1, HarmonicSums`Private`ExpVar] :> -2*li5half + ln2^5/60 - 4591/(28800*HarmonicSums`Private`ExpVar^10) - 5893/(25920*HarmonicSums`Private`ExpVar^9) + 299/(2304*HarmonicSums`Private`ExpVar^8) + 5/(36*HarmonicSums`Private`ExpVar^7) - 167/(576*HarmonicSums`Private`ExpVar^6) + 389/(1440*HarmonicSums`Private`ExpVar^5) - 31/(192*HarmonicSums`Private`ExpVar^4) + 1/(18*HarmonicSums`Private`ExpVar^3) - (ln2^3*z2)/6 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-777/(16*HarmonicSums`Private`ExpVar^10) + 77/(8*HarmonicSums`Private`ExpVar^9) + 175/(32*HarmonicSums`Private`ExpVar^8) - 15/(8*HarmonicSums`Private`ExpVar^7) - 15/(16*HarmonicSums`Private`ExpVar^6) + 7/(8*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4)) - (17*z2^2)/20) + sinf*(-2*li4half - ln2^4/12 + (ln2^2*z2)/2 + (3*z2^2)/5) + (7*ln2^2*z3)/8 + (7*z2*z3)/8 + (15*z5)/32, S[1, -3, 1, HarmonicSums`Private`ExpVar] :> 4*li5half + 4*li4half*ln2 + (2*ln2^5)/15 + (-1)^HarmonicSums`Private`ExpVar* (-3843/(64*HarmonicSums`Private`ExpVar^10) + 175/(32*HarmonicSums`Private`ExpVar^9) + 175/(32*HarmonicSums`Private`ExpVar^8) - 15/(16*HarmonicSums`Private`ExpVar^7) - 5/(8*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5)) - (2*ln2^3*z2)/3 + (7*ln2^2*z3)/4 - (7*z2*z3)/8 + sinf*(2*li4half + ln2^4/12 + (-1)^HarmonicSums`Private`ExpVar* (777/(16*HarmonicSums`Private`ExpVar^10) - 77/(8*HarmonicSums`Private`ExpVar^9) - 175/(32*HarmonicSums`Private`ExpVar^8) + 15/(8*HarmonicSums`Private`ExpVar^7) + 15/(16*HarmonicSums`Private`ExpVar^6) - 7/(8*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4)) - (ln2^2*z2)/2 - (11*z2^2)/10 + (7*ln2*z3)/4) - (39*z5)/16, S[1, 3, -1, HarmonicSums`Private`ExpVar] :> 2*li5half - ln2^5/60 + (-1)^HarmonicSums`Private`ExpVar* (-333/(64*HarmonicSums`Private`ExpVar^10) - 245/(32*HarmonicSums`Private`ExpVar^9) + 77/(64*HarmonicSums`Private`ExpVar^8) + 35/(32*HarmonicSums`Private`ExpVar^7) - 5/(8*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5)) + (ln2^3*z2)/6 + ln2*(-187/(1200*HarmonicSums`Private`ExpVar^10) + 11/(72*HarmonicSums`Private`ExpVar^9) + 5/(72*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^7) - 7/(144*HarmonicSums`Private`ExpVar^6) + 7/(24*HarmonicSums`Private`ExpVar^5) - 7/(16*HarmonicSums`Private`ExpVar^4) + 5/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + (17*z2^2)/20) - (7*ln2^2*z3)/8 + sinf*(z2^2/8 - (7*ln2*z3)/4) - (125*z5)/64, S[1, 3, 1, HarmonicSums`Private`ExpVar] :> -2507/(9000*HarmonicSums`Private`ExpVar^10) + 5/(72*HarmonicSums`Private`ExpVar^9) + 203/(1728*HarmonicSums`Private`ExpVar^8) - 7/(144*HarmonicSums`Private`ExpVar^7) - 67/(864*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) + sinf*(187/(1200*HarmonicSums`Private`ExpVar^10) - 11/(72*HarmonicSums`Private`ExpVar^9) - 5/(72*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^7) + 7/(144*HarmonicSums`Private`ExpVar^6) - 7/(24*HarmonicSums`Private`ExpVar^5) + 7/(16*HarmonicSums`Private`ExpVar^4) - 5/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) + z2^2/2) - z5/2, S[1, -2, -2, HarmonicSums`Private`ExpVar] :> -31/(72*HarmonicSums`Private`ExpVar^10) - 265/(648*HarmonicSums`Private`ExpVar^9) + 15/(64*HarmonicSums`Private`ExpVar^8) + 197/(1008*HarmonicSums`Private`ExpVar^7) - 37/(96*HarmonicSums`Private`ExpVar^6) + 47/(144*HarmonicSums`Private`ExpVar^5) - 17/(96*HarmonicSums`Private`ExpVar^4) + 1/(18*HarmonicSums`Private`ExpVar^3) + (13*sinf*z2^2)/40 + z2*((-1)^HarmonicSums`Private`ExpVar* (-187/(16*HarmonicSums`Private`ExpVar^10) - 27/(4*HarmonicSums`Private`ExpVar^9) + 27/(16*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-7) - 7/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) - (5*z3)/8) + (41*z5)/32, S[1, -2, 2, HarmonicSums`Private`ExpVar] :> -4*li5half - 4*li4half*ln2 - (2*ln2^5)/15 + (-1)^HarmonicSums`Private`ExpVar* (-376213/(6720*HarmonicSums`Private`ExpVar^10) + 251/(96*HarmonicSums`Private`ExpVar^9) + 1093/(160*HarmonicSums`Private`ExpVar^8) - 43/(48*HarmonicSums`Private`ExpVar^7) - 37/(24*HarmonicSums`Private`ExpVar^6) + HarmonicSums`Private`ExpVar^ (-5) - 1/(4*HarmonicSums`Private`ExpVar^4)) + (2*ln2^3*z2)/3 + z2*((-1)^HarmonicSums`Private`ExpVar* (187/(8*HarmonicSums`Private`ExpVar^10) + 27/(2*HarmonicSums`Private`ExpVar^9) - 27/(8*HarmonicSums`Private`ExpVar^8) - 2/HarmonicSums`Private`ExpVar^7 + 7/(8*HarmonicSums`Private`ExpVar^6) + 1/(2*HarmonicSums`Private`ExpVar^5) - 5/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) + (5*z3)/16) - (7*ln2^2*z3)/4 + sinf*(-4*li4half - ln2^4/6 + ln2^2*z2 + (51*z2^2)/40 - (7*ln2*z3)/2) + (103*z5)/32, S[1, 2, -2, HarmonicSums`Private`ExpVar] :> 4*li5half + 4*li4half*ln2 + (2*ln2^5)/15 + (-1)^HarmonicSums`Private`ExpVar* (109/(64*HarmonicSums`Private`ExpVar^10) - 313/(32*HarmonicSums`Private`ExpVar^9) + 3/(4*HarmonicSums`Private`ExpVar^8) + 23/(16*HarmonicSums`Private`ExpVar^7) - 11/(16*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5)) - (2*ln2^3*z2)/3 + z2*(-11/(240*HarmonicSums`Private`ExpVar^10) - 11/(700*HarmonicSums`Private`ExpVar^9) + 3/(112*HarmonicSums`Private`ExpVar^8) + 19/(2205*HarmonicSums`Private`ExpVar^7) - 7/(240*HarmonicSums`Private`ExpVar^6) - 7/(900*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^4) - 17/(72*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) - z3) + (7*ln2^2*z3)/4 + sinf*(4*li4half + ln2^4/6 - ln2^2*z2 - (17*z2^2)/8 + (7*ln2*z3)/2) - (73*z5)/64, S[1, 2, 2, HarmonicSums`Private`ExpVar] :> -5917/(21000*HarmonicSums`Private`ExpVar^10) - 281/(22680*HarmonicSums`Private`ExpVar^9) + 10607/(60480*HarmonicSums`Private`ExpVar^8) - 17/(1680*HarmonicSums`Private`ExpVar^7) - 1321/(4320*HarmonicSums`Private`ExpVar^6) + 391/(720*HarmonicSums`Private`ExpVar^5) - 19/(32*HarmonicSums`Private`ExpVar^4) + 17/(36*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + (7*sinf*z2^2)/10 + z2*(11/(120*HarmonicSums`Private`ExpVar^10) + 11/(350*HarmonicSums`Private`ExpVar^9) - 3/(56*HarmonicSums`Private`ExpVar^8) - 38/(2205*HarmonicSums`Private`ExpVar^7) + 7/(120*HarmonicSums`Private`ExpVar^6) + 7/(450*HarmonicSums`Private`ExpVar^5) - 5/(24*HarmonicSums`Private`ExpVar^4) + 17/(36*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1) + 2*z3) - (11*z5)/2, S[1, -1, -3, HarmonicSums`Private`ExpVar] :> -2*li5half + ln2^5/60 - 5153/(3600*HarmonicSums`Private`ExpVar^10) - 3433/(6480*HarmonicSums`Private`ExpVar^9) + 527/(1152*HarmonicSums`Private`ExpVar^8) + 391/(2016*HarmonicSums`Private`ExpVar^7) - 271/(576*HarmonicSums`Private`ExpVar^6) + 551/(1440*HarmonicSums`Private`ExpVar^5) - 37/(192*HarmonicSums`Private`ExpVar^4) + 1/(18*HarmonicSums`Private`ExpVar^3) - (ln2^3*z2)/6 - (ln2*z2^2)/10 + (3*ln2^2*z3)/8 + (-1)^HarmonicSums`Private`ExpVar* (3555/(256*HarmonicSums`Private`ExpVar^10) - 459/(128*HarmonicSums`Private`ExpVar^9) - 441/(256*HarmonicSums`Private`ExpVar^8) + 21/(32*HarmonicSums`Private`ExpVar^7) + 45/(128*HarmonicSums`Private`ExpVar^6) - 15/(64*HarmonicSums`Private`ExpVar^5) - 9/(64*HarmonicSums`Private`ExpVar^4) + 9/(32*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2))*z3 + (13*z2*z3)/8 + sinf*(2*li4half + ln2^4/12 - (ln2^2*z2)/2 - z2^2/5 + (3*ln2*z3)/4) - (15*z5)/8, S[1, -1, 3, HarmonicSums`Private`ExpVar] :> -4*li5half - ln2^5/20 + (-1)^HarmonicSums`Private`ExpVar* (-11369/(384*HarmonicSums`Private`ExpVar^10) - 177/(64*HarmonicSums`Private`ExpVar^9) + 377/(96*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) - 35/(32*HarmonicSums`Private`ExpVar^6) + 9/(16*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) + (ln2^3*z2)/6 + ln2*(-2*li4half - (49*z2^2)/40) + (3*ln2^2*z3)/8 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(64*HarmonicSums`Private`ExpVar^10) + 153/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) - 7/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) + 5/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z3 - (13*z2*z3)/16 + sinf*((-19*z2^2)/40 + (3*ln2*z3)/4) + (47*z5)/8, S[1, 1, -3, HarmonicSums`Private`ExpVar] :> -2*li5half - 2*li4half*ln2 - ln2^5/15 + (-1)^HarmonicSums`Private`ExpVar* (1211/(128*HarmonicSums`Private`ExpVar^10) - 807/(64*HarmonicSums`Private`ExpVar^9) + 25/(64*HarmonicSums`Private`ExpVar^8) + 57/(32*HarmonicSums`Private`ExpVar^7) - 3/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5)) + (ln2^3*z2)/3 - (7*ln2^2*z3)/8 + (-(80*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(112*HarmonicSums`Private`ExpVar^7) - 1/(80*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 3/(8*HarmonicSums`Private`ExpVar))*z3 - (3*sinf^2*z3)/8 + (z2*z3)/8 + sinf*(-2*li4half - ln2^4/12 + (ln2^2*z2)/2 + (3*z2^2)/4 - (7*ln2*z3)/4) + (33*z5)/32, S[1, 1, 3, HarmonicSums`Private`ExpVar] :> -421/(2250*HarmonicSums`Private`ExpVar^10) - 937/(6480*HarmonicSums`Private`ExpVar^9) + 517/(3456*HarmonicSums`Private`ExpVar^8) + 167/(2016*HarmonicSums`Private`ExpVar^7) - 545/(1728*HarmonicSums`Private`ExpVar^6) + 599/(1440*HarmonicSums`Private`ExpVar^5) - 73/(192*HarmonicSums`Private`ExpVar^4) + 19/(72*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) - (sinf*z2^2)/10 + (1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))* z3 + (sinf^2*z3)/2 - (z2*z3)/2 + 2*z5, S[-2, -1, -1, -1, HarmonicSums`Private`ExpVar] :> -5*li5half + ln2^5/24 - 53041/(44800*HarmonicSums`Private`ExpVar^10) - 8935/(48384*HarmonicSums`Private`ExpVar^9) + 8423/(23040*HarmonicSums`Private`ExpVar^8) + 159/(2240*HarmonicSums`Private`ExpVar^7) - 427/(1152*HarmonicSums`Private`ExpVar^6) + 91/(240*HarmonicSums`Private`ExpVar^5) - 15/(64*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-17/(12*HarmonicSums`Private`ExpVar^9) + 1/(4*HarmonicSums`Private`ExpVar^7) - 1/(12*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2)) + (7*z2)/12) + ln2*((-1)^HarmonicSums`Private`ExpVar* (102037/(8960*HarmonicSums`Private`ExpVar^10) + 3385/(672*HarmonicSums`Private`ExpVar^9) - 499/(320*HarmonicSums`Private`ExpVar^8) - 893/(960*HarmonicSums`Private`ExpVar^7) + 67/(192*HarmonicSums`Private`ExpVar^6) + 23/(48*HarmonicSums`Private`ExpVar^5) - 9/(16*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-17/(4*HarmonicSums`Private`ExpVar^9) + 3/(4*HarmonicSums`Private`ExpVar^7) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 - (11*z2^2)/8) + (-1)^HarmonicSums`Private`ExpVar*(-17/(8*HarmonicSums`Private`ExpVar^9) + 3/(8*HarmonicSums`Private`ExpVar^7) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z3 + ln2^2*(97/(320*HarmonicSums`Private`ExpVar^10) + 13/(160*HarmonicSums`Private`ExpVar^9) - 1/(12*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) + 5/(96*HarmonicSums`Private`ExpVar^6) + 7/(240*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (21*z3)/16) + z2*(97/(320*HarmonicSums`Private`ExpVar^10) + 13/(160*HarmonicSums`Private`ExpVar^9) - 1/(12*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) + 5/(96*HarmonicSums`Private`ExpVar^6) + 7/(240*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (27*z3)/16) + (101*z5)/64, S[-2, -1, -1, 1, HarmonicSums`Private`ExpVar] :> -11*li5half - ln2^5/30 + (-1)^HarmonicSums`Private`ExpVar* (-73659031/(7526400*HarmonicSums`Private`ExpVar^10) + 615131/(141120*HarmonicSums`Private`ExpVar^9) + 31433/(19200*HarmonicSums`Private`ExpVar^8) - 31289/(57600*HarmonicSums`Private`ExpVar^7) - 1189/(2304*HarmonicSums`Private`ExpVar^6) + 25/(144*HarmonicSums`Private`ExpVar^5) + 9/(32*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-102037/(8960*HarmonicSums`Private`ExpVar^10) - 3385/(672*HarmonicSums`Private`ExpVar^9) + 499/(320*HarmonicSums`Private`ExpVar^8) + 893/(960*HarmonicSums`Private`ExpVar^7) - 67/(192*HarmonicSums`Private`ExpVar^6) - 23/(48*HarmonicSums`Private`ExpVar^5) + 9/(16*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3))*sinf + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-17/(12*HarmonicSums`Private`ExpVar^9) + 1/(4*HarmonicSums`Private`ExpVar^7) - 1/(12*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2)) + (7*z2)/12) + ln2*(-3*li4half + (-1)^HarmonicSums`Private`ExpVar* (-17/(4*HarmonicSums`Private`ExpVar^9) + 3/(4*HarmonicSums`Private`ExpVar^7) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 - (17*z2^2)/5) + z2*(-97/(320*HarmonicSums`Private`ExpVar^10) - 13/(160*HarmonicSums`Private`ExpVar^9) + 1/(12*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) - 5/(96*HarmonicSums`Private`ExpVar^6) - 7/(240*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - (21*z3)/16) + (-1)^HarmonicSums`Private`ExpVar*(119/(8*HarmonicSums`Private`ExpVar^9) - 21/(8*HarmonicSums`Private`ExpVar^7) + 7/(8*HarmonicSums`Private`ExpVar^5) - 7/(8*HarmonicSums`Private`ExpVar^3) + 7/(8*HarmonicSums`Private`ExpVar^2))*z3 + ln2^2*(97/(320*HarmonicSums`Private`ExpVar^10) + 13/(160*HarmonicSums`Private`ExpVar^9) - 1/(12*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) + 5/(96*HarmonicSums`Private`ExpVar^6) + 7/(240*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (21*z3)/16) + (845*z5)/64, S[-2, -1, 1, -1, HarmonicSums`Private`ExpVar] :> -7*li5half + ln2^5/60 + (-1)^HarmonicSums`Private`ExpVar* (-17525/(3072*HarmonicSums`Private`ExpVar^10) - 325/(384*HarmonicSums`Private`ExpVar^9) + 349/(384*HarmonicSums`Private`ExpVar^8) + 27/(128*HarmonicSums`Private`ExpVar^7) - 59/(128*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4)) + ln2^2*(-97/(320*HarmonicSums`Private`ExpVar^10) - 13/(160*HarmonicSums`Private`ExpVar^9) + 1/(12*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) - 5/(96*HarmonicSums`Private`ExpVar^6) - 7/(240*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) + ln2*(-97/(160*HarmonicSums`Private`ExpVar^10) - 13/(80*HarmonicSums`Private`ExpVar^9) + 1/(6*HarmonicSums`Private`ExpVar^8) + 23/(336*HarmonicSums`Private`ExpVar^7) - 5/(48*HarmonicSums`Private`ExpVar^6) - 7/(120*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(3*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*sinf + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-17/(12*HarmonicSums`Private`ExpVar^9) + 1/(4*HarmonicSums`Private`ExpVar^7) - 1/(12*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2)) - z2/3) + ln2*(-li4half + 8353/(9600*HarmonicSums`Private`ExpVar^10) + 195457/(302400*HarmonicSums`Private`ExpVar^9) - 719/(4032*HarmonicSums`Private`ExpVar^8) - 3877/(17640*HarmonicSums`Private`ExpVar^7) + 61/(720*HarmonicSums`Private`ExpVar^6) + 137/(900*HarmonicSums`Private`ExpVar^5) - 17/(96*HarmonicSums`Private`ExpVar^4) + 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (17/(4*HarmonicSums`Private`ExpVar^9) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2 - (87*z2^2)/40) + (-1)^HarmonicSums`Private`ExpVar*(17/(16*HarmonicSums`Private`ExpVar^9) - 3/(16*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z3 + (221*z5)/32, S[-2, -1, 1, 1, HarmonicSums`Private`ExpVar] :> -3*li5half + ln2^5/40 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (-17/(12*HarmonicSums`Private`ExpVar^9) + 1/(4*HarmonicSums`Private`ExpVar^7) - 1/(12*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2)) - 645341/(1512000*HarmonicSums`Private`ExpVar^10) + 36069767/(47628000*HarmonicSums`Private`ExpVar^9) + 302777/(1693440*HarmonicSums`Private`ExpVar^8) - 1473217/(7408800*HarmonicSums`Private`ExpVar^7) - 14999/(86400*HarmonicSums`Private`ExpVar^6) + 68699/(216000*HarmonicSums`Private`ExpVar^5) - 253/(1152*HarmonicSums`Private`ExpVar^4) + 43/(432*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (-8353/(9600*HarmonicSums`Private`ExpVar^10) - 195457/(302400*HarmonicSums`Private`ExpVar^9) + 719/(4032*HarmonicSums`Private`ExpVar^8) + 3877/(17640*HarmonicSums`Private`ExpVar^7) - 61/(720*HarmonicSums`Private`ExpVar^6) - 137/(900*HarmonicSums`Private`ExpVar^5) + 17/(96*HarmonicSums`Private`ExpVar^4) - 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*sinf + (97/(320*HarmonicSums`Private`ExpVar^10) + 13/(160*HarmonicSums`Private`ExpVar^9) - 1/(12*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) + 5/(96*HarmonicSums`Private`ExpVar^6) + 7/(240*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*sinf^2 + ln2*((-1)^HarmonicSums`Private`ExpVar* (17/(4*HarmonicSums`Private`ExpVar^9) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (9*z2^2)/40) + (-1)^HarmonicSums`Private`ExpVar* (-119/(16*HarmonicSums`Private`ExpVar^9) + 21/(16*HarmonicSums`Private`ExpVar^7) - 7/(16*HarmonicSums`Private`ExpVar^5) + 7/(16*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2))*z3 + z2*(97/(320*HarmonicSums`Private`ExpVar^10) + 13/(160*HarmonicSums`Private`ExpVar^9) - 1/(12*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) + 5/(96*HarmonicSums`Private`ExpVar^6) + 7/(240*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (21*z3)/16) - (23*z5)/64, S[-2, 1, -1, -1, HarmonicSums`Private`ExpVar] :> 7*li5half + ln2^5/15 + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (119/(16*HarmonicSums`Private`ExpVar^10) - 27/(4*HarmonicSums`Private`ExpVar^9) - 15/(16*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-7) + 3/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (68107961/(7526400*HarmonicSums`Private`ExpVar^10) + 31961/(7056*HarmonicSums`Private`ExpVar^9) - 11489/(9600*HarmonicSums`Private`ExpVar^8) - 43711/(57600*HarmonicSums`Private`ExpVar^7) + 223/(2304*HarmonicSums`Private`ExpVar^6) + 175/(288*HarmonicSums`Private`ExpVar^5) - 19/(32*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (17/(6*HarmonicSums`Private`ExpVar^9) - 1/(2*HarmonicSums`Private`ExpVar^7) + 1/(6*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(6*HarmonicSums`Private`ExpVar^2)) - (11*z2)/12) + (-1)^HarmonicSums`Private`ExpVar* (119/(16*HarmonicSums`Private`ExpVar^10) - 27/(4*HarmonicSums`Private`ExpVar^9) - 15/(16*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-7) + 3/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*z2 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (17/(4*HarmonicSums`Private`ExpVar^9) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*(17/(4*HarmonicSums`Private`ExpVar^9) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2) + ln2*(3*li4half - 1109/(640*HarmonicSums`Private`ExpVar^10) + 1003/(2880*HarmonicSums`Private`ExpVar^9) + 5/(12*HarmonicSums`Private`ExpVar^8) - 115/(672*HarmonicSums`Private`ExpVar^7) - 19/(96*HarmonicSums`Private`ExpVar^6) + 37/(120*HarmonicSums`Private`ExpVar^5) - 7/(32*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (17/(4*HarmonicSums`Private`ExpVar^9) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (53*z2^2)/40) + (-1)^HarmonicSums`Private`ExpVar* (-119/(16*HarmonicSums`Private`ExpVar^9) + 21/(16*HarmonicSums`Private`ExpVar^7) - 7/(16*HarmonicSums`Private`ExpVar^5) + 7/(16*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2))*z3 - (457*z5)/64, S[-2, 1, -1, 1, HarmonicSums`Private`ExpVar] :> 3*li5half - ln2^5/40 + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (119/(16*HarmonicSums`Private`ExpVar^10) - 27/(4*HarmonicSums`Private`ExpVar^9) - 15/(16*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-7) + 3/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) - 209369/(57600*HarmonicSums`Private`ExpVar^10) - 113339/(907200*HarmonicSums`Private`ExpVar^9) + 12305/(16128*HarmonicSums`Private`ExpVar^8) - 5741/(141120*HarmonicSums`Private`ExpVar^7) - 1757/(5760*HarmonicSums`Private`ExpVar^6) + 2897/(14400*HarmonicSums`Private`ExpVar^5) - 11/(384*HarmonicSums`Private`ExpVar^4) - 1/(36*HarmonicSums`Private`ExpVar^3) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (17/(6*HarmonicSums`Private`ExpVar^9) - 1/(2*HarmonicSums`Private`ExpVar^7) + 1/(6*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(6*HarmonicSums`Private`ExpVar^2)) - z2/4) + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (17/(4*HarmonicSums`Private`ExpVar^9) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + 1109/(640*HarmonicSums`Private`ExpVar^10) - 1003/(2880*HarmonicSums`Private`ExpVar^9) - 5/(12*HarmonicSums`Private`ExpVar^8) + 115/(672*HarmonicSums`Private`ExpVar^7) + 19/(96*HarmonicSums`Private`ExpVar^6) - 37/(120*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (-17/(4*HarmonicSums`Private`ExpVar^9) + 3/(4*HarmonicSums`Private`ExpVar^7) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2) + ln2*((-1)^HarmonicSums`Private`ExpVar* (-17/(4*HarmonicSums`Private`ExpVar^9) + 3/(4*HarmonicSums`Private`ExpVar^7) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (9*z2^2)/10) + z2*((-1)^HarmonicSums`Private`ExpVar* (-119/(16*HarmonicSums`Private`ExpVar^10) + 27/(4*HarmonicSums`Private`ExpVar^9) + 15/(16*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-7) - 3/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) - (3*z3)/16) + (-1)^HarmonicSums`Private`ExpVar*(17/(16*HarmonicSums`Private`ExpVar^9) - 3/(16*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z3 - (29*z5)/16, S[-2, 1, 1, -1, HarmonicSums`Private`ExpVar] :> -li5half + ln2^5/120 + 261/(640*HarmonicSums`Private`ExpVar^10) - 6563/(5760*HarmonicSums`Private`ExpVar^9) + 131/(1536*HarmonicSums`Private`ExpVar^8) + 87/(224*HarmonicSums`Private`ExpVar^7) - 61/(192*HarmonicSums`Private`ExpVar^6) + 11/(80*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + ((-1)^HarmonicSums`Private`ExpVar*ln2* (-119/(8*HarmonicSums`Private`ExpVar^10) + 27/(2*HarmonicSums`Private`ExpVar^9) + 15/(8*HarmonicSums`Private`ExpVar^8) - 2/HarmonicSums`Private`ExpVar^7 - 3/(8*HarmonicSums`Private`ExpVar^6) + 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (-17/(4*HarmonicSums`Private`ExpVar^9) + 3/(4*HarmonicSums`Private`ExpVar^7) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)))*sinf + (-1)^HarmonicSums`Private`ExpVar*ln2* (-17/(4*HarmonicSums`Private`ExpVar^9) + 3/(4*HarmonicSums`Private`ExpVar^7) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*sinf^2 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-17/(12*HarmonicSums`Private`ExpVar^9) + 1/(4*HarmonicSums`Private`ExpVar^7) - 1/(12*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2)) + z2/6) + ln2*((-1)^HarmonicSums`Private`ExpVar* (37889/(1120*HarmonicSums`Private`ExpVar^10) - 1783/(336*HarmonicSums`Private`ExpVar^9) - 1269/(320*HarmonicSums`Private`ExpVar^8) + 103/(240*HarmonicSums`Private`ExpVar^7) + 71/(96*HarmonicSums`Private`ExpVar^6) + 5/(48*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-17/(4*HarmonicSums`Private`ExpVar^9) + 3/(4*HarmonicSums`Private`ExpVar^7) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 - z2^2/20) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-119/(16*HarmonicSums`Private`ExpVar^10) + 27/(4*HarmonicSums`Private`ExpVar^9) + 15/(16*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-7) - 3/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (7*z3)/16) + (7*z2*z3)/16 + z5/8, S[-2, 1, 1, 1, HarmonicSums`Private`ExpVar] :> li5half + li4half*ln2 + ln2^5/30 + (-1)^HarmonicSums`Private`ExpVar* (1888703/(80640*HarmonicSums`Private`ExpVar^10) + 20323/(5760*HarmonicSums`Private`ExpVar^9) - 12541/(5760*HarmonicSums`Private`ExpVar^8) - 43/(64*HarmonicSums`Private`ExpVar^7) + 19/(96*HarmonicSums`Private`ExpVar^6) + 17/(48*HarmonicSums`Private`ExpVar^5) - 5/(24*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* (119/(16*HarmonicSums`Private`ExpVar^10) - 27/(4*HarmonicSums`Private`ExpVar^9) - 15/(16*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-7) + 3/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*sinf^2 + (-1)^HarmonicSums`Private`ExpVar*(17/(12*HarmonicSums`Private`ExpVar^9) - 1/(4*HarmonicSums`Private`ExpVar^7) + 1/(12*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2))*sinf^3 - (ln2^3*z2)/6 + sinf*((-1)^HarmonicSums`Private`ExpVar* (-37889/(1120*HarmonicSums`Private`ExpVar^10) + 1783/(336*HarmonicSums`Private`ExpVar^9) + 1269/(320*HarmonicSums`Private`ExpVar^8) - 103/(240*HarmonicSums`Private`ExpVar^7) - 71/(96*HarmonicSums`Private`ExpVar^6) - 5/(48*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*(17/(4*HarmonicSums`Private`ExpVar^9) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2) + z2*((-1)^HarmonicSums`Private`ExpVar* (119/(16*HarmonicSums`Private`ExpVar^10) - 27/(4*HarmonicSums`Private`ExpVar^9) - 15/(16*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-7) + 3/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) - (7*z3)/16) + (7*ln2^2*z3)/16 + (-1)^HarmonicSums`Private`ExpVar*(17/(6*HarmonicSums`Private`ExpVar^9) - 1/(2*HarmonicSums`Private`ExpVar^7) + 1/(6*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(6*HarmonicSums`Private`ExpVar^2))*z3 - (27*z5)/32, S[2, -1, -1, -1, HarmonicSums`Private`ExpVar] :> 8*li5half + (7*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar* (-816661/(53760*HarmonicSums`Private`ExpVar^10) - 57/(640*HarmonicSums`Private`ExpVar^9) + 4213/(1920*HarmonicSums`Private`ExpVar^8) - 23/(384*HarmonicSums`Private`ExpVar^7) - 71/(96*HarmonicSums`Private`ExpVar^6) + 15/(32*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* ln2^2*(629/(64*HarmonicSums`Private`ExpVar^10) + 39/(16*HarmonicSums`Private`ExpVar^9) - 11/(8*HarmonicSums`Private`ExpVar^8) - 13/(32*HarmonicSums`Private`ExpVar^7) + 11/(32*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + ln2^3*(-(180*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(252*HarmonicSums`Private`ExpVar^7) - 1/(180*HarmonicSums`Private`ExpVar^5) + 1/(36*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar) - (13*z2)/12) + ln2*(3*li4half - 22529/(134400*HarmonicSums`Private`ExpVar^10) + 1669/(13440*HarmonicSums`Private`ExpVar^9) + 643/(10080*HarmonicSums`Private`ExpVar^8) - 611/(6720*HarmonicSums`Private`ExpVar^7) - 137/(2880*HarmonicSums`Private`ExpVar^6) + 113/(480*HarmonicSums`Private`ExpVar^5) - 35/(96*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + (-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 + (11*z2^2)/8) + z2*((-1)^HarmonicSums`Private`ExpVar* (629/(64*HarmonicSums`Private`ExpVar^10) + 39/(16*HarmonicSums`Private`ExpVar^9) - 11/(8*HarmonicSums`Private`ExpVar^8) - 13/(32*HarmonicSums`Private`ExpVar^7) + 11/(32*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) - (3*z3)/8) + (-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))* z3 - (61*z5)/8, S[2, -1, -1, 1, HarmonicSums`Private`ExpVar] :> 4*li5half - ln2^5/30 + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (629/(64*HarmonicSums`Private`ExpVar^10) + 39/(16*HarmonicSums`Private`ExpVar^9) - 11/(8*HarmonicSums`Private`ExpVar^8) - 13/(32*HarmonicSums`Private`ExpVar^7) + 11/(32*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) - 21375899/(37632000*HarmonicSums`Private`ExpVar^10) + 1414159/(33868800*HarmonicSums`Private`ExpVar^9) + 301391/(1411200*HarmonicSums`Private`ExpVar^8) - 94261/(2822400*HarmonicSums`Private`ExpVar^7) - 9467/(57600*HarmonicSums`Private`ExpVar^6) + 3599/(28800*HarmonicSums`Private`ExpVar^5) + 131/(1152*HarmonicSums`Private`ExpVar^4) - 17/(48*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) + (22529/(134400*HarmonicSums`Private`ExpVar^10) - 1669/(13440*HarmonicSums`Private`ExpVar^9) - 643/(10080*HarmonicSums`Private`ExpVar^8) + 611/(6720*HarmonicSums`Private`ExpVar^7) + 137/(2880*HarmonicSums`Private`ExpVar^6) - 113/(480*HarmonicSums`Private`ExpVar^5) + 35/(96*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*sinf + ln2^3*(-(180*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(252*HarmonicSums`Private`ExpVar^7) - 1/(180*HarmonicSums`Private`ExpVar^5) + 1/(36*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar) - (5*z2)/12) + (-1)^HarmonicSums`Private`ExpVar* (-629/(64*HarmonicSums`Private`ExpVar^10) - 39/(16*HarmonicSums`Private`ExpVar^9) + 11/(8*HarmonicSums`Private`ExpVar^8) + 13/(32*HarmonicSums`Private`ExpVar^7) - 11/(32*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3))*z2 + ln2*((-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 + (19*z2^2)/20) + (7/(120*HarmonicSums`Private`ExpVar^9) - 1/(24*HarmonicSums`Private`ExpVar^7) + 7/(120*HarmonicSums`Private`ExpVar^5) - 7/(24*HarmonicSums`Private`ExpVar^3) + 7/(8*HarmonicSums`Private`ExpVar^2) - 7/(4*HarmonicSums`Private`ExpVar))* z3 - (29*z5)/16, S[2, -1, 1, -1, HarmonicSums`Private`ExpVar] :> 4*li5half - ln2^5/30 - 1861/(15360*HarmonicSums`Private`ExpVar^10) - 23951/(69120*HarmonicSums`Private`ExpVar^9) + 57/(512*HarmonicSums`Private`ExpVar^8) + 485/(2688*HarmonicSums`Private`ExpVar^7) - 107/(384*HarmonicSums`Private`ExpVar^6) + 217/(960*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* ln2*(-629/(32*HarmonicSums`Private`ExpVar^10) - 39/(8*HarmonicSums`Private`ExpVar^9) + 11/(4*HarmonicSums`Private`ExpVar^8) + 13/(16*HarmonicSums`Private`ExpVar^7) - 11/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3))*sinf + ln2^3*(-(180*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(252*HarmonicSums`Private`ExpVar^7) - 1/(180*HarmonicSums`Private`ExpVar^5) + 1/(36*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar) + z2/3) + ln2*((-1)^HarmonicSums`Private`ExpVar* (2007/(128*HarmonicSums`Private`ExpVar^10) + 187/(16*HarmonicSums`Private`ExpVar^9) - 59/(32*HarmonicSums`Private`ExpVar^8) - 55/(32*HarmonicSums`Private`ExpVar^7) + 3/(8*HarmonicSums`Private`ExpVar^6) + 7/(16*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4)) + (1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2 + (83*z2^2)/40) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-629/(64*HarmonicSums`Private`ExpVar^10) - 39/(16*HarmonicSums`Private`ExpVar^9) + 11/(8*HarmonicSums`Private`ExpVar^8) + 13/(32*HarmonicSums`Private`ExpVar^7) - 11/(32*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) - (21*z3)/16) + (1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z3 - (21*z2*z3)/16 - (85*z5)/64, S[2, -1, 1, 1, HarmonicSums`Private`ExpVar] :> 6*li5half - ln2^5/120 + (-1)^HarmonicSums`Private`ExpVar* (-340973/(26880*HarmonicSums`Private`ExpVar^10) + 6203/(640*HarmonicSums`Private`ExpVar^9) + 1649/(960*HarmonicSums`Private`ExpVar^8) - 241/(192*HarmonicSums`Private`ExpVar^7) - 11/(24*HarmonicSums`Private`ExpVar^6) + 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) + ln2^3*(-(180*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(252*HarmonicSums`Private`ExpVar^7) - 1/(180*HarmonicSums`Private`ExpVar^5) + 1/(36*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-2007/(128*HarmonicSums`Private`ExpVar^10) - 187/(16*HarmonicSums`Private`ExpVar^9) + 59/(32*HarmonicSums`Private`ExpVar^8) + 55/(32*HarmonicSums`Private`ExpVar^7) - 3/(8*HarmonicSums`Private`ExpVar^6) - 7/(16*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4))*sinf + (-1)^HarmonicSums`Private`ExpVar* (629/(64*HarmonicSums`Private`ExpVar^10) + 39/(16*HarmonicSums`Private`ExpVar^9) - 11/(8*HarmonicSums`Private`ExpVar^8) - 13/(32*HarmonicSums`Private`ExpVar^7) + 11/(32*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*sinf^2 + (-1)^HarmonicSums`Private`ExpVar* (629/(64*HarmonicSums`Private`ExpVar^10) + 39/(16*HarmonicSums`Private`ExpVar^9) - 11/(8*HarmonicSums`Private`ExpVar^8) - 13/(32*HarmonicSums`Private`ExpVar^7) + 11/(32*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*z2 + ln2*(li4half + (1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2 + (17*z2^2)/8) - (21*ln2^2*z3)/16 + (-7/(240*HarmonicSums`Private`ExpVar^9) + 1/(48*HarmonicSums`Private`ExpVar^7) - 7/(240*HarmonicSums`Private`ExpVar^5) + 7/(48*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2) + 7/(8*HarmonicSums`Private`ExpVar))*z3 - (61*z5)/8, S[2, 1, -1, -1, HarmonicSums`Private`ExpVar] :> 2*li5half - ln2^5/60 - 7707997/(112896000*HarmonicSums`Private`ExpVar^10) - 413309/(6773760*HarmonicSums`Private`ExpVar^9) + 1113173/(16934400*HarmonicSums`Private`ExpVar^8) + 19043/(403200*HarmonicSums`Private`ExpVar^7) - 36589/(172800*HarmonicSums`Private`ExpVar^6) + 2057/(5760*HarmonicSums`Private`ExpVar^5) - 247/(576*HarmonicSums`Private`ExpVar^4) + 19/(48*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + ln2^3*(1/(90*HarmonicSums`Private`ExpVar^9) - 1/(126*HarmonicSums`Private`ExpVar^7) + 1/(90*HarmonicSums`Private`ExpVar^5) - 1/(18*HarmonicSums`Private`ExpVar^3) + 1/(6*HarmonicSums`Private`ExpVar^2) - 1/(3*HarmonicSums`Private`ExpVar) + (11*z2)/12) + sinf*(ln2^2*(1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2) + ln2*((-1)^HarmonicSums`Private`ExpVar* (-2331/(128*HarmonicSums`Private`ExpVar^10) + 27/(16*HarmonicSums`Private`ExpVar^9) + 155/(64*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^7) - 9/(16*HarmonicSums`Private`ExpVar^6) + 7/(16*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) + (1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2 + (49*z2^2)/40) + ln2^2*(7/(240*HarmonicSums`Private`ExpVar^10) - 11/(700*HarmonicSums`Private`ExpVar^9) - 5/(336*HarmonicSums`Private`ExpVar^8) + 19/(2205*HarmonicSums`Private`ExpVar^7) + 1/(80*HarmonicSums`Private`ExpVar^6) - 7/(900*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) - (7*z3)/16) + z2*(7/(240*HarmonicSums`Private`ExpVar^10) - 11/(700*HarmonicSums`Private`ExpVar^9) - 5/(336*HarmonicSums`Private`ExpVar^8) + 19/(2205*HarmonicSums`Private`ExpVar^7) + 1/(80*HarmonicSums`Private`ExpVar^6) - 7/(900*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) - (7*z3)/16) + (-7/(240*HarmonicSums`Private`ExpVar^9) + 1/(48*HarmonicSums`Private`ExpVar^7) - 7/(240*HarmonicSums`Private`ExpVar^5) + 7/(48*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2) + 7/(8*HarmonicSums`Private`ExpVar))*z3 - (23*z5)/64, S[2, 1, -1, 1, HarmonicSums`Private`ExpVar] :> -4*li5half - (11*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar* (-6583/(256*HarmonicSums`Private`ExpVar^10) - 357/(128*HarmonicSums`Private`ExpVar^9) + 197/(64*HarmonicSums`Private`ExpVar^8) + 3/(16*HarmonicSums`Private`ExpVar^7) - 5/(8*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5)) + ln2^3*(1/(90*HarmonicSums`Private`ExpVar^9) - 1/(126*HarmonicSums`Private`ExpVar^7) + 1/(90*HarmonicSums`Private`ExpVar^5) - 1/(18*HarmonicSums`Private`ExpVar^3) + 1/(6*HarmonicSums`Private`ExpVar^2) - 1/(3*HarmonicSums`Private`ExpVar) + (11*z2)/12) + sinf*((-1)^HarmonicSums`Private`ExpVar* (2331/(128*HarmonicSums`Private`ExpVar^10) - 27/(16*HarmonicSums`Private`ExpVar^9) - 155/(64*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^7) + 9/(16*HarmonicSums`Private`ExpVar^6) - 7/(16*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) + ln2^2*(1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2) + ln2*(-3*li4half + (-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 - (4*z2^2)/5) + ln2^2*(7/(240*HarmonicSums`Private`ExpVar^10) - 11/(700*HarmonicSums`Private`ExpVar^9) - 5/(336*HarmonicSums`Private`ExpVar^8) + 19/(2205*HarmonicSums`Private`ExpVar^7) + 1/(80*HarmonicSums`Private`ExpVar^6) - 7/(900*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) - (7*z3)/16) + z2*(-7/(240*HarmonicSums`Private`ExpVar^10) + 11/(700*HarmonicSums`Private`ExpVar^9) + 5/(336*HarmonicSums`Private`ExpVar^8) - 19/(2205*HarmonicSums`Private`ExpVar^7) - 1/(80*HarmonicSums`Private`ExpVar^6) + 7/(900*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) + (5*z3)/8) + (1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z3 + (35*z5)/32, S[2, 1, 1, -1, HarmonicSums`Private`ExpVar] :> -4*li5half - ln2^5/120 + (-1)^HarmonicSums`Private`ExpVar* (1183/(256*HarmonicSums`Private`ExpVar^10) - 501/(128*HarmonicSums`Private`ExpVar^9) - 5/(32*HarmonicSums`Private`ExpVar^8) + 51/(64*HarmonicSums`Private`ExpVar^7) - 11/(32*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^5)) + ln2^2*(-7/(240*HarmonicSums`Private`ExpVar^10) + 11/(700*HarmonicSums`Private`ExpVar^9) + 5/(336*HarmonicSums`Private`ExpVar^8) - 19/(2205*HarmonicSums`Private`ExpVar^7) - 1/(80*HarmonicSums`Private`ExpVar^6) + 7/(900*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + (ln2^2*(-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + ln2*(-7/(120*HarmonicSums`Private`ExpVar^10) + 11/(350*HarmonicSums`Private`ExpVar^9) + 5/(168*HarmonicSums`Private`ExpVar^8) - 38/(2205*HarmonicSums`Private`ExpVar^7) - 1/(40*HarmonicSums`Private`ExpVar^6) + 7/(450*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(36*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)))*sinf + ln2*(-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))* sinf^2 + ln2^3*(-(180*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(252*HarmonicSums`Private`ExpVar^7) - 1/(180*HarmonicSums`Private`ExpVar^5) + 1/(36*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar) - z2/3) + ln2*(-li4half + 429/(5600*HarmonicSums`Private`ExpVar^10) + 329171/(7938000*HarmonicSums`Private`ExpVar^9) - 1243/(35280*HarmonicSums`Private`ExpVar^8) - 137353/(3704400*HarmonicSums`Private`ExpVar^7) + 21/(800*HarmonicSums`Private`ExpVar^6) + 5743/(54000*HarmonicSums`Private`ExpVar^5) - 83/(288*HarmonicSums`Private`ExpVar^4) + 97/(216*HarmonicSums`Private`ExpVar^3) - 5/(8*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1) + (-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 - (12*z2^2)/5) + 4*z5, S[2, 1, 1, 1, HarmonicSums`Private`ExpVar] :> -951241/(15876000*HarmonicSums`Private`ExpVar^10) + 249423079/(5000940000*HarmonicSums`Private`ExpVar^9) + 956807/(19756800*HarmonicSums`Private`ExpVar^8) - 44711503/(1555848000*HarmonicSums`Private`ExpVar^7) - 45103/(432000*HarmonicSums`Private`ExpVar^6) + 626209/(3240000*HarmonicSums`Private`ExpVar^5) - 367/(3456*HarmonicSums`Private`ExpVar^4) - 221/(1296*HarmonicSums`Private`ExpVar^3) + 9/(16*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1) + (7/(240*HarmonicSums`Private`ExpVar^10) - 11/(700*HarmonicSums`Private`ExpVar^9) - 5/(336*HarmonicSums`Private`ExpVar^8) + 19/(2205*HarmonicSums`Private`ExpVar^7) + 1/(80*HarmonicSums`Private`ExpVar^6) - 7/(900*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))* sinf^2 + (1/(180*HarmonicSums`Private`ExpVar^9) - 1/(252*HarmonicSums`Private`ExpVar^7) + 1/(180*HarmonicSums`Private`ExpVar^5) - 1/(36*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar))*sinf^3 + (7/(240*HarmonicSums`Private`ExpVar^10) - 11/(700*HarmonicSums`Private`ExpVar^9) - 5/(336*HarmonicSums`Private`ExpVar^8) + 19/(2205*HarmonicSums`Private`ExpVar^7) + 1/(80*HarmonicSums`Private`ExpVar^6) - 7/(900*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))* z2 + sinf*(-429/(5600*HarmonicSums`Private`ExpVar^10) - 329171/(7938000*HarmonicSums`Private`ExpVar^9) + 1243/(35280*HarmonicSums`Private`ExpVar^8) + 137353/(3704400*HarmonicSums`Private`ExpVar^7) - 21/(800*HarmonicSums`Private`ExpVar^6) - 5743/(54000*HarmonicSums`Private`ExpVar^5) + 83/(288*HarmonicSums`Private`ExpVar^4) - 97/(216*HarmonicSums`Private`ExpVar^3) + 5/(8*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1) + (1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2) + (1/(90*HarmonicSums`Private`ExpVar^9) - 1/(126*HarmonicSums`Private`ExpVar^7) + 1/(90*HarmonicSums`Private`ExpVar^5) - 1/(18*HarmonicSums`Private`ExpVar^3) + 1/(6*HarmonicSums`Private`ExpVar^2) - 1/(3*HarmonicSums`Private`ExpVar))* z3 + 4*z5, S[-1, -2, -1, -1, HarmonicSums`Private`ExpVar] :> 13*li5half + (7*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar)) - 826519/(268800*HarmonicSums`Private`ExpVar^10) + 66671/(120960*HarmonicSums`Private`ExpVar^9) + 2939/(4608*HarmonicSums`Private`ExpVar^8) - 1471/(13440*HarmonicSums`Private`ExpVar^7) - 479/(1152*HarmonicSums`Private`ExpVar^6) + 221/(480*HarmonicSums`Private`ExpVar^5) - 17/(64*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) - (17*ln2^3*z2)/12 + (-1)^HarmonicSums`Private`ExpVar* (-217/(20*HarmonicSums`Private`ExpVar^10) + 119/(80*HarmonicSums`Private`ExpVar^8) - 7/(20*HarmonicSums`Private`ExpVar^6) + 7/(40*HarmonicSums`Private`ExpVar^4) - 7/(20*HarmonicSums`Private`ExpVar^2) + 7/(10*HarmonicSums`Private`ExpVar))*z2^2 + z2*(173/(80*HarmonicSums`Private`ExpVar^10) + 1/(5*HarmonicSums`Private`ExpVar^9) - 19/(48*HarmonicSums`Private`ExpVar^8) - 5/(84*HarmonicSums`Private`ExpVar^7) + 7/(48*HarmonicSums`Private`ExpVar^6) + 1/(30*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (21*z3)/16) + ln2^2*(173/(80*HarmonicSums`Private`ExpVar^10) + 1/(5*HarmonicSums`Private`ExpVar^9) - 19/(48*HarmonicSums`Private`ExpVar^8) - 5/(84*HarmonicSums`Private`ExpVar^7) + 7/(48*HarmonicSums`Private`ExpVar^6) + 1/(30*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (21*z3)/16) + ln2*(4*li4half + (-1)^HarmonicSums`Private`ExpVar* (11/(80*HarmonicSums`Private`ExpVar^10) + 883/(210*HarmonicSums`Private`ExpVar^9) - 1/(448*HarmonicSums`Private`ExpVar^8) - 383/(480*HarmonicSums`Private`ExpVar^7) - 7/(240*HarmonicSums`Private`ExpVar^6) + 11/(24*HarmonicSums`Private`ExpVar^5) - 17/(48*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (21*z2^2)/8 + (-1)^HarmonicSums`Private`ExpVar* (651/(32*HarmonicSums`Private`ExpVar^10) - 357/(128*HarmonicSums`Private`ExpVar^8) + 21/(32*HarmonicSums`Private`ExpVar^6) - 21/(64*HarmonicSums`Private`ExpVar^4) + 21/(32*HarmonicSums`Private`ExpVar^2) - 21/(16*HarmonicSums`Private`ExpVar))*z3) - (911*z5)/64, S[-1, -2, -1, 1, HarmonicSums`Private`ExpVar] :> 13*li5half + (7*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar* (-2671031/(302400*HarmonicSums`Private`ExpVar^10) + 2355979/(705600*HarmonicSums`Private`ExpVar^9) + 677423/(564480*HarmonicSums`Private`ExpVar^8) - 551/(1200*HarmonicSums`Private`ExpVar^7) - 9317/(28800*HarmonicSums`Private`ExpVar^6) + 125/(576*HarmonicSums`Private`ExpVar^5) + 7/(288*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + ln2^2*(173/(80*HarmonicSums`Private`ExpVar^10) + 1/(5*HarmonicSums`Private`ExpVar^9) - 19/(48*HarmonicSums`Private`ExpVar^8) - 5/(84*HarmonicSums`Private`ExpVar^7) + 7/(48*HarmonicSums`Private`ExpVar^6) + 1/(30*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(93/(4*HarmonicSums`Private`ExpVar^10) - 51/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-11/(80*HarmonicSums`Private`ExpVar^10) - 883/(210*HarmonicSums`Private`ExpVar^9) + 1/(448*HarmonicSums`Private`ExpVar^8) + 383/(480*HarmonicSums`Private`ExpVar^7) + 7/(240*HarmonicSums`Private`ExpVar^6) - 11/(24*HarmonicSums`Private`ExpVar^5) + 17/(48*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3))*sinf - (2*ln2^3*z2)/3 + (-173/(80*HarmonicSums`Private`ExpVar^10) - 1/(5*HarmonicSums`Private`ExpVar^9) + 19/(48*HarmonicSums`Private`ExpVar^8) + 5/(84*HarmonicSums`Private`ExpVar^7) - 7/(48*HarmonicSums`Private`ExpVar^6) - 1/(30*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-1209/(160*HarmonicSums`Private`ExpVar^10) + 663/(640*HarmonicSums`Private`ExpVar^8) - 39/(160*HarmonicSums`Private`ExpVar^6) + 39/(320*HarmonicSums`Private`ExpVar^4) - 39/(160*HarmonicSums`Private`ExpVar^2) + 39/(80*HarmonicSums`Private`ExpVar))*z2^2 + ln2*(4*li4half + (27*z2^2)/8) - (911*z5)/64, S[-1, -2, 1, -1, HarmonicSums`Private`ExpVar] :> 3*li5half + ln2^5/60 + (-1)^HarmonicSums`Private`ExpVar* (-23323/(5760*HarmonicSums`Private`ExpVar^10) - 2591/(1680*HarmonicSums`Private`ExpVar^9) + 3743/(5376*HarmonicSums`Private`ExpVar^8) + 113/(320*HarmonicSums`Private`ExpVar^7) - 821/(1920*HarmonicSums`Private`ExpVar^6) + 37/(192*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^4)) + ln2*(-173/(40*HarmonicSums`Private`ExpVar^10) - 2/(5*HarmonicSums`Private`ExpVar^9) + 19/(24*HarmonicSums`Private`ExpVar^8) + 5/(42*HarmonicSums`Private`ExpVar^7) - 7/(24*HarmonicSums`Private`ExpVar^6) - 1/(15*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 5/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*sinf + (3*ln2^3*z2)/4 + (-1)^HarmonicSums`Private`ExpVar* (-93/(160*HarmonicSums`Private`ExpVar^10) + 51/(640*HarmonicSums`Private`ExpVar^8) - 3/(160*HarmonicSums`Private`ExpVar^6) + 3/(320*HarmonicSums`Private`ExpVar^4) - 3/(160*HarmonicSums`Private`ExpVar^2) + 3/(80*HarmonicSums`Private`ExpVar))*z2^2 + ln2^2*(-173/(80*HarmonicSums`Private`ExpVar^10) - 1/(5*HarmonicSums`Private`ExpVar^9) + 19/(48*HarmonicSums`Private`ExpVar^8) + 5/(84*HarmonicSums`Private`ExpVar^7) - 7/(48*HarmonicSums`Private`ExpVar^6) - 1/(30*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-93/(16*HarmonicSums`Private`ExpVar^10) + 51/(64*HarmonicSums`Private`ExpVar^8) - 3/(16*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^2) + 3/(8*HarmonicSums`Private`ExpVar))*z2) + ln2*(li4half + 476/(75*HarmonicSums`Private`ExpVar^10) + 56641/(37800*HarmonicSums`Private`ExpVar^9) - 239/(252*HarmonicSums`Private`ExpVar^8) - 5783/(17640*HarmonicSums`Private`ExpVar^7) + 23/(90*HarmonicSums`Private`ExpVar^6) + 221/(1800*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^4) - 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + z2^2/40) - (99*z5)/32, S[-1, -2, 1, 1, HarmonicSums`Private`ExpVar] :> li5half + ln2^5/30 + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(31/(96*HarmonicSums`Private`ExpVar^10) - 17/(384*HarmonicSums`Private`ExpVar^8) + 1/(96*HarmonicSums`Private`ExpVar^6) - 1/(192*HarmonicSums`Private`ExpVar^4) + 1/(96*HarmonicSums`Private`ExpVar^2) - 1/(48*HarmonicSums`Private`ExpVar)) + 1376123/(864000*HarmonicSums`Private`ExpVar^10) + 412880647/(190512000*HarmonicSums`Private`ExpVar^9) - 27683/(3386880*HarmonicSums`Private`ExpVar^8) - 6041041/(14817600*HarmonicSums`Private`ExpVar^7) - 7123/(43200*HarmonicSums`Private`ExpVar^6) + 21199/(54000*HarmonicSums`Private`ExpVar^5) - 37/(144*HarmonicSums`Private`ExpVar^4) + 47/(432*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (-476/(75*HarmonicSums`Private`ExpVar^10) - 56641/(37800*HarmonicSums`Private`ExpVar^9) + 239/(252*HarmonicSums`Private`ExpVar^8) + 5783/(17640*HarmonicSums`Private`ExpVar^7) - 23/(90*HarmonicSums`Private`ExpVar^6) - 221/(1800*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^4) + 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*sinf + (173/(80*HarmonicSums`Private`ExpVar^10) + 1/(5*HarmonicSums`Private`ExpVar^9) - 19/(48*HarmonicSums`Private`ExpVar^8) - 5/(84*HarmonicSums`Private`ExpVar^7) + 7/(48*HarmonicSums`Private`ExpVar^6) + 1/(30*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*sinf^2 - (ln2^3*z2)/6 + (-1)^HarmonicSums`Private`ExpVar* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z2^2 + z2*(173/(80*HarmonicSums`Private`ExpVar^10) + 1/(5*HarmonicSums`Private`ExpVar^9) - 19/(48*HarmonicSums`Private`ExpVar^8) - 5/(84*HarmonicSums`Private`ExpVar^7) + 7/(48*HarmonicSums`Private`ExpVar^6) + 1/(30*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (7*z3)/16) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/16) + ln2*(li4half - (6*z2^2)/5 + (-1)^HarmonicSums`Private`ExpVar* (217/(32*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^6) - 7/(64*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3) + (81*z5)/64, S[-1, 2, -1, -1, HarmonicSums`Private`ExpVar] :> -16*li5half - ln2^5/30 + (-1)^HarmonicSums`Private`ExpVar* (-2403/(1792*HarmonicSums`Private`ExpVar^10) + 68309/(20160*HarmonicSums`Private`ExpVar^9) + 9869/(40320*HarmonicSums`Private`ExpVar^8) - 3229/(5760*HarmonicSums`Private`ExpVar^7) - 167/(640*HarmonicSums`Private`ExpVar^6) + 107/(192*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(-31/(96*HarmonicSums`Private`ExpVar^10) + 17/(384*HarmonicSums`Private`ExpVar^8) - 1/(96*HarmonicSums`Private`ExpVar^6) + 1/(192*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + (7*ln2^3*z2)/6 + (-1)^HarmonicSums`Private`ExpVar* (2297/(240*HarmonicSums`Private`ExpVar^10) - 103/(35*HarmonicSums`Private`ExpVar^9) - 443/(336*HarmonicSums`Private`ExpVar^8) + 31/(60*HarmonicSums`Private`ExpVar^7) + 77/(240*HarmonicSums`Private`ExpVar^6) - 1/(6*HarmonicSums`Private`ExpVar^5) - 11/(48*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-31/(160*HarmonicSums`Private`ExpVar^10) + 17/(640*HarmonicSums`Private`ExpVar^8) - 1/(160*HarmonicSums`Private`ExpVar^6) + 1/(320*HarmonicSums`Private`ExpVar^4) - 1/(160*HarmonicSums`Private`ExpVar^2) + 1/(80*HarmonicSums`Private`ExpVar))*z2^2 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (2297/(240*HarmonicSums`Private`ExpVar^10) - 103/(35*HarmonicSums`Private`ExpVar^9) - 443/(336*HarmonicSums`Private`ExpVar^8) + 31/(60*HarmonicSums`Private`ExpVar^7) + 77/(240*HarmonicSums`Private`ExpVar^6) - 1/(6*HarmonicSums`Private`ExpVar^5) - 11/(48*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-155/(16*HarmonicSums`Private`ExpVar^10) + 85/(64*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^4) - 5/(16*HarmonicSums`Private`ExpVar^2) + 5/(8*HarmonicSums`Private`ExpVar))*z2) + ln2*(-4*li4half - 209/(64*HarmonicSums`Private`ExpVar^10) + 473/(360*HarmonicSums`Private`ExpVar^9) + 39/(64*HarmonicSums`Private`ExpVar^8) - 253/(672*HarmonicSums`Private`ExpVar^7) - 7/(32*HarmonicSums`Private`ExpVar^6) + 23/(60*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) - (81*z2^2)/20) + (245*z5)/16, S[-1, 2, -1, 1, HarmonicSums`Private`ExpVar] :> -14*li5half - ln2^5/20 + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) - 7777/(1152*HarmonicSums`Private`ExpVar^10) + 1176071/(1814400*HarmonicSums`Private`ExpVar^9) + 11647/(10752*HarmonicSums`Private`ExpVar^8) - 24113/(141120*HarmonicSums`Private`ExpVar^7) - 311/(960*HarmonicSums`Private`ExpVar^6) + 749/(3600*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(36*HarmonicSums`Private`ExpVar^3) + (209/(64*HarmonicSums`Private`ExpVar^10) - 473/(360*HarmonicSums`Private`ExpVar^9) - 39/(64*HarmonicSums`Private`ExpVar^8) + 253/(672*HarmonicSums`Private`ExpVar^7) + 7/(32*HarmonicSums`Private`ExpVar^6) - 23/(60*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3))*sinf + (7*ln2^3*z2)/12 + (-1)^HarmonicSums`Private`ExpVar*(31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1))* z2^2 + z2*((-1)^HarmonicSums`Private`ExpVar* (-2297/(240*HarmonicSums`Private`ExpVar^10) + 103/(35*HarmonicSums`Private`ExpVar^9) + 443/(336*HarmonicSums`Private`ExpVar^8) - 31/(60*HarmonicSums`Private`ExpVar^7) - 77/(240*HarmonicSums`Private`ExpVar^6) + 1/(6*HarmonicSums`Private`ExpVar^5) + 11/(48*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) - (21*z3)/16) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (2297/(240*HarmonicSums`Private`ExpVar^10) - 103/(35*HarmonicSums`Private`ExpVar^9) - 443/(336*HarmonicSums`Private`ExpVar^8) + 31/(60*HarmonicSums`Private`ExpVar^7) + 77/(240*HarmonicSums`Private`ExpVar^6) - 1/(6*HarmonicSums`Private`ExpVar^5) - 11/(48*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 - (21*z3)/16) + ln2*(-4*li4half - (49*z2^2)/20 + (-1)^HarmonicSums`Private`ExpVar* (-651/(32*HarmonicSums`Private`ExpVar^10) + 357/(128*HarmonicSums`Private`ExpVar^8) - 21/(32*HarmonicSums`Private`ExpVar^6) + 21/(64*HarmonicSums`Private`ExpVar^4) - 21/(32*HarmonicSums`Private`ExpVar^2) + 21/(16*HarmonicSums`Private`ExpVar))*z3) + (521*z5)/32, S[-1, 2, 1, -1, HarmonicSums`Private`ExpVar] :> -(ln2^5/8) + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) - 331/(640*HarmonicSums`Private`ExpVar^10) - 999/(640*HarmonicSums`Private`ExpVar^9) + 401/(1536*HarmonicSums`Private`ExpVar^8) + 3/(7*HarmonicSums`Private`ExpVar^7) - 35/(96*HarmonicSums`Private`ExpVar^6) + 3/(20*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + (-1)^HarmonicSums`Private`ExpVar* ln2*(-2297/(120*HarmonicSums`Private`ExpVar^10) + 206/(35*HarmonicSums`Private`ExpVar^9) + 443/(168*HarmonicSums`Private`ExpVar^8) - 31/(30*HarmonicSums`Private`ExpVar^7) - 77/(120*HarmonicSums`Private`ExpVar^6) + 1/(3*HarmonicSums`Private`ExpVar^5) + 11/(24*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2))*sinf + (-1)^HarmonicSums`Private`ExpVar*(93/(10*HarmonicSums`Private`ExpVar^10) - 51/(40*HarmonicSums`Private`ExpVar^8) + 3/(10*HarmonicSums`Private`ExpVar^6) - 3/(20*HarmonicSums`Private`ExpVar^4) + 3/(10*HarmonicSums`Private`ExpVar^2) - 3/(5*HarmonicSums`Private`ExpVar))*z2^2 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-2297/(240*HarmonicSums`Private`ExpVar^10) + 103/(35*HarmonicSums`Private`ExpVar^9) + 443/(336*HarmonicSums`Private`ExpVar^8) - 31/(60*HarmonicSums`Private`ExpVar^7) - 77/(240*HarmonicSums`Private`ExpVar^6) + 1/(6*HarmonicSums`Private`ExpVar^5) + 11/(48*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (93/(8*HarmonicSums`Private`ExpVar^10) - 51/(32*HarmonicSums`Private`ExpVar^8) + 3/(8*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^2) - 3/(4*HarmonicSums`Private`ExpVar))*z2 - (21*z3)/16) - (21*z2*z3)/16 + ln2*(-3*li4half + (-1)^HarmonicSums`Private`ExpVar* (37027/(1400*HarmonicSums`Private`ExpVar^10) - 4687/(29400*HarmonicSums`Private`ExpVar^9) - 205967/(70560*HarmonicSums`Private`ExpVar^8) - 317/(1800*HarmonicSums`Private`ExpVar^7) + 839/(1800*HarmonicSums`Private`ExpVar^6) + 11/(72*HarmonicSums`Private`ExpVar^5) - 11/(144*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2)) + (6*z2^2)/5 + (-1)^HarmonicSums`Private`ExpVar* (-217/(32*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^6) + 7/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3) + (87*z5)/32, S[-1, 2, 1, 1, HarmonicSums`Private`ExpVar] :> -4*li5half - (11*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar* (986046181/(63504000*HarmonicSums`Private`ExpVar^10) + 79915441/(24696000*HarmonicSums`Private`ExpVar^9) - 82874779/(59270400*HarmonicSums`Private`ExpVar^8) - 105967/(216000*HarmonicSums`Private`ExpVar^7) + 38153/(432000*HarmonicSums`Private`ExpVar^6) + 659/(1728*HarmonicSums`Private`ExpVar^5) - 437/(864*HarmonicSums`Private`ExpVar^4) + 9/(16*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-37027/(1400*HarmonicSums`Private`ExpVar^10) + 4687/(29400*HarmonicSums`Private`ExpVar^9) + 205967/(70560*HarmonicSums`Private`ExpVar^8) + 317/(1800*HarmonicSums`Private`ExpVar^7) - 839/(1800*HarmonicSums`Private`ExpVar^6) - 11/(72*HarmonicSums`Private`ExpVar^5) + 11/(144*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2))*sinf + (-1)^HarmonicSums`Private`ExpVar* (2297/(240*HarmonicSums`Private`ExpVar^10) - 103/(35*HarmonicSums`Private`ExpVar^9) - 443/(336*HarmonicSums`Private`ExpVar^8) + 31/(60*HarmonicSums`Private`ExpVar^7) + 77/(240*HarmonicSums`Private`ExpVar^6) - 1/(6*HarmonicSums`Private`ExpVar^5) - 11/(48*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*sinf^2 + (5*ln2^3*z2)/12 + (-1)^HarmonicSums`Private`ExpVar* (-93/(10*HarmonicSums`Private`ExpVar^10) + 51/(40*HarmonicSums`Private`ExpVar^8) - 3/(10*HarmonicSums`Private`ExpVar^6) + 3/(20*HarmonicSums`Private`ExpVar^4) - 3/(10*HarmonicSums`Private`ExpVar^2) + 3/(5*HarmonicSums`Private`ExpVar))*z2^2 + ln2*(-3*li4half - z2^2/8) + z2*((-1)^HarmonicSums`Private`ExpVar* (2297/(240*HarmonicSums`Private`ExpVar^10) - 103/(35*HarmonicSums`Private`ExpVar^9) - 443/(336*HarmonicSums`Private`ExpVar^8) + 31/(60*HarmonicSums`Private`ExpVar^7) + 77/(240*HarmonicSums`Private`ExpVar^6) - 1/(6*HarmonicSums`Private`ExpVar^5) - 11/(48*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (7*z3)/8) - (7*ln2^2*z3)/8 + (81*z5)/64, S[-1, -1, -2, -1, HarmonicSums`Private`ExpVar] :> -11*li5half - (3*ln2^5)/40 + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) - 301993/(134400*HarmonicSums`Private`ExpVar^10) - 30209/(120960*HarmonicSums`Private`ExpVar^9) + 15643/(32256*HarmonicSums`Private`ExpVar^8) + 61/(560*HarmonicSums`Private`ExpVar^7) - 1099/(2880*HarmonicSums`Private`ExpVar^6) + 149/(480*HarmonicSums`Private`ExpVar^5) - 29/(192*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3) + (5*ln2^3*z2)/6 + (-1)^HarmonicSums`Private`ExpVar* (217/(20*HarmonicSums`Private`ExpVar^10) - 119/(80*HarmonicSums`Private`ExpVar^8) + 7/(20*HarmonicSums`Private`ExpVar^6) - 7/(40*HarmonicSums`Private`ExpVar^4) + 7/(20*HarmonicSums`Private`ExpVar^2) - 7/(10*HarmonicSums`Private`ExpVar))*z2^2 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - (13*z3)/8) + (95/(512*HarmonicSums`Private`ExpVar^10) - 263/(768*HarmonicSums`Private`ExpVar^9) - 45/(1024*HarmonicSums`Private`ExpVar^8) + 115/(1344*HarmonicSums`Private`ExpVar^7) + 5/(256*HarmonicSums`Private`ExpVar^6) - 19/(384*HarmonicSums`Private`ExpVar^5) - 5/(256*HarmonicSums`Private`ExpVar^4) + 25/(192*HarmonicSums`Private`ExpVar^3) - 15/(64*HarmonicSums`Private`ExpVar^2) + 5/(16*HarmonicSums`Private`ExpVar))*z3 - (13*z2*z3)/8 + ln2*(-4*li4half + (-1)^HarmonicSums`Private`ExpVar* (-1167/(160*HarmonicSums`Private`ExpVar^10) + 9281/(1680*HarmonicSums`Private`ExpVar^9) + 1207/(1344*HarmonicSums`Private`ExpVar^8) - 87/(80*HarmonicSums`Private`ExpVar^7) - 91/(480*HarmonicSums`Private`ExpVar^6) + 29/(48*HarmonicSums`Private`ExpVar^5) - 19/(48*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (-57/(128*HarmonicSums`Private`ExpVar^10) + 263/(320*HarmonicSums`Private`ExpVar^9) + 27/(256*HarmonicSums`Private`ExpVar^8) - 23/(112*HarmonicSums`Private`ExpVar^7) - 3/(64*HarmonicSums`Private`ExpVar^6) + 19/(160*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) - 5/(16*HarmonicSums`Private`ExpVar^3) + 9/(16*HarmonicSums`Private`ExpVar^2) - 3/(4*HarmonicSums`Private`ExpVar))*z2 - (41*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (-155/(32*HarmonicSums`Private`ExpVar^10) + 85/(128*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^2) + 5/(16*HarmonicSums`Private`ExpVar))*z3) + (845*z5)/64, S[-1, -1, -2, 1, HarmonicSums`Private`ExpVar] :> -5*li5half - ln2^5/8 + (-1)^HarmonicSums`Private`ExpVar* (-20479771/(1209600*HarmonicSums`Private`ExpVar^10) + 5785907/(1411200*HarmonicSums`Private`ExpVar^9) + 44803/(23520*HarmonicSums`Private`ExpVar^8) - 9023/(14400*HarmonicSums`Private`ExpVar^7) - 4859/(14400*HarmonicSums`Private`ExpVar^6) + 59/(288*HarmonicSums`Private`ExpVar^5) + 11/(288*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (1167/(160*HarmonicSums`Private`ExpVar^10) - 9281/(1680*HarmonicSums`Private`ExpVar^9) - 1207/(1344*HarmonicSums`Private`ExpVar^8) + 87/(80*HarmonicSums`Private`ExpVar^7) + 91/(480*HarmonicSums`Private`ExpVar^6) - 29/(48*HarmonicSums`Private`ExpVar^5) + 19/(48*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3))*sinf + (7*ln2^3*z2)/12 + (-1)^HarmonicSums`Private`ExpVar* (279/(160*HarmonicSums`Private`ExpVar^10) - 153/(640*HarmonicSums`Private`ExpVar^8) + 9/(160*HarmonicSums`Private`ExpVar^6) - 9/(320*HarmonicSums`Private`ExpVar^4) + 9/(160*HarmonicSums`Private`ExpVar^2) - 9/(80*HarmonicSums`Private`ExpVar))*z2^2 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (93/(16*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^8) + 3/(16*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*z2 - (13*z3)/8) + (95/(512*HarmonicSums`Private`ExpVar^10) - 263/(768*HarmonicSums`Private`ExpVar^9) - 45/(1024*HarmonicSums`Private`ExpVar^8) + 115/(1344*HarmonicSums`Private`ExpVar^7) + 5/(256*HarmonicSums`Private`ExpVar^6) - 19/(384*HarmonicSums`Private`ExpVar^5) - 5/(256*HarmonicSums`Private`ExpVar^4) + 25/(192*HarmonicSums`Private`ExpVar^3) - 15/(64*HarmonicSums`Private`ExpVar^2) + 5/(16*HarmonicSums`Private`ExpVar))*z3 + z2*z3 + ln2*(-4*li4half + z2^2/40 + (-1)^HarmonicSums`Private`ExpVar* (-155/(32*HarmonicSums`Private`ExpVar^10) + 85/(128*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^2) + 5/(16*HarmonicSums`Private`ExpVar))*z3) + (101*z5)/64, S[-1, -1, 2, -1, HarmonicSums`Private`ExpVar] :> 8*li5half - ln2^5/40 + (-1)^HarmonicSums`Private`ExpVar* (-56033/(11520*HarmonicSums`Private`ExpVar^10) - 11533/(4480*HarmonicSums`Private`ExpVar^9) + 2417/(2688*HarmonicSums`Private`ExpVar^8) + 457/(960*HarmonicSums`Private`ExpVar^7) - 121/(240*HarmonicSums`Private`ExpVar^6) + 5/(24*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar)) - (ln2^3*z2)/3 + (-1)^HarmonicSums`Private`ExpVar* (-155/(16*HarmonicSums`Private`ExpVar^10) + 85/(64*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^4) - 5/(16*HarmonicSums`Private`ExpVar^2) + 5/(8*HarmonicSums`Private`ExpVar))*z2^2 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + z3/8) + (-19/(256*HarmonicSums`Private`ExpVar^10) + 263/(1920*HarmonicSums`Private`ExpVar^9) + 9/(512*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) - 1/(128*HarmonicSums`Private`ExpVar^6) + 19/(960*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - 5/(96*HarmonicSums`Private`ExpVar^3) + 3/(32*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z3 + (z2*z3)/8 + ln2*(li4half + 38237/(16800*HarmonicSums`Private`ExpVar^10) + 563/(336*HarmonicSums`Private`ExpVar^9) - 383/(1008*HarmonicSums`Private`ExpVar^8) - 781/(1680*HarmonicSums`Private`ExpVar^7) + 179/(1440*HarmonicSums`Private`ExpVar^6) + 33/(80*HarmonicSums`Private`ExpVar^5) - 59/(96*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + (57/(128*HarmonicSums`Private`ExpVar^10) - 263/(320*HarmonicSums`Private`ExpVar^9) - 27/(256*HarmonicSums`Private`ExpVar^8) + 23/(112*HarmonicSums`Private`ExpVar^7) + 3/(64*HarmonicSums`Private`ExpVar^6) - 19/(160*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 5/(16*HarmonicSums`Private`ExpVar^3) - 9/(16*HarmonicSums`Private`ExpVar^2) + 3/(4*HarmonicSums`Private`ExpVar))*z2 + (47*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z3) - (61*z5)/8, S[-1, -1, 2, 1, HarmonicSums`Private`ExpVar] :> 4*li5half + ln2^5/120 + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(31/(96*HarmonicSums`Private`ExpVar^10) - 17/(384*HarmonicSums`Private`ExpVar^8) + 1/(96*HarmonicSums`Private`ExpVar^6) - 1/(192*HarmonicSums`Private`ExpVar^4) + 1/(96*HarmonicSums`Private`ExpVar^2) - 1/(48*HarmonicSums`Private`ExpVar)) - 1800439/(2352000*HarmonicSums`Private`ExpVar^10) + 619807/(423360*HarmonicSums`Private`ExpVar^9) + 69997/(282240*HarmonicSums`Private`ExpVar^8) - 53197/(235200*HarmonicSums`Private`ExpVar^7) - 3961/(28800*HarmonicSums`Private`ExpVar^6) + 33/(1600*HarmonicSums`Private`ExpVar^5) + 371/(1152*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) + (-38237/(16800*HarmonicSums`Private`ExpVar^10) - 563/(336*HarmonicSums`Private`ExpVar^9) + 383/(1008*HarmonicSums`Private`ExpVar^8) + 781/(1680*HarmonicSums`Private`ExpVar^7) - 179/(1440*HarmonicSums`Private`ExpVar^6) - 33/(80*HarmonicSums`Private`ExpVar^5) + 59/(96*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*sinf + (ln2^3*z2)/12 + (-1)^HarmonicSums`Private`ExpVar* (31/(160*HarmonicSums`Private`ExpVar^10) - 17/(640*HarmonicSums`Private`ExpVar^8) + 1/(160*HarmonicSums`Private`ExpVar^6) - 1/(320*HarmonicSums`Private`ExpVar^4) + 1/(160*HarmonicSums`Private`ExpVar^2) - 1/(80*HarmonicSums`Private`ExpVar))*z2^2 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 + z3/8) + (-19/(32*HarmonicSums`Private`ExpVar^10) + 263/(240*HarmonicSums`Private`ExpVar^9) + 9/(64*HarmonicSums`Private`ExpVar^8) - 23/(84*HarmonicSums`Private`ExpVar^7) - 1/(16*HarmonicSums`Private`ExpVar^6) + 19/(120*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 5/(12*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1))* z3 + (z2*z3)/8 + ln2*(li4half + (9*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z3) - (29*z5)/16, S[-1, -1, -1, -2, HarmonicSums`Private`ExpVar] :> 3*li5half - ln2^5/40 - 129169/(44800*HarmonicSums`Private`ExpVar^10) - 98507/(120960*HarmonicSums`Private`ExpVar^9) + 21317/(32256*HarmonicSums`Private`ExpVar^8) + 1483/(6720*HarmonicSums`Private`ExpVar^7) - 359/(720*HarmonicSums`Private`ExpVar^6) + 173/(480*HarmonicSums`Private`ExpVar^5) - 31/(192*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3) + (ln2^3*z2)/12 + (-1)^HarmonicSums`Private`ExpVar*(93/(20*HarmonicSums`Private`ExpVar^10) - 51/(80*HarmonicSums`Private`ExpVar^8) + 3/(20*HarmonicSums`Private`ExpVar^6) - 3/(40*HarmonicSums`Private`ExpVar^4) + 3/(20*HarmonicSums`Private`ExpVar^2) - 3/(10*HarmonicSums`Private`ExpVar))*z2^2 + z2*((-1)^HarmonicSums`Private`ExpVar* (-100969/(15360*HarmonicSums`Private`ExpVar^10) + 4213/(17920*HarmonicSums`Private`ExpVar^9) + 9923/(10752*HarmonicSums`Private`ExpVar^8) - 91/(1920*HarmonicSums`Private`ExpVar^7) - 901/(3840*HarmonicSums`Private`ExpVar^6) + 5/(384*HarmonicSums`Private`ExpVar^5) + 37/(192*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) - (3*z3)/4) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 - z3/2) + (-247/(512*HarmonicSums`Private`ExpVar^10) + 3419/(3840*HarmonicSums`Private`ExpVar^9) + 117/(1024*HarmonicSums`Private`ExpVar^8) - 299/(1344*HarmonicSums`Private`ExpVar^7) - 13/(256*HarmonicSums`Private`ExpVar^6) + 247/(1920*HarmonicSums`Private`ExpVar^5) + 13/(256*HarmonicSums`Private`ExpVar^4) - 65/(192*HarmonicSums`Private`ExpVar^3) + 39/(64*HarmonicSums`Private`ExpVar^2) - 13/(16*HarmonicSums`Private`ExpVar))*z3 + ln2*((19/(64*HarmonicSums`Private`ExpVar^10) - 263/(480*HarmonicSums`Private`ExpVar^9) - 9/(128*HarmonicSums`Private`ExpVar^8) + 23/(168*HarmonicSums`Private`ExpVar^7) + 1/(32*HarmonicSums`Private`ExpVar^6) - 19/(240*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 + (3*z2^2)/8 + (-1)^HarmonicSums`Private`ExpVar* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z3) + (29*z5)/64, S[-1, -1, -1, 2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-12283/(960*HarmonicSums`Private`ExpVar^10) + 33997/(10080*HarmonicSums`Private`ExpVar^9) + 147271/(80640*HarmonicSums`Private`ExpVar^8) - 1997/(2880*HarmonicSums`Private`ExpVar^7) - 1271/(1920*HarmonicSums`Private`ExpVar^6) + 155/(192*HarmonicSums`Private`ExpVar^5) - 7/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) + (ln2^3*z2)/12 + (-1)^HarmonicSums`Private`ExpVar*(93/(32*HarmonicSums`Private`ExpVar^10) - 51/(128*HarmonicSums`Private`ExpVar^8) + 3/(32*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^2) - 3/(16*HarmonicSums`Private`ExpVar))*z2^2 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 - z3/2) + z2*((-1)^HarmonicSums`Private`ExpVar* (100969/(7680*HarmonicSums`Private`ExpVar^10) - 4213/(8960*HarmonicSums`Private`ExpVar^9) - 9923/(5376*HarmonicSums`Private`ExpVar^8) + 91/(960*HarmonicSums`Private`ExpVar^7) + 901/(1920*HarmonicSums`Private`ExpVar^6) - 5/(192*HarmonicSums`Private`ExpVar^5) - 37/(96*HarmonicSums`Private`ExpVar^4) + 7/(16*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) - (3*z3)/8) + (19/(64*HarmonicSums`Private`ExpVar^10) - 263/(480*HarmonicSums`Private`ExpVar^9) - 9/(128*HarmonicSums`Private`ExpVar^8) + 23/(168*HarmonicSums`Private`ExpVar^7) + 1/(32*HarmonicSums`Private`ExpVar^6) - 19/(240*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))* z3 + ln2*((-19/(128*HarmonicSums`Private`ExpVar^10) + 263/(960*HarmonicSums`Private`ExpVar^9) + 9/(256*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) - 1/(64*HarmonicSums`Private`ExpVar^6) + 19/(480*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (3*z2^2)/5 + (-1)^HarmonicSums`Private`ExpVar* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z3) - z5, S[-1, -1, 1, -2, HarmonicSums`Private`ExpVar] :> li5half + ln2^5/30 + (-1)^HarmonicSums`Private`ExpVar* (-8669/(2880*HarmonicSums`Private`ExpVar^10) - 13337/(3360*HarmonicSums`Private`ExpVar^9) + 1523/(1792*HarmonicSums`Private`ExpVar^8) + 689/(960*HarmonicSums`Private`ExpVar^7) - 1151/(1920*HarmonicSums`Private`ExpVar^6) + 43/(192*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(-31/(48*HarmonicSums`Private`ExpVar^10) + 17/(192*HarmonicSums`Private`ExpVar^8) - 1/(48*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-31/(2*HarmonicSums`Private`ExpVar^10) + 17/(8*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) - (ln2^3*z2)/12 + (19/(128*HarmonicSums`Private`ExpVar^10) - 263/(960*HarmonicSums`Private`ExpVar^9) - 9/(256*HarmonicSums`Private`ExpVar^8) + 23/(336*HarmonicSums`Private`ExpVar^7) + 1/(64*HarmonicSums`Private`ExpVar^6) - 19/(480*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*sinf*z2 + (-1)^HarmonicSums`Private`ExpVar*(31/(20*HarmonicSums`Private`ExpVar^10) - 17/(80*HarmonicSums`Private`ExpVar^8) + 1/(20*HarmonicSums`Private`ExpVar^6) - 1/(40*HarmonicSums`Private`ExpVar^4) + 1/(20*HarmonicSums`Private`ExpVar^2) - 1/(10*HarmonicSums`Private`ExpVar))*z2^2 + z2*(-19403/(15360*HarmonicSums`Private`ExpVar^10) + 44769/(89600*HarmonicSums`Private`ExpVar^9) + 9889/(43008*HarmonicSums`Private`ExpVar^8) - 439/(4410*HarmonicSums`Private`ExpVar^7) - 299/(3840*HarmonicSums`Private`ExpVar^6) + 1207/(28800*HarmonicSums`Private`ExpVar^5) + 47/(768*HarmonicSums`Private`ExpVar^4) - 23/(288*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar) + (3*z3)/8) - (ln2^2*z3)/16 + (19/(512*HarmonicSums`Private`ExpVar^10) - 263/(3840*HarmonicSums`Private`ExpVar^9) - 9/(1024*HarmonicSums`Private`ExpVar^8) + 23/(1344*HarmonicSums`Private`ExpVar^7) + 1/(256*HarmonicSums`Private`ExpVar^6) - 19/(1920*HarmonicSums`Private`ExpVar^5) - 1/(256*HarmonicSums`Private`ExpVar^4) + 5/(192*HarmonicSums`Private`ExpVar^3) - 3/(64*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3 + ln2*(li4half + (3*z2^2)/5 + (-1)^HarmonicSums`Private`ExpVar* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3) - (125*z5)/32, S[-1, -1, 1, 2, HarmonicSums`Private`ExpVar] :> 4*li5half + ln2^5/120 + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(31/(96*HarmonicSums`Private`ExpVar^10) - 17/(384*HarmonicSums`Private`ExpVar^8) + 1/(96*HarmonicSums`Private`ExpVar^6) - 1/(192*HarmonicSums`Private`ExpVar^4) + 1/(96*HarmonicSums`Private`ExpVar^2) - 1/(48*HarmonicSums`Private`ExpVar)) + 2272441/(14112000*HarmonicSums`Private`ExpVar^10) + 6785243/(4233600*HarmonicSums`Private`ExpVar^9) + 204793/(3386880*HarmonicSums`Private`ExpVar^8) - 40067/(100800*HarmonicSums`Private`ExpVar^7) - 4703/(21600*HarmonicSums`Private`ExpVar^6) + 113/(160*HarmonicSums`Private`ExpVar^5) - 439/(576*HarmonicSums`Private`ExpVar^4) + 13/(24*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) - (ln2^3*z2)/12 + (-19/(64*HarmonicSums`Private`ExpVar^10) + 263/(480*HarmonicSums`Private`ExpVar^9) + 9/(128*HarmonicSums`Private`ExpVar^8) - 23/(168*HarmonicSums`Private`ExpVar^7) - 1/(32*HarmonicSums`Private`ExpVar^6) + 19/(240*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))* sinf*z2 + (-1)^HarmonicSums`Private`ExpVar* (31/(80*HarmonicSums`Private`ExpVar^10) - 17/(320*HarmonicSums`Private`ExpVar^8) + 1/(80*HarmonicSums`Private`ExpVar^6) - 1/(160*HarmonicSums`Private`ExpVar^4) + 1/(80*HarmonicSums`Private`ExpVar^2) - 1/(40*HarmonicSums`Private`ExpVar))*z2^2 + z2*(19403/(7680*HarmonicSums`Private`ExpVar^10) - 44769/(44800*HarmonicSums`Private`ExpVar^9) - 9889/(21504*HarmonicSums`Private`ExpVar^8) + 439/(2205*HarmonicSums`Private`ExpVar^7) + 299/(1920*HarmonicSums`Private`ExpVar^6) - 1207/(14400*HarmonicSums`Private`ExpVar^5) - 47/(384*HarmonicSums`Private`ExpVar^4) + 23/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) - (15*z3)/16) - (ln2^2*z3)/16 + (19/(64*HarmonicSums`Private`ExpVar^10) - 263/(480*HarmonicSums`Private`ExpVar^9) - 9/(128*HarmonicSums`Private`ExpVar^8) + 23/(168*HarmonicSums`Private`ExpVar^7) + 1/(32*HarmonicSums`Private`ExpVar^6) - 19/(240*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))* z3 + ln2*(li4half + (3*z2^2)/8 + (-1)^HarmonicSums`Private`ExpVar* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3) + (29*z5)/64, S[-1, 1, -2, -1, HarmonicSums`Private`ExpVar] :> 7*li5half - (7*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar* (-548563/(172800*HarmonicSums`Private`ExpVar^10) + 1878997/(1411200*HarmonicSums`Private`ExpVar^9) + 140393/(282240*HarmonicSums`Private`ExpVar^8) - 821/(4800*HarmonicSums`Private`ExpVar^7) - 299/(900*HarmonicSums`Private`ExpVar^6) + 55/(144*HarmonicSums`Private`ExpVar^5) - 61/(288*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(-31/(96*HarmonicSums`Private`ExpVar^10) + 17/(384*HarmonicSums`Private`ExpVar^8) - 1/(96*HarmonicSums`Private`ExpVar^6) + 1/(192*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) - (ln2^3*z2)/6 + (-1)^HarmonicSums`Private`ExpVar*(31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z2^2 + ln2*(-1259/(160*HarmonicSums`Private`ExpVar^10) + 1207/(720*HarmonicSums`Private`ExpVar^9) + 61/(48*HarmonicSums`Private`ExpVar^8) - 173/(336*HarmonicSums`Private`ExpVar^7) - 35/(96*HarmonicSums`Private`ExpVar^6) + 119/(240*HarmonicSums`Private`ExpVar^5) - 9/(32*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (3555/(128*HarmonicSums`Private`ExpVar^10) + 357/(64*HarmonicSums`Private`ExpVar^9) - 441/(128*HarmonicSums`Private`ExpVar^8) - 15/(16*HarmonicSums`Private`ExpVar^7) + 45/(64*HarmonicSums`Private`ExpVar^6) + 9/(32*HarmonicSums`Private`ExpVar^5) - 9/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2))*z2 + (31*z2^2)/20) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 - (5*z3)/16) + (-1)^HarmonicSums`Private`ExpVar* (-5925/(512*HarmonicSums`Private`ExpVar^10) - 595/(256*HarmonicSums`Private`ExpVar^9) + 735/(512*HarmonicSums`Private`ExpVar^8) + 25/(64*HarmonicSums`Private`ExpVar^7) - 75/(256*HarmonicSums`Private`ExpVar^6) - 15/(128*HarmonicSums`Private`ExpVar^5) + 15/(128*HarmonicSums`Private`ExpVar^4) + 5/(64*HarmonicSums`Private`ExpVar^3) - 5/(32*HarmonicSums`Private`ExpVar^2))*z3 + (5*z2*z3)/16 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2* (-93/(8*HarmonicSums`Private`ExpVar^10) + 51/(32*HarmonicSums`Private`ExpVar^8) - 3/(8*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^2) + 3/(4*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (155/(32*HarmonicSums`Private`ExpVar^10) - 85/(128*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^4) + 5/(32*HarmonicSums`Private`ExpVar^2) - 5/(16*HarmonicSums`Private`ExpVar))*z3) - (457*z5)/64, S[-1, 1, -2, 1, HarmonicSums`Private`ExpVar] :> 3*li5half - ln2^5/40 - 89137/(7200*HarmonicSums`Private`ExpVar^10) + 400553/(453600*HarmonicSums`Private`ExpVar^9) + 26977/(16128*HarmonicSums`Private`ExpVar^8) - 42071/(141120*HarmonicSums`Private`ExpVar^7) - 1987/(5760*HarmonicSums`Private`ExpVar^6) + 2987/(14400*HarmonicSums`Private`ExpVar^5) - 5/(384*HarmonicSums`Private`ExpVar^4) - 1/(36*HarmonicSums`Private`ExpVar^3) + (ln2^3*z2)/4 + (9*ln2*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (93/(160*HarmonicSums`Private`ExpVar^10) - 51/(640*HarmonicSums`Private`ExpVar^8) + 3/(160*HarmonicSums`Private`ExpVar^6) - 3/(320*HarmonicSums`Private`ExpVar^4) + 3/(160*HarmonicSums`Private`ExpVar^2) - 3/(80*HarmonicSums`Private`ExpVar))*z2^2 - (5*ln2^2*z3)/16 + (-1)^HarmonicSums`Private`ExpVar* (-5925/(512*HarmonicSums`Private`ExpVar^10) - 595/(256*HarmonicSums`Private`ExpVar^9) + 735/(512*HarmonicSums`Private`ExpVar^8) + 25/(64*HarmonicSums`Private`ExpVar^7) - 75/(256*HarmonicSums`Private`ExpVar^6) - 15/(128*HarmonicSums`Private`ExpVar^5) + 15/(128*HarmonicSums`Private`ExpVar^4) + 5/(64*HarmonicSums`Private`ExpVar^3) - 5/(32*HarmonicSums`Private`ExpVar^2))*z3 + (5*z2*z3)/16 + sinf*(1259/(160*HarmonicSums`Private`ExpVar^10) - 1207/(720*HarmonicSums`Private`ExpVar^9) - 61/(48*HarmonicSums`Private`ExpVar^8) + 173/(336*HarmonicSums`Private`ExpVar^7) + 35/(96*HarmonicSums`Private`ExpVar^6) - 119/(240*HarmonicSums`Private`ExpVar^5) + 9/(32*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (155/(32*HarmonicSums`Private`ExpVar^10) - 85/(128*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^4) + 5/(32*HarmonicSums`Private`ExpVar^2) - 5/(16*HarmonicSums`Private`ExpVar))*z3) - (29*z5)/16, S[-1, 1, 2, -1, HarmonicSums`Private`ExpVar] :> -4*li5half + (19*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar*li4half* (93/(4*HarmonicSums`Private`ExpVar^10) - 51/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar)) - 767/(1280*HarmonicSums`Private`ExpVar^10) - 1511/(640*HarmonicSums`Private`ExpVar^9) + 569/(1536*HarmonicSums`Private`ExpVar^8) + 121/(224*HarmonicSums`Private`ExpVar^7) - 41/(96*HarmonicSums`Private`ExpVar^6) + 13/(80*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) - (ln2^3*z2)/3 + (-1)^HarmonicSums`Private`ExpVar* (-93/(10*HarmonicSums`Private`ExpVar^10) + 51/(40*HarmonicSums`Private`ExpVar^8) - 3/(10*HarmonicSums`Private`ExpVar^6) + 3/(20*HarmonicSums`Private`ExpVar^4) - 3/(10*HarmonicSums`Private`ExpVar^2) + 3/(5*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z3 + (19*z2*z3)/16 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-93/(16*HarmonicSums`Private`ExpVar^10) + 51/(64*HarmonicSums`Private`ExpVar^8) - 3/(16*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^2) + 3/(8*HarmonicSums`Private`ExpVar))*z2 + (23*z3)/16) + ln2*(3*li4half + (-1)^HarmonicSums`Private`ExpVar* (17101/(800*HarmonicSums`Private`ExpVar^10) - 39307/(19600*HarmonicSums`Private`ExpVar^9) - 411413/(141120*HarmonicSums`Private`ExpVar^8) + 1129/(3600*HarmonicSums`Private`ExpVar^7) + 4819/(7200*HarmonicSums`Private`ExpVar^6) + 11/(144*HarmonicSums`Private`ExpVar^5) - 115/(144*HarmonicSums`Private`ExpVar^4) + 7/(8*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-3555/(128*HarmonicSums`Private`ExpVar^10) - 357/(64*HarmonicSums`Private`ExpVar^9) + 441/(128*HarmonicSums`Private`ExpVar^8) + 15/(16*HarmonicSums`Private`ExpVar^7) - 45/(64*HarmonicSums`Private`ExpVar^6) - 9/(32*HarmonicSums`Private`ExpVar^5) + 9/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2))*z2 - (7*z2^2)/5 + (-1)^HarmonicSums`Private`ExpVar* (217/(16*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^6) - 7/(32*HarmonicSums`Private`ExpVar^4) + 7/(16*HarmonicSums`Private`ExpVar^2) - 7/(8*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2* (93/(8*HarmonicSums`Private`ExpVar^10) - 51/(32*HarmonicSums`Private`ExpVar^8) + 3/(8*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^2) - 3/(4*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z3) + (35*z5)/32, S[-1, 1, 2, 1, HarmonicSums`Private`ExpVar] :> 2*li5half + (13*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar* (353615561/(127008000*HarmonicSums`Private`ExpVar^10) + 347209021/(49392000*HarmonicSums`Private`ExpVar^9) + 5438339/(14817600*HarmonicSums`Private`ExpVar^8) - 269881/(216000*HarmonicSums`Private`ExpVar^7) - 77153/(216000*HarmonicSums`Private`ExpVar^6) + 355/(864*HarmonicSums`Private`ExpVar^5) + 257/(432*HarmonicSums`Private`ExpVar^4) - 5/(4*HarmonicSums`Private`ExpVar^3) + HarmonicSums`Private`ExpVar^ (-2)) - (7*ln2^3*z2)/12 + (-1)^HarmonicSums`Private`ExpVar* (93/(10*HarmonicSums`Private`ExpVar^10) - 51/(40*HarmonicSums`Private`ExpVar^8) + 3/(10*HarmonicSums`Private`ExpVar^6) - 3/(20*HarmonicSums`Private`ExpVar^4) + 3/(10*HarmonicSums`Private`ExpVar^2) - 3/(5*HarmonicSums`Private`ExpVar))*z2^2 + ln2*(3*li4half + z2^2/40) + (23*ln2^2*z3)/16 + (-1)^HarmonicSums`Private`ExpVar* (1185/(32*HarmonicSums`Private`ExpVar^10) + 119/(16*HarmonicSums`Private`ExpVar^9) - 147/(32*HarmonicSums`Private`ExpVar^8) - 5/(4*HarmonicSums`Private`ExpVar^7) + 15/(16*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2))*z3 - (23*z2*z3)/16 + sinf*((-1)^HarmonicSums`Private`ExpVar* (-17101/(800*HarmonicSums`Private`ExpVar^10) + 39307/(19600*HarmonicSums`Private`ExpVar^9) + 411413/(141120*HarmonicSums`Private`ExpVar^8) - 1129/(3600*HarmonicSums`Private`ExpVar^7) - 4819/(7200*HarmonicSums`Private`ExpVar^6) - 11/(144*HarmonicSums`Private`ExpVar^5) + 115/(144*HarmonicSums`Private`ExpVar^4) - 7/(8*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(2*HarmonicSums`Private`ExpVar^10) + 17/(8*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1))*z3) - (23*z5)/64, S[-1, 1, -1, -2, HarmonicSums`Private`ExpVar] :> li5half + (3*ln2^5)/40 + (-1)^HarmonicSums`Private`ExpVar* (-222893/(43200*HarmonicSums`Private`ExpVar^10) + 285367/(352800*HarmonicSums`Private`ExpVar^9) + 155803/(188160*HarmonicSums`Private`ExpVar^8) - 1297/(14400*HarmonicSums`Private`ExpVar^7) - 13517/(28800*HarmonicSums`Private`ExpVar^6) + 257/(576*HarmonicSums`Private`ExpVar^5) - 65/(288*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(93/(4*HarmonicSums`Private`ExpVar^10) - 51/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar)) - (ln2^3*z2)/3 + (-1)^HarmonicSums`Private`ExpVar* (-341/(80*HarmonicSums`Private`ExpVar^10) + 187/(320*HarmonicSums`Private`ExpVar^8) - 11/(80*HarmonicSums`Private`ExpVar^6) + 11/(160*HarmonicSums`Private`ExpVar^4) - 11/(80*HarmonicSums`Private`ExpVar^2) + 11/(40*HarmonicSums`Private`ExpVar))*z2^2 + ln2*(2*li4half + (-1)^HarmonicSums`Private`ExpVar* (-1185/(64*HarmonicSums`Private`ExpVar^10) - 119/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + z2^2/20) + z2*(-2733/(2560*HarmonicSums`Private`ExpVar^10) - 183/(256*HarmonicSums`Private`ExpVar^9) + 641/(3072*HarmonicSums`Private`ExpVar^8) + 21/(128*HarmonicSums`Private`ExpVar^7) - 17/(192*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) + 19/(128*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - (7*z3)/8) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 + (13*z3)/16) + (-1)^HarmonicSums`Private`ExpVar* (15405/(512*HarmonicSums`Private`ExpVar^10) + 1547/(256*HarmonicSums`Private`ExpVar^9) - 1911/(512*HarmonicSums`Private`ExpVar^8) - 65/(64*HarmonicSums`Private`ExpVar^7) + 195/(256*HarmonicSums`Private`ExpVar^6) + 39/(128*HarmonicSums`Private`ExpVar^5) - 39/(128*HarmonicSums`Private`ExpVar^4) - 13/(64*HarmonicSums`Private`ExpVar^3) + 13/(32*HarmonicSums`Private`ExpVar^2))*z3 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-403/(32*HarmonicSums`Private`ExpVar^10) + 221/(128*HarmonicSums`Private`ExpVar^8) - 13/(32*HarmonicSums`Private`ExpVar^6) + 13/(64*HarmonicSums`Private`ExpVar^4) - 13/(32*HarmonicSums`Private`ExpVar^2) + 13/(16*HarmonicSums`Private`ExpVar))*z3) - (33*z5)/64, S[-1, 1, -1, 2, HarmonicSums`Private`ExpVar] :> 4*li5half + ln2^5/20 + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (31/(48*HarmonicSums`Private`ExpVar^10) - 17/(192*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar)) - 245993/(26880*HarmonicSums`Private`ExpVar^10) - 47149/(120960*HarmonicSums`Private`ExpVar^9) + 4333/(2560*HarmonicSums`Private`ExpVar^8) - 313/(6720*HarmonicSums`Private`ExpVar^7) - 49/(64*HarmonicSums`Private`ExpVar^6) + 157/(240*HarmonicSums`Private`ExpVar^5) - 5/(16*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) - (ln2^3*z2)/3 + (-1)^HarmonicSums`Private`ExpVar* (-217/(32*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^6) + 7/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z2^2 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-93/(16*HarmonicSums`Private`ExpVar^10) + 51/(64*HarmonicSums`Private`ExpVar^8) - 3/(16*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^2) + 3/(8*HarmonicSums`Private`ExpVar))*z2 + (13*z3)/16) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(64*HarmonicSums`Private`ExpVar^10) - 119/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z3 + z2*(2733/(1280*HarmonicSums`Private`ExpVar^10) + 183/(128*HarmonicSums`Private`ExpVar^9) - 641/(1536*HarmonicSums`Private`ExpVar^8) - 21/(64*HarmonicSums`Private`ExpVar^7) + 17/(96*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) - 19/(64*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (31*z3)/16) + ln2*(2*li4half + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + z2^2/5 + (-1)^HarmonicSums`Private`ExpVar* (651/(32*HarmonicSums`Private`ExpVar^10) - 357/(128*HarmonicSums`Private`ExpVar^8) + 21/(32*HarmonicSums`Private`ExpVar^6) - 21/(64*HarmonicSums`Private`ExpVar^4) + 21/(32*HarmonicSums`Private`ExpVar^2) - 21/(16*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z3) - (405*z5)/64, S[-1, 1, 1, -2, HarmonicSums`Private`ExpVar] :> li5half - ln2^5/20 + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(96*HarmonicSums`Private`ExpVar^10) + 17/(384*HarmonicSums`Private`ExpVar^8) - 1/(96*HarmonicSums`Private`ExpVar^6) + 1/(192*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + 1847/(1280*HarmonicSums`Private`ExpVar^10) - 19357/(5760*HarmonicSums`Private`ExpVar^9) + 383/(1536*HarmonicSums`Private`ExpVar^8) + 337/(448*HarmonicSums`Private`ExpVar^7) - 97/(192*HarmonicSums`Private`ExpVar^6) + 7/(40*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + (ln2^3*z2)/6 + (-1)^HarmonicSums`Private`ExpVar*(31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*sinf^2*z2 + (-1)^HarmonicSums`Private`ExpVar* (403/(80*HarmonicSums`Private`ExpVar^10) - 221/(320*HarmonicSums`Private`ExpVar^8) + 13/(80*HarmonicSums`Private`ExpVar^6) - 13/(160*HarmonicSums`Private`ExpVar^4) + 13/(80*HarmonicSums`Private`ExpVar^2) - 13/(40*HarmonicSums`Private`ExpVar))*z2^2 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 - z3/2) + z2*((-1)^HarmonicSums`Private`ExpVar* (32833/(7680*HarmonicSums`Private`ExpVar^10) + 38279/(8960*HarmonicSums`Private`ExpVar^9) - 937/(2688*HarmonicSums`Private`ExpVar^8) - 1231/(1920*HarmonicSums`Private`ExpVar^7) + 37/(1920*HarmonicSums`Private`ExpVar^6) + 31/(192*HarmonicSums`Private`ExpVar^5) + 5/(96*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) - (3*z3)/8) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(512*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^9) + 147/(512*HarmonicSums`Private`ExpVar^8) + 5/(64*HarmonicSums`Private`ExpVar^7) - 15/(256*HarmonicSums`Private`ExpVar^6) - 3/(128*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2))*z3 + sinf*((-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(-li4half + z2^2/5 + (-1)^HarmonicSums`Private`ExpVar* (-217/(32*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^6) + 7/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3) + (15*z5)/16, S[-1, 1, 1, 2, HarmonicSums`Private`ExpVar] :> -2*li5half - ln2^5/40 + (-1)^HarmonicSums`Private`ExpVar* (85070759/(4536000*HarmonicSums`Private`ExpVar^10) - 6260707/(12348000*HarmonicSums`Private`ExpVar^9) - 148907767/(59270400*HarmonicSums`Private`ExpVar^8) + 23873/(216000*HarmonicSums`Private`ExpVar^7) + 165653/(432000*HarmonicSums`Private`ExpVar^6) + 755/(1728*HarmonicSums`Private`ExpVar^5) - 869/(864*HarmonicSums`Private`ExpVar^4) + 15/(16*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2)) + (ln2^3*z2)/6 + (-1)^HarmonicSums`Private`ExpVar*(-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))* sinf^2*z2 + (-1)^HarmonicSums`Private`ExpVar* (-279/(40*HarmonicSums`Private`ExpVar^10) + 153/(160*HarmonicSums`Private`ExpVar^8) - 9/(40*HarmonicSums`Private`ExpVar^6) + 9/(80*HarmonicSums`Private`ExpVar^4) - 9/(40*HarmonicSums`Private`ExpVar^2) + 9/(20*HarmonicSums`Private`ExpVar))*z2^2 + ln2*(-li4half + z2^2/20) + z2*((-1)^HarmonicSums`Private`ExpVar* (-32833/(3840*HarmonicSums`Private`ExpVar^10) - 38279/(4480*HarmonicSums`Private`ExpVar^9) + 937/(1344*HarmonicSums`Private`ExpVar^8) + 1231/(960*HarmonicSums`Private`ExpVar^7) - 37/(960*HarmonicSums`Private`ExpVar^6) - 31/(96*HarmonicSums`Private`ExpVar^5) - 5/(48*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + z3/2) - (ln2^2*z3)/2 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(64*HarmonicSums`Private`ExpVar^10) - 119/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z3 + sinf*((-1)^HarmonicSums`Private`ExpVar* (1185/(64*HarmonicSums`Private`ExpVar^10) + 119/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z3) - z5/32, S[1, -2, -1, -1, HarmonicSums`Private`ExpVar] :> 3*li5half - ln2^5/15 + (-1)^HarmonicSums`Private`ExpVar* (-736781/(26880*HarmonicSums`Private`ExpVar^10) - 359/(384*HarmonicSums`Private`ExpVar^9) + 4527/(1280*HarmonicSums`Private`ExpVar^8) - 31/(384*HarmonicSums`Private`ExpVar^7) - 181/(192*HarmonicSums`Private`ExpVar^6) + 17/(32*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) + (ln2^3*z2)/2 + (-1)^HarmonicSums`Private`ExpVar* (187/(16*HarmonicSums`Private`ExpVar^10) + 27/(4*HarmonicSums`Private`ExpVar^9) - 27/(16*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-7) + 7/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 5/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*z2 + ln2*(-li4half - 1469/(4800*HarmonicSums`Private`ExpVar^10) + 7757/(75600*HarmonicSums`Private`ExpVar^9) + 509/(4032*HarmonicSums`Private`ExpVar^8) - 6227/(70560*HarmonicSums`Private`ExpVar^7) - 137/(1440*HarmonicSums`Private`ExpVar^6) + 223/(900*HarmonicSums`Private`ExpVar^5) - 7/(24*HarmonicSums`Private`ExpVar^4) + 17/(72*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (53*z2^2)/40) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (187/(16*HarmonicSums`Private`ExpVar^10) + 27/(4*HarmonicSums`Private`ExpVar^9) - 27/(16*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-7) + 7/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 5/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) - (21*z3)/16) + sinf*(-4*li4half - ln2^4/6 - (ln2^2*z2)/2 + (7*z2^2)/5 - (21*ln2*z3)/8) - (99*z5)/32, S[1, -2, -1, 1, HarmonicSums`Private`ExpVar] :> li5half - ln2^5/120 + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (187/(16*HarmonicSums`Private`ExpVar^10) + 27/(4*HarmonicSums`Private`ExpVar^9) - 27/(16*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-7) + 7/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 5/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) - 4009037/(6048000*HarmonicSums`Private`ExpVar^10) - 2480873/(95256000*HarmonicSums`Private`ExpVar^9) + 412967/(1693440*HarmonicSums`Private`ExpVar^8) - 323657/(14817600*HarmonicSums`Private`ExpVar^7) - 14597/(86400*HarmonicSums`Private`ExpVar^6) + 32297/(216000*HarmonicSums`Private`ExpVar^5) - 7/(1152*HarmonicSums`Private`ExpVar^4) - 25/(216*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + (ln2^3*z2)/12 + (-1)^HarmonicSums`Private`ExpVar* (-187/(16*HarmonicSums`Private`ExpVar^10) - 27/(4*HarmonicSums`Private`ExpVar^9) + 27/(16*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-7) - 7/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3))*z2 - (43*ln2*z2^2)/40 + sinf*(-3*li4half - ln2^4/8 + 1469/(4800*HarmonicSums`Private`ExpVar^10) - 7757/(75600*HarmonicSums`Private`ExpVar^9) - 509/(4032*HarmonicSums`Private`ExpVar^8) + 6227/(70560*HarmonicSums`Private`ExpVar^7) + 137/(1440*HarmonicSums`Private`ExpVar^6) - 223/(900*HarmonicSums`Private`ExpVar^5) + 7/(24*HarmonicSums`Private`ExpVar^4) - 17/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + (39*z2^2)/40) + (81*z5)/64, S[1, -2, 1, -1, HarmonicSums`Private`ExpVar] :> -li5half + ln2^5/120 + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (-187/(16*HarmonicSums`Private`ExpVar^10) - 27/(4*HarmonicSums`Private`ExpVar^9) + 27/(16*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-7) - 7/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) - 331/(57600*HarmonicSums`Private`ExpVar^10) - 371131/(907200*HarmonicSums`Private`ExpVar^9) + 1387/(16128*HarmonicSums`Private`ExpVar^8) + 30311/(141120*HarmonicSums`Private`ExpVar^7) - 1603/(5760*HarmonicSums`Private`ExpVar^6) + 2863/(14400*HarmonicSums`Private`ExpVar^5) - 37/(384*HarmonicSums`Private`ExpVar^4) + 1/(36*HarmonicSums`Private`ExpVar^3) - (ln2^3*z2)/12 + ln2*((-1)^HarmonicSums`Private`ExpVar* (27/(2*HarmonicSums`Private`ExpVar^10) + 22/HarmonicSums`Private`ExpVar^9 - 2/HarmonicSums`Private`ExpVar^8 - 11/(4*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4)) - z2^2/20) + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2* (-187/(8*HarmonicSums`Private`ExpVar^10) - 27/(2*HarmonicSums`Private`ExpVar^9) + 27/(8*HarmonicSums`Private`ExpVar^8) + 2/HarmonicSums`Private`ExpVar^7 - 7/(8*HarmonicSums`Private`ExpVar^6) - 1/(2*HarmonicSums`Private`ExpVar^5) + 5/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + (3*ln2^2*z2)/4 + (3*z2^2)/40) + (25*z5)/32, S[1, -2, 1, 1, HarmonicSums`Private`ExpVar] :> -li5half - li4half*ln2 - ln2^5/30 + (-1)^HarmonicSums`Private`ExpVar* (-754421/(26880*HarmonicSums`Private`ExpVar^10) + 5491/(384*HarmonicSums`Private`ExpVar^9) + 1901/(640*HarmonicSums`Private`ExpVar^8) - 311/(192*HarmonicSums`Private`ExpVar^7) - 59/(96*HarmonicSums`Private`ExpVar^6) + 9/(16*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* (187/(16*HarmonicSums`Private`ExpVar^10) + 27/(4*HarmonicSums`Private`ExpVar^9) - 27/(16*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-7) + 7/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 5/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*sinf^2 + (ln2^3*z2)/6 + (-1)^HarmonicSums`Private`ExpVar* (187/(16*HarmonicSums`Private`ExpVar^10) + 27/(4*HarmonicSums`Private`ExpVar^9) - 27/(16*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-7) + 7/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 5/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*z2 - (7*ln2^2*z3)/16 + sinf*(-li4half - ln2^4/24 + (-1)^HarmonicSums`Private`ExpVar* (-27/(2*HarmonicSums`Private`ExpVar^10) - 22/HarmonicSums`Private`ExpVar^9 + 2/HarmonicSums`Private`ExpVar^8 + 11/(4*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4)) + (ln2^2*z2)/4 + z2^2/8 - (7*ln2*z3)/8) + (25*z5)/32, S[1, 2, -1, -1, HarmonicSums`Private`ExpVar] :> -4*li5half + ln2^5/30 - 574577/(4032000*HarmonicSums`Private`ExpVar^10) - 63649/(604800*HarmonicSums`Private`ExpVar^9) + 26899/(241920*HarmonicSums`Private`ExpVar^8) + 18629/(282240*HarmonicSums`Private`ExpVar^7) - 1109/(4320*HarmonicSums`Private`ExpVar^6) + 567/(1600*HarmonicSums`Private`ExpVar^5) - 131/(384*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) - (ln2^3*z2)/3 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-1011/(32*HarmonicSums`Private`ExpVar^10) + 3/(2*HarmonicSums`Private`ExpVar^9) + 243/(64*HarmonicSums`Private`ExpVar^8) - 19/(32*HarmonicSums`Private`ExpVar^7) - 3/(4*HarmonicSums`Private`ExpVar^6) + 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) - (53*z2^2)/40) + sinf*(li4half + ln2^4/24 + (5*ln2^2*z2)/4 + z2^2/40) + ln2^2*(11/(240*HarmonicSums`Private`ExpVar^10) + 11/(700*HarmonicSums`Private`ExpVar^9) - 3/(112*HarmonicSums`Private`ExpVar^8) - 19/(2205*HarmonicSums`Private`ExpVar^7) + 7/(240*HarmonicSums`Private`ExpVar^6) + 7/(900*HarmonicSums`Private`ExpVar^5) - 5/(48*HarmonicSums`Private`ExpVar^4) + 17/(72*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) + (7*z3)/8) + z2*(11/(240*HarmonicSums`Private`ExpVar^10) + 11/(700*HarmonicSums`Private`ExpVar^9) - 3/(112*HarmonicSums`Private`ExpVar^8) - 19/(2205*HarmonicSums`Private`ExpVar^7) + 7/(240*HarmonicSums`Private`ExpVar^6) + 7/(900*HarmonicSums`Private`ExpVar^5) - 5/(48*HarmonicSums`Private`ExpVar^4) + 17/(72*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) + (7*z3)/8) + (81*z5)/64, S[1, 2, -1, 1, HarmonicSums`Private`ExpVar] :> ln2^5/8 + (-1)^HarmonicSums`Private`ExpVar* (-9813/(256*HarmonicSums`Private`ExpVar^10) - 547/(128*HarmonicSums`Private`ExpVar^9) + 261/(64*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^7) - 11/(16*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5)) - (3*ln2^3*z2)/4 + ln2*(3*li4half - (51*z2^2)/40) + z2*(-11/(240*HarmonicSums`Private`ExpVar^10) - 11/(700*HarmonicSums`Private`ExpVar^9) + 3/(112*HarmonicSums`Private`ExpVar^8) + 19/(2205*HarmonicSums`Private`ExpVar^7) - 7/(240*HarmonicSums`Private`ExpVar^6) - 7/(900*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^4) - 17/(72*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) - (7*z3)/8) + ln2^2*(11/(240*HarmonicSums`Private`ExpVar^10) + 11/(700*HarmonicSums`Private`ExpVar^9) - 3/(112*HarmonicSums`Private`ExpVar^8) - 19/(2205*HarmonicSums`Private`ExpVar^7) + 7/(240*HarmonicSums`Private`ExpVar^6) + 7/(900*HarmonicSums`Private`ExpVar^5) - 5/(48*HarmonicSums`Private`ExpVar^4) + 17/(72*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) + (35*z3)/16) + sinf*(4*li4half + ln2^4/6 + (-1)^HarmonicSums`Private`ExpVar* (1011/(32*HarmonicSums`Private`ExpVar^10) - 3/(2*HarmonicSums`Private`ExpVar^9) - 243/(64*HarmonicSums`Private`ExpVar^8) + 19/(32*HarmonicSums`Private`ExpVar^7) + 3/(4*HarmonicSums`Private`ExpVar^6) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) - (ln2^2*z2)/4 - 2*z2^2 + (21*ln2*z3)/8) + (87*z5)/32, S[1, 2, 1, -1, HarmonicSums`Private`ExpVar] :> 6*li5half + (3*ln2^5)/40 + (-1)^HarmonicSums`Private`ExpVar* (1683/(256*HarmonicSums`Private`ExpVar^10) - 675/(128*HarmonicSums`Private`ExpVar^9) - 3/(16*HarmonicSums`Private`ExpVar^8) + 15/(16*HarmonicSums`Private`ExpVar^7) - 3/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^5)) - (ln2^3*z2)/4 + ln2*(3*li4half + 11/(350*HarmonicSums`Private`ExpVar^10) + 54338/(496125*HarmonicSums`Private`ExpVar^9) - 38/(2205*HarmonicSums`Private`ExpVar^8) - 62521/(926100*HarmonicSums`Private`ExpVar^7) + 7/(450*HarmonicSums`Private`ExpVar^6) + 533/(6750*HarmonicSums`Private`ExpVar^5) - 1/(36*HarmonicSums`Private`ExpVar^4) - 17/(54*HarmonicSums`Private`ExpVar^3) + HarmonicSums`Private`ExpVar^ (-2) - 2/HarmonicSums`Private`ExpVar + (12*z2^2)/5) + sinf*(3*li4half + ln2^4/8 - (3*ln2^2*z2)/2 - (6*z2^2)/5 + ln2*(-11/(120*HarmonicSums`Private`ExpVar^10) - 11/(350*HarmonicSums`Private`ExpVar^9) + 3/(56*HarmonicSums`Private`ExpVar^8) + 38/(2205*HarmonicSums`Private`ExpVar^7) - 7/(120*HarmonicSums`Private`ExpVar^6) - 7/(450*HarmonicSums`Private`ExpVar^5) + 5/(24*HarmonicSums`Private`ExpVar^4) - 17/(36*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1) + (7*z3)/8)) + ln2^2*(-11/(240*HarmonicSums`Private`ExpVar^10) - 11/(700*HarmonicSums`Private`ExpVar^9) + 3/(112*HarmonicSums`Private`ExpVar^8) + 19/(2205*HarmonicSums`Private`ExpVar^7) - 7/(240*HarmonicSums`Private`ExpVar^6) - 7/(900*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^4) - 17/(72*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) + (7*z3)/16) - 6*z5, S[1, 2, 1, 1, HarmonicSums`Private`ExpVar] :> -810617/(5292000*HarmonicSums`Private`ExpVar^10) + 79085171/(1666980000*HarmonicSums`Private`ExpVar^9) + 4924987/(59270400*HarmonicSums`Private`ExpVar^8) - 13169747/(518616000*HarmonicSums`Private`ExpVar^7) - 57841/(432000*HarmonicSums`Private`ExpVar^6) + 295541/(1080000*HarmonicSums`Private`ExpVar^5) - 491/(1152*HarmonicSums`Private`ExpVar^4) + 335/(432*HarmonicSums`Private`ExpVar^3) - 25/(16*HarmonicSums`Private`ExpVar^2) + 3/HarmonicSums`Private`ExpVar + (11/(240*HarmonicSums`Private`ExpVar^10) + 11/(700*HarmonicSums`Private`ExpVar^9) - 3/(112*HarmonicSums`Private`ExpVar^8) - 19/(2205*HarmonicSums`Private`ExpVar^7) + 7/(240*HarmonicSums`Private`ExpVar^6) + 7/(900*HarmonicSums`Private`ExpVar^5) - 5/(48*HarmonicSums`Private`ExpVar^4) + 17/(72*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))* sinf^2 + (11/(240*HarmonicSums`Private`ExpVar^10) + 11/(700*HarmonicSums`Private`ExpVar^9) - 3/(112*HarmonicSums`Private`ExpVar^8) - 19/(2205*HarmonicSums`Private`ExpVar^7) + 7/(240*HarmonicSums`Private`ExpVar^6) + 7/(900*HarmonicSums`Private`ExpVar^5) - 5/(48*HarmonicSums`Private`ExpVar^4) + 17/(72*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))* z2 + sinf*(-11/(350*HarmonicSums`Private`ExpVar^10) - 54338/(496125*HarmonicSums`Private`ExpVar^9) + 38/(2205*HarmonicSums`Private`ExpVar^8) + 62521/(926100*HarmonicSums`Private`ExpVar^7) - 7/(450*HarmonicSums`Private`ExpVar^6) - 533/(6750*HarmonicSums`Private`ExpVar^5) + 1/(36*HarmonicSums`Private`ExpVar^4) + 17/(54*HarmonicSums`Private`ExpVar^3) - HarmonicSums`Private`ExpVar^ (-2) + 2/HarmonicSums`Private`ExpVar + (6*z2^2)/5) - 6*z5, S[1, -1, -2, -1, HarmonicSums`Private`ExpVar] :> -7*li5half + ln2^5/10 + (-1)^HarmonicSums`Private`ExpVar* (-69659/(5376*HarmonicSums`Private`ExpVar^10) - 41033/(13440*HarmonicSums`Private`ExpVar^9) + 3643/(1920*HarmonicSums`Private`ExpVar^8) + 187/(480*HarmonicSums`Private`ExpVar^7) - 43/(64*HarmonicSums`Private`ExpVar^6) + 29/(96*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4)) - (ln2^3*z2)/12 + ln2*(li4half - 1717/(2400*HarmonicSums`Private`ExpVar^10) + 31933/(75600*HarmonicSums`Private`ExpVar^9) + 221/(1008*HarmonicSums`Private`ExpVar^8) - 7019/(35280*HarmonicSums`Private`ExpVar^7) - 173/(1440*HarmonicSums`Private`ExpVar^6) + 1223/(3600*HarmonicSums`Private`ExpVar^5) - 35/(96*HarmonicSums`Private`ExpVar^4) + 19/(72*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-3555/(128*HarmonicSums`Private`ExpVar^10) + 459/(64*HarmonicSums`Private`ExpVar^9) + 441/(128*HarmonicSums`Private`ExpVar^8) - 21/(16*HarmonicSums`Private`ExpVar^7) - 45/(64*HarmonicSums`Private`ExpVar^6) + 15/(32*HarmonicSums`Private`ExpVar^5) + 9/(32*HarmonicSums`Private`ExpVar^4) - 9/(16*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2))*z2 - (91*z2^2)/40) + (5*ln2^2*z3)/16 + (-1)^HarmonicSums`Private`ExpVar* (5925/(512*HarmonicSums`Private`ExpVar^10) - 765/(256*HarmonicSums`Private`ExpVar^9) - 735/(512*HarmonicSums`Private`ExpVar^8) + 35/(64*HarmonicSums`Private`ExpVar^7) + 75/(256*HarmonicSums`Private`ExpVar^6) - 25/(128*HarmonicSums`Private`ExpVar^5) - 15/(128*HarmonicSums`Private`ExpVar^4) + 15/(64*HarmonicSums`Private`ExpVar^3) - 5/(32*HarmonicSums`Private`ExpVar^2))*z3 + sinf*(4*li4half + ln2^4/6 + (ln2^2*z2)/2 - (7*z2^2)/5 + (5*ln2*z3)/8) + (221*z5)/32, S[1, -1, -2, 1, HarmonicSums`Private`ExpVar] :> -3*li5half + ln2^5/40 - 1071479/(756000*HarmonicSums`Private`ExpVar^10) + 17695249/(47628000*HarmonicSums`Private`ExpVar^9) + 582713/(1693440*HarmonicSums`Private`ExpVar^8) - 1940143/(14817600*HarmonicSums`Private`ExpVar^7) - 12053/(86400*HarmonicSums`Private`ExpVar^6) + 28453/(216000*HarmonicSums`Private`ExpVar^5) + 25/(1152*HarmonicSums`Private`ExpVar^4) - 29/(216*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - (ln2^3*z2)/4 + (39*ln2*z2^2)/40 + (5*ln2^2*z3)/16 + (-1)^HarmonicSums`Private`ExpVar* (5925/(512*HarmonicSums`Private`ExpVar^10) - 765/(256*HarmonicSums`Private`ExpVar^9) - 735/(512*HarmonicSums`Private`ExpVar^8) + 35/(64*HarmonicSums`Private`ExpVar^7) + 75/(256*HarmonicSums`Private`ExpVar^6) - 25/(128*HarmonicSums`Private`ExpVar^5) - 15/(128*HarmonicSums`Private`ExpVar^4) + 15/(64*HarmonicSums`Private`ExpVar^3) - 5/(32*HarmonicSums`Private`ExpVar^2))*z3 + sinf*(3*li4half + ln2^4/8 + 1717/(2400*HarmonicSums`Private`ExpVar^10) - 31933/(75600*HarmonicSums`Private`ExpVar^9) - 221/(1008*HarmonicSums`Private`ExpVar^8) + 7019/(35280*HarmonicSums`Private`ExpVar^7) + 173/(1440*HarmonicSums`Private`ExpVar^6) - 1223/(3600*HarmonicSums`Private`ExpVar^5) + 35/(96*HarmonicSums`Private`ExpVar^4) - 19/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - (3*ln2^2*z2)/4 - (9*z2^2)/40 + (5*ln2*z3)/8) - (23*z5)/64, S[1, -1, 2, -1, HarmonicSums`Private`ExpVar] :> 6*li5half - ln2^5/20 - 5741/(11520*HarmonicSums`Private`ExpVar^10) - 1034321/(1814400*HarmonicSums`Private`ExpVar^9) + 2255/(10752*HarmonicSums`Private`ExpVar^8) + 32933/(141120*HarmonicSums`Private`ExpVar^7) - 319/(960*HarmonicSums`Private`ExpVar^6) + 413/(1800*HarmonicSums`Private`ExpVar^5) - 5/(48*HarmonicSums`Private`ExpVar^4) + 1/(36*HarmonicSums`Private`ExpVar^3) - (ln2^3*z2)/4 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-1129/(224*HarmonicSums`Private`ExpVar^10) + 27247/(1680*HarmonicSums`Private`ExpVar^9) - 13/(960*HarmonicSums`Private`ExpVar^8) - 647/(240*HarmonicSums`Private`ExpVar^7) + 7/(32*HarmonicSums`Private`ExpVar^6) + 47/(48*HarmonicSums`Private`ExpVar^5) - 3/(4*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (3555/(128*HarmonicSums`Private`ExpVar^10) - 459/(64*HarmonicSums`Private`ExpVar^9) - 441/(128*HarmonicSums`Private`ExpVar^8) + 21/(16*HarmonicSums`Private`ExpVar^7) + 45/(64*HarmonicSums`Private`ExpVar^6) - 15/(32*HarmonicSums`Private`ExpVar^5) - 9/(32*HarmonicSums`Private`ExpVar^4) + 9/(16*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2))*z2 + (21*z2^2)/20) + (19*ln2^2*z3)/16 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) + 153/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z3 + (21*z2*z3)/16 + sinf*(-4*li4half - ln2^4/6 - (ln2^2*z2)/2 + (5*z2^2)/4 - (ln2*z3)/4) - (61*z5)/8, S[1, -1, 2, 1, HarmonicSums`Private`ExpVar] :> 4*li5half + (11*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar* (-5573377/(188160*HarmonicSums`Private`ExpVar^10) + 9246059/(1411200*HarmonicSums`Private`ExpVar^9) + 10931/(3600*HarmonicSums`Private`ExpVar^8) - 7631/(14400*HarmonicSums`Private`ExpVar^7) - 103/(192*HarmonicSums`Private`ExpVar^6) - 25/(288*HarmonicSums`Private`ExpVar^5) + 7/(16*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) - (5*ln2^3*z2)/12 + ln2*(3*li4half + z2^2/20) + (19*ln2^2*z3)/16 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(32*HarmonicSums`Private`ExpVar^10) + 153/(16*HarmonicSums`Private`ExpVar^9) + 147/(32*HarmonicSums`Private`ExpVar^8) - 7/(4*HarmonicSums`Private`ExpVar^7) - 15/(16*HarmonicSums`Private`ExpVar^6) + 5/(8*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2))*z3 - (21*z2*z3)/16 + sinf*(-li4half - ln2^4/24 + (-1)^HarmonicSums`Private`ExpVar* (1129/(224*HarmonicSums`Private`ExpVar^10) - 27247/(1680*HarmonicSums`Private`ExpVar^9) + 13/(960*HarmonicSums`Private`ExpVar^8) + 647/(240*HarmonicSums`Private`ExpVar^7) - 7/(32*HarmonicSums`Private`ExpVar^6) - 47/(48*HarmonicSums`Private`ExpVar^5) + 3/(4*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + (ln2^2*z2)/4 - z2^2/40 - (ln2*z3)/4) - (85*z5)/64, S[1, -1, -1, -2, HarmonicSums`Private`ExpVar] :> -5*li5half - ln2^5/12 + (-1)^HarmonicSums`Private`ExpVar* (-60317/(5376*HarmonicSums`Private`ExpVar^10) - 68587/(13440*HarmonicSums`Private`ExpVar^9) + 311/(160*HarmonicSums`Private`ExpVar^8) + 661/(960*HarmonicSums`Private`ExpVar^7) - 51/(64*HarmonicSums`Private`ExpVar^6) + 31/(96*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4)) + (ln2^3*z2)/6 + ln2*(-3*li4half + (-1)^HarmonicSums`Private`ExpVar* (1185/(64*HarmonicSums`Private`ExpVar^10) - 153/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) + 7/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 - (59*z2^2)/40) + z2*(-2071/(15360*HarmonicSums`Private`ExpVar^10) - 5919/(89600*HarmonicSums`Private`ExpVar^9) + 1745/(43008*HarmonicSums`Private`ExpVar^8) + 8251/(282240*HarmonicSums`Private`ExpVar^7) - 121/(3840*HarmonicSums`Private`ExpVar^6) - 757/(28800*HarmonicSums`Private`ExpVar^5) + 79/(768*HarmonicSums`Private`ExpVar^4) - 49/(288*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) - (7*z3)/8) + (ln2^2*z3)/2 + (-1)^HarmonicSums`Private`ExpVar* (-15405/(512*HarmonicSums`Private`ExpVar^10) + 1989/(256*HarmonicSums`Private`ExpVar^9) + 1911/(512*HarmonicSums`Private`ExpVar^8) - 91/(64*HarmonicSums`Private`ExpVar^7) - 195/(256*HarmonicSums`Private`ExpVar^6) + 65/(128*HarmonicSums`Private`ExpVar^5) + 39/(128*HarmonicSums`Private`ExpVar^4) - 39/(64*HarmonicSums`Private`ExpVar^3) + 13/(32*HarmonicSums`Private`ExpVar^2))*z3 + sinf*(-((ln2^2*z2)/4) - (3*z2^2)/5 + ln2*z3) + (247*z5)/32, S[1, -1, -1, 2, HarmonicSums`Private`ExpVar] :> -6*li5half + ln2^5/20 - 45071/(36000*HarmonicSums`Private`ExpVar^10) - 2291/(151200*HarmonicSums`Private`ExpVar^9) + 100609/(241920*HarmonicSums`Private`ExpVar^8) - 797/(141120*HarmonicSums`Private`ExpVar^7) - 7271/(17280*HarmonicSums`Private`ExpVar^6) + 2671/(4800*HarmonicSums`Private`ExpVar^5) - 179/(384*HarmonicSums`Private`ExpVar^4) + 7/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) - (ln2^3*z2)/6 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) + 153/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (37*z2^2)/40) + (ln2^2*z3)/2 + (-1)^HarmonicSums`Private`ExpVar* (1185/(64*HarmonicSums`Private`ExpVar^10) - 153/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) + 7/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z3 + z2*(2071/(7680*HarmonicSums`Private`ExpVar^10) + 5919/(44800*HarmonicSums`Private`ExpVar^9) - 1745/(21504*HarmonicSums`Private`ExpVar^8) - 8251/(141120*HarmonicSums`Private`ExpVar^7) + 121/(1920*HarmonicSums`Private`ExpVar^6) + 757/(14400*HarmonicSums`Private`ExpVar^5) - 79/(384*HarmonicSums`Private`ExpVar^4) + 49/(144*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) + (7*z3)/4) + sinf*(3*li4half + ln2^4/8 - (ln2^2*z2)/4 - (3*z2^2)/8 + ln2*z3) + (29*z5)/64, S[1, -1, 1, -2, HarmonicSums`Private`ExpVar] :> -5*li5half + ln2^5/24 - 4013/(7200*HarmonicSums`Private`ExpVar^10) - 455993/(453600*HarmonicSums`Private`ExpVar^9) + 4607/(16128*HarmonicSums`Private`ExpVar^8) + 48371/(141120*HarmonicSums`Private`ExpVar^7) - 2453/(5760*HarmonicSums`Private`ExpVar^6) + 3853/(14400*HarmonicSums`Private`ExpVar^5) - 43/(384*HarmonicSums`Private`ExpVar^4) + 1/(36*HarmonicSums`Private`ExpVar^3) - (ln2^3*z2)/12 - (3*ln2*z2^2)/4 + z2*((-1)^HarmonicSums`Private`ExpVar* (-6543/(256*HarmonicSums`Private`ExpVar^10) + 147/(128*HarmonicSums`Private`ExpVar^9) + 189/(64*HarmonicSums`Private`ExpVar^8) - 15/(64*HarmonicSums`Private`ExpVar^7) - 35/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + z3/8) + (ln2^2*z3)/16 + (-1)^HarmonicSums`Private`ExpVar* (1185/(512*HarmonicSums`Private`ExpVar^10) - 153/(256*HarmonicSums`Private`ExpVar^9) - 147/(512*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^7) + 15/(256*HarmonicSums`Private`ExpVar^6) - 5/(128*HarmonicSums`Private`ExpVar^5) - 3/(128*HarmonicSums`Private`ExpVar^4) + 3/(64*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2))*z3 + sinf*(2*li4half + ln2^4/12 + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) - 153/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - z2^2/5 + (ln2*z3)/8) + (123*z5)/32, S[1, -1, 1, 2, HarmonicSums`Private`ExpVar] :> -4*li5half - (11*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar* (-3502739/(188160*HarmonicSums`Private`ExpVar^10) + 19474801/(1411200*HarmonicSums`Private`ExpVar^9) + 27121/(14400*HarmonicSums`Private`ExpVar^8) - 34669/(14400*HarmonicSums`Private`ExpVar^7) - 79/(192*HarmonicSums`Private`ExpVar^6) + 367/(288*HarmonicSums`Private`ExpVar^5) - 13/(16*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) + (ln2^3*z2)/4 + ln2*(-3*li4half - (37*z2^2)/40) + z2*((-1)^HarmonicSums`Private`ExpVar* (6543/(128*HarmonicSums`Private`ExpVar^10) - 147/(64*HarmonicSums`Private`ExpVar^9) - 189/(32*HarmonicSums`Private`ExpVar^8) + 15/(32*HarmonicSums`Private`ExpVar^7) + 35/(32*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) - z3/16) + (ln2^2*z3)/16 + (-1)^HarmonicSums`Private`ExpVar* (1185/(64*HarmonicSums`Private`ExpVar^10) - 153/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) + 7/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z3 + sinf*(-li4half - ln2^4/24 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(64*HarmonicSums`Private`ExpVar^10) + 153/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) - 7/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) + 5/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2 - z2^2/20 + (ln2*z3)/8) + (277*z5)/64, S[1, 1, -2, -1, HarmonicSums`Private`ExpVar] :> li5half - ln2^5/120 - 288569/(6048000*HarmonicSums`Private`ExpVar^10) - 33094597/(190512000*HarmonicSums`Private`ExpVar^9) + 267769/(3386880*HarmonicSums`Private`ExpVar^8) + 1770691/(14817600*HarmonicSums`Private`ExpVar^7) - 10837/(43200*HarmonicSums`Private`ExpVar^6) + 14801/(54000*HarmonicSums`Private`ExpVar^5) - 2/(9*HarmonicSums`Private`ExpVar^4) + 61/(432*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (ln2^3*z2)/12 + sinf*(li4half + ln2^4/24 - (ln2^2*z2)/4 - z2^2/8) + ln2*((-1)^HarmonicSums`Private`ExpVar* (-1383/(32*HarmonicSums`Private`ExpVar^10) - 37/(16*HarmonicSums`Private`ExpVar^9) + 337/(64*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) - 33/(32*HarmonicSums`Private`ExpVar^6) + 9/(16*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) + (1/(40*HarmonicSums`Private`ExpVar^9) - 1/(56*HarmonicSums`Private`ExpVar^7) + 1/(40*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 3/(4*HarmonicSums`Private`ExpVar))*z2 + (31*z2^2)/20) + sinf^2*((3*ln2*z2)/4 - (5*z3)/16) - (7*ln2^2*z3)/16 + (-(96*HarmonicSums`Private`ExpVar^9)^(-1) + 5/(672*HarmonicSums`Private`ExpVar^7) - 1/(96*HarmonicSums`Private`ExpVar^5) + 5/(96*HarmonicSums`Private`ExpVar^3) - 5/(32*HarmonicSums`Private`ExpVar^2) + 5/(16*HarmonicSums`Private`ExpVar))*z3 - (3*z2*z3)/4 - (27*z5)/32, S[1, 1, -2, 1, HarmonicSums`Private`ExpVar] :> -li5half - li4half*ln2 - ln2^5/30 + (-1)^HarmonicSums`Private`ExpVar* (-12373/(256*HarmonicSums`Private`ExpVar^10) - 1015/(128*HarmonicSums`Private`ExpVar^9) + 653/(128*HarmonicSums`Private`ExpVar^8) + 21/(64*HarmonicSums`Private`ExpVar^7) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5)) + (ln2^3*z2)/6 + sinf*((-1)^HarmonicSums`Private`ExpVar* (1383/(32*HarmonicSums`Private`ExpVar^10) + 37/(16*HarmonicSums`Private`ExpVar^9) - 337/(64*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) + 33/(32*HarmonicSums`Private`ExpVar^6) - 9/(16*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) - (3*z2^2)/40) - (7*ln2^2*z3)/16 + (-(96*HarmonicSums`Private`ExpVar^9)^(-1) + 5/(672*HarmonicSums`Private`ExpVar^7) - 1/(96*HarmonicSums`Private`ExpVar^5) + 5/(96*HarmonicSums`Private`ExpVar^3) - 5/(32*HarmonicSums`Private`ExpVar^2) + 5/(16*HarmonicSums`Private`ExpVar))*z3 - (5*sinf^2*z3)/16 + (z2*z3)/8 + z5/8, S[1, 1, 2, -1, HarmonicSums`Private`ExpVar] :> -4*li5half - (11*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar* (3003/(256*HarmonicSums`Private`ExpVar^10) - 843/(128*HarmonicSums`Private`ExpVar^9) - 15/(32*HarmonicSums`Private`ExpVar^8) + 9/(8*HarmonicSums`Private`ExpVar^7) - 13/(32*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^5)) + (5*ln2^3*z2)/12 + ln2*(-3*li4half - 1331/(16800*HarmonicSums`Private`ExpVar^10) + 659921/(7938000*HarmonicSums`Private`ExpVar^9) + 1207/(35280*HarmonicSums`Private`ExpVar^8) - 291703/(3704400*HarmonicSums`Private`ExpVar^7) - 161/(7200*HarmonicSums`Private`ExpVar^6) + 12493/(54000*HarmonicSums`Private`ExpVar^5) - 137/(288*HarmonicSums`Private`ExpVar^4) + 151/(216*HarmonicSums`Private`ExpVar^3) - 7/(8*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1) + (-(40*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(56*HarmonicSums`Private`ExpVar^7) - 1/(40*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 3/(4*HarmonicSums`Private`ExpVar))*z2 - (31*z2^2)/20) + sinf^2*((-3*ln2*z2)/4 + z3/8) - (7*ln2^2*z3)/8 + (1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z3 + (z2*z3)/8 + sinf*(-3*li4half - ln2^4/8 + (3*ln2^2*z2)/4 + (6*z2^2)/5 - (7*ln2*z3)/4) + 4*z5, S[1, 1, 2, 1, HarmonicSums`Private`ExpVar] :> -573581/(2646000*HarmonicSums`Private`ExpVar^10) + 16407079/(1666980000*HarmonicSums`Private`ExpVar^9) + 1331479/(11854080*HarmonicSums`Private`ExpVar^8) - 9015493/(518616000*HarmonicSums`Private`ExpVar^7) - 46349/(432000*HarmonicSums`Private`ExpVar^6) + 38209/(1080000*HarmonicSums`Private`ExpVar^5) + 397/(1152*HarmonicSums`Private`ExpVar^4) - 443/(432*HarmonicSums`Private`ExpVar^3) + 31/(16*HarmonicSums`Private`ExpVar^2) - 3/HarmonicSums`Private`ExpVar + sinf*(1331/(16800*HarmonicSums`Private`ExpVar^10) - 659921/(7938000*HarmonicSums`Private`ExpVar^9) - 1207/(35280*HarmonicSums`Private`ExpVar^8) + 291703/(3704400*HarmonicSums`Private`ExpVar^7) + 161/(7200*HarmonicSums`Private`ExpVar^6) - 12493/(54000*HarmonicSums`Private`ExpVar^5) + 137/(288*HarmonicSums`Private`ExpVar^4) - 151/(216*HarmonicSums`Private`ExpVar^3) + 7/(8*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1) - (6*z2^2)/5) + (1/(30*HarmonicSums`Private`ExpVar^9) - 1/(42*HarmonicSums`Private`ExpVar^7) + 1/(30*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1))* z3 + sinf^2*z3 + z2*z3 + 4*z5, S[1, 1, -1, -2, HarmonicSums`Private`ExpVar] :> 3*li5half - ln2^5/40 - 74749/(378000*HarmonicSums`Private`ExpVar^10) - 14060717/(47628000*HarmonicSums`Private`ExpVar^9) + 258623/(1693440*HarmonicSums`Private`ExpVar^8) + 2334179/(14817600*HarmonicSums`Private`ExpVar^7) - 28631/(86400*HarmonicSums`Private`ExpVar^6) + 73051/(216000*HarmonicSums`Private`ExpVar^5) - 293/(1152*HarmonicSums`Private`ExpVar^4) + 65/(432*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (ln2^3*z2)/12 + ln2*((-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 - (7*z2^2)/20) + sinf*(-3*li4half - ln2^4/8 + (ln2^2*z2)/4 + (11*z2^2)/20) + z2*((-1)^HarmonicSums`Private`ExpVar* (1035/(512*HarmonicSums`Private`ExpVar^10) - 1323/(256*HarmonicSums`Private`ExpVar^9) + 7/(128*HarmonicSums`Private`ExpVar^8) + 105/(128*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 15/(64*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) - z3/16) + sinf^2*(-((ln2*z2)/2) + (13*z3)/16) + (13/(480*HarmonicSums`Private`ExpVar^9) - 13/(672*HarmonicSums`Private`ExpVar^7) + 13/(480*HarmonicSums`Private`ExpVar^5) - 13/(96*HarmonicSums`Private`ExpVar^3) + 13/(32*HarmonicSums`Private`ExpVar^2) - 13/(16*HarmonicSums`Private`ExpVar))*z3 - z5/32, S[1, 1, -1, 2, HarmonicSums`Private`ExpVar] :> 4*li5half + ln2^5/120 + (-1)^HarmonicSums`Private`ExpVar* (-183115/(5376*HarmonicSums`Private`ExpVar^10) - 5593/(640*HarmonicSums`Private`ExpVar^9) + 9623/(1920*HarmonicSums`Private`ExpVar^8) + 47/(64*HarmonicSums`Private`ExpVar^7) - 137/(96*HarmonicSums`Private`ExpVar^6) + 5/(8*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) + (ln2^3*z2)/6 + ln2*(li4half + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (61*z2^2)/40) + sinf^2*((ln2*z2)/4 - z3/2) + z2*((-1)^HarmonicSums`Private`ExpVar* (-1035/(256*HarmonicSums`Private`ExpVar^10) + 1323/(128*HarmonicSums`Private`ExpVar^9) - 7/(64*HarmonicSums`Private`ExpVar^8) - 105/(64*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 15/(32*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) - z3/16) - (21*ln2^2*z3)/16 + (-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))* z3 + sinf*(-2*li4half - ln2^4/12 + (3*ln2^2*z2)/4 + (7*z2^2)/8 - (21*ln2*z3)/8) - (39*z5)/8, S[1, 1, 1, -2, HarmonicSums`Private`ExpVar] :> li5half + li4half*ln2 + ln2^5/30 + (-1)^HarmonicSums`Private`ExpVar* (5093/(256*HarmonicSums`Private`ExpVar^10) - 921/(128*HarmonicSums`Private`ExpVar^9) - 141/(128*HarmonicSums`Private`ExpVar^8) + 87/(64*HarmonicSums`Private`ExpVar^7) - 7/(16*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^5)) - (ln2^3*z2)/6 - (sinf^3*z2)/12 + z2*(-(40*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(72*HarmonicSums`Private`ExpVar^8) - 1/(72*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - (11*z3)/48) + (7*ln2^2*z3)/16 + (-(480*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(672*HarmonicSums`Private`ExpVar^7) - 1/(480*HarmonicSums`Private`ExpVar^5) + 1/(96*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3 - (sinf^2*z3)/16 + sinf*(li4half + ln2^4/24 - (ln2^2*z2)/4 + (-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - (13*z2^2)/20 + (7*ln2*z3)/8) - z5, S[1, 1, 1, 2, HarmonicSums`Private`ExpVar] :> -455543/(3969000*HarmonicSums`Private`ExpVar^10) - 231609829/(5000940000*HarmonicSums`Private`ExpVar^9) + 1905199/(19756800*HarmonicSums`Private`ExpVar^8) + 35635723/(1555848000*HarmonicSums`Private`ExpVar^7) - 105707/(432000*HarmonicSums`Private`ExpVar^6) + 1567541/(3240000*HarmonicSums`Private`ExpVar^5) - 2375/(3456*HarmonicSums`Private`ExpVar^4) + 1085/(1296*HarmonicSums`Private`ExpVar^3) - 15/(16*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1) + (sinf^3*z2)/6 + sinf*((1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2 + (9*z2^2)/10) + z2*(1/(20*HarmonicSums`Private`ExpVar^10) - 1/(36*HarmonicSums`Private`ExpVar^8) + 1/(36*HarmonicSums`Private`ExpVar^6) - 1/(12*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(6*HarmonicSums`Private`ExpVar^2) - z3/6) + (-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))* z3 - (sinf^2*z3)/2 - z5, S[-1, -1, -1, -1, -1, HarmonicSums`Private`ExpVar] :> -(ln2^5/120) + (-1)^HarmonicSums`Private`ExpVar* (-510875/(73728*HarmonicSums`Private`ExpVar^10) + 1033057/(1290240*HarmonicSums`Private`ExpVar^9) + 24523/(23040*HarmonicSums`Private`ExpVar^8) - 3521/(23040*HarmonicSums`Private`ExpVar^7) - 247/(512*HarmonicSums`Private`ExpVar^6) + 353/(768*HarmonicSums`Private`ExpVar^5) - 11/(48*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(-31/(96*HarmonicSums`Private`ExpVar^10) + 17/(384*HarmonicSums`Private`ExpVar^8) - 1/(96*HarmonicSums`Private`ExpVar^6) + 1/(192*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar)) + ln2^3*(19/(384*HarmonicSums`Private`ExpVar^10) - 263/(2880*HarmonicSums`Private`ExpVar^9) - 3/(256*HarmonicSums`Private`ExpVar^8) + 23/(1008*HarmonicSums`Private`ExpVar^7) + 1/(192*HarmonicSums`Private`ExpVar^6) - 19/(1440*HarmonicSums`Private`ExpVar^5) - 1/(192*HarmonicSums`Private`ExpVar^4) + 5/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar) - z2/12) + (-1)^HarmonicSums`Private`ExpVar* (-279/(160*HarmonicSums`Private`ExpVar^10) + 153/(640*HarmonicSums`Private`ExpVar^8) - 9/(160*HarmonicSums`Private`ExpVar^6) + 9/(320*HarmonicSums`Private`ExpVar^4) - 9/(160*HarmonicSums`Private`ExpVar^2) + 9/(80*HarmonicSums`Private`ExpVar))*z2^2 + z2*((-1)^HarmonicSums`Private`ExpVar* (100969/(15360*HarmonicSums`Private`ExpVar^10) - 4213/(17920*HarmonicSums`Private`ExpVar^9) - 9923/(10752*HarmonicSums`Private`ExpVar^8) + 91/(1920*HarmonicSums`Private`ExpVar^7) + 901/(3840*HarmonicSums`Private`ExpVar^6) - 5/(384*HarmonicSums`Private`ExpVar^5) - 37/(192*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) - z3/8) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (100969/(15360*HarmonicSums`Private`ExpVar^10) - 4213/(17920*HarmonicSums`Private`ExpVar^9) - 9923/(10752*HarmonicSums`Private`ExpVar^8) + 91/(1920*HarmonicSums`Private`ExpVar^7) + 901/(3840*HarmonicSums`Private`ExpVar^6) - 5/(384*HarmonicSums`Private`ExpVar^5) - 37/(192*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 - z3/8) + (19/(256*HarmonicSums`Private`ExpVar^10) - 263/(1920*HarmonicSums`Private`ExpVar^9) - 9/(512*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) + 1/(128*HarmonicSums`Private`ExpVar^6) - 19/(960*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) + 5/(96*HarmonicSums`Private`ExpVar^3) - 3/(32*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z3 + ln2*(-10693/(33600*HarmonicSums`Private`ExpVar^10) + 168251/(161280*HarmonicSums`Private`ExpVar^9) + 11251/(129024*HarmonicSums`Private`ExpVar^8) - 393/(1280*HarmonicSums`Private`ExpVar^7) - 559/(11520*HarmonicSums`Private`ExpVar^6) + 1/(3*HarmonicSums`Private`ExpVar^5) - 145/(384*HarmonicSums`Private`ExpVar^4) + 13/(48*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (19/(128*HarmonicSums`Private`ExpVar^10) - 263/(960*HarmonicSums`Private`ExpVar^9) - 9/(256*HarmonicSums`Private`ExpVar^8) + 23/(336*HarmonicSums`Private`ExpVar^7) + 1/(64*HarmonicSums`Private`ExpVar^6) - 19/(480*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - (9*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z3) - (3*z5)/16, S[-1, -1, -1, -1, 1, HarmonicSums`Private`ExpVar] :> -(ln2^5/120) + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(96*HarmonicSums`Private`ExpVar^10) + 17/(384*HarmonicSums`Private`ExpVar^8) - 1/(96*HarmonicSums`Private`ExpVar^6) + 1/(192*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar)) - 382216721/(112896000*HarmonicSums`Private`ExpVar^10) + 274226641/(406425600*HarmonicSums`Private`ExpVar^9) + 23090533/(36126720*HarmonicSums`Private`ExpVar^8) - 215749/(1612800*HarmonicSums`Private`ExpVar^7) - 58969/(230400*HarmonicSums`Private`ExpVar^6) + 403/(2880*HarmonicSums`Private`ExpVar^5) + 553/(4608*HarmonicSums`Private`ExpVar^4) - 71/(288*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) + (10693/(33600*HarmonicSums`Private`ExpVar^10) - 168251/(161280*HarmonicSums`Private`ExpVar^9) - 11251/(129024*HarmonicSums`Private`ExpVar^8) + 393/(1280*HarmonicSums`Private`ExpVar^7) + 559/(11520*HarmonicSums`Private`ExpVar^6) - 1/(3*HarmonicSums`Private`ExpVar^5) + 145/(384*HarmonicSums`Private`ExpVar^4) - 13/(48*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*sinf + ln2^3*(19/(384*HarmonicSums`Private`ExpVar^10) - 263/(2880*HarmonicSums`Private`ExpVar^9) - 3/(256*HarmonicSums`Private`ExpVar^8) + 23/(1008*HarmonicSums`Private`ExpVar^7) + 1/(192*HarmonicSums`Private`ExpVar^6) - 19/(1440*HarmonicSums`Private`ExpVar^5) - 1/(192*HarmonicSums`Private`ExpVar^4) + 5/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar) - z2/12) + (-1)^HarmonicSums`Private`ExpVar* (589/(160*HarmonicSums`Private`ExpVar^10) - 323/(640*HarmonicSums`Private`ExpVar^8) + 19/(160*HarmonicSums`Private`ExpVar^6) - 19/(320*HarmonicSums`Private`ExpVar^4) + 19/(160*HarmonicSums`Private`ExpVar^2) - 19/(80*HarmonicSums`Private`ExpVar))*z2^2 + z2*((-1)^HarmonicSums`Private`ExpVar* (-100969/(15360*HarmonicSums`Private`ExpVar^10) + 4213/(17920*HarmonicSums`Private`ExpVar^9) + 9923/(10752*HarmonicSums`Private`ExpVar^8) - 91/(1920*HarmonicSums`Private`ExpVar^7) - 901/(3840*HarmonicSums`Private`ExpVar^6) + 5/(384*HarmonicSums`Private`ExpVar^5) + 37/(192*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) - z3/8) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (100969/(15360*HarmonicSums`Private`ExpVar^10) - 4213/(17920*HarmonicSums`Private`ExpVar^9) - 9923/(10752*HarmonicSums`Private`ExpVar^8) + 91/(1920*HarmonicSums`Private`ExpVar^7) + 901/(3840*HarmonicSums`Private`ExpVar^6) - 5/(384*HarmonicSums`Private`ExpVar^5) - 37/(192*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 - z3/8) + (-133/(256*HarmonicSums`Private`ExpVar^10) + 1841/(1920*HarmonicSums`Private`ExpVar^9) + 63/(512*HarmonicSums`Private`ExpVar^8) - 23/(96*HarmonicSums`Private`ExpVar^7) - 7/(128*HarmonicSums`Private`ExpVar^6) + 133/(960*HarmonicSums`Private`ExpVar^5) + 7/(128*HarmonicSums`Private`ExpVar^4) - 35/(96*HarmonicSums`Private`ExpVar^3) + 21/(32*HarmonicSums`Private`ExpVar^2) - 7/(8*HarmonicSums`Private`ExpVar))*z3 + ln2*((19/(128*HarmonicSums`Private`ExpVar^10) - 263/(960*HarmonicSums`Private`ExpVar^9) - 9/(256*HarmonicSums`Private`ExpVar^8) + 23/(336*HarmonicSums`Private`ExpVar^7) + 1/(64*HarmonicSums`Private`ExpVar^6) - 19/(480*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - (9*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z3) + (29*z5)/16, S[-1, -1, -1, 1, -1, HarmonicSums`Private`ExpVar] :> -3*li5half - (13*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) - 10501/(12288*HarmonicSums`Private`ExpVar^10) - 57517/(69120*HarmonicSums`Private`ExpVar^9) + 3343/(12288*HarmonicSums`Private`ExpVar^8) + 2869/(10752*HarmonicSums`Private`ExpVar^7) - 521/(1536*HarmonicSums`Private`ExpVar^6) + 403/(1920*HarmonicSums`Private`ExpVar^5) - 11/(128*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* ln2*(-100969/(7680*HarmonicSums`Private`ExpVar^10) + 4213/(8960*HarmonicSums`Private`ExpVar^9) + 9923/(5376*HarmonicSums`Private`ExpVar^8) - 91/(960*HarmonicSums`Private`ExpVar^7) - 901/(1920*HarmonicSums`Private`ExpVar^6) + 5/(192*HarmonicSums`Private`ExpVar^5) + 37/(96*HarmonicSums`Private`ExpVar^4) - 7/(16*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*sinf + ln2^3*(19/(384*HarmonicSums`Private`ExpVar^10) - 263/(2880*HarmonicSums`Private`ExpVar^9) - 3/(256*HarmonicSums`Private`ExpVar^8) + 23/(1008*HarmonicSums`Private`ExpVar^7) + 1/(192*HarmonicSums`Private`ExpVar^6) - 19/(1440*HarmonicSums`Private`ExpVar^5) - 1/(192*HarmonicSums`Private`ExpVar^4) + 5/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar) + (5*z2)/12) + (-1)^HarmonicSums`Private`ExpVar*(93/(10*HarmonicSums`Private`ExpVar^10) - 51/(40*HarmonicSums`Private`ExpVar^8) + 3/(10*HarmonicSums`Private`ExpVar^6) - 3/(20*HarmonicSums`Private`ExpVar^4) + 3/(10*HarmonicSums`Private`ExpVar^2) - 3/(5*HarmonicSums`Private`ExpVar))*z2^2 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-100969/(15360*HarmonicSums`Private`ExpVar^10) + 4213/(17920*HarmonicSums`Private`ExpVar^9) + 9923/(10752*HarmonicSums`Private`ExpVar^8) - 91/(1920*HarmonicSums`Private`ExpVar^7) - 901/(3840*HarmonicSums`Private`ExpVar^6) + 5/(384*HarmonicSums`Private`ExpVar^5) + 37/(192*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 - (23*z3)/16) + (-19/(512*HarmonicSums`Private`ExpVar^10) + 263/(3840*HarmonicSums`Private`ExpVar^9) + 9/(1024*HarmonicSums`Private`ExpVar^8) - 23/(1344*HarmonicSums`Private`ExpVar^7) - 1/(256*HarmonicSums`Private`ExpVar^6) + 19/(1920*HarmonicSums`Private`ExpVar^5) + 1/(256*HarmonicSums`Private`ExpVar^4) - 5/(192*HarmonicSums`Private`ExpVar^3) + 3/(64*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3 - (23*z2*z3)/16 + ln2*(-3*li4half + (-1)^HarmonicSums`Private`ExpVar* (10318457/(716800*HarmonicSums`Private`ExpVar^10) + 13342793/(2508800*HarmonicSums`Private`ExpVar^9) - 3771437/(2257920*HarmonicSums`Private`ExpVar^8) - 26371/(28800*HarmonicSums`Private`ExpVar^7) + 36403/(115200*HarmonicSums`Private`ExpVar^6) + 737/(2304*HarmonicSums`Private`ExpVar^5) - 109/(576*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (-19/(128*HarmonicSums`Private`ExpVar^10) + 263/(960*HarmonicSums`Private`ExpVar^9) + 9/(256*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) - 1/(64*HarmonicSums`Private`ExpVar^6) + 19/(480*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (19*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (-217/(32*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^6) + 7/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3) + (375*z5)/64, S[-1, -1, -1, 1, 1, HarmonicSums`Private`ExpVar] :> -3*li5half - (13*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar* (-16977776527/(16257024000*HarmonicSums`Private`ExpVar^10) + 33262108153/(6322176000*HarmonicSums`Private`ExpVar^9) + 329046913/(948326400*HarmonicSums`Private`ExpVar^8) - 1223023/(1728000*HarmonicSums`Private`ExpVar^7) - 1372361/(6912000*HarmonicSums`Private`ExpVar^6) + 10633/(27648*HarmonicSums`Private`ExpVar^5) - 961/(3456*HarmonicSums`Private`ExpVar^4) + 17/(64*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-10318457/(716800*HarmonicSums`Private`ExpVar^10) - 13342793/(2508800*HarmonicSums`Private`ExpVar^9) + 3771437/(2257920*HarmonicSums`Private`ExpVar^8) + 26371/(28800*HarmonicSums`Private`ExpVar^7) - 36403/(115200*HarmonicSums`Private`ExpVar^6) - 737/(2304*HarmonicSums`Private`ExpVar^5) + 109/(576*HarmonicSums`Private`ExpVar^4) + 5/(32*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*sinf + (-1)^HarmonicSums`Private`ExpVar* (100969/(15360*HarmonicSums`Private`ExpVar^10) - 4213/(17920*HarmonicSums`Private`ExpVar^9) - 9923/(10752*HarmonicSums`Private`ExpVar^8) + 91/(1920*HarmonicSums`Private`ExpVar^7) + 901/(3840*HarmonicSums`Private`ExpVar^6) - 5/(384*HarmonicSums`Private`ExpVar^5) - 37/(192*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*sinf^2 + ln2^3*(19/(384*HarmonicSums`Private`ExpVar^10) - 263/(2880*HarmonicSums`Private`ExpVar^9) - 3/(256*HarmonicSums`Private`ExpVar^8) + 23/(1008*HarmonicSums`Private`ExpVar^7) + 1/(192*HarmonicSums`Private`ExpVar^6) - 19/(1440*HarmonicSums`Private`ExpVar^5) - 1/(192*HarmonicSums`Private`ExpVar^4) + 5/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar) + (5*z2)/12) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 - (23*z3)/16) + z2*((-1)^HarmonicSums`Private`ExpVar* (100969/(15360*HarmonicSums`Private`ExpVar^10) - 4213/(17920*HarmonicSums`Private`ExpVar^9) - 9923/(10752*HarmonicSums`Private`ExpVar^8) + 91/(1920*HarmonicSums`Private`ExpVar^7) + 901/(3840*HarmonicSums`Private`ExpVar^6) - 5/(384*HarmonicSums`Private`ExpVar^5) - 37/(192*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (9*z3)/16) + (133/(512*HarmonicSums`Private`ExpVar^10) - 1841/(3840*HarmonicSums`Private`ExpVar^9) - 63/(1024*HarmonicSums`Private`ExpVar^8) + 23/(192*HarmonicSums`Private`ExpVar^7) + 7/(256*HarmonicSums`Private`ExpVar^6) - 133/(1920*HarmonicSums`Private`ExpVar^5) - 7/(256*HarmonicSums`Private`ExpVar^4) + 35/(192*HarmonicSums`Private`ExpVar^3) - 21/(64*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3 + ln2*(-3*li4half + (-19/(128*HarmonicSums`Private`ExpVar^10) + 263/(960*HarmonicSums`Private`ExpVar^9) + 9/(256*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) - 1/(64*HarmonicSums`Private`ExpVar^6) + 19/(480*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (19*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (-217/(32*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^6) + 7/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3) + (23*z5)/64, S[-1, -1, 1, -1, -1, HarmonicSums`Private`ExpVar] :> 3*li5half - ln2^5/30 + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(96*HarmonicSums`Private`ExpVar^10) + 17/(384*HarmonicSums`Private`ExpVar^8) - 1/(96*HarmonicSums`Private`ExpVar^6) + 1/(192*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar)) - 198432809/(451584000*HarmonicSums`Private`ExpVar^10) + 1156879/(1881600*HarmonicSums`Private`ExpVar^9) + 8002499/(54190080*HarmonicSums`Private`ExpVar^8) - 27853/(230400*HarmonicSums`Private`ExpVar^7) - 165503/(691200*HarmonicSums`Private`ExpVar^6) + 341/(768*HarmonicSums`Private`ExpVar^5) - 971/(2304*HarmonicSums`Private`ExpVar^4) + 9/(32*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + ln2^3*(-19/(192*HarmonicSums`Private`ExpVar^10) + 263/(1440*HarmonicSums`Private`ExpVar^9) + 3/(128*HarmonicSums`Private`ExpVar^8) - 23/(504*HarmonicSums`Private`ExpVar^7) - 1/(96*HarmonicSums`Private`ExpVar^6) + 19/(720*HarmonicSums`Private`ExpVar^5) + 1/(96*HarmonicSums`Private`ExpVar^4) - 5/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar) + z2/6) + (-1)^HarmonicSums`Private`ExpVar*(31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z2^2 + sinf*(ln2^2*(-19/(128*HarmonicSums`Private`ExpVar^10) + 263/(960*HarmonicSums`Private`ExpVar^9) + 9/(256*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) - 1/(64*HarmonicSums`Private`ExpVar^6) + 19/(480*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar)) + (-19/(128*HarmonicSums`Private`ExpVar^10) + 263/(960*HarmonicSums`Private`ExpVar^9) + 9/(256*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) - 1/(64*HarmonicSums`Private`ExpVar^6) + 19/(480*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2) + z2*(19403/(15360*HarmonicSums`Private`ExpVar^10) - 44769/(89600*HarmonicSums`Private`ExpVar^9) - 9889/(43008*HarmonicSums`Private`ExpVar^8) + 439/(4410*HarmonicSums`Private`ExpVar^7) + 299/(3840*HarmonicSums`Private`ExpVar^6) - 1207/(28800*HarmonicSums`Private`ExpVar^5) - 47/(768*HarmonicSums`Private`ExpVar^4) + 23/(288*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) - (7*z3)/16) + ln2^2*(19403/(15360*HarmonicSums`Private`ExpVar^10) - 44769/(89600*HarmonicSums`Private`ExpVar^9) - 9889/(43008*HarmonicSums`Private`ExpVar^8) + 439/(4410*HarmonicSums`Private`ExpVar^7) + 299/(3840*HarmonicSums`Private`ExpVar^6) - 1207/(28800*HarmonicSums`Private`ExpVar^5) - 47/(768*HarmonicSums`Private`ExpVar^4) + 23/(288*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 - (7*z3)/16) + (133/(512*HarmonicSums`Private`ExpVar^10) - 1841/(3840*HarmonicSums`Private`ExpVar^9) - 63/(1024*HarmonicSums`Private`ExpVar^8) + 23/(192*HarmonicSums`Private`ExpVar^7) + 7/(256*HarmonicSums`Private`ExpVar^6) - 133/(1920*HarmonicSums`Private`ExpVar^5) - 7/(256*HarmonicSums`Private`ExpVar^4) + 35/(192*HarmonicSums`Private`ExpVar^3) - 21/(64*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-16555/(2048*HarmonicSums`Private`ExpVar^10) + 6017/(3072*HarmonicSums`Private`ExpVar^9) + 1715/(1536*HarmonicSums`Private`ExpVar^8) - 23/(48*HarmonicSums`Private`ExpVar^7) - 75/(256*HarmonicSums`Private`ExpVar^6) + 51/(128*HarmonicSums`Private`ExpVar^5) - 7/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) + (-19/(128*HarmonicSums`Private`ExpVar^10) + 263/(960*HarmonicSums`Private`ExpVar^9) + 9/(256*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) - 1/(64*HarmonicSums`Private`ExpVar^6) + 19/(480*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (6*z2^2)/5 + (-1)^HarmonicSums`Private`ExpVar* (31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3) - (81*z5)/64, S[-1, -1, 1, -1, 1, HarmonicSums`Private`ExpVar] :> 3*li5half - ln2^5/30 + (-1)^HarmonicSums`Private`ExpVar* (-2230261/(147456*HarmonicSums`Private`ExpVar^10) - 29459/(73728*HarmonicSums`Private`ExpVar^9) + 35927/(18432*HarmonicSums`Private`ExpVar^8) - 61/(1152*HarmonicSums`Private`ExpVar^7) - 1427/(3072*HarmonicSums`Private`ExpVar^6) + 311/(1536*HarmonicSums`Private`ExpVar^5) + 1/(192*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(-31/(96*HarmonicSums`Private`ExpVar^10) + 17/(384*HarmonicSums`Private`ExpVar^8) - 1/(96*HarmonicSums`Private`ExpVar^6) + 1/(192*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar)) + ln2^3*(-19/(192*HarmonicSums`Private`ExpVar^10) + 263/(1440*HarmonicSums`Private`ExpVar^9) + 3/(128*HarmonicSums`Private`ExpVar^8) - 23/(504*HarmonicSums`Private`ExpVar^7) - 1/(96*HarmonicSums`Private`ExpVar^6) + 19/(720*HarmonicSums`Private`ExpVar^5) + 1/(96*HarmonicSums`Private`ExpVar^4) - 5/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar) + z2/6) + (-1)^HarmonicSums`Private`ExpVar* (-93/(32*HarmonicSums`Private`ExpVar^10) + 51/(128*HarmonicSums`Private`ExpVar^8) - 3/(32*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^2) + 3/(16*HarmonicSums`Private`ExpVar))*z2^2 + sinf*((-1)^HarmonicSums`Private`ExpVar* (16555/(2048*HarmonicSums`Private`ExpVar^10) - 6017/(3072*HarmonicSums`Private`ExpVar^9) - 1715/(1536*HarmonicSums`Private`ExpVar^8) + 23/(48*HarmonicSums`Private`ExpVar^7) + 75/(256*HarmonicSums`Private`ExpVar^6) - 51/(128*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + ln2^2*(-19/(128*HarmonicSums`Private`ExpVar^10) + 263/(960*HarmonicSums`Private`ExpVar^9) + 9/(256*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) - 1/(64*HarmonicSums`Private`ExpVar^6) + 19/(480*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar)) + (19/(128*HarmonicSums`Private`ExpVar^10) - 263/(960*HarmonicSums`Private`ExpVar^9) - 9/(256*HarmonicSums`Private`ExpVar^8) + 23/(336*HarmonicSums`Private`ExpVar^7) + 1/(64*HarmonicSums`Private`ExpVar^6) - 19/(480*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2) + ln2^2*(19403/(15360*HarmonicSums`Private`ExpVar^10) - 44769/(89600*HarmonicSums`Private`ExpVar^9) - 9889/(43008*HarmonicSums`Private`ExpVar^8) + 439/(4410*HarmonicSums`Private`ExpVar^7) + 299/(3840*HarmonicSums`Private`ExpVar^6) - 1207/(28800*HarmonicSums`Private`ExpVar^5) - 47/(768*HarmonicSums`Private`ExpVar^4) + 23/(288*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 - (7*z3)/16) + z2*(-19403/(15360*HarmonicSums`Private`ExpVar^10) + 44769/(89600*HarmonicSums`Private`ExpVar^9) + 9889/(43008*HarmonicSums`Private`ExpVar^8) - 439/(4410*HarmonicSums`Private`ExpVar^7) - 299/(3840*HarmonicSums`Private`ExpVar^6) + 1207/(28800*HarmonicSums`Private`ExpVar^5) + 47/(768*HarmonicSums`Private`ExpVar^4) - 23/(288*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar) + (9*z3)/16) + (-19/(512*HarmonicSums`Private`ExpVar^10) + 263/(3840*HarmonicSums`Private`ExpVar^9) + 9/(1024*HarmonicSums`Private`ExpVar^8) - 23/(1344*HarmonicSums`Private`ExpVar^7) - 1/(256*HarmonicSums`Private`ExpVar^6) + 19/(1920*HarmonicSums`Private`ExpVar^5) + 1/(256*HarmonicSums`Private`ExpVar^4) - 5/(192*HarmonicSums`Private`ExpVar^3) + 3/(64*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3 + ln2*((19/(128*HarmonicSums`Private`ExpVar^10) - 263/(960*HarmonicSums`Private`ExpVar^9) - 9/(256*HarmonicSums`Private`ExpVar^8) + 23/(336*HarmonicSums`Private`ExpVar^7) + 1/(64*HarmonicSums`Private`ExpVar^6) - 19/(480*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (6*z2^2)/5 + (-1)^HarmonicSums`Private`ExpVar* (31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3) - (369*z5)/64, S[-1, -1, 1, 1, -1, HarmonicSums`Private`ExpVar] :> 4*li5half + (-1)^HarmonicSums`Private`ExpVar* (21731/(18432*HarmonicSums`Private`ExpVar^10) - 2539/(1024*HarmonicSums`Private`ExpVar^9) + 211/(1536*HarmonicSums`Private`ExpVar^8) + 427/(768*HarmonicSums`Private`ExpVar^7) - 137/(384*HarmonicSums`Private`ExpVar^6) + 23/(192*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + ln2^3*(19/(384*HarmonicSums`Private`ExpVar^10) - 263/(2880*HarmonicSums`Private`ExpVar^9) - 3/(256*HarmonicSums`Private`ExpVar^8) + 23/(1008*HarmonicSums`Private`ExpVar^7) + 1/(192*HarmonicSums`Private`ExpVar^6) - 19/(1440*HarmonicSums`Private`ExpVar^5) - 1/(192*HarmonicSums`Private`ExpVar^4) + 5/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) + ln2^2*(-19403/(15360*HarmonicSums`Private`ExpVar^10) + 44769/(89600*HarmonicSums`Private`ExpVar^9) + 9889/(43008*HarmonicSums`Private`ExpVar^8) - 439/(4410*HarmonicSums`Private`ExpVar^7) - 299/(3840*HarmonicSums`Private`ExpVar^6) + 1207/(28800*HarmonicSums`Private`ExpVar^5) + 47/(768*HarmonicSums`Private`ExpVar^4) - 23/(288*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar)) + (ln2^2*(19/(128*HarmonicSums`Private`ExpVar^10) - 263/(960*HarmonicSums`Private`ExpVar^9) - 9/(256*HarmonicSums`Private`ExpVar^8) + 23/(336*HarmonicSums`Private`ExpVar^7) + 1/(64*HarmonicSums`Private`ExpVar^6) - 19/(480*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar)) + ln2*(-19403/(7680*HarmonicSums`Private`ExpVar^10) + 44769/(44800*HarmonicSums`Private`ExpVar^9) + 9889/(21504*HarmonicSums`Private`ExpVar^8) - 439/(2205*HarmonicSums`Private`ExpVar^7) - 299/(1920*HarmonicSums`Private`ExpVar^6) + 1207/(14400*HarmonicSums`Private`ExpVar^5) + 47/(384*HarmonicSums`Private`ExpVar^4) - 23/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)))*sinf + ln2*(19/(128*HarmonicSums`Private`ExpVar^10) - 263/(960*HarmonicSums`Private`ExpVar^9) - 9/(256*HarmonicSums`Private`ExpVar^8) + 23/(336*HarmonicSums`Private`ExpVar^7) + 1/(64*HarmonicSums`Private`ExpVar^6) - 19/(480*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*sinf^2 + (-1)^HarmonicSums`Private`ExpVar* (-31/(10*HarmonicSums`Private`ExpVar^10) + 17/(40*HarmonicSums`Private`ExpVar^8) - 1/(10*HarmonicSums`Private`ExpVar^6) + 1/(20*HarmonicSums`Private`ExpVar^4) - 1/(10*HarmonicSums`Private`ExpVar^2) + 1/(5*HarmonicSums`Private`ExpVar))*z2^2 + ln2*(li4half + 9718511/(2150400*HarmonicSums`Private`ExpVar^10) + 17100359/(1016064000*HarmonicSums`Private`ExpVar^9) - 4111957/(6021120*HarmonicSums`Private`ExpVar^8) - 4818869/(59270400*HarmonicSums`Private`ExpVar^7) + 20257/(115200*HarmonicSums`Private`ExpVar^6) + 116309/(864000*HarmonicSums`Private`ExpVar^5) - 1435/(4608*HarmonicSums`Private`ExpVar^4) + 251/(864*HarmonicSums`Private`ExpVar^3) - 9/(32*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) + (19/(128*HarmonicSums`Private`ExpVar^10) - 263/(960*HarmonicSums`Private`ExpVar^9) - 9/(256*HarmonicSums`Private`ExpVar^8) + 23/(336*HarmonicSums`Private`ExpVar^7) + 1/(64*HarmonicSums`Private`ExpVar^6) - 19/(480*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2) - 4*z5, S[-1, -1, 1, 1, 1, HarmonicSums`Private`ExpVar] :> 4*li5half + li4half*ln2 + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + 7846201757/(3251404800*HarmonicSums`Private`ExpVar^10) + 2686066398139/(2560481280000*HarmonicSums`Private`ExpVar^9) - 3126388697/(15173222400*HarmonicSums`Private`ExpVar^8) - 5769432239/(24893568000*HarmonicSums`Private`ExpVar^7) - 162413/(2304000*HarmonicSums`Private`ExpVar^6) + 13875917/(51840000*HarmonicSums`Private`ExpVar^5) - 8879/(55296*HarmonicSums`Private`ExpVar^4) - 313/(5184*HarmonicSums`Private`ExpVar^3) + 17/(64*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) + (19403/(15360*HarmonicSums`Private`ExpVar^10) - 44769/(89600*HarmonicSums`Private`ExpVar^9) - 9889/(43008*HarmonicSums`Private`ExpVar^8) + 439/(4410*HarmonicSums`Private`ExpVar^7) + 299/(3840*HarmonicSums`Private`ExpVar^6) - 1207/(28800*HarmonicSums`Private`ExpVar^5) - 47/(768*HarmonicSums`Private`ExpVar^4) + 23/(288*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*sinf^2 + (-19/(384*HarmonicSums`Private`ExpVar^10) + 263/(2880*HarmonicSums`Private`ExpVar^9) + 3/(256*HarmonicSums`Private`ExpVar^8) - 23/(1008*HarmonicSums`Private`ExpVar^7) - 1/(192*HarmonicSums`Private`ExpVar^6) + 19/(1440*HarmonicSums`Private`ExpVar^5) + 1/(192*HarmonicSums`Private`ExpVar^4) - 5/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar))*sinf^3 + (19403/(15360*HarmonicSums`Private`ExpVar^10) - 44769/(89600*HarmonicSums`Private`ExpVar^9) - 9889/(43008*HarmonicSums`Private`ExpVar^8) + 439/(4410*HarmonicSums`Private`ExpVar^7) + 299/(3840*HarmonicSums`Private`ExpVar^6) - 1207/(28800*HarmonicSums`Private`ExpVar^5) - 47/(768*HarmonicSums`Private`ExpVar^4) + 23/(288*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + sinf*(-9718511/(2150400*HarmonicSums`Private`ExpVar^10) - 17100359/(1016064000*HarmonicSums`Private`ExpVar^9) + 4111957/(6021120*HarmonicSums`Private`ExpVar^8) + 4818869/(59270400*HarmonicSums`Private`ExpVar^7) - 20257/(115200*HarmonicSums`Private`ExpVar^6) - 116309/(864000*HarmonicSums`Private`ExpVar^5) + 1435/(4608*HarmonicSums`Private`ExpVar^4) - 251/(864*HarmonicSums`Private`ExpVar^3) + 9/(32*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) + (-19/(128*HarmonicSums`Private`ExpVar^10) + 263/(960*HarmonicSums`Private`ExpVar^9) + 9/(256*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) - 1/(64*HarmonicSums`Private`ExpVar^6) + 19/(480*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2) + (-19/(192*HarmonicSums`Private`ExpVar^10) + 263/(1440*HarmonicSums`Private`ExpVar^9) + 3/(128*HarmonicSums`Private`ExpVar^8) - 23/(504*HarmonicSums`Private`ExpVar^7) - 1/(96*HarmonicSums`Private`ExpVar^6) + 19/(720*HarmonicSums`Private`ExpVar^5) + 1/(96*HarmonicSums`Private`ExpVar^4) - 5/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar))* z3, S[-1, 1, -1, -1, -1, HarmonicSums`Private`ExpVar] :> 3*li5half + (11*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar*li4half* (93/(4*HarmonicSums`Private`ExpVar^10) - 51/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar)) - 87851/(21504*HarmonicSums`Private`ExpVar^10) - 179465/(193536*HarmonicSums`Private`ExpVar^9) + 52501/(61440*HarmonicSums`Private`ExpVar^8) + 4759/(26880*HarmonicSums`Private`ExpVar^7) - 49/(96*HarmonicSums`Private`ExpVar^6) + 89/(240*HarmonicSums`Private`ExpVar^5) - 21/(128*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-395/(128*HarmonicSums`Private`ExpVar^10) - 119/(192*HarmonicSums`Private`ExpVar^9) + 49/(128*HarmonicSums`Private`ExpVar^8) + 5/(48*HarmonicSums`Private`ExpVar^7) - 5/(64*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) - (5*z2)/12) + (-1)^HarmonicSums`Private`ExpVar* (-93/(10*HarmonicSums`Private`ExpVar^10) + 51/(40*HarmonicSums`Private`ExpVar^8) - 3/(10*HarmonicSums`Private`ExpVar^6) + 3/(20*HarmonicSums`Private`ExpVar^4) - 3/(10*HarmonicSums`Private`ExpVar^2) + 3/(5*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z3 + ln2^2*(2733/(2560*HarmonicSums`Private`ExpVar^10) + 183/(256*HarmonicSums`Private`ExpVar^9) - 641/(3072*HarmonicSums`Private`ExpVar^8) - 21/(128*HarmonicSums`Private`ExpVar^7) + 17/(192*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) - 19/(128*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 + (11*z3)/8) + z2*(2733/(2560*HarmonicSums`Private`ExpVar^10) + 183/(256*HarmonicSums`Private`ExpVar^9) - 641/(3072*HarmonicSums`Private`ExpVar^8) - 21/(128*HarmonicSums`Private`ExpVar^7) + 17/(192*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) - 19/(128*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (13*z3)/8) + ln2*(3*li4half + (-1)^HarmonicSums`Private`ExpVar* (956779/(102400*HarmonicSums`Private`ExpVar^10) + 523391/(7526400*HarmonicSums`Private`ExpVar^9) - 2838859/(2257920*HarmonicSums`Private`ExpVar^8) - 3073/(57600*HarmonicSums`Private`ExpVar^7) + 30347/(115200*HarmonicSums`Private`ExpVar^6) + 445/(2304*HarmonicSums`Private`ExpVar^5) - 287/(576*HarmonicSums`Private`ExpVar^4) + 15/(32*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + z2^2/8 + (-1)^HarmonicSums`Private`ExpVar* (31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^3* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2*(31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z3) - (369*z5)/64, S[-1, 1, -1, -1, 1, HarmonicSums`Private`ExpVar] :> 3*li5half + (11*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar* (-94184813/(31752000*HarmonicSums`Private`ExpVar^10) + 3627002573/(790272000*HarmonicSums`Private`ExpVar^9) + 363869339/(474163200*HarmonicSums`Private`ExpVar^8) - 2749253/(3456000*HarmonicSums`Private`ExpVar^7) - 607757/(1728000*HarmonicSums`Private`ExpVar^6) + 1217/(3456*HarmonicSums`Private`ExpVar^5) + 439/(1728*HarmonicSums`Private`ExpVar^4) - 5/(8*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(93/(4*HarmonicSums`Private`ExpVar^10) - 51/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar)) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-395/(128*HarmonicSums`Private`ExpVar^10) - 119/(192*HarmonicSums`Private`ExpVar^9) + 49/(128*HarmonicSums`Private`ExpVar^8) + 5/(48*HarmonicSums`Private`ExpVar^7) - 5/(64*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) - (5*z2)/12) + ln2*(3*li4half + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + z2^2/8) + z2*(-2733/(2560*HarmonicSums`Private`ExpVar^10) - 183/(256*HarmonicSums`Private`ExpVar^9) + 641/(3072*HarmonicSums`Private`ExpVar^8) + 21/(128*HarmonicSums`Private`ExpVar^7) - 17/(192*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) + 19/(128*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - (11*z3)/8) + (-1)^HarmonicSums`Private`ExpVar* (8295/(256*HarmonicSums`Private`ExpVar^10) + 833/(128*HarmonicSums`Private`ExpVar^9) - 1029/(256*HarmonicSums`Private`ExpVar^8) - 35/(32*HarmonicSums`Private`ExpVar^7) + 105/(128*HarmonicSums`Private`ExpVar^6) + 21/(64*HarmonicSums`Private`ExpVar^5) - 21/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2))*z3 + ln2^2*(2733/(2560*HarmonicSums`Private`ExpVar^10) + 183/(256*HarmonicSums`Private`ExpVar^9) - 641/(3072*HarmonicSums`Private`ExpVar^8) - 21/(128*HarmonicSums`Private`ExpVar^7) + 17/(192*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) - 19/(128*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 + (11*z3)/8) + sinf*((-1)^HarmonicSums`Private`ExpVar* (-956779/(102400*HarmonicSums`Private`ExpVar^10) - 523391/(7526400*HarmonicSums`Private`ExpVar^9) + 2838859/(2257920*HarmonicSums`Private`ExpVar^8) + 3073/(57600*HarmonicSums`Private`ExpVar^7) - 30347/(115200*HarmonicSums`Private`ExpVar^6) - 445/(2304*HarmonicSums`Private`ExpVar^5) + 287/(576*HarmonicSums`Private`ExpVar^4) - 15/(32*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2*(31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-217/(16*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^6) + 7/(32*HarmonicSums`Private`ExpVar^4) - 7/(16*HarmonicSums`Private`ExpVar^2) + 7/(8*HarmonicSums`Private`ExpVar))*z3) - (81*z5)/64, S[-1, 1, -1, 1, -1, HarmonicSums`Private`ExpVar] :> -(ln2^5/120) + (-1)^HarmonicSums`Private`ExpVar* (-380347/(147456*HarmonicSums`Private`ExpVar^10) - 10549/(73728*HarmonicSums`Private`ExpVar^9) + 8227/(18432*HarmonicSums`Private`ExpVar^8) + 511/(4608*HarmonicSums`Private`ExpVar^7) - 1049/(3072*HarmonicSums`Private`ExpVar^6) + 401/(1536*HarmonicSums`Private`ExpVar^5) - 23/(192*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar)) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-395/(128*HarmonicSums`Private`ExpVar^10) - 119/(192*HarmonicSums`Private`ExpVar^9) + 49/(128*HarmonicSums`Private`ExpVar^8) + 5/(48*HarmonicSums`Private`ExpVar^7) - 5/(64*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) + z2/12) + (-1)^HarmonicSums`Private`ExpVar*(31/(80*HarmonicSums`Private`ExpVar^10) - 17/(320*HarmonicSums`Private`ExpVar^8) + 1/(80*HarmonicSums`Private`ExpVar^6) - 1/(160*HarmonicSums`Private`ExpVar^4) + 1/(80*HarmonicSums`Private`ExpVar^2) - 1/(40*HarmonicSums`Private`ExpVar))*z2^2 + ln2*(32639/(153600*HarmonicSums`Private`ExpVar^10) + 31061/(9216*HarmonicSums`Private`ExpVar^9) - 3685/(36864*HarmonicSums`Private`ExpVar^8) - 11/(16*HarmonicSums`Private`ExpVar^7) + 193/(2304*HarmonicSums`Private`ExpVar^6) + 107/(384*HarmonicSums`Private`ExpVar^5) - 53/(256*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (3*z2^2)/8) + ln2^2*(-2733/(2560*HarmonicSums`Private`ExpVar^10) - 183/(256*HarmonicSums`Private`ExpVar^9) + 641/(3072*HarmonicSums`Private`ExpVar^8) + 21/(128*HarmonicSums`Private`ExpVar^7) - 17/(192*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) + 19/(128*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + z3/16) + (-1)^HarmonicSums`Private`ExpVar* (1185/(512*HarmonicSums`Private`ExpVar^10) + 119/(256*HarmonicSums`Private`ExpVar^9) - 147/(512*HarmonicSums`Private`ExpVar^8) - 5/(64*HarmonicSums`Private`ExpVar^7) + 15/(256*HarmonicSums`Private`ExpVar^6) + 3/(128*HarmonicSums`Private`ExpVar^5) - 3/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2))*z3 - (z2*z3)/16 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^3* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar)) + ln2*(-2733/(1280*HarmonicSums`Private`ExpVar^10) - 183/(128*HarmonicSums`Private`ExpVar^9) + 641/(1536*HarmonicSums`Private`ExpVar^8) + 21/(64*HarmonicSums`Private`ExpVar^7) - 17/(96*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) + 19/(64*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2) + (-1)^HarmonicSums`Private`ExpVar* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3) + (3*z5)/64, S[-1, 1, -1, 1, 1, HarmonicSums`Private`ExpVar] :> -(ln2^5/120) + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar)) - 797312951/(129024000*HarmonicSums`Private`ExpVar^10) + 57764617/(23224320*HarmonicSums`Private`ExpVar^9) + 4068107/(4423680*HarmonicSums`Private`ExpVar^8) - 70541/(161280*HarmonicSums`Private`ExpVar^7) - 8729/(27648*HarmonicSums`Private`ExpVar^6) + 8303/(23040*HarmonicSums`Private`ExpVar^5) - 481/(3072*HarmonicSums`Private`ExpVar^4) + 13/(288*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + (2733/(2560*HarmonicSums`Private`ExpVar^10) + 183/(256*HarmonicSums`Private`ExpVar^9) - 641/(3072*HarmonicSums`Private`ExpVar^8) - 21/(128*HarmonicSums`Private`ExpVar^7) + 17/(192*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) - 19/(128*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*sinf^2 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-395/(128*HarmonicSums`Private`ExpVar^10) - 119/(192*HarmonicSums`Private`ExpVar^9) + 49/(128*HarmonicSums`Private`ExpVar^8) + 5/(48*HarmonicSums`Private`ExpVar^7) - 5/(64*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) + z2/12) + (-1)^HarmonicSums`Private`ExpVar* (-31/(80*HarmonicSums`Private`ExpVar^10) + 17/(320*HarmonicSums`Private`ExpVar^8) - 1/(80*HarmonicSums`Private`ExpVar^6) + 1/(160*HarmonicSums`Private`ExpVar^4) - 1/(80*HarmonicSums`Private`ExpVar^2) + 1/(40*HarmonicSums`Private`ExpVar))*z2^2 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + z3/16) + z2*(2733/(2560*HarmonicSums`Private`ExpVar^10) + 183/(256*HarmonicSums`Private`ExpVar^9) - 641/(3072*HarmonicSums`Private`ExpVar^8) - 21/(128*HarmonicSums`Private`ExpVar^7) + 17/(192*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) - 19/(128*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (15*z3)/16) + (-1)^HarmonicSums`Private`ExpVar* (-8295/(512*HarmonicSums`Private`ExpVar^10) - 833/(256*HarmonicSums`Private`ExpVar^9) + 1029/(512*HarmonicSums`Private`ExpVar^8) + 35/(64*HarmonicSums`Private`ExpVar^7) - 105/(256*HarmonicSums`Private`ExpVar^6) - 21/(128*HarmonicSums`Private`ExpVar^5) + 21/(128*HarmonicSums`Private`ExpVar^4) + 7/(64*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2))*z3 + ln2*((-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (3*z2^2)/8 + (-1)^HarmonicSums`Private`ExpVar* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^3* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar)) - 32639/(153600*HarmonicSums`Private`ExpVar^10) - 31061/(9216*HarmonicSums`Private`ExpVar^9) + 3685/(36864*HarmonicSums`Private`ExpVar^8) + 11/(16*HarmonicSums`Private`ExpVar^7) - 193/(2304*HarmonicSums`Private`ExpVar^6) - 107/(384*HarmonicSums`Private`ExpVar^5) + 53/(256*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* ln2*(-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (217/(32*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^6) - 7/(64*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3) - (29*z5)/64, S[-1, 1, 1, -1, -1, HarmonicSums`Private`ExpVar] :> -2*li5half - ln2^5/30 + (-1)^HarmonicSums`Private`ExpVar* (19371727769/(2322432000*HarmonicSums`Private`ExpVar^10) - 127089979/(2107392000*HarmonicSums`Private`ExpVar^9) - 1040959571/(948326400*HarmonicSums`Private`ExpVar^8) + 203749/(3456000*HarmonicSums`Private`ExpVar^7) + 464389/(6912000*HarmonicSums`Private`ExpVar^6) + 9151/(27648*HarmonicSums`Private`ExpVar^5) - 1933/(3456*HarmonicSums`Private`ExpVar^4) + 31/(64*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (395/(64*HarmonicSums`Private`ExpVar^10) + 119/(96*HarmonicSums`Private`ExpVar^9) - 49/(64*HarmonicSums`Private`ExpVar^8) - 5/(24*HarmonicSums`Private`ExpVar^7) + 5/(32*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2)) + z2/6) + (-1)^HarmonicSums`Private`ExpVar* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2^2 + sinf^2*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2) + ln2*(-li4half - 3075/(512*HarmonicSums`Private`ExpVar^10) - 47/(576*HarmonicSums`Private`ExpVar^9) + 539/(512*HarmonicSums`Private`ExpVar^8) - 53/(384*HarmonicSums`Private`ExpVar^7) - 45/(128*HarmonicSums`Private`ExpVar^6) + 31/(96*HarmonicSums`Private`ExpVar^5) - 5/(32*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (2*z2^2)/5) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-32833/(7680*HarmonicSums`Private`ExpVar^10) - 38279/(8960*HarmonicSums`Private`ExpVar^9) + 937/(2688*HarmonicSums`Private`ExpVar^8) + 1231/(1920*HarmonicSums`Private`ExpVar^7) - 37/(1920*HarmonicSums`Private`ExpVar^6) - 31/(192*HarmonicSums`Private`ExpVar^5) - 5/(96*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 - (7*z3)/16) + z2*((-1)^HarmonicSums`Private`ExpVar* (-32833/(7680*HarmonicSums`Private`ExpVar^10) - 38279/(8960*HarmonicSums`Private`ExpVar^9) + 937/(2688*HarmonicSums`Private`ExpVar^8) + 1231/(1920*HarmonicSums`Private`ExpVar^7) - 37/(1920*HarmonicSums`Private`ExpVar^6) - 31/(192*HarmonicSums`Private`ExpVar^5) - 5/(96*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (7*z3)/16) + (-1)^HarmonicSums`Private`ExpVar* (-8295/(512*HarmonicSums`Private`ExpVar^10) - 833/(256*HarmonicSums`Private`ExpVar^9) + 1029/(512*HarmonicSums`Private`ExpVar^8) + 35/(64*HarmonicSums`Private`ExpVar^7) - 105/(256*HarmonicSums`Private`ExpVar^6) - 21/(128*HarmonicSums`Private`ExpVar^5) + 21/(128*HarmonicSums`Private`ExpVar^4) + 7/(64*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2))*z3 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (1185/(128*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (-31/(12*HarmonicSums`Private`ExpVar^10) + 17/(48*HarmonicSums`Private`ExpVar^8) - 1/(12*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (217/(32*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^6) - 7/(64*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3) + (27*z5)/32, S[-1, 1, 1, -1, 1, HarmonicSums`Private`ExpVar] :> -2*li5half - ln2^5/30 + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) - 161033/(18432*HarmonicSums`Private`ExpVar^10) - 775439/(414720*HarmonicSums`Private`ExpVar^9) + 5875/(4096*HarmonicSums`Private`ExpVar^8) + 2551/(16128*HarmonicSums`Private`ExpVar^7) - 331/(768*HarmonicSums`Private`ExpVar^6) + 539/(2880*HarmonicSums`Private`ExpVar^5) - 7/(384*HarmonicSums`Private`ExpVar^4) - 1/(72*HarmonicSums`Private`ExpVar^3) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (395/(64*HarmonicSums`Private`ExpVar^10) + 119/(96*HarmonicSums`Private`ExpVar^9) - 49/(64*HarmonicSums`Private`ExpVar^8) - 5/(24*HarmonicSums`Private`ExpVar^7) + 5/(32*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2)) + z2/6) + (-1)^HarmonicSums`Private`ExpVar* (403/(80*HarmonicSums`Private`ExpVar^10) - 221/(320*HarmonicSums`Private`ExpVar^8) + 13/(80*HarmonicSums`Private`ExpVar^6) - 13/(160*HarmonicSums`Private`ExpVar^4) + 13/(80*HarmonicSums`Private`ExpVar^2) - 13/(40*HarmonicSums`Private`ExpVar))*z2^2 + sinf^2*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2) + z2*((-1)^HarmonicSums`Private`ExpVar* (32833/(7680*HarmonicSums`Private`ExpVar^10) + 38279/(8960*HarmonicSums`Private`ExpVar^9) - 937/(2688*HarmonicSums`Private`ExpVar^8) - 1231/(1920*HarmonicSums`Private`ExpVar^7) + 37/(1920*HarmonicSums`Private`ExpVar^6) + 31/(192*HarmonicSums`Private`ExpVar^5) + 5/(96*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) - (9*z3)/16) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-32833/(7680*HarmonicSums`Private`ExpVar^10) - 38279/(8960*HarmonicSums`Private`ExpVar^9) + 937/(2688*HarmonicSums`Private`ExpVar^8) + 1231/(1920*HarmonicSums`Private`ExpVar^7) - 37/(1920*HarmonicSums`Private`ExpVar^6) - 31/(192*HarmonicSums`Private`ExpVar^5) - 5/(96*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 - (7*z3)/16) + (-1)^HarmonicSums`Private`ExpVar* (1185/(512*HarmonicSums`Private`ExpVar^10) + 119/(256*HarmonicSums`Private`ExpVar^9) - 147/(512*HarmonicSums`Private`ExpVar^8) - 5/(64*HarmonicSums`Private`ExpVar^7) + 15/(256*HarmonicSums`Private`ExpVar^6) + 3/(128*HarmonicSums`Private`ExpVar^5) - 3/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2))*z3 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (1185/(128*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (-31/(12*HarmonicSums`Private`ExpVar^10) + 17/(48*HarmonicSums`Private`ExpVar^8) - 1/(12*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar)) + 3075/(512*HarmonicSums`Private`ExpVar^10) + 47/(576*HarmonicSums`Private`ExpVar^9) - 539/(512*HarmonicSums`Private`ExpVar^8) + 53/(384*HarmonicSums`Private`ExpVar^7) + 45/(128*HarmonicSums`Private`ExpVar^6) - 31/(96*HarmonicSums`Private`ExpVar^5) + 5/(32*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(-li4half + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (2*z2^2)/5 + (-1)^HarmonicSums`Private`ExpVar* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z3) + (123*z5)/32, S[-1, 1, 1, 1, -1, HarmonicSums`Private`ExpVar] :> -li5half + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (-395/(128*HarmonicSums`Private`ExpVar^10) - 119/(192*HarmonicSums`Private`ExpVar^9) + 49/(128*HarmonicSums`Private`ExpVar^8) + 5/(48*HarmonicSums`Private`ExpVar^7) - 5/(64*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(31/(96*HarmonicSums`Private`ExpVar^10) - 17/(384*HarmonicSums`Private`ExpVar^8) + 1/(96*HarmonicSums`Private`ExpVar^6) - 1/(192*HarmonicSums`Private`ExpVar^4) + 1/(96*HarmonicSums`Private`ExpVar^2) - 1/(48*HarmonicSums`Private`ExpVar)) + 3097/(1024*HarmonicSums`Private`ExpVar^10) - 987/(512*HarmonicSums`Private`ExpVar^9) - 1043/(6144*HarmonicSums`Private`ExpVar^8) + 35/(64*HarmonicSums`Private`ExpVar^7) - 115/(384*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + ((-1)^HarmonicSums`Private`ExpVar*ln2* (-1185/(128*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar)))*sinf^2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar))*sinf^3 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (32833/(7680*HarmonicSums`Private`ExpVar^10) + 38279/(8960*HarmonicSums`Private`ExpVar^9) - 937/(2688*HarmonicSums`Private`ExpVar^8) - 1231/(1920*HarmonicSums`Private`ExpVar^7) + 37/(1920*HarmonicSums`Private`ExpVar^6) + 31/(192*HarmonicSums`Private`ExpVar^5) + 5/(96*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2) + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (-1185/(128*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar)) + ln2*((-1)^HarmonicSums`Private`ExpVar* (32833/(3840*HarmonicSums`Private`ExpVar^10) + 38279/(4480*HarmonicSums`Private`ExpVar^9) - 937/(1344*HarmonicSums`Private`ExpVar^8) - 1231/(960*HarmonicSums`Private`ExpVar^7) + 37/(960*HarmonicSums`Private`ExpVar^6) + 31/(96*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2)) + ln2*((-1)^HarmonicSums`Private`ExpVar* (319181/(26880*HarmonicSums`Private`ExpVar^10) - 232189/(40320*HarmonicSums`Private`ExpVar^9) - 19201/(11520*HarmonicSums`Private`ExpVar^8) + 3691/(5760*HarmonicSums`Private`ExpVar^7) + 35/(96*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^5) - 5/(16*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (31/(12*HarmonicSums`Private`ExpVar^10) - 17/(48*HarmonicSums`Private`ExpVar^8) + 1/(12*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar))*z3) + z5, S[-1, 1, 1, 1, 1, HarmonicSums`Private`ExpVar] :> -li5half + (-1)^HarmonicSums`Private`ExpVar* (4477769/(322560*HarmonicSums`Private`ExpVar^10) + 3385/(10752*HarmonicSums`Private`ExpVar^9) - 1013/(720*HarmonicSums`Private`ExpVar^8) - 1169/(5760*HarmonicSums`Private`ExpVar^7) + 43/(384*HarmonicSums`Private`ExpVar^6) + 53/(192*HarmonicSums`Private`ExpVar^5) - 23/(96*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (395/(128*HarmonicSums`Private`ExpVar^10) + 119/(192*HarmonicSums`Private`ExpVar^9) - 49/(128*HarmonicSums`Private`ExpVar^8) - 5/(48*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2))*sinf^3 + (-1)^HarmonicSums`Private`ExpVar* (-31/(96*HarmonicSums`Private`ExpVar^10) + 17/(384*HarmonicSums`Private`ExpVar^8) - 1/(96*HarmonicSums`Private`ExpVar^6) + 1/(192*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar))*sinf^4 + (-1)^HarmonicSums`Private`ExpVar* (-32833/(7680*HarmonicSums`Private`ExpVar^10) - 38279/(8960*HarmonicSums`Private`ExpVar^9) + 937/(2688*HarmonicSums`Private`ExpVar^8) + 1231/(1920*HarmonicSums`Private`ExpVar^7) - 37/(1920*HarmonicSums`Private`ExpVar^6) - 31/(192*HarmonicSums`Private`ExpVar^5) - 5/(96*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-279/(160*HarmonicSums`Private`ExpVar^10) + 153/(640*HarmonicSums`Private`ExpVar^8) - 9/(160*HarmonicSums`Private`ExpVar^6) + 9/(320*HarmonicSums`Private`ExpVar^4) - 9/(160*HarmonicSums`Private`ExpVar^2) + 9/(80*HarmonicSums`Private`ExpVar))*z2^2 + sinf^2*((-1)^HarmonicSums`Private`ExpVar* (-32833/(7680*HarmonicSums`Private`ExpVar^10) - 38279/(8960*HarmonicSums`Private`ExpVar^9) + 937/(2688*HarmonicSums`Private`ExpVar^8) + 1231/(1920*HarmonicSums`Private`ExpVar^7) - 37/(1920*HarmonicSums`Private`ExpVar^6) - 31/(192*HarmonicSums`Private`ExpVar^5) - 5/(96*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2) + (-1)^HarmonicSums`Private`ExpVar* (395/(64*HarmonicSums`Private`ExpVar^10) + 119/(96*HarmonicSums`Private`ExpVar^9) - 49/(64*HarmonicSums`Private`ExpVar^8) - 5/(24*HarmonicSums`Private`ExpVar^7) + 5/(32*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2))*z3 + sinf*((-1)^HarmonicSums`Private`ExpVar* (-319181/(26880*HarmonicSums`Private`ExpVar^10) + 232189/(40320*HarmonicSums`Private`ExpVar^9) + 19201/(11520*HarmonicSums`Private`ExpVar^8) - 3691/(5760*HarmonicSums`Private`ExpVar^7) - 35/(96*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-31/(12*HarmonicSums`Private`ExpVar^10) + 17/(48*HarmonicSums`Private`ExpVar^8) - 1/(12*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar))*z3), S[1, -1, -1, -1, -1, HarmonicSums`Private`ExpVar] :> -3*li5half + (7*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (395/(128*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^9) - 49/(128*HarmonicSums`Private`ExpVar^8) + 7/(48*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) - 5751893/(9216000*HarmonicSums`Private`ExpVar^10) - 377801/(1658880*HarmonicSums`Private`ExpVar^9) + 3651293/(15482880*HarmonicSums`Private`ExpVar^8) + 16439/(161280*HarmonicSums`Private`ExpVar^7) - 11117/(34560*HarmonicSums`Private`ExpVar^6) + 3983/(11520*HarmonicSums`Private`ExpVar^5) - 401/(1536*HarmonicSums`Private`ExpVar^4) + 11/(72*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + ln2*((-1)^HarmonicSums`Private`ExpVar* (-81883/(7168*HarmonicSums`Private`ExpVar^10) + 398887/(53760*HarmonicSums`Private`ExpVar^9) + 8813/(7680*HarmonicSums`Private`ExpVar^8) - 5251/(3840*HarmonicSums`Private`ExpVar^7) - 5/(32*HarmonicSums`Private`ExpVar^6) + 121/(192*HarmonicSums`Private`ExpVar^5) - 13/(32*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) - 153/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (39*z2^2)/40) + (-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) - 153/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z3 + z2*(2071/(15360*HarmonicSums`Private`ExpVar^10) + 5919/(89600*HarmonicSums`Private`ExpVar^9) - 1745/(43008*HarmonicSums`Private`ExpVar^8) - 8251/(282240*HarmonicSums`Private`ExpVar^7) + 121/(3840*HarmonicSums`Private`ExpVar^6) + 757/(28800*HarmonicSums`Private`ExpVar^5) - 79/(768*HarmonicSums`Private`ExpVar^4) + 49/(288*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar) + z3) + ln2^2*(2071/(15360*HarmonicSums`Private`ExpVar^10) + 5919/(89600*HarmonicSums`Private`ExpVar^9) - 1745/(43008*HarmonicSums`Private`ExpVar^8) - 8251/(282240*HarmonicSums`Private`ExpVar^7) + 121/(3840*HarmonicSums`Private`ExpVar^6) + 757/(28800*HarmonicSums`Private`ExpVar^5) - 79/(768*HarmonicSums`Private`ExpVar^4) + 49/(288*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar) + (9*z3)/8) + sinf*(ln2^4/24 + (ln2^2*z2)/4 + (9*z2^2)/40 + (ln2*z3)/4) + (23*z5)/64, S[1, -1, -1, -1, 1, HarmonicSums`Private`ExpVar] :> -3*li5half + (7*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar* (-3533079/(125440*HarmonicSums`Private`ExpVar^10) + 10346767/(22579200*HarmonicSums`Private`ExpVar^9) + 1455149/(460800*HarmonicSums`Private`ExpVar^8) - 13453/(230400*HarmonicSums`Private`ExpVar^7) - 961/(1536*HarmonicSums`Private`ExpVar^6) + 91/(1152*HarmonicSums`Private`ExpVar^5) + 13/(64*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* ln2^3*(395/(128*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^9) - 49/(128*HarmonicSums`Private`ExpVar^8) + 7/(48*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) + ln2*((-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) - 153/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (67*z2^2)/40) + z2*(-2071/(15360*HarmonicSums`Private`ExpVar^10) - 5919/(89600*HarmonicSums`Private`ExpVar^9) + 1745/(43008*HarmonicSums`Private`ExpVar^8) + 8251/(282240*HarmonicSums`Private`ExpVar^7) - 121/(3840*HarmonicSums`Private`ExpVar^6) - 757/(28800*HarmonicSums`Private`ExpVar^5) + 79/(768*HarmonicSums`Private`ExpVar^4) - 49/(288*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) - z3) + (-1)^HarmonicSums`Private`ExpVar* (-8295/(256*HarmonicSums`Private`ExpVar^10) + 1071/(128*HarmonicSums`Private`ExpVar^9) + 1029/(256*HarmonicSums`Private`ExpVar^8) - 49/(32*HarmonicSums`Private`ExpVar^7) - 105/(128*HarmonicSums`Private`ExpVar^6) + 35/(64*HarmonicSums`Private`ExpVar^5) + 21/(64*HarmonicSums`Private`ExpVar^4) - 21/(32*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2))*z3 + ln2^2*(2071/(15360*HarmonicSums`Private`ExpVar^10) + 5919/(89600*HarmonicSums`Private`ExpVar^9) - 1745/(43008*HarmonicSums`Private`ExpVar^8) - 8251/(282240*HarmonicSums`Private`ExpVar^7) + 121/(3840*HarmonicSums`Private`ExpVar^6) + 757/(28800*HarmonicSums`Private`ExpVar^5) - 79/(768*HarmonicSums`Private`ExpVar^4) + 49/(288*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar) + (9*z3)/8) + sinf*(ln2^4/24 + (-1)^HarmonicSums`Private`ExpVar* (81883/(7168*HarmonicSums`Private`ExpVar^10) - 398887/(53760*HarmonicSums`Private`ExpVar^9) - 8813/(7680*HarmonicSums`Private`ExpVar^8) + 5251/(3840*HarmonicSums`Private`ExpVar^7) + 5/(32*HarmonicSums`Private`ExpVar^6) - 121/(192*HarmonicSums`Private`ExpVar^5) + 13/(32*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (ln2^2*z2)/4 - (19*z2^2)/40 + (ln2*z3)/4) + (375*z5)/64, S[1, -1, -1, 1, -1, HarmonicSums`Private`ExpVar] :> -6*li5half + ln2^5/12 + (-1)^HarmonicSums`Private`ExpVar* (-7009/(3072*HarmonicSums`Private`ExpVar^10) - 3513/(1024*HarmonicSums`Private`ExpVar^9) + 2101/(3072*HarmonicSums`Private`ExpVar^8) + 301/(512*HarmonicSums`Private`ExpVar^7) - 121/(256*HarmonicSums`Private`ExpVar^6) + 11/(64*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4)) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (395/(128*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^9) - 49/(128*HarmonicSums`Private`ExpVar^8) + 7/(48*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) - z2/4) + ln2*(10819/(44800*HarmonicSums`Private`ExpVar^10) + 13221301/(31752000*HarmonicSums`Private`ExpVar^9) - 46163/(1128960*HarmonicSums`Private`ExpVar^8) - 4812571/(29635200*HarmonicSums`Private`ExpVar^7) + 839/(28800*HarmonicSums`Private`ExpVar^6) + 15079/(108000*HarmonicSums`Private`ExpVar^5) - 37/(288*HarmonicSums`Private`ExpVar^4) - 11/(108*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) + 153/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (6*z2^2)/5) + sinf*(3*li4half + ln2^4/6 - (ln2^2*z2)/2 - (6*z2^2)/5 + ln2*(-2071/(7680*HarmonicSums`Private`ExpVar^10) - 5919/(44800*HarmonicSums`Private`ExpVar^9) + 1745/(21504*HarmonicSums`Private`ExpVar^8) + 8251/(141120*HarmonicSums`Private`ExpVar^7) - 121/(1920*HarmonicSums`Private`ExpVar^6) - 757/(14400*HarmonicSums`Private`ExpVar^5) + 79/(384*HarmonicSums`Private`ExpVar^4) - 49/(144*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) + (7*z3)/8)) + ln2^2*(-2071/(15360*HarmonicSums`Private`ExpVar^10) - 5919/(89600*HarmonicSums`Private`ExpVar^9) + 1745/(43008*HarmonicSums`Private`ExpVar^8) + 8251/(282240*HarmonicSums`Private`ExpVar^7) - 121/(3840*HarmonicSums`Private`ExpVar^6) - 757/(28800*HarmonicSums`Private`ExpVar^5) + 79/(768*HarmonicSums`Private`ExpVar^4) - 49/(288*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) + (7*z3)/16) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(512*HarmonicSums`Private`ExpVar^10) + 153/(256*HarmonicSums`Private`ExpVar^9) + 147/(512*HarmonicSums`Private`ExpVar^8) - 7/(64*HarmonicSums`Private`ExpVar^7) - 15/(256*HarmonicSums`Private`ExpVar^6) + 5/(128*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) - 3/(64*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2))*z3 + 6*z5, S[1, -1, -1, 1, 1, HarmonicSums`Private`ExpVar] :> -6*li5half + ln2^5/12 - 2701317643/(5419008000*HarmonicSums`Private`ExpVar^ 10) + 304595351111/(853493760000*HarmonicSums`Private`ExpVar^9) + 2694932521/(15173222400*HarmonicSums`Private`ExpVar^8) - 809324911/(8297856000*HarmonicSums`Private`ExpVar^7) - 1151233/(6912000*HarmonicSums`Private`ExpVar^6) + 4736833/(17280000*HarmonicSums`Private`ExpVar^5) - 5131/(18432*HarmonicSums`Private`ExpVar^4) + 667/(1728*HarmonicSums`Private`ExpVar^3) - 49/(64*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar) + (2071/(15360*HarmonicSums`Private`ExpVar^10) + 5919/(89600*HarmonicSums`Private`ExpVar^9) - 1745/(43008*HarmonicSums`Private`ExpVar^8) - 8251/(282240*HarmonicSums`Private`ExpVar^7) + 121/(3840*HarmonicSums`Private`ExpVar^6) + 757/(28800*HarmonicSums`Private`ExpVar^5) - 79/(768*HarmonicSums`Private`ExpVar^4) + 49/(288*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*sinf^2 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (395/(128*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^9) - 49/(128*HarmonicSums`Private`ExpVar^8) + 7/(48*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) - z2/4) + (-1)^HarmonicSums`Private`ExpVar*ln2* (-1185/(128*HarmonicSums`Private`ExpVar^10) + 153/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (2071/(15360*HarmonicSums`Private`ExpVar^10) + 5919/(89600*HarmonicSums`Private`ExpVar^9) - 1745/(43008*HarmonicSums`Private`ExpVar^8) - 8251/(282240*HarmonicSums`Private`ExpVar^7) + 121/(3840*HarmonicSums`Private`ExpVar^6) + 757/(28800*HarmonicSums`Private`ExpVar^5) - 79/(768*HarmonicSums`Private`ExpVar^4) + 49/(288*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (7*ln2^2*z3)/16 + (-1)^HarmonicSums`Private`ExpVar* (8295/(512*HarmonicSums`Private`ExpVar^10) - 1071/(256*HarmonicSums`Private`ExpVar^9) - 1029/(512*HarmonicSums`Private`ExpVar^8) + 49/(64*HarmonicSums`Private`ExpVar^7) + 105/(256*HarmonicSums`Private`ExpVar^6) - 35/(128*HarmonicSums`Private`ExpVar^5) - 21/(128*HarmonicSums`Private`ExpVar^4) + 21/(64*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2))*z3 + sinf*(3*li4half + ln2^4/6 - 10819/(44800*HarmonicSums`Private`ExpVar^10) - 13221301/(31752000*HarmonicSums`Private`ExpVar^9) + 46163/(1128960*HarmonicSums`Private`ExpVar^8) + 4812571/(29635200*HarmonicSums`Private`ExpVar^7) - 839/(28800*HarmonicSums`Private`ExpVar^6) - 15079/(108000*HarmonicSums`Private`ExpVar^5) + 37/(288*HarmonicSums`Private`ExpVar^4) + 11/(108*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1) - (ln2^2*z2)/2 + (7*ln2*z3)/8), S[1, -1, 1, -1, -1, HarmonicSums`Private`ExpVar] :> ln2^5/30 + (-1)^HarmonicSums`Private`ExpVar* (-4426459/(376320*HarmonicSums`Private`ExpVar^10) + 129434063/(22579200*HarmonicSums`Private`ExpVar^9) + 624421/(460800*HarmonicSums`Private`ExpVar^8) - 233597/(230400*HarmonicSums`Private`ExpVar^7) - 625/(1536*HarmonicSums`Private`ExpVar^6) + 827/(1152*HarmonicSums`Private`ExpVar^5) - 27/(64*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-395/(64*HarmonicSums`Private`ExpVar^10) + 51/(32*HarmonicSums`Private`ExpVar^9) + 49/(64*HarmonicSums`Private`ExpVar^8) - 7/(24*HarmonicSums`Private`ExpVar^7) - 5/(32*HarmonicSums`Private`ExpVar^6) + 5/(48*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2)) - z2/4) + (-1)^HarmonicSums`Private`ExpVar* (6543/(256*HarmonicSums`Private`ExpVar^10) - 147/(128*HarmonicSums`Private`ExpVar^9) - 189/(64*HarmonicSums`Private`ExpVar^8) + 15/(64*HarmonicSums`Private`ExpVar^7) + 35/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*z2 + ln2*(-164039/(153600*HarmonicSums`Private`ExpVar^10) + 1211/(9216*HarmonicSums`Private`ExpVar^9) + 10741/(36864*HarmonicSums`Private`ExpVar^8) - 19/(192*HarmonicSums`Private`ExpVar^7) - 373/(2304*HarmonicSums`Private`ExpVar^6) + 101/(384*HarmonicSums`Private`ExpVar^5) - 59/(256*HarmonicSums`Private`ExpVar^4) + 7/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) + 153/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (3*z2^2)/40) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (6543/(256*HarmonicSums`Private`ExpVar^10) - 147/(128*HarmonicSums`Private`ExpVar^9) - 189/(64*HarmonicSums`Private`ExpVar^8) + 15/(64*HarmonicSums`Private`ExpVar^7) + 35/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) - z3/16) + (-1)^HarmonicSums`Private`ExpVar* (8295/(512*HarmonicSums`Private`ExpVar^10) - 1071/(256*HarmonicSums`Private`ExpVar^9) - 1029/(512*HarmonicSums`Private`ExpVar^8) + 49/(64*HarmonicSums`Private`ExpVar^7) + 105/(256*HarmonicSums`Private`ExpVar^6) - 35/(128*HarmonicSums`Private`ExpVar^5) - 21/(128*HarmonicSums`Private`ExpVar^4) + 21/(64*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2))*z3 + sinf*(ln2^4/24 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) + 153/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) - z2/4) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) + 153/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - z2^2/8 - (ln2*z3)/8) + (3*z5)/64, S[1, -1, 1, -1, 1, HarmonicSums`Private`ExpVar] :> ln2^5/30 - 19216007/(9216000*HarmonicSums`Private`ExpVar^10) - 8051/(36864*HarmonicSums`Private`ExpVar^9) + 222761/(442368*HarmonicSums`Private`ExpVar^8) + 5/(2304*HarmonicSums`Private`ExpVar^7) - 3403/(13824*HarmonicSums`Private`ExpVar^6) + 45/(256*HarmonicSums`Private`ExpVar^5) - 13/(512*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-395/(64*HarmonicSums`Private`ExpVar^10) + 51/(32*HarmonicSums`Private`ExpVar^9) + 49/(64*HarmonicSums`Private`ExpVar^8) - 7/(24*HarmonicSums`Private`ExpVar^7) - 5/(32*HarmonicSums`Private`ExpVar^6) + 5/(48*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2)) - z2/4) + (-1)^HarmonicSums`Private`ExpVar* (-6543/(256*HarmonicSums`Private`ExpVar^10) + 147/(128*HarmonicSums`Private`ExpVar^9) + 189/(64*HarmonicSums`Private`ExpVar^8) - 15/(64*HarmonicSums`Private`ExpVar^7) - 35/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3))*z2 + ln2*((-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) - 153/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (17*z2^2)/40) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (6543/(256*HarmonicSums`Private`ExpVar^10) - 147/(128*HarmonicSums`Private`ExpVar^9) - 189/(64*HarmonicSums`Private`ExpVar^8) + 15/(64*HarmonicSums`Private`ExpVar^7) + 35/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) - z3/16) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(512*HarmonicSums`Private`ExpVar^10) + 153/(256*HarmonicSums`Private`ExpVar^9) + 147/(512*HarmonicSums`Private`ExpVar^8) - 7/(64*HarmonicSums`Private`ExpVar^7) - 15/(256*HarmonicSums`Private`ExpVar^6) + 5/(128*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) - 3/(64*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2))*z3 + sinf*(ln2^4/24 + 164039/(153600*HarmonicSums`Private`ExpVar^10) - 1211/(9216*HarmonicSums`Private`ExpVar^9) - 10741/(36864*HarmonicSums`Private`ExpVar^8) + 19/(192*HarmonicSums`Private`ExpVar^7) + 373/(2304*HarmonicSums`Private`ExpVar^6) - 101/(384*HarmonicSums`Private`ExpVar^5) + 59/(256*HarmonicSums`Private`ExpVar^4) - 7/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) + 153/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) - z2/4) + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) - 153/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (3*z2^2)/8 - (ln2*z3)/8) - (29*z5)/64, S[1, -1, 1, 1, -1, HarmonicSums`Private`ExpVar] :> li5half + ln2^5/40 + 7331/(18432*HarmonicSums`Private`ExpVar^10) - 318871/(414720*HarmonicSums`Private`ExpVar^9) + 505/(12288*HarmonicSums`Private`ExpVar^8) + 5009/(16128*HarmonicSums`Private`ExpVar^7) - 73/(256*HarmonicSums`Private`ExpVar^6) + 451/(2880*HarmonicSums`Private`ExpVar^5) - 23/(384*HarmonicSums`Private`ExpVar^4) + 1/(72*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* ln2*(1185/(128*HarmonicSums`Private`ExpVar^10) - 153/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*sinf^2 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (395/(128*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^9) - 49/(128*HarmonicSums`Private`ExpVar^8) + 7/(48*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) - z2/6) + ln2*((-1)^HarmonicSums`Private`ExpVar* (82487/(1792*HarmonicSums`Private`ExpVar^10) + 131773/(13440*HarmonicSums`Private`ExpVar^9) - 18431/(3840*HarmonicSums`Private`ExpVar^8) - 2603/(1920*HarmonicSums`Private`ExpVar^7) + 25/(32*HarmonicSums`Private`ExpVar^6) + 19/(48*HarmonicSums`Private`ExpVar^5) - 7/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) - 153/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (7*z2^2)/20) + sinf*(-li4half + (-1)^HarmonicSums`Private`ExpVar*ln2* (-6543/(128*HarmonicSums`Private`ExpVar^10) + 147/(64*HarmonicSums`Private`ExpVar^9) + 189/(32*HarmonicSums`Private`ExpVar^8) - 15/(32*HarmonicSums`Private`ExpVar^7) - 35/(32*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (1185/(128*HarmonicSums`Private`ExpVar^10) - 153/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (2*z2^2)/5) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-6543/(256*HarmonicSums`Private`ExpVar^10) + 147/(128*HarmonicSums`Private`ExpVar^9) + 189/(64*HarmonicSums`Private`ExpVar^8) - 15/(64*HarmonicSums`Private`ExpVar^7) - 35/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + z3/2) + (z2*z3)/2 - (63*z5)/32, S[1, -1, 1, 1, 1, HarmonicSums`Private`ExpVar] :> li5half + ln2^5/40 + (-1)^HarmonicSums`Private`ExpVar* (399943/(80640*HarmonicSums`Private`ExpVar^10) + 23093/(1920*HarmonicSums`Private`ExpVar^9) - 67/(720*HarmonicSums`Private`ExpVar^8) - 143/(96*HarmonicSums`Private`ExpVar^7) - 13/(96*HarmonicSums`Private`ExpVar^6) + 23/(48*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* (6543/(256*HarmonicSums`Private`ExpVar^10) - 147/(128*HarmonicSums`Private`ExpVar^9) - 189/(64*HarmonicSums`Private`ExpVar^8) + 15/(64*HarmonicSums`Private`ExpVar^7) + 35/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*sinf^2 + (-1)^HarmonicSums`Private`ExpVar* (-395/(128*HarmonicSums`Private`ExpVar^10) + 51/(64*HarmonicSums`Private`ExpVar^9) + 49/(128*HarmonicSums`Private`ExpVar^8) - 7/(48*HarmonicSums`Private`ExpVar^7) - 5/(64*HarmonicSums`Private`ExpVar^6) + 5/(96*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2))*sinf^3 - (ln2^3*z2)/6 - (ln2*z2^2)/20 + sinf*(-li4half + (-1)^HarmonicSums`Private`ExpVar* (-82487/(1792*HarmonicSums`Private`ExpVar^10) - 131773/(13440*HarmonicSums`Private`ExpVar^9) + 18431/(3840*HarmonicSums`Private`ExpVar^8) + 2603/(1920*HarmonicSums`Private`ExpVar^7) - 25/(32*HarmonicSums`Private`ExpVar^6) - 19/(48*HarmonicSums`Private`ExpVar^5) + 7/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) + 153/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2) + z2*((-1)^HarmonicSums`Private`ExpVar* (6543/(256*HarmonicSums`Private`ExpVar^10) - 147/(128*HarmonicSums`Private`ExpVar^9) - 189/(64*HarmonicSums`Private`ExpVar^8) + 15/(64*HarmonicSums`Private`ExpVar^7) + 35/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) - z3/2) + (ln2^2*z3)/2 + (-1)^HarmonicSums`Private`ExpVar* (-395/(64*HarmonicSums`Private`ExpVar^10) + 51/(32*HarmonicSums`Private`ExpVar^9) + 49/(64*HarmonicSums`Private`ExpVar^8) - 7/(24*HarmonicSums`Private`ExpVar^7) - 5/(32*HarmonicSums`Private`ExpVar^6) + 5/(48*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2))*z3 + z5/32, S[1, 1, -1, -1, -1, HarmonicSums`Private`ExpVar] :> 4*li5half - ln2^5/12 + (-1)^HarmonicSums`Private`ExpVar* (-528319/(43008*HarmonicSums`Private`ExpVar^10) - 30567/(5120*HarmonicSums`Private`ExpVar^9) + 16801/(7680*HarmonicSums`Private`ExpVar^8) + 91/(128*HarmonicSums`Private`ExpVar^7) - 79/(96*HarmonicSums`Private`ExpVar^6) + 21/(64*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4)) + ln2^3*(-(360*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(504*HarmonicSums`Private`ExpVar^7) - 1/(360*HarmonicSums`Private`ExpVar^5) + 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) + ln2*(-389887/(2150400*HarmonicSums`Private`ExpVar^10) + 51507809/(1016064000*HarmonicSums`Private`ExpVar^9) + 478069/(6021120*HarmonicSums`Private`ExpVar^8) - 3460589/(59270400*HarmonicSums`Private`ExpVar^7) - 7493/(115200*HarmonicSums`Private`ExpVar^6) + 181559/(864000*HarmonicSums`Private`ExpVar^5) - 1525/(4608*HarmonicSums`Private`ExpVar^4) + 359/(864*HarmonicSums`Private`ExpVar^3) - 15/(32*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) + (-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (19*z2^2)/20) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-1035/(512*HarmonicSums`Private`ExpVar^10) + 1323/(256*HarmonicSums`Private`ExpVar^9) - 7/(128*HarmonicSums`Private`ExpVar^8) - 105/(128*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 15/(64*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) - z3) + z2*((-1)^HarmonicSums`Private`ExpVar* (-1035/(512*HarmonicSums`Private`ExpVar^10) + 1323/(256*HarmonicSums`Private`ExpVar^9) - 7/(128*HarmonicSums`Private`ExpVar^8) - 105/(128*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 15/(64*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) - z3/8) + sinf^2*(-(ln2^3/12) - (ln2*z2)/4 - z3/8) + (-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z3 + sinf*(-3*li4half - ln2^4/4 + (ln2^2*z2)/4 + (6*z2^2)/5 - 2*ln2*z3) - 4*z5, S[1, 1, -1, -1, 1, HarmonicSums`Private`ExpVar] :> 4*li5half - ln2^5/12 + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (-1035/(512*HarmonicSums`Private`ExpVar^10) + 1323/(256*HarmonicSums`Private`ExpVar^9) - 7/(128*HarmonicSums`Private`ExpVar^8) - 105/(128*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 15/(64*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) + ln2^3*(-(360*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(504*HarmonicSums`Private`ExpVar^7) - 1/(360*HarmonicSums`Private`ExpVar^5) + 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) - 2216694083/(5419008000*HarmonicSums`Private`ExpVar^10) - 52607557361/(853493760000*HarmonicSums`Private`ExpVar^9) + 181382599/(1011548160*HarmonicSums`Private`ExpVar^8) + 4461691/(8297856000*HarmonicSums`Private`ExpVar^7) - 40231/(256000*HarmonicSums`Private`ExpVar^6) + 2061917/(17280000*HarmonicSums`Private`ExpVar^5) + 2261/(18432*HarmonicSums`Private`ExpVar^4) - 883/(1728*HarmonicSums`Private`ExpVar^3) + 63/(64*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar) + sinf*(-3*li4half - ln2^4/4 + 389887/(2150400*HarmonicSums`Private`ExpVar^ 10) - 51507809/(1016064000*HarmonicSums`Private`ExpVar^9) - 478069/(6021120*HarmonicSums`Private`ExpVar^8) + 3460589/(59270400*HarmonicSums`Private`ExpVar^7) + 7493/(115200*HarmonicSums`Private`ExpVar^6) - 181559/(864000*HarmonicSums`Private`ExpVar^5) + 1525/(4608*HarmonicSums`Private`ExpVar^4) - 359/(864*HarmonicSums`Private`ExpVar^3) + 15/(32*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) + (ln2^2*z2)/4) + ln2*((-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - z2^2/4) + z2*((-1)^HarmonicSums`Private`ExpVar* (1035/(512*HarmonicSums`Private`ExpVar^10) - 1323/(256*HarmonicSums`Private`ExpVar^9) + 7/(128*HarmonicSums`Private`ExpVar^8) + 105/(128*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 15/(64*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + (7*z3)/8) + sinf^2*(-(ln2^3/12) - (ln2*z2)/4 + (7*z3)/8) + (7/(240*HarmonicSums`Private`ExpVar^9) - 1/(48*HarmonicSums`Private`ExpVar^7) + 7/(240*HarmonicSums`Private`ExpVar^5) - 7/(48*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2) - 7/(8*HarmonicSums`Private`ExpVar))*z3, S[1, 1, -1, 1, -1, HarmonicSums`Private`ExpVar] :> li5half - (7*ln2^5)/120 + 328669/(6144000*HarmonicSums`Private`ExpVar^10) - 953497/(3317760*HarmonicSums`Private`ExpVar^9) + 47311/(884736*HarmonicSums`Private`ExpVar^8) + 1871/(10752*HarmonicSums`Private`ExpVar^7) - 6893/(27648*HarmonicSums`Private`ExpVar^6) + 4987/(23040*HarmonicSums`Private`ExpVar^5) - 449/(3072*HarmonicSums`Private`ExpVar^4) + 23/(288*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + ln2^3*(-(360*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(504*HarmonicSums`Private`ExpVar^7) - 1/(360*HarmonicSums`Private`ExpVar^5) + 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar) + z2/4) + sinf*(-(ln2^4/8) + (-1)^HarmonicSums`Private`ExpVar*ln2* (1035/(256*HarmonicSums`Private`ExpVar^10) - 1323/(128*HarmonicSums`Private`ExpVar^9) + 7/(64*HarmonicSums`Private`ExpVar^8) + 105/(64*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) - 15/(32*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (ln2^2*z2)/2 - z2^2/20) + ln2*((-1)^HarmonicSums`Private`ExpVar* (-4347/(128*HarmonicSums`Private`ExpVar^10) + 1939/(128*HarmonicSums`Private`ExpVar^9) + 735/(256*HarmonicSums`Private`ExpVar^8) - 285/(128*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 9/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4)) + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (3*z2^2)/5) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (1035/(512*HarmonicSums`Private`ExpVar^10) - 1323/(256*HarmonicSums`Private`ExpVar^9) + 7/(128*HarmonicSums`Private`ExpVar^8) + 105/(128*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 15/(64*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) - z3/2) + sinf^2*(-(ln2^3/12) + (ln2*z2)/4 + z3/16) + (1/(480*HarmonicSums`Private`ExpVar^9) - 1/(672*HarmonicSums`Private`ExpVar^7) + 1/(480*HarmonicSums`Private`ExpVar^5) - 1/(96*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3 - (7*z2*z3)/16 + z5/32, S[1, 1, -1, 1, 1, HarmonicSums`Private`ExpVar] :> li5half - (7*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar* (-558385/(10752*HarmonicSums`Private`ExpVar^10) + 5287/(1280*HarmonicSums`Private`ExpVar^9) + 18983/(3840*HarmonicSums`Private`ExpVar^8) - 43/(64*HarmonicSums`Private`ExpVar^7) - 155/(192*HarmonicSums`Private`ExpVar^6) + 13/(32*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4)) + ln2^3*(-(360*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(504*HarmonicSums`Private`ExpVar^7) - 1/(360*HarmonicSums`Private`ExpVar^5) + 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar) + z2/4) + ln2*((1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (7*z2^2)/10) + sinf^2*(-(ln2^3/12) + (-1)^HarmonicSums`Private`ExpVar* (-1035/(512*HarmonicSums`Private`ExpVar^10) + 1323/(256*HarmonicSums`Private`ExpVar^9) - 7/(128*HarmonicSums`Private`ExpVar^8) - 105/(128*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 15/(64*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) + (ln2*z2)/4 - (7*z3)/16) + z2*((-1)^HarmonicSums`Private`ExpVar* (-1035/(512*HarmonicSums`Private`ExpVar^10) + 1323/(256*HarmonicSums`Private`ExpVar^9) - 7/(128*HarmonicSums`Private`ExpVar^8) - 105/(128*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 15/(64*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) + z3/16) - ln2^2*z3 + (-7/(480*HarmonicSums`Private`ExpVar^9) + 1/(96*HarmonicSums`Private`ExpVar^7) - 7/(480*HarmonicSums`Private`ExpVar^5) + 7/(96*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3 + sinf*(-(ln2^4/8) + (-1)^HarmonicSums`Private`ExpVar* (4347/(128*HarmonicSums`Private`ExpVar^10) - 1939/(128*HarmonicSums`Private`ExpVar^9) - 735/(256*HarmonicSums`Private`ExpVar^8) + 285/(128*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) - 9/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4)) + (ln2^2*z2)/2 + z2^2/20 - ln2*z3) - (63*z5)/32, S[1, 1, 1, -1, -1, HarmonicSums`Private`ExpVar] :> -li5half + ln2^5/24 - 545566807/(16257024000*HarmonicSums`Private`ExpVar^ 10) - 244235585389/(2560481280000*HarmonicSums`Private`ExpVar^9) + 889750951/(15173222400*HarmonicSums`Private`ExpVar^8) + 1789918799/(24893568000*HarmonicSums`Private`ExpVar^7) - 1484291/(6912000*HarmonicSums`Private`ExpVar^6) + 17072833/(51840000*HarmonicSums`Private`ExpVar^5) - 22543/(55296*HarmonicSums`Private`ExpVar^4) + 2365/(5184*HarmonicSums`Private`ExpVar^3) - 31/(64*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) + sinf^3*(ln2^2/12 + z2/12) + ln2^3*(1/(180*HarmonicSums`Private`ExpVar^9) - 1/(252*HarmonicSums`Private`ExpVar^7) + 1/(180*HarmonicSums`Private`ExpVar^5) - 1/(36*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar) + z2/6) + ln2*((-1)^HarmonicSums`Private`ExpVar* (-315/(16*HarmonicSums`Private`ExpVar^10) - 609/(128*HarmonicSums`Private`ExpVar^9) + 735/(256*HarmonicSums`Private`ExpVar^8) + 35/(128*HarmonicSums`Private`ExpVar^7) - 45/(64*HarmonicSums`Private`ExpVar^6) + 5/(16*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4)) + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + z2^2/4) + sinf*(li4half + ln2^4/6 + ln2^2*(1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) + z2/4) + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + z2^2/4) + sinf^2*(ln2^3/6 + (ln2*z2)/4 - (7*z3)/16) + z2*(1/(40*HarmonicSums`Private`ExpVar^10) - 1/(72*HarmonicSums`Private`ExpVar^8) + 1/(72*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) - (13*z3)/48) + ln2^2*(1/(40*HarmonicSums`Private`ExpVar^10) - 1/(72*HarmonicSums`Private`ExpVar^8) + 1/(72*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) + z3/6) + (-7/(480*HarmonicSums`Private`ExpVar^9) + 1/(96*HarmonicSums`Private`ExpVar^7) - 7/(480*HarmonicSums`Private`ExpVar^5) + 7/(96*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3, S[1, 1, 1, -1, 1, HarmonicSums`Private`ExpVar] :> -li5half + ln2^5/24 + (-1)^HarmonicSums`Private`ExpVar* (-3633/(256*HarmonicSums`Private`ExpVar^10) - 1365/(128*HarmonicSums`Private`ExpVar^9) + 315/(128*HarmonicSums`Private`ExpVar^8) + 15/(16*HarmonicSums`Private`ExpVar^7) - 5/(8*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5)) + ln2^3*(1/(180*HarmonicSums`Private`ExpVar^9) - 1/(252*HarmonicSums`Private`ExpVar^7) + 1/(180*HarmonicSums`Private`ExpVar^5) - 1/(36*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar)) + sinf^3*(ln2^2/12 - z2/12) + ln2*((-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - (13*z2^2)/20) + z2*(-(40*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(72*HarmonicSums`Private`ExpVar^8) - 1/(72*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - (5*z3)/48) + sinf^2*(ln2^3/6 - (ln2*z2)/4 + z3/16) + ln2^2*(1/(40*HarmonicSums`Private`ExpVar^10) - 1/(72*HarmonicSums`Private`ExpVar^8) + 1/(72*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) + (2*z3)/3) + (1/(480*HarmonicSums`Private`ExpVar^9) - 1/(672*HarmonicSums`Private`ExpVar^7) + 1/(480*HarmonicSums`Private`ExpVar^5) - 1/(96*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3 + sinf*(li4half + ln2^4/6 + (-1)^HarmonicSums`Private`ExpVar* (315/(16*HarmonicSums`Private`ExpVar^10) + 609/(128*HarmonicSums`Private`ExpVar^9) - 735/(256*HarmonicSums`Private`ExpVar^8) - 35/(128*HarmonicSums`Private`ExpVar^7) + 45/(64*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)) + ln2^2*(1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) - z2/4) + (-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - (13*z2^2)/20 + ln2*z3) + z5, S[1, 1, 1, 1, -1, HarmonicSums`Private`ExpVar] :> -(ln2^5/120) + (-1)^HarmonicSums`Private`ExpVar* (14595/(1024*HarmonicSums`Private`ExpVar^10) - 1575/(512*HarmonicSums`Private`ExpVar^9) - 35/(32*HarmonicSums`Private`ExpVar^8) + 105/(128*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^5)) - (ln2^2*sinf^3)/12 - (ln2*sinf^4)/24 + sinf^2*(-(ln2^3/12) + ln2*(-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar) - z2/4)) + ln2^3*(-(360*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(504*HarmonicSums`Private`ExpVar^7) - 1/(360*HarmonicSums`Private`ExpVar^5) + 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar) - z2/12) + ln2*(121/(16800*HarmonicSums`Private`ExpVar^10) + 59/(1008*HarmonicSums`Private`ExpVar^9) - 23/(5040*HarmonicSums`Private`ExpVar^8) - 11/(240*HarmonicSums`Private`ExpVar^7) + 7/(1440*HarmonicSums`Private`ExpVar^6) + 5/(48*HarmonicSums`Private`ExpVar^5) - 19/(96*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - (9*z2^2)/40) + sinf*(-(ln2^4/24) + ln2^2*(-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar) - z2/4) + ln2*(-(20*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(36*HarmonicSums`Private`ExpVar^8) - 1/(36*HarmonicSums`Private`ExpVar^6) + 1/(12*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(6*HarmonicSums`Private`ExpVar^2) - z3/3)) + ln2^2*(-(40*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(72*HarmonicSums`Private`ExpVar^8) - 1/(72*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - z3/6), S[1, 1, 1, 1, 1, HarmonicSums`Private`ExpVar] :> -61/(560*HarmonicSums`Private`ExpVar^10) + 23/(1890*HarmonicSums`Private`ExpVar^9) + 49/(720*HarmonicSums`Private`ExpVar^8) - 7/(720*HarmonicSums`Private`ExpVar^7) - 17/(144*HarmonicSums`Private`ExpVar^6) + 71/(360*HarmonicSums`Private`ExpVar^5) - 7/(40*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) + sinf^5/120 + sinf^3*(1/(360*HarmonicSums`Private`ExpVar^9) - 1/(504*HarmonicSums`Private`ExpVar^7) + 1/(360*HarmonicSums`Private`ExpVar^5) - 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar) + z2/12) + sinf*(-121/(16800*HarmonicSums`Private`ExpVar^10) - 59/(1008*HarmonicSums`Private`ExpVar^9) + 23/(5040*HarmonicSums`Private`ExpVar^8) + 11/(240*HarmonicSums`Private`ExpVar^7) - 7/(1440*HarmonicSums`Private`ExpVar^6) - 5/(48*HarmonicSums`Private`ExpVar^5) + 19/(96*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (9*z2^2)/40) + sinf^2*(1/(40*HarmonicSums`Private`ExpVar^10) - 1/(72*HarmonicSums`Private`ExpVar^8) + 1/(72*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) + z3/6) + z2*(1/(40*HarmonicSums`Private`ExpVar^10) - 1/(72*HarmonicSums`Private`ExpVar^8) + 1/(72*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) + z3/6) + (1/(180*HarmonicSums`Private`ExpVar^9) - 1/(252*HarmonicSums`Private`ExpVar^7) + 1/(180*HarmonicSums`Private`ExpVar^5) - 1/(36*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar))*z3 + z5/5, S[-6, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(7/HarmonicSums`Private`ExpVar^9 - 3/(2*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^6)) - (31*z2^3)/140, S[6, HarmonicSums`Private`ExpVar] :> 7/(15*HarmonicSums`Private`ExpVar^9) - 1/(2*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(5*HarmonicSums`Private`ExpVar^5) + (8*z2^3)/35, S[-5, -1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*ln2* (63/(2*HarmonicSums`Private`ExpVar^10) - 35/(8*HarmonicSums`Private`ExpVar^8) + 5/(4*HarmonicSums`Private`ExpVar^6) - 1/(2*HarmonicSums`Private`ExpVar^5)) - 39/(160*HarmonicSums`Private`ExpVar^10) + 71/(240*HarmonicSums`Private`ExpVar^9) + 25/(192*HarmonicSums`Private`ExpVar^8) - 3/(8*HarmonicSums`Private`ExpVar^7) + 7/(24*HarmonicSums`Private`ExpVar^6) - 1/(10*HarmonicSums`Private`ExpVar^5) + s6, S[-5, 1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(735/(32*HarmonicSums`Private`ExpVar^10) + 21/(16*HarmonicSums`Private`ExpVar^9) - 35/(16*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^6)) - s6 + (-1)^HarmonicSums`Private`ExpVar*(-63/(2*HarmonicSums`Private`ExpVar^10) + 35/(8*HarmonicSums`Private`ExpVar^8) - 5/(4*HarmonicSums`Private`ExpVar^6) + 1/(2*HarmonicSums`Private`ExpVar^5))*sinf - (11*z2^3)/20 + (3*z3^2)/4 + (31*ln2*z5)/16, S[5, -1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(-93/(32*HarmonicSums`Private`ExpVar^10) + 57/(16*HarmonicSums`Private`ExpVar^9) + 7/(16*HarmonicSums`Private`ExpVar^8) - 7/(8*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^6)) + (7*z2^3)/40 - (9*z3^2)/32 + ln2*(1/(2*HarmonicSums`Private`ExpVar^10) - 7/(24*HarmonicSums`Private`ExpVar^8) + 5/(12*HarmonicSums`Private`ExpVar^6) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - (31*z5)/16), S[5, 1, HarmonicSums`Private`ExpVar] :> 161/(480*HarmonicSums`Private`ExpVar^10) + 7/(80*HarmonicSums`Private`ExpVar^9) - 77/(576*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^7) + 11/(144*HarmonicSums`Private`ExpVar^6) + 1/(40*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + (-(2*HarmonicSums`Private`ExpVar^10)^(-1) + 7/(24*HarmonicSums`Private`ExpVar^8) - 5/(12*HarmonicSums`Private`ExpVar^6) + 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4))*sinf + (2*z2^3)/5 - z3^2/2, S[-4, -2, HarmonicSums`Private`ExpVar] :> -23/(40*HarmonicSums`Private`ExpVar^10) + 29/(60*HarmonicSums`Private`ExpVar^9) + 11/(48*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^7) + 1/(3*HarmonicSums`Private`ExpVar^6) - 1/(10*HarmonicSums`Private`ExpVar^5) + (-1)^HarmonicSums`Private`ExpVar* (7/HarmonicSums`Private`ExpVar^9 - 5/(4*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4))*z2 + (193*z2^3)/420 - (3*z3^2)/4, S[-4, 2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (1187/(40*HarmonicSums`Private`ExpVar^10) + 211/(60*HarmonicSums`Private`ExpVar^9) - 49/(12*HarmonicSums`Private`ExpVar^8) - 5/(6*HarmonicSums`Private`ExpVar^7) + 3/(2*HarmonicSums`Private`ExpVar^6) - 1/(2*HarmonicSums`Private`ExpVar^5)) + 4*s6 + (-1)^HarmonicSums`Private`ExpVar*(-14/HarmonicSums`Private`ExpVar^9 + 5/(2*HarmonicSums`Private`ExpVar^7) - HarmonicSums`Private`ExpVar^(-5) + 1/(2*HarmonicSums`Private`ExpVar^4))*z2 + (743*z2^3)/840 - (9*z3^2)/4 - (31*ln2*z5)/4, S[4, -2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(-51/(8*HarmonicSums`Private`ExpVar^10) + 15/(4*HarmonicSums`Private`ExpVar^9) + 7/(8*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^(-7) + 1/(4*HarmonicSums`Private`ExpVar^6)) - 4*s6 + (1/(9*HarmonicSums`Private`ExpVar^9) - 1/(12*HarmonicSums`Private`ExpVar^7) + 1/(6*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3))*z2 - (1069*z2^3)/840 + (33*z3^2)/16 + (31*ln2*z5)/4, S[4, 2, HarmonicSums`Private`ExpVar] :> 101/(280*HarmonicSums`Private`ExpVar^10) + 1/(4*HarmonicSums`Private`ExpVar^9) - 143/(720*HarmonicSums`Private`ExpVar^8) - 1/(3*HarmonicSums`Private`ExpVar^7) + 25/(36*HarmonicSums`Private`ExpVar^6) - 3/(5*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) + (-2/(9*HarmonicSums`Private`ExpVar^9) + 1/(6*HarmonicSums`Private`ExpVar^7) - 1/(3*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^4) - 1/(3*HarmonicSums`Private`ExpVar^3))*z2 - (8*z2^3)/105 + z3^2, S[-3, -3, HarmonicSums`Private`ExpVar] :> -15/(16*HarmonicSums`Private`ExpVar^10) + 103/(120*HarmonicSums`Private`ExpVar^9) + 9/(32*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^7) + 3/(8*HarmonicSums`Private`ExpVar^6) - 1/(10*HarmonicSums`Private`ExpVar^5) + (4*z2^3)/35 + (-1)^HarmonicSums`Private`ExpVar* (-459/(16*HarmonicSums`Private`ExpVar^10) + 63/(16*HarmonicSums`Private`ExpVar^8) - 15/(16*HarmonicSums`Private`ExpVar^6) + 9/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3))*z3 + (9*z3^2)/32, S[-3, 3, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(207/(16*HarmonicSums`Private`ExpVar^10) + 85/(24*HarmonicSums`Private`ExpVar^9) - 7/(4*HarmonicSums`Private`ExpVar^8) - 7/(8*HarmonicSums`Private`ExpVar^7) + 7/(8*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5)) - 6*s6 - (439*z2^3)/280 + (-1)^HarmonicSums`Private`ExpVar*(153/(4*HarmonicSums`Private`ExpVar^10) - 21/(4*HarmonicSums`Private`ExpVar^8) + 5/(4*HarmonicSums`Private`ExpVar^6) - 3/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^3))*z3 + (81*z3^2)/32 + (93*ln2*z5)/8, S[3, -3, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-171/(16*HarmonicSums`Private`ExpVar^10) + 33/(8*HarmonicSums`Private`ExpVar^9) + 21/(16*HarmonicSums`Private`ExpVar^8) - 9/(8*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^6)) + 6*s6 + (377*z2^3)/280 + (-9/(80*HarmonicSums`Private`ExpVar^10) + 1/(16*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2))*z3 - (105*z3^2)/32 - (93*ln2*z5)/8, S[3, 3, HarmonicSums`Private`ExpVar] :> 1/(48*HarmonicSums`Private`ExpVar^10) + 11/(40*HarmonicSums`Private`ExpVar^9) - 1/(96*HarmonicSums`Private`ExpVar^8) - 3/(8*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^6) - 7/(20*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) + (4*z2^3)/35 + (3/(20*HarmonicSums`Private`ExpVar^10) - 1/(12*HarmonicSums`Private`ExpVar^8) + 1/(12*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2))*z3 + z3^2/2, S[-2, -4, HarmonicSums`Private`ExpVar] :> -47/(40*HarmonicSums`Private`ExpVar^10) + 89/(60*HarmonicSums`Private`ExpVar^9) + 13/(48*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^7) + 5/(12*HarmonicSums`Private`ExpVar^6) - 1/(10*HarmonicSums`Private`ExpVar^5) + (-1)^HarmonicSums`Private`ExpVar* (-119/(40*HarmonicSums`Private`ExpVar^9) + 21/(40*HarmonicSums`Private`ExpVar^7) - 7/(40*HarmonicSums`Private`ExpVar^5) + 7/(40*HarmonicSums`Private`ExpVar^3) - 7/(40*HarmonicSums`Private`ExpVar^2))*z2^2 - (47*z2^3)/840 + (3*z3^2)/4, S[-2, 4, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(53/(8*HarmonicSums`Private`ExpVar^10) + 43/(12*HarmonicSums`Private`ExpVar^9) - 7/(8*HarmonicSums`Private`ExpVar^8) - 11/(12*HarmonicSums`Private`ExpVar^7) + 2/(3*HarmonicSums`Private`ExpVar^6) - 1/(6*HarmonicSums`Private`ExpVar^5)) + 4*s6 + (-1)^HarmonicSums`Private`ExpVar*(17/(5*HarmonicSums`Private`ExpVar^9) - 3/(5*HarmonicSums`Private`ExpVar^7) + 1/(5*HarmonicSums`Private`ExpVar^5) - 1/(5*HarmonicSums`Private`ExpVar^3) + 1/(5*HarmonicSums`Private`ExpVar^2))*z2^2 + (143*z2^3)/168 - (33*z3^2)/16 - (31*ln2*z5)/4, S[2, -4, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(-129/(8*HarmonicSums`Private`ExpVar^10) + 19/(4*HarmonicSums`Private`ExpVar^9) + 7/(4*HarmonicSums`Private`ExpVar^8) - 5/(4*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^6)) - 4*s6 + (-7/(600*HarmonicSums`Private`ExpVar^9) + 1/(120*HarmonicSums`Private`ExpVar^7) - 7/(600*HarmonicSums`Private`ExpVar^5) + 7/(120*HarmonicSums`Private`ExpVar^3) - 7/(40*HarmonicSums`Private`ExpVar^2) + 7/(20*HarmonicSums`Private`ExpVar))*z2^2 - (1223*z2^3)/840 + (9*z3^2)/4 + (31*ln2*z5)/4, S[2, 4, HarmonicSums`Private`ExpVar] :> -61/(360*HarmonicSums`Private`ExpVar^10) + 19/(60*HarmonicSums`Private`ExpVar^9) + 11/(144*HarmonicSums`Private`ExpVar^8) - 5/(12*HarmonicSums`Private`ExpVar^7) + 4/(9*HarmonicSums`Private`ExpVar^6) - 4/(15*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^4) + (1/(75*HarmonicSums`Private`ExpVar^9) - 1/(105*HarmonicSums`Private`ExpVar^7) + 1/(75*HarmonicSums`Private`ExpVar^5) - 1/(15*HarmonicSums`Private`ExpVar^3) + 1/(5*HarmonicSums`Private`ExpVar^2) - 2/(5*HarmonicSums`Private`ExpVar))* z2^2 + (74*z2^3)/105 - z3^2, S[-1, -5, HarmonicSums`Private`ExpVar] :> -161/(160*HarmonicSums`Private`ExpVar^10) + 581/(240*HarmonicSums`Private`ExpVar^9) + 35/(192*HarmonicSums`Private`ExpVar^8) - 7/(8*HarmonicSums`Private`ExpVar^7) + 11/(24*HarmonicSums`Private`ExpVar^6) - 1/(10*HarmonicSums`Private`ExpVar^5) - s6 + (8*z2^3)/35 + (15*ln2*z5)/16 + (-1)^HarmonicSums`Private`ExpVar* (465/(64*HarmonicSums`Private`ExpVar^10) - 255/(256*HarmonicSums`Private`ExpVar^8) + 15/(64*HarmonicSums`Private`ExpVar^6) - 15/(128*HarmonicSums`Private`ExpVar^4) + 15/(64*HarmonicSums`Private`ExpVar^2) - 15/(32*HarmonicSums`Private`ExpVar))*z5, S[-1, 5, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(91/(32*HarmonicSums`Private`ExpVar^10) + 175/(48*HarmonicSums`Private`ExpVar^9) - 35/(96*HarmonicSums`Private`ExpVar^8) - 23/(24*HarmonicSums`Private`ExpVar^7) + 9/(16*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5)) - (111*z2^3)/280 + (9*z3^2)/32 + (15*ln2*z5)/16 + (-1)^HarmonicSums`Private`ExpVar* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))* z5, S[1, -5, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-735/(32*HarmonicSums`Private`ExpVar^10) + 91/(16*HarmonicSums`Private`ExpVar^9) + 35/(16*HarmonicSums`Private`ExpVar^8) - 11/(8*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^6)) + s6 + (23*z2^3)/70 - (3*z3^2)/4 - (31*ln2*z5)/16 - (15*sinf*z5)/16, S[1, 5, HarmonicSums`Private`ExpVar] :> -161/(480*HarmonicSums`Private`ExpVar^10) + 91/(240*HarmonicSums`Private`ExpVar^9) + 77/(576*HarmonicSums`Private`ExpVar^8) - 11/(24*HarmonicSums`Private`ExpVar^7) + 61/(144*HarmonicSums`Private`ExpVar^6) - 9/(40*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - (6*z2^3)/35 + z3^2/2 + sinf*z5, S[-4, -1, -1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (2139/(160*HarmonicSums`Private`ExpVar^10) + 1249/(480*HarmonicSums`Private`ExpVar^9) - 347/(192*HarmonicSums`Private`ExpVar^8) - 2/(3*HarmonicSums`Private`ExpVar^7) + 13/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5)) + 4*s6 + (-1)^HarmonicSums`Private`ExpVar*(-7/HarmonicSums`Private`ExpVar^9 + 5/(4*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4))*z2 + (1381*z2^3)/1680 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-7/HarmonicSums`Private`ExpVar^9 + 5/(4*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4)) - (3*z2^2)/4) - (57*z3^2)/32 + ln2*(3/(8*HarmonicSums`Private`ExpVar^10) + 31/(180*HarmonicSums`Private`ExpVar^9) - 5/(24*HarmonicSums`Private`ExpVar^8) - 3/(28*HarmonicSums`Private`ExpVar^7) + 1/(3*HarmonicSums`Private`ExpVar^6) - 3/(10*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - (9*z2*z3)/8 - (155*z5)/32), S[-4, -1, 1, HarmonicSums`Private`ExpVar] :> 289/(1440*HarmonicSums`Private`ExpVar^10) + 43919/(113400*HarmonicSums`Private`ExpVar^9) - 803/(8064*HarmonicSums`Private`ExpVar^8) - 599/(2940*HarmonicSums`Private`ExpVar^7) + 259/(1440*HarmonicSums`Private`ExpVar^6) - 11/(400*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + (5*s6)/2 + (-3/(8*HarmonicSums`Private`ExpVar^10) - 31/(180*HarmonicSums`Private`ExpVar^9) + 5/(24*HarmonicSums`Private`ExpVar^8) + 3/(28*HarmonicSums`Private`ExpVar^7) - 1/(3*HarmonicSums`Private`ExpVar^6) + 3/(10*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4))*sinf + (ln2^4*z2)/12 + (2*li4half + (-1)^HarmonicSums`Private`ExpVar* (7/HarmonicSums`Private`ExpVar^9 - 5/(4*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4)))*z2 - (59*z2^3)/420 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-7/HarmonicSums`Private`ExpVar^9 + 5/(4*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4)) - (7*z2^2)/8) - z3^2, S[-4, 1, -1, HarmonicSums`Private`ExpVar] :> -103/(160*HarmonicSums`Private`ExpVar^10) + 1/(5*HarmonicSums`Private`ExpVar^9) + 35/(128*HarmonicSums`Private`ExpVar^8) - 19/(56*HarmonicSums`Private`ExpVar^7) + 3/(16*HarmonicSums`Private`ExpVar^6) - 1/(20*HarmonicSums`Private`ExpVar^5) + (-1)^HarmonicSums`Private`ExpVar* ln2*(14/HarmonicSums`Private`ExpVar^9 - 5/(2*HarmonicSums`Private`ExpVar^7) + HarmonicSums`Private`ExpVar^(-5) - 1/(2*HarmonicSums`Private`ExpVar^4))*sinf - 2*li4half*z2 - (ln2^4*z2)/12 + (115*z2^3)/168 + ln2^2*((-1)^HarmonicSums`Private`ExpVar*(7/HarmonicSums`Private`ExpVar^9 - 5/(4*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4)) + (7*z2^2)/8) + (3*z3^2)/8 + ln2*((-1)^HarmonicSums`Private`ExpVar* (35/(4*HarmonicSums`Private`ExpVar^10) - 12/HarmonicSums`Private`ExpVar^9 - 15/(16*HarmonicSums`Private`ExpVar^8) + 3/(2*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5)) - (3*z2*z3)/2), S[-4, 1, 1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (6503/(320*HarmonicSums`Private`ExpVar^10) - 1121/(480*HarmonicSums`Private`ExpVar^9) - 229/(96*HarmonicSums`Private`ExpVar^8) - 5/(48*HarmonicSums`Private`ExpVar^7) + 3/(4*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5)) + (3*s6)/2 + (-1)^HarmonicSums`Private`ExpVar*(-35/(4*HarmonicSums`Private`ExpVar^10) + 12/HarmonicSums`Private`ExpVar^9 + 15/(16*HarmonicSums`Private`ExpVar^8) - 3/(2*HarmonicSums`Private`ExpVar^7) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5))*sinf + (-1)^HarmonicSums`Private`ExpVar*(-7/HarmonicSums`Private`ExpVar^9 + 5/(4*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4))*sinf^2 + (-1)^HarmonicSums`Private`ExpVar*(-7/HarmonicSums`Private`ExpVar^9 + 5/(4*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4))*z2 + (113*z2^3)/840 - (5*z3^2)/8 - (93*ln2*z5)/32, S[4, -1, -1, HarmonicSums`Private`ExpVar] :> 3/(70*HarmonicSums`Private`ExpVar^10) + 71/(360*HarmonicSums`Private`ExpVar^9) - 107/(5760*HarmonicSums`Private`ExpVar^8) - 199/(672*HarmonicSums`Private`ExpVar^7) + 31/(72*HarmonicSums`Private`ExpVar^6) - 13/(40*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - (3*s6)/2 + (-(9*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(12*HarmonicSums`Private`ExpVar^7) - 1/(6*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3))*z2 - (11*z2^3)/42 + ln2^2*(-(9*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(12*HarmonicSums`Private`ExpVar^7) - 1/(6*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + (3*z2^2)/4) + (53*z3^2)/64 + ln2*((-1)^HarmonicSums`Private`ExpVar* (127/(8*HarmonicSums`Private`ExpVar^10) + 2/HarmonicSums`Private`ExpVar^9 - 9/(4*HarmonicSums`Private`ExpVar^8) - 3/(8*HarmonicSums`Private`ExpVar^7) + 3/(4*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5)) + (9*z2*z3)/8), S[4, -1, 1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(305/(32*HarmonicSums`Private`ExpVar^10) + 117/(32*HarmonicSums`Private`ExpVar^9) - 15/(16*HarmonicSums`Private`ExpVar^8) - 9/(16*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^6)) - 4*s6 + (-1)^HarmonicSums`Private`ExpVar* (-127/(8*HarmonicSums`Private`ExpVar^10) - 2/HarmonicSums`Private`ExpVar^9 + 9/(4*HarmonicSums`Private`ExpVar^8) + 3/(8*HarmonicSums`Private`ExpVar^7) - 3/(4*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5))*sinf - (ln2^4*z2)/24 + (-li4half + 1/(9*HarmonicSums`Private`ExpVar^9) - 1/(12*HarmonicSums`Private`ExpVar^7) + 1/(6*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3))*z2 - (607*z2^3)/840 + ln2^2*(-(9*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(12*HarmonicSums`Private`ExpVar^7) - 1/(6*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + (5*z2^2)/8) + (15*z3^2)/8 + (155*ln2*z5)/32, S[4, 1, -1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(-39/(8*HarmonicSums`Private`ExpVar^10) + 49/(32*HarmonicSums`Private`ExpVar^9) + 3/(4*HarmonicSums`Private`ExpVar^8) - 9/(16*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6)) - (5*s6)/2 + ln2*(2/(9*HarmonicSums`Private`ExpVar^9) - 1/(6*HarmonicSums`Private`ExpVar^7) + 1/(3*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^4) + 1/(3*HarmonicSums`Private`ExpVar^3))*sinf + li4half*z2 + (ln2^4*z2)/24 - (149*z2^3)/168 + ln2^2*(1/(9*HarmonicSums`Private`ExpVar^9) - 1/(12*HarmonicSums`Private`ExpVar^7) + 1/(6*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) - (5*z2^2)/8) + (49*z3^2)/64 + ln2*(5/(36*HarmonicSums`Private`ExpVar^10) - 68/(405*HarmonicSums`Private`ExpVar^9) - 1/(16*HarmonicSums`Private`ExpVar^8) + 11/(126*HarmonicSums`Private`ExpVar^7) + 1/(24*HarmonicSums`Private`ExpVar^6) - 13/(180*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(9*HarmonicSums`Private`ExpVar^3) + (3*z2*z3)/2 + (93*z5)/32), S[4, 1, 1, HarmonicSums`Private`ExpVar] :> 47921/(181440*HarmonicSums`Private`ExpVar^10) + 289073/(4082400*HarmonicSums`Private`ExpVar^9) - 4939/(40320*HarmonicSums`Private`ExpVar^8) - 15383/(105840*HarmonicSums`Private`ExpVar^7) + 503/(1440*HarmonicSums`Private`ExpVar^6) - 3349/(10800*HarmonicSums`Private`ExpVar^5) + 43/(288*HarmonicSums`Private`ExpVar^4) - 1/(27*HarmonicSums`Private`ExpVar^3) + (-5/(36*HarmonicSums`Private`ExpVar^10) + 68/(405*HarmonicSums`Private`ExpVar^9) + 1/(16*HarmonicSums`Private`ExpVar^8) - 11/(126*HarmonicSums`Private`ExpVar^7) - 1/(24*HarmonicSums`Private`ExpVar^6) + 13/(180*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(9*HarmonicSums`Private`ExpVar^3))*sinf + (-(9*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(12*HarmonicSums`Private`ExpVar^7) - 1/(6*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3))*sinf^2 + (-(9*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(12*HarmonicSums`Private`ExpVar^7) - 1/(6*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3))*z2 + (89*z2^3)/210 - z3^2/2, S[-3, -2, -1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (6695/(1344*HarmonicSums`Private`ExpVar^10) + 363/(160*HarmonicSums`Private`ExpVar^9) - 301/(480*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^7) + 23/(48*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5)) - 5*s6 + 2*li4half*z2 + (ln2^4*z2)/12 - (ln2^2*z2^2)/2 - (403*z2^3)/240 + (-1)^HarmonicSums`Private`ExpVar* (-765/(32*HarmonicSums`Private`ExpVar^10) + 105/(32*HarmonicSums`Private`ExpVar^8) - 25/(32*HarmonicSums`Private`ExpVar^6) + 15/(32*HarmonicSums`Private`ExpVar^4) - 5/(16*HarmonicSums`Private`ExpVar^3))*z3 + (51*z3^2)/32 + ln2*(HarmonicSums`Private`ExpVar^(-10) + 2/(5*HarmonicSums`Private`ExpVar^9) - 19/(48*HarmonicSums`Private`ExpVar^8) - 5/(28*HarmonicSums`Private`ExpVar^7) + 11/(24*HarmonicSums`Private`ExpVar^6) - 7/(20*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) + z2*((-1)^HarmonicSums`Private`ExpVar* (459/(8*HarmonicSums`Private`ExpVar^10) - 63/(8*HarmonicSums`Private`ExpVar^8) + 15/(8*HarmonicSums`Private`ExpVar^6) - 9/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^3)) + (27*z3)/8) + (155*z5)/32), S[-3, -2, 1, HarmonicSums`Private`ExpVar] :> 863/(960*HarmonicSums`Private`ExpVar^10) + 3427/(5600*HarmonicSums`Private`ExpVar^9) - 2141/(8064*HarmonicSums`Private`ExpVar^8) - 137/(735*HarmonicSums`Private`ExpVar^7) + 253/(1440*HarmonicSums`Private`ExpVar^6) - 7/(400*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + (-HarmonicSums`Private`ExpVar^(-10) - 2/(5*HarmonicSums`Private`ExpVar^9) + 19/(48*HarmonicSums`Private`ExpVar^8) + 5/(28*HarmonicSums`Private`ExpVar^7) - 11/(24*HarmonicSums`Private`ExpVar^6) + 7/(20*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4))*sinf + (643*z2^3)/840 + (-1)^HarmonicSums`Private`ExpVar* (-765/(32*HarmonicSums`Private`ExpVar^10) + 105/(32*HarmonicSums`Private`ExpVar^8) - 25/(32*HarmonicSums`Private`ExpVar^6) + 15/(32*HarmonicSums`Private`ExpVar^4) - 5/(16*HarmonicSums`Private`ExpVar^3))*z3 - (109*z3^2)/64, S[-3, 2, -1, HarmonicSums`Private`ExpVar] :> -319/(320*HarmonicSums`Private`ExpVar^10) + 553/(1440*HarmonicSums`Private`ExpVar^9) + 127/(384*HarmonicSums`Private`ExpVar^8) - 23/(56*HarmonicSums`Private`ExpVar^7) + 5/(24*HarmonicSums`Private`ExpVar^6) - 1/(20*HarmonicSums`Private`ExpVar^5) + (5*s6)/2 + 4*li4half*z2 + (ln2^4*z2)/6 - ln2^2*z2^2 - (11*z2^3)/12 + (-1)^HarmonicSums`Private`ExpVar* (153/(16*HarmonicSums`Private`ExpVar^10) - 21/(16*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*z3 - (99*z3^2)/64 + ln2*((-1)^HarmonicSums`Private`ExpVar* (331/(21*HarmonicSums`Private`ExpVar^10) - 383/(30*HarmonicSums`Private`ExpVar^9) - 529/(240*HarmonicSums`Private`ExpVar^8) + 9/(4*HarmonicSums`Private`ExpVar^7) + 17/(24*HarmonicSums`Private`ExpVar^6) - 5/(4*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^4)) + z2*((-1)^HarmonicSums`Private`ExpVar* (-459/(8*HarmonicSums`Private`ExpVar^10) + 63/(8*HarmonicSums`Private`ExpVar^8) - 15/(8*HarmonicSums`Private`ExpVar^6) + 9/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^3)) + (15*z3)/8)), S[-3, 2, 1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (326789/(28224*HarmonicSums`Private`ExpVar^10) + 24499/(7200*HarmonicSums`Private`ExpVar^9) - 6131/(7200*HarmonicSums`Private`ExpVar^8) - 7/(6*HarmonicSums`Private`ExpVar^7) - 7/(144*HarmonicSums`Private`ExpVar^6) + 7/(8*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^4)) - (7*s6)/2 + (-1)^HarmonicSums`Private`ExpVar* (-331/(21*HarmonicSums`Private`ExpVar^10) + 383/(30*HarmonicSums`Private`ExpVar^9) + 529/(240*HarmonicSums`Private`ExpVar^8) - 9/(4*HarmonicSums`Private`ExpVar^7) - 17/(24*HarmonicSums`Private`ExpVar^6) + 5/(4*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^4))*sinf - (683*z2^3)/840 + (-1)^HarmonicSums`Private`ExpVar*(153/(2*HarmonicSums`Private`ExpVar^10) - 21/(2*HarmonicSums`Private`ExpVar^8) + 5/(2*HarmonicSums`Private`ExpVar^6) - 3/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-3))* z3 + (59*z3^2)/64 + (217*ln2*z5)/32, S[-3, -1, -2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (2165/(672*HarmonicSums`Private`ExpVar^10) + 703/(240*HarmonicSums`Private`ExpVar^9) - 97/(240*HarmonicSums`Private`ExpVar^8) - 13/(16*HarmonicSums`Private`ExpVar^7) + 25/(48*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5)) - 6*s6 - (ln2^4*z2)/24 + (-li4half - 47/(320*HarmonicSums`Private`ExpVar^10) + 17/(144*HarmonicSums`Private`ExpVar^9) + 11/(192*HarmonicSums`Private`ExpVar^8) - 7/(96*HarmonicSums`Private`ExpVar^7) - 1/(24*HarmonicSums`Private`ExpVar^6) + 7/(48*HarmonicSums`Private`ExpVar^5) - 5/(32*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3))*z2 + (ln2^2*z2^2)/4 - (591*z2^3)/560 + (-1)^HarmonicSums`Private`ExpVar* (1989/(32*HarmonicSums`Private`ExpVar^10) - 273/(32*HarmonicSums`Private`ExpVar^8) + 65/(32*HarmonicSums`Private`ExpVar^6) - 39/(32*HarmonicSums`Private`ExpVar^4) + 13/(16*HarmonicSums`Private`ExpVar^3))*z3 + (9*z3^2)/4 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-153/(4*HarmonicSums`Private`ExpVar^10) + 21/(4*HarmonicSums`Private`ExpVar^8) - 5/(4*HarmonicSums`Private`ExpVar^6) + 3/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^3))*z2 + (155*z5)/16), S[-3, -1, 2, HarmonicSums`Private`ExpVar] :> 767/(3360*HarmonicSums`Private`ExpVar^10) + 1681/(2160*HarmonicSums`Private`ExpVar^9) - 361/(2880*HarmonicSums`Private`ExpVar^8) - 187/(336*HarmonicSums`Private`ExpVar^7) + 95/(144*HarmonicSums`Private`ExpVar^6) - 2/(5*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 5*s6 - (ln2^4*z2)/4 + (-6*li4half + 47/(160*HarmonicSums`Private`ExpVar^10) - 17/(72*HarmonicSums`Private`ExpVar^9) - 11/(96*HarmonicSums`Private`ExpVar^8) + 7/(48*HarmonicSums`Private`ExpVar^7) + 1/(12*HarmonicSums`Private`ExpVar^6) - 7/(24*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (153/(8*HarmonicSums`Private`ExpVar^10) - 21/(8*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3))*z2 + (3*ln2^2*z2^2)/2 + (327*z2^3)/280 + (-1)^HarmonicSums`Private`ExpVar* (-153/(4*HarmonicSums`Private`ExpVar^10) + 21/(4*HarmonicSums`Private`ExpVar^8) - 5/(4*HarmonicSums`Private`ExpVar^6) + 3/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^3))*z3 + (11*z3^2)/4, S[-3, 1, -2, HarmonicSums`Private`ExpVar] :> -281/(160*HarmonicSums`Private`ExpVar^10) + 319/(720*HarmonicSums`Private`ExpVar^9) + 97/(192*HarmonicSums`Private`ExpVar^8) - 57/(112*HarmonicSums`Private`ExpVar^7) + 11/(48*HarmonicSums`Private`ExpVar^6) - 1/(20*HarmonicSums`Private`ExpVar^5) + (ln2^4*z2)/12 + (2*li4half + (-1)^HarmonicSums`Private`ExpVar* (777/(32*HarmonicSums`Private`ExpVar^10) + 35/(16*HarmonicSums`Private`ExpVar^9) - 175/(64*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-153/(8*HarmonicSums`Private`ExpVar^10) + 21/(8*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3))*sinf*z2 - (ln2^2*z2^2)/2 - (9*z2^3)/56 + (-1)^HarmonicSums`Private`ExpVar* (-153/(32*HarmonicSums`Private`ExpVar^10) + 21/(32*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3))*z3 + (7*ln2*z2*z3)/4 - (21*z3^2)/16, S[-3, 1, 2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (1502761/(70560*HarmonicSums`Private`ExpVar^10) - 38507/(3600*HarmonicSums`Private`ExpVar^9) - 1309/(450*HarmonicSums`Private`ExpVar^8) + 27/(16*HarmonicSums`Private`ExpVar^7) + 169/(144*HarmonicSums`Private`ExpVar^6) - 11/(8*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^4)) - s6 - (ln2^4*z2)/24 + (-li4half + (-1)^HarmonicSums`Private`ExpVar* (-777/(16*HarmonicSums`Private`ExpVar^10) - 35/(8*HarmonicSums`Private`ExpVar^9) + 175/(32*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^7) - 15/(16*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4)))*z2 + (-1)^HarmonicSums`Private`ExpVar*(153/(4*HarmonicSums`Private`ExpVar^10) - 21/(4*HarmonicSums`Private`ExpVar^8) + 5/(4*HarmonicSums`Private`ExpVar^6) - 3/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^3))*sinf*z2 + (ln2^2*z2^2)/4 - (83*z2^3)/280 + (-1)^HarmonicSums`Private`ExpVar* (-153/(4*HarmonicSums`Private`ExpVar^10) + 21/(4*HarmonicSums`Private`ExpVar^8) - 5/(4*HarmonicSums`Private`ExpVar^6) + 3/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^3))*z3 + (5*z3^2)/4 + ln2*((-7*z2*z3)/8 + (31*z5)/16), S[3, -2, -1, HarmonicSums`Private`ExpVar] :> -979/(6720*HarmonicSums`Private`ExpVar^10) + 5333/(30240*HarmonicSums`Private`ExpVar^9) + 57/(640*HarmonicSums`Private`ExpVar^8) - 3/(10*HarmonicSums`Private`ExpVar^7) + 5/(16*HarmonicSums`Private`ExpVar^6) - 23/(120*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - (3*s6)/2 - 4*li4half*z2 - (ln2^4*z2)/6 + ln2^2*z2^2 + (13*z2^3)/12 + ln2*((-1)^HarmonicSums`Private`ExpVar* (33/(2*HarmonicSums`Private`ExpVar^10) + 9/(2*HarmonicSums`Private`ExpVar^9) - 39/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^7) + 7/(8*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5)) + z2*(9/(40*HarmonicSums`Private`ExpVar^10) - 1/(8*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2) - (3*z3)/4)) + (-3/(32*HarmonicSums`Private`ExpVar^10) + 5/(96*HarmonicSums`Private`ExpVar^8) - 5/(96*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^4) - 5/(16*HarmonicSums`Private`ExpVar^3) + 5/(16*HarmonicSums`Private`ExpVar^2))*z3 + (23*z3^2)/32, S[3, -2, 1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(601/(64*HarmonicSums`Private`ExpVar^10) + 167/(32*HarmonicSums`Private`ExpVar^9) - 17/(16*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^6)) + (5*s6)/2 + (-1)^HarmonicSums`Private`ExpVar*(-33/(2*HarmonicSums`Private`ExpVar^10) - 9/(2*HarmonicSums`Private`ExpVar^9) + 39/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^7) - 7/(8*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5))*sinf + (677*z2^3)/1680 + (-3/(32*HarmonicSums`Private`ExpVar^10) + 5/(96*HarmonicSums`Private`ExpVar^8) - 5/(96*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^4) - 5/(16*HarmonicSums`Private`ExpVar^3) + 5/(16*HarmonicSums`Private`ExpVar^2))*z3 - (85*z3^2)/64 - (155*ln2*z5)/32, S[3, 2, -1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-461/(64*HarmonicSums`Private`ExpVar^10) + 51/(32*HarmonicSums`Private`ExpVar^9) + HarmonicSums`Private`ExpVar^ (-8) - 5/(8*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6)) + 5*s6 - 2*li4half*z2 - (ln2^4*z2)/12 + (ln2^2*z2^2)/2 + (589*z2^3)/336 + (3/(80*HarmonicSums`Private`ExpVar^10) - 1/(48*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z3 - (41*z3^2)/32 + ln2*(11/(42*HarmonicSums`Private`ExpVar^10) - 118/(945*HarmonicSums`Private`ExpVar^9) - 13/(80*HarmonicSums`Private`ExpVar^8) + 37/(420*HarmonicSums`Private`ExpVar^7) + 7/(24*HarmonicSums`Private`ExpVar^6) - 37/(60*HarmonicSums`Private`ExpVar^5) + 5/(8*HarmonicSums`Private`ExpVar^4) - 1/(3*HarmonicSums`Private`ExpVar^3) + z2*(-9/(40*HarmonicSums`Private`ExpVar^10) + 1/(8*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2) - (9*z3)/2) - (217*z5)/32), S[3, 2, 1, HarmonicSums`Private`ExpVar] :> 52627/(423360*HarmonicSums`Private`ExpVar^10) + 1584403/(9525600*HarmonicSums`Private`ExpVar^9) - 7213/(201600*HarmonicSums`Private`ExpVar^8) - 12919/(88200*HarmonicSums`Private`ExpVar^7) - 1/(160*HarmonicSums`Private`ExpVar^6) + 1439/(3600*HarmonicSums`Private`ExpVar^5) - 61/(96*HarmonicSums`Private`ExpVar^4) + 4/(9*HarmonicSums`Private`ExpVar^3) + (-11/(42*HarmonicSums`Private`ExpVar^10) + 118/(945*HarmonicSums`Private`ExpVar^9) + 13/(80*HarmonicSums`Private`ExpVar^8) - 37/(420*HarmonicSums`Private`ExpVar^7) - 7/(24*HarmonicSums`Private`ExpVar^6) + 37/(60*HarmonicSums`Private`ExpVar^5) - 5/(8*HarmonicSums`Private`ExpVar^4) + 1/(3*HarmonicSums`Private`ExpVar^3))*sinf - (143*z2^3)/210 + (3/(10*HarmonicSums`Private`ExpVar^10) - 1/(6*HarmonicSums`Private`ExpVar^8) + 1/(6*HarmonicSums`Private`ExpVar^6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-3) - HarmonicSums`Private`ExpVar^(-2))*z3 + 3*z3^2, S[3, -1, -2, HarmonicSums`Private`ExpVar] :> -377/(1120*HarmonicSums`Private`ExpVar^10) + 4673/(15120*HarmonicSums`Private`ExpVar^9) + 137/(960*HarmonicSums`Private`ExpVar^8) - 227/(560*HarmonicSums`Private`ExpVar^7) + 3/(8*HarmonicSums`Private`ExpVar^6) - 5/(24*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) + 5*s6 + (ln2^4*z2)/6 + (4*li4half + (-1)^HarmonicSums`Private`ExpVar* (-39/(8*HarmonicSums`Private`ExpVar^10) + 57/(16*HarmonicSums`Private`ExpVar^9) + 21/(32*HarmonicSums`Private`ExpVar^8) - 21/(32*HarmonicSums`Private`ExpVar^7) - 5/(32*HarmonicSums`Private`ExpVar^6) + 5/(16*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)))*z2 - ln2^2*z2^2 - (183*z2^3)/280 + ln2*z2*(-3/(20*HarmonicSums`Private`ExpVar^10) + 1/(12*HarmonicSums`Private`ExpVar^8) - 1/(12*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - (7*z3)/4) + (39/(160*HarmonicSums`Private`ExpVar^10) - 13/(96*HarmonicSums`Private`ExpVar^8) + 13/(96*HarmonicSums`Private`ExpVar^6) - 13/(32*HarmonicSums`Private`ExpVar^4) + 13/(16*HarmonicSums`Private`ExpVar^3) - 13/(16*HarmonicSums`Private`ExpVar^2))*z3 - (29*z3^2)/64, S[3, -1, 2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(961/(96*HarmonicSums`Private`ExpVar^10) + 499/(80*HarmonicSums`Private`ExpVar^9) - 149/(96*HarmonicSums`Private`ExpVar^8) - 65/(48*HarmonicSums`Private`ExpVar^7) + HarmonicSums`Private`ExpVar^ (-6) - 1/(4*HarmonicSums`Private`ExpVar^5)) + 6*s6 + (ln2^4*z2)/12 + (2*li4half + (-1)^HarmonicSums`Private`ExpVar* (39/(4*HarmonicSums`Private`ExpVar^10) - 57/(8*HarmonicSums`Private`ExpVar^9) - 21/(16*HarmonicSums`Private`ExpVar^8) + 21/(16*HarmonicSums`Private`ExpVar^7) + 5/(16*HarmonicSums`Private`ExpVar^6) - 5/(8*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4)))*z2 - (ln2^2*z2^2)/2 + (27*z2^3)/35 + (-3/(20*HarmonicSums`Private`ExpVar^10) + 1/(12*HarmonicSums`Private`ExpVar^8) - 1/(12*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2))*z3 - 4*z3^2 + ln2*(z2*(3/(40*HarmonicSums`Private`ExpVar^10) - 1/(24*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + (7*z3)/8) - (155*z5)/16), S[3, 1, -2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-305/(32*HarmonicSums`Private`ExpVar^10) + 19/(16*HarmonicSums`Private`ExpVar^9) + 43/(32*HarmonicSums`Private`ExpVar^8) - 11/(16*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6)) + s6 + (187/(2400*HarmonicSums`Private`ExpVar^10) + 5/(144*HarmonicSums`Private`ExpVar^9) - 5/(144*HarmonicSums`Private`ExpVar^8) - 1/(48*HarmonicSums`Private`ExpVar^7) + 7/(288*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-3/(40*HarmonicSums`Private`ExpVar^10) + 1/(24*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*sinf*z2 - (27*z2^3)/560 + (-3/(160*HarmonicSums`Private`ExpVar^10) + 1/(96*HarmonicSums`Private`ExpVar^8) - 1/(96*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z3 - (31*z3^2)/64 - (31*ln2*z5)/16, S[3, 1, 2, HarmonicSums`Private`ExpVar] :> 12853/(70560*HarmonicSums`Private`ExpVar^10) + 29941/(1587600*HarmonicSums`Private`ExpVar^9) - 1393/(14400*HarmonicSums`Private`ExpVar^8) - 211/(1200*HarmonicSums`Private`ExpVar^7) + 7/(12*HarmonicSums`Private`ExpVar^6) - 289/(360*HarmonicSums`Private`ExpVar^5) + 11/(16*HarmonicSums`Private`ExpVar^4) - 1/(3*HarmonicSums`Private`ExpVar^3) + (-187/(1200*HarmonicSums`Private`ExpVar^10) - 5/(72*HarmonicSums`Private`ExpVar^9) + 5/(72*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^7) - 7/(144*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (3/(20*HarmonicSums`Private`ExpVar^10) - 1/(12*HarmonicSums`Private`ExpVar^8) + 1/(12*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2))*sinf*z2 + (11*z2^3)/35 + (-3/(20*HarmonicSums`Private`ExpVar^10) + 1/(12*HarmonicSums`Private`ExpVar^8) - 1/(12*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2))*z3, S[-2, -3, -1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(173/(96*HarmonicSums`Private`ExpVar^10) + 67/(32*HarmonicSums`Private`ExpVar^9) - 17/(96*HarmonicSums`Private`ExpVar^8) - 59/(96*HarmonicSums`Private`ExpVar^7) + 35/(96*HarmonicSums`Private`ExpVar^6) - 1/(12*HarmonicSums`Private`ExpVar^5)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-17/HarmonicSums`Private`ExpVar^9 + 3/HarmonicSums`Private`ExpVar^7 - HarmonicSums`Private`ExpVar^(-5) + HarmonicSums`Private`ExpVar^(-3) - HarmonicSums`Private`ExpVar^(-2)) + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (-17/(24*HarmonicSums`Private`ExpVar^9) + 1/(8*HarmonicSums`Private`ExpVar^7) - 1/(24*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) + 5*s6 + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (17/(4*HarmonicSums`Private`ExpVar^9) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar*(51/(10*HarmonicSums`Private`ExpVar^9) - 9/(10*HarmonicSums`Private`ExpVar^7) + 3/(10*HarmonicSums`Private`ExpVar^5) - 3/(10*HarmonicSums`Private`ExpVar^3) + 3/(10*HarmonicSums`Private`ExpVar^2))*z2^2 + (25*z2^3)/24 - (51*z3^2)/32 + ln2*(23/(8*HarmonicSums`Private`ExpVar^10) + 3/(5*HarmonicSums`Private`ExpVar^9) - 37/(48*HarmonicSums`Private`ExpVar^8) - 11/(56*HarmonicSums`Private`ExpVar^7) + 7/(12*HarmonicSums`Private`ExpVar^6) - 2/(5*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - (27*z2*z3)/8 - (155*z5)/32), S[-2, -3, 1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*li4half* (17/HarmonicSums`Private`ExpVar^9 - 3/HarmonicSums`Private`ExpVar^7 + HarmonicSums`Private`ExpVar^(-5) - HarmonicSums`Private`ExpVar^(-3) + HarmonicSums`Private`ExpVar^(-2)) + 251/(96*HarmonicSums`Private`ExpVar^10) + 10043/(12600*HarmonicSums`Private`ExpVar^9) - 4019/(8064*HarmonicSums`Private`ExpVar^8) - 467/(2940*HarmonicSums`Private`ExpVar^7) + 247/(1440*HarmonicSums`Private`ExpVar^6) - 3/(400*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + (-23/(8*HarmonicSums`Private`ExpVar^10) - 3/(5*HarmonicSums`Private`ExpVar^9) + 37/(48*HarmonicSums`Private`ExpVar^8) + 11/(56*HarmonicSums`Private`ExpVar^7) - 7/(12*HarmonicSums`Private`ExpVar^6) + 2/(5*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4))*sinf + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (17/(24*HarmonicSums`Private`ExpVar^9) - 1/(8*HarmonicSums`Private`ExpVar^7) + 1/(24*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) - z2/8) - 3*li4half*z2 + (-1)^HarmonicSums`Private`ExpVar* (-187/(20*HarmonicSums`Private`ExpVar^9) + 33/(20*HarmonicSums`Private`ExpVar^7) - 11/(20*HarmonicSums`Private`ExpVar^5) + 11/(20*HarmonicSums`Private`ExpVar^3) - 11/(20*HarmonicSums`Private`ExpVar^2))*z2^2 + (193*z2^3)/420 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-17/(4*HarmonicSums`Private`ExpVar^9) + 3/(4*HarmonicSums`Private`ExpVar^7) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (3*z2^2)/4) + (179*z3^2)/64 + ln2*((-1)^HarmonicSums`Private`ExpVar* (119/(8*HarmonicSums`Private`ExpVar^9) - 21/(8*HarmonicSums`Private`ExpVar^7) + 7/(8*HarmonicSums`Private`ExpVar^5) - 7/(8*HarmonicSums`Private`ExpVar^3) + 7/(8*HarmonicSums`Private`ExpVar^2))*z3 - (21*z2*z3)/8), S[-2, 3, -1, HarmonicSums`Private`ExpVar] :> -437/(320*HarmonicSums`Private`ExpVar^10) + 341/(480*HarmonicSums`Private`ExpVar^9) + 137/(384*HarmonicSums`Private`ExpVar^8) - 27/(56*HarmonicSums`Private`ExpVar^7) + 11/(48*HarmonicSums`Private`ExpVar^6) - 1/(20*HarmonicSums`Private`ExpVar^5) - (5*s6)/2 + (-1)^HarmonicSums`Private`ExpVar*(17/(16*HarmonicSums`Private`ExpVar^9) - 3/(16*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2^2 - (127*z2^3)/336 + (15*z3^2)/64 + ln2*((-1)^HarmonicSums`Private`ExpVar* (379/(24*HarmonicSums`Private`ExpVar^10) - 61/(12*HarmonicSums`Private`ExpVar^9) - 107/(48*HarmonicSums`Private`ExpVar^8) + 7/(8*HarmonicSums`Private`ExpVar^7) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(4*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* (-119/(8*HarmonicSums`Private`ExpVar^9) + 21/(8*HarmonicSums`Private`ExpVar^7) - 7/(8*HarmonicSums`Private`ExpVar^5) + 7/(8*HarmonicSums`Private`ExpVar^3) - 7/(8*HarmonicSums`Private`ExpVar^2))*z3 + (27*z2*z3)/8), S[-2, 3, 1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (7079/(576*HarmonicSums`Private`ExpVar^10) - 149/(288*HarmonicSums`Private`ExpVar^9) - 161/(144*HarmonicSums`Private`ExpVar^8) - 11/(96*HarmonicSums`Private`ExpVar^7) + 11/(96*HarmonicSums`Private`ExpVar^6) + 1/(6*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) + (3*s6)/2 + (-1)^HarmonicSums`Private`ExpVar* (-379/(24*HarmonicSums`Private`ExpVar^10) + 61/(12*HarmonicSums`Private`ExpVar^9) + 107/(48*HarmonicSums`Private`ExpVar^8) - 7/(8*HarmonicSums`Private`ExpVar^7) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4))*sinf + (-1)^HarmonicSums`Private`ExpVar*(17/(4*HarmonicSums`Private`ExpVar^9) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2^2 + (23*z2^3)/120 - (23*z3^2)/32 - (93*ln2*z5)/32, S[-2, -2, -2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(61/(24*HarmonicSums`Private`ExpVar^9) + 1/(16*HarmonicSums`Private`ExpVar^8) - 37/(48*HarmonicSums`Private`ExpVar^7) + 19/(48*HarmonicSums`Private`ExpVar^6) - 1/(12*HarmonicSums`Private`ExpVar^5)) + (-7/(16*HarmonicSums`Private`ExpVar^10) + 31/(72*HarmonicSums`Private`ExpVar^9) + 1/(8*HarmonicSums`Private`ExpVar^8) - 1/(6*HarmonicSums`Private`ExpVar^7) - 1/(16*HarmonicSums`Private`ExpVar^6) + 5/(24*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar*(221/(80*HarmonicSums`Private`ExpVar^9) - 39/(80*HarmonicSums`Private`ExpVar^7) + 13/(80*HarmonicSums`Private`ExpVar^5) - 13/(80*HarmonicSums`Private`ExpVar^3) + 13/(80*HarmonicSums`Private`ExpVar^2))*z2^2 - (109*z2^3)/560, S[-2, -2, 2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*li4half* (-34/HarmonicSums`Private`ExpVar^9 + 6/HarmonicSums`Private`ExpVar^7 - 2/HarmonicSums`Private`ExpVar^5 + 2/HarmonicSums`Private`ExpVar^3 - 2/HarmonicSums`Private`ExpVar^2) + 2043/(1120*HarmonicSums`Private`ExpVar^10) + 187/(144*HarmonicSums`Private`ExpVar^9) - 349/(720*HarmonicSums`Private`ExpVar^8) - 9/(14*HarmonicSums`Private`ExpVar^7) + 29/(36*HarmonicSums`Private`ExpVar^6) - 9/(20*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-17/(12*HarmonicSums`Private`ExpVar^9) + 1/(4*HarmonicSums`Private`ExpVar^7) - 1/(12*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2)) + z2/4) + (6*li4half + 7/(8*HarmonicSums`Private`ExpVar^10) - 31/(36*HarmonicSums`Private`ExpVar^9) - 1/(4*HarmonicSums`Private`ExpVar^8) + 1/(3*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6) - 5/(12*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar*(867/(80*HarmonicSums`Private`ExpVar^9) - 153/(80*HarmonicSums`Private`ExpVar^7) + 51/(80*HarmonicSums`Private`ExpVar^5) - 51/(80*HarmonicSums`Private`ExpVar^3) + 51/(80*HarmonicSums`Private`ExpVar^2))*z2^2 - (1003*z2^3)/560 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (17/(2*HarmonicSums`Private`ExpVar^9) - 3/(2*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2))*z2 - (3*z2^2)/2) - (35*z3^2)/32 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-119/(4*HarmonicSums`Private`ExpVar^9) + 21/(4*HarmonicSums`Private`ExpVar^7) - 7/(4*HarmonicSums`Private`ExpVar^5) + 7/(4*HarmonicSums`Private`ExpVar^3) - 7/(4*HarmonicSums`Private`ExpVar^2))*z3 + (21*z2*z3)/4), S[-2, 2, -2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*li4half* (34/HarmonicSums`Private`ExpVar^9 - 6/HarmonicSums`Private`ExpVar^7 + 2/HarmonicSums`Private`ExpVar^5 - 2/HarmonicSums`Private`ExpVar^3 + 2/HarmonicSums`Private`ExpVar^2) - 77/(32*HarmonicSums`Private`ExpVar^10) + 569/(720*HarmonicSums`Private`ExpVar^9) + 9/(16*HarmonicSums`Private`ExpVar^8) - 33/(56*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(20*HarmonicSums`Private`ExpVar^5) + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (17/(12*HarmonicSums`Private`ExpVar^9) - 1/(4*HarmonicSums`Private`ExpVar^7) + 1/(12*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2)) - (5*z2)/12) + (-10*li4half + (-1)^HarmonicSums`Private`ExpVar* (9127/(560*HarmonicSums`Private`ExpVar^10) + 589/(168*HarmonicSums`Private`ExpVar^9) - 357/(160*HarmonicSums`Private`ExpVar^8) - 19/(30*HarmonicSums`Private`ExpVar^7) + 25/(48*HarmonicSums`Private`ExpVar^6) + 7/(24*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-289/(16*HarmonicSums`Private`ExpVar^9) + 51/(16*HarmonicSums`Private`ExpVar^7) - 17/(16*HarmonicSums`Private`ExpVar^5) + 17/(16*HarmonicSums`Private`ExpVar^3) - 17/(16*HarmonicSums`Private`ExpVar^2))*z2^2 + (45*z2^3)/16 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-17/(2*HarmonicSums`Private`ExpVar^9) + 3/(2*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2))*z2 + (5*z2^2)/2) + (63*z3^2)/16 + ln2*((-1)^HarmonicSums`Private`ExpVar* (119/(4*HarmonicSums`Private`ExpVar^9) - 21/(4*HarmonicSums`Private`ExpVar^7) + 7/(4*HarmonicSums`Private`ExpVar^5) - 7/(4*HarmonicSums`Private`ExpVar^3) + 7/(4*HarmonicSums`Private`ExpVar^2))*z3 - (35*z2*z3)/4), S[-2, 2, 2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (45761/(2520*HarmonicSums`Private`ExpVar^10) - 1123/(360*HarmonicSums`Private`ExpVar^9) - 112/(45*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) + 53/(48*HarmonicSums`Private`ExpVar^6) - 5/(6*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4)) + 4*s6 + (ln2^4*z2)/12 + (2*li4half + (-1)^HarmonicSums`Private`ExpVar* (-9127/(280*HarmonicSums`Private`ExpVar^10) - 589/(84*HarmonicSums`Private`ExpVar^9) + 357/(80*HarmonicSums`Private`ExpVar^8) + 19/(15*HarmonicSums`Private`ExpVar^7) - 25/(24*HarmonicSums`Private`ExpVar^6) - 7/(12*HarmonicSums`Private`ExpVar^5) + HarmonicSums`Private`ExpVar^ (-4) - 1/(2*HarmonicSums`Private`ExpVar^3)))*z2 - (ln2^2*z2^2)/2 + (-1)^HarmonicSums`Private`ExpVar*(119/(20*HarmonicSums`Private`ExpVar^9) - 21/(20*HarmonicSums`Private`ExpVar^7) + 7/(20*HarmonicSums`Private`ExpVar^5) - 7/(20*HarmonicSums`Private`ExpVar^3) + 7/(20*HarmonicSums`Private`ExpVar^2))*z2^2 + (37*z2^3)/80 - (13*z3^2)/4 + ln2*((7*z2*z3)/4 - (31*z5)/4), S[-2, -1, -3, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-209/(96*HarmonicSums`Private`ExpVar^10) + 77/(24*HarmonicSums`Private`ExpVar^9) + 13/(48*HarmonicSums`Private`ExpVar^8) - 89/(96*HarmonicSums`Private`ExpVar^7) + 41/(96*HarmonicSums`Private`ExpVar^6) - 1/(12*HarmonicSums`Private`ExpVar^5)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(17/HarmonicSums`Private`ExpVar^9 - 3/HarmonicSums`Private`ExpVar^7 + HarmonicSums`Private`ExpVar^(-5) - HarmonicSums`Private`ExpVar^(-3) + HarmonicSums`Private`ExpVar^(-2)) + 4*s6 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (17/(24*HarmonicSums`Private`ExpVar^9) - 1/(8*HarmonicSums`Private`ExpVar^7) + 1/(24*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) - z2/12) - 2*li4half*z2 + (-1)^HarmonicSums`Private`ExpVar*(-17/(10*HarmonicSums`Private`ExpVar^9) + 3/(10*HarmonicSums`Private`ExpVar^7) - 1/(10*HarmonicSums`Private`ExpVar^5) + 1/(10*HarmonicSums`Private`ExpVar^3) - 1/(10*HarmonicSums`Private`ExpVar^2))*z2^2 + (559*z2^3)/336 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-17/(4*HarmonicSums`Private`ExpVar^9) + 3/(4*HarmonicSums`Private`ExpVar^7) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + z2^2/2) + (-291/(640*HarmonicSums`Private`ExpVar^10) - 39/(320*HarmonicSums`Private`ExpVar^9) + 1/(8*HarmonicSums`Private`ExpVar^8) + 23/(448*HarmonicSums`Private`ExpVar^7) - 5/(64*HarmonicSums`Private`ExpVar^6) - 7/(160*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2))*z3 - (15*z3^2)/8 + ln2*((-1)^HarmonicSums`Private`ExpVar* (51/(8*HarmonicSums`Private`ExpVar^9) - 9/(8*HarmonicSums`Private`ExpVar^7) + 3/(8*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2))*z3 - (9*z2*z3)/8 - (155*z5)/16), S[-2, -1, 3, HarmonicSums`Private`ExpVar] :> 37/(320*HarmonicSums`Private`ExpVar^10) + 857/(864*HarmonicSums`Private`ExpVar^9) - 5/(192*HarmonicSums`Private`ExpVar^8) - 65/(112*HarmonicSums`Private`ExpVar^7) + 25/(48*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) + 5*s6 + 4*li4half*z2 + (ln2^4*z2)/6 - ln2^2*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (-323/(80*HarmonicSums`Private`ExpVar^9) + 57/(80*HarmonicSums`Private`ExpVar^7) - 19/(80*HarmonicSums`Private`ExpVar^5) + 19/(80*HarmonicSums`Private`ExpVar^3) - 19/(80*HarmonicSums`Private`ExpVar^2))*z2^2 - (1279*z2^3)/1680 + (97/(160*HarmonicSums`Private`ExpVar^10) + 13/(80*HarmonicSums`Private`ExpVar^9) - 1/(6*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) + 5/(48*HarmonicSums`Private`ExpVar^6) + 7/(120*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(3*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z3 - (53*z3^2)/64 + ln2*((-1)^HarmonicSums`Private`ExpVar* (51/(8*HarmonicSums`Private`ExpVar^9) - 9/(8*HarmonicSums`Private`ExpVar^7) + 3/(8*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2))*z3 - (9*z2*z3)/8), S[-2, 1, -3, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*li4half* (-17/HarmonicSums`Private`ExpVar^9 + 3/HarmonicSums`Private`ExpVar^7 - HarmonicSums`Private`ExpVar^(-5) + HarmonicSums`Private`ExpVar^(-3) - HarmonicSums`Private`ExpVar^(-2)) - 1213/(320*HarmonicSums`Private`ExpVar^10) + 1493/(1440*HarmonicSums`Private`ExpVar^9) + 143/(192*HarmonicSums`Private`ExpVar^8) - 39/(56*HarmonicSums`Private`ExpVar^7) + 13/(48*HarmonicSums`Private`ExpVar^6) - 1/(20*HarmonicSums`Private`ExpVar^5) + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-17/(24*HarmonicSums`Private`ExpVar^9) + 1/(8*HarmonicSums`Private`ExpVar^7) - 1/(24*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) + z2/8) + 3*li4half*z2 + (-1)^HarmonicSums`Private`ExpVar*(51/(8*HarmonicSums`Private`ExpVar^9) - 9/(8*HarmonicSums`Private`ExpVar^7) + 3/(8*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2))*z2^2 - (37*z2^3)/42 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (17/(4*HarmonicSums`Private`ExpVar^9) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2 - (3*z2^2)/4) + (-1)^HarmonicSums`Private`ExpVar* (-357/(32*HarmonicSums`Private`ExpVar^10) + 81/(8*HarmonicSums`Private`ExpVar^9) + 45/(32*HarmonicSums`Private`ExpVar^8) - 3/(2*HarmonicSums`Private`ExpVar^7) - 9/(32*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3))*z3 + (-1)^HarmonicSums`Private`ExpVar*(-51/(8*HarmonicSums`Private`ExpVar^9) + 9/(8*HarmonicSums`Private`ExpVar^7) - 3/(8*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2))*sinf*z3 - (3*z3^2)/8 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-119/(8*HarmonicSums`Private`ExpVar^9) + 21/(8*HarmonicSums`Private`ExpVar^7) - 7/(8*HarmonicSums`Private`ExpVar^5) + 7/(8*HarmonicSums`Private`ExpVar^3) - 7/(8*HarmonicSums`Private`ExpVar^2))*z3 + (21*z2*z3)/8), S[-2, 1, 3, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (2807/(288*HarmonicSums`Private`ExpVar^10) - 17/(36*HarmonicSums`Private`ExpVar^9) - 371/(288*HarmonicSums`Private`ExpVar^8) - 17/(96*HarmonicSums`Private`ExpVar^7) + 71/(96*HarmonicSums`Private`ExpVar^6) - 11/(24*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) - s6 + (-1)^HarmonicSums`Private`ExpVar*(-17/(20*HarmonicSums`Private`ExpVar^9) + 3/(20*HarmonicSums`Private`ExpVar^7) - 1/(20*HarmonicSums`Private`ExpVar^5) + 1/(20*HarmonicSums`Private`ExpVar^3) - 1/(20*HarmonicSums`Private`ExpVar^2))*z2^2 - (493*z2^3)/1680 + (-1)^HarmonicSums`Private`ExpVar*(119/(8*HarmonicSums`Private`ExpVar^10) - 27/(2*HarmonicSums`Private`ExpVar^9) - 15/(8*HarmonicSums`Private`ExpVar^8) + 2/HarmonicSums`Private`ExpVar^7 + 3/(8*HarmonicSums`Private`ExpVar^6) - 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3))*z3 + (-1)^HarmonicSums`Private`ExpVar*(17/(2*HarmonicSums`Private`ExpVar^9) - 3/(2*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2))*sinf*z3 + (7*z3^2)/64 + (31*ln2*z5)/16, S[2, -3, -1, HarmonicSums`Private`ExpVar] :> ln2^4*(-(360*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(504*HarmonicSums`Private`ExpVar^7) - 1/(360*HarmonicSums`Private`ExpVar^5) + 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) + li4half*(-(15*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(21*HarmonicSums`Private`ExpVar^7) - 1/(15*HarmonicSums`Private`ExpVar^5) + 1/(3*HarmonicSums`Private`ExpVar^3) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) - 19/(72*HarmonicSums`Private`ExpVar^10) + 19/(108*HarmonicSums`Private`ExpVar^9) + 167/(1152*HarmonicSums`Private`ExpVar^8) - 211/(672*HarmonicSums`Private`ExpVar^7) + 79/(288*HarmonicSums`Private`ExpVar^6) - 7/(48*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^4) + (7*s6)/2 + ln2^2*(1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))* z2 + (1/(50*HarmonicSums`Private`ExpVar^9) - 1/(70*HarmonicSums`Private`ExpVar^7) + 1/(50*HarmonicSums`Private`ExpVar^5) - 1/(10*HarmonicSums`Private`ExpVar^3) + 3/(10*HarmonicSums`Private`ExpVar^2) - 3/(5*HarmonicSums`Private`ExpVar))*z2^2 + (389*z2^3)/840 - (59*z3^2)/64 + ln2*((-1)^HarmonicSums`Private`ExpVar* (147/(8*HarmonicSums`Private`ExpVar^10) + 31/(4*HarmonicSums`Private`ExpVar^9) - 45/(16*HarmonicSums`Private`ExpVar^8) - 9/(8*HarmonicSums`Private`ExpVar^7) + HarmonicSums`Private`ExpVar^ (-6) - 1/(4*HarmonicSums`Private`ExpVar^5)) - (15*z2*z3)/8), S[2, -3, 1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(321/(32*HarmonicSums`Private`ExpVar^10) + 229/(32*HarmonicSums`Private`ExpVar^9) - 5/(4*HarmonicSums`Private`ExpVar^8) - 11/(16*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^6)) + li4half*(1/(15*HarmonicSums`Private`ExpVar^9) - 1/(21*HarmonicSums`Private`ExpVar^7) + 1/(15*HarmonicSums`Private`ExpVar^5) - 1/(3*HarmonicSums`Private`ExpVar^3) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) - (5*s6)/2 + (-1)^HarmonicSums`Private`ExpVar* (-147/(8*HarmonicSums`Private`ExpVar^10) - 31/(4*HarmonicSums`Private`ExpVar^9) + 45/(16*HarmonicSums`Private`ExpVar^8) + 9/(8*HarmonicSums`Private`ExpVar^7) - HarmonicSums`Private`ExpVar^(-6) + 1/(4*HarmonicSums`Private`ExpVar^5))*sinf + ln2^4*(1/(360*HarmonicSums`Private`ExpVar^9) - 1/(504*HarmonicSums`Private`ExpVar^7) + 1/(360*HarmonicSums`Private`ExpVar^5) - 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar) + z2/8) + 3*li4half*z2 + (-11/(300*HarmonicSums`Private`ExpVar^9) + 11/(420*HarmonicSums`Private`ExpVar^7) - 11/(300*HarmonicSums`Private`ExpVar^5) + 11/(60*HarmonicSums`Private`ExpVar^3) - 11/(20*HarmonicSums`Private`ExpVar^2) + 11/(10*HarmonicSums`Private`ExpVar))*z2^2 - (253*z2^3)/120 + ln2^2*((-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 - (3*z2^2)/4) + (71*z3^2)/64 + ln2*((7/(120*HarmonicSums`Private`ExpVar^9) - 1/(24*HarmonicSums`Private`ExpVar^7) + 7/(120*HarmonicSums`Private`ExpVar^5) - 7/(24*HarmonicSums`Private`ExpVar^3) + 7/(8*HarmonicSums`Private`ExpVar^2) - 7/(4*HarmonicSums`Private`ExpVar))*z3 + (21*z2*z3)/8 + (155*z5)/32), S[2, 3, -1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-651/(64*HarmonicSums`Private`ExpVar^10) + 57/(32*HarmonicSums`Private`ExpVar^9) + 5/(4*HarmonicSums`Private`ExpVar^8) - 11/(16*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6)) - 5*s6 + (1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2^2 - (295*z2^3)/336 + (55*z3^2)/32 + ln2*(7/(24*HarmonicSums`Private`ExpVar^10) + 7/(135*HarmonicSums`Private`ExpVar^9) - 3/(16*HarmonicSums`Private`ExpVar^8) - 5/(168*HarmonicSums`Private`ExpVar^7) + 1/(3*HarmonicSums`Private`ExpVar^6) - 7/(15*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + (-7/(120*HarmonicSums`Private`ExpVar^9) + 1/(24*HarmonicSums`Private`ExpVar^7) - 7/(120*HarmonicSums`Private`ExpVar^5) + 7/(24*HarmonicSums`Private`ExpVar^3) - 7/(8*HarmonicSums`Private`ExpVar^2) + 7/(4*HarmonicSums`Private`ExpVar))*z3 + (15*z2*z3)/8 + (93*z5)/32), S[2, 3, 1, HarmonicSums`Private`ExpVar] :> 1241/(8640*HarmonicSums`Private`ExpVar^10) + 197093/(1360800*HarmonicSums`Private`ExpVar^9) - 547/(8064*HarmonicSums`Private`ExpVar^8) - 669/(7840*HarmonicSums`Private`ExpVar^7) + 7/(120*HarmonicSums`Private`ExpVar^6) + 89/(900*HarmonicSums`Private`ExpVar^5) - 19/(96*HarmonicSums`Private`ExpVar^4) + 5/(36*HarmonicSums`Private`ExpVar^3) + (-7/(24*HarmonicSums`Private`ExpVar^10) - 7/(135*HarmonicSums`Private`ExpVar^9) + 3/(16*HarmonicSums`Private`ExpVar^8) + 5/(168*HarmonicSums`Private`ExpVar^7) - 1/(3*HarmonicSums`Private`ExpVar^6) + 7/(15*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3))*sinf + (1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))* z2^2 + (29*z2^3)/21 - 3*z3^2, S[2, -2, -2, HarmonicSums`Private`ExpVar] :> -179/(360*HarmonicSums`Private`ExpVar^10) + 103/(360*HarmonicSums`Private`ExpVar^9) + 31/(144*HarmonicSums`Private`ExpVar^8) - 139/(336*HarmonicSums`Private`ExpVar^7) + 47/(144*HarmonicSums`Private`ExpVar^6) - 19/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^4) + (ln2^4*z2)/6 + (4*li4half + (-1)^HarmonicSums`Private`ExpVar* (-195/(16*HarmonicSums`Private`ExpVar^10) + 31/(8*HarmonicSums`Private`ExpVar^9) + 49/(32*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^7) - 5/(16*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)))*z2 - ln2^2*z2^2 + (13/(1200*HarmonicSums`Private`ExpVar^9) - 13/(1680*HarmonicSums`Private`ExpVar^7) + 13/(1200*HarmonicSums`Private`ExpVar^5) - 13/(240*HarmonicSums`Private`ExpVar^3) + 13/(80*HarmonicSums`Private`ExpVar^2) - 13/(40*HarmonicSums`Private`ExpVar))*z2^2 - (41*z2^3)/140 + (7*ln2*z2*z3)/2 - (91*z3^2)/32, S[2, -2, 2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (1441/(160*HarmonicSums`Private`ExpVar^10) + 583/(60*HarmonicSums`Private`ExpVar^9) - 27/(16*HarmonicSums`Private`ExpVar^8) - 43/(24*HarmonicSums`Private`ExpVar^7) + 9/(8*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5)) + li4half*(-2/(15*HarmonicSums`Private`ExpVar^9) + 2/(21*HarmonicSums`Private`ExpVar^7) - 2/(15*HarmonicSums`Private`ExpVar^5) + 2/(3*HarmonicSums`Private`ExpVar^3) - 2/HarmonicSums`Private`ExpVar^2 + 4/HarmonicSums`Private`ExpVar) + ln2^4*(-(180*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(252*HarmonicSums`Private`ExpVar^7) - 1/(180*HarmonicSums`Private`ExpVar^5) + 1/(36*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar) - z2/3) + (-8*li4half + (-1)^HarmonicSums`Private`ExpVar* (195/(8*HarmonicSums`Private`ExpVar^10) - 31/(4*HarmonicSums`Private`ExpVar^9) - 49/(16*HarmonicSums`Private`ExpVar^8) + 3/(2*HarmonicSums`Private`ExpVar^7) + 5/(8*HarmonicSums`Private`ExpVar^6) - 3/(4*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4)))*z2 + (17/(400*HarmonicSums`Private`ExpVar^9) - 17/(560*HarmonicSums`Private`ExpVar^7) + 17/(400*HarmonicSums`Private`ExpVar^5) - 17/(80*HarmonicSums`Private`ExpVar^3) + 51/(80*HarmonicSums`Private`ExpVar^2) - 51/(40*HarmonicSums`Private`ExpVar))*z2^2 + (73*z2^3)/35 + ln2^2*((1/(30*HarmonicSums`Private`ExpVar^9) - 1/(42*HarmonicSums`Private`ExpVar^7) + 1/(30*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1))*z2 + 2*z2^2) + (35*z3^2)/16 + ln2*((-7/(60*HarmonicSums`Private`ExpVar^9) + 1/(12*HarmonicSums`Private`ExpVar^7) - 7/(60*HarmonicSums`Private`ExpVar^5) + 7/(12*HarmonicSums`Private`ExpVar^3) - 7/(4*HarmonicSums`Private`ExpVar^2) + 7/(2*HarmonicSums`Private`ExpVar))*z3 - 7*z2*z3), S[2, 2, -2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-409/(32*HarmonicSums`Private`ExpVar^10) + 5/(4*HarmonicSums`Private`ExpVar^9) + 13/(8*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6)) + li4half*(2/(15*HarmonicSums`Private`ExpVar^9) - 2/(21*HarmonicSums`Private`ExpVar^7) + 2/(15*HarmonicSums`Private`ExpVar^5) - 2/(3*HarmonicSums`Private`ExpVar^3) + 2/HarmonicSums`Private`ExpVar^2 - 4/HarmonicSums`Private`ExpVar) - 4*s6 + ln2^4*(1/(180*HarmonicSums`Private`ExpVar^9) - 1/(252*HarmonicSums`Private`ExpVar^7) + 1/(180*HarmonicSums`Private`ExpVar^5) - 1/(36*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar) + z2/4) + (6*li4half + 121/(8400*HarmonicSums`Private`ExpVar^10) + 31/(504*HarmonicSums`Private`ExpVar^9) - 23/(2520*HarmonicSums`Private`ExpVar^8) - 1/(20*HarmonicSums`Private`ExpVar^7) + 7/(720*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5) - 13/(48*HarmonicSums`Private`ExpVar^4) + 1/(3*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (-17/(240*HarmonicSums`Private`ExpVar^9) + 17/(336*HarmonicSums`Private`ExpVar^7) - 17/(240*HarmonicSums`Private`ExpVar^5) + 17/(48*HarmonicSums`Private`ExpVar^3) - 17/(16*HarmonicSums`Private`ExpVar^2) + 17/(8*HarmonicSums`Private`ExpVar))*z2^2 - (1943*z2^3)/560 + ln2^2*((-(30*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(42*HarmonicSums`Private`ExpVar^7) - 1/(30*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1))*z2 - (3*z2^2)/2) + (17*z3^2)/16 + ln2*((7/(60*HarmonicSums`Private`ExpVar^9) - 1/(12*HarmonicSums`Private`ExpVar^7) + 7/(60*HarmonicSums`Private`ExpVar^5) - 7/(12*HarmonicSums`Private`ExpVar^3) + 7/(4*HarmonicSums`Private`ExpVar^2) - 7/(2*HarmonicSums`Private`ExpVar))*z3 + (21*z2*z3)/4 + (31*z5)/4), S[2, 2, 2, HarmonicSums`Private`ExpVar] :> 11/(105*HarmonicSums`Private`ExpVar^10) + 919/(4536*HarmonicSums`Private`ExpVar^9) - 17/(240*HarmonicSums`Private`ExpVar^8) - 223/(720*HarmonicSums`Private`ExpVar^7) + 85/(144*HarmonicSums`Private`ExpVar^6) - 73/(120*HarmonicSums`Private`ExpVar^5) + 5/(12*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + (-121/(4200*HarmonicSums`Private`ExpVar^10) - 31/(252*HarmonicSums`Private`ExpVar^9) + 23/(1260*HarmonicSums`Private`ExpVar^8) + 1/(10*HarmonicSums`Private`ExpVar^7) - 7/(360*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 13/(24*HarmonicSums`Private`ExpVar^4) - 2/(3*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2))*z2 + (7/(300*HarmonicSums`Private`ExpVar^9) - 1/(60*HarmonicSums`Private`ExpVar^7) + 7/(300*HarmonicSums`Private`ExpVar^5) - 7/(60*HarmonicSums`Private`ExpVar^3) + 7/(20*HarmonicSums`Private`ExpVar^2) - 7/(10*HarmonicSums`Private`ExpVar))*z2^2 + (31*z2^3)/70, S[2, -1, -3, HarmonicSums`Private`ExpVar] :> li4half*(1/(15*HarmonicSums`Private`ExpVar^9) - 1/(21*HarmonicSums`Private`ExpVar^7) + 1/(15*HarmonicSums`Private`ExpVar^5) - 1/(3*HarmonicSums`Private`ExpVar^3) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) - 1007/(1440*HarmonicSums`Private`ExpVar^10) + 563/(1080*HarmonicSums`Private`ExpVar^9) + 133/(576*HarmonicSums`Private`ExpVar^8) - 113/(224*HarmonicSums`Private`ExpVar^7) + 109/(288*HarmonicSums`Private`ExpVar^6) - 41/(240*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^4) - 5*s6 + ln2^4*(1/(360*HarmonicSums`Private`ExpVar^9) - 1/(504*HarmonicSums`Private`ExpVar^7) + 1/(360*HarmonicSums`Private`ExpVar^5) - 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar) - z2/6) - 4*li4half*z2 + (-(150*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(210*HarmonicSums`Private`ExpVar^7) - 1/(150*HarmonicSums`Private`ExpVar^5) + 1/(30*HarmonicSums`Private`ExpVar^3) - 1/(10*HarmonicSums`Private`ExpVar^2) + 1/(5*HarmonicSums`Private`ExpVar))*z2^2 + (139*z2^3)/120 + ln2^2*((-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 + z2^2) + (-1)^HarmonicSums`Private`ExpVar* (-1887/(128*HarmonicSums`Private`ExpVar^10) - 117/(32*HarmonicSums`Private`ExpVar^9) + 33/(16*HarmonicSums`Private`ExpVar^8) + 39/(64*HarmonicSums`Private`ExpVar^7) - 33/(64*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3))*z3 + (41*z3^2)/32 + ln2*((1/(40*HarmonicSums`Private`ExpVar^9) - 1/(56*HarmonicSums`Private`ExpVar^7) + 1/(40*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 3/(4*HarmonicSums`Private`ExpVar))*z3 + (9*z2*z3)/8), S[2, -1, 3, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-173/(192*HarmonicSums`Private`ExpVar^10) + 271/(48*HarmonicSums`Private`ExpVar^9) - 5/(32*HarmonicSums`Private`ExpVar^8) - 5/(4*HarmonicSums`Private`ExpVar^7) + 5/(8*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5)) - 4*s6 + 2*li4half*z2 + (ln2^4*z2)/12 - (ln2^2*z2^2)/2 + (-19/(1200*HarmonicSums`Private`ExpVar^9) + 19/(1680*HarmonicSums`Private`ExpVar^7) - 19/(1200*HarmonicSums`Private`ExpVar^5) + 19/(240*HarmonicSums`Private`ExpVar^3) - 19/(80*HarmonicSums`Private`ExpVar^2) + 19/(40*HarmonicSums`Private`ExpVar))*z2^2 - (1811*z2^3)/840 + (-1)^HarmonicSums`Private`ExpVar* (629/(32*HarmonicSums`Private`ExpVar^10) + 39/(8*HarmonicSums`Private`ExpVar^9) - 11/(4*HarmonicSums`Private`ExpVar^8) - 13/(16*HarmonicSums`Private`ExpVar^7) + 11/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3))*z3 + (57*z3^2)/32 + ln2*((1/(40*HarmonicSums`Private`ExpVar^9) - 1/(56*HarmonicSums`Private`ExpVar^7) + 1/(40*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 3/(4*HarmonicSums`Private`ExpVar))*z3 + (9*z2*z3)/8 + (155*z5)/16), S[2, 1, -3, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-1033/(64*HarmonicSums`Private`ExpVar^10) + 13/(16*HarmonicSums`Private`ExpVar^9) + 2/HarmonicSums`Private`ExpVar^8 - 13/(16*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6)) + li4half*(-(15*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(21*HarmonicSums`Private`ExpVar^7) - 1/(15*HarmonicSums`Private`ExpVar^5) + 1/(3*HarmonicSums`Private`ExpVar^3) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) + s6 + ln2^4*(-(360*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(504*HarmonicSums`Private`ExpVar^7) - 1/(360*HarmonicSums`Private`ExpVar^5) + 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar) - z2/8) - 3*li4half*z2 + (1/(40*HarmonicSums`Private`ExpVar^9) - 1/(56*HarmonicSums`Private`ExpVar^7) + 1/(40*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 3/(4*HarmonicSums`Private`ExpVar))* z2^2 + (769*z2^3)/840 + ln2^2*((1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2 + (3*z2^2)/4) + (-7/(160*HarmonicSums`Private`ExpVar^10) + 33/(1400*HarmonicSums`Private`ExpVar^9) + 5/(224*HarmonicSums`Private`ExpVar^8) - 19/(1470*HarmonicSums`Private`ExpVar^7) - 3/(160*HarmonicSums`Private`ExpVar^6) + 7/(600*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 3/(4*HarmonicSums`Private`ExpVar))*z3 + (-(40*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(56*HarmonicSums`Private`ExpVar^7) - 1/(40*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 3/(4*HarmonicSums`Private`ExpVar))* sinf*z3 - (17*z3^2)/32 + ln2*((-7/(120*HarmonicSums`Private`ExpVar^9) + 1/(24*HarmonicSums`Private`ExpVar^7) - 7/(120*HarmonicSums`Private`ExpVar^5) + 7/(24*HarmonicSums`Private`ExpVar^3) - 7/(8*HarmonicSums`Private`ExpVar^2) + 7/(4*HarmonicSums`Private`ExpVar))*z3 - (21*z2*z3)/8 - (31*z5)/16), S[2, 1, 3, HarmonicSums`Private`ExpVar] :> -157/(1440*HarmonicSums`Private`ExpVar^10) + 151/(810*HarmonicSums`Private`ExpVar^9) + 11/(192*HarmonicSums`Private`ExpVar^8) - 95/(288*HarmonicSums`Private`ExpVar^7) + 127/(288*HarmonicSums`Private`ExpVar^6) - 91/(240*HarmonicSums`Private`ExpVar^5) + 11/(48*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + (-(300*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(420*HarmonicSums`Private`ExpVar^7) - 1/(300*HarmonicSums`Private`ExpVar^5) + 1/(60*HarmonicSums`Private`ExpVar^3) - 1/(20*HarmonicSums`Private`ExpVar^2) + 1/(10*HarmonicSums`Private`ExpVar))*z2^2 + (17*z2^3)/42 + (7/(120*HarmonicSums`Private`ExpVar^10) - 11/(350*HarmonicSums`Private`ExpVar^9) - 5/(168*HarmonicSums`Private`ExpVar^8) + 38/(2205*HarmonicSums`Private`ExpVar^7) + 1/(40*HarmonicSums`Private`ExpVar^6) - 7/(450*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(36*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1))* z3 + (1/(30*HarmonicSums`Private`ExpVar^9) - 1/(42*HarmonicSums`Private`ExpVar^7) + 1/(30*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1))* sinf*z3 + z3^2/2, S[-1, -4, -1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-169/(1440*HarmonicSums`Private`ExpVar^10) + 3343/(1680*HarmonicSums`Private`ExpVar^9) + 121/(1344*HarmonicSums`Private`ExpVar^8) - 37/(60*HarmonicSums`Private`ExpVar^7) + 49/(160*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5)) - 4*s6 + (3*ln2^2*z2^2)/4 - (491*z2^3)/840 + (-1)^HarmonicSums`Private`ExpVar* (-93/(16*HarmonicSums`Private`ExpVar^10) + 51/(64*HarmonicSums`Private`ExpVar^8) - 3/(16*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^2) + 3/(8*HarmonicSums`Private`ExpVar))*z2*z3 + (33*z3^2)/32 + (-1)^HarmonicSums`Private`ExpVar* (1829/(128*HarmonicSums`Private`ExpVar^10) - 1003/(512*HarmonicSums`Private`ExpVar^8) + 59/(128*HarmonicSums`Private`ExpVar^6) - 59/(256*HarmonicSums`Private`ExpVar^4) + 59/(128*HarmonicSums`Private`ExpVar^2) - 59/(64*HarmonicSums`Private`ExpVar))*z5 + ln2*(29/(4*HarmonicSums`Private`ExpVar^10) + 26/(45*HarmonicSums`Private`ExpVar^9) - 67/(48*HarmonicSums`Private`ExpVar^8) - 1/(7*HarmonicSums`Private`ExpVar^7) + 17/(24*HarmonicSums`Private`ExpVar^6) - 9/(20*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) + (-1)^HarmonicSums`Private`ExpVar* (-93/(16*HarmonicSums`Private`ExpVar^10) + 51/(64*HarmonicSums`Private`ExpVar^8) - 3/(16*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^2) + 3/(8*HarmonicSums`Private`ExpVar))*z2^2 + (3*z2*z3)/2 + (59*z5)/32), S[-1, -4, 1, HarmonicSums`Private`ExpVar] :> 8573/(1440*HarmonicSums`Private`ExpVar^10) + 194717/(226800*HarmonicSums`Private`ExpVar^9) - 1607/(2016*HarmonicSums`Private`ExpVar^8) - 727/(5880*HarmonicSums`Private`ExpVar^7) + 241/(1440*HarmonicSums`Private`ExpVar^6) + 1/(400*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) - (5*s6)/2 + (-29/(4*HarmonicSums`Private`ExpVar^10) - 26/(45*HarmonicSums`Private`ExpVar^9) + 67/(48*HarmonicSums`Private`ExpVar^8) + 1/(7*HarmonicSums`Private`ExpVar^7) - 17/(24*HarmonicSums`Private`ExpVar^6) + 9/(20*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4))*sinf + (53*z2^3)/168 + (-1)^HarmonicSums`Private`ExpVar*(-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))* z2*z3 - (5*z3^2)/8 + (-1)^HarmonicSums`Private`ExpVar* (1829/(128*HarmonicSums`Private`ExpVar^10) - 1003/(512*HarmonicSums`Private`ExpVar^8) + 59/(128*HarmonicSums`Private`ExpVar^6) - 59/(256*HarmonicSums`Private`ExpVar^4) + 59/(128*HarmonicSums`Private`ExpVar^2) - 59/(64*HarmonicSums`Private`ExpVar))*z5 + ln2*(z2*z3 + (59*z5)/32), S[-1, 4, -1, HarmonicSums`Private`ExpVar] :> -13/(8*HarmonicSums`Private`ExpVar^10) + 437/(360*HarmonicSums`Private`ExpVar^9) + 11/(32*HarmonicSums`Private`ExpVar^8) - 31/(56*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(20*HarmonicSums`Private`ExpVar^5) + 4*s6 - (3*ln2^2*z2^2)/4 + (47*z2^3)/105 + (-1)^HarmonicSums`Private`ExpVar* (93/(32*HarmonicSums`Private`ExpVar^10) - 51/(128*HarmonicSums`Private`ExpVar^8) + 3/(32*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^2) - 3/(16*HarmonicSums`Private`ExpVar))*z2*z3 - (21*z3^2)/32 + ln2*((-1)^HarmonicSums`Private`ExpVar* (571/(36*HarmonicSums`Private`ExpVar^10) - 2/HarmonicSums`Private`ExpVar^9 - 109/(48*HarmonicSums`Private`ExpVar^8) + 1/(3*HarmonicSums`Private`ExpVar^7) + 19/(24*HarmonicSums`Private`ExpVar^6) - 7/(12*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* (93/(16*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^8) + 3/(16*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*z2^2 - (15*z2*z3)/8 - (17*z5)/16) + (-1)^HarmonicSums`Private`ExpVar* (-527/(64*HarmonicSums`Private`ExpVar^10) + 289/(256*HarmonicSums`Private`ExpVar^8) - 17/(64*HarmonicSums`Private`ExpVar^6) + 17/(128*HarmonicSums`Private`ExpVar^4) - 17/(64*HarmonicSums`Private`ExpVar^2) + 17/(32*HarmonicSums`Private`ExpVar))*z5, S[-1, 4, 1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (155393/(12960*HarmonicSums`Private`ExpVar^10) - 59/(1680*HarmonicSums`Private`ExpVar^9) - 4649/(4032*HarmonicSums`Private`ExpVar^8) - 19/(360*HarmonicSums`Private`ExpVar^7) + 217/(1440*HarmonicSums`Private`ExpVar^6) + 7/(144*HarmonicSums`Private`ExpVar^5) - 1/(18*HarmonicSums`Private`ExpVar^4)) + (3*s6)/2 + (-1)^HarmonicSums`Private`ExpVar* (-571/(36*HarmonicSums`Private`ExpVar^10) + 2/HarmonicSums`Private`ExpVar^9 + 109/(48*HarmonicSums`Private`ExpVar^8) - 1/(3*HarmonicSums`Private`ExpVar^7) - 19/(24*HarmonicSums`Private`ExpVar^6) + 7/(12*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^4))*sinf - (179*z2^3)/840 + (-1)^HarmonicSums`Private`ExpVar*(31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))* z2*z3 + (11*z3^2)/64 + ln2*(-((z2*z3)/2) - (17*z5)/16) + (-1)^HarmonicSums`Private`ExpVar*(-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar))* z5, S[-1, -3, -2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-629/(320*HarmonicSums`Private`ExpVar^10) + 7697/(3360*HarmonicSums`Private`ExpVar^9) + 463/(1344*HarmonicSums`Private`ExpVar^8) - 181/(240*HarmonicSums`Private`ExpVar^7) + 53/(160*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5)) + s6 - (ln2^4*z2)/24 + (ln2^2*z2^2)/4 - (89*z2^3)/840 + (3*z3^2)/4 + z2*(-li4half - 109/(160*HarmonicSums`Private`ExpVar^10) + 197/(144*HarmonicSums`Private`ExpVar^9) + 7/(48*HarmonicSums`Private`ExpVar^8) - 17/(48*HarmonicSums`Private`ExpVar^7) - 5/(96*HarmonicSums`Private`ExpVar^6) + 13/(48*HarmonicSums`Private`ExpVar^5) - 7/(32*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (279/(16*HarmonicSums`Private`ExpVar^10) - 153/(64*HarmonicSums`Private`ExpVar^8) + 9/(16*HarmonicSums`Private`ExpVar^6) - 9/(32*HarmonicSums`Private`ExpVar^4) + 9/(16*HarmonicSums`Private`ExpVar^2) - 9/(8*HarmonicSums`Private`ExpVar))*z3) + ln2*((-9*z2*z3)/8 - (11*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-2573/(64*HarmonicSums`Private`ExpVar^10) + 1411/(256*HarmonicSums`Private`ExpVar^8) - 83/(64*HarmonicSums`Private`ExpVar^6) + 83/(128*HarmonicSums`Private`ExpVar^4) - 83/(64*HarmonicSums`Private`ExpVar^2) + 83/(32*HarmonicSums`Private`ExpVar))*z5, S[-1, -3, 2, HarmonicSums`Private`ExpVar] :> 40727/(6720*HarmonicSums`Private`ExpVar^10) + 7633/(4320*HarmonicSums`Private`ExpVar^9) - 6527/(5760*HarmonicSums`Private`ExpVar^8) - 221/(336*HarmonicSums`Private`ExpVar^7) + 137/(144*HarmonicSums`Private`ExpVar^6) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) + (5*s6)/2 + (ln2^4*z2)/12 - (ln2^2*z2^2)/2 - (179*z2^3)/840 + (5*z3^2)/64 + z2*(2*li4half + 109/(80*HarmonicSums`Private`ExpVar^10) - 197/(72*HarmonicSums`Private`ExpVar^9) - 7/(24*HarmonicSums`Private`ExpVar^8) + 17/(24*HarmonicSums`Private`ExpVar^7) + 5/(48*HarmonicSums`Private`ExpVar^6) - 13/(24*HarmonicSums`Private`ExpVar^5) + 7/(16*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (155/(32*HarmonicSums`Private`ExpVar^10) - 85/(128*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^4) + 5/(32*HarmonicSums`Private`ExpVar^2) - 5/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*((-5*z2*z3)/4 - (11*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-341/(128*HarmonicSums`Private`ExpVar^10) + 187/(512*HarmonicSums`Private`ExpVar^8) - 11/(128*HarmonicSums`Private`ExpVar^6) + 11/(256*HarmonicSums`Private`ExpVar^4) - 11/(128*HarmonicSums`Private`ExpVar^2) + 11/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, 3, -2, HarmonicSums`Private`ExpVar] :> -973/(320*HarmonicSums`Private`ExpVar^10) + 641/(480*HarmonicSums`Private`ExpVar^9) + 223/(384*HarmonicSums`Private`ExpVar^8) - 75/(112*HarmonicSums`Private`ExpVar^7) + 13/(48*HarmonicSums`Private`ExpVar^6) - 1/(20*HarmonicSums`Private`ExpVar^5) - (7*s6)/2 + (121*z2^3)/840 - (33*z3^2)/64 + z2*((-1)^HarmonicSums`Private`ExpVar* (163/(32*HarmonicSums`Private`ExpVar^10) + 169/(48*HarmonicSums`Private`ExpVar^9) - 133/(192*HarmonicSums`Private`ExpVar^8) - 31/(48*HarmonicSums`Private`ExpVar^7) + 5/(32*HarmonicSums`Private`ExpVar^6) + 5/(16*HarmonicSums`Private`ExpVar^5) - 5/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (1581/(128*HarmonicSums`Private`ExpVar^10) - 867/(512*HarmonicSums`Private`ExpVar^8) + 51/(128*HarmonicSums`Private`ExpVar^6) - 51/(256*HarmonicSums`Private`ExpVar^4) + 51/(128*HarmonicSums`Private`ExpVar^2) - 51/(64*HarmonicSums`Private`ExpVar))*z5 + ln2*((9*z2*z3)/4 + (51*z5)/32), S[-1, 3, 2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (987143/(60480*HarmonicSums`Private`ExpVar^10) - 311/(3360*HarmonicSums`Private`ExpVar^9) - 15241/(6720*HarmonicSums`Private`ExpVar^8) - 19/(80*HarmonicSums`Private`ExpVar^7) + 523/(480*HarmonicSums`Private`ExpVar^6) - 31/(48*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^4)) - s6 - (493*z2^3)/1680 - z3^2/4 + z2*((-1)^HarmonicSums`Private`ExpVar* (-163/(16*HarmonicSums`Private`ExpVar^10) - 169/(24*HarmonicSums`Private`ExpVar^9) + 133/(96*HarmonicSums`Private`ExpVar^8) + 31/(24*HarmonicSums`Private`ExpVar^7) - 5/(16*HarmonicSums`Private`ExpVar^6) - 5/(8*HarmonicSums`Private`ExpVar^5) + 5/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar*(279/(8*HarmonicSums`Private`ExpVar^10) - 153/(32*HarmonicSums`Private`ExpVar^8) + 9/(8*HarmonicSums`Private`ExpVar^6) - 9/(16*HarmonicSums`Private`ExpVar^4) + 9/(8*HarmonicSums`Private`ExpVar^2) - 9/(4*HarmonicSums`Private`ExpVar))* z5 + ln2*((5*z2*z3)/8 + (51*z5)/32), S[-1, -2, -3, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-1351/(320*HarmonicSums`Private`ExpVar^10) + 9383/(3360*HarmonicSums`Private`ExpVar^9) + 769/(1344*HarmonicSums`Private`ExpVar^8) - 107/(120*HarmonicSums`Private`ExpVar^7) + 57/(160*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5)) + s6 + (ln2^4*z2)/12 - (ln2^2*z2^2)/2 - (853*z2^3)/1680 + (-519/(160*HarmonicSums`Private`ExpVar^10) - 3/(10*HarmonicSums`Private`ExpVar^9) + 19/(32*HarmonicSums`Private`ExpVar^8) + 5/(56*HarmonicSums`Private`ExpVar^7) - 7/(32*HarmonicSums`Private`ExpVar^6) - 1/(20*HarmonicSums`Private`ExpVar^5) + 9/(32*HarmonicSums`Private`ExpVar^4) - 5/(16*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2))*z3 - (15*z3^2)/8 + z2*(2*li4half + (-1)^HarmonicSums`Private`ExpVar* (-651/(32*HarmonicSums`Private`ExpVar^10) + 357/(128*HarmonicSums`Private`ExpVar^8) - 21/(32*HarmonicSums`Private`ExpVar^6) + 21/(64*HarmonicSums`Private`ExpVar^4) - 21/(32*HarmonicSums`Private`ExpVar^2) + 21/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*((15*z2*z3)/8 - (21*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (2077/(64*HarmonicSums`Private`ExpVar^10) - 1139/(256*HarmonicSums`Private`ExpVar^8) + 67/(64*HarmonicSums`Private`ExpVar^6) - 67/(128*HarmonicSums`Private`ExpVar^4) + 67/(64*HarmonicSums`Private`ExpVar^2) - 67/(32*HarmonicSums`Private`ExpVar))*z5, S[-1, -2, 3, HarmonicSums`Private`ExpVar] :> 1967/(960*HarmonicSums`Private`ExpVar^10) + 6407/(4320*HarmonicSums`Private`ExpVar^9) - 45/(128*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^7) + 29/(48*HarmonicSums`Private`ExpVar^6) - 11/(40*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - (5*s6)/2 - (ln2^4*z2)/6 + ln2^2*z2^2 + (503*z2^3)/420 + (173/(40*HarmonicSums`Private`ExpVar^10) + 2/(5*HarmonicSums`Private`ExpVar^9) - 19/(24*HarmonicSums`Private`ExpVar^8) - 5/(42*HarmonicSums`Private`ExpVar^7) + 7/(24*HarmonicSums`Private`ExpVar^6) + 1/(15*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 5/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z3 + (59*z3^2)/32 + z2*(-4*li4half + (-1)^HarmonicSums`Private`ExpVar* (93/(16*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^8) + 3/(16*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*z3) + ln2*((-3*z2*z3)/2 - (21*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-651/(128*HarmonicSums`Private`ExpVar^10) + 357/(512*HarmonicSums`Private`ExpVar^8) - 21/(128*HarmonicSums`Private`ExpVar^6) + 21/(256*HarmonicSums`Private`ExpVar^4) - 21/(128*HarmonicSums`Private`ExpVar^2) + 21/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, 2, -3, HarmonicSums`Private`ExpVar] :> -1551/(320*HarmonicSums`Private`ExpVar^10) + 2353/(1440*HarmonicSums`Private`ExpVar^9) + 305/(384*HarmonicSums`Private`ExpVar^8) - 11/(14*HarmonicSums`Private`ExpVar^7) + 7/(24*HarmonicSums`Private`ExpVar^6) - 1/(20*HarmonicSums`Private`ExpVar^5) + (3*s6)/2 + (ln2^4*z2)/6 - ln2^2*z2^2 - (337*z2^3)/420 + (-1)^HarmonicSums`Private`ExpVar* (-2297/(160*HarmonicSums`Private`ExpVar^10) + 309/(70*HarmonicSums`Private`ExpVar^9) + 443/(224*HarmonicSums`Private`ExpVar^8) - 31/(40*HarmonicSums`Private`ExpVar^7) - 77/(160*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) + 11/(32*HarmonicSums`Private`ExpVar^4) - 9/(16*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2))*z3 - (69*z3^2)/64 + z2*(4*li4half + (-1)^HarmonicSums`Private`ExpVar* (31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (1271/(128*HarmonicSums`Private`ExpVar^10) - 697/(512*HarmonicSums`Private`ExpVar^8) + 41/(128*HarmonicSums`Private`ExpVar^6) - 41/(256*HarmonicSums`Private`ExpVar^4) + 41/(128*HarmonicSums`Private`ExpVar^2) - 41/(64*HarmonicSums`Private`ExpVar))*z5 + ln2*((7*z2*z3)/8 + (41*z5)/32), S[-1, 2, 3, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (67951/(8640*HarmonicSums`Private`ExpVar^10) + 3251/(3360*HarmonicSums`Private`ExpVar^9) - 467/(448*HarmonicSums`Private`ExpVar^8) - 9/(20*HarmonicSums`Private`ExpVar^7) + 337/(480*HarmonicSums`Private`ExpVar^6) - 17/(48*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^4)) - s6 - (ln2^4*z2)/12 + (ln2^2*z2^2)/2 + (17*z2^3)/1680 + (-1)^HarmonicSums`Private`ExpVar* (2297/(120*HarmonicSums`Private`ExpVar^10) - 206/(35*HarmonicSums`Private`ExpVar^9) - 443/(168*HarmonicSums`Private`ExpVar^8) + 31/(30*HarmonicSums`Private`ExpVar^7) + 77/(120*HarmonicSums`Private`ExpVar^6) - 1/(3*HarmonicSums`Private`ExpVar^5) - 11/(24*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2))*z3 + (41*z3^2)/32 + z2*(-2*li4half + (-1)^HarmonicSums`Private`ExpVar* (31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1))*z3) + (-1)^HarmonicSums`Private`ExpVar* (-341/(8*HarmonicSums`Private`ExpVar^10) + 187/(32*HarmonicSums`Private`ExpVar^8) - 11/(8*HarmonicSums`Private`ExpVar^6) + 11/(16*HarmonicSums`Private`ExpVar^4) - 11/(8*HarmonicSums`Private`ExpVar^2) + 11/(4*HarmonicSums`Private`ExpVar))*z5 + ln2*(-(z2*z3) + (41*z5)/32), S[-1, -1, -4, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-19957/(2880*HarmonicSums`Private`ExpVar^10) + 11969/(3360*HarmonicSums`Private`ExpVar^9) + 1027/(1344*HarmonicSums`Private`ExpVar^8) - 247/(240*HarmonicSums`Private`ExpVar^7) + 61/(160*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5)) - (7*ln2^2*z2^2)/40 + (133/(1280*HarmonicSums`Private`ExpVar^10) - 1841/(9600*HarmonicSums`Private`ExpVar^9) - 63/(2560*HarmonicSums`Private`ExpVar^8) + 23/(480*HarmonicSums`Private`ExpVar^7) + 7/(640*HarmonicSums`Private`ExpVar^6) - 133/(4800*HarmonicSums`Private`ExpVar^5) - 7/(640*HarmonicSums`Private`ExpVar^4) + 7/(96*HarmonicSums`Private`ExpVar^3) - 21/(160*HarmonicSums`Private`ExpVar^2) + 7/(40*HarmonicSums`Private`ExpVar))*z2^2 - (71*z2^3)/112 + (-1)^HarmonicSums`Private`ExpVar*(93/(16*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^8) + 3/(16*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*z2*z3 + (3*z3^2)/4 + (-1)^HarmonicSums`Private`ExpVar* (-2821/(128*HarmonicSums`Private`ExpVar^10) + 1547/(512*HarmonicSums`Private`ExpVar^8) - 91/(128*HarmonicSums`Private`ExpVar^6) + 91/(256*HarmonicSums`Private`ExpVar^4) - 91/(128*HarmonicSums`Private`ExpVar^2) + 91/(64*HarmonicSums`Private`ExpVar))*z5 + ln2*((-1)^HarmonicSums`Private`ExpVar* (31/(10*HarmonicSums`Private`ExpVar^10) - 17/(40*HarmonicSums`Private`ExpVar^8) + 1/(10*HarmonicSums`Private`ExpVar^6) - 1/(20*HarmonicSums`Private`ExpVar^4) + 1/(10*HarmonicSums`Private`ExpVar^2) - 1/(5*HarmonicSums`Private`ExpVar))*z2^2 - (3*z2*z3)/8 + 2*z5), S[-1, -1, 4, HarmonicSums`Private`ExpVar] :> 1187/(2880*HarmonicSums`Private`ExpVar^10) + 2027/(1440*HarmonicSums`Private`ExpVar^9) - 43/(1152*HarmonicSums`Private`ExpVar^8) - 215/(336*HarmonicSums`Private`ExpVar^7) + 71/(144*HarmonicSums`Private`ExpVar^6) - 1/(5*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^4) - (5*s6)/2 + (ln2^2*z2^2)/5 + (-19/(160*HarmonicSums`Private`ExpVar^10) + 263/(1200*HarmonicSums`Private`ExpVar^9) + 9/(320*HarmonicSums`Private`ExpVar^8) - 23/(420*HarmonicSums`Private`ExpVar^7) - 1/(80*HarmonicSums`Private`ExpVar^6) + 19/(600*HarmonicSums`Private`ExpVar^5) + 1/(80*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + 3/(20*HarmonicSums`Private`ExpVar^2) - 1/(5*HarmonicSums`Private`ExpVar))*z2^2 + (17*z2^3)/70 + (-1)^HarmonicSums`Private`ExpVar* (-93/(32*HarmonicSums`Private`ExpVar^10) + 51/(128*HarmonicSums`Private`ExpVar^8) - 3/(32*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^2) + 3/(16*HarmonicSums`Private`ExpVar))*z2*z3 - (11*z3^2)/64 + (-1)^HarmonicSums`Private`ExpVar*(31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1))* z5 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-217/(80*HarmonicSums`Private`ExpVar^10) + 119/(320*HarmonicSums`Private`ExpVar^8) - 7/(80*HarmonicSums`Private`ExpVar^6) + 7/(160*HarmonicSums`Private`ExpVar^4) - 7/(80*HarmonicSums`Private`ExpVar^2) + 7/(40*HarmonicSums`Private`ExpVar))*z2^2 + (3*z2*z3)/4 + 2*z5), S[-1, 1, -4, HarmonicSums`Private`ExpVar] :> -2269/(320*HarmonicSums`Private`ExpVar^10) + 347/(160*HarmonicSums`Private`ExpVar^9) + 125/(128*HarmonicSums`Private`ExpVar^8) - 101/(112*HarmonicSums`Private`ExpVar^7) + 5/(16*HarmonicSums`Private`ExpVar^6) - 1/(20*HarmonicSums`Private`ExpVar^5) - s6 - (ln2^4*z2)/12 + (7*ln2^2*z2^2)/10 + (-1)^HarmonicSums`Private`ExpVar* (-1659/(256*HarmonicSums`Private`ExpVar^10) - 833/(640*HarmonicSums`Private`ExpVar^9) + 1029/(1280*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^7) - 21/(128*HarmonicSums`Private`ExpVar^6) - 21/(320*HarmonicSums`Private`ExpVar^5) + 21/(320*HarmonicSums`Private`ExpVar^4) + 7/(160*HarmonicSums`Private`ExpVar^3) - 7/(80*HarmonicSums`Private`ExpVar^2))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (217/(80*HarmonicSums`Private`ExpVar^10) - 119/(320*HarmonicSums`Private`ExpVar^8) + 7/(80*HarmonicSums`Private`ExpVar^6) - 7/(160*HarmonicSums`Private`ExpVar^4) + 7/(80*HarmonicSums`Private`ExpVar^2) - 7/(40*HarmonicSums`Private`ExpVar))*sinf*z2^2 + (22*z2^3)/35 + (9*z3^2)/8 + z2*(-2*li4half + (-1)^HarmonicSums`Private`ExpVar* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z3) + ln2*(-(z2*z3) - (29*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-899/(128*HarmonicSums`Private`ExpVar^10) + 493/(512*HarmonicSums`Private`ExpVar^8) - 29/(128*HarmonicSums`Private`ExpVar^6) + 29/(256*HarmonicSums`Private`ExpVar^4) - 29/(128*HarmonicSums`Private`ExpVar^2) + 29/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, 1, 4, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (120539/(25920*HarmonicSums`Private`ExpVar^10) + 4633/(3360*HarmonicSums`Private`ExpVar^9) - 2323/(4032*HarmonicSums`Private`ExpVar^8) - 397/(720*HarmonicSums`Private`ExpVar^7) + 833/(1440*HarmonicSums`Private`ExpVar^6) - 37/(144*HarmonicSums`Private`ExpVar^5) + 1/(18*HarmonicSums`Private`ExpVar^4)) + (3*s6)/2 + (ln2^4*z2)/24 - (17*ln2^2*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (237/(32*HarmonicSums`Private`ExpVar^10) + 119/(80*HarmonicSums`Private`ExpVar^9) - 147/(160*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^7) + 3/(16*HarmonicSums`Private`ExpVar^6) + 3/(40*HarmonicSums`Private`ExpVar^5) - 3/(40*HarmonicSums`Private`ExpVar^4) - 1/(20*HarmonicSums`Private`ExpVar^3) + 1/(10*HarmonicSums`Private`ExpVar^2))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (-31/(10*HarmonicSums`Private`ExpVar^10) + 17/(40*HarmonicSums`Private`ExpVar^8) - 1/(10*HarmonicSums`Private`ExpVar^6) + 1/(20*HarmonicSums`Private`ExpVar^4) - 1/(10*HarmonicSums`Private`ExpVar^2) + 1/(5*HarmonicSums`Private`ExpVar))*sinf*z2^2 - (59*z2^3)/280 - (65*z3^2)/64 + z2*(li4half + (-1)^HarmonicSums`Private`ExpVar* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z3) + ln2*((z2*z3)/2 - (29*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1))* z5, S[1, -4, -1, HarmonicSums`Private`ExpVar] :> -541/(1440*HarmonicSums`Private`ExpVar^10) + 43517/(226800*HarmonicSums`Private`ExpVar^9) + 187/(1008*HarmonicSums`Private`ExpVar^8) - 244/(735*HarmonicSums`Private`ExpVar^7) + 371/(1440*HarmonicSums`Private`ExpVar^6) - 49/(400*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - (3*s6)/2 - (71*z2^3)/840 - z3^2/8 + ln2*((-1)^HarmonicSums`Private`ExpVar* (91/(4*HarmonicSums`Private`ExpVar^10) + 12/HarmonicSums`Private`ExpVar^9 - 55/(16*HarmonicSums`Private`ExpVar^8) - 3/(2*HarmonicSums`Private`ExpVar^7) + 9/(8*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5)) + (3*z2*z3)/2) + sinf*((3*ln2*z2^2)/4 + (3*z2*z3)/4 - (59*z5)/32), S[1, -4, 1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*(12/HarmonicSums`Private`ExpVar^10 + 19/(2*HarmonicSums`Private`ExpVar^9) - 3/(2*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^6)) + (11*z2^3)/168 - z3^2/4 + sinf*((-1)^HarmonicSums`Private`ExpVar* (-91/(4*HarmonicSums`Private`ExpVar^10) - 12/HarmonicSums`Private`ExpVar^9 + 55/(16*HarmonicSums`Private`ExpVar^8) + 3/(2*HarmonicSums`Private`ExpVar^7) - 9/(8*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5)) + (z2*z3)/2 - (59*z5)/32), S[1, 4, -1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-223/(16*HarmonicSums`Private`ExpVar^10) + 17/(8*HarmonicSums`Private`ExpVar^9) + 3/(2*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6)) + (5*s6)/2 + (43*z2^3)/84 - (55*z3^2)/64 + ln2*(13/(36*HarmonicSums`Private`ExpVar^10) + 68/(405*HarmonicSums`Private`ExpVar^9) - 11/(48*HarmonicSums`Private`ExpVar^8) - 11/(126*HarmonicSums`Private`ExpVar^7) + 3/(8*HarmonicSums`Private`ExpVar^6) - 77/(180*HarmonicSums`Private`ExpVar^5) + 7/(24*HarmonicSums`Private`ExpVar^4) - 1/(9*HarmonicSums`Private`ExpVar^3) - (3*z2*z3)/2 - (31*z5)/16) + sinf*((-3*ln2*z2^2)/4 - (3*z2*z3)/8 + (17*z5)/16), S[1, 4, 1, HarmonicSums`Private`ExpVar] :> 68/(405*HarmonicSums`Private`ExpVar^10) + 49979/(255150*HarmonicSums`Private`ExpVar^9) - 11/(126*HarmonicSums`Private`ExpVar^8) - 2231/(26460*HarmonicSums`Private`ExpVar^7) + 13/(180*HarmonicSums`Private`ExpVar^6) + 61/(1350*HarmonicSums`Private`ExpVar^5) - 1/(9*HarmonicSums`Private`ExpVar^4) + 2/(27*HarmonicSums`Private`ExpVar^3) - (11*z2^3)/21 + (3*z3^2)/2 + sinf*(-13/(36*HarmonicSums`Private`ExpVar^10) - 68/(405*HarmonicSums`Private`ExpVar^9) + 11/(48*HarmonicSums`Private`ExpVar^8) + 11/(126*HarmonicSums`Private`ExpVar^7) - 3/(8*HarmonicSums`Private`ExpVar^6) + 77/(180*HarmonicSums`Private`ExpVar^5) - 7/(24*HarmonicSums`Private`ExpVar^4) + 1/(9*HarmonicSums`Private`ExpVar^3) - z2*z3 + 3*z5), S[1, -3, -2, HarmonicSums`Private`ExpVar] :> -629/(960*HarmonicSums`Private`ExpVar^10) + 14447/(50400*HarmonicSums`Private`ExpVar^9) + 2183/(8064*HarmonicSums`Private`ExpVar^8) - 5053/(11760*HarmonicSums`Private`ExpVar^7) + 437/(1440*HarmonicSums`Private`ExpVar^6) - 53/(400*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - (ln2^4*z2)/12 + (-2*li4half + (-1)^HarmonicSums`Private`ExpVar* (-777/(32*HarmonicSums`Private`ExpVar^10) + 77/(16*HarmonicSums`Private`ExpVar^9) + 175/(64*HarmonicSums`Private`ExpVar^8) - 15/(16*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) + 7/(16*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)))*z2 + (ln2^2*z2^2)/2 - (13*z2^3)/420 - (7*ln2*z2*z3)/4 + (163*z3^2)/64 + sinf*((-9*z2*z3)/4 + (83*z5)/16), S[1, -3, 2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (9347/(960*HarmonicSums`Private`ExpVar^10) + 6889/(480*HarmonicSums`Private`ExpVar^9) - 199/(96*HarmonicSums`Private`ExpVar^8) - 107/(48*HarmonicSums`Private`ExpVar^7) + 5/(4*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5)) + (5*s6)/2 + (ln2^4*z2)/24 + (li4half + (-1)^HarmonicSums`Private`ExpVar* (777/(16*HarmonicSums`Private`ExpVar^10) - 77/(8*HarmonicSums`Private`ExpVar^9) - 175/(32*HarmonicSums`Private`ExpVar^8) + 15/(8*HarmonicSums`Private`ExpVar^7) + 15/(16*HarmonicSums`Private`ExpVar^6) - 7/(8*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4)))*z2 - (ln2^2*z2^2)/4 + (179*z2^3)/420 - (121*z3^2)/64 + ln2*((7*z2*z3)/8 - (155*z5)/32) + sinf*((-5*z2*z3)/8 + (11*z5)/32), S[1, 3, -2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-1083/(64*HarmonicSums`Private`ExpVar^10) + 47/(32*HarmonicSums`Private`ExpVar^9) + 61/(32*HarmonicSums`Private`ExpVar^8) - 13/(16*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6)) - (3*s6)/2 + (-187/(2400*HarmonicSums`Private`ExpVar^10) + 11/(144*HarmonicSums`Private`ExpVar^9) + 5/(144*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^7) - 7/(288*HarmonicSums`Private`ExpVar^6) + 7/(48*HarmonicSums`Private`ExpVar^5) - 7/(32*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (59*z2^3)/210 + (19*z3^2)/32 + sinf*((z2*z3)/4 - (51*z5)/32) + (93*ln2*z5)/32, S[1, 3, 2, HarmonicSums`Private`ExpVar] :> 4541/(60480*HarmonicSums`Private`ExpVar^10) + 66059/(194400*HarmonicSums`Private`ExpVar^9) - 617/(8064*HarmonicSums`Private`ExpVar^8) - 13619/(35280*HarmonicSums`Private`ExpVar^7) + 889/(1440*HarmonicSums`Private`ExpVar^6) - 1969/(3600*HarmonicSums`Private`ExpVar^5) + 31/(96*HarmonicSums`Private`ExpVar^4) - 1/(9*HarmonicSums`Private`ExpVar^3) + (187/(1200*HarmonicSums`Private`ExpVar^10) - 11/(72*HarmonicSums`Private`ExpVar^9) - 5/(72*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^7) + 7/(144*HarmonicSums`Private`ExpVar^6) - 7/(24*HarmonicSums`Private`ExpVar^5) + 7/(16*HarmonicSums`Private`ExpVar^4) - 5/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (17*z2^3)/42 - (3*z3^2)/2 + sinf*(3*z2*z3 - (9*z5)/2), S[1, -2, -3, HarmonicSums`Private`ExpVar] :> -899/(960*HarmonicSums`Private`ExpVar^10) + 8531/(16800*HarmonicSums`Private`ExpVar^9) + 2465/(8064*HarmonicSums`Private`ExpVar^8) - 382/(735*HarmonicSums`Private`ExpVar^7) + 503/(1440*HarmonicSums`Private`ExpVar^6) - 57/(400*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + (403*z2^3)/840 + (-1)^HarmonicSums`Private`ExpVar* (-561/(32*HarmonicSums`Private`ExpVar^10) - 81/(8*HarmonicSums`Private`ExpVar^9) + 81/(32*HarmonicSums`Private`ExpVar^8) + 3/(2*HarmonicSums`Private`ExpVar^7) - 21/(32*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^5) + 15/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3))*z3 - (89*z3^2)/64 + sinf*((21*z2*z3)/8 - (67*z5)/16), S[1, -2, 3, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-475/(192*HarmonicSums`Private`ExpVar^10) + 779/(96*HarmonicSums`Private`ExpVar^9) - 7/(32*HarmonicSums`Private`ExpVar^8) - 3/(2*HarmonicSums`Private`ExpVar^7) + 11/(16*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5)) - (5*s6)/2 - (1033*z2^3)/1680 + (-1)^HarmonicSums`Private`ExpVar*(187/(8*HarmonicSums`Private`ExpVar^10) + 27/(2*HarmonicSums`Private`ExpVar^9) - 27/(8*HarmonicSums`Private`ExpVar^8) - 2/HarmonicSums`Private`ExpVar^7 + 7/(8*HarmonicSums`Private`ExpVar^6) + 1/(2*HarmonicSums`Private`ExpVar^5) - 5/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3))*z3 + (69*z3^2)/64 + sinf*((-3*z2*z3)/4 + (21*z5)/32) + (155*ln2*z5)/32, S[1, 2, -3, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-1325/(64*HarmonicSums`Private`ExpVar^10) + 29/(32*HarmonicSums`Private`ExpVar^9) + 37/(16*HarmonicSums`Private`ExpVar^8) - 7/(8*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6)) + (7*s6)/2 + (13*z2^3)/12 + (-11/(160*HarmonicSums`Private`ExpVar^10) - 33/(1400*HarmonicSums`Private`ExpVar^9) + 9/(224*HarmonicSums`Private`ExpVar^8) + 19/(1470*HarmonicSums`Private`ExpVar^7) - 7/(160*HarmonicSums`Private`ExpVar^6) - 7/(600*HarmonicSums`Private`ExpVar^5) + 5/(32*HarmonicSums`Private`ExpVar^4) - 17/(48*HarmonicSums`Private`ExpVar^3) + 9/(16*HarmonicSums`Private`ExpVar^2) - 3/(4*HarmonicSums`Private`ExpVar))*z3 - (103*z3^2)/64 + sinf*(-((z2*z3)/8) - (41*z5)/32) - (217*ln2*z5)/32, S[1, 2, 3, HarmonicSums`Private`ExpVar] :> -1583/(8640*HarmonicSums`Private`ExpVar^10) + 354367/(1360800*HarmonicSums`Private`ExpVar^9) + 617/(8064*HarmonicSums`Private`ExpVar^8) - 6641/(17640*HarmonicSums`Private`ExpVar^7) + 641/(1440*HarmonicSums`Private`ExpVar^6) - 1211/(3600*HarmonicSums`Private`ExpVar^5) + 17/(96*HarmonicSums`Private`ExpVar^4) - 1/(18*HarmonicSums`Private`ExpVar^3) - (29*z2^3)/30 + (11/(120*HarmonicSums`Private`ExpVar^10) + 11/(350*HarmonicSums`Private`ExpVar^9) - 3/(56*HarmonicSums`Private`ExpVar^8) - 38/(2205*HarmonicSums`Private`ExpVar^7) + 7/(120*HarmonicSums`Private`ExpVar^6) + 7/(450*HarmonicSums`Private`ExpVar^5) - 5/(24*HarmonicSums`Private`ExpVar^4) + 17/(36*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1))* z3 + 2*z3^2 + sinf*(-2*z2*z3 + (11*z5)/2), S[1, -1, -4, HarmonicSums`Private`ExpVar] :> -3007/(2880*HarmonicSums`Private`ExpVar^10) + 397751/(453600*HarmonicSums`Private`ExpVar^9) + 2207/(8064*HarmonicSums`Private`ExpVar^8) - 7051/(11760*HarmonicSums`Private`ExpVar^7) + 569/(1440*HarmonicSums`Private`ExpVar^6) - 61/(400*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + (5*s6)/2 + 2*li4half*z2 + (ln2^4*z2)/12 - (7*ln2^2*z2^2)/10 + (-1)^HarmonicSums`Private`ExpVar* (1659/(256*HarmonicSums`Private`ExpVar^10) - 1071/(640*HarmonicSums`Private`ExpVar^9) - 1029/(1280*HarmonicSums`Private`ExpVar^8) + 49/(160*HarmonicSums`Private`ExpVar^7) + 21/(128*HarmonicSums`Private`ExpVar^6) - 7/(64*HarmonicSums`Private`ExpVar^5) - 21/(320*HarmonicSums`Private`ExpVar^4) + 21/(160*HarmonicSums`Private`ExpVar^3) - 7/(80*HarmonicSums`Private`ExpVar^2))*z2^2 - (27*z2^3)/35 + z3^2/4 + sinf*((-2*ln2*z2^2)/5 - (3*z2*z3)/4 + (91*z5)/32), S[1, -1, 4, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-459/(64*HarmonicSums`Private`ExpVar^10) + 565/(96*HarmonicSums`Private`ExpVar^9) + 47/(96*HarmonicSums`Private`ExpVar^8) - 61/(48*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(12*HarmonicSums`Private`ExpVar^5)) + s6 - li4half*z2 - (ln2^4*z2)/24 + (17*ln2^2*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (-237/(32*HarmonicSums`Private`ExpVar^10) + 153/(80*HarmonicSums`Private`ExpVar^9) + 147/(160*HarmonicSums`Private`ExpVar^8) - 7/(20*HarmonicSums`Private`ExpVar^7) - 3/(16*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5) + 3/(40*HarmonicSums`Private`ExpVar^4) - 3/(20*HarmonicSums`Private`ExpVar^3) + 1/(10*HarmonicSums`Private`ExpVar^2))*z2^2 + (123*z2^3)/140 - (15*z3^2)/16 + sinf*((7*ln2*z2^2)/20 + (3*z2*z3)/8 - 2*z5) - (155*ln2*z5)/32, S[1, 1, -4, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-1635/(64*HarmonicSums`Private`ExpVar^10) + 15/(32*HarmonicSums`Private`ExpVar^9) + 87/(32*HarmonicSums`Private`ExpVar^8) - 15/(16*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6)) - (3*s6)/2 + (-7/(1200*HarmonicSums`Private`ExpVar^9) + 1/(240*HarmonicSums`Private`ExpVar^7) - 7/(1200*HarmonicSums`Private`ExpVar^5) + 7/(240*HarmonicSums`Private`ExpVar^3) - 7/(80*HarmonicSums`Private`ExpVar^2) + 7/(40*HarmonicSums`Private`ExpVar))*z2^2 - (7*sinf^2*z2^2)/40 - (167*z2^3)/280 + (7*z3^2)/8 + sinf*(-((z2*z3)/2) + (29*z5)/32) + (93*ln2*z5)/32, S[1, 1, 4, HarmonicSums`Private`ExpVar] :> -8719/(25920*HarmonicSums`Private`ExpVar^10) + 1020503/(4082400*HarmonicSums`Private`ExpVar^9) + 1199/(8064*HarmonicSums`Private`ExpVar^8) - 41843/(105840*HarmonicSums`Private`ExpVar^7) + 191/(480*HarmonicSums`Private`ExpVar^6) - 2899/(10800*HarmonicSums`Private`ExpVar^5) + 37/(288*HarmonicSums`Private`ExpVar^4) - 1/(27*HarmonicSums`Private`ExpVar^3) + (1/(150*HarmonicSums`Private`ExpVar^9) - 1/(210*HarmonicSums`Private`ExpVar^7) + 1/(150*HarmonicSums`Private`ExpVar^5) - 1/(30*HarmonicSums`Private`ExpVar^3) + 1/(10*HarmonicSums`Private`ExpVar^2) - 1/(5*HarmonicSums`Private`ExpVar))*z2^2 + (sinf^2*z2^2)/5 + (37*z2^3)/70 - z3^2 + sinf*(z2*z3 - 2*z5), S[-3, -1, -1, -1, HarmonicSums`Private`ExpVar] :> -2*li6half - (2*ln2^6)/45 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (-51/(8*HarmonicSums`Private`ExpVar^10) + 7/(8*HarmonicSums`Private`ExpVar^8) - 5/(24*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3)) - 7117/(26880*HarmonicSums`Private`ExpVar^10) + 15401/(34560*HarmonicSums`Private`ExpVar^9) + 3697/(46080*HarmonicSums`Private`ExpVar^8) - 137/(336*HarmonicSums`Private`ExpVar^7) + 223/(576*HarmonicSums`Private`ExpVar^6) - 17/(80*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - (11*s6)/4 + (ln2^4*z2)/4 + (-li4half + 47/(320*HarmonicSums`Private`ExpVar^10) - 17/(144*HarmonicSums`Private`ExpVar^9) - 11/(192*HarmonicSums`Private`ExpVar^8) + 7/(96*HarmonicSums`Private`ExpVar^7) + 1/(24*HarmonicSums`Private`ExpVar^6) - 7/(48*HarmonicSums`Private`ExpVar^5) + 5/(32*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3))*z2 + (503*z2^3)/1680 + ln2^2*(-li4half + 47/(320*HarmonicSums`Private`ExpVar^10) - 17/(144*HarmonicSums`Private`ExpVar^9) - 11/(192*HarmonicSums`Private`ExpVar^8) + 7/(96*HarmonicSums`Private`ExpVar^7) + 1/(24*HarmonicSums`Private`ExpVar^6) - 7/(48*HarmonicSums`Private`ExpVar^5) + 5/(32*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + (29*z2^2)/40) + (-1)^HarmonicSums`Private`ExpVar* (-153/(16*HarmonicSums`Private`ExpVar^10) + 21/(16*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3))*z3 + (15*z3^2)/16 + ln2*((-1)^HarmonicSums`Private`ExpVar* (30865/(2688*HarmonicSums`Private`ExpVar^10) - 5153/(960*HarmonicSums`Private`ExpVar^9) - 3121/(1920*HarmonicSums`Private`ExpVar^8) + 59/(64*HarmonicSums`Private`ExpVar^7) + 55/(96*HarmonicSums`Private`ExpVar^6) - 11/(16*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4)) + z2*((-1)^HarmonicSums`Private`ExpVar* (-153/(8*HarmonicSums`Private`ExpVar^10) + 21/(8*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + (3*z3)/2)), S[-3, -1, -1, 1, HarmonicSums`Private`ExpVar] :> 6*li6half - ln2^6/20 + (-1)^HarmonicSums`Private`ExpVar* (506801/(56448*HarmonicSums`Private`ExpVar^10) + 100703/(28800*HarmonicSums`Private`ExpVar^9) - 93253/(115200*HarmonicSums`Private`ExpVar^8) - 691/(768*HarmonicSums`Private`ExpVar^7) + 91/(576*HarmonicSums`Private`ExpVar^6) + 13/(32*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* ln2^3*(-51/(8*HarmonicSums`Private`ExpVar^10) + 7/(8*HarmonicSums`Private`ExpVar^8) - 5/(24*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3)) - (3*s6)/4 + (-1)^HarmonicSums`Private`ExpVar* (-30865/(2688*HarmonicSums`Private`ExpVar^10) + 5153/(960*HarmonicSums`Private`ExpVar^9) + 3121/(1920*HarmonicSums`Private`ExpVar^8) - 59/(64*HarmonicSums`Private`ExpVar^7) - 55/(96*HarmonicSums`Private`ExpVar^6) + 11/(16*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4))*sinf + (13*ln2^4*z2)/48 + (-(li4half/2) - 47/(320*HarmonicSums`Private`ExpVar^10) + 17/(144*HarmonicSums`Private`ExpVar^9) + 11/(192*HarmonicSums`Private`ExpVar^8) - 7/(96*HarmonicSums`Private`ExpVar^7) - 1/(24*HarmonicSums`Private`ExpVar^6) + 7/(48*HarmonicSums`Private`ExpVar^5) - 5/(32*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3))*z2 - (1151*z2^3)/840 + ln2^2*(-li4half + 47/(320*HarmonicSums`Private`ExpVar^10) - 17/(144*HarmonicSums`Private`ExpVar^9) - 11/(192*HarmonicSums`Private`ExpVar^8) + 7/(96*HarmonicSums`Private`ExpVar^7) + 1/(24*HarmonicSums`Private`ExpVar^6) - 7/(48*HarmonicSums`Private`ExpVar^5) + 5/(32*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) - z2^2/4) + (-1)^HarmonicSums`Private`ExpVar* (1071/(16*HarmonicSums`Private`ExpVar^10) - 147/(16*HarmonicSums`Private`ExpVar^8) + 35/(16*HarmonicSums`Private`ExpVar^6) - 21/(16*HarmonicSums`Private`ExpVar^4) + 7/(8*HarmonicSums`Private`ExpVar^3))*z3 - z3^2/32 + ln2*(2*li5half + (-1)^HarmonicSums`Private`ExpVar* (-153/(8*HarmonicSums`Private`ExpVar^10) + 21/(8*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3))*z2 + (279*z5)/64), S[-3, -1, 1, -1, HarmonicSums`Private`ExpVar] :> -6*li6half + ln2^6/120 + (-1)^HarmonicSums`Private`ExpVar* (33/(128*HarmonicSums`Private`ExpVar^10) + 293/(192*HarmonicSums`Private`ExpVar^9) + 13/(256*HarmonicSums`Private`ExpVar^8) - 67/(128*HarmonicSums`Private`ExpVar^7) + 9/(32*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5)) + (-1)^HarmonicSums`Private`ExpVar* ln2^3*(-51/(8*HarmonicSums`Private`ExpVar^10) + 7/(8*HarmonicSums`Private`ExpVar^8) - 5/(24*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3)) - (31*s6)/4 + ln2*(-47/(160*HarmonicSums`Private`ExpVar^10) + 17/(72*HarmonicSums`Private`ExpVar^9) + 11/(96*HarmonicSums`Private`ExpVar^8) - 7/(48*HarmonicSums`Private`ExpVar^7) - 1/(12*HarmonicSums`Private`ExpVar^6) + 7/(24*HarmonicSums`Private`ExpVar^5) - 5/(16*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3))*sinf + li4half*z2 - (209*z2^3)/336 + ln2^2*(-47/(320*HarmonicSums`Private`ExpVar^10) + 17/(144*HarmonicSums`Private`ExpVar^9) + 11/(192*HarmonicSums`Private`ExpVar^8) - 7/(96*HarmonicSums`Private`ExpVar^7) - 1/(24*HarmonicSums`Private`ExpVar^6) + 7/(48*HarmonicSums`Private`ExpVar^5) - 5/(32*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) - (31*z2^2)/80) + (-1)^HarmonicSums`Private`ExpVar* (153/(32*HarmonicSums`Private`ExpVar^10) - 21/(32*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3))*z3 + (173*z3^2)/64 + ln2*(-2*li5half + 26099/(28800*HarmonicSums`Private`ExpVar^10) - 569/(3240*HarmonicSums`Private`ExpVar^9) - 341/(1152*HarmonicSums`Private`ExpVar^8) + 181/(2016*HarmonicSums`Private`ExpVar^7) + 103/(576*HarmonicSums`Private`ExpVar^6) - 259/(1440*HarmonicSums`Private`ExpVar^5) + 5/(192*HarmonicSums`Private`ExpVar^4) + 1/(18*HarmonicSums`Private`ExpVar^3) + z2*((-1)^HarmonicSums`Private`ExpVar* (153/(8*HarmonicSums`Private`ExpVar^10) - 21/(8*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) + (39*z3)/16) + (31*z5)/4), S[-3, -1, 1, 1, HarmonicSums`Private`ExpVar] :> -2*li6half - ln2^6/360 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (-51/(8*HarmonicSums`Private`ExpVar^10) + 7/(8*HarmonicSums`Private`ExpVar^8) - 5/(24*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3)) + 32186201/(36288000*HarmonicSums`Private`ExpVar^10) + 9379439/(32659200*HarmonicSums`Private`ExpVar^9) - 227663/(967680*HarmonicSums`Private`ExpVar^8) - 176879/(846720*HarmonicSums`Private`ExpVar^7) + 11507/(34560*HarmonicSums`Private`ExpVar^6) - 16987/(86400*HarmonicSums`Private`ExpVar^5) + 145/(2304*HarmonicSums`Private`ExpVar^4) - 1/(54*HarmonicSums`Private`ExpVar^3) - 3*s6 + (-26099/(28800*HarmonicSums`Private`ExpVar^10) + 569/(3240*HarmonicSums`Private`ExpVar^9) + 341/(1152*HarmonicSums`Private`ExpVar^8) - 181/(2016*HarmonicSums`Private`ExpVar^7) - 103/(576*HarmonicSums`Private`ExpVar^6) + 259/(1440*HarmonicSums`Private`ExpVar^5) - 5/(192*HarmonicSums`Private`ExpVar^4) - 1/(18*HarmonicSums`Private`ExpVar^3))*sinf + (47/(320*HarmonicSums`Private`ExpVar^10) - 17/(144*HarmonicSums`Private`ExpVar^9) - 11/(192*HarmonicSums`Private`ExpVar^8) + 7/(96*HarmonicSums`Private`ExpVar^7) + 1/(24*HarmonicSums`Private`ExpVar^6) - 7/(48*HarmonicSums`Private`ExpVar^5) + 5/(32*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3))*sinf^2 - (ln2^4*z2)/12 + (-3*li4half + 47/(320*HarmonicSums`Private`ExpVar^10) - 17/(144*HarmonicSums`Private`ExpVar^9) - 11/(192*HarmonicSums`Private`ExpVar^8) + 7/(96*HarmonicSums`Private`ExpVar^7) + 1/(24*HarmonicSums`Private`ExpVar^6) - 7/(48*HarmonicSums`Private`ExpVar^5) + 5/(32*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (153/(8*HarmonicSums`Private`ExpVar^10) - 21/(8*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3))*z2 + (4*ln2^2*z2^2)/5 + (83*z2^3)/60 + (-1)^HarmonicSums`Private`ExpVar* (-1071/(32*HarmonicSums`Private`ExpVar^10) + 147/(32*HarmonicSums`Private`ExpVar^8) - 35/(32*HarmonicSums`Private`ExpVar^6) + 21/(32*HarmonicSums`Private`ExpVar^4) - 7/(16*HarmonicSums`Private`ExpVar^3))*z3 + (17*z3^2)/64, S[-3, 1, -1, -1, HarmonicSums`Private`ExpVar] :> 2*li6half + (7*ln2^6)/360 + (-1)^HarmonicSums`Private`ExpVar* (12926663/(1128960*HarmonicSums`Private`ExpVar^10) - 270241/(57600*HarmonicSums`Private`ExpVar^9) - 175997/(115200*HarmonicSums`Private`ExpVar^8) + 163/(256*HarmonicSums`Private`ExpVar^7) + 413/(576*HarmonicSums`Private`ExpVar^6) - 23/(32*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4)) + s6/4 - (3*ln2^4*z2)/16 + (li4half/2 + (-1)^HarmonicSums`Private`ExpVar* (-777/(32*HarmonicSums`Private`ExpVar^10) - 35/(16*HarmonicSums`Private`ExpVar^9) + 175/(64*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)))*z2 - (121*z2^3)/168 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (153/(8*HarmonicSums`Private`ExpVar^10) - 21/(8*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (153/(8*HarmonicSums`Private`ExpVar^10) - 21/(8*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3))*z2) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-777/(32*HarmonicSums`Private`ExpVar^10) - 35/(16*HarmonicSums`Private`ExpVar^9) + 175/(64*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) - (97*z2^2)/80) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (51/(4*HarmonicSums`Private`ExpVar^10) - 7/(4*HarmonicSums`Private`ExpVar^8) + 5/(12*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3)) + (7*z3)/24) + (-1)^HarmonicSums`Private`ExpVar* (-1071/(32*HarmonicSums`Private`ExpVar^10) + 147/(32*HarmonicSums`Private`ExpVar^8) - 35/(32*HarmonicSums`Private`ExpVar^6) + 21/(32*HarmonicSums`Private`ExpVar^4) - 7/(16*HarmonicSums`Private`ExpVar^3))*z3 + (9*z3^2)/64 + ln2*(-2*li5half + 99/(320*HarmonicSums`Private`ExpVar^10) + 1499/(2880*HarmonicSums`Private`ExpVar^9) - 137/(768*HarmonicSums`Private`ExpVar^8) - 53/(224*HarmonicSums`Private`ExpVar^7) + 31/(96*HarmonicSums`Private`ExpVar^6) - 1/(5*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) + z2*((-1)^HarmonicSums`Private`ExpVar* (153/(8*HarmonicSums`Private`ExpVar^10) - 21/(8*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) + (11*z3)/16) + (155*z5)/64), S[-3, 1, -1, 1, HarmonicSums`Private`ExpVar] :> 6*li6half + ln2^6/120 - 79183/(230400*HarmonicSums`Private`ExpVar^10) + 6196819/(7257600*HarmonicSums`Private`ExpVar^9) - 571/(129024*HarmonicSums`Private`ExpVar^8) - 15511/(47040*HarmonicSums`Private`ExpVar^7) + 281/(1440*HarmonicSums`Private`ExpVar^6) - 23/(800*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 4*s6 - (ln2^4*z2)/24 + (2*li4half + (-1)^HarmonicSums`Private`ExpVar* (777/(32*HarmonicSums`Private`ExpVar^10) + 35/(16*HarmonicSums`Private`ExpVar^9) - 175/(64*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)))*z2 - (137*z2^3)/210 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (153/(8*HarmonicSums`Private`ExpVar^10) - 21/(8*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) - 99/(320*HarmonicSums`Private`ExpVar^10) - 1499/(2880*HarmonicSums`Private`ExpVar^9) + 137/(768*HarmonicSums`Private`ExpVar^8) + 53/(224*HarmonicSums`Private`ExpVar^7) - 31/(96*HarmonicSums`Private`ExpVar^6) + 1/(5*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + (-1)^HarmonicSums`Private`ExpVar* (-153/(8*HarmonicSums`Private`ExpVar^10) + 21/(8*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3))*z2) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-777/(32*HarmonicSums`Private`ExpVar^10) - 35/(16*HarmonicSums`Private`ExpVar^9) + 175/(64*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) - (7*z2^2)/5) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (51/(4*HarmonicSums`Private`ExpVar^10) - 7/(4*HarmonicSums`Private`ExpVar^8) + 5/(12*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3)) + (7*z3)/24) + ln2*z2*((-1)^HarmonicSums`Private`ExpVar* (-153/(8*HarmonicSums`Private`ExpVar^10) + 21/(8*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + (7*z3)/8) + (-1)^HarmonicSums`Private`ExpVar* (153/(32*HarmonicSums`Private`ExpVar^10) - 21/(32*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3))*z3 - (193*z3^2)/64, S[-3, 1, 1, -1, HarmonicSums`Private`ExpVar] :> -6*li6half + ln2^6/30 - 1597/(1280*HarmonicSums`Private`ExpVar^10) + 29/(640*HarmonicSums`Private`ExpVar^9) + 217/(512*HarmonicSums`Private`ExpVar^8) - 71/(224*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(40*HarmonicSums`Private`ExpVar^5) - (3*s6)/2 + ((-1)^HarmonicSums`Private`ExpVar*ln2* (777/(16*HarmonicSums`Private`ExpVar^10) + 35/(8*HarmonicSums`Private`ExpVar^9) - 175/(32*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^7) + 15/(16*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (-153/(8*HarmonicSums`Private`ExpVar^10) + 21/(8*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)))*sinf + (-1)^HarmonicSums`Private`ExpVar*ln2* (-153/(8*HarmonicSums`Private`ExpVar^10) + 21/(8*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3))*sinf^2 + 2*li4half*z2 - (ln2^4*z2)/24 + (337*z2^3)/840 + ln2^2*(li4half + (-1)^HarmonicSums`Private`ExpVar* (777/(32*HarmonicSums`Private`ExpVar^10) + 35/(16*HarmonicSums`Private`ExpVar^9) - 175/(64*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) + (7*z2^2)/20) + ln2*((-1)^HarmonicSums`Private`ExpVar* (-47759/(2688*HarmonicSums`Private`ExpVar^10) - 9263/(960*HarmonicSums`Private`ExpVar^9) + 1117/(960*HarmonicSums`Private`ExpVar^8) + 45/(32*HarmonicSums`Private`ExpVar^7) + 5/(48*HarmonicSums`Private`ExpVar^6) - 5/(8*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4)) + z2*((-1)^HarmonicSums`Private`ExpVar* (-153/(8*HarmonicSums`Private`ExpVar^10) + 21/(8*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + (5*z3)/8)) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-51/(8*HarmonicSums`Private`ExpVar^10) + 7/(8*HarmonicSums`Private`ExpVar^8) - 5/(24*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3)) + (7*z3)/24) + (9*z3^2)/64, S[-3, 1, 1, 1, HarmonicSums`Private`ExpVar] :> 2*li6half + ln2^6/36 + (-1)^HarmonicSums`Private`ExpVar* (25727/(3840*HarmonicSums`Private`ExpVar^10) - 29701/(5760*HarmonicSums`Private`ExpVar^9) - 53/(48*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^7) + 19/(48*HarmonicSums`Private`ExpVar^6) - 5/(24*HarmonicSums`Private`ExpVar^5)) - s6/2 + (-1)^HarmonicSums`Private`ExpVar* (-777/(32*HarmonicSums`Private`ExpVar^10) - 35/(16*HarmonicSums`Private`ExpVar^9) + 175/(64*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4))*sinf^2 + (-1)^HarmonicSums`Private`ExpVar*(51/(8*HarmonicSums`Private`ExpVar^10) - 7/(8*HarmonicSums`Private`ExpVar^8) + 5/(24*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3))*sinf^3 - (ln2^4*z2)/6 + (-li4half + (-1)^HarmonicSums`Private`ExpVar* (-777/(32*HarmonicSums`Private`ExpVar^10) - 35/(16*HarmonicSums`Private`ExpVar^9) + 175/(64*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)))*z2 - (85*z2^3)/168 + sinf*((-1)^HarmonicSums`Private`ExpVar* (47759/(2688*HarmonicSums`Private`ExpVar^10) + 9263/(960*HarmonicSums`Private`ExpVar^9) - 1117/(960*HarmonicSums`Private`ExpVar^8) - 45/(32*HarmonicSums`Private`ExpVar^7) - 5/(48*HarmonicSums`Private`ExpVar^6) + 5/(8*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* (153/(8*HarmonicSums`Private`ExpVar^10) - 21/(8*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3))*z2) + ln2^2*(li4half + z2^2/4) + (7*ln2^3*z3)/24 + (-1)^HarmonicSums`Private`ExpVar* (51/(4*HarmonicSums`Private`ExpVar^10) - 7/(4*HarmonicSums`Private`ExpVar^8) + 5/(12*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3))*z3 + (41*z3^2)/64 + ln2*(2*li5half - (7*z2*z3)/8 + (31*z5)/32), S[3, -1, -1, -1, HarmonicSums`Private`ExpVar] :> ln2^6/60 + (-1)^HarmonicSums`Private`ExpVar* (4331/(1536*HarmonicSums`Private`ExpVar^10) + 4287/(1280*HarmonicSums`Private`ExpVar^9) - 83/(192*HarmonicSums`Private`ExpVar^8) - 163/(192*HarmonicSums`Private`ExpVar^7) + 17/(32*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5)) + 5*s6 - (ln2^4*z2)/6 + (-1)^HarmonicSums`Private`ExpVar*(39/(8*HarmonicSums`Private`ExpVar^10) - 57/(16*HarmonicSums`Private`ExpVar^9) - 21/(32*HarmonicSums`Private`ExpVar^8) + 21/(32*HarmonicSums`Private`ExpVar^7) + 5/(32*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4))*z2 + (937*z2^3)/840 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (39/(8*HarmonicSums`Private`ExpVar^10) - 57/(16*HarmonicSums`Private`ExpVar^9) - 21/(32*HarmonicSums`Private`ExpVar^8) + 21/(32*HarmonicSums`Private`ExpVar^7) + 5/(32*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) - (19*z2^2)/40) + ln2^3*(-(40*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(72*HarmonicSums`Private`ExpVar^8) - 1/(72*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - (7*z3)/24) + (-3/(80*HarmonicSums`Private`ExpVar^10) + 1/(48*HarmonicSums`Private`ExpVar^8) - 1/(48*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z3 - (35*z3^2)/16 + ln2*(-2*li5half + 5851/(26880*HarmonicSums`Private`ExpVar^10) + 2377/(60480*HarmonicSums`Private`ExpVar^9) - 517/(3840*HarmonicSums`Private`ExpVar^8) - 169/(6720*HarmonicSums`Private`ExpVar^7) + 17/(64*HarmonicSums`Private`ExpVar^6) - 19/(48*HarmonicSums`Private`ExpVar^5) + 11/(32*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + z2*(-3/(40*HarmonicSums`Private`ExpVar^10) + 1/(24*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - (19*z3)/8) - (279*z5)/64), S[3, -1, -1, 1, HarmonicSums`Private`ExpVar] :> 4*li6half + ln2^6/180 + 4578353/(67737600*HarmonicSums`Private`ExpVar^10) + 44486717/(152409600*HarmonicSums`Private`ExpVar^9) - 43823/(1075200*HarmonicSums`Private`ExpVar^8) - 570139/(2822400*HarmonicSums`Private`ExpVar^7) + 275/(2304*HarmonicSums`Private`ExpVar^6) + 85/(576*HarmonicSums`Private`ExpVar^5) - 119/(384*HarmonicSums`Private`ExpVar^4) + 2/(9*HarmonicSums`Private`ExpVar^3) + (21*s6)/4 + (-5851/(26880*HarmonicSums`Private`ExpVar^10) - 2377/(60480*HarmonicSums`Private`ExpVar^9) + 517/(3840*HarmonicSums`Private`ExpVar^8) + 169/(6720*HarmonicSums`Private`ExpVar^7) - 17/(64*HarmonicSums`Private`ExpVar^6) + 19/(48*HarmonicSums`Private`ExpVar^5) - 11/(32*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3))*sinf + (ln2^4*z2)/24 + (3*li4half + (-1)^HarmonicSums`Private`ExpVar* (-39/(8*HarmonicSums`Private`ExpVar^10) + 57/(16*HarmonicSums`Private`ExpVar^9) + 21/(32*HarmonicSums`Private`ExpVar^8) - 21/(32*HarmonicSums`Private`ExpVar^7) - 5/(32*HarmonicSums`Private`ExpVar^6) + 5/(16*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)))*z2 - (317*z2^3)/210 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (39/(8*HarmonicSums`Private`ExpVar^10) - 57/(16*HarmonicSums`Private`ExpVar^9) - 21/(32*HarmonicSums`Private`ExpVar^8) + 21/(32*HarmonicSums`Private`ExpVar^7) + 5/(32*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) - (83*z2^2)/80) + ln2*z2*(-3/(40*HarmonicSums`Private`ExpVar^10) + 1/(24*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - (7*z3)/8) + ln2^3*(-(40*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(72*HarmonicSums`Private`ExpVar^8) - 1/(72*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - (7*z3)/24) + (21/(80*HarmonicSums`Private`ExpVar^10) - 7/(48*HarmonicSums`Private`ExpVar^8) + 7/(48*HarmonicSums`Private`ExpVar^6) - 7/(16*HarmonicSums`Private`ExpVar^4) + 7/(8*HarmonicSums`Private`ExpVar^3) - 7/(8*HarmonicSums`Private`ExpVar^2))*z3 + (9*z3^2)/16, S[3, -1, 1, -1, HarmonicSums`Private`ExpVar] :> -8*li6half + (11*ln2^6)/360 - 6151/(15360*HarmonicSums`Private`ExpVar^10) + 11/(80*HarmonicSums`Private`ExpVar^9) + 37/(192*HarmonicSums`Private`ExpVar^8) - 265/(896*HarmonicSums`Private`ExpVar^7) + 29/(128*HarmonicSums`Private`ExpVar^6) - 9/(80*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 3*s6 + (-1)^HarmonicSums`Private`ExpVar*ln2* (-39/(4*HarmonicSums`Private`ExpVar^10) + 57/(8*HarmonicSums`Private`ExpVar^9) + 21/(16*HarmonicSums`Private`ExpVar^8) - 21/(16*HarmonicSums`Private`ExpVar^7) - 5/(16*HarmonicSums`Private`ExpVar^6) + 5/(8*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4))*sinf - li4half*z2 - (ln2^4*z2)/8 + (2363*z2^3)/1680 + ln2^2*(li4half + (-1)^HarmonicSums`Private`ExpVar* (-39/(8*HarmonicSums`Private`ExpVar^10) + 57/(16*HarmonicSums`Private`ExpVar^9) + 21/(32*HarmonicSums`Private`ExpVar^8) - 21/(32*HarmonicSums`Private`ExpVar^7) - 5/(32*HarmonicSums`Private`ExpVar^6) + 5/(16*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) + (137*z2^2)/80) + ln2*((-1)^HarmonicSums`Private`ExpVar* (2801/(128*HarmonicSums`Private`ExpVar^10) - 297/(64*HarmonicSums`Private`ExpVar^9) - 41/(16*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5)) + z2*(3/(40*HarmonicSums`Private`ExpVar^10) - 1/(24*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) - (25*z3)/16)) + ln2^3*(-(40*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(72*HarmonicSums`Private`ExpVar^8) - 1/(72*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - (7*z3)/24) + (3/(160*HarmonicSums`Private`ExpVar^10) - 1/(96*HarmonicSums`Private`ExpVar^8) + 1/(96*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z3 + (223*z3^2)/128, S[3, -1, 1, 1, HarmonicSums`Private`ExpVar] :> ln2^6/40 + (-1)^HarmonicSums`Private`ExpVar* (14083/(768*HarmonicSums`Private`ExpVar^10) + 1331/(640*HarmonicSums`Private`ExpVar^9) - 23/(12*HarmonicSums`Private`ExpVar^8) - 25/(48*HarmonicSums`Private`ExpVar^7) + 9/(16*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5)) + (5*s6)/2 + (-1)^HarmonicSums`Private`ExpVar* (-2801/(128*HarmonicSums`Private`ExpVar^10) + 297/(64*HarmonicSums`Private`ExpVar^9) + 41/(16*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5))*sinf + (-1)^HarmonicSums`Private`ExpVar*(39/(8*HarmonicSums`Private`ExpVar^10) - 57/(16*HarmonicSums`Private`ExpVar^9) - 21/(32*HarmonicSums`Private`ExpVar^8) + 21/(32*HarmonicSums`Private`ExpVar^7) + 5/(32*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4))*sinf^2 - (ln2^4*z2)/16 + (li4half/2 + (-1)^HarmonicSums`Private`ExpVar* (39/(8*HarmonicSums`Private`ExpVar^10) - 57/(16*HarmonicSums`Private`ExpVar^9) - 21/(32*HarmonicSums`Private`ExpVar^8) + 21/(32*HarmonicSums`Private`ExpVar^7) + 5/(32*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)))*z2 + (677*z2^3)/1680 + ln2^2*(li4half + (39*z2^2)/80) + ln2^3*(-(40*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(72*HarmonicSums`Private`ExpVar^8) - 1/(72*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - (7*z3)/24) + (-21/(160*HarmonicSums`Private`ExpVar^10) + 7/(96*HarmonicSums`Private`ExpVar^8) - 7/(96*HarmonicSums`Private`ExpVar^6) + 7/(32*HarmonicSums`Private`ExpVar^4) - 7/(16*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2))*z3 - (251*z3^2)/128 + ln2*(2*li5half + z2*(3/(40*HarmonicSums`Private`ExpVar^10) - 1/(24*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + (7*z3)/8) - (31*z5)/4), S[3, 1, -1, -1, HarmonicSums`Private`ExpVar] :> -(ln2^6/24) + ln2^3*(1/(20*HarmonicSums`Private`ExpVar^10) - 1/(36*HarmonicSums`Private`ExpVar^8) + 1/(36*HarmonicSums`Private`ExpVar^6) - 1/(12*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(6*HarmonicSums`Private`ExpVar^2)) + 28697/(4515840*HarmonicSums`Private`ExpVar^10) + 1286483/(25401600*HarmonicSums`Private`ExpVar^9) + 2491/(230400*HarmonicSums`Private`ExpVar^8) - 26501/(134400*HarmonicSums`Private`ExpVar^7) + 99/(256*HarmonicSums`Private`ExpVar^6) - 653/(1440*HarmonicSums`Private`ExpVar^5) + 23/(64*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) - (3*s6)/2 + (ln2^4*z2)/6 + (-2*li4half - 187/(2400*HarmonicSums`Private`ExpVar^10) - 5/(144*HarmonicSums`Private`ExpVar^9) + 5/(144*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^7) - 7/(288*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (67*z2^3)/120 + sinf*(ln2^2*(3/(40*HarmonicSums`Private`ExpVar^10) - 1/(24*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (3/(40*HarmonicSums`Private`ExpVar^10) - 1/(24*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2) + ln2^2*(-li4half - 187/(2400*HarmonicSums`Private`ExpVar^10) - 5/(144*HarmonicSums`Private`ExpVar^9) + 5/(144*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^7) - 7/(288*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (37*z2^2)/40) + ln2*((-1)^HarmonicSums`Private`ExpVar* (677/(128*HarmonicSums`Private`ExpVar^10) + 223/(64*HarmonicSums`Private`ExpVar^9) - 59/(64*HarmonicSums`Private`ExpVar^8) - 21/(32*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5)) + z2*(3/(40*HarmonicSums`Private`ExpVar^10) - 1/(24*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + (3*z3)/16)) + (-21/(160*HarmonicSums`Private`ExpVar^10) + 7/(96*HarmonicSums`Private`ExpVar^8) - 7/(96*HarmonicSums`Private`ExpVar^6) + 7/(32*HarmonicSums`Private`ExpVar^4) - 7/(16*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2))*z3 + (67*z3^2)/128, S[3, 1, -1, 1, HarmonicSums`Private`ExpVar] :> 8*li6half - (17*ln2^6)/360 + (-1)^HarmonicSums`Private`ExpVar* (-505/(256*HarmonicSums`Private`ExpVar^10) + 535/(128*HarmonicSums`Private`ExpVar^9) + 7/(64*HarmonicSums`Private`ExpVar^8) - 11/(16*HarmonicSums`Private`ExpVar^7) + 3/(16*HarmonicSums`Private`ExpVar^6)) + ln2^3*(1/(20*HarmonicSums`Private`ExpVar^10) - 1/(36*HarmonicSums`Private`ExpVar^8) + 1/(36*HarmonicSums`Private`ExpVar^6) - 1/(12*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(6*HarmonicSums`Private`ExpVar^2)) + 4*s6 + (ln2^4*z2)/4 + (187/(2400*HarmonicSums`Private`ExpVar^10) + 5/(144*HarmonicSums`Private`ExpVar^9) - 5/(144*HarmonicSums`Private`ExpVar^8) - 1/(48*HarmonicSums`Private`ExpVar^7) + 7/(288*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (205*z2^3)/168 + sinf*((-1)^HarmonicSums`Private`ExpVar* (-677/(128*HarmonicSums`Private`ExpVar^10) - 223/(64*HarmonicSums`Private`ExpVar^9) + 59/(64*HarmonicSums`Private`ExpVar^8) + 21/(32*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5)) + ln2^2*(3/(40*HarmonicSums`Private`ExpVar^10) - 1/(24*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (-3/(40*HarmonicSums`Private`ExpVar^10) + 1/(24*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2) + ln2^2*(-li4half - 187/(2400*HarmonicSums`Private`ExpVar^10) - 5/(144*HarmonicSums`Private`ExpVar^9) + 5/(144*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^7) - 7/(288*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) - (17*z2^2)/40) + (3/(160*HarmonicSums`Private`ExpVar^10) - 1/(96*HarmonicSums`Private`ExpVar^8) + 1/(96*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z3 - (183*z3^2)/128 + ln2*(2*li5half + (-3/(40*HarmonicSums`Private`ExpVar^10) + 1/(24*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2 - (155*z5)/64), S[3, 1, 1, -1, HarmonicSums`Private`ExpVar] :> -4*li6half + ln2^6/90 + (-1)^HarmonicSums`Private`ExpVar* (-1353/(256*HarmonicSums`Private`ExpVar^10) + 7/(128*HarmonicSums`Private`ExpVar^9) + 57/(64*HarmonicSums`Private`ExpVar^8) - 3/(8*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^6)) + ln2^3*(-(40*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(72*HarmonicSums`Private`ExpVar^8) - 1/(72*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2)) - s6/4 + (ln2^2*(-3/(40*HarmonicSums`Private`ExpVar^10) + 1/(24*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + ln2*(187/(1200*HarmonicSums`Private`ExpVar^10) + 5/(72*HarmonicSums`Private`ExpVar^9) - 5/(72*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^7) + 7/(144*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)))*sinf + ln2*(-3/(40*HarmonicSums`Private`ExpVar^10) + 1/(24*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*sinf^2 - (li4half*z2)/2 - (5*ln2^4*z2)/48 + (107*z2^3)/105 + ln2^2*(187/(2400*HarmonicSums`Private`ExpVar^10) + 5/(144*HarmonicSums`Private`ExpVar^9) - 5/(144*HarmonicSums`Private`ExpVar^8) - 1/(48*HarmonicSums`Private`ExpVar^7) + 7/(288*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - z2^2/16) + (7*z3^2)/32 + ln2*(-2*li5half + 2567/(42000*HarmonicSums`Private`ExpVar^10) - 1013/(9072*HarmonicSums`Private`ExpVar^9) - 929/(17280*HarmonicSums`Private`ExpVar^8) + 71/(1120*HarmonicSums`Private`ExpVar^7) + 221/(1728*HarmonicSums`Private`ExpVar^6) - 451/(1440*HarmonicSums`Private`ExpVar^5) + 65/(192*HarmonicSums`Private`ExpVar^4) - 17/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + z2*(-3/(40*HarmonicSums`Private`ExpVar^10) + 1/(24*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - (3*z3)/2) - (31*z5)/32), S[3, 1, 1, 1, HarmonicSums`Private`ExpVar] :> 23844931/(181440000*HarmonicSums`Private`ExpVar^10) + 1079831/(32659200*HarmonicSums`Private`ExpVar^9) - 169693/(2903040*HarmonicSums`Private`ExpVar^8) - 82099/(846720*HarmonicSums`Private`ExpVar^7) + 21109/(103680*HarmonicSums`Private`ExpVar^6) - 11863/(86400*HarmonicSums`Private`ExpVar^5) - 35/(2304*HarmonicSums`Private`ExpVar^4) + 43/(432*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (-187/(2400*HarmonicSums`Private`ExpVar^10) - 5/(144*HarmonicSums`Private`ExpVar^9) + 5/(144*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^7) - 7/(288*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*sinf^2 + (1/(40*HarmonicSums`Private`ExpVar^10) - 1/(72*HarmonicSums`Private`ExpVar^8) + 1/(72*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2))*sinf^3 + (-187/(2400*HarmonicSums`Private`ExpVar^10) - 5/(144*HarmonicSums`Private`ExpVar^9) + 5/(144*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^7) - 7/(288*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (2*z2^3)/105 + sinf*(-2567/(42000*HarmonicSums`Private`ExpVar^10) + 1013/(9072*HarmonicSums`Private`ExpVar^9) + 929/(17280*HarmonicSums`Private`ExpVar^8) - 71/(1120*HarmonicSums`Private`ExpVar^7) - 221/(1728*HarmonicSums`Private`ExpVar^6) + 451/(1440*HarmonicSums`Private`ExpVar^5) - 65/(192*HarmonicSums`Private`ExpVar^4) + 17/(72*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (3/(40*HarmonicSums`Private`ExpVar^10) - 1/(24*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2) + (1/(20*HarmonicSums`Private`ExpVar^10) - 1/(36*HarmonicSums`Private`ExpVar^8) + 1/(36*HarmonicSums`Private`ExpVar^6) - 1/(12*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(6*HarmonicSums`Private`ExpVar^2))*z3 + z3^2, S[-2, -2, -1, -1, HarmonicSums`Private`ExpVar] :> 12*li6half - ln2^6/15 + (-1)^HarmonicSums`Private`ExpVar*li4half* (-34/HarmonicSums`Private`ExpVar^9 + 6/HarmonicSums`Private`ExpVar^7 - 2/HarmonicSums`Private`ExpVar^5 + 2/HarmonicSums`Private`ExpVar^3 - 2/HarmonicSums`Private`ExpVar^2) + 3363/(8960*HarmonicSums`Private`ExpVar^10) + 1511/(1920*HarmonicSums`Private`ExpVar^9) - 1939/(23040*HarmonicSums`Private`ExpVar^8) - 211/(448*HarmonicSums`Private`ExpVar^7) + 67/(144*HarmonicSums`Private`ExpVar^6) - 19/(80*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) + (9*s6)/2 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-17/(12*HarmonicSums`Private`ExpVar^9) + 1/(4*HarmonicSums`Private`ExpVar^7) - 1/(12*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2)) + (5*z2)/12) + (4*li4half + 7/(16*HarmonicSums`Private`ExpVar^10) - 31/(72*HarmonicSums`Private`ExpVar^9) - 1/(8*HarmonicSums`Private`ExpVar^8) + 1/(6*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^6) - 5/(24*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar*(119/(10*HarmonicSums`Private`ExpVar^9) - 21/(10*HarmonicSums`Private`ExpVar^7) + 7/(10*HarmonicSums`Private`ExpVar^5) - 7/(10*HarmonicSums`Private`ExpVar^3) + 7/(10*HarmonicSums`Private`ExpVar^2))*z2^2 - (813*z2^3)/280 + ln2^2*(-2*li4half + 7/(16*HarmonicSums`Private`ExpVar^10) - 31/(72*HarmonicSums`Private`ExpVar^9) - 1/(8*HarmonicSums`Private`ExpVar^8) + 1/(6*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^6) - 5/(24*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (-17/(4*HarmonicSums`Private`ExpVar^9) + 3/(4*HarmonicSums`Private`ExpVar^7) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 - (39*z2^2)/20) - (173*z3^2)/64 + ln2*((-1)^HarmonicSums`Private`ExpVar* (65969/(6720*HarmonicSums`Private`ExpVar^10) - 1013/(672*HarmonicSums`Private`ExpVar^9) - 169/(120*HarmonicSums`Private`ExpVar^8) + 53/(240*HarmonicSums`Private`ExpVar^7) + 13/(24*HarmonicSums`Private`ExpVar^6) - 5/(12*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* (-357/(16*HarmonicSums`Private`ExpVar^9) + 63/(16*HarmonicSums`Private`ExpVar^7) - 21/(16*HarmonicSums`Private`ExpVar^5) + 21/(16*HarmonicSums`Private`ExpVar^3) - 21/(16*HarmonicSums`Private`ExpVar^2))*z3 + (39*z2*z3)/8), S[-2, -2, -1, 1, HarmonicSums`Private`ExpVar] :> -(ln2^6/20) + (-1)^HarmonicSums`Private`ExpVar* (10697237/(1411200*HarmonicSums`Private`ExpVar^10) + 4337/(2940*HarmonicSums`Private`ExpVar^9) - 679/(900*HarmonicSums`Private`ExpVar^8) - 5521/(14400*HarmonicSums`Private`ExpVar^7) + 127/(576*HarmonicSums`Private`ExpVar^6) + 1/(18*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-51/(2*HarmonicSums`Private`ExpVar^9) + 9/(2*HarmonicSums`Private`ExpVar^7) - 3/(2*HarmonicSums`Private`ExpVar^5) + 3/(2*HarmonicSums`Private`ExpVar^3) - 3/(2*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-65969/(6720*HarmonicSums`Private`ExpVar^10) + 1013/(672*HarmonicSums`Private`ExpVar^9) + 169/(120*HarmonicSums`Private`ExpVar^8) - 53/(240*HarmonicSums`Private`ExpVar^7) - 13/(24*HarmonicSums`Private`ExpVar^6) + 5/(12*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4))*sinf + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-17/(16*HarmonicSums`Private`ExpVar^9) + 3/(16*HarmonicSums`Private`ExpVar^7) - 1/(16*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2)) + z2/4) + (2*li4half - 7/(16*HarmonicSums`Private`ExpVar^10) + 31/(72*HarmonicSums`Private`ExpVar^9) + 1/(8*HarmonicSums`Private`ExpVar^8) - 1/(6*HarmonicSums`Private`ExpVar^7) - 1/(16*HarmonicSums`Private`ExpVar^6) + 5/(24*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar*(663/(80*HarmonicSums`Private`ExpVar^9) - 117/(80*HarmonicSums`Private`ExpVar^7) + 39/(80*HarmonicSums`Private`ExpVar^5) - 39/(80*HarmonicSums`Private`ExpVar^3) + 39/(80*HarmonicSums`Private`ExpVar^2))*z2^2 - (233*z2^3)/280 + ln2^2*(-2*li4half + 7/(16*HarmonicSums`Private`ExpVar^10) - 31/(72*HarmonicSums`Private`ExpVar^9) - 1/(8*HarmonicSums`Private`ExpVar^8) + 1/(6*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^6) - 5/(24*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) - (39*z2^2)/40) - (25*z3^2)/128 + ln2*(-4*li5half + (403*z5)/64), S[-2, -2, 1, -1, HarmonicSums`Private`ExpVar] :> -12*li6half + ln2^6/60 + (-1)^HarmonicSums`Private`ExpVar* (-16207/(13440*HarmonicSums`Private`ExpVar^10) + 547/(448*HarmonicSums`Private`ExpVar^9) + 263/(960*HarmonicSums`Private`ExpVar^8) - 463/(960*HarmonicSums`Private`ExpVar^7) + 41/(192*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^5)) - (9*s6)/2 + ln2*(-7/(8*HarmonicSums`Private`ExpVar^10) + 31/(36*HarmonicSums`Private`ExpVar^9) + 1/(4*HarmonicSums`Private`ExpVar^8) - 1/(3*HarmonicSums`Private`ExpVar^7) - 1/(8*HarmonicSums`Private`ExpVar^6) + 5/(12*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3))*sinf - (ln2^4*z2)/12 + (-1)^HarmonicSums`Private`ExpVar*(51/(80*HarmonicSums`Private`ExpVar^9) - 9/(80*HarmonicSums`Private`ExpVar^7) + 3/(80*HarmonicSums`Private`ExpVar^5) - 3/(80*HarmonicSums`Private`ExpVar^3) + 3/(80*HarmonicSums`Private`ExpVar^2))*z2^2 + (61*z2^3)/35 + ln2^2*(-7/(16*HarmonicSums`Private`ExpVar^10) + 31/(72*HarmonicSums`Private`ExpVar^9) + 1/(8*HarmonicSums`Private`ExpVar^8) - 1/(6*HarmonicSums`Private`ExpVar^7) - 1/(16*HarmonicSums`Private`ExpVar^6) + 5/(24*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (51/(8*HarmonicSums`Private`ExpVar^9) - 9/(8*HarmonicSums`Private`ExpVar^7) + 3/(8*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2))*z2 + (19*z2^2)/40) + (113*z3^2)/64 + ln2*(-4*li5half + 307/(144*HarmonicSums`Private`ExpVar^10) - 589/(648*HarmonicSums`Private`ExpVar^9) - 89/(192*HarmonicSums`Private`ExpVar^8) + 65/(252*HarmonicSums`Private`ExpVar^7) + 5/(32*HarmonicSums`Private`ExpVar^6) - 25/(144*HarmonicSums`Private`ExpVar^5) + 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(18*HarmonicSums`Private`ExpVar^3) - (15*z2*z3)/16 + (31*z5)/16), S[-2, -2, 1, 1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*li4half* (-17/(2*HarmonicSums`Private`ExpVar^9) + 3/(2*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2)) + 1734661/(725760*HarmonicSums`Private`ExpVar^10) + 123433/(653184*HarmonicSums`Private`ExpVar^9) - 72013/(161280*HarmonicSums`Private`ExpVar^8) - 18485/(84672*HarmonicSums`Private`ExpVar^7) + 155/(384*HarmonicSums`Private`ExpVar^6) - 1939/(8640*HarmonicSums`Private`ExpVar^5) + 77/(1152*HarmonicSums`Private`ExpVar^4) - 1/(54*HarmonicSums`Private`ExpVar^3) + (-307/(144*HarmonicSums`Private`ExpVar^10) + 589/(648*HarmonicSums`Private`ExpVar^9) + 89/(192*HarmonicSums`Private`ExpVar^8) - 65/(252*HarmonicSums`Private`ExpVar^7) - 5/(32*HarmonicSums`Private`ExpVar^6) + 25/(144*HarmonicSums`Private`ExpVar^5) - 1/(96*HarmonicSums`Private`ExpVar^4) - 1/(18*HarmonicSums`Private`ExpVar^3))*sinf + (7/(16*HarmonicSums`Private`ExpVar^10) - 31/(72*HarmonicSums`Private`ExpVar^9) - 1/(8*HarmonicSums`Private`ExpVar^8) + 1/(6*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^6) - 5/(24*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3))*sinf^2 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-17/(48*HarmonicSums`Private`ExpVar^9) + 1/(16*HarmonicSums`Private`ExpVar^7) - 1/(48*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(48*HarmonicSums`Private`ExpVar^2)) + z2/16) + ((3*li4half)/2 + 7/(16*HarmonicSums`Private`ExpVar^10) - 31/(72*HarmonicSums`Private`ExpVar^9) - 1/(8*HarmonicSums`Private`ExpVar^8) + 1/(6*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^6) - 5/(24*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar*(17/(16*HarmonicSums`Private`ExpVar^9) - 3/(16*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2^2 - (55*z2^3)/112 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (17/(8*HarmonicSums`Private`ExpVar^9) - 3/(8*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (3*z2^2)/8) + (45*z3^2)/128 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-119/(16*HarmonicSums`Private`ExpVar^9) + 21/(16*HarmonicSums`Private`ExpVar^7) - 7/(16*HarmonicSums`Private`ExpVar^5) + 7/(16*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2))*z3 + (21*z2*z3)/16), S[-2, 2, -1, -1, HarmonicSums`Private`ExpVar] :> -16*li6half + ln2^6/90 + (-1)^HarmonicSums`Private`ExpVar* (734159/(80640*HarmonicSums`Private`ExpVar^10) - 40223/(40320*HarmonicSums`Private`ExpVar^9) - 347/(288*HarmonicSums`Private`ExpVar^8) - 19/(480*HarmonicSums`Private`ExpVar^7) + 125/(192*HarmonicSums`Private`ExpVar^6) - 7/(16*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(17/(48*HarmonicSums`Private`ExpVar^9) - 1/(16*HarmonicSums`Private`ExpVar^7) + 1/(48*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(17/(2*HarmonicSums`Private`ExpVar^9) - 3/(2*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2)) - 4*s6 + (-1)^HarmonicSums`Private`ExpVar* (-9127/(560*HarmonicSums`Private`ExpVar^10) - 589/(168*HarmonicSums`Private`ExpVar^9) + 357/(160*HarmonicSums`Private`ExpVar^8) + 19/(30*HarmonicSums`Private`ExpVar^7) - 25/(48*HarmonicSums`Private`ExpVar^6) - 7/(24*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar*(17/(80*HarmonicSums`Private`ExpVar^9) - 3/(80*HarmonicSums`Private`ExpVar^7) + 1/(80*HarmonicSums`Private`ExpVar^5) - 1/(80*HarmonicSums`Private`ExpVar^3) + 1/(80*HarmonicSums`Private`ExpVar^2))*z2^2 + (20*z2^3)/7 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-9127/(560*HarmonicSums`Private`ExpVar^10) - 589/(168*HarmonicSums`Private`ExpVar^9) + 357/(160*HarmonicSums`Private`ExpVar^8) + 19/(30*HarmonicSums`Private`ExpVar^7) - 25/(48*HarmonicSums`Private`ExpVar^6) - 7/(24*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*(85/(8*HarmonicSums`Private`ExpVar^9) - 15/(8*HarmonicSums`Private`ExpVar^7) + 5/(8*HarmonicSums`Private`ExpVar^5) - 5/(8*HarmonicSums`Private`ExpVar^3) + 5/(8*HarmonicSums`Private`ExpVar^2))*z2 + (19*z2^2)/20) - (7*ln2^3*z3)/12 + (33*z3^2)/32 + ln2*(-4*li5half + 77/(64*HarmonicSums`Private`ExpVar^10) + 1141/(1440*HarmonicSums`Private`ExpVar^9) - 143/(384*HarmonicSums`Private`ExpVar^8) - 31/(112*HarmonicSums`Private`ExpVar^7) + 19/(48*HarmonicSums`Private`ExpVar^6) - 9/(40*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - (11*z2*z3)/8 - (31*z5)/32), S[-2, 2, -1, 1, HarmonicSums`Private`ExpVar] :> -4*li6half - ln2^6/180 + (-1)^HarmonicSums`Private`ExpVar*li4half* (34/HarmonicSums`Private`ExpVar^9 - 6/HarmonicSums`Private`ExpVar^7 + 2/HarmonicSums`Private`ExpVar^5 - 2/HarmonicSums`Private`ExpVar^3 + 2/HarmonicSums`Private`ExpVar^2) + 6899/(23040*HarmonicSums`Private`ExpVar^10) + 4392641/(3628800*HarmonicSums`Private`ExpVar^9) - 7801/(64512*HarmonicSums`Private`ExpVar^8) - 4127/(11760*HarmonicSums`Private`ExpVar^7) + 581/(2880*HarmonicSums`Private`ExpVar^6) - 19/(800*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) - s6 + (-77/(64*HarmonicSums`Private`ExpVar^10) - 1141/(1440*HarmonicSums`Private`ExpVar^9) + 143/(384*HarmonicSums`Private`ExpVar^8) + 31/(112*HarmonicSums`Private`ExpVar^7) - 19/(48*HarmonicSums`Private`ExpVar^6) + 9/(40*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4))*sinf + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (17/(12*HarmonicSums`Private`ExpVar^9) - 1/(4*HarmonicSums`Private`ExpVar^7) + 1/(12*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2)) - z2/6) + (-6*li4half + (-1)^HarmonicSums`Private`ExpVar* (9127/(560*HarmonicSums`Private`ExpVar^10) + 589/(168*HarmonicSums`Private`ExpVar^9) - 357/(160*HarmonicSums`Private`ExpVar^8) - 19/(30*HarmonicSums`Private`ExpVar^7) + 25/(48*HarmonicSums`Private`ExpVar^6) + 7/(24*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)))*z2 + (-1)^HarmonicSums`Private`ExpVar*(-17/HarmonicSums`Private`ExpVar^9 + 3/HarmonicSums`Private`ExpVar^7 - HarmonicSums`Private`ExpVar^(-5) + HarmonicSums`Private`ExpVar^(-3) - HarmonicSums`Private`ExpVar^(-2))* z2^2 + (109*z2^3)/56 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-9127/(560*HarmonicSums`Private`ExpVar^10) - 589/(168*HarmonicSums`Private`ExpVar^9) + 357/(160*HarmonicSums`Private`ExpVar^8) + 19/(30*HarmonicSums`Private`ExpVar^7) - 25/(48*HarmonicSums`Private`ExpVar^6) - 7/(24*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-17/(8*HarmonicSums`Private`ExpVar^9) + 3/(8*HarmonicSums`Private`ExpVar^7) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (79*z2^2)/40) - (7*ln2^3*z3)/12 + (513*z3^2)/128 + ln2*((-1)^HarmonicSums`Private`ExpVar* (357/(16*HarmonicSums`Private`ExpVar^9) - 63/(16*HarmonicSums`Private`ExpVar^7) + 21/(16*HarmonicSums`Private`ExpVar^5) - 21/(16*HarmonicSums`Private`ExpVar^3) + 21/(16*HarmonicSums`Private`ExpVar^2))*z3 - (91*z2*z3)/16), S[-2, 2, 1, -1, HarmonicSums`Private`ExpVar] :> 8*li6half - (13*ln2^6)/180 + (-1)^HarmonicSums`Private`ExpVar*li4half* (51/(2*HarmonicSums`Private`ExpVar^9) - 9/(2*HarmonicSums`Private`ExpVar^7) + 3/(2*HarmonicSums`Private`ExpVar^5) - 3/(2*HarmonicSums`Private`ExpVar^3) + 3/(2*HarmonicSums`Private`ExpVar^2)) - 1103/(640*HarmonicSums`Private`ExpVar^10) + 583/(2880*HarmonicSums`Private`ExpVar^9) + 91/(192*HarmonicSums`Private`ExpVar^8) - 81/(224*HarmonicSums`Private`ExpVar^7) + 13/(96*HarmonicSums`Private`ExpVar^6) - 1/(40*HarmonicSums`Private`ExpVar^5) + (5*s6)/4 + (-1)^HarmonicSums`Private`ExpVar*ln2* (9127/(280*HarmonicSums`Private`ExpVar^10) + 589/(84*HarmonicSums`Private`ExpVar^9) - 357/(80*HarmonicSums`Private`ExpVar^8) - 19/(15*HarmonicSums`Private`ExpVar^7) + 25/(24*HarmonicSums`Private`ExpVar^6) + 7/(12*HarmonicSums`Private`ExpVar^5) - HarmonicSums`Private`ExpVar^ (-4) + 1/(2*HarmonicSums`Private`ExpVar^3))*sinf + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (17/(16*HarmonicSums`Private`ExpVar^9) - 3/(16*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2)) + z2/16) - (13*li4half*z2)/2 + (-1)^HarmonicSums`Private`ExpVar*(-51/(5*HarmonicSums`Private`ExpVar^9) + 9/(5*HarmonicSums`Private`ExpVar^7) - 3/(5*HarmonicSums`Private`ExpVar^5) + 3/(5*HarmonicSums`Private`ExpVar^3) - 3/(5*HarmonicSums`Private`ExpVar^2))*z2^2 + (51*z2^3)/80 + ln2^2*(-2*li4half + (-1)^HarmonicSums`Private`ExpVar* (9127/(560*HarmonicSums`Private`ExpVar^10) + 589/(168*HarmonicSums`Private`ExpVar^9) - 357/(160*HarmonicSums`Private`ExpVar^8) - 19/(30*HarmonicSums`Private`ExpVar^7) + 25/(48*HarmonicSums`Private`ExpVar^6) + 7/(24*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-51/(4*HarmonicSums`Private`ExpVar^9) + 9/(4*HarmonicSums`Private`ExpVar^7) - 3/(4*HarmonicSums`Private`ExpVar^5) + 3/(4*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2))*z2 + (23*z2^2)/20) - (7*ln2^3*z3)/12 + (83*z3^2)/128 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-207019/(235200*HarmonicSums`Private`ExpVar^10) - 445871/(70560*HarmonicSums`Private`ExpVar^9) - 941/(1200*HarmonicSums`Private`ExpVar^8) + 607/(900*HarmonicSums`Private`ExpVar^7) + 17/(36*HarmonicSums`Private`ExpVar^6) - 1/(72*HarmonicSums`Private`ExpVar^5) - 5/(8*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (119/(16*HarmonicSums`Private`ExpVar^9) - 21/(16*HarmonicSums`Private`ExpVar^7) + 7/(16*HarmonicSums`Private`ExpVar^5) - 7/(16*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2))*z3 - (41*z2*z3)/16), S[-2, 2, 1, 1, HarmonicSums`Private`ExpVar] :> -4*li6half - ln2^6/18 + (-1)^HarmonicSums`Private`ExpVar* (-381169/(6174000*HarmonicSums`Private`ExpVar^10) - 32315249/(7408800*HarmonicSums`Private`ExpVar^9) + 3523/(18000*HarmonicSums`Private`ExpVar^8) + 108139/(216000*HarmonicSums`Private`ExpVar^7) + 205/(1728*HarmonicSums`Private`ExpVar^6) - 143/(216*HarmonicSums`Private`ExpVar^5) + 13/(16*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^3)) + (9*s6)/4 + (-1)^HarmonicSums`Private`ExpVar* (207019/(235200*HarmonicSums`Private`ExpVar^10) + 445871/(70560*HarmonicSums`Private`ExpVar^9) + 941/(1200*HarmonicSums`Private`ExpVar^8) - 607/(900*HarmonicSums`Private`ExpVar^7) - 17/(36*HarmonicSums`Private`ExpVar^6) + 1/(72*HarmonicSums`Private`ExpVar^5) + 5/(8*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^3))*sinf + (-1)^HarmonicSums`Private`ExpVar* (-9127/(560*HarmonicSums`Private`ExpVar^10) - 589/(168*HarmonicSums`Private`ExpVar^9) + 357/(160*HarmonicSums`Private`ExpVar^8) + 19/(30*HarmonicSums`Private`ExpVar^7) - 25/(48*HarmonicSums`Private`ExpVar^6) - 7/(24*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3))*sinf^2 + (ln2^4*z2)/3 + (2*li4half + (-1)^HarmonicSums`Private`ExpVar* (-9127/(560*HarmonicSums`Private`ExpVar^10) - 589/(168*HarmonicSums`Private`ExpVar^9) + 357/(160*HarmonicSums`Private`ExpVar^8) + 19/(30*HarmonicSums`Private`ExpVar^7) - 25/(48*HarmonicSums`Private`ExpVar^6) - 7/(24*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)))*z2 + (-1)^HarmonicSums`Private`ExpVar*(51/(5*HarmonicSums`Private`ExpVar^9) - 9/(5*HarmonicSums`Private`ExpVar^7) + 3/(5*HarmonicSums`Private`ExpVar^5) - 3/(5*HarmonicSums`Private`ExpVar^3) + 3/(5*HarmonicSums`Private`ExpVar^2))*z2^2 + (411*z2^3)/560 + ln2^2*(-2*li4half - z2^2/2) - (7*ln2^3*z3)/12 - (7*z3^2)/4 + ln2*(-4*li5half + (7*z2*z3)/4 - (279*z5)/64), S[-2, -1, -2, -1, HarmonicSums`Private`ExpVar] :> -24*li6half + (2*ln2^6)/15 + (-1)^HarmonicSums`Private`ExpVar*li4half* (34/HarmonicSums`Private`ExpVar^9 - 6/HarmonicSums`Private`ExpVar^7 + 2/HarmonicSums`Private`ExpVar^5 - 2/HarmonicSums`Private`ExpVar^3 + 2/HarmonicSums`Private`ExpVar^2) - 2437/(5600*HarmonicSums`Private`ExpVar^10) + 5489/(10080*HarmonicSums`Private`ExpVar^9) + 1679/(11520*HarmonicSums`Private`ExpVar^8) - 197/(480*HarmonicSums`Private`ExpVar^7) + 11/(36*HarmonicSums`Private`ExpVar^6) - 2/(15*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 13*s6 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (17/(12*HarmonicSums`Private`ExpVar^9) - 1/(4*HarmonicSums`Private`ExpVar^7) + 1/(12*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2)) - (7*z2)/12) - 2*li4half*z2 + (-1)^HarmonicSums`Private`ExpVar* (-119/(10*HarmonicSums`Private`ExpVar^9) + 21/(10*HarmonicSums`Private`ExpVar^7) - 7/(10*HarmonicSums`Private`ExpVar^5) + 7/(10*HarmonicSums`Private`ExpVar^3) - 7/(10*HarmonicSums`Private`ExpVar^2))*z2^2 + (239*z2^3)/70 + ln2^2*(4*li4half + (-1)^HarmonicSums`Private`ExpVar* (17/(4*HarmonicSums`Private`ExpVar^9) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (171*z2^2)/40) + (-97/(256*HarmonicSums`Private`ExpVar^10) - 13/(128*HarmonicSums`Private`ExpVar^9) + 5/(48*HarmonicSums`Private`ExpVar^8) + 115/(2688*HarmonicSums`Private`ExpVar^7) - 25/(384*HarmonicSums`Private`ExpVar^6) - 7/(192*HarmonicSums`Private`ExpVar^5) + 5/(32*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 5/(32*HarmonicSums`Private`ExpVar^2))*z3 + (649*z3^2)/128 + ln2*((-1)^HarmonicSums`Private`ExpVar* (21089/(1680*HarmonicSums`Private`ExpVar^10) - 13/(56*HarmonicSums`Private`ExpVar^9) - 889/(480*HarmonicSums`Private`ExpVar^8) + 7/(240*HarmonicSums`Private`ExpVar^7) + 17/(24*HarmonicSums`Private`ExpVar^6) - 11/(24*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) + z2*(291/(320*HarmonicSums`Private`ExpVar^10) + 39/(160*HarmonicSums`Private`ExpVar^9) - 1/(4*HarmonicSums`Private`ExpVar^8) - 23/(224*HarmonicSums`Private`ExpVar^7) + 5/(32*HarmonicSums`Private`ExpVar^6) + 7/(80*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) - (15*z3)/16) + (-1)^HarmonicSums`Private`ExpVar* (85/(16*HarmonicSums`Private`ExpVar^9) - 15/(16*HarmonicSums`Private`ExpVar^7) + 5/(16*HarmonicSums`Private`ExpVar^5) - 5/(16*HarmonicSums`Private`ExpVar^3) + 5/(16*HarmonicSums`Private`ExpVar^2))*z3), S[-2, -1, -2, 1, HarmonicSums`Private`ExpVar] :> 24*li6half + ln2^6/15 + (-1)^HarmonicSums`Private`ExpVar* (12394223/(1411200*HarmonicSums`Private`ExpVar^10) + 328549/(141120*HarmonicSums`Private`ExpVar^9) - 841/(900*HarmonicSums`Private`ExpVar^8) - 1421/(3600*HarmonicSums`Private`ExpVar^7) + 29/(144*HarmonicSums`Private`ExpVar^6) + 5/(72*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(51/(2*HarmonicSums`Private`ExpVar^9) - 9/(2*HarmonicSums`Private`ExpVar^7) + 3/(2*HarmonicSums`Private`ExpVar^5) - 3/(2*HarmonicSums`Private`ExpVar^3) + 3/(2*HarmonicSums`Private`ExpVar^2)) + 13*s6 + (-1)^HarmonicSums`Private`ExpVar* (-21089/(1680*HarmonicSums`Private`ExpVar^10) + 13/(56*HarmonicSums`Private`ExpVar^9) + 889/(480*HarmonicSums`Private`ExpVar^8) - 7/(240*HarmonicSums`Private`ExpVar^7) - 17/(24*HarmonicSums`Private`ExpVar^6) + 11/(24*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4))*sinf + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (17/(16*HarmonicSums`Private`ExpVar^9) - 3/(16*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2)) - z2/3) - 4*li4half*z2 + (-1)^HarmonicSums`Private`ExpVar* (-153/(80*HarmonicSums`Private`ExpVar^9) + 27/(80*HarmonicSums`Private`ExpVar^7) - 9/(80*HarmonicSums`Private`ExpVar^5) + 9/(80*HarmonicSums`Private`ExpVar^3) - 9/(80*HarmonicSums`Private`ExpVar^2))*z2^2 - (46*z2^3)/35 + ln2^2*(4*li4half + (-1)^HarmonicSums`Private`ExpVar* (-51/(8*HarmonicSums`Private`ExpVar^9) + 9/(8*HarmonicSums`Private`ExpVar^7) - 3/(8*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2))*z2 + z2^2) + (-97/(256*HarmonicSums`Private`ExpVar^10) - 13/(128*HarmonicSums`Private`ExpVar^9) + 5/(48*HarmonicSums`Private`ExpVar^8) + 115/(2688*HarmonicSums`Private`ExpVar^7) - 25/(384*HarmonicSums`Private`ExpVar^6) - 7/(192*HarmonicSums`Private`ExpVar^5) + 5/(32*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 5/(32*HarmonicSums`Private`ExpVar^2))*z3 - (599*z3^2)/128 + ln2*(16*li5half + (-1)^HarmonicSums`Private`ExpVar* (85/(16*HarmonicSums`Private`ExpVar^9) - 15/(16*HarmonicSums`Private`ExpVar^7) + 5/(16*HarmonicSums`Private`ExpVar^5) - 5/(16*HarmonicSums`Private`ExpVar^3) + 5/(16*HarmonicSums`Private`ExpVar^2))*z3 - (15*z2*z3)/16 - (1457*z5)/64), S[-2, -1, 2, -1, HarmonicSums`Private`ExpVar] :> 48*li6half - ln2^6/15 + (-1)^HarmonicSums`Private`ExpVar* (-1429/(560*HarmonicSums`Private`ExpVar^10) + 2017/(1344*HarmonicSums`Private`ExpVar^9) + 133/(320*HarmonicSums`Private`ExpVar^8) - 17/(30*HarmonicSums`Private`ExpVar^7) + 11/(48*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^5)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-34/HarmonicSums`Private`ExpVar^9 + 6/HarmonicSums`Private`ExpVar^7 - 2/HarmonicSums`Private`ExpVar^5 + 2/HarmonicSums`Private`ExpVar^3 - 2/HarmonicSums`Private`ExpVar^2) + 30*s6 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-17/(12*HarmonicSums`Private`ExpVar^9) + 1/(4*HarmonicSums`Private`ExpVar^7) - 1/(12*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2)) + z2/3) + (-1)^HarmonicSums`Private`ExpVar*(85/(8*HarmonicSums`Private`ExpVar^9) - 15/(8*HarmonicSums`Private`ExpVar^7) + 5/(8*HarmonicSums`Private`ExpVar^5) - 5/(8*HarmonicSums`Private`ExpVar^3) + 5/(8*HarmonicSums`Private`ExpVar^2))*z2^2 - (162*z2^3)/35 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-17/(4*HarmonicSums`Private`ExpVar^9) + 3/(4*HarmonicSums`Private`ExpVar^7) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 - (151*z2^2)/40) + (97/(640*HarmonicSums`Private`ExpVar^10) + 13/(320*HarmonicSums`Private`ExpVar^9) - 1/(24*HarmonicSums`Private`ExpVar^8) - 23/(1344*HarmonicSums`Private`ExpVar^7) + 5/(192*HarmonicSums`Private`ExpVar^6) + 7/(480*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z3 - 11*z3^2 + ln2*(16*li5half + 5917/(2800*HarmonicSums`Private`ExpVar^10) - 211/(756*HarmonicSums`Private`ExpVar^9) - 871/(1440*HarmonicSums`Private`ExpVar^8) + 9/(80*HarmonicSums`Private`ExpVar^7) + 35/(72*HarmonicSums`Private`ExpVar^6) - 19/(30*HarmonicSums`Private`ExpVar^5) + 7/(16*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + z2*(-291/(320*HarmonicSums`Private`ExpVar^10) - 39/(160*HarmonicSums`Private`ExpVar^9) + 1/(4*HarmonicSums`Private`ExpVar^8) + 23/(224*HarmonicSums`Private`ExpVar^7) - 5/(32*HarmonicSums`Private`ExpVar^6) - 7/(80*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - (57*z3)/16) + (-1)^HarmonicSums`Private`ExpVar* (-17/(8*HarmonicSums`Private`ExpVar^9) + 3/(8*HarmonicSums`Private`ExpVar^7) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z3 - (1271*z5)/64), S[-2, -1, 2, 1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*li4half* (-17/(2*HarmonicSums`Private`ExpVar^9) + 3/(2*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2)) + 31108969/(21168000*HarmonicSums`Private`ExpVar^10) + 1503221/(3810240*HarmonicSums`Private`ExpVar^9) - 11867/(57600*HarmonicSums`Private`ExpVar^8) - 8669/(50400*HarmonicSums`Private`ExpVar^7) - 37/(2880*HarmonicSums`Private`ExpVar^6) + 2447/(7200*HarmonicSums`Private`ExpVar^5) - 79/(192*HarmonicSums`Private`ExpVar^4) + 2/(9*HarmonicSums`Private`ExpVar^3) + (3*s6)/2 + (-5917/(2800*HarmonicSums`Private`ExpVar^10) + 211/(756*HarmonicSums`Private`ExpVar^9) + 871/(1440*HarmonicSums`Private`ExpVar^8) - 9/(80*HarmonicSums`Private`ExpVar^7) - 35/(72*HarmonicSums`Private`ExpVar^6) + 19/(30*HarmonicSums`Private`ExpVar^5) - 7/(16*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3))*sinf + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-17/(48*HarmonicSums`Private`ExpVar^9) + 1/(16*HarmonicSums`Private`ExpVar^7) - 1/(48*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(48*HarmonicSums`Private`ExpVar^2)) + z2/16) + (3*li4half*z2)/2 + (-1)^HarmonicSums`Private`ExpVar*(-17/(80*HarmonicSums`Private`ExpVar^9) + 3/(80*HarmonicSums`Private`ExpVar^7) - 1/(80*HarmonicSums`Private`ExpVar^5) + 1/(80*HarmonicSums`Private`ExpVar^3) - 1/(80*HarmonicSums`Private`ExpVar^2))*z2^2 - (117*z2^3)/112 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (17/(8*HarmonicSums`Private`ExpVar^9) - 3/(8*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (3*z2^2)/8) + (97/(80*HarmonicSums`Private`ExpVar^10) + 13/(40*HarmonicSums`Private`ExpVar^9) - 1/(3*HarmonicSums`Private`ExpVar^8) - 23/(168*HarmonicSums`Private`ExpVar^7) + 5/(24*HarmonicSums`Private`ExpVar^6) + 7/(60*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^4) + 2/(3*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2))*z3 + (127*z3^2)/64 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-17/(8*HarmonicSums`Private`ExpVar^9) + 3/(8*HarmonicSums`Private`ExpVar^7) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z3 + (3*z2*z3)/8), S[-2, -1, -1, -2, HarmonicSums`Private`ExpVar] :> -24027/(22400*HarmonicSums`Private`ExpVar^10) + 42449/(60480*HarmonicSums`Private`ExpVar^9) + 1583/(5760*HarmonicSums`Private`ExpVar^8) - 253/(480*HarmonicSums`Private`ExpVar^7) + 101/(288*HarmonicSums`Private`ExpVar^6) - 17/(120*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + 5*s6 + (-1)^HarmonicSums`Private`ExpVar* (102037/(17920*HarmonicSums`Private`ExpVar^10) + 3385/(1344*HarmonicSums`Private`ExpVar^9) - 499/(640*HarmonicSums`Private`ExpVar^8) - 893/(1920*HarmonicSums`Private`ExpVar^7) + 67/(384*HarmonicSums`Private`ExpVar^6) + 23/(96*HarmonicSums`Private`ExpVar^5) - 9/(32*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar*(-51/(10*HarmonicSums`Private`ExpVar^9) + 9/(10*HarmonicSums`Private`ExpVar^7) - 3/(10*HarmonicSums`Private`ExpVar^5) + 3/(10*HarmonicSums`Private`ExpVar^3) - 3/(10*HarmonicSums`Private`ExpVar^2))*z2^2 + (7*z2^3)/24 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-17/(8*HarmonicSums`Private`ExpVar^9) + 3/(8*HarmonicSums`Private`ExpVar^7) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (3*z2^2)/8) + (1261/(1280*HarmonicSums`Private`ExpVar^10) + 169/(640*HarmonicSums`Private`ExpVar^9) - 13/(48*HarmonicSums`Private`ExpVar^8) - 299/(2688*HarmonicSums`Private`ExpVar^7) + 65/(384*HarmonicSums`Private`ExpVar^6) + 91/(960*HarmonicSums`Private`ExpVar^5) - 13/(32*HarmonicSums`Private`ExpVar^4) + 13/(24*HarmonicSums`Private`ExpVar^3) - 13/(32*HarmonicSums`Private`ExpVar^2))*z3 + (73*z3^2)/128 + ln2*(z2*(-97/(160*HarmonicSums`Private`ExpVar^10) - 13/(80*HarmonicSums`Private`ExpVar^9) + 1/(6*HarmonicSums`Private`ExpVar^8) + 23/(336*HarmonicSums`Private`ExpVar^7) - 5/(48*HarmonicSums`Private`ExpVar^6) - 7/(120*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(3*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - (33*z3)/8) + (-1)^HarmonicSums`Private`ExpVar*(17/(2*HarmonicSums`Private`ExpVar^9) - 3/(2*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2))*z3), S[-2, -1, -1, 2, HarmonicSums`Private`ExpVar] :> -48*li6half + ln2^6/15 + (-1)^HarmonicSums`Private`ExpVar* (42589/(4032*HarmonicSums`Private`ExpVar^10) + 6467/(5040*HarmonicSums`Private`ExpVar^9) - 55/(36*HarmonicSums`Private`ExpVar^8) - 161/(320*HarmonicSums`Private`ExpVar^7) + 179/(192*HarmonicSums`Private`ExpVar^6) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(51/(2*HarmonicSums`Private`ExpVar^9) - 9/(2*HarmonicSums`Private`ExpVar^7) + 3/(2*HarmonicSums`Private`ExpVar^5) - 3/(2*HarmonicSums`Private`ExpVar^3) + 3/(2*HarmonicSums`Private`ExpVar^2)) - 21*s6 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (17/(16*HarmonicSums`Private`ExpVar^9) - 3/(16*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2)) - z2/3) + (-1)^HarmonicSums`Private`ExpVar* (-102037/(8960*HarmonicSums`Private`ExpVar^10) - 3385/(672*HarmonicSums`Private`ExpVar^9) + 499/(320*HarmonicSums`Private`ExpVar^8) + 893/(960*HarmonicSums`Private`ExpVar^7) - 67/(192*HarmonicSums`Private`ExpVar^6) - 23/(48*HarmonicSums`Private`ExpVar^5) + 9/(16*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar*(-51/(16*HarmonicSums`Private`ExpVar^9) + 9/(16*HarmonicSums`Private`ExpVar^7) - 3/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2))*z2^2 + (5687*z2^3)/840 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-17/(8*HarmonicSums`Private`ExpVar^9) + 3/(8*HarmonicSums`Private`ExpVar^7) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (17*z2^2)/5) + (-97/(160*HarmonicSums`Private`ExpVar^10) - 13/(80*HarmonicSums`Private`ExpVar^9) + 1/(6*HarmonicSums`Private`ExpVar^8) + 23/(336*HarmonicSums`Private`ExpVar^7) - 5/(48*HarmonicSums`Private`ExpVar^6) - 7/(120*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(3*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z3 + (55*z3^2)/8 + ln2*(-16*li5half + z2*(97/(320*HarmonicSums`Private`ExpVar^10) + 13/(160*HarmonicSums`Private`ExpVar^9) - 1/(12*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) + 5/(96*HarmonicSums`Private`ExpVar^6) + 7/(240*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) - (3*z3)/16) + (-1)^HarmonicSums`Private`ExpVar*(17/(2*HarmonicSums`Private`ExpVar^9) - 3/(2*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2))*z3 + (31*z5)/4), S[-2, -1, 1, -2, HarmonicSums`Private`ExpVar] :> -24*li6half + ln2^6/30 + (-1)^HarmonicSums`Private`ExpVar* (-29401/(6720*HarmonicSums`Private`ExpVar^10) + 503/(336*HarmonicSums`Private`ExpVar^9) + 329/(480*HarmonicSums`Private`ExpVar^8) - 643/(960*HarmonicSums`Private`ExpVar^7) + 47/(192*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^5)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(17/HarmonicSums`Private`ExpVar^9 - 3/HarmonicSums`Private`ExpVar^7 + HarmonicSums`Private`ExpVar^(-5) - HarmonicSums`Private`ExpVar^(-3) + HarmonicSums`Private`ExpVar^(-2)) - (23*s6)/2 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (17/(24*HarmonicSums`Private`ExpVar^9) - 1/(8*HarmonicSums`Private`ExpVar^7) + 1/(24*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) - (11*z2)/48) + ((-3*li4half)/2 + 8353/(19200*HarmonicSums`Private`ExpVar^10) + 195457/(604800*HarmonicSums`Private`ExpVar^9) - 719/(8064*HarmonicSums`Private`ExpVar^8) - 3877/(35280*HarmonicSums`Private`ExpVar^7) + 61/(1440*HarmonicSums`Private`ExpVar^6) + 137/(1800*HarmonicSums`Private`ExpVar^5) - 17/(192*HarmonicSums`Private`ExpVar^4) + 1/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (-97/(320*HarmonicSums`Private`ExpVar^10) - 13/(160*HarmonicSums`Private`ExpVar^9) + 1/(12*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) - 5/(96*HarmonicSums`Private`ExpVar^6) - 7/(240*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*sinf*z2 + (83*ln2^2*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar*(-17/(10*HarmonicSums`Private`ExpVar^9) + 3/(10*HarmonicSums`Private`ExpVar^7) - 1/(10*HarmonicSums`Private`ExpVar^5) + 1/(10*HarmonicSums`Private`ExpVar^3) - 1/(10*HarmonicSums`Private`ExpVar^2))*z2^2 + (761*z2^3)/210 + (-97/(1280*HarmonicSums`Private`ExpVar^10) - 13/(640*HarmonicSums`Private`ExpVar^9) + 1/(48*HarmonicSums`Private`ExpVar^8) + 23/(2688*HarmonicSums`Private`ExpVar^7) - 5/(384*HarmonicSums`Private`ExpVar^6) - 7/(960*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2))*z3 + (557*z3^2)/128 + ln2*(-8*li5half + (-1)^HarmonicSums`Private`ExpVar* (17/(16*HarmonicSums`Private`ExpVar^9) - 3/(16*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z3 - (3*z2*z3)/16 + (155*z5)/64), S[-2, -1, 1, 2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*li4half* (-17/(2*HarmonicSums`Private`ExpVar^9) + 3/(2*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2)) + 1471067/(784000*HarmonicSums`Private`ExpVar^10) + 1441829/(6350400*HarmonicSums`Private`ExpVar^9) - 43727/(86400*HarmonicSums`Private`ExpVar^8) - 13031/(50400*HarmonicSums`Private`ExpVar^7) + 671/(864*HarmonicSums`Private`ExpVar^6) - 55/(72*HarmonicSums`Private`ExpVar^5) + 15/(32*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + (21*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-17/(48*HarmonicSums`Private`ExpVar^9) + 1/(16*HarmonicSums`Private`ExpVar^7) - 1/(48*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(48*HarmonicSums`Private`ExpVar^2)) + (3*z2)/16) + ((9*li4half)/2 - 8353/(9600*HarmonicSums`Private`ExpVar^10) - 195457/(302400*HarmonicSums`Private`ExpVar^9) + 719/(4032*HarmonicSums`Private`ExpVar^8) + 3877/(17640*HarmonicSums`Private`ExpVar^7) - 61/(720*HarmonicSums`Private`ExpVar^6) - 137/(900*HarmonicSums`Private`ExpVar^5) + 17/(96*HarmonicSums`Private`ExpVar^4) - 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (97/(160*HarmonicSums`Private`ExpVar^10) + 13/(80*HarmonicSums`Private`ExpVar^9) - 1/(6*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) + 5/(48*HarmonicSums`Private`ExpVar^6) + 7/(120*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(3*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*sinf*z2 - (21*ln2^2*z2^2)/16 + (-1)^HarmonicSums`Private`ExpVar*(-17/(40*HarmonicSums`Private`ExpVar^9) + 3/(40*HarmonicSums`Private`ExpVar^7) - 1/(40*HarmonicSums`Private`ExpVar^5) + 1/(40*HarmonicSums`Private`ExpVar^3) - 1/(40*HarmonicSums`Private`ExpVar^2))*z2^2 - (613*z2^3)/840 + (-97/(160*HarmonicSums`Private`ExpVar^10) - 13/(80*HarmonicSums`Private`ExpVar^9) + 1/(6*HarmonicSums`Private`ExpVar^8) + 23/(336*HarmonicSums`Private`ExpVar^7) - 5/(48*HarmonicSums`Private`ExpVar^6) - 7/(120*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(3*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z3 - (247*z3^2)/128 + ln2*((-1)^HarmonicSums`Private`ExpVar* (17/(16*HarmonicSums`Private`ExpVar^9) - 3/(16*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z3 - (3*z2*z3)/16), S[-2, 1, -2, -1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (3227519/(705600*HarmonicSums`Private`ExpVar^10) + 1369/(9408*HarmonicSums`Private`ExpVar^9) - 3973/(7200*HarmonicSums`Private`ExpVar^8) - 56/(225*HarmonicSums`Private`ExpVar^7) + 127/(288*HarmonicSums`Private`ExpVar^6) - 35/(144*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(17/(48*HarmonicSums`Private`ExpVar^9) - 1/(16*HarmonicSums`Private`ExpVar^7) + 1/(48*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(17/(2*HarmonicSums`Private`ExpVar^9) - 3/(2*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* ln2^2*(-17/(8*HarmonicSums`Private`ExpVar^9) + 3/(8*HarmonicSums`Private`ExpVar^7) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar*(-17/(16*HarmonicSums`Private`ExpVar^9) + 3/(16*HarmonicSums`Private`ExpVar^7) - 1/(16*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (-595/(64*HarmonicSums`Private`ExpVar^10) + 135/(16*HarmonicSums`Private`ExpVar^9) + 75/(64*HarmonicSums`Private`ExpVar^8) - 5/(4*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 5/(16*HarmonicSums`Private`ExpVar^5) + 5/(64*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^3))*z3 + (25*z3^2)/128 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2* (51/(4*HarmonicSums`Private`ExpVar^9) - 9/(4*HarmonicSums`Private`ExpVar^7) + 3/(4*HarmonicSums`Private`ExpVar^5) - 3/(4*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-85/(16*HarmonicSums`Private`ExpVar^9) + 15/(16*HarmonicSums`Private`ExpVar^7) - 5/(16*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^3) - 5/(16*HarmonicSums`Private`ExpVar^2))*z3) + ln2*(21/(16*HarmonicSums`Private`ExpVar^10) + 3/(2*HarmonicSums`Private`ExpVar^9) - 15/(32*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) + (-1)^HarmonicSums`Private`ExpVar* (357/(16*HarmonicSums`Private`ExpVar^10) - 81/(4*HarmonicSums`Private`ExpVar^9) - 45/(16*HarmonicSums`Private`ExpVar^8) + 3/HarmonicSums`Private`ExpVar^7 + 9/(16*HarmonicSums`Private`ExpVar^6) - 3/(4*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3))*z2 - (93*z5)/64), S[-2, 1, -2, 1, HarmonicSums`Private`ExpVar] :> 41/(128*HarmonicSums`Private`ExpVar^10) + 1747/(960*HarmonicSums`Private`ExpVar^9) - 59/(256*HarmonicSums`Private`ExpVar^8) - 3/(8*HarmonicSums`Private`ExpVar^7) + 13/(64*HarmonicSums`Private`ExpVar^6) - 3/(160*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + (-1)^HarmonicSums`Private`ExpVar* (-51/(80*HarmonicSums`Private`ExpVar^9) + 9/(80*HarmonicSums`Private`ExpVar^7) - 3/(80*HarmonicSums`Private`ExpVar^5) + 3/(80*HarmonicSums`Private`ExpVar^3) - 3/(80*HarmonicSums`Private`ExpVar^2))*z2^2 + (9*z2^3)/80 + (-1)^HarmonicSums`Private`ExpVar* (-595/(64*HarmonicSums`Private`ExpVar^10) + 135/(16*HarmonicSums`Private`ExpVar^9) + 75/(64*HarmonicSums`Private`ExpVar^8) - 5/(4*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 5/(16*HarmonicSums`Private`ExpVar^5) + 5/(64*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^3))*z3 + (25*z3^2)/128 + sinf*(-21/(16*HarmonicSums`Private`ExpVar^10) - 3/(2*HarmonicSums`Private`ExpVar^9) + 15/(32*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + (-1)^HarmonicSums`Private`ExpVar* (-85/(16*HarmonicSums`Private`ExpVar^9) + 15/(16*HarmonicSums`Private`ExpVar^7) - 5/(16*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^3) - 5/(16*HarmonicSums`Private`ExpVar^2))*z3), S[-2, 1, 2, -1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*li4half* (-51/(2*HarmonicSums`Private`ExpVar^9) + 9/(2*HarmonicSums`Private`ExpVar^7) - 3/(2*HarmonicSums`Private`ExpVar^5) + 3/(2*HarmonicSums`Private`ExpVar^3) - 3/(2*HarmonicSums`Private`ExpVar^2)) - 407/(160*HarmonicSums`Private`ExpVar^10) + 133/(480*HarmonicSums`Private`ExpVar^9) + 455/(768*HarmonicSums`Private`ExpVar^8) - 47/(112*HarmonicSums`Private`ExpVar^7) + 7/(48*HarmonicSums`Private`ExpVar^6) - 1/(40*HarmonicSums`Private`ExpVar^5) + (3*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-17/(16*HarmonicSums`Private`ExpVar^9) + 3/(16*HarmonicSums`Private`ExpVar^7) - 1/(16*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2)) + (3*z2)/16) + (9*li4half*z2)/2 + (-1)^HarmonicSums`Private`ExpVar* (51/(5*HarmonicSums`Private`ExpVar^9) - 9/(5*HarmonicSums`Private`ExpVar^7) + 3/(5*HarmonicSums`Private`ExpVar^5) - 3/(5*HarmonicSums`Private`ExpVar^3) + 3/(5*HarmonicSums`Private`ExpVar^2))*z2^2 - (771*z2^3)/560 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (51/(8*HarmonicSums`Private`ExpVar^9) - 9/(8*HarmonicSums`Private`ExpVar^7) + 3/(8*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2))*z2 - (9*z2^2)/8) + (-1)^HarmonicSums`Private`ExpVar* (119/(32*HarmonicSums`Private`ExpVar^10) - 27/(8*HarmonicSums`Private`ExpVar^9) - 15/(32*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^7) + 3/(32*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3))*z3 - (151*z3^2)/128 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2* (-51/(4*HarmonicSums`Private`ExpVar^9) + 9/(4*HarmonicSums`Private`ExpVar^7) - 3/(4*HarmonicSums`Private`ExpVar^5) + 3/(4*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar*(17/(8*HarmonicSums`Private`ExpVar^9) - 3/(8*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z3) + ln2*((-1)^HarmonicSums`Private`ExpVar* (-1384759/(58800*HarmonicSums`Private`ExpVar^10) - 31457/(3528*HarmonicSums`Private`ExpVar^9) + 7637/(2400*HarmonicSums`Private`ExpVar^8) + 5597/(3600*HarmonicSums`Private`ExpVar^7) - 5/(9*HarmonicSums`Private`ExpVar^6) - 71/(72*HarmonicSums`Private`ExpVar^5) + 9/(8*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-119/(8*HarmonicSums`Private`ExpVar^9) + 21/(8*HarmonicSums`Private`ExpVar^7) - 7/(8*HarmonicSums`Private`ExpVar^5) + 7/(8*HarmonicSums`Private`ExpVar^3) - 7/(8*HarmonicSums`Private`ExpVar^2))*z3 + z2*((-1)^HarmonicSums`Private`ExpVar* (-357/(16*HarmonicSums`Private`ExpVar^10) + 81/(4*HarmonicSums`Private`ExpVar^9) + 45/(16*HarmonicSums`Private`ExpVar^8) - 3/HarmonicSums`Private`ExpVar^7 - 9/(16*HarmonicSums`Private`ExpVar^6) + 3/(4*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3)) + (63*z3)/16)), S[-2, 1, 2, 1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (560103013/(16464000*HarmonicSums`Private`ExpVar^10) + 31735463/(14817600*HarmonicSums`Private`ExpVar^9) - 125513/(24000*HarmonicSums`Private`ExpVar^8) - 25441/(27000*HarmonicSums`Private`ExpVar^7) + 1205/(864*HarmonicSums`Private`ExpVar^6) + 365/(432*HarmonicSums`Private`ExpVar^5) - 7/(4*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^ (-3)) - (15*s6)/4 + (-1)^HarmonicSums`Private`ExpVar* (-51/(5*HarmonicSums`Private`ExpVar^9) + 9/(5*HarmonicSums`Private`ExpVar^7) - 3/(5*HarmonicSums`Private`ExpVar^5) + 3/(5*HarmonicSums`Private`ExpVar^3) - 3/(5*HarmonicSums`Private`ExpVar^2))*z2^2 - (75*z2^3)/112 + (-1)^HarmonicSums`Private`ExpVar*(119/(4*HarmonicSums`Private`ExpVar^10) - 27/HarmonicSums`Private`ExpVar^9 - 15/(4*HarmonicSums`Private`ExpVar^8) + 4/HarmonicSums`Private`ExpVar^7 + 3/(4*HarmonicSums`Private`ExpVar^6) - HarmonicSums`Private`ExpVar^(-5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^3))*z3 + (65*z3^2)/128 + sinf*((-1)^HarmonicSums`Private`ExpVar* (1384759/(58800*HarmonicSums`Private`ExpVar^10) + 31457/(3528*HarmonicSums`Private`ExpVar^9) - 7637/(2400*HarmonicSums`Private`ExpVar^8) - 5597/(3600*HarmonicSums`Private`ExpVar^7) + 5/(9*HarmonicSums`Private`ExpVar^6) + 71/(72*HarmonicSums`Private`ExpVar^5) - 9/(8*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*(17/HarmonicSums`Private`ExpVar^9 - 3/HarmonicSums`Private`ExpVar^7 + HarmonicSums`Private`ExpVar^(-5) - HarmonicSums`Private`ExpVar^(-3) + HarmonicSums`Private`ExpVar^(-2))* z3) + (465*ln2*z5)/64, S[-2, 1, -1, -2, HarmonicSums`Private`ExpVar] :> 24*li6half - ln2^6/30 + (-1)^HarmonicSums`Private`ExpVar* (2955161/(705600*HarmonicSums`Private`ExpVar^10) + 2333/(3528*HarmonicSums`Private`ExpVar^9) - 7199/(14400*HarmonicSums`Private`ExpVar^8) - 5821/(14400*HarmonicSums`Private`ExpVar^7) + 295/(576*HarmonicSums`Private`ExpVar^6) - 37/(144*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-51/(2*HarmonicSums`Private`ExpVar^9) + 9/(2*HarmonicSums`Private`ExpVar^7) - 3/(2*HarmonicSums`Private`ExpVar^5) + 3/(2*HarmonicSums`Private`ExpVar^3) - 3/(2*HarmonicSums`Private`ExpVar^2)) + (21*s6)/2 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-17/(16*HarmonicSums`Private`ExpVar^9) + 3/(16*HarmonicSums`Private`ExpVar^7) - 1/(16*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2)) + (5*z2)/24) + (li4half - 1109/(1280*HarmonicSums`Private`ExpVar^10) + 1003/(5760*HarmonicSums`Private`ExpVar^9) + 5/(24*HarmonicSums`Private`ExpVar^8) - 115/(1344*HarmonicSums`Private`ExpVar^7) - 19/(192*HarmonicSums`Private`ExpVar^6) + 37/(240*HarmonicSums`Private`ExpVar^5) - 7/(64*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar*(187/(40*HarmonicSums`Private`ExpVar^9) - 33/(40*HarmonicSums`Private`ExpVar^7) + 11/(40*HarmonicSums`Private`ExpVar^5) - 11/(40*HarmonicSums`Private`ExpVar^3) + 11/(40*HarmonicSums`Private`ExpVar^2))*z2^2 - (769*z2^3)/210 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (17/(8*HarmonicSums`Private`ExpVar^9) - 3/(8*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (39*z2^2)/20) + (-1)^HarmonicSums`Private`ExpVar* (1547/(64*HarmonicSums`Private`ExpVar^10) - 351/(16*HarmonicSums`Private`ExpVar^9) - 195/(64*HarmonicSums`Private`ExpVar^8) + 13/(4*HarmonicSums`Private`ExpVar^7) + 39/(64*HarmonicSums`Private`ExpVar^6) - 13/(16*HarmonicSums`Private`ExpVar^5) - 13/(64*HarmonicSums`Private`ExpVar^4) + 13/(32*HarmonicSums`Private`ExpVar^3))*z3 - (569*z3^2)/128 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2* (-17/(2*HarmonicSums`Private`ExpVar^9) + 3/(2*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (221/(16*HarmonicSums`Private`ExpVar^9) - 39/(16*HarmonicSums`Private`ExpVar^7) + 13/(16*HarmonicSums`Private`ExpVar^5) - 13/(16*HarmonicSums`Private`ExpVar^3) + 13/(16*HarmonicSums`Private`ExpVar^2))*z3) + ln2*(8*li5half + (-1)^HarmonicSums`Private`ExpVar* (-119/(8*HarmonicSums`Private`ExpVar^10) + 27/(2*HarmonicSums`Private`ExpVar^9) + 15/(8*HarmonicSums`Private`ExpVar^8) - 2/HarmonicSums`Private`ExpVar^7 - 3/(8*HarmonicSums`Private`ExpVar^6) + 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3))*z2 - (155*z5)/64), S[-2, 1, -1, 2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*li4half* (-17/HarmonicSums`Private`ExpVar^9 + 3/HarmonicSums`Private`ExpVar^7 - HarmonicSums`Private`ExpVar^(-5) + HarmonicSums`Private`ExpVar^(-3) - HarmonicSums`Private`ExpVar^(-2)) - 64087/(67200*HarmonicSums`Private`ExpVar^10) + 15917/(8640*HarmonicSums`Private`ExpVar^9) + 299/(5760*HarmonicSums`Private`ExpVar^8) - 5/(6*HarmonicSums`Private`ExpVar^7) + 185/(288*HarmonicSums`Private`ExpVar^6) - 11/(40*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - (13*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-17/(24*HarmonicSums`Private`ExpVar^9) + 1/(8*HarmonicSums`Private`ExpVar^7) - 1/(24*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) + z2/24) + (li4half + 1109/(640*HarmonicSums`Private`ExpVar^10) - 1003/(2880*HarmonicSums`Private`ExpVar^9) - 5/(12*HarmonicSums`Private`ExpVar^8) + 115/(672*HarmonicSums`Private`ExpVar^7) + 19/(96*HarmonicSums`Private`ExpVar^6) - 37/(120*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar*(119/(16*HarmonicSums`Private`ExpVar^9) - 21/(16*HarmonicSums`Private`ExpVar^7) + 7/(16*HarmonicSums`Private`ExpVar^5) - 7/(16*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2))*z2^2 - (241*z2^3)/336 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (51/(8*HarmonicSums`Private`ExpVar^9) - 9/(8*HarmonicSums`Private`ExpVar^7) + 3/(8*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2))*z2 - z2^2/16) + (-1)^HarmonicSums`Private`ExpVar* (-119/(8*HarmonicSums`Private`ExpVar^10) + 27/(2*HarmonicSums`Private`ExpVar^9) + 15/(8*HarmonicSums`Private`ExpVar^8) - 2/HarmonicSums`Private`ExpVar^7 - 3/(8*HarmonicSums`Private`ExpVar^6) + 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3))*z3 + (91*z3^2)/128 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2* (17/(4*HarmonicSums`Private`ExpVar^9) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-17/(2*HarmonicSums`Private`ExpVar^9) + 3/(2*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2))*z3) + ln2*((-1)^HarmonicSums`Private`ExpVar* (-357/(16*HarmonicSums`Private`ExpVar^9) + 63/(16*HarmonicSums`Private`ExpVar^7) - 21/(16*HarmonicSums`Private`ExpVar^5) + 21/(16*HarmonicSums`Private`ExpVar^3) - 21/(16*HarmonicSums`Private`ExpVar^2))*z3 + z2*((-1)^HarmonicSums`Private`ExpVar* (119/(16*HarmonicSums`Private`ExpVar^10) - 27/(4*HarmonicSums`Private`ExpVar^9) - 15/(16*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-7) + 3/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (63*z3)/16)), S[-2, 1, 1, -2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar*li4half* (17/(2*HarmonicSums`Private`ExpVar^9) - 3/(2*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2)) - 447/(128*HarmonicSums`Private`ExpVar^10) + 323/(2880*HarmonicSums`Private`ExpVar^9) + 103/(128*HarmonicSums`Private`ExpVar^8) - 55/(112*HarmonicSums`Private`ExpVar^7) + 5/(32*HarmonicSums`Private`ExpVar^6) - 1/(40*HarmonicSums`Private`ExpVar^5) + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (17/(48*HarmonicSums`Private`ExpVar^9) - 1/(16*HarmonicSums`Private`ExpVar^7) + 1/(48*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2)) - (5*z2)/48) + ((-5*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (37889/(2240*HarmonicSums`Private`ExpVar^10) - 1783/(672*HarmonicSums`Private`ExpVar^9) - 1269/(640*HarmonicSums`Private`ExpVar^8) + 103/(480*HarmonicSums`Private`ExpVar^7) + 71/(192*HarmonicSums`Private`ExpVar^6) + 5/(96*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)))*z2 + (-1)^HarmonicSums`Private`ExpVar*(-17/(8*HarmonicSums`Private`ExpVar^9) + 3/(8*HarmonicSums`Private`ExpVar^7) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*sinf^2*z2 + (-1)^HarmonicSums`Private`ExpVar* (-221/(40*HarmonicSums`Private`ExpVar^9) + 39/(40*HarmonicSums`Private`ExpVar^7) - 13/(40*HarmonicSums`Private`ExpVar^5) + 13/(40*HarmonicSums`Private`ExpVar^3) - 13/(40*HarmonicSums`Private`ExpVar^2))*z2^2 + (17*z2^3)/21 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-17/(8*HarmonicSums`Private`ExpVar^9) + 3/(8*HarmonicSums`Private`ExpVar^7) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (5*z2^2)/8) + (-1)^HarmonicSums`Private`ExpVar* (-119/(64*HarmonicSums`Private`ExpVar^10) + 27/(16*HarmonicSums`Private`ExpVar^9) + 15/(64*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^7) - 3/(64*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3))*z3 + (131*z3^2)/128 + sinf*((-1)^HarmonicSums`Private`ExpVar* (-119/(16*HarmonicSums`Private`ExpVar^10) + 27/(4*HarmonicSums`Private`ExpVar^9) + 15/(16*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-7) - 3/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-17/(16*HarmonicSums`Private`ExpVar^9) + 3/(16*HarmonicSums`Private`ExpVar^7) - 1/(16*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z3) + ln2*((-1)^HarmonicSums`Private`ExpVar* (119/(16*HarmonicSums`Private`ExpVar^9) - 21/(16*HarmonicSums`Private`ExpVar^7) + 7/(16*HarmonicSums`Private`ExpVar^5) - 7/(16*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2))*z3 - (35*z2*z3)/16), S[-2, 1, 1, 2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-465584881/(24696000*HarmonicSums`Private`ExpVar^10) - 1653179/(185220*HarmonicSums`Private`ExpVar^9) + 187747/(72000*HarmonicSums`Private`ExpVar^8) + 293389/(216000*HarmonicSums`Private`ExpVar^7) - 239/(1728*HarmonicSums`Private`ExpVar^6) - 529/(432*HarmonicSums`Private`ExpVar^5) + 19/(16*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^3)) + (5*s6)/2 + (ln2^4*z2)/48 + (li4half/2 + (-1)^HarmonicSums`Private`ExpVar* (-37889/(1120*HarmonicSums`Private`ExpVar^10) + 1783/(336*HarmonicSums`Private`ExpVar^9) + 1269/(320*HarmonicSums`Private`ExpVar^8) - 103/(240*HarmonicSums`Private`ExpVar^7) - 71/(96*HarmonicSums`Private`ExpVar^6) - 5/(48*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)))*z2 + (-1)^HarmonicSums`Private`ExpVar*(17/(4*HarmonicSums`Private`ExpVar^9) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*sinf^2*z2 - (ln2^2*z2^2)/8 + (-1)^HarmonicSums`Private`ExpVar*(153/(20*HarmonicSums`Private`ExpVar^9) - 27/(20*HarmonicSums`Private`ExpVar^7) + 9/(20*HarmonicSums`Private`ExpVar^5) - 9/(20*HarmonicSums`Private`ExpVar^3) + 9/(20*HarmonicSums`Private`ExpVar^2))*z2^2 + (13*z2^3)/60 + (-1)^HarmonicSums`Private`ExpVar* (-119/(8*HarmonicSums`Private`ExpVar^10) + 27/(2*HarmonicSums`Private`ExpVar^9) + 15/(8*HarmonicSums`Private`ExpVar^8) - 2/HarmonicSums`Private`ExpVar^7 - 3/(8*HarmonicSums`Private`ExpVar^6) + 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3))*z3 - (17*z3^2)/16 + sinf*((-1)^HarmonicSums`Private`ExpVar* (119/(8*HarmonicSums`Private`ExpVar^10) - 27/(2*HarmonicSums`Private`ExpVar^9) - 15/(8*HarmonicSums`Private`ExpVar^8) + 2/HarmonicSums`Private`ExpVar^7 + 3/(8*HarmonicSums`Private`ExpVar^6) - 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-17/(2*HarmonicSums`Private`ExpVar^9) + 3/(2*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2))*z3) + ln2*((7*z2*z3)/16 - (155*z5)/32), S[2, -2, -1, -1, HarmonicSums`Private`ExpVar] :> 16*li6half - ln2^6/90 + (-1)^HarmonicSums`Private`ExpVar* (1959/(1280*HarmonicSums`Private`ExpVar^10) + 9793/(1920*HarmonicSums`Private`ExpVar^9) - 55/(128*HarmonicSums`Private`ExpVar^8) - 13/(12*HarmonicSums`Private`ExpVar^7) + 19/(32*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5)) + li4half*(-2/(15*HarmonicSums`Private`ExpVar^9) + 2/(21*HarmonicSums`Private`ExpVar^7) - 2/(15*HarmonicSums`Private`ExpVar^5) + 2/(3*HarmonicSums`Private`ExpVar^3) - 2/HarmonicSums`Private`ExpVar^2 + 4/HarmonicSums`Private`ExpVar) + 8*s6 + ln2^4*(-(180*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(252*HarmonicSums`Private`ExpVar^7) - 1/(180*HarmonicSums`Private`ExpVar^5) + 1/(36*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar) - z2/4) + (-6*li4half + (-1)^HarmonicSums`Private`ExpVar* (195/(16*HarmonicSums`Private`ExpVar^10) - 31/(8*HarmonicSums`Private`ExpVar^9) - 49/(32*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^7) + 5/(16*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)))*z2 + (7/(150*HarmonicSums`Private`ExpVar^9) - 1/(30*HarmonicSums`Private`ExpVar^7) + 7/(150*HarmonicSums`Private`ExpVar^5) - 7/(30*HarmonicSums`Private`ExpVar^3) + 7/(10*HarmonicSums`Private`ExpVar^2) - 7/(5*HarmonicSums`Private`ExpVar))*z2^2 - z2^3/14 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (195/(16*HarmonicSums`Private`ExpVar^10) - 31/(8*HarmonicSums`Private`ExpVar^9) - 49/(32*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^7) + 5/(16*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) + (-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 - (53*z2^2)/40) + (7*ln2^3*z3)/12 - (69*z3^2)/32 + ln2*(4*li5half + 5849/(33600*HarmonicSums`Private`ExpVar^10) + 4423/(30240*HarmonicSums`Private`ExpVar^9) - 4993/(40320*HarmonicSums`Private`ExpVar^8) - 41/(420*HarmonicSums`Private`ExpVar^7) + 197/(720*HarmonicSums`Private`ExpVar^6) - 3/(10*HarmonicSums`Private`ExpVar^5) + 5/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + (-7/(80*HarmonicSums`Private`ExpVar^9) + 1/(16*HarmonicSums`Private`ExpVar^7) - 7/(80*HarmonicSums`Private`ExpVar^5) + 7/(16*HarmonicSums`Private`ExpVar^3) - 21/(16*HarmonicSums`Private`ExpVar^2) + 21/(8*HarmonicSums`Private`ExpVar))*z3 - (25*z2*z3)/8 - (403*z5)/64), S[2, -2, -1, 1, HarmonicSums`Private`ExpVar] :> 4*li6half + ln2^6/180 + li4half*(-(10*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(14*HarmonicSums`Private`ExpVar^7) - 1/(10*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^3) - 3/(2*HarmonicSums`Private`ExpVar^2) + 3/HarmonicSums`Private`ExpVar) - 191701/(9408000*HarmonicSums`Private`ExpVar^10) + 22767083/(76204800*HarmonicSums`Private`ExpVar^9) - 35373/(1254400*HarmonicSums`Private`ExpVar^8) - 131609/(705600*HarmonicSums`Private`ExpVar^7) + 719/(4800*HarmonicSums`Private`ExpVar^6) - 1/(2400*HarmonicSums`Private`ExpVar^5) - 13/(144*HarmonicSums`Private`ExpVar^4) + 5/(72*HarmonicSums`Private`ExpVar^3) + (7*s6)/4 + (-5849/(33600*HarmonicSums`Private`ExpVar^10) - 4423/(30240*HarmonicSums`Private`ExpVar^9) + 4993/(40320*HarmonicSums`Private`ExpVar^8) + 41/(420*HarmonicSums`Private`ExpVar^7) - 197/(720*HarmonicSums`Private`ExpVar^6) + 3/(10*HarmonicSums`Private`ExpVar^5) - 5/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3))*sinf + ln2^4*(-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar) - z2/12) + (-1)^HarmonicSums`Private`ExpVar* (-195/(16*HarmonicSums`Private`ExpVar^10) + 31/(8*HarmonicSums`Private`ExpVar^9) + 49/(32*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^7) - 5/(16*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4))*z2 + (13/(400*HarmonicSums`Private`ExpVar^9) - 13/(560*HarmonicSums`Private`ExpVar^7) + 13/(400*HarmonicSums`Private`ExpVar^5) - 13/(80*HarmonicSums`Private`ExpVar^3) + 39/(80*HarmonicSums`Private`ExpVar^2) - 39/(40*HarmonicSums`Private`ExpVar))*z2^2 + (101*z2^3)/280 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (195/(16*HarmonicSums`Private`ExpVar^10) - 31/(8*HarmonicSums`Private`ExpVar^9) - 49/(32*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^7) + 5/(16*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) - (113*z2^2)/80) + (7*ln2^3*z3)/12 + (7*ln2*z2*z3)/4 - (99*z3^2)/32, S[2, -2, 1, -1, HarmonicSums`Private`ExpVar] :> -8*li6half + (13*ln2^6)/180 - 47983/(100800*HarmonicSums`Private`ExpVar^10) + 6169/(60480*HarmonicSums`Private`ExpVar^9) + 18799/(80640*HarmonicSums`Private`ExpVar^8) - 1961/(6720*HarmonicSums`Private`ExpVar^7) + 563/(2880*HarmonicSums`Private`ExpVar^6) - 41/(480*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4) - (5*s6)/4 + (-1)^HarmonicSums`Private`ExpVar*ln2* (-195/(8*HarmonicSums`Private`ExpVar^10) + 31/(4*HarmonicSums`Private`ExpVar^9) + 49/(16*HarmonicSums`Private`ExpVar^8) - 3/(2*HarmonicSums`Private`ExpVar^7) - 5/(8*HarmonicSums`Private`ExpVar^6) + 3/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4))*sinf + 2*li4half*z2 - (ln2^4*z2)/4 + (1/(400*HarmonicSums`Private`ExpVar^9) - 1/(560*HarmonicSums`Private`ExpVar^7) + 1/(400*HarmonicSums`Private`ExpVar^5) - 1/(80*HarmonicSums`Private`ExpVar^3) + 3/(80*HarmonicSums`Private`ExpVar^2) - 3/(40*HarmonicSums`Private`ExpVar))*z2^2 + (67*z2^3)/70 + ln2^2*(2*li4half + (-1)^HarmonicSums`Private`ExpVar* (-195/(16*HarmonicSums`Private`ExpVar^10) + 31/(8*HarmonicSums`Private`ExpVar^9) + 49/(32*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^7) - 5/(16*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) + (1/(40*HarmonicSums`Private`ExpVar^9) - 1/(56*HarmonicSums`Private`ExpVar^7) + 1/(40*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 3/(4*HarmonicSums`Private`ExpVar))*z2 + (73*z2^2)/80) + (7*ln2^3*z3)/12 + (7*z3^2)/128 + ln2*((-1)^HarmonicSums`Private`ExpVar* (2353/(64*HarmonicSums`Private`ExpVar^10) - 149/(32*HarmonicSums`Private`ExpVar^9) - 123/(32*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^7) + 9/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5)) - (13*z2*z3)/16), S[2, -2, 1, 1, HarmonicSums`Private`ExpVar] :> 4*li6half + ln2^6/18 + (-1)^HarmonicSums`Private`ExpVar* (7681/(320*HarmonicSums`Private`ExpVar^10) + 3629/(960*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) - 17/(24*HarmonicSums`Private`ExpVar^7) + 5/(8*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5)) + li4half*(-(30*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(42*HarmonicSums`Private`ExpVar^7) - 1/(30*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) + s6 + (-1)^HarmonicSums`Private`ExpVar* (-2353/(64*HarmonicSums`Private`ExpVar^10) + 149/(32*HarmonicSums`Private`ExpVar^9) + 123/(32*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^7) - 9/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5))*sinf + (-1)^HarmonicSums`Private`ExpVar* (195/(16*HarmonicSums`Private`ExpVar^10) - 31/(8*HarmonicSums`Private`ExpVar^9) - 49/(32*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^7) + 5/(16*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4))*sinf^2 + ln2^4*(-(720*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(1008*HarmonicSums`Private`ExpVar^7) - 1/(720*HarmonicSums`Private`ExpVar^5) + 1/(144*HarmonicSums`Private`ExpVar^3) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar) - (19*z2)/48) + ((-7*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (195/(16*HarmonicSums`Private`ExpVar^10) - 31/(8*HarmonicSums`Private`ExpVar^9) - 49/(32*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^7) + 5/(16*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)))*z2 + (1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2^2 - (69*z2^3)/560 + ln2^2*(2*li4half + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (7*z2^2)/8) + (7*ln2^3*z3)/12 + (137*z3^2)/128 + ln2*(4*li5half + (-7/(240*HarmonicSums`Private`ExpVar^9) + 1/(48*HarmonicSums`Private`ExpVar^7) - 7/(240*HarmonicSums`Private`ExpVar^5) + 7/(48*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2) + 7/(8*HarmonicSums`Private`ExpVar))*z3 - (49*z2*z3)/16 - (31*z5)/16), S[2, 2, -1, -1, HarmonicSums`Private`ExpVar] :> -12*li6half + ln2^6/15 + li4half*(1/(30*HarmonicSums`Private`ExpVar^9) - 1/(42*HarmonicSums`Private`ExpVar^7) + 1/(30*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) - 1637/(25200*HarmonicSums`Private`ExpVar^10) + 49141/(362880*HarmonicSums`Private`ExpVar^9) + 6511/(161280*HarmonicSums`Private`ExpVar^8) - 1069/(4032*HarmonicSums`Private`ExpVar^7) + 17/(45*HarmonicSums`Private`ExpVar^6) - 11/(32*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) - (19*s6)/4 + ln2^4*(1/(720*HarmonicSums`Private`ExpVar^9) - 1/(1008*HarmonicSums`Private`ExpVar^7) + 1/(720*HarmonicSums`Private`ExpVar^5) - 1/(144*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar) - z2/6) + (2*li4half - 121/(8400*HarmonicSums`Private`ExpVar^10) - 31/(504*HarmonicSums`Private`ExpVar^9) + 23/(2520*HarmonicSums`Private`ExpVar^8) + 1/(20*HarmonicSums`Private`ExpVar^7) - 7/(720*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5) + 13/(48*HarmonicSums`Private`ExpVar^4) - 1/(3*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (1/(1200*HarmonicSums`Private`ExpVar^9) - 1/(1680*HarmonicSums`Private`ExpVar^7) + 1/(1200*HarmonicSums`Private`ExpVar^5) - 1/(240*HarmonicSums`Private`ExpVar^3) + 1/(80*HarmonicSums`Private`ExpVar^2) - 1/(40*HarmonicSums`Private`ExpVar))*z2^2 + (661*z2^3)/560 + ln2^2*(2*li4half - 121/(8400*HarmonicSums`Private`ExpVar^10) - 31/(504*HarmonicSums`Private`ExpVar^9) + 23/(2520*HarmonicSums`Private`ExpVar^8) + 1/(20*HarmonicSums`Private`ExpVar^7) - 7/(720*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5) + 13/(48*HarmonicSums`Private`ExpVar^4) - 1/(3*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) + (1/(24*HarmonicSums`Private`ExpVar^9) - 5/(168*HarmonicSums`Private`ExpVar^7) + 1/(24*HarmonicSums`Private`ExpVar^5) - 5/(24*HarmonicSums`Private`ExpVar^3) + 5/(8*HarmonicSums`Private`ExpVar^2) - 5/(4*HarmonicSums`Private`ExpVar))*z2 + (93*z2^2)/40) + (119*z3^2)/64 + ln2*((-1)^HarmonicSums`Private`ExpVar* (307/(64*HarmonicSums`Private`ExpVar^10) + 169/(32*HarmonicSums`Private`ExpVar^9) - HarmonicSums`Private`ExpVar^ (-8) - 7/(8*HarmonicSums`Private`ExpVar^7) + 9/(16*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5)) - (3*z2*z3)/8), S[2, 2, -1, 1, HarmonicSums`Private`ExpVar] :> ln2^6/20 + (-1)^HarmonicSums`Private`ExpVar* (-505/(128*HarmonicSums`Private`ExpVar^10) + 341/(64*HarmonicSums`Private`ExpVar^9) + 5/(32*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^7) + 3/(16*HarmonicSums`Private`ExpVar^6)) + li4half*(2/(15*HarmonicSums`Private`ExpVar^9) - 2/(21*HarmonicSums`Private`ExpVar^7) + 2/(15*HarmonicSums`Private`ExpVar^5) - 2/(3*HarmonicSums`Private`ExpVar^3) + 2/HarmonicSums`Private`ExpVar^2 - 4/HarmonicSums`Private`ExpVar) + ln2^4*(1/(180*HarmonicSums`Private`ExpVar^9) - 1/(252*HarmonicSums`Private`ExpVar^7) + 1/(180*HarmonicSums`Private`ExpVar^5) - 1/(36*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar)) - 4*s6 + (-1)^HarmonicSums`Private`ExpVar* (-307/(64*HarmonicSums`Private`ExpVar^10) - 169/(32*HarmonicSums`Private`ExpVar^9) + HarmonicSums`Private`ExpVar^ (-8) + 7/(8*HarmonicSums`Private`ExpVar^7) - 9/(16*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5))*sinf + (4*li4half + 121/(8400*HarmonicSums`Private`ExpVar^10) + 31/(504*HarmonicSums`Private`ExpVar^9) - 23/(2520*HarmonicSums`Private`ExpVar^8) - 1/(20*HarmonicSums`Private`ExpVar^7) + 7/(720*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5) - 13/(48*HarmonicSums`Private`ExpVar^4) + 1/(3*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (-(15*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(21*HarmonicSums`Private`ExpVar^7) - 1/(15*HarmonicSums`Private`ExpVar^5) + 1/(3*HarmonicSums`Private`ExpVar^3) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar)*z2^2 - (1453*z2^3)/560 + ln2^2*(2*li4half - 121/(8400*HarmonicSums`Private`ExpVar^10) - 31/(504*HarmonicSums`Private`ExpVar^9) + 23/(2520*HarmonicSums`Private`ExpVar^8) + 1/(20*HarmonicSums`Private`ExpVar^7) - 7/(720*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5) + 13/(48*HarmonicSums`Private`ExpVar^4) - 1/(3*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) + (-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (33*z2^2)/80) + (5*z3^2)/4 + ln2*(4*li5half + (7/(80*HarmonicSums`Private`ExpVar^9) - 1/(16*HarmonicSums`Private`ExpVar^7) + 7/(80*HarmonicSums`Private`ExpVar^5) - 7/(16*HarmonicSums`Private`ExpVar^3) + 21/(16*HarmonicSums`Private`ExpVar^2) - 21/(8*HarmonicSums`Private`ExpVar))*z3 + (63*z2*z3)/16 + (31*z5)/32), S[2, 2, 1, -1, HarmonicSums`Private`ExpVar] :> 12*li6half - ln2^6/60 + (-1)^HarmonicSums`Private`ExpVar* (-887/(128*HarmonicSums`Private`ExpVar^10) + 67/(64*HarmonicSums`Private`ExpVar^8) - 13/(32*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^6)) + li4half*(1/(10*HarmonicSums`Private`ExpVar^9) - 1/(14*HarmonicSums`Private`ExpVar^7) + 1/(10*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^3) + 3/(2*HarmonicSums`Private`ExpVar^2) - 3/HarmonicSums`Private`ExpVar) + (3*s6)/4 + ln2*(121/(4200*HarmonicSums`Private`ExpVar^10) + 31/(252*HarmonicSums`Private`ExpVar^9) - 23/(1260*HarmonicSums`Private`ExpVar^8) - 1/(10*HarmonicSums`Private`ExpVar^7) + 7/(360*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 13/(24*HarmonicSums`Private`ExpVar^4) + 2/(3*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2))*sinf + ln2^4*(1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar) + (13*z2)/48) + (9*li4half*z2)/2 + (-(25*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(35*HarmonicSums`Private`ExpVar^7) - 1/(25*HarmonicSums`Private`ExpVar^5) + 1/(5*HarmonicSums`Private`ExpVar^3) - 3/(5*HarmonicSums`Private`ExpVar^2) + 6/(5*HarmonicSums`Private`ExpVar))* z2^2 - (149*z2^3)/35 + ln2^2*(121/(8400*HarmonicSums`Private`ExpVar^10) + 31/(504*HarmonicSums`Private`ExpVar^9) - 23/(2520*HarmonicSums`Private`ExpVar^8) - 1/(20*HarmonicSums`Private`ExpVar^7) + 7/(720*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5) - 13/(48*HarmonicSums`Private`ExpVar^4) + 1/(3*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + (-(20*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(28*HarmonicSums`Private`ExpVar^7) - 1/(20*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar))*z2 - (203*z2^2)/80) - (41*z3^2)/64 + ln2*(4*li5half + 158393/(882000*HarmonicSums`Private`ExpVar^10) - 9131/(158760*HarmonicSums`Private`ExpVar^9) - 69131/(705600*HarmonicSums`Private`ExpVar^8) + 169/(6300*HarmonicSums`Private`ExpVar^7) + 713/(7200*HarmonicSums`Private`ExpVar^6) - 1/(80*HarmonicSums`Private`ExpVar^5) - 97/(288*HarmonicSums`Private`ExpVar^4) + 13/(18*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2) + (7/(240*HarmonicSums`Private`ExpVar^9) - 1/(48*HarmonicSums`Private`ExpVar^7) + 7/(240*HarmonicSums`Private`ExpVar^5) - 7/(48*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2) - 7/(8*HarmonicSums`Private`ExpVar))*z3 + (69*z2*z3)/16 + (279*z5)/64), S[2, 2, 1, 1, HarmonicSums`Private`ExpVar] :> 18552481/(164640000*HarmonicSums`Private`ExpVar^10) + 64619083/(800150400*HarmonicSums`Private`ExpVar^9) - 86734301/(1778112000*HarmonicSums`Private`ExpVar^8) - 225839/(1764000*HarmonicSums`Private`ExpVar^7) + 375107/(1296000*HarmonicSums`Private`ExpVar^6) - 2113/(4800*HarmonicSums`Private`ExpVar^5) + 2287/(3456*HarmonicSums`Private`ExpVar^4) - 49/(54*HarmonicSums`Private`ExpVar^3) + 7/(8*HarmonicSums`Private`ExpVar^2) + (-158393/(882000*HarmonicSums`Private`ExpVar^10) + 9131/(158760*HarmonicSums`Private`ExpVar^9) + 69131/(705600*HarmonicSums`Private`ExpVar^8) - 169/(6300*HarmonicSums`Private`ExpVar^7) - 713/(7200*HarmonicSums`Private`ExpVar^6) + 1/(80*HarmonicSums`Private`ExpVar^5) + 97/(288*HarmonicSums`Private`ExpVar^4) - 13/(18*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2))*sinf + (-121/(8400*HarmonicSums`Private`ExpVar^10) - 31/(504*HarmonicSums`Private`ExpVar^9) + 23/(2520*HarmonicSums`Private`ExpVar^8) + 1/(20*HarmonicSums`Private`ExpVar^7) - 7/(720*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5) + 13/(48*HarmonicSums`Private`ExpVar^4) - 1/(3*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*sinf^2 + (-121/(8400*HarmonicSums`Private`ExpVar^10) - 31/(504*HarmonicSums`Private`ExpVar^9) + 23/(2520*HarmonicSums`Private`ExpVar^8) + 1/(20*HarmonicSums`Private`ExpVar^7) - 7/(720*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5) + 13/(48*HarmonicSums`Private`ExpVar^4) - 1/(3*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (1/(25*HarmonicSums`Private`ExpVar^9) - 1/(35*HarmonicSums`Private`ExpVar^7) + 1/(25*HarmonicSums`Private`ExpVar^5) - 1/(5*HarmonicSums`Private`ExpVar^3) + 3/(5*HarmonicSums`Private`ExpVar^2) - 6/(5*HarmonicSums`Private`ExpVar))* z2^2 + (8*z2^3)/7 - 2*z3^2, S[2, -1, -2, -1, HarmonicSums`Private`ExpVar] :> -48*li6half + ln2^6/15 + (-1)^HarmonicSums`Private`ExpVar* (-5979/(2240*HarmonicSums`Private`ExpVar^10) + 2707/(960*HarmonicSums`Private`ExpVar^9) + 259/(960*HarmonicSums`Private`ExpVar^8) - 73/(96*HarmonicSums`Private`ExpVar^7) + 1/(3*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5)) + li4half*(2/(15*HarmonicSums`Private`ExpVar^9) - 2/(21*HarmonicSums`Private`ExpVar^7) + 2/(15*HarmonicSums`Private`ExpVar^5) - 2/(3*HarmonicSums`Private`ExpVar^3) + 2/HarmonicSums`Private`ExpVar^2 - 4/HarmonicSums`Private`ExpVar) - 30*s6 + ln2^4*(1/(180*HarmonicSums`Private`ExpVar^9) - 1/(252*HarmonicSums`Private`ExpVar^7) + 1/(180*HarmonicSums`Private`ExpVar^5) - 1/(36*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar) - z2/12) + 6*li4half*z2 + (-7/(150*HarmonicSums`Private`ExpVar^9) + 1/(30*HarmonicSums`Private`ExpVar^7) - 7/(150*HarmonicSums`Private`ExpVar^5) + 7/(30*HarmonicSums`Private`ExpVar^3) - 7/(10*HarmonicSums`Private`ExpVar^2) + 7/(5*HarmonicSums`Private`ExpVar))*z2^2 + (177*z2^3)/70 + ln2^2*((1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2 + (91*z2^2)/40) + (-1)^HarmonicSums`Private`ExpVar* (-3145/(256*HarmonicSums`Private`ExpVar^10) - 195/(64*HarmonicSums`Private`ExpVar^9) + 55/(32*HarmonicSums`Private`ExpVar^8) + 65/(128*HarmonicSums`Private`ExpVar^7) - 55/(128*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^3))*z3 + (347*z3^2)/32 + ln2*(-16*li5half + 1423/(2800*HarmonicSums`Private`ExpVar^10) + 1079/(3780*HarmonicSums`Private`ExpVar^9) - 2453/(10080*HarmonicSums`Private`ExpVar^8) - 11/(80*HarmonicSums`Private`ExpVar^7) + 67/(180*HarmonicSums`Private`ExpVar^6) - 11/(30*HarmonicSums`Private`ExpVar^5) + 11/(48*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + (1/(48*HarmonicSums`Private`ExpVar^9) - 5/(336*HarmonicSums`Private`ExpVar^7) + 1/(48*HarmonicSums`Private`ExpVar^5) - 5/(48*HarmonicSums`Private`ExpVar^3) + 5/(16*HarmonicSums`Private`ExpVar^2) - 5/(8*HarmonicSums`Private`ExpVar))*z3 + z2*((-1)^HarmonicSums`Private`ExpVar* (1887/(64*HarmonicSums`Private`ExpVar^10) + 117/(16*HarmonicSums`Private`ExpVar^9) - 33/(8*HarmonicSums`Private`ExpVar^8) - 39/(32*HarmonicSums`Private`ExpVar^7) + 33/(32*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^5) - 3/(4*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3)) + (39*z3)/8) + (1457*z5)/64), S[2, -1, -2, 1, HarmonicSums`Private`ExpVar] :> li4half*(1/(10*HarmonicSums`Private`ExpVar^9) - 1/(14*HarmonicSums`Private`ExpVar^7) + 1/(10*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^3) + 3/(2*HarmonicSums`Private`ExpVar^2) - 3/HarmonicSums`Private`ExpVar) + ln2^4*(1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar)) + 7812451/(21168000*HarmonicSums`Private`ExpVar^10) + 8176883/(19051200*HarmonicSums`Private`ExpVar^9) - 130769/(940800*HarmonicSums`Private`ExpVar^8) - 1003/(6300*HarmonicSums`Private`ExpVar^7) + 1903/(14400*HarmonicSums`Private`ExpVar^6) + 163/(7200*HarmonicSums`Private`ExpVar^5) - 59/(576*HarmonicSums`Private`ExpVar^4) + 5/(72*HarmonicSums`Private`ExpVar^3) - (3*s6)/2 + (-1423/(2800*HarmonicSums`Private`ExpVar^10) - 1079/(3780*HarmonicSums`Private`ExpVar^9) + 2453/(10080*HarmonicSums`Private`ExpVar^8) + 11/(80*HarmonicSums`Private`ExpVar^7) - 67/(180*HarmonicSums`Private`ExpVar^6) + 11/(30*HarmonicSums`Private`ExpVar^5) - 11/(48*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3))*sinf + ln2^2*(-(40*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(56*HarmonicSums`Private`ExpVar^7) - 1/(40*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 3/(4*HarmonicSums`Private`ExpVar))* z2 + (-3/(400*HarmonicSums`Private`ExpVar^9) + 3/(560*HarmonicSums`Private`ExpVar^7) - 3/(400*HarmonicSums`Private`ExpVar^5) + 3/(80*HarmonicSums`Private`ExpVar^3) - 9/(80*HarmonicSums`Private`ExpVar^2) + 9/(40*HarmonicSums`Private`ExpVar))*z2^2 + (303*z2^3)/280 + (-1)^HarmonicSums`Private`ExpVar* (-3145/(256*HarmonicSums`Private`ExpVar^10) - 195/(64*HarmonicSums`Private`ExpVar^9) + 55/(32*HarmonicSums`Private`ExpVar^8) + 65/(128*HarmonicSums`Private`ExpVar^7) - 55/(128*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^3))*z3 - (137*z3^2)/64 + ln2*((1/(48*HarmonicSums`Private`ExpVar^9) - 5/(336*HarmonicSums`Private`ExpVar^7) + 1/(48*HarmonicSums`Private`ExpVar^5) - 5/(48*HarmonicSums`Private`ExpVar^3) + 5/(16*HarmonicSums`Private`ExpVar^2) - 5/(8*HarmonicSums`Private`ExpVar))*z3 + (15*z2*z3)/16), S[2, -1, 2, -1, HarmonicSums`Private`ExpVar] :> 24*li6half - (2*ln2^6)/15 + li4half*(-2/(15*HarmonicSums`Private`ExpVar^9) + 2/(21*HarmonicSums`Private`ExpVar^7) - 2/(15*HarmonicSums`Private`ExpVar^5) + 2/(3*HarmonicSums`Private`ExpVar^3) - 2/HarmonicSums`Private`ExpVar^2 + 4/HarmonicSums`Private`ExpVar) - 68779/(100800*HarmonicSums`Private`ExpVar^10) + 127/(560*HarmonicSums`Private`ExpVar^9) + 21097/(80640*HarmonicSums`Private`ExpVar^8) - 167/(480*HarmonicSums`Private`ExpVar^7) + 161/(720*HarmonicSums`Private`ExpVar^6) - 11/(120*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4) + (23*s6)/2 + ln2^4*(-(180*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(252*HarmonicSums`Private`ExpVar^7) - 1/(180*HarmonicSums`Private`ExpVar^5) + 1/(36*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar) + z2/3) - 4*li4half*z2 + (1/(24*HarmonicSums`Private`ExpVar^9) - 5/(168*HarmonicSums`Private`ExpVar^7) + 1/(24*HarmonicSums`Private`ExpVar^5) - 5/(24*HarmonicSums`Private`ExpVar^3) + 5/(8*HarmonicSums`Private`ExpVar^2) - 5/(4*HarmonicSums`Private`ExpVar))* z2^2 - (47*z2^3)/28 + ln2^2*(-4*li4half + (-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 - (111*z2^2)/40) + (-1)^HarmonicSums`Private`ExpVar* (629/(128*HarmonicSums`Private`ExpVar^10) + 39/(32*HarmonicSums`Private`ExpVar^9) - 11/(16*HarmonicSums`Private`ExpVar^8) - 13/(64*HarmonicSums`Private`ExpVar^7) + 11/(64*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3))*z3 - (137*z3^2)/32 + ln2*((-1)^HarmonicSums`Private`ExpVar* (51691/(1680*HarmonicSums`Private`ExpVar^10) - 121/(40*HarmonicSums`Private`ExpVar^9) - 2009/(480*HarmonicSums`Private`ExpVar^8) + 35/(48*HarmonicSums`Private`ExpVar^7) + 7/(6*HarmonicSums`Private`ExpVar^6) - 7/(8*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4)) + z2*((-1)^HarmonicSums`Private`ExpVar* (-1887/(64*HarmonicSums`Private`ExpVar^10) - 117/(16*HarmonicSums`Private`ExpVar^9) + 33/(8*HarmonicSums`Private`ExpVar^8) + 39/(32*HarmonicSums`Private`ExpVar^7) - 33/(32*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^5) + 3/(4*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3)) - (3*z3)/8) + (-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z3), S[2, -1, 2, 1, HarmonicSums`Private`ExpVar] :> -24*li6half - ln2^6/15 + (-1)^HarmonicSums`Private`ExpVar* (14022677/(1411200*HarmonicSums`Private`ExpVar^10) + 24559/(4800*HarmonicSums`Private`ExpVar^9) - 6631/(14400*HarmonicSums`Private`ExpVar^8) - 259/(288*HarmonicSums`Private`ExpVar^7) - 13/(72*HarmonicSums`Private`ExpVar^6) + 9/(16*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4)) + li4half*(-(30*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(42*HarmonicSums`Private`ExpVar^7) - 1/(30*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) - (23*s6)/2 + (-1)^HarmonicSums`Private`ExpVar* (-51691/(1680*HarmonicSums`Private`ExpVar^10) + 121/(40*HarmonicSums`Private`ExpVar^9) + 2009/(480*HarmonicSums`Private`ExpVar^8) - 35/(48*HarmonicSums`Private`ExpVar^7) - 7/(6*HarmonicSums`Private`ExpVar^6) + 7/(8*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4))*sinf + ln2^4*(-(720*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(1008*HarmonicSums`Private`ExpVar^7) - 1/(720*HarmonicSums`Private`ExpVar^5) + 1/(144*HarmonicSums`Private`ExpVar^3) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar) + (13*z2)/48) + (5*li4half*z2)/2 + (-(1200*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(1680*HarmonicSums`Private`ExpVar^7) - 1/(1200*HarmonicSums`Private`ExpVar^5) + 1/(240*HarmonicSums`Private`ExpVar^3) - 1/(80*HarmonicSums`Private`ExpVar^2) + 1/(40*HarmonicSums`Private`ExpVar))*z2^2 + (919*z2^3)/560 + ln2^2*(-4*li4half + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 - (5*z2^2)/8) + (-1)^HarmonicSums`Private`ExpVar* (629/(16*HarmonicSums`Private`ExpVar^10) + 39/(4*HarmonicSums`Private`ExpVar^9) - 11/(2*HarmonicSums`Private`ExpVar^8) - 13/(8*HarmonicSums`Private`ExpVar^7) + 11/(8*HarmonicSums`Private`ExpVar^6) + 1/(2*HarmonicSums`Private`ExpVar^5) - HarmonicSums`Private`ExpVar^(-4) + 1/(2*HarmonicSums`Private`ExpVar^3))*z3 + (139*z3^2)/32 + ln2*(-16*li5half + (-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z3 - (3*z2*z3)/8 + (1271*z5)/64), S[2, -1, -1, -2, HarmonicSums`Private`ExpVar] :> 48*li6half - ln2^6/15 + (-1)^HarmonicSums`Private`ExpVar* (-71261/(13440*HarmonicSums`Private`ExpVar^10) + 1409/(480*HarmonicSums`Private`ExpVar^9) + 581/(960*HarmonicSums`Private`ExpVar^8) - 43/(48*HarmonicSums`Private`ExpVar^7) + 17/(48*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5)) + 21*s6 + (19*ln2^4*z2)/48 + ((3*li4half)/2 - 22529/(268800*HarmonicSums`Private`ExpVar^10) + 1669/(26880*HarmonicSums`Private`ExpVar^9) + 643/(20160*HarmonicSums`Private`ExpVar^8) - 611/(13440*HarmonicSums`Private`ExpVar^7) - 137/(5760*HarmonicSums`Private`ExpVar^6) + 113/(960*HarmonicSums`Private`ExpVar^5) - 35/(192*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-(50*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(70*HarmonicSums`Private`ExpVar^7) - 1/(50*HarmonicSums`Private`ExpVar^5) + 1/(10*HarmonicSums`Private`ExpVar^3) - 3/(10*HarmonicSums`Private`ExpVar^2) + 3/(5*HarmonicSums`Private`ExpVar))*z2^2 - (2533*z2^3)/336 + ln2^2*((-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - (151*z2^2)/40) + (-1)^HarmonicSums`Private`ExpVar* (8177/(256*HarmonicSums`Private`ExpVar^10) + 507/(64*HarmonicSums`Private`ExpVar^9) - 143/(32*HarmonicSums`Private`ExpVar^8) - 169/(128*HarmonicSums`Private`ExpVar^7) + 143/(128*HarmonicSums`Private`ExpVar^6) + 13/(32*HarmonicSums`Private`ExpVar^5) - 13/(16*HarmonicSums`Private`ExpVar^4) + 13/(32*HarmonicSums`Private`ExpVar^3))*z3 - 8*z3^2 + ln2*(16*li5half + (1/(30*HarmonicSums`Private`ExpVar^9) - 1/(42*HarmonicSums`Private`ExpVar^7) + 1/(30*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1))*z3 + z2*((-1)^HarmonicSums`Private`ExpVar* (-629/(32*HarmonicSums`Private`ExpVar^10) - 39/(8*HarmonicSums`Private`ExpVar^9) + 11/(4*HarmonicSums`Private`ExpVar^8) + 13/(16*HarmonicSums`Private`ExpVar^7) - 11/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + (3*z3)/2) - (31*z5)/4), S[2, -1, -1, 2, HarmonicSums`Private`ExpVar] :> li4half*(1/(10*HarmonicSums`Private`ExpVar^9) - 1/(14*HarmonicSums`Private`ExpVar^7) + 1/(10*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^3) + 3/(2*HarmonicSums`Private`ExpVar^2) - 3/HarmonicSums`Private`ExpVar) - 3011/(100800*HarmonicSums`Private`ExpVar^10) + 22877/(45360*HarmonicSums`Private`ExpVar^9) - 1027/(40320*HarmonicSums`Private`ExpVar^8) - 1831/(4032*HarmonicSums`Private`ExpVar^7) + 187/(320*HarmonicSums`Private`ExpVar^6) - 73/(160*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) - 5*s6 + ln2^4*(1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar) - z2/8) + (-3*li4half + 22529/(134400*HarmonicSums`Private`ExpVar^10) - 1669/(13440*HarmonicSums`Private`ExpVar^9) - 643/(10080*HarmonicSums`Private`ExpVar^8) + 611/(6720*HarmonicSums`Private`ExpVar^7) + 137/(2880*HarmonicSums`Private`ExpVar^6) - 113/(480*HarmonicSums`Private`ExpVar^5) + 35/(96*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (-(80*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(112*HarmonicSums`Private`ExpVar^7) - 1/(80*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 3/(8*HarmonicSums`Private`ExpVar))*z2^2 + (59*z2^3)/84 + ln2^2*((-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (9*z2^2)/8) + (-1)^HarmonicSums`Private`ExpVar* (-629/(32*HarmonicSums`Private`ExpVar^10) - 39/(8*HarmonicSums`Private`ExpVar^9) + 11/(4*HarmonicSums`Private`ExpVar^8) + 13/(16*HarmonicSums`Private`ExpVar^7) - 11/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3))*z3 + (7*z3^2)/4 + ln2*((1/(30*HarmonicSums`Private`ExpVar^9) - 1/(42*HarmonicSums`Private`ExpVar^7) + 1/(30*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1))*z3 + z2*((-1)^HarmonicSums`Private`ExpVar* (629/(64*HarmonicSums`Private`ExpVar^10) + 39/(16*HarmonicSums`Private`ExpVar^9) - 11/(8*HarmonicSums`Private`ExpVar^8) - 13/(32*HarmonicSums`Private`ExpVar^7) + 11/(32*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (3*z3)/2)), S[2, -1, 1, -2, HarmonicSums`Private`ExpVar] :> li4half*(1/(15*HarmonicSums`Private`ExpVar^9) - 1/(21*HarmonicSums`Private`ExpVar^7) + 1/(15*HarmonicSums`Private`ExpVar^5) - 1/(3*HarmonicSums`Private`ExpVar^3) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) - 116863/(100800*HarmonicSums`Private`ExpVar^10) + 4337/(15120*HarmonicSums`Private`ExpVar^9) + 15437/(40320*HarmonicSums`Private`ExpVar^8) - 141/(320*HarmonicSums`Private`ExpVar^7) + 743/(2880*HarmonicSums`Private`ExpVar^6) - 47/(480*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4) - (7*s6)/4 + ln2^4*(1/(360*HarmonicSums`Private`ExpVar^9) - 1/(504*HarmonicSums`Private`ExpVar^7) + 1/(360*HarmonicSums`Private`ExpVar^5) - 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar) + z2/12) + (2*li4half + (-1)^HarmonicSums`Private`ExpVar* (2007/(256*HarmonicSums`Private`ExpVar^10) + 187/(32*HarmonicSums`Private`ExpVar^9) - 59/(64*HarmonicSums`Private`ExpVar^8) - 55/(64*HarmonicSums`Private`ExpVar^7) + 3/(16*HarmonicSums`Private`ExpVar^6) + 7/(32*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-629/(64*HarmonicSums`Private`ExpVar^10) - 39/(16*HarmonicSums`Private`ExpVar^9) + 11/(8*HarmonicSums`Private`ExpVar^8) + 13/(32*HarmonicSums`Private`ExpVar^7) - 11/(32*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3))*sinf*z2 - (5*ln2^2*z2^2)/16 + (-(150*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(210*HarmonicSums`Private`ExpVar^7) - 1/(150*HarmonicSums`Private`ExpVar^5) + 1/(30*HarmonicSums`Private`ExpVar^3) - 1/(10*HarmonicSums`Private`ExpVar^2) + 1/(5*HarmonicSums`Private`ExpVar))*z2^2 + z2^3/105 + (-1)^HarmonicSums`Private`ExpVar* (-629/(256*HarmonicSums`Private`ExpVar^10) - 39/(64*HarmonicSums`Private`ExpVar^9) + 11/(32*HarmonicSums`Private`ExpVar^8) + 13/(128*HarmonicSums`Private`ExpVar^7) - 11/(128*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3))*z3 - (191*z3^2)/128 + ln2*((1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z3 + (45*z2*z3)/16), S[2, -1, 1, 2, HarmonicSums`Private`ExpVar] :> 24*li6half - ln2^6/30 + (-1)^HarmonicSums`Private`ExpVar* (40817143/(1411200*HarmonicSums`Private`ExpVar^10) - 547/(2400*HarmonicSums`Private`ExpVar^9) - 58019/(14400*HarmonicSums`Private`ExpVar^8) + 1/(72*HarmonicSums`Private`ExpVar^7) + 215/(144*HarmonicSums`Private`ExpVar^6) - 15/(16*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4)) + li4half*(-(30*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(42*HarmonicSums`Private`ExpVar^7) - 1/(30*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) + 9*s6 + ln2^4*(-(720*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(1008*HarmonicSums`Private`ExpVar^7) - 1/(720*HarmonicSums`Private`ExpVar^5) + 1/(144*HarmonicSums`Private`ExpVar^3) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar) + z2/16) + ((-5*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (-2007/(128*HarmonicSums`Private`ExpVar^10) - 187/(16*HarmonicSums`Private`ExpVar^9) + 59/(32*HarmonicSums`Private`ExpVar^8) + 55/(32*HarmonicSums`Private`ExpVar^7) - 3/(8*HarmonicSums`Private`ExpVar^6) - 7/(16*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4)))*z2 + (-1)^HarmonicSums`Private`ExpVar* (629/(32*HarmonicSums`Private`ExpVar^10) + 39/(8*HarmonicSums`Private`ExpVar^9) - 11/(4*HarmonicSums`Private`ExpVar^8) - 13/(16*HarmonicSums`Private`ExpVar^7) + 11/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3))*sinf*z2 - (43*ln2^2*z2^2)/40 + (-(600*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(840*HarmonicSums`Private`ExpVar^7) - 1/(600*HarmonicSums`Private`ExpVar^5) + 1/(120*HarmonicSums`Private`ExpVar^3) - 1/(40*HarmonicSums`Private`ExpVar^2) + 1/(20*HarmonicSums`Private`ExpVar))*z2^2 - (5777*z2^3)/1680 + (-1)^HarmonicSums`Private`ExpVar* (-629/(32*HarmonicSums`Private`ExpVar^10) - 39/(8*HarmonicSums`Private`ExpVar^9) + 11/(4*HarmonicSums`Private`ExpVar^8) + 13/(16*HarmonicSums`Private`ExpVar^7) - 11/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3))*z3 - (133*z3^2)/64 + ln2*(8*li5half + (1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z3 - (9*z2*z3)/8 - (155*z5)/64), S[2, 1, -2, -1, HarmonicSums`Private`ExpVar] :> li4half*(1/(30*HarmonicSums`Private`ExpVar^9) - 1/(42*HarmonicSums`Private`ExpVar^7) + 1/(30*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + ln2^4*(1/(720*HarmonicSums`Private`ExpVar^9) - 1/(1008*HarmonicSums`Private`ExpVar^7) + 1/(720*HarmonicSums`Private`ExpVar^5) - 1/(144*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar)) - 923119/(5292000*HarmonicSums`Private`ExpVar^10) + 65447/(635040*HarmonicSums`Private`ExpVar^9) + 950099/(8467200*HarmonicSums`Private`ExpVar^8) - 13229/(50400*HarmonicSums`Private`ExpVar^7) + 6167/(21600*HarmonicSums`Private`ExpVar^6) - 157/(720*HarmonicSums`Private`ExpVar^5) + 35/(288*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + (15*s6)/4 + ln2^2*(-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))* z2 + (-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2^2 + (75*z2^3)/112 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-3/(16*HarmonicSums`Private`ExpVar^10) + 57/(8*HarmonicSums`Private`ExpVar^9) - 21/(32*HarmonicSums`Private`ExpVar^8) - 19/(16*HarmonicSums`Private`ExpVar^7) + 5/(8*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5)) + z2*(7/(80*HarmonicSums`Private`ExpVar^10) - 33/(700*HarmonicSums`Private`ExpVar^9) - 5/(112*HarmonicSums`Private`ExpVar^8) + 19/(735*HarmonicSums`Private`ExpVar^7) + 3/(80*HarmonicSums`Private`ExpVar^6) - 7/(300*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar) - (21*z3)/16)) + (-7/(192*HarmonicSums`Private`ExpVar^10) + 11/(560*HarmonicSums`Private`ExpVar^9) + 25/(1344*HarmonicSums`Private`ExpVar^8) - 19/(1764*HarmonicSums`Private`ExpVar^7) - 1/(64*HarmonicSums`Private`ExpVar^6) + 7/(720*HarmonicSums`Private`ExpVar^5) + 5/(192*HarmonicSums`Private`ExpVar^4) - 5/(288*HarmonicSums`Private`ExpVar^3) - 5/(32*HarmonicSums`Private`ExpVar^2) + 5/(8*HarmonicSums`Private`ExpVar))*z3 - (225*z3^2)/128 + sinf*(ln2*(1/(20*HarmonicSums`Private`ExpVar^9) - 1/(28*HarmonicSums`Private`ExpVar^7) + 1/(20*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar))*z2 + (-(48*HarmonicSums`Private`ExpVar^9)^(-1) + 5/(336*HarmonicSums`Private`ExpVar^7) - 1/(48*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^3) - 5/(16*HarmonicSums`Private`ExpVar^2) + 5/(8*HarmonicSums`Private`ExpVar))*z3), S[2, 1, -2, 1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-1071/(128*HarmonicSums`Private`ExpVar^10) + 415/(64*HarmonicSums`Private`ExpVar^9) + 9/(32*HarmonicSums`Private`ExpVar^8) - 13/(16*HarmonicSums`Private`ExpVar^7) + 3/(16*HarmonicSums`Private`ExpVar^6)) - (3*s6)/4 + (-(400*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(560*HarmonicSums`Private`ExpVar^7) - 1/(400*HarmonicSums`Private`ExpVar^5) + 1/(80*HarmonicSums`Private`ExpVar^3) - 3/(80*HarmonicSums`Private`ExpVar^2) + 3/(40*HarmonicSums`Private`ExpVar))*z2^2 - (15*z2^3)/28 + (-7/(192*HarmonicSums`Private`ExpVar^10) + 11/(560*HarmonicSums`Private`ExpVar^9) + 25/(1344*HarmonicSums`Private`ExpVar^8) - 19/(1764*HarmonicSums`Private`ExpVar^7) - 1/(64*HarmonicSums`Private`ExpVar^6) + 7/(720*HarmonicSums`Private`ExpVar^5) + 5/(192*HarmonicSums`Private`ExpVar^4) - 5/(288*HarmonicSums`Private`ExpVar^3) - 5/(32*HarmonicSums`Private`ExpVar^2) + 5/(8*HarmonicSums`Private`ExpVar))*z3 - (9*z3^2)/128 + sinf*((-1)^HarmonicSums`Private`ExpVar* (3/(16*HarmonicSums`Private`ExpVar^10) - 57/(8*HarmonicSums`Private`ExpVar^9) + 21/(32*HarmonicSums`Private`ExpVar^8) + 19/(16*HarmonicSums`Private`ExpVar^7) - 5/(8*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5)) + (-(48*HarmonicSums`Private`ExpVar^9)^(-1) + 5/(336*HarmonicSums`Private`ExpVar^7) - 1/(48*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^3) - 5/(16*HarmonicSums`Private`ExpVar^2) + 5/(8*HarmonicSums`Private`ExpVar))*z3) + (93*ln2*z5)/64, S[2, 1, 2, -1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-543/(64*HarmonicSums`Private`ExpVar^10) - 21/(64*HarmonicSums`Private`ExpVar^9) + 5/(4*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^6)) + li4half*(-(10*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(14*HarmonicSums`Private`ExpVar^7) - 1/(10*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^3) - 3/(2*HarmonicSums`Private`ExpVar^2) + 3/HarmonicSums`Private`ExpVar) + ln2^4*(-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar) - (3*z2)/16) - (9*li4half*z2)/2 + (1/(25*HarmonicSums`Private`ExpVar^9) - 1/(35*HarmonicSums`Private`ExpVar^7) + 1/(25*HarmonicSums`Private`ExpVar^5) - 1/(5*HarmonicSums`Private`ExpVar^3) + 3/(5*HarmonicSums`Private`ExpVar^2) - 6/(5*HarmonicSums`Private`ExpVar))* z2^2 + (9*z2^3)/5 + ln2^2*((1/(40*HarmonicSums`Private`ExpVar^9) - 1/(56*HarmonicSums`Private`ExpVar^7) + 1/(40*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 3/(4*HarmonicSums`Private`ExpVar))*z2 + (9*z2^2)/8) + (7/(480*HarmonicSums`Private`ExpVar^10) - 11/(1400*HarmonicSums`Private`ExpVar^9) - 5/(672*HarmonicSums`Private`ExpVar^8) + 19/(4410*HarmonicSums`Private`ExpVar^7) + 1/(160*HarmonicSums`Private`ExpVar^6) - 7/(1800*HarmonicSums`Private`ExpVar^5) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z3 + (15*z3^2)/32 + sinf*(ln2*(-(20*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(28*HarmonicSums`Private`ExpVar^7) - 1/(20*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar))*z2 + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z3) + ln2*(81343/(882000*HarmonicSums`Private`ExpVar^10) - 41/(1470*HarmonicSums`Private`ExpVar^9) - 81121/(1058400*HarmonicSums`Private`ExpVar^8) + 77/(3600*HarmonicSums`Private`ExpVar^7) + 1189/(5400*HarmonicSums`Private`ExpVar^6) - 19/(36*HarmonicSums`Private`ExpVar^5) + 107/(144*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) + z2*(-7/(80*HarmonicSums`Private`ExpVar^10) + 33/(700*HarmonicSums`Private`ExpVar^9) + 5/(112*HarmonicSums`Private`ExpVar^8) - 19/(735*HarmonicSums`Private`ExpVar^7) - 3/(80*HarmonicSums`Private`ExpVar^6) + 7/(300*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar) - (21*z3)/8) + (-7/(120*HarmonicSums`Private`ExpVar^9) + 1/(24*HarmonicSums`Private`ExpVar^7) - 7/(120*HarmonicSums`Private`ExpVar^5) + 7/(24*HarmonicSums`Private`ExpVar^3) - 7/(8*HarmonicSums`Private`ExpVar^2) + 7/(4*HarmonicSums`Private`ExpVar))*z3 - (465*z5)/64), S[2, 1, 2, 1, HarmonicSums`Private`ExpVar] :> 11587043/(88905600*HarmonicSums`Private`ExpVar^10) + 825551/(4939200*HarmonicSums`Private`ExpVar^9) - 66541409/(889056000*HarmonicSums`Private`ExpVar^8) - 2659/(18000*HarmonicSums`Private`ExpVar^7) + 50123/(648000*HarmonicSums`Private`ExpVar^6) + 1769/(4320*HarmonicSums`Private`ExpVar^5) - 1861/(1728*HarmonicSums`Private`ExpVar^4) + 3/(2*HarmonicSums`Private`ExpVar^3) - 5/(4*HarmonicSums`Private`ExpVar^2) + (-(25*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(35*HarmonicSums`Private`ExpVar^7) - 1/(25*HarmonicSums`Private`ExpVar^5) + 1/(5*HarmonicSums`Private`ExpVar^3) - 3/(5*HarmonicSums`Private`ExpVar^2) + 6/(5*HarmonicSums`Private`ExpVar))* z2^2 + (7/(60*HarmonicSums`Private`ExpVar^10) - 11/(175*HarmonicSums`Private`ExpVar^9) - 5/(84*HarmonicSums`Private`ExpVar^8) + 76/(2205*HarmonicSums`Private`ExpVar^7) + 1/(20*HarmonicSums`Private`ExpVar^6) - 7/(225*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^4) + 1/(18*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - 2/HarmonicSums`Private`ExpVar)* z3 + 2*z3^2 + sinf*(-81343/(882000*HarmonicSums`Private`ExpVar^10) + 41/(1470*HarmonicSums`Private`ExpVar^9) + 81121/(1058400*HarmonicSums`Private`ExpVar^8) - 77/(3600*HarmonicSums`Private`ExpVar^7) - 1189/(5400*HarmonicSums`Private`ExpVar^6) + 19/(36*HarmonicSums`Private`ExpVar^5) - 107/(144*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + (1/(15*HarmonicSums`Private`ExpVar^9) - 1/(21*HarmonicSums`Private`ExpVar^7) + 1/(15*HarmonicSums`Private`ExpVar^5) - 1/(3*HarmonicSums`Private`ExpVar^3) + HarmonicSums`Private`ExpVar^ (-2) - 2/HarmonicSums`Private`ExpVar)*z3), S[2, 1, -1, -2, HarmonicSums`Private`ExpVar] :> li4half*(-(10*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(14*HarmonicSums`Private`ExpVar^7) - 1/(10*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^3) - 3/(2*HarmonicSums`Private`ExpVar^2) + 3/HarmonicSums`Private`ExpVar) - 3412897/(10584000*HarmonicSums`Private`ExpVar^10) + 14773/(79380*HarmonicSums`Private`ExpVar^9) + 662153/(4233600*HarmonicSums`Private`ExpVar^8) - 3903/(11200*HarmonicSums`Private`ExpVar^7) + 15071/(43200*HarmonicSums`Private`ExpVar^6) - 71/(288*HarmonicSums`Private`ExpVar^5) + 37/(288*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) - s6/4 + ln2^4*(-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar) + z2/24) + (li4half + (-1)^HarmonicSums`Private`ExpVar* (-2331/(256*HarmonicSums`Private`ExpVar^10) + 27/(32*HarmonicSums`Private`ExpVar^9) + 155/(128*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^7) - 9/(32*HarmonicSums`Private`ExpVar^6) + 7/(32*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4)))*z2 + (11/(600*HarmonicSums`Private`ExpVar^9) - 11/(840*HarmonicSums`Private`ExpVar^7) + 11/(600*HarmonicSums`Private`ExpVar^5) - 11/(120*HarmonicSums`Private`ExpVar^3) + 11/(40*HarmonicSums`Private`ExpVar^2) - 11/(20*HarmonicSums`Private`ExpVar))*z2^2 - (47*z2^3)/420 + ln2^2*((1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 - (7*z2^2)/16) + ln2*z2*(-7/(120*HarmonicSums`Private`ExpVar^10) + 11/(350*HarmonicSums`Private`ExpVar^9) + 5/(168*HarmonicSums`Private`ExpVar^8) - 38/(2205*HarmonicSums`Private`ExpVar^7) - 1/(40*HarmonicSums`Private`ExpVar^6) + 7/(450*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(36*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1) + (7*z3)/8) + (91/(960*HarmonicSums`Private`ExpVar^10) - 143/(2800*HarmonicSums`Private`ExpVar^9) - 65/(1344*HarmonicSums`Private`ExpVar^8) + 247/(8820*HarmonicSums`Private`ExpVar^7) + 13/(320*HarmonicSums`Private`ExpVar^6) - 91/(3600*HarmonicSums`Private`ExpVar^5) - 13/(192*HarmonicSums`Private`ExpVar^4) + 13/(288*HarmonicSums`Private`ExpVar^3) + 13/(32*HarmonicSums`Private`ExpVar^2) - 13/(8*HarmonicSums`Private`ExpVar))*z3 + (129*z3^2)/128 + sinf*(ln2*(-(30*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(42*HarmonicSums`Private`ExpVar^7) - 1/(30*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1))*z2 + (13/(240*HarmonicSums`Private`ExpVar^9) - 13/(336*HarmonicSums`Private`ExpVar^7) + 13/(240*HarmonicSums`Private`ExpVar^5) - 13/(48*HarmonicSums`Private`ExpVar^3) + 13/(16*HarmonicSums`Private`ExpVar^2) - 13/(8*HarmonicSums`Private`ExpVar))*z3), S[2, 1, -1, 2, HarmonicSums`Private`ExpVar] :> -24*li6half + ln2^6/30 + (-1)^HarmonicSums`Private`ExpVar* (-16253/(1920*HarmonicSums`Private`ExpVar^10) + 3377/(480*HarmonicSums`Private`ExpVar^9) + 49/(96*HarmonicSums`Private`ExpVar^8) - 155/(96*HarmonicSums`Private`ExpVar^7) + 11/(16*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5)) + li4half*(-(15*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(21*HarmonicSums`Private`ExpVar^7) - 1/(15*HarmonicSums`Private`ExpVar^5) + 1/(3*HarmonicSums`Private`ExpVar^3) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) - 8*s6 + ln2^4*(-(360*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(504*HarmonicSums`Private`ExpVar^7) - 1/(360*HarmonicSums`Private`ExpVar^5) + 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar) - (5*z2)/16) + ((-7*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (2331/(128*HarmonicSums`Private`ExpVar^10) - 27/(16*HarmonicSums`Private`ExpVar^9) - 155/(64*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^7) + 9/(16*HarmonicSums`Private`ExpVar^6) - 7/(16*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)))*z2 + (7/(240*HarmonicSums`Private`ExpVar^9) - 1/(48*HarmonicSums`Private`ExpVar^7) + 7/(240*HarmonicSums`Private`ExpVar^5) - 7/(48*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2) - 7/(8*HarmonicSums`Private`ExpVar))*z2^2 + (7837*z2^3)/1680 + ln2^2*((1/(40*HarmonicSums`Private`ExpVar^9) - 1/(56*HarmonicSums`Private`ExpVar^7) + 1/(40*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 3/(4*HarmonicSums`Private`ExpVar))*z2 + (103*z2^2)/40) + (-7/(120*HarmonicSums`Private`ExpVar^10) + 11/(350*HarmonicSums`Private`ExpVar^9) + 5/(168*HarmonicSums`Private`ExpVar^8) - 38/(2205*HarmonicSums`Private`ExpVar^7) - 1/(40*HarmonicSums`Private`ExpVar^6) + 7/(450*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(36*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1))* z3 + (177*z3^2)/64 + sinf*(ln2*(1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2 + (-(30*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(42*HarmonicSums`Private`ExpVar^7) - 1/(30*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1))*z3) + ln2*(-8*li5half + z2*(7/(240*HarmonicSums`Private`ExpVar^10) - 11/(700*HarmonicSums`Private`ExpVar^9) - 5/(336*HarmonicSums`Private`ExpVar^8) + 19/(2205*HarmonicSums`Private`ExpVar^7) + 1/(80*HarmonicSums`Private`ExpVar^6) - 7/(900*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) - (35*z3)/8) + (-7/(80*HarmonicSums`Private`ExpVar^9) + 1/(16*HarmonicSums`Private`ExpVar^7) - 7/(80*HarmonicSums`Private`ExpVar^5) + 7/(16*HarmonicSums`Private`ExpVar^3) - 21/(16*HarmonicSums`Private`ExpVar^2) + 21/(8*HarmonicSums`Private`ExpVar))*z3 + (155*z5)/64), S[2, 1, 1, -2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-1183/(128*HarmonicSums`Private`ExpVar^10) - 33/(32*HarmonicSums`Private`ExpVar^9) + 3/(2*HarmonicSums`Private`ExpVar^8) - 15/(32*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^6)) + li4half*(1/(30*HarmonicSums`Private`ExpVar^9) - 1/(42*HarmonicSums`Private`ExpVar^7) + 1/(30*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) - (5*s6)/2 + ln2^4*(1/(720*HarmonicSums`Private`ExpVar^9) - 1/(1008*HarmonicSums`Private`ExpVar^7) + 1/(720*HarmonicSums`Private`ExpVar^5) - 1/(144*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar) + z2/16) + ((3*li4half)/2 + 429/(11200*HarmonicSums`Private`ExpVar^10) + 329171/(15876000*HarmonicSums`Private`ExpVar^9) - 1243/(70560*HarmonicSums`Private`ExpVar^8) - 137353/(7408800*HarmonicSums`Private`ExpVar^7) + 21/(1600*HarmonicSums`Private`ExpVar^6) + 5743/(108000*HarmonicSums`Private`ExpVar^5) - 83/(576*HarmonicSums`Private`ExpVar^4) + 97/(432*HarmonicSums`Private`ExpVar^3) - 5/(16*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 + (-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))* sinf^2*z2 + (-13/(600*HarmonicSums`Private`ExpVar^9) + 13/(840*HarmonicSums`Private`ExpVar^7) - 13/(600*HarmonicSums`Private`ExpVar^5) + 13/(120*HarmonicSums`Private`ExpVar^3) - 13/(40*HarmonicSums`Private`ExpVar^2) + 13/(20*HarmonicSums`Private`ExpVar))*z2^2 - (26*z2^3)/15 + ln2^2*((-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - (3*z2^2)/8) + (-7/(960*HarmonicSums`Private`ExpVar^10) + 11/(2800*HarmonicSums`Private`ExpVar^9) + 5/(1344*HarmonicSums`Private`ExpVar^8) - 19/(8820*HarmonicSums`Private`ExpVar^7) - 1/(320*HarmonicSums`Private`ExpVar^6) + 7/(3600*HarmonicSums`Private`ExpVar^5) + 1/(192*HarmonicSums`Private`ExpVar^4) - 1/(288*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z3 + (45*z3^2)/64 + sinf*((-7/(240*HarmonicSums`Private`ExpVar^10) + 11/(700*HarmonicSums`Private`ExpVar^9) + 5/(336*HarmonicSums`Private`ExpVar^8) - 19/(2205*HarmonicSums`Private`ExpVar^7) - 1/(80*HarmonicSums`Private`ExpVar^6) + 7/(900*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 + (-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z3) + ln2*((7/(240*HarmonicSums`Private`ExpVar^9) - 1/(48*HarmonicSums`Private`ExpVar^7) + 7/(240*HarmonicSums`Private`ExpVar^5) - 7/(48*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2) - 7/(8*HarmonicSums`Private`ExpVar))*z3 + (21*z2*z3)/16 + (155*z5)/32), S[2, 1, 1, 2, HarmonicSums`Private`ExpVar] :> -33629189/(1111320000*HarmonicSums`Private`ExpVar^10) + 310129/(5556600*HarmonicSums`Private`ExpVar^9) + 6992161/(444528000*HarmonicSums`Private`ExpVar^8) - 45551/(216000*HarmonicSums`Private`ExpVar^7) + 313861/(648000*HarmonicSums`Private`ExpVar^6) - 3181/(4320*HarmonicSums`Private`ExpVar^5) + 745/(864*HarmonicSums`Private`ExpVar^4) - 19/(24*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) + (-429/(5600*HarmonicSums`Private`ExpVar^10) - 329171/(7938000*HarmonicSums`Private`ExpVar^9) + 1243/(35280*HarmonicSums`Private`ExpVar^8) + 137353/(3704400*HarmonicSums`Private`ExpVar^7) - 21/(800*HarmonicSums`Private`ExpVar^6) - 5743/(54000*HarmonicSums`Private`ExpVar^5) + 83/(288*HarmonicSums`Private`ExpVar^4) - 97/(216*HarmonicSums`Private`ExpVar^3) + 5/(8*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1))* z2 + (1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))* sinf^2*z2 + (3/(100*HarmonicSums`Private`ExpVar^9) - 3/(140*HarmonicSums`Private`ExpVar^7) + 3/(100*HarmonicSums`Private`ExpVar^5) - 3/(20*HarmonicSums`Private`ExpVar^3) + 9/(20*HarmonicSums`Private`ExpVar^2) - 9/(10*HarmonicSums`Private`ExpVar))*z2^2 + (118*z2^3)/105 + (-7/(120*HarmonicSums`Private`ExpVar^10) + 11/(350*HarmonicSums`Private`ExpVar^9) + 5/(168*HarmonicSums`Private`ExpVar^8) - 38/(2205*HarmonicSums`Private`ExpVar^7) - 1/(40*HarmonicSums`Private`ExpVar^6) + 7/(450*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(36*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1))* z3 - z3^2 + sinf*((7/(120*HarmonicSums`Private`ExpVar^10) - 11/(350*HarmonicSums`Private`ExpVar^9) - 5/(168*HarmonicSums`Private`ExpVar^8) + 38/(2205*HarmonicSums`Private`ExpVar^7) + 1/(40*HarmonicSums`Private`ExpVar^6) - 7/(450*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(36*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1))*z2 + (-(30*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(42*HarmonicSums`Private`ExpVar^7) - 1/(30*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1))*z3), S[-1, -3, -1, -1, HarmonicSums`Private`ExpVar] :> 6*li6half + ln2^6/20 + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-31/(48*HarmonicSums`Private`ExpVar^10) + 17/(192*HarmonicSums`Private`ExpVar^8) - 1/(48*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar)) + 125633/(53760*HarmonicSums`Private`ExpVar^10) + 7961/(6912*HarmonicSums`Private`ExpVar^9) - 18563/(46080*HarmonicSums`Private`ExpVar^8) - 335/(672*HarmonicSums`Private`ExpVar^7) + 313/(576*HarmonicSums`Private`ExpVar^6) - 21/(80*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) + (17*s6)/4 - (ln2^4*z2)/3 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))* z2 - (509*z2^3)/560 + ln2^2*(li4half + 109/(160*HarmonicSums`Private`ExpVar^10) - 197/(144*HarmonicSums`Private`ExpVar^9) - 7/(48*HarmonicSums`Private`ExpVar^8) + 17/(48*HarmonicSums`Private`ExpVar^7) + 5/(96*HarmonicSums`Private`ExpVar^6) - 13/(48*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) - (9*z2^2)/20) - (25*z3^2)/32 + z2*(li4half + 109/(160*HarmonicSums`Private`ExpVar^10) - 197/(144*HarmonicSums`Private`ExpVar^9) - 7/(48*HarmonicSums`Private`ExpVar^8) + 17/(48*HarmonicSums`Private`ExpVar^7) + 5/(96*HarmonicSums`Private`ExpVar^6) - 13/(48*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z3) + ln2*((-1)^HarmonicSums`Private`ExpVar* (10171/(1152*HarmonicSums`Private`ExpVar^10) + 11/(192*HarmonicSums`Private`ExpVar^9) - 497/(384*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^7) + 103/(192*HarmonicSums`Private`ExpVar^6) - 31/(96*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/(2*HarmonicSums`Private`ExpVar^10) + 17/(8*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar* (589/(160*HarmonicSums`Private`ExpVar^10) - 323/(640*HarmonicSums`Private`ExpVar^8) + 19/(160*HarmonicSums`Private`ExpVar^6) - 19/(320*HarmonicSums`Private`ExpVar^4) + 19/(160*HarmonicSums`Private`ExpVar^2) - 19/(80*HarmonicSums`Private`ExpVar))*z2^2 - z2*z3 - (15*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-465/(128*HarmonicSums`Private`ExpVar^10) + 255/(512*HarmonicSums`Private`ExpVar^8) - 15/(128*HarmonicSums`Private`ExpVar^6) + 15/(256*HarmonicSums`Private`ExpVar^4) - 15/(128*HarmonicSums`Private`ExpVar^2) + 15/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, -3, -1, 1, HarmonicSums`Private`ExpVar] :> -6*li6half + (3*ln2^6)/40 + (-1)^HarmonicSums`Private`ExpVar* (634019/(103680*HarmonicSums`Private`ExpVar^10) + 67559/(40320*HarmonicSums`Private`ExpVar^9) - 6757/(10752*HarmonicSums`Private`ExpVar^8) - 1037/(2880*HarmonicSums`Private`ExpVar^7) + 2551/(11520*HarmonicSums`Private`ExpVar^6) + 1/(1152*HarmonicSums`Private`ExpVar^5) - 1/(36*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-31/(240*HarmonicSums`Private`ExpVar^10) + 17/(960*HarmonicSums`Private`ExpVar^8) - 1/(240*HarmonicSums`Private`ExpVar^6) + 1/(480*HarmonicSums`Private`ExpVar^4) - 1/(240*HarmonicSums`Private`ExpVar^2) + 1/(120*HarmonicSums`Private`ExpVar)) - (17*s6)/4 + (-1)^HarmonicSums`Private`ExpVar* (-10171/(1152*HarmonicSums`Private`ExpVar^10) - 11/(192*HarmonicSums`Private`ExpVar^9) + 497/(384*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^7) - 103/(192*HarmonicSums`Private`ExpVar^6) + 31/(96*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^4))*sinf - (11*ln2^4*z2)/24 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar))*z2 + (27*z2^3)/35 + ln2^2*(2*li4half + 109/(160*HarmonicSums`Private`ExpVar^10) - 197/(144*HarmonicSums`Private`ExpVar^9) - 7/(48*HarmonicSums`Private`ExpVar^8) + 17/(48*HarmonicSums`Private`ExpVar^7) + 5/(96*HarmonicSums`Private`ExpVar^6) - 13/(48*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + (149*z2^2)/80) + (77*z3^2)/32 + z2*(-2*li4half - 109/(160*HarmonicSums`Private`ExpVar^10) + 197/(144*HarmonicSums`Private`ExpVar^9) + 7/(48*HarmonicSums`Private`ExpVar^8) - 17/(48*HarmonicSums`Private`ExpVar^7) - 5/(96*HarmonicSums`Private`ExpVar^6) + 13/(48*HarmonicSums`Private`ExpVar^5) - 7/(32*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (403/(32*HarmonicSums`Private`ExpVar^10) - 221/(128*HarmonicSums`Private`ExpVar^8) + 13/(32*HarmonicSums`Private`ExpVar^6) - 13/(64*HarmonicSums`Private`ExpVar^4) + 13/(32*HarmonicSums`Private`ExpVar^2) - 13/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*((-1)^HarmonicSums`Private`ExpVar* (31/(40*HarmonicSums`Private`ExpVar^10) - 17/(160*HarmonicSums`Private`ExpVar^8) + 1/(40*HarmonicSums`Private`ExpVar^6) - 1/(80*HarmonicSums`Private`ExpVar^4) + 1/(40*HarmonicSums`Private`ExpVar^2) - 1/(20*HarmonicSums`Private`ExpVar))*z2^2 - (13*z2*z3)/16 - (15*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-2635/(64*HarmonicSums`Private`ExpVar^10) + 1445/(256*HarmonicSums`Private`ExpVar^8) - 85/(64*HarmonicSums`Private`ExpVar^6) + 85/(128*HarmonicSums`Private`ExpVar^4) - 85/(64*HarmonicSums`Private`ExpVar^2) + 85/(32*HarmonicSums`Private`ExpVar))*z5, S[-1, -3, 1, -1, HarmonicSums`Private`ExpVar] :> 2*li6half - ln2^6/72 + (-1)^HarmonicSums`Private`ExpVar* (-96007/(46080*HarmonicSums`Private`ExpVar^10) + 54619/(53760*HarmonicSums`Private`ExpVar^9) + 551/(1344*HarmonicSums`Private`ExpVar^8) - 443/(960*HarmonicSums`Private`ExpVar^7) + 57/(320*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(120*HarmonicSums`Private`ExpVar^10) - 17/(480*HarmonicSums`Private`ExpVar^8) + 1/(120*HarmonicSums`Private`ExpVar^6) - 1/(240*HarmonicSums`Private`ExpVar^4) + 1/(120*HarmonicSums`Private`ExpVar^2) - 1/(60*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) - (5*s6)/4 + ln2*(-109/(80*HarmonicSums`Private`ExpVar^10) + 197/(72*HarmonicSums`Private`ExpVar^9) + 7/(24*HarmonicSums`Private`ExpVar^8) - 17/(24*HarmonicSums`Private`ExpVar^7) - 5/(48*HarmonicSums`Private`ExpVar^6) + 13/(24*HarmonicSums`Private`ExpVar^5) - 7/(16*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3))*sinf + (ln2^4*z2)/8 - (4*z2^3)/5 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-31/(12*HarmonicSums`Private`ExpVar^10) + 17/(48*HarmonicSums`Private`ExpVar^8) - 1/(12*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/24) + (-1)^HarmonicSums`Private`ExpVar*(93/(16*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^8) + 3/(16*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*z2*z3 + (5*z3^2)/8 + ln2^2*(-109/(160*HarmonicSums`Private`ExpVar^10) + 197/(144*HarmonicSums`Private`ExpVar^9) + 7/(48*HarmonicSums`Private`ExpVar^8) - 17/(48*HarmonicSums`Private`ExpVar^7) - 5/(96*HarmonicSums`Private`ExpVar^6) + 13/(48*HarmonicSums`Private`ExpVar^5) - 7/(32*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) + (19*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (217/(32*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^6) - 7/(64*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(2*li5half + 105341/(28800*HarmonicSums`Private`ExpVar^10) - 69343/(25920*HarmonicSums`Private`ExpVar^9) - 1295/(2304*HarmonicSums`Private`ExpVar^8) + 71/(144*HarmonicSums`Private`ExpVar^7) + 71/(576*HarmonicSums`Private`ExpVar^6) - 241/(1440*HarmonicSums`Private`ExpVar^5) - 1/(192*HarmonicSums`Private`ExpVar^4) + 1/(18*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (-527/(40*HarmonicSums`Private`ExpVar^10) + 289/(160*HarmonicSums`Private`ExpVar^8) - 17/(40*HarmonicSums`Private`ExpVar^6) + 17/(80*HarmonicSums`Private`ExpVar^4) - 17/(40*HarmonicSums`Private`ExpVar^2) + 17/(20*HarmonicSums`Private`ExpVar))*z2^2 + (15*z2*z3)/16 - (15*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (1209/(64*HarmonicSums`Private`ExpVar^10) - 663/(256*HarmonicSums`Private`ExpVar^8) + 39/(64*HarmonicSums`Private`ExpVar^6) - 39/(128*HarmonicSums`Private`ExpVar^4) + 39/(64*HarmonicSums`Private`ExpVar^2) - 39/(32*HarmonicSums`Private`ExpVar))*z5, S[-1, -3, 1, 1, HarmonicSums`Private`ExpVar] :> 2*li6half + ln2^6/36 + (-1)^HarmonicSums`Private`ExpVar*li5half* (31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (31/(60*HarmonicSums`Private`ExpVar^10) - 17/(240*HarmonicSums`Private`ExpVar^8) + 1/(60*HarmonicSums`Private`ExpVar^6) - 1/(120*HarmonicSums`Private`ExpVar^4) + 1/(60*HarmonicSums`Private`ExpVar^2) - 1/(30*HarmonicSums`Private`ExpVar)) + 382913443/(72576000*HarmonicSums`Private`ExpVar^10) - 1983779/(9331200*HarmonicSums`Private`ExpVar^9) - 214343/(276480*HarmonicSums`Private`ExpVar^8) - 23393/(120960*HarmonicSums`Private`ExpVar^7) + 16453/(34560*HarmonicSums`Private`ExpVar^6) - 21793/(86400*HarmonicSums`Private`ExpVar^5) + 163/(2304*HarmonicSums`Private`ExpVar^4) - 1/(54*HarmonicSums`Private`ExpVar^3) + s6/2 + (-105341/(28800*HarmonicSums`Private`ExpVar^10) + 69343/(25920*HarmonicSums`Private`ExpVar^9) + 1295/(2304*HarmonicSums`Private`ExpVar^8) - 71/(144*HarmonicSums`Private`ExpVar^7) - 71/(576*HarmonicSums`Private`ExpVar^6) + 241/(1440*HarmonicSums`Private`ExpVar^5) + 1/(192*HarmonicSums`Private`ExpVar^4) - 1/(18*HarmonicSums`Private`ExpVar^3))*sinf + (109/(160*HarmonicSums`Private`ExpVar^10) - 197/(144*HarmonicSums`Private`ExpVar^9) - 7/(48*HarmonicSums`Private`ExpVar^8) + 17/(48*HarmonicSums`Private`ExpVar^7) + 5/(96*HarmonicSums`Private`ExpVar^6) - 13/(48*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3))*sinf^2 - (ln2^4*z2)/12 - (29*z2^3)/280 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-31/(12*HarmonicSums`Private`ExpVar^10) + 17/(48*HarmonicSums`Private`ExpVar^8) - 1/(12*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/24) - (29*z3^2)/32 + ln2^2*(li4half - z2^2/4 + (-1)^HarmonicSums`Private`ExpVar* (217/(32*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^6) - 7/(64*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3) + z2*(li4half + 109/(160*HarmonicSums`Private`ExpVar^10) - 197/(144*HarmonicSums`Private`ExpVar^9) - 7/(48*HarmonicSums`Private`ExpVar^8) + 17/(48*HarmonicSums`Private`ExpVar^7) + 5/(96*HarmonicSums`Private`ExpVar^6) - 13/(48*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (-93/(32*HarmonicSums`Private`ExpVar^10) + 51/(128*HarmonicSums`Private`ExpVar^8) - 3/(32*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^2) + 3/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(2*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) - (z2*z3)/8 - (15*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-465/(128*HarmonicSums`Private`ExpVar^10) + 255/(512*HarmonicSums`Private`ExpVar^8) - 15/(128*HarmonicSums`Private`ExpVar^6) + 15/(256*HarmonicSums`Private`ExpVar^4) - 15/(128*HarmonicSums`Private`ExpVar^2) + 15/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, 3, -1, -1, HarmonicSums`Private`ExpVar] :> -(ln2^6/30) + (-1)^HarmonicSums`Private`ExpVar* (1493417/(193536*HarmonicSums`Private`ExpVar^10) + 1629/(3584*HarmonicSums`Private`ExpVar^9) - 3449/(3360*HarmonicSums`Private`ExpVar^8) - 119/(384*HarmonicSums`Private`ExpVar^7) + 241/(384*HarmonicSums`Private`ExpVar^6) - 65/(192*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(240*HarmonicSums`Private`ExpVar^10) - 17/(960*HarmonicSums`Private`ExpVar^8) + 1/(240*HarmonicSums`Private`ExpVar^6) - 1/(480*HarmonicSums`Private`ExpVar^4) + 1/(240*HarmonicSums`Private`ExpVar^2) - 1/(120*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/(2*HarmonicSums`Private`ExpVar^10) + 17/(8*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) + (ln2^4*z2)/3 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar))*z2 - z3^2/2 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-163/(32*HarmonicSums`Private`ExpVar^10) - 169/(48*HarmonicSums`Private`ExpVar^9) + 133/(192*HarmonicSums`Private`ExpVar^8) + 31/(48*HarmonicSums`Private`ExpVar^7) - 5/(32*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + z2^2/5 + (-1)^HarmonicSums`Private`ExpVar* (-217/(32*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^6) + 7/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3) + z2*((-1)^HarmonicSums`Private`ExpVar* (-163/(32*HarmonicSums`Private`ExpVar^10) - 169/(48*HarmonicSums`Private`ExpVar^9) + 133/(192*HarmonicSums`Private`ExpVar^8) + 31/(48*HarmonicSums`Private`ExpVar^7) - 5/(32*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-465/(32*HarmonicSums`Private`ExpVar^10) + 255/(128*HarmonicSums`Private`ExpVar^8) - 15/(32*HarmonicSums`Private`ExpVar^6) + 15/(64*HarmonicSums`Private`ExpVar^4) - 15/(32*HarmonicSums`Private`ExpVar^2) + 15/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(4*li5half + 1107/(320*HarmonicSums`Private`ExpVar^10) + 33/(32*HarmonicSums`Private`ExpVar^9) - 91/(128*HarmonicSums`Private`ExpVar^8) - 9/(32*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) + (-1)^HarmonicSums`Private`ExpVar* (-589/(160*HarmonicSums`Private`ExpVar^10) + 323/(640*HarmonicSums`Private`ExpVar^8) - 19/(160*HarmonicSums`Private`ExpVar^6) + 19/(320*HarmonicSums`Private`ExpVar^4) - 19/(160*HarmonicSums`Private`ExpVar^2) + 19/(80*HarmonicSums`Private`ExpVar))*z2^2 + (z2*z3)/2 - (27*z5)/8) + (-1)^HarmonicSums`Private`ExpVar* (9641/(256*HarmonicSums`Private`ExpVar^10) - 5287/(1024*HarmonicSums`Private`ExpVar^8) + 311/(256*HarmonicSums`Private`ExpVar^6) - 311/(512*HarmonicSums`Private`ExpVar^4) + 311/(256*HarmonicSums`Private`ExpVar^2) - 311/(128*HarmonicSums`Private`ExpVar))*z5, S[-1, 3, -1, 1, HarmonicSums`Private`ExpVar] :> ln2^6/120 + (-1)^HarmonicSums`Private`ExpVar*li5half* (31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (31/(80*HarmonicSums`Private`ExpVar^10) - 17/(320*HarmonicSums`Private`ExpVar^8) + 1/(80*HarmonicSums`Private`ExpVar^6) - 1/(160*HarmonicSums`Private`ExpVar^4) + 1/(80*HarmonicSums`Private`ExpVar^2) - 1/(40*HarmonicSums`Private`ExpVar)) + 23947/(12800*HarmonicSums`Private`ExpVar^10) + 2061/(1280*HarmonicSums`Private`ExpVar^9) - 895/(3072*HarmonicSums`Private`ExpVar^8) - 165/(448*HarmonicSums`Private`ExpVar^7) + 5/(24*HarmonicSums`Private`ExpVar^6) - 3/(160*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + (-1107/(320*HarmonicSums`Private`ExpVar^10) - 33/(32*HarmonicSums`Private`ExpVar^9) + 91/(128*HarmonicSums`Private`ExpVar^8) + 9/(32*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4))*sinf + (ln2^4*z2)/8 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar))*z2 + (11*z2^3)/80 - (169*z3^2)/128 + z2*(li4half + (-1)^HarmonicSums`Private`ExpVar* (163/(32*HarmonicSums`Private`ExpVar^10) + 169/(48*HarmonicSums`Private`ExpVar^9) - 133/(192*HarmonicSums`Private`ExpVar^8) - 31/(48*HarmonicSums`Private`ExpVar^7) + 5/(32*HarmonicSums`Private`ExpVar^6) + 5/(16*HarmonicSums`Private`ExpVar^5) - 5/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (31/(64*HarmonicSums`Private`ExpVar^10) - 17/(256*HarmonicSums`Private`ExpVar^8) + 1/(64*HarmonicSums`Private`ExpVar^6) - 1/(128*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^2) - 1/(32*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(li4half + (-1)^HarmonicSums`Private`ExpVar* (-163/(32*HarmonicSums`Private`ExpVar^10) - 169/(48*HarmonicSums`Private`ExpVar^9) + 133/(192*HarmonicSums`Private`ExpVar^8) + 31/(48*HarmonicSums`Private`ExpVar^7) - 5/(32*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) - (23*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (-217/(32*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^6) + 7/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(4*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar* (1519/(160*HarmonicSums`Private`ExpVar^10) - 833/(640*HarmonicSums`Private`ExpVar^8) + 49/(160*HarmonicSums`Private`ExpVar^6) - 49/(320*HarmonicSums`Private`ExpVar^4) + 49/(160*HarmonicSums`Private`ExpVar^2) - 49/(80*HarmonicSums`Private`ExpVar))*z2^2 + (13*z2*z3)/8 - (27*z5)/8) + (-1)^HarmonicSums`Private`ExpVar* (-837/(32*HarmonicSums`Private`ExpVar^10) + 459/(128*HarmonicSums`Private`ExpVar^8) - 27/(32*HarmonicSums`Private`ExpVar^6) + 27/(64*HarmonicSums`Private`ExpVar^4) - 27/(32*HarmonicSums`Private`ExpVar^2) + 27/(16*HarmonicSums`Private`ExpVar))*z5, S[-1, 3, 1, -1, HarmonicSums`Private`ExpVar] :> 8*li6half - ln2^6/72 + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-31/(60*HarmonicSums`Private`ExpVar^10) + 17/(240*HarmonicSums`Private`ExpVar^8) - 1/(60*HarmonicSums`Private`ExpVar^6) + 1/(120*HarmonicSums`Private`ExpVar^4) - 1/(60*HarmonicSums`Private`ExpVar^2) + 1/(30*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/(2*HarmonicSums`Private`ExpVar^10) + 17/(8*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) - 1443/(640*HarmonicSums`Private`ExpVar^10) + 2701/(5760*HarmonicSums`Private`ExpVar^9) + 775/(1536*HarmonicSums`Private`ExpVar^8) - 13/(32*HarmonicSums`Private`ExpVar^7) + 7/(48*HarmonicSums`Private`ExpVar^6) - 1/(40*HarmonicSums`Private`ExpVar^5) + (9*s6)/2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (163/(16*HarmonicSums`Private`ExpVar^10) + 169/(24*HarmonicSums`Private`ExpVar^9) - 133/(96*HarmonicSums`Private`ExpVar^8) - 31/(24*HarmonicSums`Private`ExpVar^7) + 5/(16*HarmonicSums`Private`ExpVar^6) + 5/(8*HarmonicSums`Private`ExpVar^5) - 5/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3))*sinf - (ln2^4*z2)/8 - (247*z2^3)/560 + ln2^2*(-li4half + (-1)^HarmonicSums`Private`ExpVar* (163/(32*HarmonicSums`Private`ExpVar^10) + 169/(48*HarmonicSums`Private`ExpVar^9) - 133/(192*HarmonicSums`Private`ExpVar^8) - 31/(48*HarmonicSums`Private`ExpVar^7) + 5/(32*HarmonicSums`Private`ExpVar^6) + 5/(16*HarmonicSums`Private`ExpVar^5) - 5/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) - (21*z2^2)/16) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(12*HarmonicSums`Private`ExpVar^10) - 17/(48*HarmonicSums`Private`ExpVar^8) + 1/(12*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/24) - (217*z3^2)/128 + z2*(-li4half + (-1)^HarmonicSums`Private`ExpVar* (31/(64*HarmonicSums`Private`ExpVar^10) - 17/(256*HarmonicSums`Private`ExpVar^8) + 1/(64*HarmonicSums`Private`ExpVar^6) - 1/(128*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^2) - 1/(32*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (3875/(256*HarmonicSums`Private`ExpVar^10) - 2125/(1024*HarmonicSums`Private`ExpVar^8) + 125/(256*HarmonicSums`Private`ExpVar^6) - 125/(512*HarmonicSums`Private`ExpVar^4) + 125/(256*HarmonicSums`Private`ExpVar^2) - 125/(128*HarmonicSums`Private`ExpVar))*z5 + ln2*(-2*li5half + (-1)^HarmonicSums`Private`ExpVar* (-1823/(1152*HarmonicSums`Private`ExpVar^10) - 3653/(576*HarmonicSums`Private`ExpVar^9) + 7/(1152*HarmonicSums`Private`ExpVar^8) + 113/(144*HarmonicSums`Private`ExpVar^7) + 13/(192*HarmonicSums`Private`ExpVar^6) - 13/(96*HarmonicSums`Private`ExpVar^5) - 5/(48*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/(2*HarmonicSums`Private`ExpVar^10) + 17/(8*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar* (93/(32*HarmonicSums`Private`ExpVar^10) - 51/(128*HarmonicSums`Private`ExpVar^8) + 3/(32*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^2) - 3/(16*HarmonicSums`Private`ExpVar))*z2^2 - z2*z3 + (125*z5)/64), S[-1, 3, 1, 1, HarmonicSums`Private`ExpVar] :> -4*li6half + ln2^6/90 + (-1)^HarmonicSums`Private`ExpVar* (6589937/(725760*HarmonicSums`Private`ExpVar^10) - 268577/(120960*HarmonicSums`Private`ExpVar^9) - 579781/(483840*HarmonicSums`Private`ExpVar^8) + 233/(4320*HarmonicSums`Private`ExpVar^7) + 6199/(11520*HarmonicSums`Private`ExpVar^6) - 407/(1152*HarmonicSums`Private`ExpVar^5) + 43/(288*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) - (5*s6)/4 + (-1)^HarmonicSums`Private`ExpVar* (1823/(1152*HarmonicSums`Private`ExpVar^10) + 3653/(576*HarmonicSums`Private`ExpVar^9) - 7/(1152*HarmonicSums`Private`ExpVar^8) - 113/(144*HarmonicSums`Private`ExpVar^7) - 13/(192*HarmonicSums`Private`ExpVar^6) + 13/(96*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3))*sinf + (-1)^HarmonicSums`Private`ExpVar* (-163/(32*HarmonicSums`Private`ExpVar^10) - 169/(48*HarmonicSums`Private`ExpVar^9) + 133/(192*HarmonicSums`Private`ExpVar^8) + 31/(48*HarmonicSums`Private`ExpVar^7) - 5/(32*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3))*sinf^2 - (ln2^4*z2)/12 + (23*z2^3)/80 + (7*ln2^3*z3)/24 + (47*z3^2)/64 + z2*((-1)^HarmonicSums`Private`ExpVar* (-163/(32*HarmonicSums`Private`ExpVar^10) - 169/(48*HarmonicSums`Private`ExpVar^9) + 133/(192*HarmonicSums`Private`ExpVar^8) + 31/(48*HarmonicSums`Private`ExpVar^7) - 5/(32*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar*(31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))* z5 + ln2*(-2*li5half - (3*z2*z3)/8 + (125*z5)/64), S[-1, -2, -2, -1, HarmonicSums`Private`ExpVar] :> -(ln2^6/10) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-31/(40*HarmonicSums`Private`ExpVar^10) + 17/(160*HarmonicSums`Private`ExpVar^8) - 1/(40*HarmonicSums`Private`ExpVar^6) + 1/(80*HarmonicSums`Private`ExpVar^4) - 1/(40*HarmonicSums`Private`ExpVar^2) + 1/(20*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-62/HarmonicSums`Private`ExpVar^10 + 17/(2*HarmonicSums`Private`ExpVar^8) - 2/HarmonicSums`Private`ExpVar^6 + HarmonicSums`Private`ExpVar^(-4) - 2/HarmonicSums`Private`ExpVar^2 + 4/HarmonicSums`Private`ExpVar) + 24359/(67200*HarmonicSums`Private`ExpVar^10) + 26561/(30240*HarmonicSums`Private`ExpVar^9) - 1/(144*HarmonicSums`Private`ExpVar^8) - 47/(105*HarmonicSums`Private`ExpVar^7) + 101/(288*HarmonicSums`Private`ExpVar^6) - 7/(48*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 4*li4half*z2 + (ln2^4*z2)/6 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (31/(12*HarmonicSums`Private`ExpVar^10) - 17/(48*HarmonicSums`Private`ExpVar^8) + 1/(12*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar))*z2 + (183*z2^3)/140 + ln2^2*(-4*li4half - (73*z2^2)/40) + (-173/(64*HarmonicSums`Private`ExpVar^10) - 1/(4*HarmonicSums`Private`ExpVar^9) + 95/(192*HarmonicSums`Private`ExpVar^8) + 25/(336*HarmonicSums`Private`ExpVar^7) - 35/(192*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^5) + 15/(64*HarmonicSums`Private`ExpVar^4) - 25/(96*HarmonicSums`Private`ExpVar^3) + 5/(32*HarmonicSums`Private`ExpVar^2))*z3 + (25*z3^2)/128 + (-1)^HarmonicSums`Private`ExpVar* (3813/(64*HarmonicSums`Private`ExpVar^10) - 2091/(256*HarmonicSums`Private`ExpVar^8) + 123/(64*HarmonicSums`Private`ExpVar^6) - 123/(128*HarmonicSums`Private`ExpVar^4) + 123/(64*HarmonicSums`Private`ExpVar^2) - 123/(32*HarmonicSums`Private`ExpVar))*z5 + ln2*(-8*li5half + (-1)^HarmonicSums`Private`ExpVar* (1493/(144*HarmonicSums`Private`ExpVar^10) + 11/(8*HarmonicSums`Private`ExpVar^9) - 305/(192*HarmonicSums`Private`ExpVar^8) - 13/(48*HarmonicSums`Private`ExpVar^7) + 65/(96*HarmonicSums`Private`ExpVar^6) - 17/(48*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (-589/(80*HarmonicSums`Private`ExpVar^10) + 323/(320*HarmonicSums`Private`ExpVar^8) - 19/(80*HarmonicSums`Private`ExpVar^6) + 19/(160*HarmonicSums`Private`ExpVar^4) - 19/(80*HarmonicSums`Private`ExpVar^2) + 19/(40*HarmonicSums`Private`ExpVar))*z2^2 + z2*(519/(80*HarmonicSums`Private`ExpVar^10) + 3/(5*HarmonicSums`Private`ExpVar^9) - 19/(16*HarmonicSums`Private`ExpVar^8) - 5/(28*HarmonicSums`Private`ExpVar^7) + 7/(16*HarmonicSums`Private`ExpVar^6) + 1/(10*HarmonicSums`Private`ExpVar^5) - 9/(16*HarmonicSums`Private`ExpVar^4) + 5/(8*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) - (15*z3)/16) + (123*z5)/16), S[-1, -2, -2, 1, HarmonicSums`Private`ExpVar] :> -12*li6half - ln2^6/30 + (-1)^HarmonicSums`Private`ExpVar* (35485/(5184*HarmonicSums`Private`ExpVar^10) + 857/(336*HarmonicSums`Private`ExpVar^9) - 12811/(16128*HarmonicSums`Private`ExpVar^8) - 109/(288*HarmonicSums`Private`ExpVar^7) + 247/(1152*HarmonicSums`Private`ExpVar^6) + 5/(576*HarmonicSums`Private`ExpVar^5) - 1/(36*HarmonicSums`Private`ExpVar^4)) - (9*s6)/2 + (-1)^HarmonicSums`Private`ExpVar* (-1493/(144*HarmonicSums`Private`ExpVar^10) - 11/(8*HarmonicSums`Private`ExpVar^9) + 305/(192*HarmonicSums`Private`ExpVar^8) + 13/(48*HarmonicSums`Private`ExpVar^7) - 65/(96*HarmonicSums`Private`ExpVar^6) + 17/(48*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^4))*sinf + (ln2^4*z2)/6 + (45*z2^3)/56 + ln2^2*(-2*li4half - z2^2/2) + (-173/(64*HarmonicSums`Private`ExpVar^10) - 1/(4*HarmonicSums`Private`ExpVar^9) + 95/(192*HarmonicSums`Private`ExpVar^8) + 25/(336*HarmonicSums`Private`ExpVar^7) - 35/(192*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^5) + 15/(64*HarmonicSums`Private`ExpVar^4) - 25/(96*HarmonicSums`Private`ExpVar^3) + 5/(32*HarmonicSums`Private`ExpVar^2))*z3 + (17*z3^2)/16 + z2*(2*li4half + (-1)^HarmonicSums`Private`ExpVar* (-465/(64*HarmonicSums`Private`ExpVar^10) + 255/(256*HarmonicSums`Private`ExpVar^8) - 15/(64*HarmonicSums`Private`ExpVar^6) + 15/(128*HarmonicSums`Private`ExpVar^4) - 15/(64*HarmonicSums`Private`ExpVar^2) + 15/(32*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (899/(128*HarmonicSums`Private`ExpVar^10) - 493/(512*HarmonicSums`Private`ExpVar^8) + 29/(128*HarmonicSums`Private`ExpVar^6) - 29/(256*HarmonicSums`Private`ExpVar^4) + 29/(128*HarmonicSums`Private`ExpVar^2) - 29/(64*HarmonicSums`Private`ExpVar))*z5 + ln2*(-8*li5half + (15*z2*z3)/16 + (123*z5)/16), S[-1, -2, 2, -1, HarmonicSums`Private`ExpVar] :> -16*li6half + ln2^6/90 + (-1)^HarmonicSums`Private`ExpVar* (-78833/(23040*HarmonicSums`Private`ExpVar^10) + 32461/(26880*HarmonicSums`Private`ExpVar^9) + 1499/(2688*HarmonicSums`Private`ExpVar^8) - 257/(480*HarmonicSums`Private`ExpVar^7) + 61/(320*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-31/(120*HarmonicSums`Private`ExpVar^10) + 17/(480*HarmonicSums`Private`ExpVar^8) - 1/(120*HarmonicSums`Private`ExpVar^6) + 1/(240*HarmonicSums`Private`ExpVar^4) - 1/(120*HarmonicSums`Private`ExpVar^2) + 1/(60*HarmonicSums`Private`ExpVar)) - 8*s6 + (76*z2^3)/35 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(12*HarmonicSums`Private`ExpVar^10) - 17/(48*HarmonicSums`Private`ExpVar^8) + 1/(12*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar))*z2 - (7*z3)/12) + (173/(160*HarmonicSums`Private`ExpVar^10) + 1/(10*HarmonicSums`Private`ExpVar^9) - 19/(96*HarmonicSums`Private`ExpVar^8) - 5/(168*HarmonicSums`Private`ExpVar^7) + 7/(96*HarmonicSums`Private`ExpVar^6) + 1/(60*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z3 + (-1)^HarmonicSums`Private`ExpVar* (-341/(32*HarmonicSums`Private`ExpVar^10) + 187/(128*HarmonicSums`Private`ExpVar^8) - 11/(32*HarmonicSums`Private`ExpVar^6) + 11/(64*HarmonicSums`Private`ExpVar^4) - 11/(32*HarmonicSums`Private`ExpVar^2) + 11/(16*HarmonicSums`Private`ExpVar))*z2*z3 + (45*z3^2)/16 + ln2^2*((113*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (-217/(16*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^6) + 7/(32*HarmonicSums`Private`ExpVar^4) - 7/(16*HarmonicSums`Private`ExpVar^2) + 7/(8*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (-1023/(128*HarmonicSums`Private`ExpVar^10) + 561/(512*HarmonicSums`Private`ExpVar^8) - 33/(128*HarmonicSums`Private`ExpVar^6) + 33/(256*HarmonicSums`Private`ExpVar^4) - 33/(128*HarmonicSums`Private`ExpVar^2) + 33/(64*HarmonicSums`Private`ExpVar))*z5 + ln2*(-4*li5half + 162031/(33600*HarmonicSums`Private`ExpVar^10) - 12125/(6048*HarmonicSums`Private`ExpVar^9) - 1123/(1152*HarmonicSums`Private`ExpVar^8) + 829/(1680*HarmonicSums`Private`ExpVar^7) + 77/(144*HarmonicSums`Private`ExpVar^6) - 47/(60*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (589/(80*HarmonicSums`Private`ExpVar^10) - 323/(320*HarmonicSums`Private`ExpVar^8) + 19/(80*HarmonicSums`Private`ExpVar^6) - 19/(160*HarmonicSums`Private`ExpVar^4) + 19/(80*HarmonicSums`Private`ExpVar^2) - 19/(40*HarmonicSums`Private`ExpVar))*z2^2 + z2*(-519/(80*HarmonicSums`Private`ExpVar^10) - 3/(5*HarmonicSums`Private`ExpVar^9) + 19/(16*HarmonicSums`Private`ExpVar^8) + 5/(28*HarmonicSums`Private`ExpVar^7) - 7/(16*HarmonicSums`Private`ExpVar^6) - 1/(10*HarmonicSums`Private`ExpVar^5) + 9/(16*HarmonicSums`Private`ExpVar^4) - 5/(8*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - (19*z3)/16) + (89*z5)/64), S[-1, -2, 2, 1, HarmonicSums`Private`ExpVar] :> -4*li6half - ln2^6/18 + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-31/(30*HarmonicSums`Private`ExpVar^10) + 17/(120*HarmonicSums`Private`ExpVar^8) - 1/(30*HarmonicSums`Private`ExpVar^6) + 1/(60*HarmonicSums`Private`ExpVar^4) - 1/(30*HarmonicSums`Private`ExpVar^2) + 1/(15*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) + 256997959/(84672000*HarmonicSums`Private`ExpVar^10) + 9657539/(15240960*HarmonicSums`Private`ExpVar^9) - 5585/(21504*HarmonicSums`Private`ExpVar^8) - 110123/(352800*HarmonicSums`Private`ExpVar^7) - 7/(120*HarmonicSums`Private`ExpVar^6) + 1759/(3600*HarmonicSums`Private`ExpVar^5) - 47/(96*HarmonicSums`Private`ExpVar^4) + 2/(9*HarmonicSums`Private`ExpVar^3) - (7*s6)/4 + (-162031/(33600*HarmonicSums`Private`ExpVar^10) + 12125/(6048*HarmonicSums`Private`ExpVar^9) + 1123/(1152*HarmonicSums`Private`ExpVar^8) - 829/(1680*HarmonicSums`Private`ExpVar^7) - 77/(144*HarmonicSums`Private`ExpVar^6) + 47/(60*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3))*sinf + (ln2^4*z2)/6 + (589*z2^3)/560 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(6*HarmonicSums`Private`ExpVar^10) - 17/(24*HarmonicSums`Private`ExpVar^8) + 1/(6*HarmonicSums`Private`ExpVar^6) - 1/(12*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^2) - 1/(3*HarmonicSums`Private`ExpVar))*z2 - (7*z3)/12) + (173/(20*HarmonicSums`Private`ExpVar^10) + 4/(5*HarmonicSums`Private`ExpVar^9) - 19/(12*HarmonicSums`Private`ExpVar^8) - 5/(21*HarmonicSums`Private`ExpVar^7) + 7/(12*HarmonicSums`Private`ExpVar^6) + 2/(15*HarmonicSums`Private`ExpVar^5) - 3/(4*HarmonicSums`Private`ExpVar^4) + 5/(6*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2))*z3 + (99*z3^2)/32 + z2*(-2*li4half + (-1)^HarmonicSums`Private`ExpVar* (217/(16*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^6) - 7/(32*HarmonicSums`Private`ExpVar^4) + 7/(16*HarmonicSums`Private`ExpVar^2) - 7/(8*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(-2*li4half + z2^2/2 + (-1)^HarmonicSums`Private`ExpVar* (-217/(16*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^6) + 7/(32*HarmonicSums`Private`ExpVar^4) - 7/(16*HarmonicSums`Private`ExpVar^2) + 7/(8*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (2759/(256*HarmonicSums`Private`ExpVar^10) - 1513/(1024*HarmonicSums`Private`ExpVar^8) + 89/(256*HarmonicSums`Private`ExpVar^6) - 89/(512*HarmonicSums`Private`ExpVar^4) + 89/(256*HarmonicSums`Private`ExpVar^2) - 89/(128*HarmonicSums`Private`ExpVar))*z5 + ln2*(-4*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) - (7*z2*z3)/4 + (89*z5)/64), S[-1, -2, -1, -2, HarmonicSums`Private`ExpVar] :> 24*li6half + ln2^6/15 + (-1)^HarmonicSums`Private`ExpVar*li5half* (124/HarmonicSums`Private`ExpVar^10 - 17/HarmonicSums`Private`ExpVar^8 + 4/HarmonicSums`Private`ExpVar^6 - 2/HarmonicSums`Private`ExpVar^4 + 4/HarmonicSums`Private`ExpVar^2 - 8/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (31/(20*HarmonicSums`Private`ExpVar^10) - 17/(80*HarmonicSums`Private`ExpVar^8) + 1/(20*HarmonicSums`Private`ExpVar^6) - 1/(40*HarmonicSums`Private`ExpVar^4) + 1/(20*HarmonicSums`Private`ExpVar^2) - 1/(10*HarmonicSums`Private`ExpVar)) - 10103/(22400*HarmonicSums`Private`ExpVar^10) + 22853/(20160*HarmonicSums`Private`ExpVar^9) + 301/(2304*HarmonicSums`Private`ExpVar^8) - 139/(240*HarmonicSums`Private`ExpVar^7) + 115/(288*HarmonicSums`Private`ExpVar^6) - 37/(240*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + 13*s6 - (ln2^4*z2)/6 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (-31/(6*HarmonicSums`Private`ExpVar^10) + 17/(24*HarmonicSums`Private`ExpVar^8) - 1/(6*HarmonicSums`Private`ExpVar^6) + 1/(12*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^2) + 1/(3*HarmonicSums`Private`ExpVar))* z2 - (13*z2^3)/5 + ln2^2*(4*li4half + (3*z2^2)/8) + (2249/(320*HarmonicSums`Private`ExpVar^10) + 13/(20*HarmonicSums`Private`ExpVar^9) - 247/(192*HarmonicSums`Private`ExpVar^8) - 65/(336*HarmonicSums`Private`ExpVar^7) + 91/(192*HarmonicSums`Private`ExpVar^6) + 13/(120*HarmonicSums`Private`ExpVar^5) - 39/(64*HarmonicSums`Private`ExpVar^4) + 65/(96*HarmonicSums`Private`ExpVar^3) - 13/(32*HarmonicSums`Private`ExpVar^2))*z3 - (455*z3^2)/128 + z2*((-1)^HarmonicSums`Private`ExpVar* (11/(160*HarmonicSums`Private`ExpVar^10) + 883/(420*HarmonicSums`Private`ExpVar^9) - 1/(896*HarmonicSums`Private`ExpVar^8) - 383/(960*HarmonicSums`Private`ExpVar^7) - 7/(480*HarmonicSums`Private`ExpVar^6) + 11/(48*HarmonicSums`Private`ExpVar^5) - 17/(96*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (403/(64*HarmonicSums`Private`ExpVar^10) - 221/(256*HarmonicSums`Private`ExpVar^8) + 13/(64*HarmonicSums`Private`ExpVar^6) - 13/(128*HarmonicSums`Private`ExpVar^4) + 13/(64*HarmonicSums`Private`ExpVar^2) - 13/(32*HarmonicSums`Private`ExpVar))*z3) + ln2*(16*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (62/HarmonicSums`Private`ExpVar^10 - 17/(2*HarmonicSums`Private`ExpVar^8) + 2/HarmonicSums`Private`ExpVar^6 - HarmonicSums`Private`ExpVar^(-4) + 2/HarmonicSums`Private`ExpVar^2 - 4/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (527/(20*HarmonicSums`Private`ExpVar^10) - 289/(80*HarmonicSums`Private`ExpVar^8) + 17/(20*HarmonicSums`Private`ExpVar^6) - 17/(40*HarmonicSums`Private`ExpVar^4) + 17/(20*HarmonicSums`Private`ExpVar^2) - 17/(10*HarmonicSums`Private`ExpVar))*z2^2 + z2*(-173/(40*HarmonicSums`Private`ExpVar^10) - 2/(5*HarmonicSums`Private`ExpVar^9) + 19/(24*HarmonicSums`Private`ExpVar^8) + 5/(42*HarmonicSums`Private`ExpVar^7) - 7/(24*HarmonicSums`Private`ExpVar^6) - 1/(15*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 5/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - (13*z3)/8) - (547*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-16957/(128*HarmonicSums`Private`ExpVar^10) + 9299/(512*HarmonicSums`Private`ExpVar^8) - 547/(128*HarmonicSums`Private`ExpVar^6) + 547/(256*HarmonicSums`Private`ExpVar^4) - 547/(128*HarmonicSums`Private`ExpVar^2) + 547/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, -2, -1, 2, HarmonicSums`Private`ExpVar] :> 48*li6half - ln2^6/15 + (-1)^HarmonicSums`Private`ExpVar* (901841/(120960*HarmonicSums`Private`ExpVar^10) + 7567/(2880*HarmonicSums`Private`ExpVar^9) - 6449/(5760*HarmonicSums`Private`ExpVar^8) - 559/(720*HarmonicSums`Private`ExpVar^7) + 829/(960*HarmonicSums`Private`ExpVar^6) - 37/(96*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^4)) + 26*s6 + (5*ln2^4*z2)/12 - (39*ln2^2*z2^2)/10 - (421*z2^3)/70 + (-173/(40*HarmonicSums`Private`ExpVar^10) - 2/(5*HarmonicSums`Private`ExpVar^9) + 19/(24*HarmonicSums`Private`ExpVar^8) + 5/(42*HarmonicSums`Private`ExpVar^7) - 7/(24*HarmonicSums`Private`ExpVar^6) - 1/(15*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 5/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z3 - (95*z3^2)/8 + z2*(2*li4half + (-1)^HarmonicSums`Private`ExpVar* (-11/(80*HarmonicSums`Private`ExpVar^10) - 883/(210*HarmonicSums`Private`ExpVar^9) + 1/(448*HarmonicSums`Private`ExpVar^8) + 383/(480*HarmonicSums`Private`ExpVar^7) + 7/(240*HarmonicSums`Private`ExpVar^6) - 11/(24*HarmonicSums`Private`ExpVar^5) + 17/(48*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-775/(32*HarmonicSums`Private`ExpVar^10) + 425/(128*HarmonicSums`Private`ExpVar^8) - 25/(32*HarmonicSums`Private`ExpVar^6) + 25/(64*HarmonicSums`Private`ExpVar^4) - 25/(32*HarmonicSums`Private`ExpVar^2) + 25/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(16*li5half + (-1)^HarmonicSums`Private`ExpVar* (-93/(32*HarmonicSums`Private`ExpVar^10) + 51/(128*HarmonicSums`Private`ExpVar^8) - 3/(32*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^2) + 3/(16*HarmonicSums`Private`ExpVar))*z2^2 + z2*(173/(80*HarmonicSums`Private`ExpVar^10) + 1/(5*HarmonicSums`Private`ExpVar^9) - 19/(48*HarmonicSums`Private`ExpVar^8) - 5/(84*HarmonicSums`Private`ExpVar^7) + 7/(48*HarmonicSums`Private`ExpVar^6) + 1/(30*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (37*z3)/16) - (547*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (11253/(256*HarmonicSums`Private`ExpVar^10) - 6171/(1024*HarmonicSums`Private`ExpVar^8) + 363/(256*HarmonicSums`Private`ExpVar^6) - 363/(512*HarmonicSums`Private`ExpVar^4) + 363/(256*HarmonicSums`Private`ExpVar^2) - 363/(128*HarmonicSums`Private`ExpVar))*z5, S[-1, -2, 1, -2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-651/(128*HarmonicSums`Private`ExpVar^10) + 71/(64*HarmonicSums`Private`ExpVar^9) + 105/(128*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^7) + 13/(64*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5)) + s6 + (ln2^4*z2)/48 + (-173/(80*HarmonicSums`Private`ExpVar^10) - 1/(5*HarmonicSums`Private`ExpVar^9) + 19/(48*HarmonicSums`Private`ExpVar^8) + 5/(84*HarmonicSums`Private`ExpVar^7) - 7/(48*HarmonicSums`Private`ExpVar^6) - 1/(30*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*sinf*z2 - (ln2^2*z2^2)/8 - (279*z2^3)/560 + (-173/(320*HarmonicSums`Private`ExpVar^10) - 1/(20*HarmonicSums`Private`ExpVar^9) + 19/(192*HarmonicSums`Private`ExpVar^8) + 5/(336*HarmonicSums`Private`ExpVar^7) - 7/(192*HarmonicSums`Private`ExpVar^6) - 1/(120*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) - 5/(96*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2))*z3 - (61*z3^2)/128 + z2*(li4half/2 + 238/(75*HarmonicSums`Private`ExpVar^10) + 56641/(75600*HarmonicSums`Private`ExpVar^9) - 239/(504*HarmonicSums`Private`ExpVar^8) - 5783/(35280*HarmonicSums`Private`ExpVar^7) + 23/(180*HarmonicSums`Private`ExpVar^6) + 221/(3600*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^4) - 1/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-31/(64*HarmonicSums`Private`ExpVar^10) + 17/(256*HarmonicSums`Private`ExpVar^8) - 1/(64*HarmonicSums`Private`ExpVar^6) + 1/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^2) + 1/(32*HarmonicSums`Private`ExpVar))*z3) + ln2*((z2*z3)/8 + (53*z5)/64) + (-1)^HarmonicSums`Private`ExpVar* (-155/(32*HarmonicSums`Private`ExpVar^10) + 85/(128*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^2) + 5/(16*HarmonicSums`Private`ExpVar))*z5, S[-1, -2, 1, 2, HarmonicSums`Private`ExpVar] :> 38392477/(7056000*HarmonicSums`Private`ExpVar^10) - 7596319/(6350400*HarmonicSums`Private`ExpVar^9) - 35659/(34560*HarmonicSums`Private`ExpVar^8) + 142/(1575*HarmonicSums`Private`ExpVar^7) + 751/(864*HarmonicSums`Private`ExpVar^6) - 667/(720*HarmonicSums`Private`ExpVar^5) + 17/(32*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) - (11*s6)/4 - (ln2^4*z2)/24 + (173/(40*HarmonicSums`Private`ExpVar^10) + 2/(5*HarmonicSums`Private`ExpVar^9) - 19/(24*HarmonicSums`Private`ExpVar^8) - 5/(42*HarmonicSums`Private`ExpVar^7) + 7/(24*HarmonicSums`Private`ExpVar^6) + 1/(15*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 5/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*sinf*z2 + (ln2^2*z2^2)/4 + (261*z2^3)/560 + (-173/(40*HarmonicSums`Private`ExpVar^10) - 2/(5*HarmonicSums`Private`ExpVar^9) + 19/(24*HarmonicSums`Private`ExpVar^8) + 5/(42*HarmonicSums`Private`ExpVar^7) - 7/(24*HarmonicSums`Private`ExpVar^6) - 1/(15*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 5/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z3 + (119*z3^2)/128 + z2*(-li4half - 476/(75*HarmonicSums`Private`ExpVar^10) - 56641/(37800*HarmonicSums`Private`ExpVar^9) + 239/(252*HarmonicSums`Private`ExpVar^8) + 5783/(17640*HarmonicSums`Private`ExpVar^7) - 23/(90*HarmonicSums`Private`ExpVar^6) - 221/(1800*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^4) + 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-31/(64*HarmonicSums`Private`ExpVar^10) + 17/(256*HarmonicSums`Private`ExpVar^8) - 1/(64*HarmonicSums`Private`ExpVar^6) + 1/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^2) + 1/(32*HarmonicSums`Private`ExpVar))*z3) + ln2*((z2*z3)/8 + (53*z5)/64) + (-1)^HarmonicSums`Private`ExpVar* (1643/(256*HarmonicSums`Private`ExpVar^10) - 901/(1024*HarmonicSums`Private`ExpVar^8) + 53/(256*HarmonicSums`Private`ExpVar^6) - 53/(512*HarmonicSums`Private`ExpVar^4) + 53/(256*HarmonicSums`Private`ExpVar^2) - 53/(128*HarmonicSums`Private`ExpVar))*z5, S[-1, 2, -2, -1, HarmonicSums`Private`ExpVar] :> 16*li6half - ln2^6/90 + (-1)^HarmonicSums`Private`ExpVar* (1614973/(483840*HarmonicSums`Private`ExpVar^10) + 64513/(80640*HarmonicSums`Private`ExpVar^9) - 3869/(10080*HarmonicSums`Private`ExpVar^8) - 109/(288*HarmonicSums`Private`ExpVar^7) + 197/(480*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(120*HarmonicSums`Private`ExpVar^10) - 17/(480*HarmonicSums`Private`ExpVar^8) + 1/(120*HarmonicSums`Private`ExpVar^6) - 1/(240*HarmonicSums`Private`ExpVar^4) + 1/(120*HarmonicSums`Private`ExpVar^2) - 1/(60*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) + 4*s6 - (20*z2^3)/7 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-31/(12*HarmonicSums`Private`ExpVar^10) + 17/(48*HarmonicSums`Private`ExpVar^8) - 1/(12*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/12) + (-1)^HarmonicSums`Private`ExpVar* (-2297/(192*HarmonicSums`Private`ExpVar^10) + 103/(28*HarmonicSums`Private`ExpVar^9) + 2215/(1344*HarmonicSums`Private`ExpVar^8) - 31/(48*HarmonicSums`Private`ExpVar^7) - 77/(192*HarmonicSums`Private`ExpVar^6) + 5/(24*HarmonicSums`Private`ExpVar^5) + 55/(192*HarmonicSums`Private`ExpVar^4) - 15/(32*HarmonicSums`Private`ExpVar^3) + 5/(16*HarmonicSums`Private`ExpVar^2))*z3 + (-1)^HarmonicSums`Private`ExpVar* (217/(16*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^6) - 7/(32*HarmonicSums`Private`ExpVar^4) + 7/(16*HarmonicSums`Private`ExpVar^2) - 7/(8*HarmonicSums`Private`ExpVar))*z2*z3 - (33*z3^2)/32 + ln2^2*((-19*z2^2)/20 + (-1)^HarmonicSums`Private`ExpVar* (217/(16*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^6) - 7/(32*HarmonicSums`Private`ExpVar^4) + 7/(16*HarmonicSums`Private`ExpVar^2) - 7/(8*HarmonicSums`Private`ExpVar))*z3) + ln2*(4*li5half + 237/(64*HarmonicSums`Private`ExpVar^10) + 2909/(1440*HarmonicSums`Private`ExpVar^9) - 323/(384*HarmonicSums`Private`ExpVar^8) - 53/(112*HarmonicSums`Private`ExpVar^7) + 7/(12*HarmonicSums`Private`ExpVar^6) - 11/(40*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) + (-1)^HarmonicSums`Private`ExpVar* (-3503/(160*HarmonicSums`Private`ExpVar^10) + 1921/(640*HarmonicSums`Private`ExpVar^8) - 113/(160*HarmonicSums`Private`ExpVar^6) + 113/(320*HarmonicSums`Private`ExpVar^4) - 113/(160*HarmonicSums`Private`ExpVar^2) + 113/(80*HarmonicSums`Private`ExpVar))*z2^2 + z2*((-1)^HarmonicSums`Private`ExpVar* (2297/(80*HarmonicSums`Private`ExpVar^10) - 309/(35*HarmonicSums`Private`ExpVar^9) - 443/(112*HarmonicSums`Private`ExpVar^8) + 31/(20*HarmonicSums`Private`ExpVar^7) + 77/(80*HarmonicSums`Private`ExpVar^6) - 1/(2*HarmonicSums`Private`ExpVar^5) - 11/(16*HarmonicSums`Private`ExpVar^4) + 9/(8*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2)) + (11*z3)/8) - (33*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (2759/(256*HarmonicSums`Private`ExpVar^10) - 1513/(1024*HarmonicSums`Private`ExpVar^8) + 89/(256*HarmonicSums`Private`ExpVar^6) - 89/(512*HarmonicSums`Private`ExpVar^4) + 89/(256*HarmonicSums`Private`ExpVar^2) - 89/(128*HarmonicSums`Private`ExpVar))*z5, S[-1, 2, -2, 1, HarmonicSums`Private`ExpVar] :> 4*li6half + ln2^6/18 + (-1)^HarmonicSums`Private`ExpVar*li5half* (31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (31/(30*HarmonicSums`Private`ExpVar^10) - 17/(120*HarmonicSums`Private`ExpVar^8) + 1/(30*HarmonicSums`Private`ExpVar^6) - 1/(60*HarmonicSums`Private`ExpVar^4) + 1/(30*HarmonicSums`Private`ExpVar^2) - 1/(15*HarmonicSums`Private`ExpVar)) + 45379/(23040*HarmonicSums`Private`ExpVar^10) + 8540629/(3628800*HarmonicSums`Private`ExpVar^9) - 26989/(64512*HarmonicSums`Private`ExpVar^8) - 9211/(23520*HarmonicSums`Private`ExpVar^7) + 599/(2880*HarmonicSums`Private`ExpVar^6) - 11/(800*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + s6 + (-237/(64*HarmonicSums`Private`ExpVar^10) - 2909/(1440*HarmonicSums`Private`ExpVar^9) + 323/(384*HarmonicSums`Private`ExpVar^8) + 53/(112*HarmonicSums`Private`ExpVar^7) - 7/(12*HarmonicSums`Private`ExpVar^6) + 11/(40*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4))*sinf - (ln2^4*z2)/6 - (153*z2^3)/280 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-31/(6*HarmonicSums`Private`ExpVar^10) + 17/(24*HarmonicSums`Private`ExpVar^8) - 1/(6*HarmonicSums`Private`ExpVar^6) + 1/(12*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^2) + 1/(3*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/12) + (-1)^HarmonicSums`Private`ExpVar* (-2297/(192*HarmonicSums`Private`ExpVar^10) + 103/(28*HarmonicSums`Private`ExpVar^9) + 2215/(1344*HarmonicSums`Private`ExpVar^8) - 31/(48*HarmonicSums`Private`ExpVar^7) - 77/(192*HarmonicSums`Private`ExpVar^6) + 5/(24*HarmonicSums`Private`ExpVar^5) + 55/(192*HarmonicSums`Private`ExpVar^4) - 15/(32*HarmonicSums`Private`ExpVar^3) + 5/(16*HarmonicSums`Private`ExpVar^2))*z3 - (303*z3^2)/128 + ln2^2*(2*li4half - z2^2/2 + (-1)^HarmonicSums`Private`ExpVar* (217/(16*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^6) - 7/(32*HarmonicSums`Private`ExpVar^4) + 7/(16*HarmonicSums`Private`ExpVar^2) - 7/(8*HarmonicSums`Private`ExpVar))*z3) + z2*(2*li4half + (-1)^HarmonicSums`Private`ExpVar* (-403/(64*HarmonicSums`Private`ExpVar^10) + 221/(256*HarmonicSums`Private`ExpVar^8) - 13/(64*HarmonicSums`Private`ExpVar^6) + 13/(128*HarmonicSums`Private`ExpVar^4) - 13/(64*HarmonicSums`Private`ExpVar^2) + 13/(32*HarmonicSums`Private`ExpVar))*z3) + ln2*(4*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (13*z2*z3)/16 - (33*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-1023/(128*HarmonicSums`Private`ExpVar^10) + 561/(512*HarmonicSums`Private`ExpVar^8) - 33/(128*HarmonicSums`Private`ExpVar^6) + 33/(256*HarmonicSums`Private`ExpVar^4) - 33/(128*HarmonicSums`Private`ExpVar^2) + 33/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, 2, 2, -1, HarmonicSums`Private`ExpVar] :> ln2^6/10 + (-1)^HarmonicSums`Private`ExpVar*li5half* (62/HarmonicSums`Private`ExpVar^10 - 17/(2*HarmonicSums`Private`ExpVar^8) + 2/HarmonicSums`Private`ExpVar^6 - HarmonicSums`Private`ExpVar^(-4) + 2/HarmonicSums`Private`ExpVar^2 - 4/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (31/(40*HarmonicSums`Private`ExpVar^10) - 17/(160*HarmonicSums`Private`ExpVar^8) + 1/(40*HarmonicSums`Private`ExpVar^6) - 1/(80*HarmonicSums`Private`ExpVar^4) + 1/(40*HarmonicSums`Private`ExpVar^2) - 1/(20*HarmonicSums`Private`ExpVar)) - 423/(128*HarmonicSums`Private`ExpVar^10) + 809/(1440*HarmonicSums`Private`ExpVar^9) + 41/(64*HarmonicSums`Private`ExpVar^8) - 15/(32*HarmonicSums`Private`ExpVar^7) + 5/(32*HarmonicSums`Private`ExpVar^6) - 1/(40*HarmonicSums`Private`ExpVar^5) + 4*s6 - (ln2^4*z2)/6 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (-31/(12*HarmonicSums`Private`ExpVar^10) + 17/(48*HarmonicSums`Private`ExpVar^8) - 1/(12*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar))*z2 - (97*z2^3)/140 + ln2^2*(4*li4half - z2^2/20) + (-1)^HarmonicSums`Private`ExpVar* (2297/(480*HarmonicSums`Private`ExpVar^10) - 103/(70*HarmonicSums`Private`ExpVar^9) - 443/(672*HarmonicSums`Private`ExpVar^8) + 31/(120*HarmonicSums`Private`ExpVar^7) + 77/(480*HarmonicSums`Private`ExpVar^6) - 1/(12*HarmonicSums`Private`ExpVar^5) - 11/(96*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z3 - (61*z3^2)/32 + z2*(4*li4half + (-1)^HarmonicSums`Private`ExpVar* (-93/(32*HarmonicSums`Private`ExpVar^10) + 51/(128*HarmonicSums`Private`ExpVar^8) - 3/(32*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^2) + 3/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(8*li5half + (-1)^HarmonicSums`Private`ExpVar* (-8849/(5040*HarmonicSums`Private`ExpVar^10) - 18629/(2520*HarmonicSums`Private`ExpVar^9) + 493/(2880*HarmonicSums`Private`ExpVar^8) + 937/(720*HarmonicSums`Private`ExpVar^7) + 17/(96*HarmonicSums`Private`ExpVar^6) - 15/(16*HarmonicSums`Private`ExpVar^5) + 17/(24*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (3503/(160*HarmonicSums`Private`ExpVar^10) - 1921/(640*HarmonicSums`Private`ExpVar^8) + 113/(160*HarmonicSums`Private`ExpVar^6) - 113/(320*HarmonicSums`Private`ExpVar^4) + 113/(160*HarmonicSums`Private`ExpVar^2) - 113/(80*HarmonicSums`Private`ExpVar))*z2^2 + z2*((-1)^HarmonicSums`Private`ExpVar* (-2297/(80*HarmonicSums`Private`ExpVar^10) + 309/(35*HarmonicSums`Private`ExpVar^9) + 443/(112*HarmonicSums`Private`ExpVar^8) - 31/(20*HarmonicSums`Private`ExpVar^7) - 77/(80*HarmonicSums`Private`ExpVar^6) + 1/(2*HarmonicSums`Private`ExpVar^5) + 11/(16*HarmonicSums`Private`ExpVar^4) - 9/(8*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2)) + (3*z3)/4) - (125*z5)/16) + (-1)^HarmonicSums`Private`ExpVar* (-3875/(64*HarmonicSums`Private`ExpVar^10) + 2125/(256*HarmonicSums`Private`ExpVar^8) - 125/(64*HarmonicSums`Private`ExpVar^6) + 125/(128*HarmonicSums`Private`ExpVar^4) - 125/(64*HarmonicSums`Private`ExpVar^2) + 125/(32*HarmonicSums`Private`ExpVar))*z5, S[-1, 2, 2, 1, HarmonicSums`Private`ExpVar] :> 12*li6half + ln2^6/30 + (-1)^HarmonicSums`Private`ExpVar* (16624177/(1587600*HarmonicSums`Private`ExpVar^10) + 62803/(39200*HarmonicSums`Private`ExpVar^9) - 181873/(134400*HarmonicSums`Private`ExpVar^8) - 4979/(7200*HarmonicSums`Private`ExpVar^7) + 1571/(5760*HarmonicSums`Private`ExpVar^6) + 127/(192*HarmonicSums`Private`ExpVar^5) - 115/(144*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3)) + (19*s6)/4 + (-1)^HarmonicSums`Private`ExpVar* (8849/(5040*HarmonicSums`Private`ExpVar^10) + 18629/(2520*HarmonicSums`Private`ExpVar^9) - 493/(2880*HarmonicSums`Private`ExpVar^8) - 937/(720*HarmonicSums`Private`ExpVar^7) - 17/(96*HarmonicSums`Private`ExpVar^6) + 15/(16*HarmonicSums`Private`ExpVar^5) - 17/(24*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3))*sinf - 2*li4half*z2 - (ln2^4*z2)/6 - (661*z2^3)/560 + ln2^2*(2*li4half + z2^2/2) + (-1)^HarmonicSums`Private`ExpVar* (2297/(60*HarmonicSums`Private`ExpVar^10) - 412/(35*HarmonicSums`Private`ExpVar^9) - 443/(84*HarmonicSums`Private`ExpVar^8) + 31/(15*HarmonicSums`Private`ExpVar^7) + 77/(60*HarmonicSums`Private`ExpVar^6) - 2/(3*HarmonicSums`Private`ExpVar^5) - 11/(12*HarmonicSums`Private`ExpVar^4) + 3/(2*HarmonicSums`Private`ExpVar^3) - HarmonicSums`Private`ExpVar^(-2))* z3 - (119*z3^2)/64 + ln2*(8*li5half - (125*z5)/16) + (-1)^HarmonicSums`Private`ExpVar*(-31/(2*HarmonicSums`Private`ExpVar^10) + 17/(8*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1))* z5, S[-1, 2, -1, -2, HarmonicSums`Private`ExpVar] :> -48*li6half + ln2^6/15 + (-1)^HarmonicSums`Private`ExpVar* (316933/(120960*HarmonicSums`Private`ExpVar^10) + 25133/(20160*HarmonicSums`Private`ExpVar^9) - 1627/(5760*HarmonicSums`Private`ExpVar^8) - 19/(36*HarmonicSums`Private`ExpVar^7) + 451/(960*HarmonicSums`Private`ExpVar^6) - 19/(96*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^4)) - 26*s6 - (5*ln2^4*z2)/12 + (39*ln2^2*z2^2)/10 + (1643*z2^3)/280 + (-1)^HarmonicSums`Private`ExpVar* (29861/(960*HarmonicSums`Private`ExpVar^10) - 1339/(140*HarmonicSums`Private`ExpVar^9) - 5759/(1344*HarmonicSums`Private`ExpVar^8) + 403/(240*HarmonicSums`Private`ExpVar^7) + 1001/(960*HarmonicSums`Private`ExpVar^6) - 13/(24*HarmonicSums`Private`ExpVar^5) - 143/(192*HarmonicSums`Private`ExpVar^4) + 39/(32*HarmonicSums`Private`ExpVar^3) - 13/(16*HarmonicSums`Private`ExpVar^2))*z3 + (41*z3^2)/4 + z2*(-2*li4half - 209/(128*HarmonicSums`Private`ExpVar^10) + 473/(720*HarmonicSums`Private`ExpVar^9) + 39/(128*HarmonicSums`Private`ExpVar^8) - 253/(1344*HarmonicSums`Private`ExpVar^7) - 7/(64*HarmonicSums`Private`ExpVar^6) + 23/(120*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (-7967/(256*HarmonicSums`Private`ExpVar^10) + 4369/(1024*HarmonicSums`Private`ExpVar^8) - 257/(256*HarmonicSums`Private`ExpVar^6) + 257/(512*HarmonicSums`Private`ExpVar^4) - 257/(256*HarmonicSums`Private`ExpVar^2) + 257/(128*HarmonicSums`Private`ExpVar))*z5 + ln2*(-16*li5half + (-1)^HarmonicSums`Private`ExpVar* (93/(32*HarmonicSums`Private`ExpVar^10) - 51/(128*HarmonicSums`Private`ExpVar^8) + 3/(32*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^2) - 3/(16*HarmonicSums`Private`ExpVar))*z2^2 + z2*((-1)^HarmonicSums`Private`ExpVar* (-2297/(120*HarmonicSums`Private`ExpVar^10) + 206/(35*HarmonicSums`Private`ExpVar^9) + 443/(168*HarmonicSums`Private`ExpVar^8) - 31/(30*HarmonicSums`Private`ExpVar^7) - 77/(120*HarmonicSums`Private`ExpVar^6) + 1/(3*HarmonicSums`Private`ExpVar^5) + 11/(24*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2)) - z3/2) + (507*z5)/32), S[-1, 2, -1, 2, HarmonicSums`Private`ExpVar] :> -24*li6half - ln2^6/15 + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-31/(20*HarmonicSums`Private`ExpVar^10) + 17/(80*HarmonicSums`Private`ExpVar^8) - 1/(20*HarmonicSums`Private`ExpVar^6) + 1/(40*HarmonicSums`Private`ExpVar^4) - 1/(20*HarmonicSums`Private`ExpVar^2) + 1/(10*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-124/HarmonicSums`Private`ExpVar^10 + 17/HarmonicSums`Private`ExpVar^8 - 4/HarmonicSums`Private`ExpVar^6 + 2/HarmonicSums`Private`ExpVar^4 - 4/HarmonicSums`Private`ExpVar^2 + 8/HarmonicSums`Private`ExpVar) + 16993/(22400*HarmonicSums`Private`ExpVar^10) + 509/(192*HarmonicSums`Private`ExpVar^9) - 3227/(11520*HarmonicSums`Private`ExpVar^8) - 11/(12*HarmonicSums`Private`ExpVar^7) + 53/(72*HarmonicSums`Private`ExpVar^6) - 3/(10*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - (23*s6)/2 + (ln2^4*z2)/6 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (31/(6*HarmonicSums`Private`ExpVar^10) - 17/(24*HarmonicSums`Private`ExpVar^8) + 1/(6*HarmonicSums`Private`ExpVar^6) - 1/(12*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^2) - 1/(3*HarmonicSums`Private`ExpVar))* z2 + (213*z2^3)/70 + ln2^2*(-4*li4half - (3*z2^2)/8) + (-1)^HarmonicSums`Private`ExpVar* (-2297/(120*HarmonicSums`Private`ExpVar^10) + 206/(35*HarmonicSums`Private`ExpVar^9) + 443/(168*HarmonicSums`Private`ExpVar^8) - 31/(30*HarmonicSums`Private`ExpVar^7) - 77/(120*HarmonicSums`Private`ExpVar^6) + 1/(3*HarmonicSums`Private`ExpVar^5) + 11/(24*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2))*z3 + (77*z3^2)/16 + z2*(209/(64*HarmonicSums`Private`ExpVar^10) - 473/(360*HarmonicSums`Private`ExpVar^9) - 39/(64*HarmonicSums`Private`ExpVar^8) + 253/(672*HarmonicSums`Private`ExpVar^7) + 7/(32*HarmonicSums`Private`ExpVar^6) - 23/(60*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (15717/(128*HarmonicSums`Private`ExpVar^10) - 8619/(512*HarmonicSums`Private`ExpVar^8) + 507/(128*HarmonicSums`Private`ExpVar^6) - 507/(256*HarmonicSums`Private`ExpVar^4) + 507/(128*HarmonicSums`Private`ExpVar^2) - 507/(64*HarmonicSums`Private`ExpVar))*z5 + ln2*(-16*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (-62/HarmonicSums`Private`ExpVar^10 + 17/(2*HarmonicSums`Private`ExpVar^8) - 2/HarmonicSums`Private`ExpVar^6 + HarmonicSums`Private`ExpVar^(-4) - 2/HarmonicSums`Private`ExpVar^2 + 4/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (-527/(20*HarmonicSums`Private`ExpVar^10) + 289/(80*HarmonicSums`Private`ExpVar^8) - 17/(20*HarmonicSums`Private`ExpVar^6) + 17/(40*HarmonicSums`Private`ExpVar^4) - 17/(20*HarmonicSums`Private`ExpVar^2) + 17/(10*HarmonicSums`Private`ExpVar))*z2^2 + z2*((-1)^HarmonicSums`Private`ExpVar* (2297/(240*HarmonicSums`Private`ExpVar^10) - 103/(35*HarmonicSums`Private`ExpVar^9) - 443/(336*HarmonicSums`Private`ExpVar^8) + 31/(60*HarmonicSums`Private`ExpVar^7) + 77/(240*HarmonicSums`Private`ExpVar^6) - 1/(6*HarmonicSums`Private`ExpVar^5) - 11/(48*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) - z3/2) + (507*z5)/32), S[-1, 2, 1, -2, HarmonicSums`Private`ExpVar] :> -2887/(640*HarmonicSums`Private`ExpVar^10) + 371/(960*HarmonicSums`Private`ExpVar^9) + 673/(768*HarmonicSums`Private`ExpVar^8) - 61/(112*HarmonicSums`Private`ExpVar^7) + 1/(6*HarmonicSums`Private`ExpVar^6) - 1/(40*HarmonicSums`Private`ExpVar^5) - (7*s6)/4 + (ln2^4*z2)/8 + (-1)^HarmonicSums`Private`ExpVar* (-2297/(240*HarmonicSums`Private`ExpVar^10) + 103/(35*HarmonicSums`Private`ExpVar^9) + 443/(336*HarmonicSums`Private`ExpVar^8) - 31/(60*HarmonicSums`Private`ExpVar^7) - 77/(240*HarmonicSums`Private`ExpVar^6) + 1/(6*HarmonicSums`Private`ExpVar^5) + 11/(48*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*sinf*z2 - (3*ln2^2*z2^2)/4 - (69*z2^3)/112 + (-1)^HarmonicSums`Private`ExpVar* (-2297/(960*HarmonicSums`Private`ExpVar^10) + 103/(140*HarmonicSums`Private`ExpVar^9) + 443/(1344*HarmonicSums`Private`ExpVar^8) - 31/(240*HarmonicSums`Private`ExpVar^7) - 77/(960*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^5) + 11/(192*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z3 - (181*z3^2)/128 + z2*(3*li4half + (-1)^HarmonicSums`Private`ExpVar* (37027/(2800*HarmonicSums`Private`ExpVar^10) - 4687/(58800*HarmonicSums`Private`ExpVar^9) - 205967/(141120*HarmonicSums`Private`ExpVar^8) - 317/(3600*HarmonicSums`Private`ExpVar^7) + 839/(3600*HarmonicSums`Private`ExpVar^6) + 11/(144*HarmonicSums`Private`ExpVar^5) - 11/(288*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-155/(64*HarmonicSums`Private`ExpVar^10) + 85/(256*HarmonicSums`Private`ExpVar^8) - 5/(64*HarmonicSums`Private`ExpVar^6) + 5/(128*HarmonicSums`Private`ExpVar^4) - 5/(64*HarmonicSums`Private`ExpVar^2) + 5/(32*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (5487/(256*HarmonicSums`Private`ExpVar^10) - 3009/(1024*HarmonicSums`Private`ExpVar^8) + 177/(256*HarmonicSums`Private`ExpVar^6) - 177/(512*HarmonicSums`Private`ExpVar^4) + 177/(256*HarmonicSums`Private`ExpVar^2) - 177/(128*HarmonicSums`Private`ExpVar))*z5 + ln2*((41*z2*z3)/16 + (177*z5)/64), S[-1, 2, 1, 2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (2555401/(1411200*HarmonicSums`Private`ExpVar^10) - 14234327/(2116800*HarmonicSums`Private`ExpVar^9) - 21707/(86400*HarmonicSums`Private`ExpVar^8) + 10511/(10800*HarmonicSums`Private`ExpVar^7) + 109/(192*HarmonicSums`Private`ExpVar^6) - 323/(288*HarmonicSums`Private`ExpVar^5) + 3/(4*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) - s6 - (ln2^4*z2)/16 + (-1)^HarmonicSums`Private`ExpVar* (2297/(120*HarmonicSums`Private`ExpVar^10) - 206/(35*HarmonicSums`Private`ExpVar^9) - 443/(168*HarmonicSums`Private`ExpVar^8) + 31/(30*HarmonicSums`Private`ExpVar^7) + 77/(120*HarmonicSums`Private`ExpVar^6) - 1/(3*HarmonicSums`Private`ExpVar^5) - 11/(24*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2))*sinf*z2 + (3*ln2^2*z2^2)/8 - (9*z2^3)/28 + (-1)^HarmonicSums`Private`ExpVar* (-2297/(120*HarmonicSums`Private`ExpVar^10) + 206/(35*HarmonicSums`Private`ExpVar^9) + 443/(168*HarmonicSums`Private`ExpVar^8) - 31/(30*HarmonicSums`Private`ExpVar^7) - 77/(120*HarmonicSums`Private`ExpVar^6) + 1/(3*HarmonicSums`Private`ExpVar^5) + 11/(24*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2))*z3 + (7*z3^2)/4 + z2*((-3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (-37027/(1400*HarmonicSums`Private`ExpVar^10) + 4687/(29400*HarmonicSums`Private`ExpVar^9) + 205967/(70560*HarmonicSums`Private`ExpVar^8) + 317/(1800*HarmonicSums`Private`ExpVar^7) - 839/(1800*HarmonicSums`Private`ExpVar^6) - 11/(72*HarmonicSums`Private`ExpVar^5) + 11/(144*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (-279/(8*HarmonicSums`Private`ExpVar^10) + 153/(32*HarmonicSums`Private`ExpVar^8) - 9/(8*HarmonicSums`Private`ExpVar^6) + 9/(16*HarmonicSums`Private`ExpVar^4) - 9/(8*HarmonicSums`Private`ExpVar^2) + 9/(4*HarmonicSums`Private`ExpVar))* z5 + ln2*((-11*z2*z3)/8 + (177*z5)/64), S[-1, -1, -3, -1, HarmonicSums`Private`ExpVar] :> -6*li6half - ln2^6/120 + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (31/(48*HarmonicSums`Private`ExpVar^10) - 17/(192*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar)) + li4half*(19/(32*HarmonicSums`Private`ExpVar^10) - 263/(240*HarmonicSums`Private`ExpVar^9) - 9/(64*HarmonicSums`Private`ExpVar^8) + 23/(84*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^6) - 19/(120*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 5/(12*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) - 2075/(4608*HarmonicSums`Private`ExpVar^10) + 26353/(34560*HarmonicSums`Private`ExpVar^9) + 1457/(9216*HarmonicSums`Private`ExpVar^8) - 393/(896*HarmonicSums`Private`ExpVar^7) + 329/(1152*HarmonicSums`Private`ExpVar^6) - 17/(160*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4) + (3*s6)/4 + ln2^4*(19/(768*HarmonicSums`Private`ExpVar^10) - 263/(5760*HarmonicSums`Private`ExpVar^9) - 3/(512*HarmonicSums`Private`ExpVar^8) + 23/(2016*HarmonicSums`Private`ExpVar^7) + 1/(384*HarmonicSums`Private`ExpVar^6) - 19/(2880*HarmonicSums`Private`ExpVar^5) - 1/(384*HarmonicSums`Private`ExpVar^4) + 5/(288*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar) + z2/8) + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))* z2 + (-57/(320*HarmonicSums`Private`ExpVar^10) + 263/(800*HarmonicSums`Private`ExpVar^9) + 27/(640*HarmonicSums`Private`ExpVar^8) - 23/(280*HarmonicSums`Private`ExpVar^7) - 3/(160*HarmonicSums`Private`ExpVar^6) + 19/(400*HarmonicSums`Private`ExpVar^5) + 3/(160*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 9/(40*HarmonicSums`Private`ExpVar^2) - 3/(10*HarmonicSums`Private`ExpVar))*z2^2 + (2113*z2^3)/1680 + ln2^2*((-19/(128*HarmonicSums`Private`ExpVar^10) + 263/(960*HarmonicSums`Private`ExpVar^9) + 9/(256*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) - 1/(64*HarmonicSums`Private`ExpVar^6) + 19/(480*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + z2^2/40) + z3^2/32 + ln2*((-1)^HarmonicSums`Private`ExpVar* (3859/(288*HarmonicSums`Private`ExpVar^10) + 145/(48*HarmonicSums`Private`ExpVar^9) - 267/(128*HarmonicSums`Private`ExpVar^8) - 43/(96*HarmonicSums`Private`ExpVar^7) + 157/(192*HarmonicSums`Private`ExpVar^6) - 37/(96*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar* (31/(10*HarmonicSums`Private`ExpVar^10) - 17/(40*HarmonicSums`Private`ExpVar^8) + 1/(10*HarmonicSums`Private`ExpVar^6) - 1/(20*HarmonicSums`Private`ExpVar^4) + 1/(10*HarmonicSums`Private`ExpVar^2) - 1/(5*HarmonicSums`Private`ExpVar))*z2^2 - (3*z2*z3)/2 - (15*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-465/(128*HarmonicSums`Private`ExpVar^10) + 255/(512*HarmonicSums`Private`ExpVar^8) - 15/(128*HarmonicSums`Private`ExpVar^6) + 15/(256*HarmonicSums`Private`ExpVar^4) - 15/(128*HarmonicSums`Private`ExpVar^2) + 15/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, -1, -3, 1, HarmonicSums`Private`ExpVar] :> 2*li6half + ln2^6/360 + (-1)^HarmonicSums`Private`ExpVar* (3567539/(414720*HarmonicSums`Private`ExpVar^10) + 82477/(23040*HarmonicSums`Private`ExpVar^9) - 4735/(4608*HarmonicSums`Private`ExpVar^8) - 47/(120*HarmonicSums`Private`ExpVar^7) + 2389/(11520*HarmonicSums`Private`ExpVar^6) + 19/(1152*HarmonicSums`Private`ExpVar^5) - 1/(36*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + li4half*(-19/(32*HarmonicSums`Private`ExpVar^10) + 263/(240*HarmonicSums`Private`ExpVar^9) + 9/(64*HarmonicSums`Private`ExpVar^8) - 23/(84*HarmonicSums`Private`ExpVar^7) - 1/(16*HarmonicSums`Private`ExpVar^6) + 19/(120*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 5/(12*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (31/(60*HarmonicSums`Private`ExpVar^10) - 17/(240*HarmonicSums`Private`ExpVar^8) + 1/(60*HarmonicSums`Private`ExpVar^6) - 1/(120*HarmonicSums`Private`ExpVar^4) + 1/(60*HarmonicSums`Private`ExpVar^2) - 1/(30*HarmonicSums`Private`ExpVar)) + (11*s6)/4 + (-1)^HarmonicSums`Private`ExpVar* (-3859/(288*HarmonicSums`Private`ExpVar^10) - 145/(48*HarmonicSums`Private`ExpVar^9) + 267/(128*HarmonicSums`Private`ExpVar^8) + 43/(96*HarmonicSums`Private`ExpVar^7) - 157/(192*HarmonicSums`Private`ExpVar^6) + 37/(96*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^4))*sinf + ln2^4*(-19/(768*HarmonicSums`Private`ExpVar^10) + 263/(5760*HarmonicSums`Private`ExpVar^9) + 3/(512*HarmonicSums`Private`ExpVar^8) - 23/(2016*HarmonicSums`Private`ExpVar^7) - 1/(384*HarmonicSums`Private`ExpVar^6) + 19/(2880*HarmonicSums`Private`ExpVar^5) + 1/(384*HarmonicSums`Private`ExpVar^4) - 5/(288*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar) + z2/24) + (209/(640*HarmonicSums`Private`ExpVar^10) - 2893/(4800*HarmonicSums`Private`ExpVar^9) - 99/(1280*HarmonicSums`Private`ExpVar^8) + 253/(1680*HarmonicSums`Private`ExpVar^7) + 11/(320*HarmonicSums`Private`ExpVar^6) - 209/(2400*HarmonicSums`Private`ExpVar^5) - 11/(320*HarmonicSums`Private`ExpVar^4) + 11/(48*HarmonicSums`Private`ExpVar^3) - 33/(80*HarmonicSums`Private`ExpVar^2) + 11/(20*HarmonicSums`Private`ExpVar))*z2^2 - (403*z2^3)/336 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-31/(12*HarmonicSums`Private`ExpVar^10) + 17/(48*HarmonicSums`Private`ExpVar^8) - 1/(12*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/24) - z3^2/2 + z2*(2*li4half + (-1)^HarmonicSums`Private`ExpVar* (217/(32*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^6) - 7/(64*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3) + ln2^2*((19/(128*HarmonicSums`Private`ExpVar^10) - 263/(960*HarmonicSums`Private`ExpVar^9) - 9/(256*HarmonicSums`Private`ExpVar^8) + 23/(336*HarmonicSums`Private`ExpVar^7) + 1/(64*HarmonicSums`Private`ExpVar^6) - 19/(480*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - (21*z2^2)/20 + (-1)^HarmonicSums`Private`ExpVar* (217/(32*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^6) - 7/(64*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*((-1)^HarmonicSums`Private`ExpVar*li4half* (31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2^2 + (-133/(256*HarmonicSums`Private`ExpVar^10) + 1841/(1920*HarmonicSums`Private`ExpVar^9) + 63/(512*HarmonicSums`Private`ExpVar^8) - 23/(96*HarmonicSums`Private`ExpVar^7) - 7/(128*HarmonicSums`Private`ExpVar^6) + 133/(960*HarmonicSums`Private`ExpVar^5) + 7/(128*HarmonicSums`Private`ExpVar^4) - 35/(96*HarmonicSums`Private`ExpVar^3) + 21/(32*HarmonicSums`Private`ExpVar^2) - 7/(8*HarmonicSums`Private`ExpVar))*z3 + (7*z2*z3)/8 - (15*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-2635/(64*HarmonicSums`Private`ExpVar^10) + 1445/(256*HarmonicSums`Private`ExpVar^8) - 85/(64*HarmonicSums`Private`ExpVar^6) + 85/(128*HarmonicSums`Private`ExpVar^4) - 85/(64*HarmonicSums`Private`ExpVar^2) + 85/(32*HarmonicSums`Private`ExpVar))*z5, S[-1, -1, 3, -1, HarmonicSums`Private`ExpVar] :> ln2^6/60 + (-1)^HarmonicSums`Private`ExpVar* (-2595/(512*HarmonicSums`Private`ExpVar^10) + 395/(256*HarmonicSums`Private`ExpVar^9) + 11/(16*HarmonicSums`Private`ExpVar^8) - 39/(64*HarmonicSums`Private`ExpVar^7) + 13/(64*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-31/(120*HarmonicSums`Private`ExpVar^10) + 17/(480*HarmonicSums`Private`ExpVar^8) - 1/(120*HarmonicSums`Private`ExpVar^6) + 1/(240*HarmonicSums`Private`ExpVar^4) - 1/(120*HarmonicSums`Private`ExpVar^2) + 1/(60*HarmonicSums`Private`ExpVar)) - 5*s6 - (ln2^4*z2)/6 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (31/(12*HarmonicSums`Private`ExpVar^10) - 17/(48*HarmonicSums`Private`ExpVar^8) + 1/(12*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar))*z2 + (27*ln2^2*z2^2)/80 + (-19/(512*HarmonicSums`Private`ExpVar^10) + 263/(3840*HarmonicSums`Private`ExpVar^9) + 9/(1024*HarmonicSums`Private`ExpVar^8) - 23/(1344*HarmonicSums`Private`ExpVar^7) - 1/(256*HarmonicSums`Private`ExpVar^6) + 19/(1920*HarmonicSums`Private`ExpVar^5) + 1/(256*HarmonicSums`Private`ExpVar^4) - 5/(192*HarmonicSums`Private`ExpVar^3) + 3/(64*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z2^2 - (295*z2^3)/336 + (7*z3^2)/4 + (-1)^HarmonicSums`Private`ExpVar* (-837/(32*HarmonicSums`Private`ExpVar^10) + 459/(128*HarmonicSums`Private`ExpVar^8) - 27/(32*HarmonicSums`Private`ExpVar^6) + 27/(64*HarmonicSums`Private`ExpVar^4) - 27/(32*HarmonicSums`Private`ExpVar^2) + 27/(16*HarmonicSums`Private`ExpVar))*z5 + ln2*(-2*li5half + 7819/(1920*HarmonicSums`Private`ExpVar^10) - 653/(1728*HarmonicSums`Private`ExpVar^9) - 643/(768*HarmonicSums`Private`ExpVar^8) + 47/(672*HarmonicSums`Private`ExpVar^7) + 25/(48*HarmonicSums`Private`ExpVar^6) - 25/(48*HarmonicSums`Private`ExpVar^5) + 9/(32*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (403/(160*HarmonicSums`Private`ExpVar^10) - 221/(640*HarmonicSums`Private`ExpVar^8) + 13/(160*HarmonicSums`Private`ExpVar^6) - 13/(320*HarmonicSums`Private`ExpVar^4) + 13/(160*HarmonicSums`Private`ExpVar^2) - 13/(80*HarmonicSums`Private`ExpVar))*z2^2 + (133/(256*HarmonicSums`Private`ExpVar^10) - 1841/(1920*HarmonicSums`Private`ExpVar^9) - 63/(512*HarmonicSums`Private`ExpVar^8) + 23/(96*HarmonicSums`Private`ExpVar^7) + 7/(128*HarmonicSums`Private`ExpVar^6) - 133/(960*HarmonicSums`Private`ExpVar^5) - 7/(128*HarmonicSums`Private`ExpVar^4) + 35/(96*HarmonicSums`Private`ExpVar^3) - 21/(32*HarmonicSums`Private`ExpVar^2) + 7/(8*HarmonicSums`Private`ExpVar))*z3 + (3*z2*z3)/2 + (311*z5)/64), S[-1, -1, 3, 1, HarmonicSums`Private`ExpVar] :> -4*li6half + ln2^6/90 + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (31/(240*HarmonicSums`Private`ExpVar^10) - 17/(960*HarmonicSums`Private`ExpVar^8) + 1/(240*HarmonicSums`Private`ExpVar^6) - 1/(480*HarmonicSums`Private`ExpVar^4) + 1/(240*HarmonicSums`Private`ExpVar^2) - 1/(120*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/(2*HarmonicSums`Private`ExpVar^10) + 17/(8*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) + 2273471/(691200*HarmonicSums`Private`ExpVar^10) + 1090889/(4354560*HarmonicSums`Private`ExpVar^9) - 55471/(129024*HarmonicSums`Private`ExpVar^8) - 1763/(18816*HarmonicSums`Private`ExpVar^7) + 53/(576*HarmonicSums`Private`ExpVar^6) + 257/(2880*HarmonicSums`Private`ExpVar^5) - 53/(384*HarmonicSums`Private`ExpVar^4) + 5/(72*HarmonicSums`Private`ExpVar^3) - (21*s6)/4 + (-7819/(1920*HarmonicSums`Private`ExpVar^10) + 653/(1728*HarmonicSums`Private`ExpVar^9) + 643/(768*HarmonicSums`Private`ExpVar^8) - 47/(672*HarmonicSums`Private`ExpVar^7) - 25/(48*HarmonicSums`Private`ExpVar^6) + 25/(48*HarmonicSums`Private`ExpVar^5) - 9/(32*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3))*sinf - (ln2^4*z2)/12 + (-19/(128*HarmonicSums`Private`ExpVar^10) + 263/(960*HarmonicSums`Private`ExpVar^9) + 9/(256*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) - 1/(64*HarmonicSums`Private`ExpVar^6) + 19/(480*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2^2 + (1801*z2^3)/1680 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/24) + (-1)^HarmonicSums`Private`ExpVar* (-217/(32*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^6) + 7/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z2*z3 - (9*z3^2)/16 + ln2^2*(z2^2/4 + (-1)^HarmonicSums`Private`ExpVar* (217/(32*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^6) - 7/(64*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (9641/(256*HarmonicSums`Private`ExpVar^10) - 5287/(1024*HarmonicSums`Private`ExpVar^8) + 311/(256*HarmonicSums`Private`ExpVar^6) - 311/(512*HarmonicSums`Private`ExpVar^4) + 311/(256*HarmonicSums`Private`ExpVar^2) - 311/(128*HarmonicSums`Private`ExpVar))*z5 + ln2*(-2*li5half + (-1)^HarmonicSums`Private`ExpVar* (-341/(40*HarmonicSums`Private`ExpVar^10) + 187/(160*HarmonicSums`Private`ExpVar^8) - 11/(40*HarmonicSums`Private`ExpVar^6) + 11/(80*HarmonicSums`Private`ExpVar^4) - 11/(40*HarmonicSums`Private`ExpVar^2) + 11/(20*HarmonicSums`Private`ExpVar))*z2^2 + (7*z2*z3)/8 + (311*z5)/64), S[-1, -1, -2, -2, HarmonicSums`Private`ExpVar] :> -12*li6half - ln2^6/30 + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-31/(40*HarmonicSums`Private`ExpVar^10) + 17/(160*HarmonicSums`Private`ExpVar^8) - 1/(40*HarmonicSums`Private`ExpVar^6) + 1/(80*HarmonicSums`Private`ExpVar^4) - 1/(40*HarmonicSums`Private`ExpVar^2) + 1/(20*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-62/HarmonicSums`Private`ExpVar^10 + 17/(2*HarmonicSums`Private`ExpVar^8) - 2/HarmonicSums`Private`ExpVar^6 + HarmonicSums`Private`ExpVar^(-4) - 2/HarmonicSums`Private`ExpVar^2 + 4/HarmonicSums`Private`ExpVar) - 14681/(11520*HarmonicSums`Private`ExpVar^10) + 1789/(1920*HarmonicSums`Private`ExpVar^9) + 1417/(4608*HarmonicSums`Private`ExpVar^8) - 745/(1344*HarmonicSums`Private`ExpVar^7) + 187/(576*HarmonicSums`Private`ExpVar^6) - 9/(80*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4) - (19*s6)/2 + (ln2^4*z2)/6 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (31/(12*HarmonicSums`Private`ExpVar^10) - 17/(48*HarmonicSums`Private`ExpVar^8) + 1/(12*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar))*z2 + (-247/(2560*HarmonicSums`Private`ExpVar^10) + 3419/(19200*HarmonicSums`Private`ExpVar^9) + 117/(5120*HarmonicSums`Private`ExpVar^8) - 299/(6720*HarmonicSums`Private`ExpVar^7) - 13/(1280*HarmonicSums`Private`ExpVar^6) + 247/(9600*HarmonicSums`Private`ExpVar^5) + 13/(1280*HarmonicSums`Private`ExpVar^4) - 13/(192*HarmonicSums`Private`ExpVar^3) + 39/(320*HarmonicSums`Private`ExpVar^2) - 13/(80*HarmonicSums`Private`ExpVar))*z2^2 + (281*z2^3)/240 + ln2^2*(-2*li4half - (27*z2^2)/80) + (59*z3^2)/64 + z2*(2*li4half + (-1)^HarmonicSums`Private`ExpVar* (-1167/(320*HarmonicSums`Private`ExpVar^10) + 9281/(3360*HarmonicSums`Private`ExpVar^9) + 1207/(2688*HarmonicSums`Private`ExpVar^8) - 87/(160*HarmonicSums`Private`ExpVar^7) - 91/(960*HarmonicSums`Private`ExpVar^6) + 29/(96*HarmonicSums`Private`ExpVar^5) - 19/(96*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-155/(64*HarmonicSums`Private`ExpVar^10) + 85/(256*HarmonicSums`Private`ExpVar^8) - 5/(64*HarmonicSums`Private`ExpVar^6) + 5/(128*HarmonicSums`Private`ExpVar^4) - 5/(64*HarmonicSums`Private`ExpVar^2) + 5/(32*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (10261/(128*HarmonicSums`Private`ExpVar^10) - 5627/(512*HarmonicSums`Private`ExpVar^8) + 331/(128*HarmonicSums`Private`ExpVar^6) - 331/(256*HarmonicSums`Private`ExpVar^4) + 331/(128*HarmonicSums`Private`ExpVar^2) - 331/(64*HarmonicSums`Private`ExpVar))*z5 + ln2*(-8*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (-527/(32*HarmonicSums`Private`ExpVar^10) + 289/(128*HarmonicSums`Private`ExpVar^8) - 17/(32*HarmonicSums`Private`ExpVar^6) + 17/(64*HarmonicSums`Private`ExpVar^4) - 17/(32*HarmonicSums`Private`ExpVar^2) + 17/(16*HarmonicSums`Private`ExpVar))*z2^2 + (13*z2*z3)/4 + (331*z5)/32), S[-1, -1, -2, 2, HarmonicSums`Private`ExpVar] :> -16*li6half - (7*ln2^6)/180 + (-1)^HarmonicSums`Private`ExpVar* (865537/(96768*HarmonicSums`Private`ExpVar^10) + 74581/(16128*HarmonicSums`Private`ExpVar^9) - 30209/(20160*HarmonicSums`Private`ExpVar^8) - 1477/(1440*HarmonicSums`Private`ExpVar^7) + 61/(60*HarmonicSums`Private`ExpVar^6) - 5/(12*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-31/(30*HarmonicSums`Private`ExpVar^10) + 17/(120*HarmonicSums`Private`ExpVar^8) - 1/(30*HarmonicSums`Private`ExpVar^6) + 1/(60*HarmonicSums`Private`ExpVar^4) - 1/(30*HarmonicSums`Private`ExpVar^2) + 1/(15*HarmonicSums`Private`ExpVar)) + ln2^4*(19/(384*HarmonicSums`Private`ExpVar^10) - 263/(2880*HarmonicSums`Private`ExpVar^9) - 3/(256*HarmonicSums`Private`ExpVar^8) + 23/(1008*HarmonicSums`Private`ExpVar^7) + 1/(192*HarmonicSums`Private`ExpVar^6) - 19/(1440*HarmonicSums`Private`ExpVar^5) - 1/(192*HarmonicSums`Private`ExpVar^4) + 5/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) + li4half*(19/(16*HarmonicSums`Private`ExpVar^10) - 263/(120*HarmonicSums`Private`ExpVar^9) - 9/(32*HarmonicSums`Private`ExpVar^8) + 23/(42*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6) - 19/(60*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 5/(6*HarmonicSums`Private`ExpVar^3) - 3/(2*HarmonicSums`Private`ExpVar^2) + 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*li5half* (-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) - 9*s6 + (-969/(2560*HarmonicSums`Private`ExpVar^10) + 4471/(6400*HarmonicSums`Private`ExpVar^9) + 459/(5120*HarmonicSums`Private`ExpVar^8) - 391/(2240*HarmonicSums`Private`ExpVar^7) - 51/(1280*HarmonicSums`Private`ExpVar^6) + 323/(3200*HarmonicSums`Private`ExpVar^5) + 51/(1280*HarmonicSums`Private`ExpVar^4) - 17/(64*HarmonicSums`Private`ExpVar^3) + 153/(320*HarmonicSums`Private`ExpVar^2) - 51/(80*HarmonicSums`Private`ExpVar))*z2^2 + (4307*z2^3)/1680 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(6*HarmonicSums`Private`ExpVar^10) - 17/(24*HarmonicSums`Private`ExpVar^8) + 1/(6*HarmonicSums`Private`ExpVar^6) - 1/(12*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^2) - 1/(3*HarmonicSums`Private`ExpVar))*z2 - (7*z3)/12) + (73*z3^2)/16 + z2*(-4*li4half + (-1)^HarmonicSums`Private`ExpVar* (1167/(160*HarmonicSums`Private`ExpVar^10) - 9281/(1680*HarmonicSums`Private`ExpVar^9) - 1207/(1344*HarmonicSums`Private`ExpVar^8) + 87/(80*HarmonicSums`Private`ExpVar^7) + 91/(480*HarmonicSums`Private`ExpVar^6) - 29/(48*HarmonicSums`Private`ExpVar^5) + 19/(48*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-279/(32*HarmonicSums`Private`ExpVar^10) + 153/(128*HarmonicSums`Private`ExpVar^8) - 9/(32*HarmonicSums`Private`ExpVar^6) + 9/(64*HarmonicSums`Private`ExpVar^4) - 9/(32*HarmonicSums`Private`ExpVar^2) + 9/(16*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(-2*li4half + (-19/(64*HarmonicSums`Private`ExpVar^10) + 263/(480*HarmonicSums`Private`ExpVar^9) + 9/(128*HarmonicSums`Private`ExpVar^8) - 23/(168*HarmonicSums`Private`ExpVar^7) - 1/(32*HarmonicSums`Private`ExpVar^6) + 19/(240*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2 + (131*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (-217/(16*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^6) + 7/(32*HarmonicSums`Private`ExpVar^4) - 7/(16*HarmonicSums`Private`ExpVar^2) + 7/(8*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (8029/(256*HarmonicSums`Private`ExpVar^10) - 4403/(1024*HarmonicSums`Private`ExpVar^8) + 259/(256*HarmonicSums`Private`ExpVar^6) - 259/(512*HarmonicSums`Private`ExpVar^4) + 259/(256*HarmonicSums`Private`ExpVar^2) - 259/(128*HarmonicSums`Private`ExpVar))*z5 + ln2*(-8*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (217/(40*HarmonicSums`Private`ExpVar^10) - 119/(160*HarmonicSums`Private`ExpVar^8) + 7/(40*HarmonicSums`Private`ExpVar^6) - 7/(80*HarmonicSums`Private`ExpVar^4) + 7/(40*HarmonicSums`Private`ExpVar^2) - 7/(20*HarmonicSums`Private`ExpVar))*z2^2 + (133/(128*HarmonicSums`Private`ExpVar^10) - 1841/(960*HarmonicSums`Private`ExpVar^9) - 63/(256*HarmonicSums`Private`ExpVar^8) + 23/(48*HarmonicSums`Private`ExpVar^7) + 7/(64*HarmonicSums`Private`ExpVar^6) - 133/(480*HarmonicSums`Private`ExpVar^5) - 7/(64*HarmonicSums`Private`ExpVar^4) + 35/(48*HarmonicSums`Private`ExpVar^3) - 21/(16*HarmonicSums`Private`ExpVar^2) + 7/(4*HarmonicSums`Private`ExpVar))*z3 - (27*z2*z3)/8 + (331*z5)/32), S[-1, -1, 2, -2, HarmonicSums`Private`ExpVar] :> 16*li6half + (7*ln2^6)/180 + (-1)^HarmonicSums`Private`ExpVar* (-162637/(23040*HarmonicSums`Private`ExpVar^10) + 37609/(26880*HarmonicSums`Private`ExpVar^9) + 2645/(2688*HarmonicSums`Private`ExpVar^8) - 169/(240*HarmonicSums`Private`ExpVar^7) + 69/(320*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + li4half*(-19/(16*HarmonicSums`Private`ExpVar^10) + 263/(120*HarmonicSums`Private`ExpVar^9) + 9/(32*HarmonicSums`Private`ExpVar^8) - 23/(42*HarmonicSums`Private`ExpVar^7) - 1/(8*HarmonicSums`Private`ExpVar^6) + 19/(60*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 5/(6*HarmonicSums`Private`ExpVar^3) + 3/(2*HarmonicSums`Private`ExpVar^2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (31/(30*HarmonicSums`Private`ExpVar^10) - 17/(120*HarmonicSums`Private`ExpVar^8) + 1/(30*HarmonicSums`Private`ExpVar^6) - 1/(60*HarmonicSums`Private`ExpVar^4) + 1/(30*HarmonicSums`Private`ExpVar^2) - 1/(15*HarmonicSums`Private`ExpVar)) + 9*s6 + ln2^4*(-19/(384*HarmonicSums`Private`ExpVar^10) + 263/(2880*HarmonicSums`Private`ExpVar^9) + 3/(256*HarmonicSums`Private`ExpVar^8) - 23/(1008*HarmonicSums`Private`ExpVar^7) - 1/(192*HarmonicSums`Private`ExpVar^6) + 19/(1440*HarmonicSums`Private`ExpVar^5) + 1/(192*HarmonicSums`Private`ExpVar^4) - 5/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar) - z2/16) + (323/(512*HarmonicSums`Private`ExpVar^10) - 4471/(3840*HarmonicSums`Private`ExpVar^9) - 153/(1024*HarmonicSums`Private`ExpVar^8) + 391/(1344*HarmonicSums`Private`ExpVar^7) + 17/(256*HarmonicSums`Private`ExpVar^6) - 323/(1920*HarmonicSums`Private`ExpVar^5) - 17/(256*HarmonicSums`Private`ExpVar^4) + 85/(192*HarmonicSums`Private`ExpVar^3) - 51/(64*HarmonicSums`Private`ExpVar^2) + 17/(16*HarmonicSums`Private`ExpVar))*z2^2 - (1381*z2^3)/420 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-31/(6*HarmonicSums`Private`ExpVar^10) + 17/(24*HarmonicSums`Private`ExpVar^8) - 1/(6*HarmonicSums`Private`ExpVar^6) + 1/(12*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^2) + 1/(3*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/12) - (49*z3^2)/16 + ln2^2*(2*li4half + (19/(64*HarmonicSums`Private`ExpVar^10) - 263/(480*HarmonicSums`Private`ExpVar^9) - 9/(128*HarmonicSums`Private`ExpVar^8) + 23/(168*HarmonicSums`Private`ExpVar^7) + 1/(32*HarmonicSums`Private`ExpVar^6) - 19/(240*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 - (27*z2^2)/16 + (-1)^HarmonicSums`Private`ExpVar* (217/(16*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^6) - 7/(32*HarmonicSums`Private`ExpVar^4) + 7/(16*HarmonicSums`Private`ExpVar^2) - 7/(8*HarmonicSums`Private`ExpVar))*z3) + z2*((5*li4half)/2 + 38237/(33600*HarmonicSums`Private`ExpVar^10) + 563/(672*HarmonicSums`Private`ExpVar^9) - 383/(2016*HarmonicSums`Private`ExpVar^8) - 781/(3360*HarmonicSums`Private`ExpVar^7) + 179/(2880*HarmonicSums`Private`ExpVar^6) + 33/(160*HarmonicSums`Private`ExpVar^5) - 59/(192*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (93/(8*HarmonicSums`Private`ExpVar^10) - 51/(32*HarmonicSums`Private`ExpVar^8) + 3/(8*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^2) - 3/(4*HarmonicSums`Private`ExpVar))*z3) + ln2*(8*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (403/(160*HarmonicSums`Private`ExpVar^10) - 221/(640*HarmonicSums`Private`ExpVar^8) + 13/(160*HarmonicSums`Private`ExpVar^6) - 13/(320*HarmonicSums`Private`ExpVar^4) + 13/(160*HarmonicSums`Private`ExpVar^2) - 13/(80*HarmonicSums`Private`ExpVar))*z2^2 + (-133/(128*HarmonicSums`Private`ExpVar^10) + 1841/(960*HarmonicSums`Private`ExpVar^9) + 63/(256*HarmonicSums`Private`ExpVar^8) - 23/(48*HarmonicSums`Private`ExpVar^7) - 7/(64*HarmonicSums`Private`ExpVar^6) + 133/(480*HarmonicSums`Private`ExpVar^5) + 7/(64*HarmonicSums`Private`ExpVar^4) - 35/(48*HarmonicSums`Private`ExpVar^3) + 21/(16*HarmonicSums`Private`ExpVar^2) - 7/(4*HarmonicSums`Private`ExpVar))*z3 + (15*z2*z3)/8 - (227*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-3999/(64*HarmonicSums`Private`ExpVar^10) + 2193/(256*HarmonicSums`Private`ExpVar^8) - 129/(64*HarmonicSums`Private`ExpVar^6) + 129/(128*HarmonicSums`Private`ExpVar^4) - 129/(64*HarmonicSums`Private`ExpVar^2) + 129/(32*HarmonicSums`Private`ExpVar))*z5, S[-1, -1, 2, 2, HarmonicSums`Private`ExpVar] :> 12*li6half + ln2^6/30 + (-1)^HarmonicSums`Private`ExpVar*li5half* (62/HarmonicSums`Private`ExpVar^10 - 17/(2*HarmonicSums`Private`ExpVar^8) + 2/HarmonicSums`Private`ExpVar^6 - HarmonicSums`Private`ExpVar^(-4) + 2/HarmonicSums`Private`ExpVar^2 - 4/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (31/(40*HarmonicSums`Private`ExpVar^10) - 17/(160*HarmonicSums`Private`ExpVar^8) + 1/(40*HarmonicSums`Private`ExpVar^6) - 1/(80*HarmonicSums`Private`ExpVar^4) + 1/(40*HarmonicSums`Private`ExpVar^2) - 1/(20*HarmonicSums`Private`ExpVar)) + 521371/(134400*HarmonicSums`Private`ExpVar^10) + 124309/(362880*HarmonicSums`Private`ExpVar^9) - 16879/(23040*HarmonicSums`Private`ExpVar^8) - 6647/(20160*HarmonicSums`Private`ExpVar^7) + 457/(576*HarmonicSums`Private`ExpVar^6) - 5/(8*HarmonicSums`Private`ExpVar^5) + 29/(96*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + (23*s6)/4 - (ln2^4*z2)/24 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (-31/(12*HarmonicSums`Private`ExpVar^10) + 17/(48*HarmonicSums`Private`ExpVar^8) - 1/(12*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar))*z2 + (-133/(640*HarmonicSums`Private`ExpVar^10) + 1841/(4800*HarmonicSums`Private`ExpVar^9) + 63/(1280*HarmonicSums`Private`ExpVar^8) - 23/(240*HarmonicSums`Private`ExpVar^7) - 7/(320*HarmonicSums`Private`ExpVar^6) + 133/(2400*HarmonicSums`Private`ExpVar^5) + 7/(320*HarmonicSums`Private`ExpVar^4) - 7/(48*HarmonicSums`Private`ExpVar^3) + 21/(80*HarmonicSums`Private`ExpVar^2) - 7/(20*HarmonicSums`Private`ExpVar))*z2^2 - (491*z2^3)/336 + ln2^2*(2*li4half + z2^2/10) - (125*z3^2)/64 + z2*(li4half - 38237/(16800*HarmonicSums`Private`ExpVar^10) - 563/(336*HarmonicSums`Private`ExpVar^9) + 383/(1008*HarmonicSums`Private`ExpVar^8) + 781/(1680*HarmonicSums`Private`ExpVar^7) - 179/(1440*HarmonicSums`Private`ExpVar^6) - 33/(80*HarmonicSums`Private`ExpVar^5) + 59/(96*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(8*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (1581/(160*HarmonicSums`Private`ExpVar^10) - 867/(640*HarmonicSums`Private`ExpVar^8) + 51/(160*HarmonicSums`Private`ExpVar^6) - 51/(320*HarmonicSums`Private`ExpVar^4) + 51/(160*HarmonicSums`Private`ExpVar^2) - 51/(80*HarmonicSums`Private`ExpVar))*z2^2 - (z2*z3)/4 - (227*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-7037/(128*HarmonicSums`Private`ExpVar^10) + 3859/(512*HarmonicSums`Private`ExpVar^8) - 227/(128*HarmonicSums`Private`ExpVar^6) + 227/(256*HarmonicSums`Private`ExpVar^4) - 227/(128*HarmonicSums`Private`ExpVar^2) + 227/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, -1, -1, -3, HarmonicSums`Private`ExpVar] :> 2*li6half + ln2^6/360 + li4half*(-19/(32*HarmonicSums`Private`ExpVar^10) + 263/(240*HarmonicSums`Private`ExpVar^9) + 9/(64*HarmonicSums`Private`ExpVar^8) - 23/(84*HarmonicSums`Private`ExpVar^7) - 1/(16*HarmonicSums`Private`ExpVar^6) + 19/(120*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 5/(12*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) - 52201/(23040*HarmonicSums`Private`ExpVar^10) + 43541/(34560*HarmonicSums`Private`ExpVar^9) + 3833/(9216*HarmonicSums`Private`ExpVar^8) - 1789/(2688*HarmonicSums`Private`ExpVar^7) + 419/(1152*HarmonicSums`Private`ExpVar^6) - 19/(160*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4) - (9*s6)/4 + ln2^4*(-19/(768*HarmonicSums`Private`ExpVar^10) + 263/(5760*HarmonicSums`Private`ExpVar^9) + 3/(512*HarmonicSums`Private`ExpVar^8) - 23/(2016*HarmonicSums`Private`ExpVar^7) - 1/(384*HarmonicSums`Private`ExpVar^6) + 19/(2880*HarmonicSums`Private`ExpVar^5) + 1/(384*HarmonicSums`Private`ExpVar^4) - 5/(288*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar) - z2/24) + (19/(320*HarmonicSums`Private`ExpVar^10) - 263/(2400*HarmonicSums`Private`ExpVar^9) - 9/(640*HarmonicSums`Private`ExpVar^8) + 23/(840*HarmonicSums`Private`ExpVar^7) + 1/(160*HarmonicSums`Private`ExpVar^6) - 19/(1200*HarmonicSums`Private`ExpVar^5) - 1/(160*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3) - 3/(40*HarmonicSums`Private`ExpVar^2) + 1/(10*HarmonicSums`Private`ExpVar))*z2^2 - (123*z2^3)/560 + (ln2^3*z3)/8 + (-1)^HarmonicSums`Private`ExpVar* (-100969/(10240*HarmonicSums`Private`ExpVar^10) + 12639/(35840*HarmonicSums`Private`ExpVar^9) + 9923/(7168*HarmonicSums`Private`ExpVar^8) - 91/(1280*HarmonicSums`Private`ExpVar^7) - 901/(2560*HarmonicSums`Private`ExpVar^6) + 5/(256*HarmonicSums`Private`ExpVar^5) + 37/(128*HarmonicSums`Private`ExpVar^4) - 21/(64*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2))*z3 + (-1)^HarmonicSums`Private`ExpVar* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z2*z3 + ln2^2*((19/(128*HarmonicSums`Private`ExpVar^10) - 263/(960*HarmonicSums`Private`ExpVar^9) - 9/(256*HarmonicSums`Private`ExpVar^8) + 23/(336*HarmonicSums`Private`ExpVar^7) + 1/(64*HarmonicSums`Private`ExpVar^6) - 19/(480*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - z2^2/10 + (-1)^HarmonicSums`Private`ExpVar* (93/(32*HarmonicSums`Private`ExpVar^10) - 51/(128*HarmonicSums`Private`ExpVar^8) + 3/(32*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^2) - 3/(16*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (465/(32*HarmonicSums`Private`ExpVar^10) - 255/(128*HarmonicSums`Private`ExpVar^8) + 15/(32*HarmonicSums`Private`ExpVar^6) - 15/(64*HarmonicSums`Private`ExpVar^4) + 15/(32*HarmonicSums`Private`ExpVar^2) - 15/(16*HarmonicSums`Private`ExpVar))*z5 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-589/(160*HarmonicSums`Private`ExpVar^10) + 323/(640*HarmonicSums`Private`ExpVar^8) - 19/(160*HarmonicSums`Private`ExpVar^6) + 19/(320*HarmonicSums`Private`ExpVar^4) - 19/(160*HarmonicSums`Private`ExpVar^2) + 19/(80*HarmonicSums`Private`ExpVar))*z2^2 + (-57/(256*HarmonicSums`Private`ExpVar^10) + 263/(640*HarmonicSums`Private`ExpVar^9) + 27/(512*HarmonicSums`Private`ExpVar^8) - 23/(224*HarmonicSums`Private`ExpVar^7) - 3/(128*HarmonicSums`Private`ExpVar^6) + 19/(320*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^3) + 9/(32*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*z3 + (11*z2*z3)/8 + (15*z5)/8), S[-1, -1, -1, 3, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (46885/(27648*HarmonicSums`Private`ExpVar^10) + 10887/(3584*HarmonicSums`Private`ExpVar^9) - 1903/(5376*HarmonicSums`Private`ExpVar^8) - 5/(6*HarmonicSums`Private`ExpVar^7) + 235/(384*HarmonicSums`Private`ExpVar^6) - 43/(192*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(240*HarmonicSums`Private`ExpVar^10) - 17/(960*HarmonicSums`Private`ExpVar^8) + 1/(240*HarmonicSums`Private`ExpVar^6) - 1/(480*HarmonicSums`Private`ExpVar^4) + 1/(240*HarmonicSums`Private`ExpVar^2) - 1/(120*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/(2*HarmonicSums`Private`ExpVar^10) + 17/(8*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) + (361/(2560*HarmonicSums`Private`ExpVar^10) - 4997/(19200*HarmonicSums`Private`ExpVar^9) - 171/(5120*HarmonicSums`Private`ExpVar^8) + 437/(6720*HarmonicSums`Private`ExpVar^7) + 19/(1280*HarmonicSums`Private`ExpVar^6) - 361/(9600*HarmonicSums`Private`ExpVar^5) - 19/(1280*HarmonicSums`Private`ExpVar^4) + 19/(192*HarmonicSums`Private`ExpVar^3) - 57/(320*HarmonicSums`Private`ExpVar^2) + 19/(80*HarmonicSums`Private`ExpVar))*z2^2 - (71*z2^3)/112 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar))*z2 + z3/8) + (-1)^HarmonicSums`Private`ExpVar* (100969/(7680*HarmonicSums`Private`ExpVar^10) - 4213/(8960*HarmonicSums`Private`ExpVar^9) - 9923/(5376*HarmonicSums`Private`ExpVar^8) + 91/(960*HarmonicSums`Private`ExpVar^7) + 901/(1920*HarmonicSums`Private`ExpVar^6) - 5/(192*HarmonicSums`Private`ExpVar^5) - 37/(96*HarmonicSums`Private`ExpVar^4) + 7/(16*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z3 + (-1)^HarmonicSums`Private`ExpVar* (341/(32*HarmonicSums`Private`ExpVar^10) - 187/(128*HarmonicSums`Private`ExpVar^8) + 11/(32*HarmonicSums`Private`ExpVar^6) - 11/(64*HarmonicSums`Private`ExpVar^4) + 11/(32*HarmonicSums`Private`ExpVar^2) - 11/(16*HarmonicSums`Private`ExpVar))*z2*z3 + (11*z3^2)/16 + ln2^2*((-19*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (93/(32*HarmonicSums`Private`ExpVar^10) - 51/(128*HarmonicSums`Private`ExpVar^8) + 3/(32*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^2) - 3/(16*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (-4929/(256*HarmonicSums`Private`ExpVar^10) + 2703/(1024*HarmonicSums`Private`ExpVar^8) - 159/(256*HarmonicSums`Private`ExpVar^6) + 159/(512*HarmonicSums`Private`ExpVar^4) - 159/(256*HarmonicSums`Private`ExpVar^2) + 159/(128*HarmonicSums`Private`ExpVar))*z5 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-31/(20*HarmonicSums`Private`ExpVar^10) + 17/(80*HarmonicSums`Private`ExpVar^8) - 1/(20*HarmonicSums`Private`ExpVar^6) + 1/(40*HarmonicSums`Private`ExpVar^4) - 1/(20*HarmonicSums`Private`ExpVar^2) + 1/(10*HarmonicSums`Private`ExpVar))*z2^2 + (-57/(256*HarmonicSums`Private`ExpVar^10) + 263/(640*HarmonicSums`Private`ExpVar^9) + 27/(512*HarmonicSums`Private`ExpVar^8) - 23/(224*HarmonicSums`Private`ExpVar^7) - 3/(128*HarmonicSums`Private`ExpVar^6) + 19/(320*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^3) + 9/(32*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*z3 - (z2*z3)/8 + (15*z5)/8), S[-1, -1, 1, -3, HarmonicSums`Private`ExpVar] :> -2*li6half - ln2^6/36 + (-1)^HarmonicSums`Private`ExpVar* (-442463/(46080*HarmonicSums`Private`ExpVar^10) + 75091/(53760*HarmonicSums`Private`ExpVar^9) + 1703/(1344*HarmonicSums`Private`ExpVar^8) - 767/(960*HarmonicSums`Private`ExpVar^7) + 73/(320*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-31/(80*HarmonicSums`Private`ExpVar^10) + 17/(320*HarmonicSums`Private`ExpVar^8) - 1/(80*HarmonicSums`Private`ExpVar^6) + 1/(160*HarmonicSums`Private`ExpVar^4) - 1/(80*HarmonicSums`Private`ExpVar^2) + 1/(40*HarmonicSums`Private`ExpVar)) + li4half*(19/(32*HarmonicSums`Private`ExpVar^10) - 263/(240*HarmonicSums`Private`ExpVar^9) - 9/(64*HarmonicSums`Private`ExpVar^8) + 23/(84*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^6) - 19/(120*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 5/(12*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar*li5half* (-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) - s6/4 + ln2^4*(19/(768*HarmonicSums`Private`ExpVar^10) - 263/(5760*HarmonicSums`Private`ExpVar^9) - 3/(512*HarmonicSums`Private`ExpVar^8) + 23/(2016*HarmonicSums`Private`ExpVar^7) + 1/(384*HarmonicSums`Private`ExpVar^6) - 19/(2880*HarmonicSums`Private`ExpVar^5) - 1/(384*HarmonicSums`Private`ExpVar^4) + 5/(288*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar) + (5*z2)/48) + (-57/(256*HarmonicSums`Private`ExpVar^10) + 263/(640*HarmonicSums`Private`ExpVar^9) + 27/(512*HarmonicSums`Private`ExpVar^8) - 23/(224*HarmonicSums`Private`ExpVar^7) - 3/(128*HarmonicSums`Private`ExpVar^6) + 19/(320*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^3) + 9/(32*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*z2^2 + (8*z2^3)/35 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar))*z2 - z3/6) + (-19403/(10240*HarmonicSums`Private`ExpVar^10) + 134307/(179200*HarmonicSums`Private`ExpVar^9) + 9889/(28672*HarmonicSums`Private`ExpVar^8) - 439/(2940*HarmonicSums`Private`ExpVar^7) - 299/(2560*HarmonicSums`Private`ExpVar^6) + 1207/(19200*HarmonicSums`Private`ExpVar^5) + 47/(512*HarmonicSums`Private`ExpVar^4) - 23/(192*HarmonicSums`Private`ExpVar^3) - 3/(64*HarmonicSums`Private`ExpVar^2) + 3/(8*HarmonicSums`Private`ExpVar))*z3 + (57/(256*HarmonicSums`Private`ExpVar^10) - 263/(640*HarmonicSums`Private`ExpVar^9) - 27/(512*HarmonicSums`Private`ExpVar^8) + 23/(224*HarmonicSums`Private`ExpVar^7) + 3/(128*HarmonicSums`Private`ExpVar^6) - 19/(320*HarmonicSums`Private`ExpVar^5) - 3/(128*HarmonicSums`Private`ExpVar^4) + 5/(32*HarmonicSums`Private`ExpVar^3) - 9/(32*HarmonicSums`Private`ExpVar^2) + 3/(8*HarmonicSums`Private`ExpVar))*sinf*z3 - (25*z3^2)/64 + ln2^2*(-li4half + (-19/(128*HarmonicSums`Private`ExpVar^10) + 263/(960*HarmonicSums`Private`ExpVar^9) + 9/(256*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) - 1/(64*HarmonicSums`Private`ExpVar^6) + 19/(480*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 - (9*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z3) + z2*(-(li4half/2) + (-1)^HarmonicSums`Private`ExpVar* (-279/(32*HarmonicSums`Private`ExpVar^10) + 153/(128*HarmonicSums`Private`ExpVar^8) - 9/(32*HarmonicSums`Private`ExpVar^6) + 9/(64*HarmonicSums`Private`ExpVar^4) - 9/(32*HarmonicSums`Private`ExpVar^2) + 9/(16*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (4743/(128*HarmonicSums`Private`ExpVar^10) - 2601/(512*HarmonicSums`Private`ExpVar^8) + 153/(128*HarmonicSums`Private`ExpVar^6) - 153/(256*HarmonicSums`Private`ExpVar^4) + 153/(128*HarmonicSums`Private`ExpVar^2) - 153/(64*HarmonicSums`Private`ExpVar))*z5 + ln2*(-2*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/(2*HarmonicSums`Private`ExpVar^10) + 17/(8*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(20*HarmonicSums`Private`ExpVar^10) + 17/(80*HarmonicSums`Private`ExpVar^8) - 1/(20*HarmonicSums`Private`ExpVar^6) + 1/(40*HarmonicSums`Private`ExpVar^4) - 1/(20*HarmonicSums`Private`ExpVar^2) + 1/(10*HarmonicSums`Private`ExpVar))*z2^2 + (133/(256*HarmonicSums`Private`ExpVar^10) - 1841/(1920*HarmonicSums`Private`ExpVar^9) - 63/(512*HarmonicSums`Private`ExpVar^8) + 23/(96*HarmonicSums`Private`ExpVar^7) + 7/(128*HarmonicSums`Private`ExpVar^6) - 133/(960*HarmonicSums`Private`ExpVar^5) - 7/(128*HarmonicSums`Private`ExpVar^4) + 35/(96*HarmonicSums`Private`ExpVar^3) - 21/(32*HarmonicSums`Private`ExpVar^2) + 7/(8*HarmonicSums`Private`ExpVar))*z3 - (9*z2*z3)/16 + (151*z5)/64), S[-1, -1, 1, 3, HarmonicSums`Private`ExpVar] :> -(ln2^6/40) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-31/(60*HarmonicSums`Private`ExpVar^10) + 17/(240*HarmonicSums`Private`ExpVar^8) - 1/(60*HarmonicSums`Private`ExpVar^6) + 1/(120*HarmonicSums`Private`ExpVar^4) - 1/(60*HarmonicSums`Private`ExpVar^2) + 1/(30*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/(2*HarmonicSums`Private`ExpVar^10) + 17/(8*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) + 37183/(23040*HarmonicSums`Private`ExpVar^10) + 57559/(103680*HarmonicSums`Private`ExpVar^9) - 2359/(9216*HarmonicSums`Private`ExpVar^8) - 3259/(8064*HarmonicSums`Private`ExpVar^7) + 629/(1152*HarmonicSums`Private`ExpVar^6) - 11/(30*HarmonicSums`Private`ExpVar^5) + 31/(192*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) - (5*s6)/2 + (19/(640*HarmonicSums`Private`ExpVar^10) - 263/(4800*HarmonicSums`Private`ExpVar^9) - 9/(1280*HarmonicSums`Private`ExpVar^8) + 23/(1680*HarmonicSums`Private`ExpVar^7) + 1/(320*HarmonicSums`Private`ExpVar^6) - 19/(2400*HarmonicSums`Private`ExpVar^5) - 1/(320*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^3) - 3/(80*HarmonicSums`Private`ExpVar^2) + 1/(20*HarmonicSums`Private`ExpVar))*z2^2 + (201*z2^3)/280 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(12*HarmonicSums`Private`ExpVar^10) - 17/(48*HarmonicSums`Private`ExpVar^8) + 1/(12*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar))*z2 - z3/6) + (19403/(7680*HarmonicSums`Private`ExpVar^10) - 44769/(44800*HarmonicSums`Private`ExpVar^9) - 9889/(21504*HarmonicSums`Private`ExpVar^8) + 439/(2205*HarmonicSums`Private`ExpVar^7) + 299/(1920*HarmonicSums`Private`ExpVar^6) - 1207/(14400*HarmonicSums`Private`ExpVar^5) - 47/(384*HarmonicSums`Private`ExpVar^4) + 23/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z3 + (-19/(64*HarmonicSums`Private`ExpVar^10) + 263/(480*HarmonicSums`Private`ExpVar^9) + 9/(128*HarmonicSums`Private`ExpVar^8) - 23/(168*HarmonicSums`Private`ExpVar^7) - 1/(32*HarmonicSums`Private`ExpVar^6) + 19/(240*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))* sinf*z3 + (163*z3^2)/128 + z2*(-2*li4half + (-1)^HarmonicSums`Private`ExpVar* (217/(64*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^6) - 7/(128*HarmonicSums`Private`ExpVar^4) + 7/(64*HarmonicSums`Private`ExpVar^2) - 7/(32*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(-li4half + (2*z2^2)/5 + (-1)^HarmonicSums`Private`ExpVar* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (4681/(256*HarmonicSums`Private`ExpVar^10) - 2567/(1024*HarmonicSums`Private`ExpVar^8) + 151/(256*HarmonicSums`Private`ExpVar^6) - 151/(512*HarmonicSums`Private`ExpVar^4) + 151/(256*HarmonicSums`Private`ExpVar^2) - 151/(128*HarmonicSums`Private`ExpVar))*z5 + ln2*(-2*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/(2*HarmonicSums`Private`ExpVar^10) + 17/(8*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar* (-589/(160*HarmonicSums`Private`ExpVar^10) + 323/(640*HarmonicSums`Private`ExpVar^8) - 19/(160*HarmonicSums`Private`ExpVar^6) + 19/(320*HarmonicSums`Private`ExpVar^4) - 19/(160*HarmonicSums`Private`ExpVar^2) + 19/(80*HarmonicSums`Private`ExpVar))*z2^2 - (3*z2*z3)/8 + (151*z5)/64), S[-1, 1, -3, -1, HarmonicSums`Private`ExpVar] :> -2*li6half - ln2^6/90 + (-1)^HarmonicSums`Private`ExpVar* (678481/(414720*HarmonicSums`Private`ExpVar^10) + 20743/(23040*HarmonicSums`Private`ExpVar^9) - 199/(1536*HarmonicSums`Private`ExpVar^8) - 2369/(5760*HarmonicSums`Private`ExpVar^7) + 3881/(11520*HarmonicSums`Private`ExpVar^6) - 157/(1152*HarmonicSums`Private`ExpVar^5) + 1/(36*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-1185/(32*HarmonicSums`Private`ExpVar^10) - 119/(16*HarmonicSums`Private`ExpVar^9) + 147/(32*HarmonicSums`Private`ExpVar^8) + 5/(4*HarmonicSums`Private`ExpVar^7) - 15/(16*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(-395/(256*HarmonicSums`Private`ExpVar^10) - 119/(384*HarmonicSums`Private`ExpVar^9) + 49/(256*HarmonicSums`Private`ExpVar^8) + 5/(96*HarmonicSums`Private`ExpVar^7) - 5/(128*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(96*HarmonicSums`Private`ExpVar^3) - 1/(48*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-31/(240*HarmonicSums`Private`ExpVar^10) + 17/(960*HarmonicSums`Private`ExpVar^8) - 1/(240*HarmonicSums`Private`ExpVar^6) + 1/(480*HarmonicSums`Private`ExpVar^4) - 1/(240*HarmonicSums`Private`ExpVar^2) + 1/(120*HarmonicSums`Private`ExpVar)) - s6/4 + (-1)^HarmonicSums`Private`ExpVar* (711/(64*HarmonicSums`Private`ExpVar^10) + 357/(160*HarmonicSums`Private`ExpVar^9) - 441/(320*HarmonicSums`Private`ExpVar^8) - 3/(8*HarmonicSums`Private`ExpVar^7) + 9/(32*HarmonicSums`Private`ExpVar^6) + 9/(80*HarmonicSums`Private`ExpVar^5) - 9/(80*HarmonicSums`Private`ExpVar^4) - 3/(40*HarmonicSums`Private`ExpVar^3) + 3/(20*HarmonicSums`Private`ExpVar^2))*z2^2 + (41*z2^3)/210 + sinf*((-1)^HarmonicSums`Private`ExpVar*li4half* (31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (31/(48*HarmonicSums`Private`ExpVar^10) - 17/(192*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^2*(-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-93/(20*HarmonicSums`Private`ExpVar^10) + 51/(80*HarmonicSums`Private`ExpVar^8) - 3/(20*HarmonicSums`Private`ExpVar^6) + 3/(40*HarmonicSums`Private`ExpVar^4) - 3/(20*HarmonicSums`Private`ExpVar^2) + 3/(10*HarmonicSums`Private`ExpVar))*z2^2) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar))*z2 - (7*z3)/24) - (9*z3^2)/64 + z2*(li4half + (-1)^HarmonicSums`Private`ExpVar* (-217/(32*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^6) + 7/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(-li4half + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (7*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (-217/(32*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^6) + 7/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (-465/(128*HarmonicSums`Private`ExpVar^10) + 255/(512*HarmonicSums`Private`ExpVar^8) - 15/(128*HarmonicSums`Private`ExpVar^6) + 15/(256*HarmonicSums`Private`ExpVar^4) - 15/(128*HarmonicSums`Private`ExpVar^2) + 15/(64*HarmonicSums`Private`ExpVar))*z5 + ln2*(-4*li5half + 3223/(640*HarmonicSums`Private`ExpVar^10) + 9571/(2880*HarmonicSums`Private`ExpVar^9) - 881/(768*HarmonicSums`Private`ExpVar^8) - 143/(224*HarmonicSums`Private`ExpVar^7) + 67/(96*HarmonicSums`Private`ExpVar^6) - 3/(10*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) + (-1)^HarmonicSums`Private`ExpVar* (527/(80*HarmonicSums`Private`ExpVar^10) - 289/(320*HarmonicSums`Private`ExpVar^8) + 17/(80*HarmonicSums`Private`ExpVar^6) - 17/(160*HarmonicSums`Private`ExpVar^4) + 17/(80*HarmonicSums`Private`ExpVar^2) - 17/(40*HarmonicSums`Private`ExpVar))*z2^2 - (11*z2*z3)/16 + (39*z5)/16), S[-1, 1, -3, 1, HarmonicSums`Private`ExpVar] :> -6*li6half - ln2^6/60 + (-1)^HarmonicSums`Private`ExpVar*li4half* (1185/(32*HarmonicSums`Private`ExpVar^10) + 119/(16*HarmonicSums`Private`ExpVar^9) - 147/(32*HarmonicSums`Private`ExpVar^8) - 5/(4*HarmonicSums`Private`ExpVar^7) + 15/(16*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-31/(30*HarmonicSums`Private`ExpVar^10) + 17/(120*HarmonicSums`Private`ExpVar^8) - 1/(30*HarmonicSums`Private`ExpVar^6) + 1/(60*HarmonicSums`Private`ExpVar^4) - 1/(30*HarmonicSums`Private`ExpVar^2) + 1/(15*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) + 664717/(230400*HarmonicSums`Private`ExpVar^10) + 23572571/(7257600*HarmonicSums`Private`ExpVar^9) - 78403/(129024*HarmonicSums`Private`ExpVar^8) - 19279/(47040*HarmonicSums`Private`ExpVar^7) + 299/(1440*HarmonicSums`Private`ExpVar^6) - 7/(800*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) - 4*s6 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(256*HarmonicSums`Private`ExpVar^10) + 119/(384*HarmonicSums`Private`ExpVar^9) - 49/(256*HarmonicSums`Private`ExpVar^8) - 5/(96*HarmonicSums`Private`ExpVar^7) + 5/(128*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2)) - z2/12) + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (31/(6*HarmonicSums`Private`ExpVar^10) - 17/(24*HarmonicSums`Private`ExpVar^8) + 1/(6*HarmonicSums`Private`ExpVar^6) - 1/(12*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^2) - 1/(3*HarmonicSums`Private`ExpVar))* z2 + (-1)^HarmonicSums`Private`ExpVar* (-2607/(128*HarmonicSums`Private`ExpVar^10) - 1309/(320*HarmonicSums`Private`ExpVar^9) + 1617/(640*HarmonicSums`Private`ExpVar^8) + 11/(16*HarmonicSums`Private`ExpVar^7) - 33/(64*HarmonicSums`Private`ExpVar^6) - 33/(160*HarmonicSums`Private`ExpVar^5) + 33/(160*HarmonicSums`Private`ExpVar^4) + 11/(80*HarmonicSums`Private`ExpVar^3) - 11/(40*HarmonicSums`Private`ExpVar^2))*z2^2 + (673*z2^3)/420 + (179*z3^2)/64 + z2*(-3*li4half + (-1)^HarmonicSums`Private`ExpVar* (217/(32*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^6) - 7/(64*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(-li4half + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + z2^2 + (-1)^HarmonicSums`Private`ExpVar* (-217/(16*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^6) + 7/(32*HarmonicSums`Private`ExpVar^4) - 7/(16*HarmonicSums`Private`ExpVar^2) + 7/(8*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(48*HarmonicSums`Private`ExpVar^10) + 17/(192*HarmonicSums`Private`ExpVar^8) - 1/(48*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-31/(2*HarmonicSums`Private`ExpVar^10) + 17/(8*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) - 3223/(640*HarmonicSums`Private`ExpVar^10) - 9571/(2880*HarmonicSums`Private`ExpVar^9) + 881/(768*HarmonicSums`Private`ExpVar^8) + 143/(224*HarmonicSums`Private`ExpVar^7) - 67/(96*HarmonicSums`Private`ExpVar^6) + 3/(10*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + (-1)^HarmonicSums`Private`ExpVar* ln2^2*(31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (341/(40*HarmonicSums`Private`ExpVar^10) - 187/(160*HarmonicSums`Private`ExpVar^8) + 11/(40*HarmonicSums`Private`ExpVar^6) - 11/(80*HarmonicSums`Private`ExpVar^4) + 11/(40*HarmonicSums`Private`ExpVar^2) - 11/(20*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (-217/(16*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^6) + 7/(32*HarmonicSums`Private`ExpVar^4) - 7/(16*HarmonicSums`Private`ExpVar^2) + 7/(8*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (1209/(64*HarmonicSums`Private`ExpVar^10) - 663/(256*HarmonicSums`Private`ExpVar^8) + 39/(64*HarmonicSums`Private`ExpVar^6) - 39/(128*HarmonicSums`Private`ExpVar^4) + 39/(64*HarmonicSums`Private`ExpVar^2) - 39/(32*HarmonicSums`Private`ExpVar))*z5 + ln2*(-4*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (8295/(256*HarmonicSums`Private`ExpVar^10) + 833/(128*HarmonicSums`Private`ExpVar^9) - 1029/(256*HarmonicSums`Private`ExpVar^8) - 35/(32*HarmonicSums`Private`ExpVar^7) + 105/(128*HarmonicSums`Private`ExpVar^6) + 21/(64*HarmonicSums`Private`ExpVar^5) - 21/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2))*z3 - (7*z2*z3)/4 + (39*z5)/16), S[-1, 1, 3, -1, HarmonicSums`Private`ExpVar] :> -8*li6half - (13*ln2^6)/360 + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (31/(240*HarmonicSums`Private`ExpVar^10) - 17/(960*HarmonicSums`Private`ExpVar^8) + 1/(240*HarmonicSums`Private`ExpVar^6) - 1/(480*HarmonicSums`Private`ExpVar^4) + 1/(240*HarmonicSums`Private`ExpVar^2) - 1/(120*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/(2*HarmonicSums`Private`ExpVar^10) + 17/(8*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) - 5949/(1280*HarmonicSums`Private`ExpVar^10) + 4501/(5760*HarmonicSums`Private`ExpVar^9) + 1169/(1536*HarmonicSums`Private`ExpVar^8) - 17/(32*HarmonicSums`Private`ExpVar^7) + 1/(6*HarmonicSums`Private`ExpVar^6) - 1/(40*HarmonicSums`Private`ExpVar^5) - 4*s6 - li4half*z2 + (5*ln2^4*z2)/24 + (-1)^HarmonicSums`Private`ExpVar* (1185/(512*HarmonicSums`Private`ExpVar^10) + 119/(256*HarmonicSums`Private`ExpVar^9) - 147/(512*HarmonicSums`Private`ExpVar^8) - 5/(64*HarmonicSums`Private`ExpVar^7) + 15/(256*HarmonicSums`Private`ExpVar^6) + 3/(128*HarmonicSums`Private`ExpVar^5) - 3/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2))*z2^2 + (251*z2^3)/210 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar))*z2 - (7*z3)/24) + (211*z3^2)/128 + sinf*((-1)^HarmonicSums`Private`ExpVar* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (217/(16*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^6) - 7/(32*HarmonicSums`Private`ExpVar^4) + 7/(16*HarmonicSums`Private`ExpVar^2) - 7/(8*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(-li4half + (11*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (217/(32*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^6) - 7/(64*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (3875/(256*HarmonicSums`Private`ExpVar^10) - 2125/(1024*HarmonicSums`Private`ExpVar^8) + 125/(256*HarmonicSums`Private`ExpVar^6) - 125/(512*HarmonicSums`Private`ExpVar^4) + 125/(256*HarmonicSums`Private`ExpVar^2) - 125/(128*HarmonicSums`Private`ExpVar))*z5 + ln2*(-2*li5half + (-1)^HarmonicSums`Private`ExpVar* (1045/(288*HarmonicSums`Private`ExpVar^10) - 505/(144*HarmonicSums`Private`ExpVar^9) - 667/(1152*HarmonicSums`Private`ExpVar^8) + 167/(288*HarmonicSums`Private`ExpVar^7) + 73/(192*HarmonicSums`Private`ExpVar^6) - 61/(96*HarmonicSums`Private`ExpVar^5) + 19/(48*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-527/(80*HarmonicSums`Private`ExpVar^10) + 289/(320*HarmonicSums`Private`ExpVar^8) - 17/(80*HarmonicSums`Private`ExpVar^6) + 17/(160*HarmonicSums`Private`ExpVar^4) - 17/(80*HarmonicSums`Private`ExpVar^2) + 17/(40*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (-8295/(256*HarmonicSums`Private`ExpVar^10) - 833/(128*HarmonicSums`Private`ExpVar^9) + 1029/(256*HarmonicSums`Private`ExpVar^8) + 35/(32*HarmonicSums`Private`ExpVar^7) - 105/(128*HarmonicSums`Private`ExpVar^6) - 21/(64*HarmonicSums`Private`ExpVar^5) + 21/(64*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2))*z3 + (11*z2*z3)/16 + (125*z5)/64), S[-1, 1, 3, 1, HarmonicSums`Private`ExpVar] :> -(ln2^6/40) + (-1)^HarmonicSums`Private`ExpVar* (3269/(512*HarmonicSums`Private`ExpVar^10) - 3635/(6912*HarmonicSums`Private`ExpVar^9) - 1249/(1728*HarmonicSums`Private`ExpVar^8) - 359/(3456*HarmonicSums`Private`ExpVar^7) + 59/(384*HarmonicSums`Private`ExpVar^6) + 31/(192*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (3*s6)/2 + li4half*z2 + (ln2^4*z2)/8 + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2^2 - (43*z2^3)/120 + ln2^2*(-li4half - (4*z2^2)/5) + sinf*((-1)^HarmonicSums`Private`ExpVar* (-1045/(288*HarmonicSums`Private`ExpVar^10) + 505/(144*HarmonicSums`Private`ExpVar^9) + 667/(1152*HarmonicSums`Private`ExpVar^8) - 167/(288*HarmonicSums`Private`ExpVar^7) - 73/(192*HarmonicSums`Private`ExpVar^6) + 61/(96*HarmonicSums`Private`ExpVar^5) - 19/(48*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2^2) - (67*z3^2)/128 + (-1)^HarmonicSums`Private`ExpVar*(31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))* z5 + ln2*(-2*li5half + (125*z5)/64), S[-1, 1, -2, -2, HarmonicSums`Private`ExpVar] :> 12*li6half - ln2^6/60 + (-1)^HarmonicSums`Private`ExpVar* (16577/(20736*HarmonicSums`Private`ExpVar^10) + 1105/(896*HarmonicSums`Private`ExpVar^9) - 41/(16128*HarmonicSums`Private`ExpVar^8) - 313/(576*HarmonicSums`Private`ExpVar^7) + 443/(1152*HarmonicSums`Private`ExpVar^6) - 83/(576*HarmonicSums`Private`ExpVar^5) + 1/(36*HarmonicSums`Private`ExpVar^4)) + 7*s6 + (ln2^4*z2)/12 - (17*ln2^2*z2^2)/16 + (-1)^HarmonicSums`Private`ExpVar* (3081/(512*HarmonicSums`Private`ExpVar^10) + 1547/(1280*HarmonicSums`Private`ExpVar^9) - 1911/(2560*HarmonicSums`Private`ExpVar^8) - 13/(64*HarmonicSums`Private`ExpVar^7) + 39/(256*HarmonicSums`Private`ExpVar^6) + 39/(640*HarmonicSums`Private`ExpVar^5) - 39/(640*HarmonicSums`Private`ExpVar^4) - 13/(320*HarmonicSums`Private`ExpVar^3) + 13/(160*HarmonicSums`Private`ExpVar^2))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (-403/(160*HarmonicSums`Private`ExpVar^10) + 221/(640*HarmonicSums`Private`ExpVar^8) - 13/(160*HarmonicSums`Private`ExpVar^6) + 13/(320*HarmonicSums`Private`ExpVar^4) - 13/(160*HarmonicSums`Private`ExpVar^2) + 13/(80*HarmonicSums`Private`ExpVar))*sinf*z2^2 - (178*z2^3)/105 - (37*z3^2)/16 + z2*(-1259/(320*HarmonicSums`Private`ExpVar^10) + 1207/(1440*HarmonicSums`Private`ExpVar^9) + 61/(96*HarmonicSums`Private`ExpVar^8) - 173/(672*HarmonicSums`Private`ExpVar^7) - 35/(192*HarmonicSums`Private`ExpVar^6) + 119/(480*HarmonicSums`Private`ExpVar^5) - 9/(64*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (155/(32*HarmonicSums`Private`ExpVar^10) - 85/(128*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^4) + 5/(32*HarmonicSums`Private`ExpVar^2) - 5/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(4*li5half - (5*z2*z3)/16 - (103*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-1271/(128*HarmonicSums`Private`ExpVar^10) + 697/(512*HarmonicSums`Private`ExpVar^8) - 41/(128*HarmonicSums`Private`ExpVar^6) + 41/(256*HarmonicSums`Private`ExpVar^4) - 41/(128*HarmonicSums`Private`ExpVar^2) + 41/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, 1, -2, 2, HarmonicSums`Private`ExpVar] :> 8*li6half - ln2^6/45 + (-1)^HarmonicSums`Private`ExpVar*li4half* (-1185/(16*HarmonicSums`Private`ExpVar^10) - 119/(8*HarmonicSums`Private`ExpVar^9) + 147/(16*HarmonicSums`Private`ExpVar^8) + 5/(2*HarmonicSums`Private`ExpVar^7) - 15/(8*HarmonicSums`Private`ExpVar^6) - 3/(4*HarmonicSums`Private`ExpVar^5) + 3/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^3) - HarmonicSums`Private`ExpVar^ (-2)) + (-1)^HarmonicSums`Private`ExpVar*li5half* (31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (31/(30*HarmonicSums`Private`ExpVar^10) - 17/(120*HarmonicSums`Private`ExpVar^8) + 1/(30*HarmonicSums`Private`ExpVar^6) - 1/(60*HarmonicSums`Private`ExpVar^4) + 1/(30*HarmonicSums`Private`ExpVar^2) - 1/(15*HarmonicSums`Private`ExpVar)) + 1739/(2100*HarmonicSums`Private`ExpVar^10) + 36193/(8640*HarmonicSums`Private`ExpVar^9) - 5477/(11520*HarmonicSums`Private`ExpVar^8) - 8/(7*HarmonicSums`Private`ExpVar^7) + 31/(36*HarmonicSums`Private`ExpVar^6) - 13/(40*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) + (15*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-395/(128*HarmonicSums`Private`ExpVar^10) - 119/(192*HarmonicSums`Private`ExpVar^9) + 49/(128*HarmonicSums`Private`ExpVar^8) + 5/(48*HarmonicSums`Private`ExpVar^7) - 5/(64*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) + z2/3) + (-1)^HarmonicSums`Private`ExpVar* (12087/(512*HarmonicSums`Private`ExpVar^10) + 6069/(1280*HarmonicSums`Private`ExpVar^9) - 7497/(2560*HarmonicSums`Private`ExpVar^8) - 51/(64*HarmonicSums`Private`ExpVar^7) + 153/(256*HarmonicSums`Private`ExpVar^6) + 153/(640*HarmonicSums`Private`ExpVar^5) - 153/(640*HarmonicSums`Private`ExpVar^4) - 51/(320*HarmonicSums`Private`ExpVar^3) + 51/(160*HarmonicSums`Private`ExpVar^2))*z2^2 - (3571*z2^3)/1680 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-31/(6*HarmonicSums`Private`ExpVar^10) + 17/(24*HarmonicSums`Private`ExpVar^8) - 1/(6*HarmonicSums`Private`ExpVar^6) + 1/(12*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^2) + 1/(3*HarmonicSums`Private`ExpVar))*z2 - (7*z3)/12) - (217*z3^2)/128 + sinf*((-1)^HarmonicSums`Private`ExpVar*li4half* (31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^2*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-1581/(160*HarmonicSums`Private`ExpVar^10) + 867/(640*HarmonicSums`Private`ExpVar^8) - 51/(160*HarmonicSums`Private`ExpVar^6) + 51/(320*HarmonicSums`Private`ExpVar^4) - 51/(160*HarmonicSums`Private`ExpVar^2) + 51/(80*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (217/(8*HarmonicSums`Private`ExpVar^10) - 119/(32*HarmonicSums`Private`ExpVar^8) + 7/(8*HarmonicSums`Private`ExpVar^6) - 7/(16*HarmonicSums`Private`ExpVar^4) + 7/(8*HarmonicSums`Private`ExpVar^2) - 7/(4*HarmonicSums`Private`ExpVar))*z3) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (1185/(64*HarmonicSums`Private`ExpVar^10) + 119/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2 - (13*z2^2)/20 + (-1)^HarmonicSums`Private`ExpVar* (217/(16*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^6) - 7/(32*HarmonicSums`Private`ExpVar^4) + 7/(16*HarmonicSums`Private`ExpVar^2) - 7/(8*HarmonicSums`Private`ExpVar))*z3) + z2*(4*li4half + 1259/(160*HarmonicSums`Private`ExpVar^10) - 1207/(720*HarmonicSums`Private`ExpVar^9) - 61/(48*HarmonicSums`Private`ExpVar^8) + 173/(336*HarmonicSums`Private`ExpVar^7) + 35/(96*HarmonicSums`Private`ExpVar^6) - 119/(240*HarmonicSums`Private`ExpVar^5) + 9/(32*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (-155/(64*HarmonicSums`Private`ExpVar^10) + 85/(256*HarmonicSums`Private`ExpVar^8) - 5/(64*HarmonicSums`Private`ExpVar^6) + 5/(128*HarmonicSums`Private`ExpVar^4) - 5/(64*HarmonicSums`Private`ExpVar^2) + 5/(32*HarmonicSums`Private`ExpVar))*z3) + ln2*(4*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (-8295/(128*HarmonicSums`Private`ExpVar^10) - 833/(64*HarmonicSums`Private`ExpVar^9) + 1029/(128*HarmonicSums`Private`ExpVar^8) + 35/(16*HarmonicSums`Private`ExpVar^7) - 105/(64*HarmonicSums`Private`ExpVar^6) - 21/(32*HarmonicSums`Private`ExpVar^5) + 21/(32*HarmonicSums`Private`ExpVar^4) + 7/(16*HarmonicSums`Private`ExpVar^3) - 7/(8*HarmonicSums`Private`ExpVar^2))*z3 + (19*z2*z3)/8 - (103*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-3193/(128*HarmonicSums`Private`ExpVar^10) + 1751/(512*HarmonicSums`Private`ExpVar^8) - 103/(128*HarmonicSums`Private`ExpVar^6) + 103/(256*HarmonicSums`Private`ExpVar^4) - 103/(128*HarmonicSums`Private`ExpVar^2) + 103/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, 1, 2, -2, HarmonicSums`Private`ExpVar] :> -8*li6half + ln2^6/45 + (-1)^HarmonicSums`Private`ExpVar*li4half* (1185/(16*HarmonicSums`Private`ExpVar^10) + 119/(8*HarmonicSums`Private`ExpVar^9) - 147/(16*HarmonicSums`Private`ExpVar^8) - 5/(2*HarmonicSums`Private`ExpVar^7) + 15/(8*HarmonicSums`Private`ExpVar^6) + 3/(4*HarmonicSums`Private`ExpVar^5) - 3/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^3) + HarmonicSums`Private`ExpVar^ (-2)) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-31/(30*HarmonicSums`Private`ExpVar^10) + 17/(120*HarmonicSums`Private`ExpVar^8) - 1/(30*HarmonicSums`Private`ExpVar^6) + 1/(60*HarmonicSums`Private`ExpVar^4) - 1/(30*HarmonicSums`Private`ExpVar^2) + 1/(15*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) - 3907/(640*HarmonicSums`Private`ExpVar^10) + 809/(1440*HarmonicSums`Private`ExpVar^9) + 197/(192*HarmonicSums`Private`ExpVar^8) - 137/(224*HarmonicSums`Private`ExpVar^7) + 17/(96*HarmonicSums`Private`ExpVar^6) - 1/(40*HarmonicSums`Private`ExpVar^5) - (19*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(128*HarmonicSums`Private`ExpVar^10) + 119/(192*HarmonicSums`Private`ExpVar^9) - 49/(128*HarmonicSums`Private`ExpVar^8) - 5/(48*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) - (11*z2)/24) + (-1)^HarmonicSums`Private`ExpVar* (-20145/(512*HarmonicSums`Private`ExpVar^10) - 2023/(256*HarmonicSums`Private`ExpVar^9) + 2499/(512*HarmonicSums`Private`ExpVar^8) + 85/(64*HarmonicSums`Private`ExpVar^7) - 255/(256*HarmonicSums`Private`ExpVar^6) - 51/(128*HarmonicSums`Private`ExpVar^5) + 51/(128*HarmonicSums`Private`ExpVar^4) + 17/(64*HarmonicSums`Private`ExpVar^3) - 17/(32*HarmonicSums`Private`ExpVar^2))*z2^2 + (2641*z2^3)/840 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(6*HarmonicSums`Private`ExpVar^10) - 17/(24*HarmonicSums`Private`ExpVar^8) + 1/(6*HarmonicSums`Private`ExpVar^6) - 1/(12*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^2) - 1/(3*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/12) + (499*z3^2)/128 + z2*(-7*li4half + (-1)^HarmonicSums`Private`ExpVar* (17101/(1600*HarmonicSums`Private`ExpVar^10) - 39307/(39200*HarmonicSums`Private`ExpVar^9) - 411413/(282240*HarmonicSums`Private`ExpVar^8) + 1129/(7200*HarmonicSums`Private`ExpVar^7) + 4819/(14400*HarmonicSums`Private`ExpVar^6) + 11/(288*HarmonicSums`Private`ExpVar^5) - 115/(288*HarmonicSums`Private`ExpVar^4) + 7/(16*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z3) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-1185/(64*HarmonicSums`Private`ExpVar^10) - 119/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (153*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (-217/(16*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^6) + 7/(32*HarmonicSums`Private`ExpVar^4) - 7/(16*HarmonicSums`Private`ExpVar^2) + 7/(8*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (527/(32*HarmonicSums`Private`ExpVar^10) - 289/(128*HarmonicSums`Private`ExpVar^8) + 17/(32*HarmonicSums`Private`ExpVar^6) - 17/(64*HarmonicSums`Private`ExpVar^4) + 17/(32*HarmonicSums`Private`ExpVar^2) - 17/(16*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (-217/(8*HarmonicSums`Private`ExpVar^10) + 119/(32*HarmonicSums`Private`ExpVar^8) - 7/(8*HarmonicSums`Private`ExpVar^6) + 7/(16*HarmonicSums`Private`ExpVar^4) - 7/(8*HarmonicSums`Private`ExpVar^2) + 7/(4*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (2263/(256*HarmonicSums`Private`ExpVar^10) - 1241/(1024*HarmonicSums`Private`ExpVar^8) + 73/(256*HarmonicSums`Private`ExpVar^6) - 73/(512*HarmonicSums`Private`ExpVar^4) + 73/(256*HarmonicSums`Private`ExpVar^2) - 73/(128*HarmonicSums`Private`ExpVar))*z5 + ln2*(-4*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (8295/(128*HarmonicSums`Private`ExpVar^10) + 833/(64*HarmonicSums`Private`ExpVar^9) - 1029/(128*HarmonicSums`Private`ExpVar^8) - 35/(16*HarmonicSums`Private`ExpVar^7) + 105/(64*HarmonicSums`Private`ExpVar^6) + 21/(32*HarmonicSums`Private`ExpVar^5) - 21/(32*HarmonicSums`Private`ExpVar^4) - 7/(16*HarmonicSums`Private`ExpVar^3) + 7/(8*HarmonicSums`Private`ExpVar^2))*z3 - (37*z2*z3)/8 + (73*z5)/64), S[-1, 1, 2, 2, HarmonicSums`Private`ExpVar] :> -12*li6half + ln2^6/60 + (-1)^HarmonicSums`Private`ExpVar* (573253/(103680*HarmonicSums`Private`ExpVar^10) - 46687/(17280*HarmonicSums`Private`ExpVar^9) - 182671/(241920*HarmonicSums`Private`ExpVar^8) + 1841/(8640*HarmonicSums`Private`ExpVar^7) + 4039/(5760*HarmonicSums`Private`ExpVar^6) - 443/(576*HarmonicSums`Private`ExpVar^5) + 61/(144*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) - (17*s6)/4 - (ln2^4*z2)/48 + (21*ln2^2*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (1659/(128*HarmonicSums`Private`ExpVar^10) + 833/(320*HarmonicSums`Private`ExpVar^9) - 1029/(640*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) + 21/(64*HarmonicSums`Private`ExpVar^6) + 21/(160*HarmonicSums`Private`ExpVar^5) - 21/(160*HarmonicSums`Private`ExpVar^4) - 7/(80*HarmonicSums`Private`ExpVar^3) + 7/(40*HarmonicSums`Private`ExpVar^2))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (-217/(40*HarmonicSums`Private`ExpVar^10) + 119/(160*HarmonicSums`Private`ExpVar^8) - 7/(40*HarmonicSums`Private`ExpVar^6) + 7/(80*HarmonicSums`Private`ExpVar^4) - 7/(40*HarmonicSums`Private`ExpVar^2) + 7/(20*HarmonicSums`Private`ExpVar))*sinf*z2^2 + (611*z2^3)/420 + (5*z3^2)/32 + z2*((3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (-17101/(800*HarmonicSums`Private`ExpVar^10) + 39307/(19600*HarmonicSums`Private`ExpVar^9) + 411413/(141120*HarmonicSums`Private`ExpVar^8) - 1129/(3600*HarmonicSums`Private`ExpVar^7) - 4819/(7200*HarmonicSums`Private`ExpVar^6) - 11/(144*HarmonicSums`Private`ExpVar^5) + 115/(144*HarmonicSums`Private`ExpVar^4) - 7/(8*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(2*HarmonicSums`Private`ExpVar^10) + 17/(8*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1))*z3) + (-1)^HarmonicSums`Private`ExpVar* (341/(8*HarmonicSums`Private`ExpVar^10) - 187/(32*HarmonicSums`Private`ExpVar^8) + 11/(8*HarmonicSums`Private`ExpVar^6) - 11/(16*HarmonicSums`Private`ExpVar^4) + 11/(8*HarmonicSums`Private`ExpVar^2) - 11/(4*HarmonicSums`Private`ExpVar))*z5 + ln2*(-4*li5half + (23*z2*z3)/16 + (73*z5)/64), S[-1, 1, -1, -3, HarmonicSums`Private`ExpVar] :> 6*li6half + ln2^6/60 + (-1)^HarmonicSums`Private`ExpVar* (-34003/(207360*HarmonicSums`Private`ExpVar^10) + 140437/(80640*HarmonicSums`Private`ExpVar^9) + 2491/(32256*HarmonicSums`Private`ExpVar^8) - 429/(640*HarmonicSums`Private`ExpVar^7) + 4979/(11520*HarmonicSums`Private`ExpVar^6) - 175/(1152*HarmonicSums`Private`ExpVar^5) + 1/(36*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(1185/(32*HarmonicSums`Private`ExpVar^10) + 119/(16*HarmonicSums`Private`ExpVar^9) - 147/(32*HarmonicSums`Private`ExpVar^8) - 5/(4*HarmonicSums`Private`ExpVar^7) + 15/(16*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-31/(240*HarmonicSums`Private`ExpVar^10) + 17/(960*HarmonicSums`Private`ExpVar^8) - 1/(240*HarmonicSums`Private`ExpVar^6) + 1/(480*HarmonicSums`Private`ExpVar^4) - 1/(240*HarmonicSums`Private`ExpVar^2) + 1/(120*HarmonicSums`Private`ExpVar)) + (17*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(256*HarmonicSums`Private`ExpVar^10) + 119/(384*HarmonicSums`Private`ExpVar^9) - 49/(256*HarmonicSums`Private`ExpVar^8) - 5/(96*HarmonicSums`Private`ExpVar^7) + 5/(128*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2)) - z2/24) + (-1)^HarmonicSums`Private`ExpVar* (-237/(64*HarmonicSums`Private`ExpVar^10) - 119/(160*HarmonicSums`Private`ExpVar^9) + 147/(320*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^7) - 3/(32*HarmonicSums`Private`ExpVar^6) - 3/(80*HarmonicSums`Private`ExpVar^5) + 3/(80*HarmonicSums`Private`ExpVar^4) + 1/(40*HarmonicSums`Private`ExpVar^3) - 1/(20*HarmonicSums`Private`ExpVar^2))*z2^2 - (51*z2^3)/112 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar))*z2 + z3/8) + (-8199/(5120*HarmonicSums`Private`ExpVar^10) - 549/(512*HarmonicSums`Private`ExpVar^9) + 641/(2048*HarmonicSums`Private`ExpVar^8) + 63/(256*HarmonicSums`Private`ExpVar^7) - 17/(128*HarmonicSums`Private`ExpVar^6) - 15/(128*HarmonicSums`Private`ExpVar^5) + 57/(256*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 3/(32*HarmonicSums`Private`ExpVar^2))*z3 + (-1)^HarmonicSums`Private`ExpVar* (-403/(32*HarmonicSums`Private`ExpVar^10) + 221/(128*HarmonicSums`Private`ExpVar^8) - 13/(32*HarmonicSums`Private`ExpVar^6) + 13/(64*HarmonicSums`Private`ExpVar^4) - 13/(32*HarmonicSums`Private`ExpVar^2) + 13/(16*HarmonicSums`Private`ExpVar))*z2*z3 - (5*z3^2)/2 + ln2^2*(li4half + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (19*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (-93/(32*HarmonicSums`Private`ExpVar^10) + 51/(128*HarmonicSums`Private`ExpVar^8) - 3/(32*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^2) + 3/(16*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(48*HarmonicSums`Private`ExpVar^10) + 17/(192*HarmonicSums`Private`ExpVar^8) - 1/(48*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-31/(2*HarmonicSums`Private`ExpVar^10) + 17/(8*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (31/(20*HarmonicSums`Private`ExpVar^10) - 17/(80*HarmonicSums`Private`ExpVar^8) + 1/(20*HarmonicSums`Private`ExpVar^6) - 1/(40*HarmonicSums`Private`ExpVar^4) + 1/(20*HarmonicSums`Private`ExpVar^2) - 1/(10*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (-93/(16*HarmonicSums`Private`ExpVar^10) + 51/(64*HarmonicSums`Private`ExpVar^8) - 3/(16*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^2) + 3/(8*HarmonicSums`Private`ExpVar))*z3) + ln2*(4*li5half + (-1)^HarmonicSums`Private`ExpVar* (31/(40*HarmonicSums`Private`ExpVar^10) - 17/(160*HarmonicSums`Private`ExpVar^8) + 1/(40*HarmonicSums`Private`ExpVar^6) - 1/(80*HarmonicSums`Private`ExpVar^4) + 1/(40*HarmonicSums`Private`ExpVar^2) - 1/(20*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (3555/(256*HarmonicSums`Private`ExpVar^10) + 357/(128*HarmonicSums`Private`ExpVar^9) - 441/(256*HarmonicSums`Private`ExpVar^8) - 15/(32*HarmonicSums`Private`ExpVar^7) + 45/(128*HarmonicSums`Private`ExpVar^6) + 9/(64*HarmonicSums`Private`ExpVar^5) - 9/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2))*z3 + (7*z2*z3)/16 - (47*z5)/8) + (-1)^HarmonicSums`Private`ExpVar* (465/(32*HarmonicSums`Private`ExpVar^10) - 255/(128*HarmonicSums`Private`ExpVar^8) + 15/(32*HarmonicSums`Private`ExpVar^6) - 15/(64*HarmonicSums`Private`ExpVar^4) + 15/(32*HarmonicSums`Private`ExpVar^2) - 15/(16*HarmonicSums`Private`ExpVar))*z5, S[-1, 1, -1, 3, HarmonicSums`Private`ExpVar] :> 8*li6half + (7*ln2^6)/360 + (-1)^HarmonicSums`Private`ExpVar*li5half* (31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (31/(80*HarmonicSums`Private`ExpVar^10) - 17/(320*HarmonicSums`Private`ExpVar^8) + 1/(80*HarmonicSums`Private`ExpVar^6) - 1/(160*HarmonicSums`Private`ExpVar^4) + 1/(80*HarmonicSums`Private`ExpVar^2) - 1/(40*HarmonicSums`Private`ExpVar)) - 7951/(3840*HarmonicSums`Private`ExpVar^10) + 583/(240*HarmonicSums`Private`ExpVar^9) + 145/(768*HarmonicSums`Private`ExpVar^8) - 381/(448*HarmonicSums`Private`ExpVar^7) + 33/(64*HarmonicSums`Private`ExpVar^6) - 7/(40*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + (11*s6)/2 - (ln2^4*z2)/8 + (-1)^HarmonicSums`Private`ExpVar* (-4503/(512*HarmonicSums`Private`ExpVar^10) - 2261/(1280*HarmonicSums`Private`ExpVar^9) + 2793/(2560*HarmonicSums`Private`ExpVar^8) + 19/(64*HarmonicSums`Private`ExpVar^7) - 57/(256*HarmonicSums`Private`ExpVar^6) - 57/(640*HarmonicSums`Private`ExpVar^5) + 57/(640*HarmonicSums`Private`ExpVar^4) + 19/(320*HarmonicSums`Private`ExpVar^3) - 19/(160*HarmonicSums`Private`ExpVar^2))*z2^2 - (2*z2^3)/5 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar))*z2 + z3/8) + (2733/(1280*HarmonicSums`Private`ExpVar^10) + 183/(128*HarmonicSums`Private`ExpVar^9) - 641/(1536*HarmonicSums`Private`ExpVar^8) - 21/(64*HarmonicSums`Private`ExpVar^7) + 17/(96*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) - 19/(64*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z3 - (93*z3^2)/128 + z2*(-li4half + (-1)^HarmonicSums`Private`ExpVar* (403/(64*HarmonicSums`Private`ExpVar^10) - 221/(256*HarmonicSums`Private`ExpVar^8) + 13/(64*HarmonicSums`Private`ExpVar^6) - 13/(128*HarmonicSums`Private`ExpVar^4) + 13/(64*HarmonicSums`Private`ExpVar^2) - 13/(32*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(li4half + (3*z2^2)/20 + (-1)^HarmonicSums`Private`ExpVar* (-93/(32*HarmonicSums`Private`ExpVar^10) + 51/(128*HarmonicSums`Private`ExpVar^8) - 3/(32*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^2) + 3/(16*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar* (589/(160*HarmonicSums`Private`ExpVar^10) - 323/(640*HarmonicSums`Private`ExpVar^8) + 19/(160*HarmonicSums`Private`ExpVar^6) - 19/(320*HarmonicSums`Private`ExpVar^4) + 19/(160*HarmonicSums`Private`ExpVar^2) - 19/(80*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (-93/(16*HarmonicSums`Private`ExpVar^10) + 51/(64*HarmonicSums`Private`ExpVar^8) - 3/(16*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^2) + 3/(8*HarmonicSums`Private`ExpVar))*z3) + ln2*(4*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar* (1519/(160*HarmonicSums`Private`ExpVar^10) - 833/(640*HarmonicSums`Private`ExpVar^8) + 49/(160*HarmonicSums`Private`ExpVar^6) - 49/(320*HarmonicSums`Private`ExpVar^4) + 49/(160*HarmonicSums`Private`ExpVar^2) - 49/(80*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (3555/(256*HarmonicSums`Private`ExpVar^10) + 357/(128*HarmonicSums`Private`ExpVar^9) - 441/(256*HarmonicSums`Private`ExpVar^8) - 15/(32*HarmonicSums`Private`ExpVar^7) + 45/(128*HarmonicSums`Private`ExpVar^6) + 9/(64*HarmonicSums`Private`ExpVar^5) - 9/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2))*z3 - 2*z2*z3 - (47*z5)/8) + (-1)^HarmonicSums`Private`ExpVar* (-1457/(32*HarmonicSums`Private`ExpVar^10) + 799/(128*HarmonicSums`Private`ExpVar^8) - 47/(32*HarmonicSums`Private`ExpVar^6) + 47/(64*HarmonicSums`Private`ExpVar^4) - 47/(32*HarmonicSums`Private`ExpVar^2) + 47/(16*HarmonicSums`Private`ExpVar))*z5, S[-1, 1, 1, -3, HarmonicSums`Private`ExpVar] :> 6*li6half - ln2^6/120 + (-1)^HarmonicSums`Private`ExpVar*li4half* (-1185/(32*HarmonicSums`Private`ExpVar^10) - 119/(16*HarmonicSums`Private`ExpVar^9) + 147/(32*HarmonicSums`Private`ExpVar^8) + 5/(4*HarmonicSums`Private`ExpVar^7) - 15/(16*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (31/(60*HarmonicSums`Private`ExpVar^10) - 17/(240*HarmonicSums`Private`ExpVar^8) + 1/(60*HarmonicSums`Private`ExpVar^6) - 1/(120*HarmonicSums`Private`ExpVar^4) + 1/(60*HarmonicSums`Private`ExpVar^2) - 1/(30*HarmonicSums`Private`ExpVar)) - 1291/(160*HarmonicSums`Private`ExpVar^10) + 299/(640*HarmonicSums`Private`ExpVar^9) + 655/(512*HarmonicSums`Private`ExpVar^8) - 155/(224*HarmonicSums`Private`ExpVar^7) + 3/(16*HarmonicSums`Private`ExpVar^6) - 1/(40*HarmonicSums`Private`ExpVar^5) + 3*s6 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-395/(256*HarmonicSums`Private`ExpVar^10) - 119/(384*HarmonicSums`Private`ExpVar^9) + 49/(256*HarmonicSums`Private`ExpVar^8) + 5/(96*HarmonicSums`Private`ExpVar^7) - 5/(128*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(96*HarmonicSums`Private`ExpVar^3) - 1/(48*HarmonicSums`Private`ExpVar^2)) + z2/6) + (-1)^HarmonicSums`Private`ExpVar* (3555/(256*HarmonicSums`Private`ExpVar^10) + 357/(128*HarmonicSums`Private`ExpVar^9) - 441/(256*HarmonicSums`Private`ExpVar^8) - 15/(32*HarmonicSums`Private`ExpVar^7) + 45/(128*HarmonicSums`Private`ExpVar^6) + 9/(64*HarmonicSums`Private`ExpVar^5) - 9/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2))*z2^2 - (53*z2^3)/35 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-31/(12*HarmonicSums`Private`ExpVar^10) + 17/(48*HarmonicSums`Private`ExpVar^8) - 1/(12*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar))*z2 - z3/6) + (-1)^HarmonicSums`Private`ExpVar* (32833/(5120*HarmonicSums`Private`ExpVar^10) + 114837/(17920*HarmonicSums`Private`ExpVar^9) - 937/(1792*HarmonicSums`Private`ExpVar^8) - 1231/(1280*HarmonicSums`Private`ExpVar^7) + 37/(1280*HarmonicSums`Private`ExpVar^6) + 31/(128*HarmonicSums`Private`ExpVar^5) + 5/(64*HarmonicSums`Private`ExpVar^4) - 9/(32*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2))*z3 + (-1)^HarmonicSums`Private`ExpVar*(93/(32*HarmonicSums`Private`ExpVar^10) - 51/(128*HarmonicSums`Private`ExpVar^8) + 3/(32*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^2) - 3/(16*HarmonicSums`Private`ExpVar))*sinf^2*z3 - (3*z3^2)/2 + sinf*((-1)^HarmonicSums`Private`ExpVar*li4half* (31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (31/(48*HarmonicSums`Private`ExpVar^10) - 17/(192*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^2*(-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-93/(16*HarmonicSums`Private`ExpVar^10) + 51/(64*HarmonicSums`Private`ExpVar^8) - 3/(16*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^2) + 3/(8*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (-3555/(256*HarmonicSums`Private`ExpVar^10) - 357/(128*HarmonicSums`Private`ExpVar^9) + 441/(256*HarmonicSums`Private`ExpVar^8) + 15/(32*HarmonicSums`Private`ExpVar^7) - 45/(128*HarmonicSums`Private`ExpVar^6) - 9/(64*HarmonicSums`Private`ExpVar^5) + 9/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2))*z3 + (-1)^HarmonicSums`Private`ExpVar*ln2* (217/(16*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^6) - 7/(32*HarmonicSums`Private`ExpVar^4) + 7/(16*HarmonicSums`Private`ExpVar^2) - 7/(8*HarmonicSums`Private`ExpVar))*z3) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (17*z2^2)/20 + (-1)^HarmonicSums`Private`ExpVar* (217/(32*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^6) - 7/(64*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3) + z2*(3*li4half + (-1)^HarmonicSums`Private`ExpVar* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(2*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar* (-8295/(256*HarmonicSums`Private`ExpVar^10) - 833/(128*HarmonicSums`Private`ExpVar^9) + 1029/(256*HarmonicSums`Private`ExpVar^8) + 35/(32*HarmonicSums`Private`ExpVar^7) - 105/(128*HarmonicSums`Private`ExpVar^6) - 21/(64*HarmonicSums`Private`ExpVar^5) + 21/(64*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2))*z3 + (3*z2*z3)/2 - (33*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-1023/(128*HarmonicSums`Private`ExpVar^10) + 561/(512*HarmonicSums`Private`ExpVar^8) - 33/(128*HarmonicSums`Private`ExpVar^6) + 33/(256*HarmonicSums`Private`ExpVar^4) - 33/(128*HarmonicSums`Private`ExpVar^2) + 33/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, 1, 1, 3, HarmonicSums`Private`ExpVar] :> 4*li6half - ln2^6/90 + (-1)^HarmonicSums`Private`ExpVar* (720533/(207360*HarmonicSums`Private`ExpVar^10) - 211321/(241920*HarmonicSums`Private`ExpVar^9) - 40043/(96768*HarmonicSums`Private`ExpVar^8) - 2107/(17280*HarmonicSums`Private`ExpVar^7) + 6071/(11520*HarmonicSums`Private`ExpVar^6) - 523/(1152*HarmonicSums`Private`ExpVar^5) + 65/(288*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + (7*s6)/4 + (ln2^4*z2)/16 - (9*ln2^2*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (-237/(128*HarmonicSums`Private`ExpVar^10) - 119/(320*HarmonicSums`Private`ExpVar^9) + 147/(640*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^7) - 3/(64*HarmonicSums`Private`ExpVar^6) - 3/(160*HarmonicSums`Private`ExpVar^5) + 3/(160*HarmonicSums`Private`ExpVar^4) + 1/(80*HarmonicSums`Private`ExpVar^3) - 1/(40*HarmonicSums`Private`ExpVar^2))*z2^2 - (87*z2^3)/140 - (ln2^3*z3)/6 + (-1)^HarmonicSums`Private`ExpVar* (-32833/(3840*HarmonicSums`Private`ExpVar^10) - 38279/(4480*HarmonicSums`Private`ExpVar^9) + 937/(1344*HarmonicSums`Private`ExpVar^8) + 1231/(960*HarmonicSums`Private`ExpVar^7) - 37/(960*HarmonicSums`Private`ExpVar^6) - 31/(96*HarmonicSums`Private`ExpVar^5) - 5/(48*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z3 + (-1)^HarmonicSums`Private`ExpVar*(-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))* sinf^2*z3 - (19*z3^2)/32 + sinf*((-1)^HarmonicSums`Private`ExpVar* (31/(40*HarmonicSums`Private`ExpVar^10) - 17/(160*HarmonicSums`Private`ExpVar^8) + 1/(40*HarmonicSums`Private`ExpVar^6) - 1/(80*HarmonicSums`Private`ExpVar^4) + 1/(40*HarmonicSums`Private`ExpVar^2) - 1/(20*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (1185/(64*HarmonicSums`Private`ExpVar^10) + 119/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z3) + z2*(-(li4half/2) + (-1)^HarmonicSums`Private`ExpVar* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z3) + ln2*(2*li5half - (33*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-31/(2*HarmonicSums`Private`ExpVar^10) + 17/(8*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1))* z5, S[1, -3, -1, -1, HarmonicSums`Private`ExpVar] :> -2*li6half + ln2^6/45 + (-1)^HarmonicSums`Private`ExpVar* (6803/(7680*HarmonicSums`Private`ExpVar^10) + 28681/(3840*HarmonicSums`Private`ExpVar^9) - 53/(96*HarmonicSums`Private`ExpVar^8) - 253/(192*HarmonicSums`Private`ExpVar^7) + 21/(32*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5)) + (5*s6)/4 - (ln2^4*z2)/24 + (-1)^HarmonicSums`Private`ExpVar* (777/(32*HarmonicSums`Private`ExpVar^10) - 77/(16*HarmonicSums`Private`ExpVar^9) - 175/(64*HarmonicSums`Private`ExpVar^8) + 15/(16*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) - 7/(16*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4))*z2 + (4*z2^3)/5 + ln2^2*(li4half + (-1)^HarmonicSums`Private`ExpVar* (777/(32*HarmonicSums`Private`ExpVar^10) - 77/(16*HarmonicSums`Private`ExpVar^9) - 175/(64*HarmonicSums`Private`ExpVar^8) + 15/(16*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) - 7/(16*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) + (17*z2^2)/20) - (7*ln2^3*z3)/24 - (3*z3^2)/4 + ln2*(2*li5half + 4591/(28800*HarmonicSums`Private`ExpVar^10) + 5893/(25920*HarmonicSums`Private`ExpVar^9) - 299/(2304*HarmonicSums`Private`ExpVar^8) - 5/(36*HarmonicSums`Private`ExpVar^7) + 167/(576*HarmonicSums`Private`ExpVar^6) - 389/(1440*HarmonicSums`Private`ExpVar^5) + 31/(192*HarmonicSums`Private`ExpVar^4) - 1/(18*HarmonicSums`Private`ExpVar^3) - (7*z2*z3)/8 - (155*z5)/32) + sinf*(ln2^5/12 - (ln2^3*z2)/2 + ln2*(2*li4half - (19*z2^2)/40) - (z2*z3)/2 + (15*z5)/32), S[1, -3, -1, 1, HarmonicSums`Private`ExpVar] :> -2*li6half - ln2^6/360 - 1060937/(10368000*HarmonicSums`Private`ExpVar^ 10) + 4562837/(13063680*HarmonicSums`Private`ExpVar^9) - 5987/(387072*HarmonicSums`Private`ExpVar^8) - 8431/(42336*HarmonicSums`Private`ExpVar^7) + 533/(3456*HarmonicSums`Private`ExpVar^6) - 199/(8640*HarmonicSums`Private`ExpVar^5) - 55/(1152*HarmonicSums`Private`ExpVar^4) + 1/(27*HarmonicSums`Private`ExpVar^3) - s6/2 + (ln2^4*z2)/24 + (-1)^HarmonicSums`Private`ExpVar* (-777/(32*HarmonicSums`Private`ExpVar^10) + 77/(16*HarmonicSums`Private`ExpVar^9) + 175/(64*HarmonicSums`Private`ExpVar^8) - 15/(16*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) + 7/(16*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4))*z2 - (9*z2^3)/28 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (777/(32*HarmonicSums`Private`ExpVar^10) - 77/(16*HarmonicSums`Private`ExpVar^9) - 175/(64*HarmonicSums`Private`ExpVar^8) + 15/(16*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) - 7/(16*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) + (17*z2^2)/40) - (7*ln2^3*z3)/24 - (7*ln2*z2*z3)/8 + (81*z3^2)/32 + sinf*(-2*li5half + ln2^5/60 - 4591/(28800*HarmonicSums`Private`ExpVar^ 10) - 5893/(25920*HarmonicSums`Private`ExpVar^9) + 299/(2304*HarmonicSums`Private`ExpVar^8) + 5/(36*HarmonicSums`Private`ExpVar^7) - 167/(576*HarmonicSums`Private`ExpVar^6) + 389/(1440*HarmonicSums`Private`ExpVar^5) - 31/(192*HarmonicSums`Private`ExpVar^4) + 1/(18*HarmonicSums`Private`ExpVar^3) - (ln2^3*z2)/6 - (ln2*z2^2)/10 - (13*z2*z3)/8 + (85*z5)/16), S[1, -3, 1, -1, HarmonicSums`Private`ExpVar] :> 6*li6half - (3*ln2^6)/40 + (-1)^HarmonicSums`Private`ExpVar*ln2* (3843/(64*HarmonicSums`Private`ExpVar^10) - 175/(32*HarmonicSums`Private`ExpVar^9) - 175/(32*HarmonicSums`Private`ExpVar^8) + 15/(16*HarmonicSums`Private`ExpVar^7) + 5/(8*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5)) - 128537/(230400*HarmonicSums`Private`ExpVar^10) + 599621/(7257600*HarmonicSums`Private`ExpVar^9) + 34339/(129024*HarmonicSums`Private`ExpVar^8) - 13889/(47040*HarmonicSums`Private`ExpVar^7) + 259/(1440*HarmonicSums`Private`ExpVar^6) - 57/(800*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) + (3*s6)/2 - 2*li4half*z2 + (7*ln2^4*z2)/24 - (19*z2^3)/35 + ln2^2*(-2*li4half + (-1)^HarmonicSums`Private`ExpVar* (-777/(32*HarmonicSums`Private`ExpVar^10) + 77/(16*HarmonicSums`Private`ExpVar^9) + 175/(64*HarmonicSums`Private`ExpVar^8) - 15/(16*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) + 7/(16*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) + (3*z2^2)/40) - (7*ln2^3*z3)/8 + z3^2/4 + sinf*(4*li5half - ln2^5/30 + (ln2^3*z2)/3 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-777/(16*HarmonicSums`Private`ExpVar^10) + 77/(8*HarmonicSums`Private`ExpVar^9) + 175/(32*HarmonicSums`Private`ExpVar^8) - 15/(8*HarmonicSums`Private`ExpVar^7) - 15/(16*HarmonicSums`Private`ExpVar^6) + 7/(8*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4)) + (17*z2^2)/10) - (7*ln2^2*z3)/8 - (3*z2*z3)/4 - (39*z5)/16), S[1, -3, 1, 1, HarmonicSums`Private`ExpVar] :> -6*li6half - ln2^6/12 + (-1)^HarmonicSums`Private`ExpVar* (127099/(3840*HarmonicSums`Private`ExpVar^10) + 11213/(1920*HarmonicSums`Private`ExpVar^9) - 17/(6*HarmonicSums`Private`ExpVar^8) - 43/(48*HarmonicSums`Private`ExpVar^7) + 11/(16*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5)) - (3*s6)/2 + (-1)^HarmonicSums`Private`ExpVar* (777/(32*HarmonicSums`Private`ExpVar^10) - 77/(16*HarmonicSums`Private`ExpVar^9) - 175/(64*HarmonicSums`Private`ExpVar^8) + 15/(16*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) - 7/(16*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4))*sinf^2 + (11*ln2^4*z2)/24 + (2*li4half + (-1)^HarmonicSums`Private`ExpVar* (777/(32*HarmonicSums`Private`ExpVar^10) - 77/(16*HarmonicSums`Private`ExpVar^9) - 175/(64*HarmonicSums`Private`ExpVar^8) + 15/(16*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) - 7/(16*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)))*z2 + (19*z2^3)/35 + ln2^2*(-3*li4half - z2^2/2) - (7*ln2^3*z3)/8 - (3*z3^2)/8 + sinf*(-2*li5half - 2*li4half*ln2 - ln2^5/15 + (-1)^HarmonicSums`Private`ExpVar* (-3843/(64*HarmonicSums`Private`ExpVar^10) + 175/(32*HarmonicSums`Private`ExpVar^9) + 175/(32*HarmonicSums`Private`ExpVar^8) - 15/(16*HarmonicSums`Private`ExpVar^7) - 5/(8*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5)) + (ln2^3*z2)/3 - (7*ln2^2*z3)/8 + (3*z2*z3)/8 + (15*z5)/32) + ln2*(-6*li5half + (7*z2*z3)/4 + (93*z5)/32), S[1, 3, -1, -1, HarmonicSums`Private`ExpVar] :> 4*li6half + ln2^6/180 - 546367/(4838400*HarmonicSums`Private`ExpVar^10) + 882251/(4354560*HarmonicSums`Private`ExpVar^9) + 723/(14336*HarmonicSums`Private`ExpVar^8) - 86519/(282240*HarmonicSums`Private`ExpVar^7) + 37/(96*HarmonicSums`Private`ExpVar^6) - 883/(2880*HarmonicSums`Private`ExpVar^5) + 65/(384*HarmonicSums`Private`ExpVar^4) - 1/(18*HarmonicSums`Private`ExpVar^3) + (5*s6)/4 - (ln2^4*z2)/12 + (187/(2400*HarmonicSums`Private`ExpVar^10) - 11/(144*HarmonicSums`Private`ExpVar^9) - 5/(144*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^7) + 7/(288*HarmonicSums`Private`ExpVar^6) - 7/(48*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (23*z2^3)/80 + ln2^2*(187/(2400*HarmonicSums`Private`ExpVar^10) - 11/(144*HarmonicSums`Private`ExpVar^9) - 5/(144*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^7) + 7/(288*HarmonicSums`Private`ExpVar^6) - 7/(48*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - (17*z2^2)/20) + (7*ln2^3*z3)/12 - (111*z3^2)/64 + ln2*((-1)^HarmonicSums`Private`ExpVar* (333/(64*HarmonicSums`Private`ExpVar^10) + 245/(32*HarmonicSums`Private`ExpVar^9) - 77/(64*HarmonicSums`Private`ExpVar^8) - 35/(32*HarmonicSums`Private`ExpVar^7) + 5/(8*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5)) + (7*z2*z3)/8) + sinf*(2*li5half - ln2^5/60 + (ln2^3*z2)/6 + (19*ln2*z2^2)/40 + (7*ln2^2*z3)/8 + (15*z2*z3)/8 - (311*z5)/64), S[1, 3, -1, 1, HarmonicSums`Private`ExpVar] :> -8*li6half - ln2^6/360 + (-1)^HarmonicSums`Private`ExpVar* (-1477/(256*HarmonicSums`Private`ExpVar^10) + 867/(128*HarmonicSums`Private`ExpVar^9) + 11/(64*HarmonicSums`Private`ExpVar^8) - 13/(16*HarmonicSums`Private`ExpVar^7) + 3/(16*HarmonicSums`Private`ExpVar^6)) - (9*s6)/2 - (ln2^4*z2)/12 + (-187/(2400*HarmonicSums`Private`ExpVar^10) + 11/(144*HarmonicSums`Private`ExpVar^9) + 5/(144*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^7) - 7/(288*HarmonicSums`Private`ExpVar^6) + 7/(48*HarmonicSums`Private`ExpVar^5) - 7/(32*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (97*z2^3)/112 + ln2^2*(-li4half + 187/(2400*HarmonicSums`Private`ExpVar^10) - 11/(144*HarmonicSums`Private`ExpVar^9) - 5/(144*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^7) + 7/(288*HarmonicSums`Private`ExpVar^6) - 7/(48*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - (17*z2^2)/40) + (7*ln2^3*z3)/12 + (243*z3^2)/128 + sinf*(-4*li5half - ln2^5/20 + (-1)^HarmonicSums`Private`ExpVar* (-333/(64*HarmonicSums`Private`ExpVar^10) - 245/(32*HarmonicSums`Private`ExpVar^9) + 77/(64*HarmonicSums`Private`ExpVar^8) + 35/(32*HarmonicSums`Private`ExpVar^7) - 5/(8*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5)) + (ln2^3*z2)/6 + ln2*(-2*li4half - (49*z2^2)/40) + (7*ln2^2*z3)/8 - (z2*z3)/16 + (27*z5)/8) + ln2*(-6*li5half - (7*z2*z3)/8 + (527*z5)/64), S[1, 3, 1, -1, HarmonicSums`Private`ExpVar] :> ln2^6/40 + (-1)^HarmonicSums`Private`ExpVar* (-2321/(256*HarmonicSums`Private`ExpVar^10) + 3/(128*HarmonicSums`Private`ExpVar^9) + 77/(64*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^6)) - (ln2^4*z2)/12 + ln2^2*(li4half - 187/(2400*HarmonicSums`Private`ExpVar^10) + 11/(144*HarmonicSums`Private`ExpVar^9) + 5/(144*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^7) - 7/(288*HarmonicSums`Private`ExpVar^6) + 7/(48*HarmonicSums`Private`ExpVar^5) - 7/(32*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (17*z2^2)/40) - z3^2/128 + sinf*(2*li5half + ln2^5/15 - (ln2^3*z2)/3 + ln2*(2*li4half - 187/(1200*HarmonicSums`Private`ExpVar^10) + 11/(72*HarmonicSums`Private`ExpVar^9) + 5/(72*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^7) - 7/(144*HarmonicSums`Private`ExpVar^6) + 7/(24*HarmonicSums`Private`ExpVar^5) - 7/(16*HarmonicSums`Private`ExpVar^4) + 5/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) - (3*z2^2)/8) - (z2*z3)/16 - (125*z5)/64) + ln2*(2*li5half + 2507/(9000*HarmonicSums`Private`ExpVar^10) - 5/(72*HarmonicSums`Private`ExpVar^9) - 203/(1728*HarmonicSums`Private`ExpVar^8) + 7/(144*HarmonicSums`Private`ExpVar^7) + 67/(864*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) - (93*z5)/64), S[1, 3, 1, 1, HarmonicSums`Private`ExpVar] :> 31991207/(181440000*HarmonicSums`Private`ExpVar^10) + 5121259/(32659200*HarmonicSums`Private`ExpVar^9) - 15415/(193536*HarmonicSums`Private`ExpVar^8) - 149671/(846720*HarmonicSums`Private`ExpVar^7) + 10907/(34560*HarmonicSums`Private`ExpVar^6) - 26027/(86400*HarmonicSums`Private`ExpVar^5) + 569/(2304*HarmonicSums`Private`ExpVar^4) - 97/(432*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) + (187/(2400*HarmonicSums`Private`ExpVar^10) - 11/(144*HarmonicSums`Private`ExpVar^9) - 5/(144*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^7) + 7/(288*HarmonicSums`Private`ExpVar^6) - 7/(48*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*sinf^2 + (187/(2400*HarmonicSums`Private`ExpVar^10) - 11/(144*HarmonicSums`Private`ExpVar^9) - 5/(144*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^7) + 7/(288*HarmonicSums`Private`ExpVar^6) - 7/(48*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - z3^2/2 + sinf*(-2507/(9000*HarmonicSums`Private`ExpVar^10) + 5/(72*HarmonicSums`Private`ExpVar^9) + 203/(1728*HarmonicSums`Private`ExpVar^8) - 7/(144*HarmonicSums`Private`ExpVar^7) - 67/(864*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) + z2*z3 - z5/2), S[1, -2, -2, -1, HarmonicSums`Private`ExpVar] :> 12*li6half + 2*li4half*ln2^2 + ln2^6/30 + (-1)^HarmonicSums`Private`ExpVar* (-27989/(6720*HarmonicSums`Private`ExpVar^10) + 65/(16*HarmonicSums`Private`ExpVar^9) + 93/(320*HarmonicSums`Private`ExpVar^8) - 43/(48*HarmonicSums`Private`ExpVar^7) + 35/(96*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5)) + (9*s6)/2 - (ln2^4*z2)/12 - (61*z2^3)/35 + (-1)^HarmonicSums`Private`ExpVar* (-935/(64*HarmonicSums`Private`ExpVar^10) - 135/(16*HarmonicSums`Private`ExpVar^9) + 135/(64*HarmonicSums`Private`ExpVar^8) + 5/(4*HarmonicSums`Private`ExpVar^7) - 35/(64*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) + 25/(64*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^3))*z3 - (113*z3^2)/64 + sinf*(8*li5half + ln2^5/10 - (ln2^3*z2)/3 + ln2*(4*li4half + (19*z2^2)/20) - (123*z5)/16) + ln2*(8*li5half + 31/(72*HarmonicSums`Private`ExpVar^10) + 265/(648*HarmonicSums`Private`ExpVar^9) - 15/(64*HarmonicSums`Private`ExpVar^8) - 197/(1008*HarmonicSums`Private`ExpVar^7) + 37/(96*HarmonicSums`Private`ExpVar^6) - 47/(144*HarmonicSums`Private`ExpVar^5) + 17/(96*HarmonicSums`Private`ExpVar^4) - 1/(18*HarmonicSums`Private`ExpVar^3) + z2*((-1)^HarmonicSums`Private`ExpVar* (561/(16*HarmonicSums`Private`ExpVar^10) + 81/(4*HarmonicSums`Private`ExpVar^9) - 81/(16*HarmonicSums`Private`ExpVar^8) - 3/HarmonicSums`Private`ExpVar^7 + 21/(16*HarmonicSums`Private`ExpVar^6) + 3/(4*HarmonicSums`Private`ExpVar^5) - 15/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3)) + (15*z3)/16) - (217*z5)/32), S[1, -2, -2, 1, HarmonicSums`Private`ExpVar] :> 1229/(5184*HarmonicSums`Private`ExpVar^10) + 416327/(816480*HarmonicSums`Private`ExpVar^9) - 1009/(8064*HarmonicSums`Private`ExpVar^8) - 7471/(42336*HarmonicSums`Private`ExpVar^7) + 41/(288*HarmonicSums`Private`ExpVar^6) - 1/(135*HarmonicSums`Private`ExpVar^5) - 1/(18*HarmonicSums`Private`ExpVar^4) + 1/(27*HarmonicSums`Private`ExpVar^3) + (17*z2^3)/56 + (-1)^HarmonicSums`Private`ExpVar* (-935/(64*HarmonicSums`Private`ExpVar^10) - 135/(16*HarmonicSums`Private`ExpVar^9) + 135/(64*HarmonicSums`Private`ExpVar^8) + 5/(4*HarmonicSums`Private`ExpVar^7) - 35/(64*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) + 25/(64*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^3))*z3 - (115*z3^2)/128 + sinf*(-31/(72*HarmonicSums`Private`ExpVar^10) - 265/(648*HarmonicSums`Private`ExpVar^9) + 15/(64*HarmonicSums`Private`ExpVar^8) + 197/(1008*HarmonicSums`Private`ExpVar^7) - 37/(96*HarmonicSums`Private`ExpVar^6) + 47/(144*HarmonicSums`Private`ExpVar^5) - 17/(96*HarmonicSums`Private`ExpVar^4) + 1/(18*HarmonicSums`Private`ExpVar^3) + (15*z2*z3)/16 - (29*z5)/32), S[1, -2, 2, -1, HarmonicSums`Private`ExpVar] :> -4*li6half + (7*ln2^6)/90 - 3691/(4608*HarmonicSums`Private`ExpVar^10) + 706579/(3628800*HarmonicSums`Private`ExpVar^9) + 19645/(64512*HarmonicSums`Private`ExpVar^8) - 8231/(23520*HarmonicSums`Private`ExpVar^7) + 589/(2880*HarmonicSums`Private`ExpVar^6) - 61/(800*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - s6 + 2*li4half*z2 - (ln2^4*z2)/3 + (87*z2^3)/280 + ln2^2*(2*li4half - z2^2/2) + ln2*((-1)^HarmonicSums`Private`ExpVar* (376213/(6720*HarmonicSums`Private`ExpVar^10) - 251/(96*HarmonicSums`Private`ExpVar^9) - 1093/(160*HarmonicSums`Private`ExpVar^8) + 43/(48*HarmonicSums`Private`ExpVar^7) + 37/(24*HarmonicSums`Private`ExpVar^6) - HarmonicSums`Private`ExpVar^ (-5) + 1/(4*HarmonicSums`Private`ExpVar^4)) + z2*((-1)^HarmonicSums`Private`ExpVar* (-561/(16*HarmonicSums`Private`ExpVar^10) - 81/(4*HarmonicSums`Private`ExpVar^9) + 81/(16*HarmonicSums`Private`ExpVar^8) + 3/HarmonicSums`Private`ExpVar^7 - 21/(16*HarmonicSums`Private`ExpVar^6) - 3/(4*HarmonicSums`Private`ExpVar^5) + 15/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3)) + (13*z3)/16)) + (7*ln2^3*z3)/6 + (-1)^HarmonicSums`Private`ExpVar* (187/(32*HarmonicSums`Private`ExpVar^10) + 27/(8*HarmonicSums`Private`ExpVar^9) - 27/(32*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^7) + 7/(32*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5) - 5/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3))*z3 - (109*z3^2)/128 + sinf*(-4*li5half + ln2^5/30 - (ln2^3*z2)/3 - (19*ln2*z2^2)/20 + (7*ln2^2*z3)/4 + (11*z2*z3)/8 + (33*z5)/32), S[1, -2, 2, 1, HarmonicSums`Private`ExpVar] :> 8*li6half + ln2^6/9 + (-1)^HarmonicSums`Private`ExpVar* (11474579/(1411200*HarmonicSums`Private`ExpVar^10) + 18281/(2880*HarmonicSums`Private`ExpVar^9) + 1823/(4800*HarmonicSums`Private`ExpVar^8) - 37/(36*HarmonicSums`Private`ExpVar^7) - 133/(288*HarmonicSums`Private`ExpVar^6) + 11/(16*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4)) + (5*s6)/4 - 2*li4half*z2 - (7*ln2^4*z2)/12 - (67*z2^3)/70 + ln2^2*(4*li4half + z2^2/2) + (7*ln2^3*z3)/6 + (-1)^HarmonicSums`Private`ExpVar* (187/(4*HarmonicSums`Private`ExpVar^10) + 27/HarmonicSums`Private`ExpVar^9 - 27/(4*HarmonicSums`Private`ExpVar^8) - 4/HarmonicSums`Private`ExpVar^7 + 7/(4*HarmonicSums`Private`ExpVar^6) + HarmonicSums`Private`ExpVar^(-5) - 5/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^3))*z3 - (7*z3^2)/128 + ln2*(8*li5half - (7*z2*z3)/4 - (155*z5)/64) + sinf*(4*li5half + 4*li4half*ln2 + (2*ln2^5)/15 + (-1)^HarmonicSums`Private`ExpVar* (-376213/(6720*HarmonicSums`Private`ExpVar^10) + 251/(96*HarmonicSums`Private`ExpVar^9) + 1093/(160*HarmonicSums`Private`ExpVar^8) - 43/(48*HarmonicSums`Private`ExpVar^7) - 37/(24*HarmonicSums`Private`ExpVar^6) + HarmonicSums`Private`ExpVar^ (-5) - 1/(4*HarmonicSums`Private`ExpVar^4)) - (2*ln2^3*z2)/3 + (7*ln2^2*z3)/4 - (7*z2*z3)/4 - (89*z5)/64), S[1, -2, -1, -2, HarmonicSums`Private`ExpVar] :> -24*li6half - ln2^6/15 + (-1)^HarmonicSums`Private`ExpVar* (-33829/(4480*HarmonicSums`Private`ExpVar^10) + 805/(192*HarmonicSums`Private`ExpVar^9) + 217/(320*HarmonicSums`Private`ExpVar^8) - 25/(24*HarmonicSums`Private`ExpVar^7) + 37/(96*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5)) - 14*s6 + (11*ln2^4*z2)/48 + ((3*li4half)/2 - 1469/(9600*HarmonicSums`Private`ExpVar^10) + 7757/(151200*HarmonicSums`Private`ExpVar^9) + 509/(8064*HarmonicSums`Private`ExpVar^8) - 6227/(141120*HarmonicSums`Private`ExpVar^7) - 137/(2880*HarmonicSums`Private`ExpVar^6) + 223/(1800*HarmonicSums`Private`ExpVar^5) - 7/(48*HarmonicSums`Private`ExpVar^4) + 17/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (989*z2^3)/560 + ln2^2*(-4*li4half - (3*z2^2)/8) + (-1)^HarmonicSums`Private`ExpVar* (2431/(64*HarmonicSums`Private`ExpVar^10) + 351/(16*HarmonicSums`Private`ExpVar^9) - 351/(64*HarmonicSums`Private`ExpVar^8) - 13/(4*HarmonicSums`Private`ExpVar^7) + 91/(64*HarmonicSums`Private`ExpVar^6) + 13/(16*HarmonicSums`Private`ExpVar^5) - 65/(64*HarmonicSums`Private`ExpVar^4) + 13/(32*HarmonicSums`Private`ExpVar^3))*z3 + (659*z3^2)/128 + sinf*(-16*li5half - ln2^5/5 + (2*ln2^3*z2)/3 + ln2*(-8*li4half - (17*z2^2)/5) - (13*z2*z3)/16 + (547*z5)/32) + ln2*(-16*li5half + (-1)^HarmonicSums`Private`ExpVar* (-187/(8*HarmonicSums`Private`ExpVar^10) - 27/(2*HarmonicSums`Private`ExpVar^9) + 27/(8*HarmonicSums`Private`ExpVar^8) + 2/HarmonicSums`Private`ExpVar^7 - 7/(8*HarmonicSums`Private`ExpVar^6) - 1/(2*HarmonicSums`Private`ExpVar^5) + 5/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3))*z2 + (1457*z5)/64), S[1, -2, -1, 2, HarmonicSums`Private`ExpVar] :> -678289/(3024000*HarmonicSums`Private`ExpVar^10) + 1646399/(2721600*HarmonicSums`Private`ExpVar^9) + 833/(34560*HarmonicSums`Private`ExpVar^8) - 65/(126*HarmonicSums`Private`ExpVar^7) + 5011/(8640*HarmonicSums`Private`ExpVar^6) - 2887/(7200*HarmonicSums`Private`ExpVar^5) + 37/(192*HarmonicSums`Private`ExpVar^4) - 1/(18*HarmonicSums`Private`ExpVar^3) - (7*s6)/2 - (ln2^4*z2)/8 + (-1)^HarmonicSums`Private`ExpVar*ln2* (187/(16*HarmonicSums`Private`ExpVar^10) + 27/(4*HarmonicSums`Private`ExpVar^9) - 27/(16*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-7) + 7/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 5/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*z2 + (-3*li4half + 1469/(4800*HarmonicSums`Private`ExpVar^10) - 7757/(75600*HarmonicSums`Private`ExpVar^9) - 509/(4032*HarmonicSums`Private`ExpVar^8) + 6227/(70560*HarmonicSums`Private`ExpVar^7) + 137/(1440*HarmonicSums`Private`ExpVar^6) - 223/(900*HarmonicSums`Private`ExpVar^5) + 7/(24*HarmonicSums`Private`ExpVar^4) - 17/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (3*ln2^2*z2^2)/4 + (31*z2^3)/28 + (-1)^HarmonicSums`Private`ExpVar* (-187/(8*HarmonicSums`Private`ExpVar^10) - 27/(2*HarmonicSums`Private`ExpVar^9) + 27/(8*HarmonicSums`Private`ExpVar^8) + 2/HarmonicSums`Private`ExpVar^7 - 7/(8*HarmonicSums`Private`ExpVar^6) - 1/(2*HarmonicSums`Private`ExpVar^5) + 5/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3))*z3 + z3^2/16 + sinf*((3*ln2*z2^2)/8 + (25*z2*z3)/8 - (363*z5)/64), S[1, -2, 1, -2, HarmonicSums`Private`ExpVar] :> -165/(128*HarmonicSums`Private`ExpVar^10) + 217/(960*HarmonicSums`Private`ExpVar^9) + 111/(256*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) - 13/(160*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) + (-1)^HarmonicSums`Private`ExpVar* (27/(4*HarmonicSums`Private`ExpVar^10) + 11/HarmonicSums`Private`ExpVar^9 - HarmonicSums`Private`ExpVar^(-8) - 11/(8*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4))*z2 + (11*z2^3)/280 + (-1)^HarmonicSums`Private`ExpVar* (-187/(64*HarmonicSums`Private`ExpVar^10) - 27/(16*HarmonicSums`Private`ExpVar^9) + 27/(64*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^7) - 7/(64*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5) + 5/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3))*z3 + z3^2/128 + sinf*(z2*((-1)^HarmonicSums`Private`ExpVar* (-187/(16*HarmonicSums`Private`ExpVar^10) - 27/(4*HarmonicSums`Private`ExpVar^9) + 27/(16*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-7) - 7/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + z3/16) + (5*z5)/8), S[1, -2, 1, 2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (74636551/(1411200*HarmonicSums`Private`ExpVar^10) + 4093/(2880*HarmonicSums`Private`ExpVar^9) - 32023/(4800*HarmonicSums`Private`ExpVar^8) + 7/(144*HarmonicSums`Private`ExpVar^7) + 547/(288*HarmonicSums`Private`ExpVar^6) - 17/(16*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4)) + (3*s6)/4 + (-1)^HarmonicSums`Private`ExpVar*(-27/(2*HarmonicSums`Private`ExpVar^10) - 22/HarmonicSums`Private`ExpVar^9 + 2/HarmonicSums`Private`ExpVar^8 + 11/(4*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4))*z2 + (61*z2^3)/560 + (-1)^HarmonicSums`Private`ExpVar* (-187/(8*HarmonicSums`Private`ExpVar^10) - 27/(2*HarmonicSums`Private`ExpVar^9) + 27/(8*HarmonicSums`Private`ExpVar^8) + 2/HarmonicSums`Private`ExpVar^7 - 7/(8*HarmonicSums`Private`ExpVar^6) - 1/(2*HarmonicSums`Private`ExpVar^5) + 5/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3))*z3 - (35*z3^2)/128 + sinf*(z2*((-1)^HarmonicSums`Private`ExpVar* (187/(8*HarmonicSums`Private`ExpVar^10) + 27/(2*HarmonicSums`Private`ExpVar^9) - 27/(8*HarmonicSums`Private`ExpVar^8) - 2/HarmonicSums`Private`ExpVar^ 7 + 7/(8*HarmonicSums`Private`ExpVar^6) + 1/(2*HarmonicSums`Private`ExpVar^5) - 5/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) + z3/16) - (53*z5)/64) - (93*ln2*z5)/64, S[1, 2, -2, -1, HarmonicSums`Private`ExpVar] :> 4*li6half - (7*ln2^6)/90 - 2854181/(12096000*HarmonicSums`Private`ExpVar^ 10) + 1464991/(10886400*HarmonicSums`Private`ExpVar^9) + 127901/(967680*HarmonicSums`Private`ExpVar^8) - 2249/(7840*HarmonicSums`Private`ExpVar^7) + 61/(216*HarmonicSums`Private`ExpVar^6) - 691/(3600*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(36*HarmonicSums`Private`ExpVar^3) - (9*s6)/4 - 2*li4half*z2 + (ln2^4*z2)/3 - (411*z2^3)/560 + ln2^2*(-2*li4half + z2^2/2) - (7*ln2^3*z3)/6 + (-11/(192*HarmonicSums`Private`ExpVar^10) - 11/(560*HarmonicSums`Private`ExpVar^9) + 15/(448*HarmonicSums`Private`ExpVar^8) + 19/(1764*HarmonicSums`Private`ExpVar^7) - 7/(192*HarmonicSums`Private`ExpVar^6) - 7/(720*HarmonicSums`Private`ExpVar^5) + 25/(192*HarmonicSums`Private`ExpVar^4) - 85/(288*HarmonicSums`Private`ExpVar^3) + 15/(32*HarmonicSums`Private`ExpVar^2) - 5/(8*HarmonicSums`Private`ExpVar))*z3 + (7*z3^2)/4 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-109/(64*HarmonicSums`Private`ExpVar^10) + 313/(32*HarmonicSums`Private`ExpVar^9) - 3/(4*HarmonicSums`Private`ExpVar^8) - 23/(16*HarmonicSums`Private`ExpVar^7) + 11/(16*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5)) + z2*(11/(80*HarmonicSums`Private`ExpVar^10) + 33/(700*HarmonicSums`Private`ExpVar^9) - 9/(112*HarmonicSums`Private`ExpVar^8) - 19/(735*HarmonicSums`Private`ExpVar^7) + 7/(80*HarmonicSums`Private`ExpVar^6) + 7/(300*HarmonicSums`Private`ExpVar^5) - 5/(16*HarmonicSums`Private`ExpVar^4) + 17/(24*HarmonicSums`Private`ExpVar^3) - 9/(8*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar) + (5*z3)/4)) + sinf*(4*li5half - ln2^5/30 + (ln2^3*z2)/3 + (113*ln2*z2^2)/40 - (7*ln2^2*z3)/4 - (7*z2*z3)/4 - (89*z5)/64), S[1, 2, -2, 1, HarmonicSums`Private`ExpVar] :> -8*li6half - ln2^6/9 + (-1)^HarmonicSums`Private`ExpVar* (-1435/(128*HarmonicSums`Private`ExpVar^10) + 515/(64*HarmonicSums`Private`ExpVar^9) + 5/(16*HarmonicSums`Private`ExpVar^8) - 7/(8*HarmonicSums`Private`ExpVar^7) + 3/(16*HarmonicSums`Private`ExpVar^6)) - (5*s6)/4 + 2*li4half*z2 + (7*ln2^4*z2)/12 + (93*z2^3)/80 + ln2^2*(-4*li4half - z2^2/2) - (7*ln2^3*z3)/6 + (-11/(192*HarmonicSums`Private`ExpVar^10) - 11/(560*HarmonicSums`Private`ExpVar^9) + 15/(448*HarmonicSums`Private`ExpVar^8) + 19/(1764*HarmonicSums`Private`ExpVar^7) - 7/(192*HarmonicSums`Private`ExpVar^6) - 7/(720*HarmonicSums`Private`ExpVar^5) + 25/(192*HarmonicSums`Private`ExpVar^4) - 85/(288*HarmonicSums`Private`ExpVar^3) + 15/(32*HarmonicSums`Private`ExpVar^2) - 5/(8*HarmonicSums`Private`ExpVar))*z3 - (13*z3^2)/128 + sinf*(-4*li5half - 4*li4half*ln2 - (2*ln2^5)/15 + (-1)^HarmonicSums`Private`ExpVar* (109/(64*HarmonicSums`Private`ExpVar^10) - 313/(32*HarmonicSums`Private`ExpVar^9) + 3/(4*HarmonicSums`Private`ExpVar^8) + 23/(16*HarmonicSums`Private`ExpVar^7) - 11/(16*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5)) + (2*ln2^3*z2)/3 - (7*ln2^2*z3)/4 + (13*z2*z3)/16 + (33*z5)/32) + ln2*(-8*li5half + (7*z2*z3)/4 + (155*z5)/64), S[1, 2, 2, -1, HarmonicSums`Private`ExpVar] :> -12*li6half - 2*li4half*ln2^2 - ln2^6/30 + (-1)^HarmonicSums`Private`ExpVar* (-691/(64*HarmonicSums`Private`ExpVar^10) - 3/(8*HarmonicSums`Private`ExpVar^9) + 91/(64*HarmonicSums`Private`ExpVar^8) - 15/(32*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^6)) - (3*s6)/4 + (ln2^4*z2)/12 + (86*z2^3)/35 + (11/(480*HarmonicSums`Private`ExpVar^10) + 11/(1400*HarmonicSums`Private`ExpVar^9) - 3/(224*HarmonicSums`Private`ExpVar^8) - 19/(4410*HarmonicSums`Private`ExpVar^7) + 7/(480*HarmonicSums`Private`ExpVar^6) + 7/(1800*HarmonicSums`Private`ExpVar^5) - 5/(96*HarmonicSums`Private`ExpVar^4) + 17/(144*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z3 + (27*z3^2)/64 + ln2*(-8*li5half + 5917/(21000*HarmonicSums`Private`ExpVar^10) + 281/(22680*HarmonicSums`Private`ExpVar^9) - 10607/(60480*HarmonicSums`Private`ExpVar^8) + 17/(1680*HarmonicSums`Private`ExpVar^7) + 1321/(4320*HarmonicSums`Private`ExpVar^6) - 391/(720*HarmonicSums`Private`ExpVar^5) + 19/(32*HarmonicSums`Private`ExpVar^4) - 17/(36*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) + z2*(-11/(80*HarmonicSums`Private`ExpVar^10) - 33/(700*HarmonicSums`Private`ExpVar^9) + 9/(112*HarmonicSums`Private`ExpVar^8) + 19/(735*HarmonicSums`Private`ExpVar^7) - 7/(80*HarmonicSums`Private`ExpVar^6) - 7/(300*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^4) - 17/(24*HarmonicSums`Private`ExpVar^3) + 9/(8*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar) - 3*z3) + (93*z5)/16) + sinf*(-8*li5half - ln2^5/10 + (ln2^3*z2)/3 + ln2*(-4*li4half - (113*z2^2)/40) + (3*z2*z3)/8 + (125*z5)/16), S[1, 2, 2, 1, HarmonicSums`Private`ExpVar] :> 2699567/(158760000*HarmonicSums`Private`ExpVar^10) + 5289811/(28576800*HarmonicSums`Private`ExpVar^9) - 25931/(12700800*HarmonicSums`Private`ExpVar^8) - 48599/(352800*HarmonicSums`Private`ExpVar^7) - 449/(32400*HarmonicSums`Private`ExpVar^6) + 3901/(10800*HarmonicSums`Private`ExpVar^5) - 191/(288*HarmonicSums`Private`ExpVar^4) + 79/(108*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) - (8*z2^3)/7 + (11/(60*HarmonicSums`Private`ExpVar^10) + 11/(175*HarmonicSums`Private`ExpVar^9) - 3/(28*HarmonicSums`Private`ExpVar^8) - 76/(2205*HarmonicSums`Private`ExpVar^7) + 7/(60*HarmonicSums`Private`ExpVar^6) + 7/(225*HarmonicSums`Private`ExpVar^5) - 5/(12*HarmonicSums`Private`ExpVar^4) + 17/(18*HarmonicSums`Private`ExpVar^3) - 3/(2*HarmonicSums`Private`ExpVar^2) + 2/HarmonicSums`Private`ExpVar)* z3 + 2*z3^2 + sinf*(-5917/(21000*HarmonicSums`Private`ExpVar^10) - 281/(22680*HarmonicSums`Private`ExpVar^9) + 10607/(60480*HarmonicSums`Private`ExpVar^8) - 17/(1680*HarmonicSums`Private`ExpVar^7) - 1321/(4320*HarmonicSums`Private`ExpVar^6) + 391/(720*HarmonicSums`Private`ExpVar^5) - 19/(32*HarmonicSums`Private`ExpVar^4) + 17/(36*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 2*z5), S[1, 2, -1, -2, HarmonicSums`Private`ExpVar] :> -1271261/(3024000*HarmonicSums`Private`ExpVar^10) + 583291/(2721600*HarmonicSums`Private`ExpVar^9) + 45631/(241920*HarmonicSums`Private`ExpVar^8) - 1891/(5040*HarmonicSums`Private`ExpVar^7) + 589/(1728*HarmonicSums`Private`ExpVar^6) - 1553/(7200*HarmonicSums`Private`ExpVar^5) + 19/(192*HarmonicSums`Private`ExpVar^4) - 1/(36*HarmonicSums`Private`ExpVar^3) + (7*s6)/2 + (ln2^4*z2)/24 + (li4half + (-1)^HarmonicSums`Private`ExpVar* (-1011/(64*HarmonicSums`Private`ExpVar^10) + 3/(4*HarmonicSums`Private`ExpVar^9) + 243/(128*HarmonicSums`Private`ExpVar^8) - 19/(64*HarmonicSums`Private`ExpVar^7) - 3/(8*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4)))*z2 - (ln2^2*z2^2)/4 - (43*z2^3)/56 + ln2*z2*(-11/(120*HarmonicSums`Private`ExpVar^10) - 11/(350*HarmonicSums`Private`ExpVar^9) + 3/(56*HarmonicSums`Private`ExpVar^8) + 38/(2205*HarmonicSums`Private`ExpVar^7) - 7/(120*HarmonicSums`Private`ExpVar^6) - 7/(450*HarmonicSums`Private`ExpVar^5) + 5/(24*HarmonicSums`Private`ExpVar^4) - 17/(36*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1) - (7*z3)/4) + (143/(960*HarmonicSums`Private`ExpVar^10) + 143/(2800*HarmonicSums`Private`ExpVar^9) - 39/(448*HarmonicSums`Private`ExpVar^8) - 247/(8820*HarmonicSums`Private`ExpVar^7) + 91/(960*HarmonicSums`Private`ExpVar^6) + 91/(3600*HarmonicSums`Private`ExpVar^5) - 65/(192*HarmonicSums`Private`ExpVar^4) + 221/(288*HarmonicSums`Private`ExpVar^3) - 39/(32*HarmonicSums`Private`ExpVar^2) + 13/(8*HarmonicSums`Private`ExpVar))*z3 + (39*z3^2)/64 + sinf*((-3*ln2*z2^2)/8 - z2*z3 + (257*z5)/64), S[1, 2, -1, 2, HarmonicSums`Private`ExpVar] :> 24*li6half + ln2^6/15 + (-1)^HarmonicSums`Private`ExpVar* (-7859/(640*HarmonicSums`Private`ExpVar^10) + 9289/(960*HarmonicSums`Private`ExpVar^9) + 7/(12*HarmonicSums`Private`ExpVar^8) - 91/(48*HarmonicSums`Private`ExpVar^7) + 3/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5)) + (25*s6)/2 - (3*ln2^4*z2)/16 + (-(li4half/2) + (-1)^HarmonicSums`Private`ExpVar* (1011/(32*HarmonicSums`Private`ExpVar^10) - 3/(2*HarmonicSums`Private`ExpVar^9) - 243/(64*HarmonicSums`Private`ExpVar^8) + 19/(32*HarmonicSums`Private`ExpVar^7) + 3/(4*HarmonicSums`Private`ExpVar^6) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)))*z2 - (1213*z2^3)/560 + ln2^2*(4*li4half + z2^2/8) + (-11/(120*HarmonicSums`Private`ExpVar^10) - 11/(350*HarmonicSums`Private`ExpVar^9) + 3/(56*HarmonicSums`Private`ExpVar^8) + 38/(2205*HarmonicSums`Private`ExpVar^7) - 7/(120*HarmonicSums`Private`ExpVar^6) - 7/(450*HarmonicSums`Private`ExpVar^5) + 5/(24*HarmonicSums`Private`ExpVar^4) - 17/(36*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1))* z3 - (81*z3^2)/16 + ln2*(16*li5half + z2*(11/(240*HarmonicSums`Private`ExpVar^10) + 11/(700*HarmonicSums`Private`ExpVar^9) - 3/(112*HarmonicSums`Private`ExpVar^8) - 19/(2205*HarmonicSums`Private`ExpVar^7) + 7/(240*HarmonicSums`Private`ExpVar^6) + 7/(900*HarmonicSums`Private`ExpVar^5) - 5/(48*HarmonicSums`Private`ExpVar^4) + 17/(72*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) + (7*z3)/8) - (1271*z5)/64) + sinf*(16*li5half + ln2^5/5 - (2*ln2^3*z2)/3 + ln2*(8*li4half + (17*z2^2)/5) - z2*z3 - (507*z5)/32), S[1, 2, 1, -2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-1485/(128*HarmonicSums`Private`ExpVar^10) - 75/(64*HarmonicSums`Private`ExpVar^9) + 27/(16*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^6)) + (15*s6)/4 + (11/(700*HarmonicSums`Private`ExpVar^10) + 27169/(496125*HarmonicSums`Private`ExpVar^9) - 19/(2205*HarmonicSums`Private`ExpVar^8) - 62521/(1852200*HarmonicSums`Private`ExpVar^7) + 7/(900*HarmonicSums`Private`ExpVar^6) + 533/(13500*HarmonicSums`Private`ExpVar^5) - 1/(72*HarmonicSums`Private`ExpVar^4) - 17/(108*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1))* z2 + (7*z2^3)/5 + (-11/(960*HarmonicSums`Private`ExpVar^10) - 11/(2800*HarmonicSums`Private`ExpVar^9) + 3/(448*HarmonicSums`Private`ExpVar^8) + 19/(8820*HarmonicSums`Private`ExpVar^7) - 7/(960*HarmonicSums`Private`ExpVar^6) - 7/(3600*HarmonicSums`Private`ExpVar^5) + 5/(192*HarmonicSums`Private`ExpVar^4) - 17/(288*HarmonicSums`Private`ExpVar^3) + 3/(32*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z3 - (165*z3^2)/128 + sinf*(z2*(-11/(240*HarmonicSums`Private`ExpVar^10) - 11/(700*HarmonicSums`Private`ExpVar^9) + 3/(112*HarmonicSums`Private`ExpVar^8) + 19/(2205*HarmonicSums`Private`ExpVar^7) - 7/(240*HarmonicSums`Private`ExpVar^6) - 7/(900*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^4) - 17/(72*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) + (5*z3)/16) - (177*z5)/64) - (465*ln2*z5)/64, S[1, 2, 1, 2, HarmonicSums`Private`ExpVar] :> 11439461/(105840000*HarmonicSums`Private`ExpVar^10) + 54661/(423360*HarmonicSums`Private`ExpVar^9) - 1699153/(25401600*HarmonicSums`Private`ExpVar^8) - 166/(675*HarmonicSums`Private`ExpVar^7) + 73681/(129600*HarmonicSums`Private`ExpVar^6) - 349/(480*HarmonicSums`Private`ExpVar^5) + 395/(576*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) + (-11/(350*HarmonicSums`Private`ExpVar^10) - 54338/(496125*HarmonicSums`Private`ExpVar^9) + 38/(2205*HarmonicSums`Private`ExpVar^8) + 62521/(926100*HarmonicSums`Private`ExpVar^7) - 7/(450*HarmonicSums`Private`ExpVar^6) - 533/(6750*HarmonicSums`Private`ExpVar^5) + 1/(36*HarmonicSums`Private`ExpVar^4) + 17/(54*HarmonicSums`Private`ExpVar^3) - HarmonicSums`Private`ExpVar^ (-2) + 2/HarmonicSums`Private`ExpVar)*z2 - (38*z2^3)/35 + (-11/(120*HarmonicSums`Private`ExpVar^10) - 11/(350*HarmonicSums`Private`ExpVar^9) + 3/(56*HarmonicSums`Private`ExpVar^8) + 38/(2205*HarmonicSums`Private`ExpVar^7) - 7/(120*HarmonicSums`Private`ExpVar^6) - 7/(450*HarmonicSums`Private`ExpVar^5) + 5/(24*HarmonicSums`Private`ExpVar^4) - 17/(36*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1))* z3 + z3^2/2 + sinf*(z2*(11/(120*HarmonicSums`Private`ExpVar^10) + 11/(350*HarmonicSums`Private`ExpVar^9) - 3/(56*HarmonicSums`Private`ExpVar^8) - 38/(2205*HarmonicSums`Private`ExpVar^7) + 7/(120*HarmonicSums`Private`ExpVar^6) + 7/(450*HarmonicSums`Private`ExpVar^5) - 5/(24*HarmonicSums`Private`ExpVar^4) + 17/(36*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1) - z3) + (9*z5)/2), S[1, -1, -3, -1, HarmonicSums`Private`ExpVar] :> 6*li6half - ln2^6/20 + (-1)^HarmonicSums`Private`ExpVar* (-9137/(1536*HarmonicSums`Private`ExpVar^10) + 2137/(768*HarmonicSums`Private`ExpVar^9) + 155/(256*HarmonicSums`Private`ExpVar^8) - 289/(384*HarmonicSums`Private`ExpVar^7) + 17/(64*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^5)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(1185/(32*HarmonicSums`Private`ExpVar^10) - 153/(16*HarmonicSums`Private`ExpVar^9) - 147/(32*HarmonicSums`Private`ExpVar^8) + 7/(4*HarmonicSums`Private`ExpVar^7) + 15/(16*HarmonicSums`Private`ExpVar^6) - 5/(8*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2)) + (31*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(256*HarmonicSums`Private`ExpVar^10) - 51/(128*HarmonicSums`Private`ExpVar^9) - 49/(256*HarmonicSums`Private`ExpVar^8) + 7/(96*HarmonicSums`Private`ExpVar^7) + 5/(128*HarmonicSums`Private`ExpVar^6) - 5/(192*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3) - 1/(48*HarmonicSums`Private`ExpVar^2)) + (7*z2)/24) + (-1)^HarmonicSums`Private`ExpVar* (-711/(64*HarmonicSums`Private`ExpVar^10) + 459/(160*HarmonicSums`Private`ExpVar^9) + 441/(320*HarmonicSums`Private`ExpVar^8) - 21/(40*HarmonicSums`Private`ExpVar^7) - 9/(32*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5) + 9/(80*HarmonicSums`Private`ExpVar^4) - 9/(40*HarmonicSums`Private`ExpVar^3) + 3/(20*HarmonicSums`Private`ExpVar^2))*z2^2 + (31*z2^3)/168 + ln2^2*(-li4half + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) + 153/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (19*z2^2)/16) - (173*z3^2)/64 + ln2*(2*li5half + 5153/(3600*HarmonicSums`Private`ExpVar^10) + 3433/(6480*HarmonicSums`Private`ExpVar^9) - 527/(1152*HarmonicSums`Private`ExpVar^8) - 391/(2016*HarmonicSums`Private`ExpVar^7) + 271/(576*HarmonicSums`Private`ExpVar^6) - 551/(1440*HarmonicSums`Private`ExpVar^5) + 37/(192*HarmonicSums`Private`ExpVar^4) - 1/(18*HarmonicSums`Private`ExpVar^3) - (39*z2*z3)/16 - (155*z5)/32) + sinf*(-(ln2^5/12) + (ln2^3*z2)/2 + ln2*(-2*li4half - (2*z2^2)/5) + (15*z5)/32), S[1, -1, -3, 1, HarmonicSums`Private`ExpVar] :> 2*li6half - (7*ln2^6)/180 + (-1)^HarmonicSums`Private`ExpVar*li4half* (-1185/(32*HarmonicSums`Private`ExpVar^10) + 153/(16*HarmonicSums`Private`ExpVar^9) + 147/(32*HarmonicSums`Private`ExpVar^8) - 7/(4*HarmonicSums`Private`ExpVar^7) - 15/(16*HarmonicSums`Private`ExpVar^6) + 5/(8*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2)) + 12353437/(10368000*HarmonicSums`Private`ExpVar^10) + 7834427/(13063680*HarmonicSums`Private`ExpVar^9) - 104701/(387072*HarmonicSums`Private`ExpVar^8) - 6079/(42336*HarmonicSums`Private`ExpVar^7) + 451/(3456*HarmonicSums`Private`ExpVar^6) + 71/(8640*HarmonicSums`Private`ExpVar^5) - 73/(1152*HarmonicSums`Private`ExpVar^4) + 1/(27*HarmonicSums`Private`ExpVar^3) + 3*s6 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-395/(256*HarmonicSums`Private`ExpVar^10) + 51/(128*HarmonicSums`Private`ExpVar^9) + 49/(256*HarmonicSums`Private`ExpVar^8) - 7/(96*HarmonicSums`Private`ExpVar^7) - 5/(128*HarmonicSums`Private`ExpVar^6) + 5/(192*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2)) + (5*z2)/24) + (-1)^HarmonicSums`Private`ExpVar* (2607/(128*HarmonicSums`Private`ExpVar^10) - 1683/(320*HarmonicSums`Private`ExpVar^9) - 1617/(640*HarmonicSums`Private`ExpVar^8) + 77/(80*HarmonicSums`Private`ExpVar^7) + 33/(64*HarmonicSums`Private`ExpVar^6) - 11/(32*HarmonicSums`Private`ExpVar^5) - 33/(160*HarmonicSums`Private`ExpVar^4) + 33/(80*HarmonicSums`Private`ExpVar^3) - 11/(40*HarmonicSums`Private`ExpVar^2))*z2^2 - (5*z2^3)/6 + ln2^2*(-li4half + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) - 153/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - z2^2/4) - (7*ln2^3*z3)/12 + (81*z3^2)/64 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-8295/(256*HarmonicSums`Private`ExpVar^10) + 1071/(128*HarmonicSums`Private`ExpVar^9) + 1029/(256*HarmonicSums`Private`ExpVar^8) - 49/(32*HarmonicSums`Private`ExpVar^7) - 105/(128*HarmonicSums`Private`ExpVar^6) + 35/(64*HarmonicSums`Private`ExpVar^5) + 21/(64*HarmonicSums`Private`ExpVar^4) - 21/(32*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2))*z3 - (7*z2*z3)/8) + sinf*(-2*li5half - ln2^5/15 - 5153/(3600*HarmonicSums`Private`ExpVar^10) - 3433/(6480*HarmonicSums`Private`ExpVar^9) + 527/(1152*HarmonicSums`Private`ExpVar^8) + 391/(2016*HarmonicSums`Private`ExpVar^7) - 271/(576*HarmonicSums`Private`ExpVar^6) + 551/(1440*HarmonicSums`Private`ExpVar^5) - 37/(192*HarmonicSums`Private`ExpVar^4) + 1/(18*HarmonicSums`Private`ExpVar^3) + (ln2^3*z2)/3 + ln2*(-2*li4half - z2^2/2) - (7*ln2^2*z3)/8 - (7*z2*z3)/8 + (85*z5)/16), S[1, -1, 3, -1, HarmonicSums`Private`ExpVar] :> ln2^6/24 - 12797/(12800*HarmonicSums`Private`ExpVar^10) + 511/(1280*HarmonicSums`Private`ExpVar^9) + 943/(3072*HarmonicSums`Private`ExpVar^8) - 179/(448*HarmonicSums`Private`ExpVar^7) + 11/(48*HarmonicSums`Private`ExpVar^6) - 13/(160*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - (5*s6)/2 + li4half*z2 - (5*ln2^4*z2)/24 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(512*HarmonicSums`Private`ExpVar^10) + 153/(256*HarmonicSums`Private`ExpVar^9) + 147/(512*HarmonicSums`Private`ExpVar^8) - 7/(64*HarmonicSums`Private`ExpVar^7) - 15/(256*HarmonicSums`Private`ExpVar^6) + 5/(128*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) - 3/(64*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2))*z2^2 - (1139*z2^3)/1680 + ln2^2*(li4half + (23*z2^2)/40) + (55*z3^2)/128 + ln2*((-1)^HarmonicSums`Private`ExpVar* (11369/(384*HarmonicSums`Private`ExpVar^10) + 177/(64*HarmonicSums`Private`ExpVar^9) - 377/(96*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^7) + 35/(32*HarmonicSums`Private`ExpVar^6) - 9/(16*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* (8295/(256*HarmonicSums`Private`ExpVar^10) - 1071/(128*HarmonicSums`Private`ExpVar^9) - 1029/(256*HarmonicSums`Private`ExpVar^8) + 49/(32*HarmonicSums`Private`ExpVar^7) + 105/(128*HarmonicSums`Private`ExpVar^6) - 35/(64*HarmonicSums`Private`ExpVar^5) - 21/(64*HarmonicSums`Private`ExpVar^4) + 21/(32*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2))*z3 + (39*z2*z3)/16) + sinf*(-4*li5half + ln2^5/30 - (ln2^3*z2)/3 - (13*ln2*z2^2)/40 + (27*z5)/8), S[1, -1, 3, 1, HarmonicSums`Private`ExpVar] :> 8*li6half + ln2^6/360 + (-1)^HarmonicSums`Private`ExpVar* (73991/(4608*HarmonicSums`Private`ExpVar^10) + 3319/(768*HarmonicSums`Private`ExpVar^9) - 3271/(2304*HarmonicSums`Private`ExpVar^8) - 157/(384*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6) + 11/(96*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4)) + 3*s6 - li4half*z2 + (ln2^4*z2)/24 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) + 153/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2^2 - (893*z2^3)/1680 + ln2^2*(li4half + (4*z2^2)/5) - (7*ln2^3*z3)/12 - (223*z3^2)/128 + ln2*(6*li5half + (7*z2*z3)/8 - (527*z5)/64) + sinf*(2*li5half - ln2^5/60 + (-1)^HarmonicSums`Private`ExpVar* (-11369/(384*HarmonicSums`Private`ExpVar^10) - 177/(64*HarmonicSums`Private`ExpVar^9) + 377/(96*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) - 35/(32*HarmonicSums`Private`ExpVar^6) + 9/(16*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) + (ln2^3*z2)/6 + (11*ln2*z2^2)/10 - (7*ln2^2*z3)/8 + (7*z2*z3)/8 - (311*z5)/64), S[1, -1, -2, -2, HarmonicSums`Private`ExpVar] :> ln2^6/20 + (-1)^HarmonicSums`Private`ExpVar* (-2239/(256*HarmonicSums`Private`ExpVar^10) + 1049/(384*HarmonicSums`Private`ExpVar^9) + 367/(384*HarmonicSums`Private`ExpVar^8) - 167/(192*HarmonicSums`Private`ExpVar^7) + 9/(32*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^5)) - (3*s6)/2 - (11*ln2^4*z2)/48 + ((-3*li4half)/2 - 1717/(4800*HarmonicSums`Private`ExpVar^10) + 31933/(151200*HarmonicSums`Private`ExpVar^9) + 221/(2016*HarmonicSums`Private`ExpVar^8) - 7019/(70560*HarmonicSums`Private`ExpVar^7) - 173/(2880*HarmonicSums`Private`ExpVar^6) + 1223/(7200*HarmonicSums`Private`ExpVar^5) - 35/(192*HarmonicSums`Private`ExpVar^4) + 19/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-3081/(512*HarmonicSums`Private`ExpVar^10) + 1989/(1280*HarmonicSums`Private`ExpVar^9) + 1911/(2560*HarmonicSums`Private`ExpVar^8) - 91/(320*HarmonicSums`Private`ExpVar^7) - 39/(256*HarmonicSums`Private`ExpVar^6) + 13/(128*HarmonicSums`Private`ExpVar^5) + 39/(640*HarmonicSums`Private`ExpVar^4) - 39/(320*HarmonicSums`Private`ExpVar^3) + 13/(160*HarmonicSums`Private`ExpVar^2))*z2^2 + (977*z2^3)/1680 + ln2^2*(2*li4half + (23*z2^2)/16) + (77*z3^2)/128 + sinf*(8*li5half + ln2^5/10 - (ln2^3*z2)/3 + ln2*(4*li4half + (17*z2^2)/8) + (5*z2*z3)/16 - (331*z5)/32) + ln2*(4*li5half - (403*z5)/64), S[1, -1, -2, 2, HarmonicSums`Private`ExpVar] :> -4*li6half + (7*ln2^6)/90 + (-1)^HarmonicSums`Private`ExpVar*li4half* (1185/(16*HarmonicSums`Private`ExpVar^10) - 153/(8*HarmonicSums`Private`ExpVar^9) - 147/(16*HarmonicSums`Private`ExpVar^8) + 7/(2*HarmonicSums`Private`ExpVar^7) + 15/(8*HarmonicSums`Private`ExpVar^6) - 5/(4*HarmonicSums`Private`ExpVar^5) - 3/(4*HarmonicSums`Private`ExpVar^4) + 3/(2*HarmonicSums`Private`ExpVar^3) - HarmonicSums`Private`ExpVar^ (-2)) + 7610891/(12096000*HarmonicSums`Private`ExpVar^10) + 10038839/(10886400*HarmonicSums`Private`ExpVar^9) - 195947/(967680*HarmonicSums`Private`ExpVar^8) - 13189/(23520*HarmonicSums`Private`ExpVar^7) + 2977/(4320*HarmonicSums`Private`ExpVar^6) - 104/(225*HarmonicSums`Private`ExpVar^5) + 5/(24*HarmonicSums`Private`ExpVar^4) - 1/(18*HarmonicSums`Private`ExpVar^3) + (3*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(128*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^9) - 49/(128*HarmonicSums`Private`ExpVar^8) + 7/(48*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) - (7*z2)/24) + (3*li4half + 1717/(2400*HarmonicSums`Private`ExpVar^10) - 31933/(75600*HarmonicSums`Private`ExpVar^9) - 221/(1008*HarmonicSums`Private`ExpVar^8) + 7019/(35280*HarmonicSums`Private`ExpVar^7) + 173/(1440*HarmonicSums`Private`ExpVar^6) - 1223/(3600*HarmonicSums`Private`ExpVar^5) + 35/(96*HarmonicSums`Private`ExpVar^4) - 19/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-12087/(512*HarmonicSums`Private`ExpVar^10) + 7803/(1280*HarmonicSums`Private`ExpVar^9) + 7497/(2560*HarmonicSums`Private`ExpVar^8) - 357/(320*HarmonicSums`Private`ExpVar^7) - 153/(256*HarmonicSums`Private`ExpVar^6) + 51/(128*HarmonicSums`Private`ExpVar^5) + 153/(640*HarmonicSums`Private`ExpVar^4) - 153/(320*HarmonicSums`Private`ExpVar^3) + 51/(160*HarmonicSums`Private`ExpVar^2))*z2^2 - (167*z2^3)/840 + ln2^2*(2*li4half + (-1)^HarmonicSums`Private`ExpVar* (-1185/(64*HarmonicSums`Private`ExpVar^10) + 153/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) - 7/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) + 5/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2 - (11*z2^2)/10) + (7*ln2^3*z3)/6 - (3*z3^2)/2 + ln2*((-1)^HarmonicSums`Private`ExpVar* (8295/(128*HarmonicSums`Private`ExpVar^10) - 1071/(64*HarmonicSums`Private`ExpVar^9) - 1029/(128*HarmonicSums`Private`ExpVar^8) + 49/(16*HarmonicSums`Private`ExpVar^7) + 105/(64*HarmonicSums`Private`ExpVar^6) - 35/(32*HarmonicSums`Private`ExpVar^5) - 21/(32*HarmonicSums`Private`ExpVar^4) + 21/(16*HarmonicSums`Private`ExpVar^3) - 7/(8*HarmonicSums`Private`ExpVar^2))*z3 + (7*z2*z3)/4) + sinf*(4*li5half + (2*ln2^5)/15 - (2*ln2^3*z2)/3 + ln2*(4*li4half - (7*z2^2)/10) + (7*ln2^2*z3)/4 + (9*z2*z3)/8 - (259*z5)/64), S[1, -1, 2, -2, HarmonicSums`Private`ExpVar] :> 4*li6half - (7*ln2^6)/90 + (-1)^HarmonicSums`Private`ExpVar*li4half* (-1185/(16*HarmonicSums`Private`ExpVar^10) + 153/(8*HarmonicSums`Private`ExpVar^9) + 147/(16*HarmonicSums`Private`ExpVar^8) - 7/(2*HarmonicSums`Private`ExpVar^7) - 15/(8*HarmonicSums`Private`ExpVar^6) + 5/(4*HarmonicSums`Private`ExpVar^5) + 3/(4*HarmonicSums`Private`ExpVar^4) - 3/(2*HarmonicSums`Private`ExpVar^3) + HarmonicSums`Private`ExpVar^ (-2)) - 37963/(23040*HarmonicSums`Private`ExpVar^10) + 1661591/(3628800*HarmonicSums`Private`ExpVar^9) + 29257/(64512*HarmonicSums`Private`ExpVar^8) - 2921/(5880*HarmonicSums`Private`ExpVar^7) + 751/(2880*HarmonicSums`Private`ExpVar^6) - 69/(800*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) + (7*s6)/2 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-395/(128*HarmonicSums`Private`ExpVar^10) + 51/(64*HarmonicSums`Private`ExpVar^9) + 49/(128*HarmonicSums`Private`ExpVar^8) - 7/(48*HarmonicSums`Private`ExpVar^7) - 5/(64*HarmonicSums`Private`ExpVar^6) + 5/(96*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) + z2/4) + (-4*li4half + (-1)^HarmonicSums`Private`ExpVar* (-1129/(448*HarmonicSums`Private`ExpVar^10) + 27247/(3360*HarmonicSums`Private`ExpVar^9) - 13/(1920*HarmonicSums`Private`ExpVar^8) - 647/(480*HarmonicSums`Private`ExpVar^7) + 7/(64*HarmonicSums`Private`ExpVar^6) + 47/(96*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)))*z2 + (-1)^HarmonicSums`Private`ExpVar* (20145/(512*HarmonicSums`Private`ExpVar^10) - 2601/(256*HarmonicSums`Private`ExpVar^9) - 2499/(512*HarmonicSums`Private`ExpVar^8) + 119/(64*HarmonicSums`Private`ExpVar^7) + 255/(256*HarmonicSums`Private`ExpVar^6) - 85/(128*HarmonicSums`Private`ExpVar^5) - 51/(128*HarmonicSums`Private`ExpVar^4) + 51/(64*HarmonicSums`Private`ExpVar^3) - 17/(32*HarmonicSums`Private`ExpVar^2))*z2^2 + (29*z2^3)/168 + ln2^2*(-2*li4half + (-1)^HarmonicSums`Private`ExpVar* (1185/(64*HarmonicSums`Private`ExpVar^10) - 153/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) + 7/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (67*z2^2)/80) - (7*ln2^3*z3)/6 + (285*z3^2)/128 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-8295/(128*HarmonicSums`Private`ExpVar^10) + 1071/(64*HarmonicSums`Private`ExpVar^9) + 1029/(128*HarmonicSums`Private`ExpVar^8) - 49/(16*HarmonicSums`Private`ExpVar^7) - 105/(64*HarmonicSums`Private`ExpVar^6) + 35/(32*HarmonicSums`Private`ExpVar^5) + 21/(32*HarmonicSums`Private`ExpVar^4) - 21/(16*HarmonicSums`Private`ExpVar^3) + 7/(8*HarmonicSums`Private`ExpVar^2))*z3 - (35*z2*z3)/8) + sinf*(-4*li5half - (2*ln2^5)/15 + (2*ln2^3*z2)/3 + ln2*(-4*li4half - (13*z2^2)/40) - (7*ln2^2*z3)/4 - (3*z2*z3)/2 + (129*z5)/16), S[1, -1, 2, 2, HarmonicSums`Private`ExpVar] :> -(ln2^6/20) + (-1)^HarmonicSums`Private`ExpVar* (1978463/(80640*HarmonicSums`Private`ExpVar^10) + 3571/(640*HarmonicSums`Private`ExpVar^9) - 19813/(5760*HarmonicSums`Private`ExpVar^8) - 167/(192*HarmonicSums`Private`ExpVar^7) + 65/(48*HarmonicSums`Private`ExpVar^6) - 29/(48*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) + (5*s6)/2 + (ln2^4*z2)/4 + (2*li4half + (-1)^HarmonicSums`Private`ExpVar* (1129/(224*HarmonicSums`Private`ExpVar^10) - 27247/(1680*HarmonicSums`Private`ExpVar^9) + 13/(960*HarmonicSums`Private`ExpVar^8) + 647/(240*HarmonicSums`Private`ExpVar^7) - 7/(32*HarmonicSums`Private`ExpVar^6) - 47/(48*HarmonicSums`Private`ExpVar^5) + 3/(4*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-1659/(128*HarmonicSums`Private`ExpVar^10) + 1071/(320*HarmonicSums`Private`ExpVar^9) + 1029/(640*HarmonicSums`Private`ExpVar^8) - 49/(80*HarmonicSums`Private`ExpVar^7) - 21/(64*HarmonicSums`Private`ExpVar^6) + 7/(32*HarmonicSums`Private`ExpVar^5) + 21/(160*HarmonicSums`Private`ExpVar^4) - 21/(80*HarmonicSums`Private`ExpVar^3) + 7/(40*HarmonicSums`Private`ExpVar^2))*z2^2 + (19*z2^3)/84 + ln2^2*(-2*li4half - (91*z2^2)/80) - (145*z3^2)/64 + ln2*(-4*li5half + (21*z2*z3)/16 - (31*z5)/32) + sinf*(-8*li5half - ln2^5/10 + (ln2^3*z2)/3 + ln2*(-4*li4half - (51*z2^2)/40) - (z2*z3)/8 + (227*z5)/32), S[1, -1, -1, -3, HarmonicSums`Private`ExpVar] :> -6*li6half + ln2^6/120 + (-1)^HarmonicSums`Private`ExpVar* (-18685/(1536*HarmonicSums`Private`ExpVar^10) + 2185/(768*HarmonicSums`Private`ExpVar^9) + 991/(768*HarmonicSums`Private`ExpVar^8) - 379/(384*HarmonicSums`Private`ExpVar^7) + 19/(64*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^5)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-1185/(32*HarmonicSums`Private`ExpVar^10) + 153/(16*HarmonicSums`Private`ExpVar^9) + 147/(32*HarmonicSums`Private`ExpVar^8) - 7/(4*HarmonicSums`Private`ExpVar^7) - 15/(16*HarmonicSums`Private`ExpVar^6) + 5/(8*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2)) - (7*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-395/(256*HarmonicSums`Private`ExpVar^10) + 51/(128*HarmonicSums`Private`ExpVar^9) + 49/(256*HarmonicSums`Private`ExpVar^8) - 7/(96*HarmonicSums`Private`ExpVar^7) - 5/(128*HarmonicSums`Private`ExpVar^6) + 5/(192*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2)) - (5*z2)/48) - (3*li4half*z2)/2 + (-1)^HarmonicSums`Private`ExpVar* (237/(64*HarmonicSums`Private`ExpVar^10) - 153/(160*HarmonicSums`Private`ExpVar^9) - 147/(320*HarmonicSums`Private`ExpVar^8) + 7/(40*HarmonicSums`Private`ExpVar^7) + 3/(32*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5) - 3/(80*HarmonicSums`Private`ExpVar^4) + 3/(40*HarmonicSums`Private`ExpVar^3) - 1/(20*HarmonicSums`Private`ExpVar^2))*z2^2 + (1091*z2^3)/560 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) - 153/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (49*z2^2)/40) - (ln2^3*z3)/4 + (-2071/(10240*HarmonicSums`Private`ExpVar^10) - 17757/(179200*HarmonicSums`Private`ExpVar^9) + 1745/(28672*HarmonicSums`Private`ExpVar^8) + 8251/(188160*HarmonicSums`Private`ExpVar^7) - 121/(2560*HarmonicSums`Private`ExpVar^6) - 757/(19200*HarmonicSums`Private`ExpVar^5) + 79/(512*HarmonicSums`Private`ExpVar^4) - 49/(192*HarmonicSums`Private`ExpVar^3) + 21/(64*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*z3 + (25*z3^2)/64 + ln2*(-2*li5half + (-1)^HarmonicSums`Private`ExpVar* (-3555/(256*HarmonicSums`Private`ExpVar^10) + 459/(128*HarmonicSums`Private`ExpVar^9) + 441/(256*HarmonicSums`Private`ExpVar^8) - 21/(32*HarmonicSums`Private`ExpVar^7) - 45/(128*HarmonicSums`Private`ExpVar^6) + 15/(64*HarmonicSums`Private`ExpVar^5) + 9/(64*HarmonicSums`Private`ExpVar^4) - 9/(32*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2))*z3 - (3*z2*z3)/8 - (279*z5)/64) + sinf*((19*ln2*z2^2)/40 - (3*ln2^2*z3)/8 + (z2*z3)/8 - (15*z5)/8), S[1, -1, -1, 3, HarmonicSums`Private`ExpVar] :> -4*li6half - ln2^6/180 - 176741/(691200*HarmonicSums`Private`ExpVar^10) + 564173/(870912*HarmonicSums`Private`ExpVar^9) + 10601/(129024*HarmonicSums`Private`ExpVar^8) - 7013/(14112*HarmonicSums`Private`ExpVar^7) + 535/(1152*HarmonicSums`Private`ExpVar^6) - 157/(576*HarmonicSums`Private`ExpVar^5) + 43/(384*HarmonicSums`Private`ExpVar^4) - 1/(36*HarmonicSums`Private`ExpVar^3) + (9*s6)/4 + 3*li4half*z2 + (5*ln2^4*z2)/24 - (3*ln2^2*z2^2)/5 + (-1)^HarmonicSums`Private`ExpVar* (4503/(512*HarmonicSums`Private`ExpVar^10) - 2907/(1280*HarmonicSums`Private`ExpVar^9) - 2793/(2560*HarmonicSums`Private`ExpVar^8) + 133/(320*HarmonicSums`Private`ExpVar^7) + 57/(256*HarmonicSums`Private`ExpVar^6) - 19/(128*HarmonicSums`Private`ExpVar^5) - 57/(640*HarmonicSums`Private`ExpVar^4) + 57/(320*HarmonicSums`Private`ExpVar^3) - 19/(160*HarmonicSums`Private`ExpVar^2))*z2^2 - (199*z2^3)/280 - (ln2^3*z3)/4 + (2071/(7680*HarmonicSums`Private`ExpVar^10) + 5919/(44800*HarmonicSums`Private`ExpVar^9) - 1745/(21504*HarmonicSums`Private`ExpVar^8) - 8251/(141120*HarmonicSums`Private`ExpVar^7) + 121/(1920*HarmonicSums`Private`ExpVar^6) + 757/(14400*HarmonicSums`Private`ExpVar^5) - 79/(384*HarmonicSums`Private`ExpVar^4) + 49/(144*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z3 + (55*z3^2)/64 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-3555/(256*HarmonicSums`Private`ExpVar^10) + 459/(128*HarmonicSums`Private`ExpVar^9) + 441/(256*HarmonicSums`Private`ExpVar^8) - 21/(32*HarmonicSums`Private`ExpVar^7) - 45/(128*HarmonicSums`Private`ExpVar^6) + 15/(64*HarmonicSums`Private`ExpVar^5) + 9/(64*HarmonicSums`Private`ExpVar^4) - 9/(32*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2))*z3 - (3*z2*z3)/8) + sinf*(2*li5half - ln2^5/60 + (ln2^3*z2)/6 + (ln2*z2^2)/5 - (3*ln2^2*z3)/8 - (11*z2*z3)/8 + (159*z5)/64), S[1, -1, 1, -3, HarmonicSums`Private`ExpVar] :> -6*li6half + ln2^6/30 + (-1)^HarmonicSums`Private`ExpVar*li4half* (1185/(32*HarmonicSums`Private`ExpVar^10) - 153/(16*HarmonicSums`Private`ExpVar^9) - 147/(32*HarmonicSums`Private`ExpVar^8) + 7/(4*HarmonicSums`Private`ExpVar^7) + 15/(16*HarmonicSums`Private`ExpVar^6) - 5/(8*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2)) - 570397/(230400*HarmonicSums`Private`ExpVar^10) + 4769869/(7257600*HarmonicSums`Private`ExpVar^9) + 72859/(129024*HarmonicSums`Private`ExpVar^8) - 27761/(47040*HarmonicSums`Private`ExpVar^7) + 421/(1440*HarmonicSums`Private`ExpVar^6) - 73/(800*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - (3*s6)/2 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(256*HarmonicSums`Private`ExpVar^10) - 51/(128*HarmonicSums`Private`ExpVar^9) - 49/(256*HarmonicSums`Private`ExpVar^8) + 7/(96*HarmonicSums`Private`ExpVar^7) + 5/(128*HarmonicSums`Private`ExpVar^6) - 5/(192*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3) - 1/(48*HarmonicSums`Private`ExpVar^2)) - z2/24) + 2*li4half*z2 + (-1)^HarmonicSums`Private`ExpVar* (-3555/(256*HarmonicSums`Private`ExpVar^10) + 459/(128*HarmonicSums`Private`ExpVar^9) + 441/(256*HarmonicSums`Private`ExpVar^8) - 21/(32*HarmonicSums`Private`ExpVar^7) - 45/(128*HarmonicSums`Private`ExpVar^6) + 15/(64*HarmonicSums`Private`ExpVar^5) + 9/(64*HarmonicSums`Private`ExpVar^4) - 9/(32*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2))*z2^2 + (13*z2^3)/35 + ln2^2*(li4half + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) + 153/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (7*z2^2)/20) + (ln2^3*z3)/3 + (-1)^HarmonicSums`Private`ExpVar* (-19629/(512*HarmonicSums`Private`ExpVar^10) + 441/(256*HarmonicSums`Private`ExpVar^9) + 567/(128*HarmonicSums`Private`ExpVar^8) - 45/(128*HarmonicSums`Private`ExpVar^7) - 105/(128*HarmonicSums`Private`ExpVar^6) + 9/(64*HarmonicSums`Private`ExpVar^5) + 9/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3))*z3 - z3^2/8 + ln2*((-1)^HarmonicSums`Private`ExpVar* (8295/(256*HarmonicSums`Private`ExpVar^10) - 1071/(128*HarmonicSums`Private`ExpVar^9) - 1029/(256*HarmonicSums`Private`ExpVar^8) + 49/(32*HarmonicSums`Private`ExpVar^7) + 105/(128*HarmonicSums`Private`ExpVar^6) - 35/(64*HarmonicSums`Private`ExpVar^5) - 21/(64*HarmonicSums`Private`ExpVar^4) + 21/(32*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2))*z3 + (5*z2*z3)/4) + sinf*(4*li5half + ln2^5/20 - (ln2^3*z2)/6 + ln2*(2*li4half + z2^2/5) + (ln2^2*z3)/2 + (-1)^HarmonicSums`Private`ExpVar* (3555/(256*HarmonicSums`Private`ExpVar^10) - 459/(128*HarmonicSums`Private`ExpVar^9) - 441/(256*HarmonicSums`Private`ExpVar^8) + 21/(32*HarmonicSums`Private`ExpVar^7) + 45/(128*HarmonicSums`Private`ExpVar^6) - 15/(64*HarmonicSums`Private`ExpVar^5) - 9/(64*HarmonicSums`Private`ExpVar^4) + 9/(32*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2))*z3 + (9*z2*z3)/8 - (153*z5)/32), S[1, -1, 1, 3, HarmonicSums`Private`ExpVar] :> -8*li6half + (17*ln2^6)/360 + (-1)^HarmonicSums`Private`ExpVar* (41137/(4608*HarmonicSums`Private`ExpVar^10) + 3185/(768*HarmonicSums`Private`ExpVar^9) - 3125/(2304*HarmonicSums`Private`ExpVar^8) - 319/(384*HarmonicSums`Private`ExpVar^7) + 13/(16*HarmonicSums`Private`ExpVar^6) - 31/(96*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)) - (11*s6)/2 - li4half*z2 - (7*ln2^4*z2)/24 + (-1)^HarmonicSums`Private`ExpVar* (237/(128*HarmonicSums`Private`ExpVar^10) - 153/(320*HarmonicSums`Private`ExpVar^9) - 147/(640*HarmonicSums`Private`ExpVar^8) + 7/(80*HarmonicSums`Private`ExpVar^7) + 3/(64*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5) - 3/(160*HarmonicSums`Private`ExpVar^4) + 3/(80*HarmonicSums`Private`ExpVar^3) - 1/(40*HarmonicSums`Private`ExpVar^2))*z2^2 + (31*z2^3)/28 + ln2^2*(li4half + (11*z2^2)/10) + (ln2^3*z3)/3 + (-1)^HarmonicSums`Private`ExpVar* (6543/(128*HarmonicSums`Private`ExpVar^10) - 147/(64*HarmonicSums`Private`ExpVar^9) - 189/(32*HarmonicSums`Private`ExpVar^8) + 15/(32*HarmonicSums`Private`ExpVar^7) + 35/(32*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3))*z3 + (267*z3^2)/128 + sinf*(2*li5half + ln2^5/15 - (ln2^3*z2)/3 + ln2*(2*li4half + (19*z2^2)/40) + (ln2^2*z3)/2 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(64*HarmonicSums`Private`ExpVar^10) + 153/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) - 7/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) + 5/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z3 - (7*z2*z3)/16 - (151*z5)/64) + ln2*(-2*li5half - (z2*z3)/2 + (155*z5)/64), S[1, 1, -3, -1, HarmonicSums`Private`ExpVar] :> -2*li6half + (7*ln2^6)/180 + li4half*(-(30*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(42*HarmonicSums`Private`ExpVar^7) - 1/(30*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) - 3289649/(10368000*HarmonicSums`Private`ExpVar^10) + 1038331/(9331200*HarmonicSums`Private`ExpVar^9) + 9691/(55296*HarmonicSums`Private`ExpVar^8) - 35153/(120960*HarmonicSums`Private`ExpVar^7) + 8663/(34560*HarmonicSums`Private`ExpVar^6) - 13243/(86400*HarmonicSums`Private`ExpVar^5) + 157/(2304*HarmonicSums`Private`ExpVar^4) - 1/(54*HarmonicSums`Private`ExpVar^3) + s6/2 + ln2^4*(-(720*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(1008*HarmonicSums`Private`ExpVar^7) - 1/(720*HarmonicSums`Private`ExpVar^5) + 1/(144*HarmonicSums`Private`ExpVar^3) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar) - (5*z2)/24) + (1/(100*HarmonicSums`Private`ExpVar^9) - 1/(140*HarmonicSums`Private`ExpVar^7) + 1/(100*HarmonicSums`Private`ExpVar^5) - 1/(20*HarmonicSums`Private`ExpVar^3) + 3/(20*HarmonicSums`Private`ExpVar^2) - 3/(10*HarmonicSums`Private`ExpVar))*z2^2 + (509*z2^3)/840 + ln2^2*(li4half + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2) + sinf^2*(-li4half - ln2^4/24 + (ln2^2*z2)/4 + (3*z2^2)/10) + (7*ln2^3*z3)/12 - (41*z3^2)/64 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-1211/(128*HarmonicSums`Private`ExpVar^10) + 807/(64*HarmonicSums`Private`ExpVar^9) - 25/(64*HarmonicSums`Private`ExpVar^8) - 57/(32*HarmonicSums`Private`ExpVar^7) + 3/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5)) - (5*z2*z3)/8) + sinf*(-2*li5half + ln2^5/60 - (ln2^3*z2)/6 - (17*ln2*z2^2)/20 + (7*ln2^2*z3)/8 + (7*z2*z3)/8 + (15*z5)/32), S[1, 1, -3, 1, HarmonicSums`Private`ExpVar] :> 6*li6half + ln2^6/12 + (-1)^HarmonicSums`Private`ExpVar* (-4407/(256*HarmonicSums`Private`ExpVar^10) + 1237/(128*HarmonicSums`Private`ExpVar^9) + 27/(64*HarmonicSums`Private`ExpVar^8) - 15/(16*HarmonicSums`Private`ExpVar^7) + 3/(16*HarmonicSums`Private`ExpVar^6)) + li4half*(1/(30*HarmonicSums`Private`ExpVar^9) - 1/(42*HarmonicSums`Private`ExpVar^7) + 1/(30*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + (3*s6)/2 + ln2^4*(1/(720*HarmonicSums`Private`ExpVar^9) - 1/(1008*HarmonicSums`Private`ExpVar^7) + 1/(720*HarmonicSums`Private`ExpVar^5) - 1/(144*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar) - (3*z2)/8) + (-11/(600*HarmonicSums`Private`ExpVar^9) + 11/(840*HarmonicSums`Private`ExpVar^7) - 11/(600*HarmonicSums`Private`ExpVar^5) + 11/(120*HarmonicSums`Private`ExpVar^3) - 11/(40*HarmonicSums`Private`ExpVar^2) + 11/(20*HarmonicSums`Private`ExpVar))*z2^2 - (227*z2^3)/168 + ln2^2*(3*li4half + (-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2) + (7*ln2^3*z3)/8 - (9*z3^2)/64 + sinf^2*(li4half + ln2^4/24 - (ln2^2*z2)/4 - (11*z2^2)/20 + (7*ln2*z3)/8) + ln2*(6*li5half + (7/(240*HarmonicSums`Private`ExpVar^9) - 1/(48*HarmonicSums`Private`ExpVar^7) + 7/(240*HarmonicSums`Private`ExpVar^5) - 7/(48*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2) - 7/(8*HarmonicSums`Private`ExpVar))*z3 - (93*z5)/32) + sinf*(4*li5half + 4*li4half*ln2 + (2*ln2^5)/15 + (-1)^HarmonicSums`Private`ExpVar* (1211/(128*HarmonicSums`Private`ExpVar^10) - 807/(64*HarmonicSums`Private`ExpVar^9) + 25/(64*HarmonicSums`Private`ExpVar^8) + 57/(32*HarmonicSums`Private`ExpVar^7) - 3/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5)) - (2*ln2^3*z2)/3 + (7*ln2^2*z3)/4 - (7*z2*z3)/8 - (39*z5)/16), S[1, 1, 3, -1, HarmonicSums`Private`ExpVar] :> 4*li6half - ln2^6/90 + (-1)^HarmonicSums`Private`ExpVar* (-3353/(256*HarmonicSums`Private`ExpVar^10) - 91/(128*HarmonicSums`Private`ExpVar^9) + 105/(64*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^6)) + s6/4 + (ln2^4*z2)/12 + (1/(480*HarmonicSums`Private`ExpVar^9) - 1/(672*HarmonicSums`Private`ExpVar^7) + 1/(480*HarmonicSums`Private`ExpVar^5) - 1/(96*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z2^2 - (1271*z2^3)/1680 - (7*ln2^3*z3)/24 - (7*z3^2)/32 + sinf^2*(z2^2/16 - (7*ln2*z3)/8) + sinf*(2*li5half - ln2^5/60 + (ln2^3*z2)/6 + (17*ln2*z2^2)/20 - (7*ln2^2*z3)/8 - (125*z5)/64) + ln2*(2*li5half + 421/(2250*HarmonicSums`Private`ExpVar^10) + 937/(6480*HarmonicSums`Private`ExpVar^9) - 517/(3456*HarmonicSums`Private`ExpVar^8) - 167/(2016*HarmonicSums`Private`ExpVar^7) + 545/(1728*HarmonicSums`Private`ExpVar^6) - 599/(1440*HarmonicSums`Private`ExpVar^5) + 73/(192*HarmonicSums`Private`ExpVar^4) - 19/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + (-7/(240*HarmonicSums`Private`ExpVar^9) + 1/(48*HarmonicSums`Private`ExpVar^7) - 7/(240*HarmonicSums`Private`ExpVar^5) + 7/(48*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2) + 7/(8*HarmonicSums`Private`ExpVar))*z3 + (5*z2*z3)/8 - (93*z5)/64), S[1, 1, 3, 1, HarmonicSums`Private`ExpVar] :> 440399/(25920000*HarmonicSums`Private`ExpVar^10) + 5991469/(32659200*HarmonicSums`Private`ExpVar^9) - 7001/(193536*HarmonicSums`Private`ExpVar^8) - 85579/(846720*HarmonicSums`Private`ExpVar^7) + 2017/(34560*HarmonicSums`Private`ExpVar^6) + 8623/(86400*HarmonicSums`Private`ExpVar^5) - 553/(2304*HarmonicSums`Private`ExpVar^4) + 119/(432*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))* z2^2 + (sinf^2*z2^2)/4 + (53*z2^3)/84 - z3^2 + sinf*(-421/(2250*HarmonicSums`Private`ExpVar^10) - 937/(6480*HarmonicSums`Private`ExpVar^9) + 517/(3456*HarmonicSums`Private`ExpVar^8) + 167/(2016*HarmonicSums`Private`ExpVar^7) - 545/(1728*HarmonicSums`Private`ExpVar^6) + 599/(1440*HarmonicSums`Private`ExpVar^5) - 73/(192*HarmonicSums`Private`ExpVar^4) + 19/(72*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) - z5/2), S[1, 1, -2, -2, HarmonicSums`Private`ExpVar] :> -53753/(103680*HarmonicSums`Private`ExpVar^10) + 562733/(3265920*HarmonicSums`Private`ExpVar^9) + 7793/(32256*HarmonicSums`Private`ExpVar^8) - 31715/(84672*HarmonicSums`Private`ExpVar^7) + 347/(1152*HarmonicSums`Private`ExpVar^6) - 1489/(8640*HarmonicSums`Private`ExpVar^5) + 83/(1152*HarmonicSums`Private`ExpVar^4) - 1/(54*HarmonicSums`Private`ExpVar^3) + (ln2^4*z2)/24 + (li4half + (-1)^HarmonicSums`Private`ExpVar* (-1383/(64*HarmonicSums`Private`ExpVar^10) - 37/(32*HarmonicSums`Private`ExpVar^9) + 337/(128*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^7) - 33/(64*HarmonicSums`Private`ExpVar^6) + 9/(32*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4)))*z2 - (ln2^2*z2^2)/4 + (13/(2400*HarmonicSums`Private`ExpVar^9) - 13/(3360*HarmonicSums`Private`ExpVar^7) + 13/(2400*HarmonicSums`Private`ExpVar^5) - 13/(480*HarmonicSums`Private`ExpVar^3) + 13/(160*HarmonicSums`Private`ExpVar^2) - 13/(80*HarmonicSums`Private`ExpVar))*z2^2 + (13*sinf^2*z2^2)/80 - (157*z2^3)/1680 + (7*ln2*z2*z3)/8 - (51*z3^2)/128 + sinf*((-5*z2*z3)/8 + (41*z5)/32), S[1, 1, -2, 2, HarmonicSums`Private`ExpVar] :> -4*li6half - ln2^6/18 + (-1)^HarmonicSums`Private`ExpVar* (-42961/(1920*HarmonicSums`Private`ExpVar^10) + 11719/(960*HarmonicSums`Private`ExpVar^9) + 37/(32*HarmonicSums`Private`ExpVar^8) - 109/(48*HarmonicSums`Private`ExpVar^7) + 13/(16*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5)) + li4half*(-(15*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(21*HarmonicSums`Private`ExpVar^7) - 1/(15*HarmonicSums`Private`ExpVar^5) + 1/(3*HarmonicSums`Private`ExpVar^3) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) - s6 + ln2^4*(-(360*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(504*HarmonicSums`Private`ExpVar^7) - 1/(360*HarmonicSums`Private`ExpVar^5) + 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar) + (7*z2)/48) + ((-5*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (1383/(32*HarmonicSums`Private`ExpVar^10) + 37/(16*HarmonicSums`Private`ExpVar^9) - 337/(64*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) + 33/(32*HarmonicSums`Private`ExpVar^6) - 9/(16*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)))*z2 + (17/(800*HarmonicSums`Private`ExpVar^9) - 17/(1120*HarmonicSums`Private`ExpVar^7) + 17/(800*HarmonicSums`Private`ExpVar^5) - 17/(160*HarmonicSums`Private`ExpVar^3) + 51/(160*HarmonicSums`Private`ExpVar^2) - 51/(80*HarmonicSums`Private`ExpVar))*z2^2 + (1153*z2^3)/840 + ln2^2*(-2*li4half + (1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2 + (5*z2^2)/8) - (7*ln2^3*z3)/12 + (109*z3^2)/128 + sinf^2*(-2*li4half - ln2^4/12 + (ln2^2*z2)/2 + (51*z2^2)/80 - (7*ln2*z3)/4) + ln2*(-4*li5half + (-7/(120*HarmonicSums`Private`ExpVar^9) + 1/(24*HarmonicSums`Private`ExpVar^7) - 7/(120*HarmonicSums`Private`ExpVar^5) + 7/(24*HarmonicSums`Private`ExpVar^3) - 7/(8*HarmonicSums`Private`ExpVar^2) + 7/(4*HarmonicSums`Private`ExpVar))*z3 - (35*z2*z3)/16 + (31*z5)/16) + sinf*(-4*li5half - 4*li4half*ln2 - (2*ln2^5)/15 + (2*ln2^3*z2)/3 - (7*ln2^2*z3)/4 + (5*z2*z3)/16 + (103*z5)/32), S[1, 1, 2, -2, HarmonicSums`Private`ExpVar] :> 4*li6half + ln2^6/18 + (-1)^HarmonicSums`Private`ExpVar* (-883/(64*HarmonicSums`Private`ExpVar^10) - 13/(8*HarmonicSums`Private`ExpVar^9) + 123/(64*HarmonicSums`Private`ExpVar^8) - 17/(32*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^6)) + li4half*(1/(15*HarmonicSums`Private`ExpVar^9) - 1/(21*HarmonicSums`Private`ExpVar^7) + 1/(15*HarmonicSums`Private`ExpVar^5) - 1/(3*HarmonicSums`Private`ExpVar^3) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) - (9*s6)/4 + ln2^4*(1/(360*HarmonicSums`Private`ExpVar^9) - 1/(504*HarmonicSums`Private`ExpVar^7) + 1/(360*HarmonicSums`Private`ExpVar^5) - 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar) - z2/6) + (2*li4half - 1331/(33600*HarmonicSums`Private`ExpVar^10) + 659921/(15876000*HarmonicSums`Private`ExpVar^9) + 1207/(70560*HarmonicSums`Private`ExpVar^8) - 291703/(7408800*HarmonicSums`Private`ExpVar^7) - 161/(14400*HarmonicSums`Private`ExpVar^6) + 12493/(108000*HarmonicSums`Private`ExpVar^5) - 137/(576*HarmonicSums`Private`ExpVar^4) + 151/(432*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 + (-17/(480*HarmonicSums`Private`ExpVar^9) + 17/(672*HarmonicSums`Private`ExpVar^7) - 17/(480*HarmonicSums`Private`ExpVar^5) + 17/(96*HarmonicSums`Private`ExpVar^3) - 17/(32*HarmonicSums`Private`ExpVar^2) + 17/(16*HarmonicSums`Private`ExpVar))*z2^2 - (4393*z2^3)/1680 + ln2^2*(2*li4half + (-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 - z2^2/2) + (7*ln2^3*z3)/12 + (23*z3^2)/32 + sinf^2*(2*li4half + ln2^4/12 - (ln2^2*z2)/2 - (17*z2^2)/16 + (7*ln2*z3)/4) + sinf*(4*li5half + 4*li4half*ln2 + (2*ln2^5)/15 - (2*ln2^3*z2)/3 + (7*ln2^2*z3)/4 - z2*z3 - (73*z5)/64) + ln2*(4*li5half + (7/(120*HarmonicSums`Private`ExpVar^9) - 1/(24*HarmonicSums`Private`ExpVar^7) + 7/(120*HarmonicSums`Private`ExpVar^5) - 7/(24*HarmonicSums`Private`ExpVar^3) + 7/(8*HarmonicSums`Private`ExpVar^2) - 7/(4*HarmonicSums`Private`ExpVar))*z3 + (7*z2*z3)/4 + (279*z5)/64), S[1, 1, 2, 2, HarmonicSums`Private`ExpVar] :> -5826931/(90720000*HarmonicSums`Private`ExpVar^10) + 3989329/(16329600*HarmonicSums`Private`ExpVar^9) - 197/(207360*HarmonicSums`Private`ExpVar^8) - 145751/(423360*HarmonicSums`Private`ExpVar^7) + 28463/(51840*HarmonicSums`Private`ExpVar^6) - 24317/(43200*HarmonicSums`Private`ExpVar^5) + 515/(1152*HarmonicSums`Private`ExpVar^4) - 61/(216*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + (1331/(16800*HarmonicSums`Private`ExpVar^10) - 659921/(7938000*HarmonicSums`Private`ExpVar^9) - 1207/(35280*HarmonicSums`Private`ExpVar^8) + 291703/(3704400*HarmonicSums`Private`ExpVar^7) + 161/(7200*HarmonicSums`Private`ExpVar^6) - 12493/(54000*HarmonicSums`Private`ExpVar^5) + 137/(288*HarmonicSums`Private`ExpVar^4) - 151/(216*HarmonicSums`Private`ExpVar^3) + 7/(8*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1))* z2 + (7/(600*HarmonicSums`Private`ExpVar^9) - 1/(120*HarmonicSums`Private`ExpVar^7) + 7/(600*HarmonicSums`Private`ExpVar^5) - 7/(120*HarmonicSums`Private`ExpVar^3) + 7/(40*HarmonicSums`Private`ExpVar^2) - 7/(20*HarmonicSums`Private`ExpVar))*z2^2 + (7*sinf^2*z2^2)/20 + (443*z2^3)/420 - z3^2 + sinf*(2*z2*z3 - (11*z5)/2), S[1, 1, -1, -3, HarmonicSums`Private`ExpVar] :> 2*li6half + ln2^6/360 + li4half*(1/(30*HarmonicSums`Private`ExpVar^9) - 1/(42*HarmonicSums`Private`ExpVar^7) + 1/(30*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) - 3617593/(5184000*HarmonicSums`Private`ExpVar^10) + 10598489/(32659200*HarmonicSums`Private`ExpVar^9) + 49939/(193536*HarmonicSums`Private`ExpVar^8) - 376799/(846720*HarmonicSums`Private`ExpVar^7) + 12097/(34560*HarmonicSums`Private`ExpVar^6) - 16537/(86400*HarmonicSums`Private`ExpVar^5) + 175/(2304*HarmonicSums`Private`ExpVar^4) - 1/(54*HarmonicSums`Private`ExpVar^3) - 2*s6 + ln2^4*(1/(720*HarmonicSums`Private`ExpVar^9) - 1/(1008*HarmonicSums`Private`ExpVar^7) + 1/(720*HarmonicSums`Private`ExpVar^5) - 1/(144*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar) - z2/8) - 2*li4half*z2 + (-(300*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(420*HarmonicSums`Private`ExpVar^7) - 1/(300*HarmonicSums`Private`ExpVar^5) + 1/(60*HarmonicSums`Private`ExpVar^3) - 1/(20*HarmonicSums`Private`ExpVar^2) + 1/(10*HarmonicSums`Private`ExpVar))*z2^2 + (93*z2^3)/140 + ln2^2*((-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (9*z2^2)/20) + (ln2^3*z3)/8 + (-1)^HarmonicSums`Private`ExpVar* (3105/(1024*HarmonicSums`Private`ExpVar^10) - 3969/(512*HarmonicSums`Private`ExpVar^9) + 21/(256*HarmonicSums`Private`ExpVar^8) + 315/(256*HarmonicSums`Private`ExpVar^7) - 45/(256*HarmonicSums`Private`ExpVar^6) - 45/(128*HarmonicSums`Private`ExpVar^5) + 9/(32*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^3))*z3 - z3^2/2 + sinf^2*(li4half + ln2^4/24 - (ln2^2*z2)/4 - z2^2/10 + (3*ln2*z3)/8) + ln2*((1/(80*HarmonicSums`Private`ExpVar^9) - 1/(112*HarmonicSums`Private`ExpVar^7) + 1/(80*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*z3 + (3*z2*z3)/8) + sinf*(-2*li5half + ln2^5/60 - (ln2^3*z2)/6 - (ln2*z2^2)/10 + (3*ln2^2*z3)/8 + (13*z2*z3)/8 - (15*z5)/8), S[1, 1, -1, 3, HarmonicSums`Private`ExpVar] :> -(ln2^6/40) + (-1)^HarmonicSums`Private`ExpVar* (-1137/(64*HarmonicSums`Private`ExpVar^10) + 1073/(192*HarmonicSums`Private`ExpVar^9) + 185/(128*HarmonicSums`Private`ExpVar^8) - 89/(64*HarmonicSums`Private`ExpVar^7) + 7/(16*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5)) - (3*s6)/2 + (3*li4half*z2)/2 + (7*ln2^4*z2)/48 + (-19/(2400*HarmonicSums`Private`ExpVar^9) + 19/(3360*HarmonicSums`Private`ExpVar^7) - 19/(2400*HarmonicSums`Private`ExpVar^5) + 19/(480*HarmonicSums`Private`ExpVar^3) - 19/(160*HarmonicSums`Private`ExpVar^2) + 19/(80*HarmonicSums`Private`ExpVar))*z2^2 - (691*z2^3)/560 + ln2^2*(-li4half - (79*z2^2)/80) + (ln2^3*z3)/8 + (-1)^HarmonicSums`Private`ExpVar* (-1035/(256*HarmonicSums`Private`ExpVar^10) + 1323/(128*HarmonicSums`Private`ExpVar^9) - 7/(64*HarmonicSums`Private`ExpVar^8) - 105/(64*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 15/(32*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*z3 + (101*z3^2)/128 + sinf^2*((-19*z2^2)/80 + (3*ln2*z3)/8) + sinf*(-4*li5half - ln2^5/20 + (ln2^3*z2)/6 + ln2*(-2*li4half - (49*z2^2)/40) + (3*ln2^2*z3)/8 - (13*z2*z3)/16 + (47*z5)/8) + ln2*(-2*li5half + (1/(80*HarmonicSums`Private`ExpVar^9) - 1/(112*HarmonicSums`Private`ExpVar^7) + 1/(80*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*z3 + (3*z2*z3)/8 + (31*z5)/4), S[1, 1, 1, -3, HarmonicSums`Private`ExpVar] :> -2*li6half - ln2^6/36 + (-1)^HarmonicSums`Private`ExpVar* (-3855/(256*HarmonicSums`Private`ExpVar^10) - 319/(128*HarmonicSums`Private`ExpVar^9) + 141/(64*HarmonicSums`Private`ExpVar^8) - 9/(16*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^6)) + li4half*(-(30*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(42*HarmonicSums`Private`ExpVar^7) - 1/(30*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) + s6/2 + ln2^4*(-(720*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(1008*HarmonicSums`Private`ExpVar^7) - 1/(720*HarmonicSums`Private`ExpVar^5) + 1/(144*HarmonicSums`Private`ExpVar^3) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar) + z2/12) - li4half*z2 + (1/(80*HarmonicSums`Private`ExpVar^9) - 1/(112*HarmonicSums`Private`ExpVar^7) + 1/(80*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*z2^2 + (257*z2^3)/280 + ln2^2*(-li4half + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + z2^2/4) - (7*ln2^3*z3)/24 + (-3/(80*HarmonicSums`Private`ExpVar^10) + 1/(48*HarmonicSums`Private`ExpVar^8) - 1/(48*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z3 - (sinf^3*z3)/8 - (3*z3^2)/8 + sinf^2*(-li4half - ln2^4/24 + (ln2^2*z2)/4 + (3*z2^2)/8 - (7*ln2*z3)/8) + ln2*(-2*li5half + (-7/(240*HarmonicSums`Private`ExpVar^9) + 1/(48*HarmonicSums`Private`ExpVar^7) - 7/(240*HarmonicSums`Private`ExpVar^5) + 7/(48*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2) + 7/(8*HarmonicSums`Private`ExpVar))*z3 - (7*z2*z3)/8 - (31*z5)/32) + sinf*(-2*li5half - 2*li4half*ln2 - ln2^5/15 + (ln2^3*z2)/3 - (7*ln2^2*z3)/8 + (-(80*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(112*HarmonicSums`Private`ExpVar^7) - 1/(80*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 3/(8*HarmonicSums`Private`ExpVar))*z3 + (z2*z3)/8 + (33*z5)/32), S[1, 1, 1, 3, HarmonicSums`Private`ExpVar] :> -5578133/(25920000*HarmonicSums`Private`ExpVar^10) + 5588561/(32659200*HarmonicSums`Private`ExpVar^9) + 61673/(580608*HarmonicSums`Private`ExpVar^8) - 31379/(94080*HarmonicSums`Private`ExpVar^7) + 42359/(103680*HarmonicSums`Private`ExpVar^6) - 31213/(86400*HarmonicSums`Private`ExpVar^5) + 595/(2304*HarmonicSums`Private`ExpVar^4) - 65/(432*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) + (-(600*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(840*HarmonicSums`Private`ExpVar^7) - 1/(600*HarmonicSums`Private`ExpVar^5) + 1/(120*HarmonicSums`Private`ExpVar^3) - 1/(40*HarmonicSums`Private`ExpVar^2) + 1/(20*HarmonicSums`Private`ExpVar))*z2^2 - (sinf^2*z2^2)/20 - (31*z2^3)/140 + (1/(20*HarmonicSums`Private`ExpVar^10) - 1/(36*HarmonicSums`Private`ExpVar^8) + 1/(36*HarmonicSums`Private`ExpVar^6) - 1/(12*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(6*HarmonicSums`Private`ExpVar^2))*z3 + (sinf^3*z3)/6 + (5*z3^2)/6 + sinf*((1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z3 - (z2*z3)/2 + 2*z5), S[-2, -1, -1, -1, -1, HarmonicSums`Private`ExpVar] :> -16*li6half + ln2^6/360 + (-1)^HarmonicSums`Private`ExpVar* (5543941/(1290240*HarmonicSums`Private`ExpVar^10) + 21881/(23040*HarmonicSums`Private`ExpVar^9) - 13301/(23040*HarmonicSums`Private`ExpVar^8) - 323/(768*HarmonicSums`Private`ExpVar^7) + 135/(256*HarmonicSums`Private`ExpVar^6) - 25/(96*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)) - 4*s6 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (17/(48*HarmonicSums`Private`ExpVar^9) - 1/(16*HarmonicSums`Private`ExpVar^7) + 1/(48*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2)) - (5*z2)/12) + (-1)^HarmonicSums`Private`ExpVar* (-102037/(17920*HarmonicSums`Private`ExpVar^10) - 3385/(1344*HarmonicSums`Private`ExpVar^9) + 499/(640*HarmonicSums`Private`ExpVar^8) + 893/(1920*HarmonicSums`Private`ExpVar^7) - 67/(384*HarmonicSums`Private`ExpVar^6) - 23/(96*HarmonicSums`Private`ExpVar^5) + 9/(32*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar*(153/(80*HarmonicSums`Private`ExpVar^9) - 27/(80*HarmonicSums`Private`ExpVar^7) + 9/(80*HarmonicSums`Private`ExpVar^5) - 9/(80*HarmonicSums`Private`ExpVar^3) + 9/(80*HarmonicSums`Private`ExpVar^2))*z2^2 + (20*z2^3)/7 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-102037/(17920*HarmonicSums`Private`ExpVar^10) - 3385/(1344*HarmonicSums`Private`ExpVar^9) + 499/(640*HarmonicSums`Private`ExpVar^8) + 893/(1920*HarmonicSums`Private`ExpVar^7) - 67/(384*HarmonicSums`Private`ExpVar^6) - 23/(96*HarmonicSums`Private`ExpVar^5) + 9/(32*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*(17/(8*HarmonicSums`Private`ExpVar^9) - 3/(8*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (11*z2^2)/8) + ln2^3*(-97/(960*HarmonicSums`Private`ExpVar^10) - 13/(480*HarmonicSums`Private`ExpVar^9) + 1/(36*HarmonicSums`Private`ExpVar^8) + 23/(2016*HarmonicSums`Private`ExpVar^7) - 5/(288*HarmonicSums`Private`ExpVar^6) - 7/(720*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(18*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2) - (7*z3)/16) + (-97/(640*HarmonicSums`Private`ExpVar^10) - 13/(320*HarmonicSums`Private`ExpVar^9) + 1/(24*HarmonicSums`Private`ExpVar^8) + 23/(1344*HarmonicSums`Private`ExpVar^7) - 5/(192*HarmonicSums`Private`ExpVar^6) - 7/(480*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z3 + (41*z3^2)/32 + ln2*(-3*li5half + 53041/(44800*HarmonicSums`Private`ExpVar^10) + 8935/(48384*HarmonicSums`Private`ExpVar^9) - 8423/(23040*HarmonicSums`Private`ExpVar^8) - 159/(2240*HarmonicSums`Private`ExpVar^7) + 427/(1152*HarmonicSums`Private`ExpVar^6) - 91/(240*HarmonicSums`Private`ExpVar^5) + 15/(64*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + z2*(-97/(320*HarmonicSums`Private`ExpVar^10) - 13/(160*HarmonicSums`Private`ExpVar^9) + 1/(12*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) - 5/(96*HarmonicSums`Private`ExpVar^6) - 7/(240*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - (33*z3)/16) + (-1)^HarmonicSums`Private`ExpVar*(17/(8*HarmonicSums`Private`ExpVar^9) - 3/(8*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z3 - (93*z5)/64), S[-2, -1, -1, -1, 1, HarmonicSums`Private`ExpVar] :> -9*li6half - ln2^6/80 + 341290879/(677376000*HarmonicSums`Private`ExpVar^ 10) + 2310491/(3048192*HarmonicSums`Private`ExpVar^9) - 630347/(6451200*HarmonicSums`Private`ExpVar^8) - 811877/(2822400*HarmonicSums`Private`ExpVar^7) + 929/(7680*HarmonicSums`Private`ExpVar^6) + 3799/(28800*HarmonicSums`Private`ExpVar^5) - 155/(768*HarmonicSums`Private`ExpVar^4) + 1/(9*HarmonicSums`Private`ExpVar^3) - (7*s6)/4 + (-53041/(44800*HarmonicSums`Private`ExpVar^10) - 8935/(48384*HarmonicSums`Private`ExpVar^9) + 8423/(23040*HarmonicSums`Private`ExpVar^8) + 159/(2240*HarmonicSums`Private`ExpVar^7) - 427/(1152*HarmonicSums`Private`ExpVar^6) + 91/(240*HarmonicSums`Private`ExpVar^5) - 15/(64*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3))*sinf + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (17/(48*HarmonicSums`Private`ExpVar^9) - 1/(16*HarmonicSums`Private`ExpVar^7) + 1/(48*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2)) - z2/4) + (-1)^HarmonicSums`Private`ExpVar* (102037/(17920*HarmonicSums`Private`ExpVar^10) + 3385/(1344*HarmonicSums`Private`ExpVar^9) - 499/(640*HarmonicSums`Private`ExpVar^8) - 893/(1920*HarmonicSums`Private`ExpVar^7) + 67/(384*HarmonicSums`Private`ExpVar^6) + 23/(96*HarmonicSums`Private`ExpVar^5) - 9/(32*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-323/(80*HarmonicSums`Private`ExpVar^9) + 57/(80*HarmonicSums`Private`ExpVar^7) - 19/(80*HarmonicSums`Private`ExpVar^5) + 19/(80*HarmonicSums`Private`ExpVar^3) - 19/(80*HarmonicSums`Private`ExpVar^2))*z2^2 + (447*z2^3)/560 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-102037/(17920*HarmonicSums`Private`ExpVar^10) - 3385/(1344*HarmonicSums`Private`ExpVar^9) + 499/(640*HarmonicSums`Private`ExpVar^8) + 893/(1920*HarmonicSums`Private`ExpVar^7) - 67/(384*HarmonicSums`Private`ExpVar^6) - 23/(96*HarmonicSums`Private`ExpVar^5) + 9/(32*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*(17/(8*HarmonicSums`Private`ExpVar^9) - 3/(8*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (93*z2^2)/80) + ln2^3*(-97/(960*HarmonicSums`Private`ExpVar^10) - 13/(480*HarmonicSums`Private`ExpVar^9) + 1/(36*HarmonicSums`Private`ExpVar^8) + 23/(2016*HarmonicSums`Private`ExpVar^7) - 5/(288*HarmonicSums`Private`ExpVar^6) - 7/(720*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(18*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2) - (7*z3)/16) + (679/(640*HarmonicSums`Private`ExpVar^10) + 91/(320*HarmonicSums`Private`ExpVar^9) - 7/(24*HarmonicSums`Private`ExpVar^8) - 23/(192*HarmonicSums`Private`ExpVar^7) + 35/(192*HarmonicSums`Private`ExpVar^6) + 49/(480*HarmonicSums`Private`ExpVar^5) - 7/(16*HarmonicSums`Private`ExpVar^4) + 7/(12*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2))*z3 + (105*z3^2)/32 + ln2*(z2*(-97/(320*HarmonicSums`Private`ExpVar^10) - 13/(160*HarmonicSums`Private`ExpVar^9) + 1/(12*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) - 5/(96*HarmonicSums`Private`ExpVar^6) - 7/(240*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - (27*z3)/16) + (-1)^HarmonicSums`Private`ExpVar*(17/(8*HarmonicSums`Private`ExpVar^9) - 3/(8*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z3), S[-2, -1, -1, 1, -1, HarmonicSums`Private`ExpVar] :> -15*li6half + ln2^6/24 + (-1)^HarmonicSums`Private`ExpVar*li4half* (51/(2*HarmonicSums`Private`ExpVar^9) - 9/(2*HarmonicSums`Private`ExpVar^7) + 3/(2*HarmonicSums`Private`ExpVar^5) - 3/(2*HarmonicSums`Private`ExpVar^3) + 3/(2*HarmonicSums`Private`ExpVar^2)) - 9927/(10240*HarmonicSums`Private`ExpVar^10) + 18691/(69120*HarmonicSums`Private`ExpVar^9) + 77/(256*HarmonicSums`Private`ExpVar^8) - 157/(448*HarmonicSums`Private`ExpVar^7) + 155/(768*HarmonicSums`Private`ExpVar^6) - 3/(40*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - (15*s6)/2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (102037/(8960*HarmonicSums`Private`ExpVar^10) + 3385/(672*HarmonicSums`Private`ExpVar^9) - 499/(320*HarmonicSums`Private`ExpVar^8) - 893/(960*HarmonicSums`Private`ExpVar^7) + 67/(192*HarmonicSums`Private`ExpVar^6) + 23/(48*HarmonicSums`Private`ExpVar^5) - 9/(16*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3))*sinf + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (17/(12*HarmonicSums`Private`ExpVar^9) - 1/(4*HarmonicSums`Private`ExpVar^7) + 1/(12*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2)) - (3*z2)/8) - 3*li4half*z2 + (-1)^HarmonicSums`Private`ExpVar*(-51/(5*HarmonicSums`Private`ExpVar^9) + 9/(5*HarmonicSums`Private`ExpVar^7) - 3/(5*HarmonicSums`Private`ExpVar^5) + 3/(5*HarmonicSums`Private`ExpVar^3) - 3/(5*HarmonicSums`Private`ExpVar^2))*z2^2 + (1501*z2^3)/560 + ln2^2*((3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (102037/(17920*HarmonicSums`Private`ExpVar^10) + 3385/(1344*HarmonicSums`Private`ExpVar^9) - 499/(640*HarmonicSums`Private`ExpVar^8) - 893/(1920*HarmonicSums`Private`ExpVar^7) + 67/(384*HarmonicSums`Private`ExpVar^6) + 23/(96*HarmonicSums`Private`ExpVar^5) - 9/(32*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-17/(4*HarmonicSums`Private`ExpVar^9) + 3/(4*HarmonicSums`Private`ExpVar^7) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (279*z2^2)/80) + ln2^3*(-97/(960*HarmonicSums`Private`ExpVar^10) - 13/(480*HarmonicSums`Private`ExpVar^9) + 1/(36*HarmonicSums`Private`ExpVar^8) + 23/(2016*HarmonicSums`Private`ExpVar^7) - 5/(288*HarmonicSums`Private`ExpVar^6) - 7/(720*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(18*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2) - (7*z3)/16) + (97/(1280*HarmonicSums`Private`ExpVar^10) + 13/(640*HarmonicSums`Private`ExpVar^9) - 1/(48*HarmonicSums`Private`ExpVar^8) - 23/(2688*HarmonicSums`Private`ExpVar^7) + 5/(384*HarmonicSums`Private`ExpVar^6) + 7/(960*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2))*z3 + (243*z3^2)/64 + ln2*((-1)^HarmonicSums`Private`ExpVar* (73659031/(7526400*HarmonicSums`Private`ExpVar^10) - 615131/(141120*HarmonicSums`Private`ExpVar^9) - 31433/(19200*HarmonicSums`Private`ExpVar^8) + 31289/(57600*HarmonicSums`Private`ExpVar^7) + 1189/(2304*HarmonicSums`Private`ExpVar^6) - 25/(144*HarmonicSums`Private`ExpVar^5) - 9/(32*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) + z2*(97/(320*HarmonicSums`Private`ExpVar^10) + 13/(160*HarmonicSums`Private`ExpVar^9) - 1/(12*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) + 5/(96*HarmonicSums`Private`ExpVar^6) + 7/(240*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) - (21*z3)/8) + (-1)^HarmonicSums`Private`ExpVar* (119/(16*HarmonicSums`Private`ExpVar^9) - 21/(16*HarmonicSums`Private`ExpVar^7) + 7/(16*HarmonicSums`Private`ExpVar^5) - 7/(16*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2))*z3), S[-2, -1, -1, 1, 1, HarmonicSums`Private`ExpVar] :> -18*li6half + (11*ln2^6)/240 + (-1)^HarmonicSums`Private`ExpVar* (4894468713/(702464000*HarmonicSums`Private`ExpVar^10) - 103271407/(118540800*HarmonicSums`Private`ExpVar^9) - 77231/(128000*HarmonicSums`Private`ExpVar^8) - 104743/(3456000*HarmonicSums`Private`ExpVar^7) + 7457/(27648*HarmonicSums`Private`ExpVar^6) - 301/(864*HarmonicSums`Private`ExpVar^5) + 25/(64*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(51/(2*HarmonicSums`Private`ExpVar^9) - 9/(2*HarmonicSums`Private`ExpVar^7) + 3/(2*HarmonicSums`Private`ExpVar^5) - 3/(2*HarmonicSums`Private`ExpVar^3) + 3/(2*HarmonicSums`Private`ExpVar^2)) - 7*s6 + (-1)^HarmonicSums`Private`ExpVar* (-73659031/(7526400*HarmonicSums`Private`ExpVar^10) + 615131/(141120*HarmonicSums`Private`ExpVar^9) + 31433/(19200*HarmonicSums`Private`ExpVar^8) - 31289/(57600*HarmonicSums`Private`ExpVar^7) - 1189/(2304*HarmonicSums`Private`ExpVar^6) + 25/(144*HarmonicSums`Private`ExpVar^5) + 9/(32*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3))*sinf + (-1)^HarmonicSums`Private`ExpVar* (-102037/(17920*HarmonicSums`Private`ExpVar^10) - 3385/(1344*HarmonicSums`Private`ExpVar^9) + 499/(640*HarmonicSums`Private`ExpVar^8) + 893/(1920*HarmonicSums`Private`ExpVar^7) - 67/(384*HarmonicSums`Private`ExpVar^6) - 23/(96*HarmonicSums`Private`ExpVar^5) + 9/(32*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3))*sinf^2 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (17/(12*HarmonicSums`Private`ExpVar^9) - 1/(4*HarmonicSums`Private`ExpVar^7) + 1/(12*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2)) - (19*z2)/48) + ((-3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (-102037/(17920*HarmonicSums`Private`ExpVar^10) - 3385/(1344*HarmonicSums`Private`ExpVar^9) + 499/(640*HarmonicSums`Private`ExpVar^8) + 893/(1920*HarmonicSums`Private`ExpVar^7) - 67/(384*HarmonicSums`Private`ExpVar^6) - 23/(96*HarmonicSums`Private`ExpVar^5) + 9/(32*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)))*z2 + (261*z2^3)/80 + ln2^2*((3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (-17/(4*HarmonicSums`Private`ExpVar^9) + 3/(4*HarmonicSums`Private`ExpVar^7) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (251*z2^2)/80) + ln2^3*(-97/(960*HarmonicSums`Private`ExpVar^10) - 13/(480*HarmonicSums`Private`ExpVar^9) + 1/(36*HarmonicSums`Private`ExpVar^8) + 23/(2016*HarmonicSums`Private`ExpVar^7) - 5/(288*HarmonicSums`Private`ExpVar^6) - 7/(720*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(18*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2) - (7*z3)/16) + (-679/(1280*HarmonicSums`Private`ExpVar^10) - 91/(640*HarmonicSums`Private`ExpVar^9) + 7/(48*HarmonicSums`Private`ExpVar^8) + 23/(384*HarmonicSums`Private`ExpVar^7) - 35/(384*HarmonicSums`Private`ExpVar^6) - 49/(960*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^4) - 7/(24*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2))*z3 + (147*z3^2)/64 + ln2*(-li5half + (97/(320*HarmonicSums`Private`ExpVar^10) + 13/(160*HarmonicSums`Private`ExpVar^9) - 1/(12*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) + 5/(96*HarmonicSums`Private`ExpVar^6) + 7/(240*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (119/(16*HarmonicSums`Private`ExpVar^9) - 21/(16*HarmonicSums`Private`ExpVar^7) + 7/(16*HarmonicSums`Private`ExpVar^5) - 7/(16*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2))*z3 - (465*z5)/64), S[-2, -1, 1, -1, -1, HarmonicSums`Private`ExpVar] :> -9*li6half + ln2^6/120 + ln2^3*(97/(480*HarmonicSums`Private`ExpVar^10) + 13/(240*HarmonicSums`Private`ExpVar^9) - 1/(18*HarmonicSums`Private`ExpVar^8) - 23/(1008*HarmonicSums`Private`ExpVar^7) + 5/(144*HarmonicSums`Private`ExpVar^6) + 7/(360*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^4) + 1/(9*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2)) + 17430167/(25088000*HarmonicSums`Private`ExpVar^10) + 24341167/(101606400*HarmonicSums`Private`ExpVar^9) - 224551/(1382400*HarmonicSums`Private`ExpVar^8) - 53707/(201600*HarmonicSums`Private`ExpVar^7) + 6589/(13824*HarmonicSums`Private`ExpVar^6) - 601/(1440*HarmonicSums`Private`ExpVar^5) + 31/(128*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) - (15*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (17/(48*HarmonicSums`Private`ExpVar^9) - 1/(16*HarmonicSums`Private`ExpVar^7) + 1/(48*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2)) + (13*z2)/48) + (li4half/2 - 8353/(19200*HarmonicSums`Private`ExpVar^10) - 195457/(604800*HarmonicSums`Private`ExpVar^9) + 719/(8064*HarmonicSums`Private`ExpVar^8) + 3877/(35280*HarmonicSums`Private`ExpVar^7) - 61/(1440*HarmonicSums`Private`ExpVar^6) - 137/(1800*HarmonicSums`Private`ExpVar^5) + 17/(192*HarmonicSums`Private`ExpVar^4) - 1/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar*(-17/(16*HarmonicSums`Private`ExpVar^9) + 3/(16*HarmonicSums`Private`ExpVar^7) - 1/(16*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2^2 + (143*z2^3)/140 + sinf*(ln2^2*(97/(320*HarmonicSums`Private`ExpVar^10) + 13/(160*HarmonicSums`Private`ExpVar^9) - 1/(12*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) + 5/(96*HarmonicSums`Private`ExpVar^6) + 7/(240*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (97/(320*HarmonicSums`Private`ExpVar^10) + 13/(160*HarmonicSums`Private`ExpVar^9) - 1/(12*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) + 5/(96*HarmonicSums`Private`ExpVar^6) + 7/(240*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2) + ln2^2*(li4half/2 - 8353/(19200*HarmonicSums`Private`ExpVar^10) - 195457/(604800*HarmonicSums`Private`ExpVar^9) + 719/(8064*HarmonicSums`Private`ExpVar^8) + 3877/(35280*HarmonicSums`Private`ExpVar^7) - 61/(1440*HarmonicSums`Private`ExpVar^6) - 137/(1800*HarmonicSums`Private`ExpVar^5) + 17/(192*HarmonicSums`Private`ExpVar^4) - 1/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-17/(8*HarmonicSums`Private`ExpVar^9) + 3/(8*HarmonicSums`Private`ExpVar^7) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (63*z2^2)/40) + (-679/(1280*HarmonicSums`Private`ExpVar^10) - 91/(640*HarmonicSums`Private`ExpVar^9) + 7/(48*HarmonicSums`Private`ExpVar^8) + 23/(384*HarmonicSums`Private`ExpVar^7) - 35/(384*HarmonicSums`Private`ExpVar^6) - 49/(960*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^4) - 7/(24*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2))*z3 + (45*z3^2)/32 + ln2*((-1)^HarmonicSums`Private`ExpVar* (17525/(3072*HarmonicSums`Private`ExpVar^10) + 325/(384*HarmonicSums`Private`ExpVar^9) - 349/(384*HarmonicSums`Private`ExpVar^8) - 27/(128*HarmonicSums`Private`ExpVar^7) + 59/(128*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)) + (97/(320*HarmonicSums`Private`ExpVar^10) + 13/(160*HarmonicSums`Private`ExpVar^9) - 1/(12*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) + 5/(96*HarmonicSums`Private`ExpVar^6) + 7/(240*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-17/(16*HarmonicSums`Private`ExpVar^9) + 3/(16*HarmonicSums`Private`ExpVar^7) - 1/(16*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z3), S[-2, -1, 1, -1, 1, HarmonicSums`Private`ExpVar] :> -(ln2^6/240) + (-1)^HarmonicSums`Private`ExpVar* (134965/(73728*HarmonicSums`Private`ExpVar^10) + 2971/(1152*HarmonicSums`Private`ExpVar^9) - 1075/(4608*HarmonicSums`Private`ExpVar^8) - 805/(1536*HarmonicSums`Private`ExpVar^7) + 319/(1536*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4)) + ln2^3*(97/(480*HarmonicSums`Private`ExpVar^10) + 13/(240*HarmonicSums`Private`ExpVar^9) - 1/(18*HarmonicSums`Private`ExpVar^8) - 23/(1008*HarmonicSums`Private`ExpVar^7) + 5/(144*HarmonicSums`Private`ExpVar^6) + 7/(360*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^4) + 1/(9*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2)) + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (17/(48*HarmonicSums`Private`ExpVar^9) - 1/(16*HarmonicSums`Private`ExpVar^7) + 1/(48*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2)) + (11*z2)/48) + (-(li4half/2) + 8353/(19200*HarmonicSums`Private`ExpVar^10) + 195457/(604800*HarmonicSums`Private`ExpVar^9) - 719/(8064*HarmonicSums`Private`ExpVar^8) - 3877/(35280*HarmonicSums`Private`ExpVar^7) + 61/(1440*HarmonicSums`Private`ExpVar^6) + 137/(1800*HarmonicSums`Private`ExpVar^5) - 17/(192*HarmonicSums`Private`ExpVar^4) + 1/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar*(51/(16*HarmonicSums`Private`ExpVar^9) - 9/(16*HarmonicSums`Private`ExpVar^7) + 3/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2))*z2^2 + (129*z2^3)/560 + sinf*((-1)^HarmonicSums`Private`ExpVar* (-17525/(3072*HarmonicSums`Private`ExpVar^10) - 325/(384*HarmonicSums`Private`ExpVar^9) + 349/(384*HarmonicSums`Private`ExpVar^8) + 27/(128*HarmonicSums`Private`ExpVar^7) - 59/(128*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4)) + ln2^2*(97/(320*HarmonicSums`Private`ExpVar^10) + 13/(160*HarmonicSums`Private`ExpVar^9) - 1/(12*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) + 5/(96*HarmonicSums`Private`ExpVar^6) + 7/(240*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (-97/(320*HarmonicSums`Private`ExpVar^10) - 13/(160*HarmonicSums`Private`ExpVar^9) + 1/(12*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) - 5/(96*HarmonicSums`Private`ExpVar^6) - 7/(240*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2) + ln2^2*(li4half/2 - 8353/(19200*HarmonicSums`Private`ExpVar^10) - 195457/(604800*HarmonicSums`Private`ExpVar^9) + 719/(8064*HarmonicSums`Private`ExpVar^8) + 3877/(35280*HarmonicSums`Private`ExpVar^7) - 61/(1440*HarmonicSums`Private`ExpVar^6) - 137/(1800*HarmonicSums`Private`ExpVar^5) + 17/(192*HarmonicSums`Private`ExpVar^4) - 1/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-17/(8*HarmonicSums`Private`ExpVar^9) + 3/(8*HarmonicSums`Private`ExpVar^7) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (13*z2^2)/16) + (97/(1280*HarmonicSums`Private`ExpVar^10) + 13/(640*HarmonicSums`Private`ExpVar^9) - 1/(48*HarmonicSums`Private`ExpVar^8) - 23/(2688*HarmonicSums`Private`ExpVar^7) + 5/(384*HarmonicSums`Private`ExpVar^6) + 7/(960*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2))*z3 + ln2*(3*li5half + z2*(-97/(320*HarmonicSums`Private`ExpVar^10) - 13/(160*HarmonicSums`Private`ExpVar^9) + 1/(12*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) - 5/(96*HarmonicSums`Private`ExpVar^6) - 7/(240*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + (3*z3)/16) + (-1)^HarmonicSums`Private`ExpVar* (-17/(16*HarmonicSums`Private`ExpVar^9) + 3/(16*HarmonicSums`Private`ExpVar^7) - 1/(16*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z3 - (93*z5)/16), S[-2, -1, 1, 1, -1, HarmonicSums`Private`ExpVar] :> 2*li6half - ln2^6/180 + (-1)^HarmonicSums`Private`ExpVar* (-2985/(1024*HarmonicSums`Private`ExpVar^10) + 353/(768*HarmonicSums`Private`ExpVar^9) + 143/(256*HarmonicSums`Private`ExpVar^8) - 19/(48*HarmonicSums`Private`ExpVar^7) + 25/(192*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^5)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-17/(2*HarmonicSums`Private`ExpVar^9) + 3/(2*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2)) + ln2^3*(-97/(960*HarmonicSums`Private`ExpVar^10) - 13/(480*HarmonicSums`Private`ExpVar^9) + 1/(36*HarmonicSums`Private`ExpVar^8) + 23/(2016*HarmonicSums`Private`ExpVar^7) - 5/(288*HarmonicSums`Private`ExpVar^6) - 7/(720*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(18*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) + (19*s6)/4 + (ln2^2*(-97/(320*HarmonicSums`Private`ExpVar^10) - 13/(160*HarmonicSums`Private`ExpVar^9) + 1/(12*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) - 5/(96*HarmonicSums`Private`ExpVar^6) - 7/(240*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) + ln2*(8353/(9600*HarmonicSums`Private`ExpVar^10) + 195457/(302400*HarmonicSums`Private`ExpVar^9) - 719/(4032*HarmonicSums`Private`ExpVar^8) - 3877/(17640*HarmonicSums`Private`ExpVar^7) + 61/(720*HarmonicSums`Private`ExpVar^6) + 137/(900*HarmonicSums`Private`ExpVar^5) - 17/(96*HarmonicSums`Private`ExpVar^4) + 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)))*sinf + ln2*(-97/(320*HarmonicSums`Private`ExpVar^10) - 13/(160*HarmonicSums`Private`ExpVar^9) + 1/(12*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) - 5/(96*HarmonicSums`Private`ExpVar^6) - 7/(240*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*sinf^2 - (ln2^4*z2)/12 + (-1)^HarmonicSums`Private`ExpVar*(17/(5*HarmonicSums`Private`ExpVar^9) - 3/(5*HarmonicSums`Private`ExpVar^7) + 1/(5*HarmonicSums`Private`ExpVar^5) - 1/(5*HarmonicSums`Private`ExpVar^3) + 1/(5*HarmonicSums`Private`ExpVar^2))*z2^2 + (18*z2^3)/35 + ln2^2*(8353/(19200*HarmonicSums`Private`ExpVar^10) + 195457/(604800*HarmonicSums`Private`ExpVar^9) - 719/(8064*HarmonicSums`Private`ExpVar^8) - 3877/(35280*HarmonicSums`Private`ExpVar^7) + 61/(1440*HarmonicSums`Private`ExpVar^6) + 137/(1800*HarmonicSums`Private`ExpVar^5) - 17/(192*HarmonicSums`Private`ExpVar^4) + 1/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - (21*z2^2)/16) - (107*z3^2)/64 + ln2*(li5half + 645341/(1512000*HarmonicSums`Private`ExpVar^10) - 36069767/(47628000*HarmonicSums`Private`ExpVar^9) - 302777/(1693440*HarmonicSums`Private`ExpVar^8) + 1473217/(7408800*HarmonicSums`Private`ExpVar^7) + 14999/(86400*HarmonicSums`Private`ExpVar^6) - 68699/(216000*HarmonicSums`Private`ExpVar^5) + 253/(1152*HarmonicSums`Private`ExpVar^4) - 43/(432*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) + z2*(-97/(320*HarmonicSums`Private`ExpVar^10) - 13/(160*HarmonicSums`Private`ExpVar^9) + 1/(12*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) - 5/(96*HarmonicSums`Private`ExpVar^6) - 7/(240*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - (21*z3)/16) - (155*z5)/32), S[-2, -1, 1, 1, 1, HarmonicSums`Private`ExpVar] :> -3*li6half - ln2^6/240 + (-1)^HarmonicSums`Private`ExpVar*li4half* (-17/(2*HarmonicSums`Private`ExpVar^9) + 3/(2*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2)) + 10032162731/(7620480000*HarmonicSums`Private`ExpVar^10) - 28614103139/(240045120000*HarmonicSums`Private`ExpVar^9) - 408655703/(1422489600*HarmonicSums`Private`ExpVar^8) - 575906671/(6223392000*HarmonicSums`Private`ExpVar^7) + 1471987/(5184000*HarmonicSums`Private`ExpVar^6) - 2195987/(12960000*HarmonicSums`Private`ExpVar^5) + 185/(13824*HarmonicSums`Private`ExpVar^4) + 113/(2592*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + (9*s6)/4 + (-8353/(19200*HarmonicSums`Private`ExpVar^10) - 195457/(604800*HarmonicSums`Private`ExpVar^9) + 719/(8064*HarmonicSums`Private`ExpVar^8) + 3877/(35280*HarmonicSums`Private`ExpVar^7) - 61/(1440*HarmonicSums`Private`ExpVar^6) - 137/(1800*HarmonicSums`Private`ExpVar^5) + 17/(192*HarmonicSums`Private`ExpVar^4) - 1/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*sinf^2 + (97/(960*HarmonicSums`Private`ExpVar^10) + 13/(480*HarmonicSums`Private`ExpVar^9) - 1/(36*HarmonicSums`Private`ExpVar^8) - 23/(2016*HarmonicSums`Private`ExpVar^7) + 5/(288*HarmonicSums`Private`ExpVar^6) + 7/(720*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(18*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2))*sinf^3 + (ln2^4*z2)/16 + ((3*li4half)/2 - 8353/(19200*HarmonicSums`Private`ExpVar^10) - 195457/(604800*HarmonicSums`Private`ExpVar^9) + 719/(8064*HarmonicSums`Private`ExpVar^8) + 3877/(35280*HarmonicSums`Private`ExpVar^7) - 61/(1440*HarmonicSums`Private`ExpVar^6) - 137/(1800*HarmonicSums`Private`ExpVar^5) + 17/(192*HarmonicSums`Private`ExpVar^4) - 1/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 - (39*ln2^2*z2^2)/80 - (2*z2^3)/35 + sinf*(-645341/(1512000*HarmonicSums`Private`ExpVar^10) + 36069767/(47628000*HarmonicSums`Private`ExpVar^9) + 302777/(1693440*HarmonicSums`Private`ExpVar^8) - 1473217/(7408800*HarmonicSums`Private`ExpVar^7) - 14999/(86400*HarmonicSums`Private`ExpVar^6) + 68699/(216000*HarmonicSums`Private`ExpVar^5) - 253/(1152*HarmonicSums`Private`ExpVar^4) + 43/(432*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (97/(320*HarmonicSums`Private`ExpVar^10) + 13/(160*HarmonicSums`Private`ExpVar^9) - 1/(12*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) + 5/(96*HarmonicSums`Private`ExpVar^6) + 7/(240*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2) + (97/(480*HarmonicSums`Private`ExpVar^10) + 13/(240*HarmonicSums`Private`ExpVar^9) - 1/(18*HarmonicSums`Private`ExpVar^8) - 23/(1008*HarmonicSums`Private`ExpVar^7) + 5/(144*HarmonicSums`Private`ExpVar^6) + 7/(360*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^4) + 1/(9*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2))*z3 + z3^2/32, S[-2, 1, -1, -1, -1, HarmonicSums`Private`ExpVar] :> 12*li6half - (11*ln2^6)/240 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (-119/(48*HarmonicSums`Private`ExpVar^10) + 9/(4*HarmonicSums`Private`ExpVar^9) + 5/(16*HarmonicSums`Private`ExpVar^8) - 1/(3*HarmonicSums`Private`ExpVar^7) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(12*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-51/(2*HarmonicSums`Private`ExpVar^9) + 9/(2*HarmonicSums`Private`ExpVar^7) - 3/(2*HarmonicSums`Private`ExpVar^5) + 3/(2*HarmonicSums`Private`ExpVar^3) - 3/(2*HarmonicSums`Private`ExpVar^2)) - 664483/(537600*HarmonicSums`Private`ExpVar^10) + 7747/(8640*HarmonicSums`Private`ExpVar^9) + 21967/(92160*HarmonicSums`Private`ExpVar^8) - 1453/(2688*HarmonicSums`Private`ExpVar^7) + 415/(1152*HarmonicSums`Private`ExpVar^6) - 23/(160*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + (9*s6)/2 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-17/(8*HarmonicSums`Private`ExpVar^9) + 3/(8*HarmonicSums`Private`ExpVar^7) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (11*z2)/16) + (3*li4half + 1109/(1280*HarmonicSums`Private`ExpVar^10) - 1003/(5760*HarmonicSums`Private`ExpVar^9) - 5/(24*HarmonicSums`Private`ExpVar^8) + 115/(1344*HarmonicSums`Private`ExpVar^7) + 19/(192*HarmonicSums`Private`ExpVar^6) - 37/(240*HarmonicSums`Private`ExpVar^5) + 7/(64*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar*(51/(5*HarmonicSums`Private`ExpVar^9) - 9/(5*HarmonicSums`Private`ExpVar^7) + 3/(5*HarmonicSums`Private`ExpVar^5) - 3/(5*HarmonicSums`Private`ExpVar^3) + 3/(5*HarmonicSums`Private`ExpVar^2))*z2^2 - (92*z2^3)/35 + ln2^2*((-3*li4half)/2 + 1109/(1280*HarmonicSums`Private`ExpVar^10) - 1003/(5760*HarmonicSums`Private`ExpVar^9) - 5/(24*HarmonicSums`Private`ExpVar^8) + 115/(1344*HarmonicSums`Private`ExpVar^7) + 19/(192*HarmonicSums`Private`ExpVar^6) - 37/(240*HarmonicSums`Private`ExpVar^5) + 7/(64*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (17/(8*HarmonicSums`Private`ExpVar^9) - 3/(8*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (21*z2^2)/10) + (-1)^HarmonicSums`Private`ExpVar* (-119/(32*HarmonicSums`Private`ExpVar^10) + 27/(8*HarmonicSums`Private`ExpVar^9) + 15/(32*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^7) - 3/(32*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3))*z3 - (321*z3^2)/128 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^3* (-17/(12*HarmonicSums`Private`ExpVar^9) + 1/(4*HarmonicSums`Private`ExpVar^7) - 1/(12*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*ln2* (-17/(4*HarmonicSums`Private`ExpVar^9) + 3/(4*HarmonicSums`Private`ExpVar^7) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-17/(8*HarmonicSums`Private`ExpVar^9) + 3/(8*HarmonicSums`Private`ExpVar^7) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z3) + ln2*((-1)^HarmonicSums`Private`ExpVar* (-68107961/(7526400*HarmonicSums`Private`ExpVar^10) - 31961/(7056*HarmonicSums`Private`ExpVar^9) + 11489/(9600*HarmonicSums`Private`ExpVar^8) + 43711/(57600*HarmonicSums`Private`ExpVar^7) - 223/(2304*HarmonicSums`Private`ExpVar^6) - 175/(288*HarmonicSums`Private`ExpVar^5) + 19/(32*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*(-17/HarmonicSums`Private`ExpVar^9 + 3/HarmonicSums`Private`ExpVar^7 - HarmonicSums`Private`ExpVar^(-5) + HarmonicSums`Private`ExpVar^(-3) - HarmonicSums`Private`ExpVar^(-2))* z3 + z2*((-1)^HarmonicSums`Private`ExpVar* (-119/(16*HarmonicSums`Private`ExpVar^10) + 27/(4*HarmonicSums`Private`ExpVar^9) + 15/(16*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-7) - 3/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (69*z3)/16)), S[-2, 1, -1, -1, 1, HarmonicSums`Private`ExpVar] :> 21*li6half - (7*ln2^6)/120 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (-119/(48*HarmonicSums`Private`ExpVar^10) + 9/(4*HarmonicSums`Private`ExpVar^9) + 5/(16*HarmonicSums`Private`ExpVar^8) - 1/(3*HarmonicSums`Private`ExpVar^7) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(12*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (2634744347/(131712000*HarmonicSums`Private`ExpVar^10) + 99233611/(59270400*HarmonicSums`Private`ExpVar^9) - 1135069/(384000*HarmonicSums`Private`ExpVar^8) - 1102007/(1728000*HarmonicSums`Private`ExpVar^7) + 2965/(3456*HarmonicSums`Private`ExpVar^6) + 655/(1728*HarmonicSums`Private`ExpVar^5) - 7/(8*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-51/(2*HarmonicSums`Private`ExpVar^9) + 9/(2*HarmonicSums`Private`ExpVar^7) - 3/(2*HarmonicSums`Private`ExpVar^5) + 3/(2*HarmonicSums`Private`ExpVar^3) - 3/(2*HarmonicSums`Private`ExpVar^2)) + (33*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-17/(8*HarmonicSums`Private`ExpVar^9) + 3/(8*HarmonicSums`Private`ExpVar^7) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (5*z2)/8) + ((3*li4half)/2 - 1109/(1280*HarmonicSums`Private`ExpVar^10) + 1003/(5760*HarmonicSums`Private`ExpVar^9) + 5/(24*HarmonicSums`Private`ExpVar^8) - 115/(1344*HarmonicSums`Private`ExpVar^7) - 19/(192*HarmonicSums`Private`ExpVar^6) + 37/(240*HarmonicSums`Private`ExpVar^5) - 7/(64*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3))*z2 - (491*z2^3)/140 + ln2^2*((-3*li4half)/2 + 1109/(1280*HarmonicSums`Private`ExpVar^10) - 1003/(5760*HarmonicSums`Private`ExpVar^9) - 5/(24*HarmonicSums`Private`ExpVar^8) + 115/(1344*HarmonicSums`Private`ExpVar^7) + 19/(192*HarmonicSums`Private`ExpVar^6) - 37/(240*HarmonicSums`Private`ExpVar^5) + 7/(64*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (17/(8*HarmonicSums`Private`ExpVar^9) - 3/(8*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (219*z2^2)/80) + (-1)^HarmonicSums`Private`ExpVar* (833/(32*HarmonicSums`Private`ExpVar^10) - 189/(8*HarmonicSums`Private`ExpVar^9) - 105/(32*HarmonicSums`Private`ExpVar^8) + 7/(2*HarmonicSums`Private`ExpVar^7) + 21/(32*HarmonicSums`Private`ExpVar^6) - 7/(8*HarmonicSums`Private`ExpVar^5) - 7/(32*HarmonicSums`Private`ExpVar^4) + 7/(16*HarmonicSums`Private`ExpVar^3))*z3 - (501*z3^2)/128 + sinf*((-1)^HarmonicSums`Private`ExpVar* (68107961/(7526400*HarmonicSums`Private`ExpVar^10) + 31961/(7056*HarmonicSums`Private`ExpVar^9) - 11489/(9600*HarmonicSums`Private`ExpVar^8) - 43711/(57600*HarmonicSums`Private`ExpVar^7) + 223/(2304*HarmonicSums`Private`ExpVar^6) + 175/(288*HarmonicSums`Private`ExpVar^5) - 19/(32*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (-17/(12*HarmonicSums`Private`ExpVar^9) + 1/(4*HarmonicSums`Private`ExpVar^7) - 1/(12*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*ln2* (-17/(4*HarmonicSums`Private`ExpVar^9) + 3/(4*HarmonicSums`Private`ExpVar^7) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (119/(8*HarmonicSums`Private`ExpVar^9) - 21/(8*HarmonicSums`Private`ExpVar^7) + 7/(8*HarmonicSums`Private`ExpVar^5) - 7/(8*HarmonicSums`Private`ExpVar^3) + 7/(8*HarmonicSums`Private`ExpVar^2))*z3) + ln2*(3*li5half + (-1)^HarmonicSums`Private`ExpVar* (-119/(16*HarmonicSums`Private`ExpVar^10) + 27/(4*HarmonicSums`Private`ExpVar^9) + 15/(16*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-7) - 3/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3))*z2 + (279*z5)/64), S[-2, 1, -1, 1, -1, HarmonicSums`Private`ExpVar] :> 11*li6half + ln2^6/144 + (-1)^HarmonicSums`Private`ExpVar* (107915/(73728*HarmonicSums`Private`ExpVar^10) + 1069/(2304*HarmonicSums`Private`ExpVar^9) - 223/(2304*HarmonicSums`Private`ExpVar^8) - 493/(1536*HarmonicSums`Private`ExpVar^7) + 457/(1536*HarmonicSums`Private`ExpVar^6) - 13/(96*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* ln2^3*(-119/(48*HarmonicSums`Private`ExpVar^10) + 9/(4*HarmonicSums`Private`ExpVar^9) + 5/(16*HarmonicSums`Private`ExpVar^8) - 1/(3*HarmonicSums`Private`ExpVar^7) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(12*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3)) + (17*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-17/(16*HarmonicSums`Private`ExpVar^9) + 3/(16*HarmonicSums`Private`ExpVar^7) - 1/(16*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2)) - z2/48) + (-1)^HarmonicSums`Private`ExpVar*(-17/(40*HarmonicSums`Private`ExpVar^9) + 3/(40*HarmonicSums`Private`ExpVar^7) - 1/(40*HarmonicSums`Private`ExpVar^5) + 1/(40*HarmonicSums`Private`ExpVar^3) - 1/(40*HarmonicSums`Private`ExpVar^2))*z2^2 - (8*z2^3)/5 + ln2^2*(-1109/(1280*HarmonicSums`Private`ExpVar^10) + 1003/(5760*HarmonicSums`Private`ExpVar^9) + 5/(24*HarmonicSums`Private`ExpVar^8) - 115/(1344*HarmonicSums`Private`ExpVar^7) - 19/(192*HarmonicSums`Private`ExpVar^6) + 37/(240*HarmonicSums`Private`ExpVar^5) - 7/(64*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (17/(4*HarmonicSums`Private`ExpVar^9) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2 - (123*z2^2)/80) + (-1)^HarmonicSums`Private`ExpVar* (119/(64*HarmonicSums`Private`ExpVar^10) - 27/(16*HarmonicSums`Private`ExpVar^9) - 15/(64*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^7) + 3/(64*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3))*z3 - (211*z3^2)/128 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^3* (-17/(12*HarmonicSums`Private`ExpVar^9) + 1/(4*HarmonicSums`Private`ExpVar^7) - 1/(12*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2)) + ln2*(-1109/(640*HarmonicSums`Private`ExpVar^10) + 1003/(2880*HarmonicSums`Private`ExpVar^9) + 5/(12*HarmonicSums`Private`ExpVar^8) - 115/(672*HarmonicSums`Private`ExpVar^7) - 19/(96*HarmonicSums`Private`ExpVar^6) + 37/(120*HarmonicSums`Private`ExpVar^5) - 7/(32*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (17/(4*HarmonicSums`Private`ExpVar^9) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2) + (-1)^HarmonicSums`Private`ExpVar* (17/(16*HarmonicSums`Private`ExpVar^9) - 3/(16*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z3) + ln2*(li5half + 209369/(57600*HarmonicSums`Private`ExpVar^10) + 113339/(907200*HarmonicSums`Private`ExpVar^9) - 12305/(16128*HarmonicSums`Private`ExpVar^8) + 5741/(141120*HarmonicSums`Private`ExpVar^7) + 1757/(5760*HarmonicSums`Private`ExpVar^6) - 2897/(14400*HarmonicSums`Private`ExpVar^5) + 11/(384*HarmonicSums`Private`ExpVar^4) + 1/(36*HarmonicSums`Private`ExpVar^3) + z2*((-1)^HarmonicSums`Private`ExpVar* (119/(16*HarmonicSums`Private`ExpVar^10) - 27/(4*HarmonicSums`Private`ExpVar^9) - 15/(16*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-7) + 3/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (3*z3)/16) + (31*z5)/64), S[-2, 1, -1, 1, 1, HarmonicSums`Private`ExpVar] :> 6*li6half + ln2^6/120 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (-119/(48*HarmonicSums`Private`ExpVar^10) + 9/(4*HarmonicSums`Private`ExpVar^9) + 5/(16*HarmonicSums`Private`ExpVar^8) - 1/(3*HarmonicSums`Private`ExpVar^7) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(12*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3)) + 165303881/(72576000*HarmonicSums`Private`ExpVar^10) + 2589010369/(2286144000*HarmonicSums`Private`ExpVar^9) - 5569103/(13547520*HarmonicSums`Private`ExpVar^8) - 21490459/(59270400*HarmonicSums`Private`ExpVar^7) + 123361/(345600*HarmonicSums`Private`ExpVar^6) - 118361/(864000*HarmonicSums`Private`ExpVar^5) + 127/(4608*HarmonicSums`Private`ExpVar^4) - 1/(108*HarmonicSums`Private`ExpVar^3) + (3*s6)/4 + (1109/(1280*HarmonicSums`Private`ExpVar^10) - 1003/(5760*HarmonicSums`Private`ExpVar^9) - 5/(24*HarmonicSums`Private`ExpVar^8) + 115/(1344*HarmonicSums`Private`ExpVar^7) + 19/(192*HarmonicSums`Private`ExpVar^6) - 37/(240*HarmonicSums`Private`ExpVar^5) + 7/(64*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3))*sinf^2 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-17/(16*HarmonicSums`Private`ExpVar^9) + 3/(16*HarmonicSums`Private`ExpVar^7) - 1/(16*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2)) + z2/16) + (1109/(1280*HarmonicSums`Private`ExpVar^10) - 1003/(5760*HarmonicSums`Private`ExpVar^9) - 5/(24*HarmonicSums`Private`ExpVar^8) + 115/(1344*HarmonicSums`Private`ExpVar^7) + 19/(192*HarmonicSums`Private`ExpVar^6) - 37/(240*HarmonicSums`Private`ExpVar^5) + 7/(64*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar*(17/(40*HarmonicSums`Private`ExpVar^9) - 3/(40*HarmonicSums`Private`ExpVar^7) + 1/(40*HarmonicSums`Private`ExpVar^5) - 1/(40*HarmonicSums`Private`ExpVar^3) + 1/(40*HarmonicSums`Private`ExpVar^2))*z2^2 - (247*z2^3)/280 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (17/(4*HarmonicSums`Private`ExpVar^9) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2 - (27*z2^2)/80) + (-1)^HarmonicSums`Private`ExpVar* (-833/(64*HarmonicSums`Private`ExpVar^10) + 189/(16*HarmonicSums`Private`ExpVar^9) + 105/(64*HarmonicSums`Private`ExpVar^8) - 7/(4*HarmonicSums`Private`ExpVar^7) - 21/(64*HarmonicSums`Private`ExpVar^6) + 7/(16*HarmonicSums`Private`ExpVar^5) + 7/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^3))*z3 - (57*z3^2)/128 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^3* (-17/(12*HarmonicSums`Private`ExpVar^9) + 1/(4*HarmonicSums`Private`ExpVar^7) - 1/(12*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2)) - 209369/(57600*HarmonicSums`Private`ExpVar^10) - 113339/(907200*HarmonicSums`Private`ExpVar^9) + 12305/(16128*HarmonicSums`Private`ExpVar^8) - 5741/(141120*HarmonicSums`Private`ExpVar^7) - 1757/(5760*HarmonicSums`Private`ExpVar^6) + 2897/(14400*HarmonicSums`Private`ExpVar^5) - 11/(384*HarmonicSums`Private`ExpVar^4) - 1/(36*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* ln2*(17/(4*HarmonicSums`Private`ExpVar^9) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-119/(16*HarmonicSums`Private`ExpVar^9) + 21/(16*HarmonicSums`Private`ExpVar^7) - 7/(16*HarmonicSums`Private`ExpVar^5) + 7/(16*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2))*z3) + ln2*((-1)^HarmonicSums`Private`ExpVar* (-17/(2*HarmonicSums`Private`ExpVar^9) + 3/(2*HarmonicSums`Private`ExpVar^7) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2))*z3 + z2*((-1)^HarmonicSums`Private`ExpVar* (119/(16*HarmonicSums`Private`ExpVar^10) - 27/(4*HarmonicSums`Private`ExpVar^9) - 15/(16*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-7) + 3/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (3*z3)/2)), S[-2, 1, 1, -1, -1, HarmonicSums`Private`ExpVar] :> -11*li6half + (7*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar* (-53194620673/(6322176000*HarmonicSums`Private`ExpVar^10) - 51526963/(11854080*HarmonicSums`Private`ExpVar^9) + 173867/(144000*HarmonicSums`Private`ExpVar^8) + 1971257/(3456000*HarmonicSums`Private`ExpVar^7) + 1655/(27648*HarmonicSums`Private`ExpVar^6) - 1169/(1728*HarmonicSums`Private`ExpVar^5) + 39/(64*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(17/(2*HarmonicSums`Private`ExpVar^9) - 3/(2*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2)) - (13*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (17/(12*HarmonicSums`Private`ExpVar^9) - 1/(4*HarmonicSums`Private`ExpVar^7) + 1/(12*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2)) - (13*z2)/48) + (-1)^HarmonicSums`Private`ExpVar* (-37889/(2240*HarmonicSums`Private`ExpVar^10) + 1783/(672*HarmonicSums`Private`ExpVar^9) + 1269/(640*HarmonicSums`Private`ExpVar^8) - 103/(480*HarmonicSums`Private`ExpVar^7) - 71/(192*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar*(17/(8*HarmonicSums`Private`ExpVar^9) - 3/(8*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2^2 + (481*z2^3)/280 + sinf^2*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (17/(8*HarmonicSums`Private`ExpVar^9) - 3/(8*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*(17/(8*HarmonicSums`Private`ExpVar^9) - 3/(8*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-37889/(2240*HarmonicSums`Private`ExpVar^10) + 1783/(672*HarmonicSums`Private`ExpVar^9) + 1269/(640*HarmonicSums`Private`ExpVar^8) - 103/(480*HarmonicSums`Private`ExpVar^7) - 71/(192*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*(17/(8*HarmonicSums`Private`ExpVar^9) - 3/(8*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (11*z2^2)/16) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (119/(24*HarmonicSums`Private`ExpVar^10) - 9/(2*HarmonicSums`Private`ExpVar^9) - 5/(8*HarmonicSums`Private`ExpVar^8) + 2/(3*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(6*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3)) - (7*z3)/48) + (-1)^HarmonicSums`Private`ExpVar* (-833/(64*HarmonicSums`Private`ExpVar^10) + 189/(16*HarmonicSums`Private`ExpVar^9) + 105/(64*HarmonicSums`Private`ExpVar^8) - 7/(4*HarmonicSums`Private`ExpVar^7) - 21/(64*HarmonicSums`Private`ExpVar^6) + 7/(16*HarmonicSums`Private`ExpVar^5) + 7/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^3))*z3 + (177*z3^2)/128 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (119/(16*HarmonicSums`Private`ExpVar^10) - 27/(4*HarmonicSums`Private`ExpVar^9) - 15/(16*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-7) + 3/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (17/(6*HarmonicSums`Private`ExpVar^9) - 1/(2*HarmonicSums`Private`ExpVar^7) + 1/(6*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(6*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (119/(16*HarmonicSums`Private`ExpVar^10) - 27/(4*HarmonicSums`Private`ExpVar^9) - 15/(16*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-7) + 3/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (17/(4*HarmonicSums`Private`ExpVar^9) - 3/(4*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-119/(16*HarmonicSums`Private`ExpVar^9) + 21/(16*HarmonicSums`Private`ExpVar^7) - 7/(16*HarmonicSums`Private`ExpVar^5) + 7/(16*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2))*z3) + ln2*(-3*li5half - 261/(640*HarmonicSums`Private`ExpVar^10) + 6563/(5760*HarmonicSums`Private`ExpVar^9) - 131/(1536*HarmonicSums`Private`ExpVar^8) - 87/(224*HarmonicSums`Private`ExpVar^7) + 61/(192*HarmonicSums`Private`ExpVar^6) - 11/(80*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + z2*((-1)^HarmonicSums`Private`ExpVar* (119/(16*HarmonicSums`Private`ExpVar^10) - 27/(4*HarmonicSums`Private`ExpVar^9) - 15/(16*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-7) + 3/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) - (7*z3)/16) - (31*z5)/32), S[-2, 1, 1, -1, 1, HarmonicSums`Private`ExpVar] :> -4*li6half - ln2^6/180 + (-1)^HarmonicSums`Private`ExpVar*li4half* (17/(2*HarmonicSums`Private`ExpVar^9) - 3/(2*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2)) - 1083253/(460800*HarmonicSums`Private`ExpVar^10) + 20820193/(14515200*HarmonicSums`Private`ExpVar^9) + 59627/(258048*HarmonicSums`Private`ExpVar^8) - 41617/(94080*HarmonicSums`Private`ExpVar^7) + 8/(45*HarmonicSums`Private`ExpVar^6) - 31/(1600*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) - s6 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (17/(12*HarmonicSums`Private`ExpVar^9) - 1/(4*HarmonicSums`Private`ExpVar^7) + 1/(12*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2)) - z2/6) + ((-3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (37889/(2240*HarmonicSums`Private`ExpVar^10) - 1783/(672*HarmonicSums`Private`ExpVar^9) - 1269/(640*HarmonicSums`Private`ExpVar^8) + 103/(480*HarmonicSums`Private`ExpVar^7) + 71/(192*HarmonicSums`Private`ExpVar^6) + 5/(96*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-221/(40*HarmonicSums`Private`ExpVar^9) + 39/(40*HarmonicSums`Private`ExpVar^7) - 13/(40*HarmonicSums`Private`ExpVar^5) + 13/(40*HarmonicSums`Private`ExpVar^3) - 13/(40*HarmonicSums`Private`ExpVar^2))*z2^2 + (293*z2^3)/280 + sinf^2*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (17/(8*HarmonicSums`Private`ExpVar^9) - 3/(8*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-17/(8*HarmonicSums`Private`ExpVar^9) + 3/(8*HarmonicSums`Private`ExpVar^7) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-37889/(2240*HarmonicSums`Private`ExpVar^10) + 1783/(672*HarmonicSums`Private`ExpVar^9) + 1269/(640*HarmonicSums`Private`ExpVar^8) - 103/(480*HarmonicSums`Private`ExpVar^7) - 71/(192*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-17/(8*HarmonicSums`Private`ExpVar^9) + 3/(8*HarmonicSums`Private`ExpVar^7) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (17*z2^2)/20) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (119/(24*HarmonicSums`Private`ExpVar^10) - 9/(2*HarmonicSums`Private`ExpVar^9) - 5/(8*HarmonicSums`Private`ExpVar^8) + 2/(3*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(6*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3)) - (7*z3)/48) + (-1)^HarmonicSums`Private`ExpVar* (119/(64*HarmonicSums`Private`ExpVar^10) - 27/(16*HarmonicSums`Private`ExpVar^9) - 15/(64*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^7) + 3/(64*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3))*z3 + (181*z3^2)/128 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (119/(16*HarmonicSums`Private`ExpVar^10) - 27/(4*HarmonicSums`Private`ExpVar^9) - 15/(16*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-7) + 3/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (17/(6*HarmonicSums`Private`ExpVar^9) - 1/(2*HarmonicSums`Private`ExpVar^7) + 1/(6*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(6*HarmonicSums`Private`ExpVar^2)) + 261/(640*HarmonicSums`Private`ExpVar^10) - 6563/(5760*HarmonicSums`Private`ExpVar^9) + 131/(1536*HarmonicSums`Private`ExpVar^8) + 87/(224*HarmonicSums`Private`ExpVar^7) - 61/(192*HarmonicSums`Private`ExpVar^6) + 11/(80*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + (-1)^HarmonicSums`Private`ExpVar* (-119/(16*HarmonicSums`Private`ExpVar^10) + 27/(4*HarmonicSums`Private`ExpVar^9) + 15/(16*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-7) - 3/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (-17/(4*HarmonicSums`Private`ExpVar^9) + 3/(4*HarmonicSums`Private`ExpVar^7) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (17/(16*HarmonicSums`Private`ExpVar^9) - 3/(16*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z3) + ln2*(z2*((-1)^HarmonicSums`Private`ExpVar* (-119/(16*HarmonicSums`Private`ExpVar^10) + 27/(4*HarmonicSums`Private`ExpVar^9) + 15/(16*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-7) - 3/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) - (31*z3)/16) + (-1)^HarmonicSums`Private`ExpVar*(17/(2*HarmonicSums`Private`ExpVar^9) - 3/(2*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2))*z3), S[-2, 1, 1, 1, -1, HarmonicSums`Private`ExpVar] :> 2*li6half - (13*ln2^6)/720 - 77/(40*HarmonicSums`Private`ExpVar^10) - 247/(960*HarmonicSums`Private`ExpVar^9) + 1745/(3072*HarmonicSums`Private`ExpVar^8) - 129/(448*HarmonicSums`Private`ExpVar^7) + 1/(12*HarmonicSums`Private`ExpVar^6) - 1/(80*HarmonicSums`Private`ExpVar^5) + s6/2 + ((-1)^HarmonicSums`Private`ExpVar*ln2* (-119/(16*HarmonicSums`Private`ExpVar^10) + 27/(4*HarmonicSums`Private`ExpVar^9) + 15/(16*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-7) - 3/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (-17/(8*HarmonicSums`Private`ExpVar^9) + 3/(8*HarmonicSums`Private`ExpVar^7) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)))*sinf^2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (-17/(12*HarmonicSums`Private`ExpVar^9) + 1/(4*HarmonicSums`Private`ExpVar^7) - 1/(12*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2))*sinf^3 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-17/(48*HarmonicSums`Private`ExpVar^9) + 1/(16*HarmonicSums`Private`ExpVar^7) - 1/(48*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(48*HarmonicSums`Private`ExpVar^2)) + z2/8) - (li4half*z2)/2 - (6*z2^3)/35 + ln2^2*(-(li4half/2) + (-1)^HarmonicSums`Private`ExpVar* (37889/(2240*HarmonicSums`Private`ExpVar^10) - 1783/(672*HarmonicSums`Private`ExpVar^9) - 1269/(640*HarmonicSums`Private`ExpVar^8) + 103/(480*HarmonicSums`Private`ExpVar^7) + 71/(192*HarmonicSums`Private`ExpVar^6) + 5/(96*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-17/(8*HarmonicSums`Private`ExpVar^9) + 3/(8*HarmonicSums`Private`ExpVar^7) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + z2^2/10) + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (-119/(16*HarmonicSums`Private`ExpVar^10) + 27/(4*HarmonicSums`Private`ExpVar^9) + 15/(16*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-7) - 3/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (-17/(12*HarmonicSums`Private`ExpVar^9) + 1/(4*HarmonicSums`Private`ExpVar^7) - 1/(12*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2)) + ln2*((-1)^HarmonicSums`Private`ExpVar* (37889/(1120*HarmonicSums`Private`ExpVar^10) - 1783/(336*HarmonicSums`Private`ExpVar^9) - 1269/(320*HarmonicSums`Private`ExpVar^8) + 103/(240*HarmonicSums`Private`ExpVar^7) + 71/(96*HarmonicSums`Private`ExpVar^6) + 5/(48*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-17/(4*HarmonicSums`Private`ExpVar^9) + 3/(4*HarmonicSums`Private`ExpVar^7) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2)) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-119/(48*HarmonicSums`Private`ExpVar^10) + 9/(4*HarmonicSums`Private`ExpVar^9) + 5/(16*HarmonicSums`Private`ExpVar^8) - 1/(3*HarmonicSums`Private`ExpVar^7) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(12*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3)) - (7*z3)/48) - (17*z3^2)/128 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-1888703/(80640*HarmonicSums`Private`ExpVar^10) - 20323/(5760*HarmonicSums`Private`ExpVar^9) + 12541/(5760*HarmonicSums`Private`ExpVar^8) + 43/(64*HarmonicSums`Private`ExpVar^7) - 19/(96*HarmonicSums`Private`ExpVar^6) - 17/(48*HarmonicSums`Private`ExpVar^5) + 5/(24*HarmonicSums`Private`ExpVar^4)) + z2*((-1)^HarmonicSums`Private`ExpVar* (-119/(16*HarmonicSums`Private`ExpVar^10) + 27/(4*HarmonicSums`Private`ExpVar^9) + 15/(16*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-7) - 3/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (7*z3)/16) + (-1)^HarmonicSums`Private`ExpVar* (-17/(6*HarmonicSums`Private`ExpVar^9) + 1/(2*HarmonicSums`Private`ExpVar^7) - 1/(6*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(6*HarmonicSums`Private`ExpVar^2))*z3), S[-2, 1, 1, 1, 1, HarmonicSums`Private`ExpVar] :> -li6half - ln2^6/72 + (-1)^HarmonicSums`Private`ExpVar* (-28073/(10752*HarmonicSums`Private`ExpVar^10) - 4791/(1280*HarmonicSums`Private`ExpVar^9) - 191/(1440*HarmonicSums`Private`ExpVar^8) + 67/(192*HarmonicSums`Private`ExpVar^7) + 19/(64*HarmonicSums`Private`ExpVar^6) - 13/(48*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* (119/(48*HarmonicSums`Private`ExpVar^10) - 9/(4*HarmonicSums`Private`ExpVar^9) - 5/(16*HarmonicSums`Private`ExpVar^8) + 1/(3*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(12*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3))*sinf^3 + (-1)^HarmonicSums`Private`ExpVar*(17/(48*HarmonicSums`Private`ExpVar^9) - 1/(16*HarmonicSums`Private`ExpVar^7) + 1/(48*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2))*sinf^4 + (ln2^4*z2)/12 + (li4half/2 + (-1)^HarmonicSums`Private`ExpVar* (-37889/(2240*HarmonicSums`Private`ExpVar^10) + 1783/(672*HarmonicSums`Private`ExpVar^9) + 1269/(640*HarmonicSums`Private`ExpVar^8) - 103/(480*HarmonicSums`Private`ExpVar^7) - 71/(192*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)))*z2 + (-1)^HarmonicSums`Private`ExpVar*(153/(80*HarmonicSums`Private`ExpVar^9) - 27/(80*HarmonicSums`Private`ExpVar^7) + 9/(80*HarmonicSums`Private`ExpVar^5) - 9/(80*HarmonicSums`Private`ExpVar^3) + 9/(80*HarmonicSums`Private`ExpVar^2))*z2^2 + sinf^2*((-1)^HarmonicSums`Private`ExpVar* (-37889/(2240*HarmonicSums`Private`ExpVar^10) + 1783/(672*HarmonicSums`Private`ExpVar^9) + 1269/(640*HarmonicSums`Private`ExpVar^8) - 103/(480*HarmonicSums`Private`ExpVar^7) - 71/(192*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*(17/(8*HarmonicSums`Private`ExpVar^9) - 3/(8*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2) + ln2^2*(-(li4half/2) - z2^2/8) - (7*ln2^3*z3)/48 + (-1)^HarmonicSums`Private`ExpVar* (119/(24*HarmonicSums`Private`ExpVar^10) - 9/(2*HarmonicSums`Private`ExpVar^9) - 5/(8*HarmonicSums`Private`ExpVar^8) + 2/(3*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(6*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3))*z3 - (49*z3^2)/128 + sinf*((-1)^HarmonicSums`Private`ExpVar* (1888703/(80640*HarmonicSums`Private`ExpVar^10) + 20323/(5760*HarmonicSums`Private`ExpVar^9) - 12541/(5760*HarmonicSums`Private`ExpVar^8) - 43/(64*HarmonicSums`Private`ExpVar^7) + 19/(96*HarmonicSums`Private`ExpVar^6) + 17/(48*HarmonicSums`Private`ExpVar^5) - 5/(24*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* (119/(16*HarmonicSums`Private`ExpVar^10) - 27/(4*HarmonicSums`Private`ExpVar^9) - 15/(16*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-7) + 3/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar*(17/(6*HarmonicSums`Private`ExpVar^9) - 1/(2*HarmonicSums`Private`ExpVar^7) + 1/(6*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(6*HarmonicSums`Private`ExpVar^2))*z3) + ln2*(-li5half + (7*z2*z3)/16), S[2, -1, -1, -1, -1, HarmonicSums`Private`ExpVar] :> 13*li6half - (2*ln2^6)/45 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (-629/(192*HarmonicSums`Private`ExpVar^10) - 13/(16*HarmonicSums`Private`ExpVar^9) + 11/(24*HarmonicSums`Private`ExpVar^8) + 13/(96*HarmonicSums`Private`ExpVar^7) - 11/(96*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3)) - 1725491/(6451200*HarmonicSums`Private`ExpVar^10) + 324319/(1161216*HarmonicSums`Private`ExpVar^9) + 3113/(30720*HarmonicSums`Private`ExpVar^8) - 3443/(10080*HarmonicSums`Private`ExpVar^7) + 823/(2304*HarmonicSums`Private`ExpVar^6) - 97/(384*HarmonicSums`Private`ExpVar^5) + 25/(192*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + (19*s6)/4 + ln2^4*(1/(720*HarmonicSums`Private`ExpVar^9) - 1/(1008*HarmonicSums`Private`ExpVar^7) + 1/(720*HarmonicSums`Private`ExpVar^5) - 1/(144*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar) + (13*z2)/24) + ((-3*li4half)/2 + 22529/(268800*HarmonicSums`Private`ExpVar^10) - 1669/(26880*HarmonicSums`Private`ExpVar^9) - 643/(20160*HarmonicSums`Private`ExpVar^8) + 611/(13440*HarmonicSums`Private`ExpVar^7) + 137/(5760*HarmonicSums`Private`ExpVar^6) - 113/(960*HarmonicSums`Private`ExpVar^5) + 35/(192*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (3/(400*HarmonicSums`Private`ExpVar^9) - 3/(560*HarmonicSums`Private`ExpVar^7) + 3/(400*HarmonicSums`Private`ExpVar^5) - 3/(80*HarmonicSums`Private`ExpVar^3) + 9/(80*HarmonicSums`Private`ExpVar^2) - 9/(40*HarmonicSums`Private`ExpVar))*z2^2 - (659*z2^3)/560 + ln2^2*((-3*li4half)/2 + 22529/(268800*HarmonicSums`Private`ExpVar^10) - 1669/(26880*HarmonicSums`Private`ExpVar^9) - 643/(20160*HarmonicSums`Private`ExpVar^8) + 611/(13440*HarmonicSums`Private`ExpVar^7) + 137/(5760*HarmonicSums`Private`ExpVar^6) - 113/(960*HarmonicSums`Private`ExpVar^5) + 35/(192*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 - z2^2) + (-1)^HarmonicSums`Private`ExpVar* (-629/(128*HarmonicSums`Private`ExpVar^10) - 39/(32*HarmonicSums`Private`ExpVar^9) + 11/(16*HarmonicSums`Private`ExpVar^8) + 13/(64*HarmonicSums`Private`ExpVar^7) - 11/(64*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3))*z3 - (121*z3^2)/64 + ln2*((-1)^HarmonicSums`Private`ExpVar* (816661/(53760*HarmonicSums`Private`ExpVar^10) + 57/(640*HarmonicSums`Private`ExpVar^9) - 4213/(1920*HarmonicSums`Private`ExpVar^8) + 23/(384*HarmonicSums`Private`ExpVar^7) + 71/(96*HarmonicSums`Private`ExpVar^6) - 15/(32*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) + z2*((-1)^HarmonicSums`Private`ExpVar* (-629/(64*HarmonicSums`Private`ExpVar^10) - 39/(16*HarmonicSums`Private`ExpVar^9) + 11/(8*HarmonicSums`Private`ExpVar^8) + 13/(32*HarmonicSums`Private`ExpVar^7) - 11/(32*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (3*z3)/4) + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z3), S[2, -1, -1, -1, 1, HarmonicSums`Private`ExpVar] :> 22*li6half - (41*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar* (47952601/(22579200*HarmonicSums`Private`ExpVar^10) + 45749/(9600*HarmonicSums`Private`ExpVar^9) - 3707/(57600*HarmonicSums`Private`ExpVar^8) - 3893/(4608*HarmonicSums`Private`ExpVar^7) + 23/(576*HarmonicSums`Private`ExpVar^6) + 17/(64*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* ln2^3*(-629/(192*HarmonicSums`Private`ExpVar^10) - 13/(16*HarmonicSums`Private`ExpVar^9) + 11/(24*HarmonicSums`Private`ExpVar^8) + 13/(96*HarmonicSums`Private`ExpVar^7) - 11/(96*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3)) + 10*s6 + (-1)^HarmonicSums`Private`ExpVar* (-816661/(53760*HarmonicSums`Private`ExpVar^10) - 57/(640*HarmonicSums`Private`ExpVar^9) + 4213/(1920*HarmonicSums`Private`ExpVar^8) - 23/(384*HarmonicSums`Private`ExpVar^7) - 71/(96*HarmonicSums`Private`ExpVar^6) + 15/(32*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4))*sinf + ln2^4*(1/(720*HarmonicSums`Private`ExpVar^9) - 1/(1008*HarmonicSums`Private`ExpVar^7) + 1/(720*HarmonicSums`Private`ExpVar^5) - 1/(144*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar) + (2*z2)/3) + ((3*li4half)/2 - 22529/(268800*HarmonicSums`Private`ExpVar^10) + 1669/(26880*HarmonicSums`Private`ExpVar^9) + 643/(20160*HarmonicSums`Private`ExpVar^8) - 611/(13440*HarmonicSums`Private`ExpVar^7) - 137/(5760*HarmonicSums`Private`ExpVar^6) + 113/(960*HarmonicSums`Private`ExpVar^5) - 35/(192*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-19/(1200*HarmonicSums`Private`ExpVar^9) + 19/(1680*HarmonicSums`Private`ExpVar^7) - 19/(1200*HarmonicSums`Private`ExpVar^5) + 19/(240*HarmonicSums`Private`ExpVar^3) - 19/(80*HarmonicSums`Private`ExpVar^2) + 19/(40*HarmonicSums`Private`ExpVar))*z2^2 - (134*z2^3)/35 + ln2^2*((-3*li4half)/2 + 22529/(268800*HarmonicSums`Private`ExpVar^10) - 1669/(26880*HarmonicSums`Private`ExpVar^9) - 643/(20160*HarmonicSums`Private`ExpVar^8) + 611/(13440*HarmonicSums`Private`ExpVar^7) + 137/(5760*HarmonicSums`Private`ExpVar^6) - 113/(960*HarmonicSums`Private`ExpVar^5) + 35/(192*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 - (221*z2^2)/80) + (-1)^HarmonicSums`Private`ExpVar* (4403/(128*HarmonicSums`Private`ExpVar^10) + 273/(32*HarmonicSums`Private`ExpVar^9) - 77/(16*HarmonicSums`Private`ExpVar^8) - 91/(64*HarmonicSums`Private`ExpVar^7) + 77/(64*HarmonicSums`Private`ExpVar^6) + 7/(16*HarmonicSums`Private`ExpVar^5) - 7/(8*HarmonicSums`Private`ExpVar^4) + 7/(16*HarmonicSums`Private`ExpVar^3))*z3 - (247*z3^2)/64 + ln2*(3*li5half + z2*((-1)^HarmonicSums`Private`ExpVar* (-629/(64*HarmonicSums`Private`ExpVar^10) - 39/(16*HarmonicSums`Private`ExpVar^9) + 11/(8*HarmonicSums`Private`ExpVar^8) + 13/(32*HarmonicSums`Private`ExpVar^7) - 11/(32*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (3*z3)/8) + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z3 + (93*z5)/64), S[2, -1, -1, 1, -1, HarmonicSums`Private`ExpVar] :> 12*li6half + ln2^6/120 + (-1)^HarmonicSums`Private`ExpVar* (-11831/(3072*HarmonicSums`Private`ExpVar^10) + 455/(384*HarmonicSums`Private`ExpVar^9) + 73/(128*HarmonicSums`Private`ExpVar^8) - 135/(256*HarmonicSums`Private`ExpVar^7) + 3/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5)) + (-1)^HarmonicSums`Private`ExpVar* ln2^3*(-629/(192*HarmonicSums`Private`ExpVar^10) - 13/(16*HarmonicSums`Private`ExpVar^9) + 11/(24*HarmonicSums`Private`ExpVar^8) + 13/(96*HarmonicSums`Private`ExpVar^7) - 11/(96*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3)) + li4half*(1/(10*HarmonicSums`Private`ExpVar^9) - 1/(14*HarmonicSums`Private`ExpVar^7) + 1/(10*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^3) + 3/(2*HarmonicSums`Private`ExpVar^2) - 3/HarmonicSums`Private`ExpVar) + (3*s6)/4 + ln2*(-22529/(134400*HarmonicSums`Private`ExpVar^10) + 1669/(13440*HarmonicSums`Private`ExpVar^9) + 643/(10080*HarmonicSums`Private`ExpVar^8) - 611/(6720*HarmonicSums`Private`ExpVar^7) - 137/(2880*HarmonicSums`Private`ExpVar^6) + 113/(480*HarmonicSums`Private`ExpVar^5) - 35/(96*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*sinf + ln2^4*(1/(180*HarmonicSums`Private`ExpVar^9) - 1/(252*HarmonicSums`Private`ExpVar^7) + 1/(180*HarmonicSums`Private`ExpVar^5) - 1/(36*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar) + (5*z2)/24) + (9*li4half*z2)/2 + (-(25*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(35*HarmonicSums`Private`ExpVar^7) - 1/(25*HarmonicSums`Private`ExpVar^5) + 1/(5*HarmonicSums`Private`ExpVar^3) - 3/(5*HarmonicSums`Private`ExpVar^2) + 6/(5*HarmonicSums`Private`ExpVar))* z2^2 - (149*z2^3)/35 + ln2^2*(-22529/(268800*HarmonicSums`Private`ExpVar^10) + 1669/(26880*HarmonicSums`Private`ExpVar^9) + 643/(20160*HarmonicSums`Private`ExpVar^8) - 611/(13440*HarmonicSums`Private`ExpVar^7) - 137/(5760*HarmonicSums`Private`ExpVar^6) + 113/(960*HarmonicSums`Private`ExpVar^5) - 35/(192*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 - (43*z2^2)/16) + (-1)^HarmonicSums`Private`ExpVar* (629/(256*HarmonicSums`Private`ExpVar^10) + 39/(64*HarmonicSums`Private`ExpVar^9) - 11/(32*HarmonicSums`Private`ExpVar^8) - 13/(128*HarmonicSums`Private`ExpVar^7) + 11/(128*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3))*z3 - (39*z3^2)/64 + ln2*(li5half + 21375899/(37632000*HarmonicSums`Private`ExpVar^10) - 1414159/(33868800*HarmonicSums`Private`ExpVar^9) - 301391/(1411200*HarmonicSums`Private`ExpVar^8) + 94261/(2822400*HarmonicSums`Private`ExpVar^7) + 9467/(57600*HarmonicSums`Private`ExpVar^6) - 3599/(28800*HarmonicSums`Private`ExpVar^5) - 131/(1152*HarmonicSums`Private`ExpVar^4) + 17/(48*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + (7/(240*HarmonicSums`Private`ExpVar^9) - 1/(48*HarmonicSums`Private`ExpVar^7) + 7/(240*HarmonicSums`Private`ExpVar^5) - 7/(48*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2) - 7/(8*HarmonicSums`Private`ExpVar))*z3 + z2*((-1)^HarmonicSums`Private`ExpVar* (629/(64*HarmonicSums`Private`ExpVar^10) + 39/(16*HarmonicSums`Private`ExpVar^9) - 11/(8*HarmonicSums`Private`ExpVar^8) - 13/(32*HarmonicSums`Private`ExpVar^7) + 11/(32*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (63*z3)/16) + (465*z5)/64), S[2, -1, -1, 1, 1, HarmonicSums`Private`ExpVar] :> 7*li6half + (7*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (-629/(192*HarmonicSums`Private`ExpVar^10) - 13/(16*HarmonicSums`Private`ExpVar^9) + 11/(24*HarmonicSums`Private`ExpVar^8) + 13/(96*HarmonicSums`Private`ExpVar^7) - 11/(96*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3)) + li4half*(1/(10*HarmonicSums`Private`ExpVar^9) - 1/(14*HarmonicSums`Private`ExpVar^7) + 1/(10*HarmonicSums`Private`ExpVar^5) - 1/(2*HarmonicSums`Private`ExpVar^3) + 3/(2*HarmonicSums`Private`ExpVar^2) - 3/HarmonicSums`Private`ExpVar) + 120076387349/(284497920000*HarmonicSums`Private`ExpVar^10) + 19764079861/(85349376000*HarmonicSums`Private`ExpVar^9) - 840993397/(7112448000*HarmonicSums`Private`ExpVar^8) - 213399049/(1185408000*HarmonicSums`Private`ExpVar^7) + 2948513/(10368000*HarmonicSums`Private`ExpVar^6) - 476687/(1728000*HarmonicSums`Private`ExpVar^5) + 4493/(13824*HarmonicSums`Private`ExpVar^4) - 127/(288*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2) + (3*s6)/4 + (-21375899/(37632000*HarmonicSums`Private`ExpVar^10) + 1414159/(33868800*HarmonicSums`Private`ExpVar^9) + 301391/(1411200*HarmonicSums`Private`ExpVar^8) - 94261/(2822400*HarmonicSums`Private`ExpVar^7) - 9467/(57600*HarmonicSums`Private`ExpVar^6) + 3599/(28800*HarmonicSums`Private`ExpVar^5) + 131/(1152*HarmonicSums`Private`ExpVar^4) - 17/(48*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2))*sinf + (22529/(268800*HarmonicSums`Private`ExpVar^10) - 1669/(26880*HarmonicSums`Private`ExpVar^9) - 643/(20160*HarmonicSums`Private`ExpVar^8) + 611/(13440*HarmonicSums`Private`ExpVar^7) + 137/(5760*HarmonicSums`Private`ExpVar^6) - 113/(960*HarmonicSums`Private`ExpVar^5) + 35/(192*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*sinf^2 + ln2^4*(1/(180*HarmonicSums`Private`ExpVar^9) - 1/(252*HarmonicSums`Private`ExpVar^7) + 1/(180*HarmonicSums`Private`ExpVar^5) - 1/(36*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar) + (5*z2)/48) + (22529/(268800*HarmonicSums`Private`ExpVar^10) - 1669/(26880*HarmonicSums`Private`ExpVar^9) - 643/(20160*HarmonicSums`Private`ExpVar^8) + 611/(13440*HarmonicSums`Private`ExpVar^7) + 137/(5760*HarmonicSums`Private`ExpVar^6) - 113/(960*HarmonicSums`Private`ExpVar^5) + 35/(192*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (6*z2^3)/35 + ln2^2*((-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 - (29*z2^2)/80) + (-1)^HarmonicSums`Private`ExpVar* (-4403/(256*HarmonicSums`Private`ExpVar^10) - 273/(64*HarmonicSums`Private`ExpVar^9) + 77/(32*HarmonicSums`Private`ExpVar^8) + 91/(128*HarmonicSums`Private`ExpVar^7) - 77/(128*HarmonicSums`Private`ExpVar^6) - 7/(32*HarmonicSums`Private`ExpVar^5) + 7/(16*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^3))*z3 - (137*z3^2)/64 + ln2*((7/(240*HarmonicSums`Private`ExpVar^9) - 1/(48*HarmonicSums`Private`ExpVar^7) + 7/(240*HarmonicSums`Private`ExpVar^5) - 7/(48*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2) - 7/(8*HarmonicSums`Private`ExpVar))*z3 + z2*((-1)^HarmonicSums`Private`ExpVar* (629/(64*HarmonicSums`Private`ExpVar^10) + 39/(16*HarmonicSums`Private`ExpVar^9) - 11/(8*HarmonicSums`Private`ExpVar^8) - 13/(32*HarmonicSums`Private`ExpVar^7) + 11/(32*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (21*z3)/16)), S[2, -1, 1, -1, -1, HarmonicSums`Private`ExpVar] :> -6*li6half + ln2^6/60 + (-1)^HarmonicSums`Private`ExpVar* (299089409/(22579200*HarmonicSums`Private`ExpVar^10) + 20789/(38400*HarmonicSums`Private`ExpVar^9) - 106243/(57600*HarmonicSums`Private`ExpVar^8) - 1009/(4608*HarmonicSums`Private`ExpVar^7) + 481/(576*HarmonicSums`Private`ExpVar^6) - 31/(64*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) - 6*s6 + ln2^4*(1/(720*HarmonicSums`Private`ExpVar^9) - 1/(1008*HarmonicSums`Private`ExpVar^7) + 1/(720*HarmonicSums`Private`ExpVar^5) - 1/(144*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar) - (5*z2)/16) + (-1)^HarmonicSums`Private`ExpVar* (-2007/(256*HarmonicSums`Private`ExpVar^10) - 187/(32*HarmonicSums`Private`ExpVar^9) + 59/(64*HarmonicSums`Private`ExpVar^8) + 55/(64*HarmonicSums`Private`ExpVar^7) - 3/(16*HarmonicSums`Private`ExpVar^6) - 7/(32*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4))*z2 + (-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2^2 - (11*z2^3)/80 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (629/(64*HarmonicSums`Private`ExpVar^10) + 39/(16*HarmonicSums`Private`ExpVar^9) - 11/(8*HarmonicSums`Private`ExpVar^8) - 13/(32*HarmonicSums`Private`ExpVar^7) + 11/(32*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (629/(64*HarmonicSums`Private`ExpVar^10) + 39/(16*HarmonicSums`Private`ExpVar^9) - 11/(8*HarmonicSums`Private`ExpVar^8) - 13/(32*HarmonicSums`Private`ExpVar^7) + 11/(32*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*z2) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-2007/(256*HarmonicSums`Private`ExpVar^10) - 187/(32*HarmonicSums`Private`ExpVar^9) + 59/(64*HarmonicSums`Private`ExpVar^8) + 55/(64*HarmonicSums`Private`ExpVar^7) - 3/(16*HarmonicSums`Private`ExpVar^6) - 7/(32*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) + (-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - (3*z2^2)/8) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (629/(96*HarmonicSums`Private`ExpVar^10) + 13/(8*HarmonicSums`Private`ExpVar^9) - 11/(12*HarmonicSums`Private`ExpVar^8) - 13/(48*HarmonicSums`Private`ExpVar^7) + 11/(48*HarmonicSums`Private`ExpVar^6) + 1/(12*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3)) + (7*z3)/16) + (-1)^HarmonicSums`Private`ExpVar* (-4403/(256*HarmonicSums`Private`ExpVar^10) - 273/(64*HarmonicSums`Private`ExpVar^9) + 77/(32*HarmonicSums`Private`ExpVar^8) + 91/(128*HarmonicSums`Private`ExpVar^7) - 77/(128*HarmonicSums`Private`ExpVar^6) - 7/(32*HarmonicSums`Private`ExpVar^5) + 7/(16*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^3))*z3 + (165*z3^2)/64 + ln2*(-3*li5half + 1861/(15360*HarmonicSums`Private`ExpVar^10) + 23951/(69120*HarmonicSums`Private`ExpVar^9) - 57/(512*HarmonicSums`Private`ExpVar^8) - 485/(2688*HarmonicSums`Private`ExpVar^7) + 107/(384*HarmonicSums`Private`ExpVar^6) - 217/(960*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + (-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z3 + z2*((-1)^HarmonicSums`Private`ExpVar* (629/(64*HarmonicSums`Private`ExpVar^10) + 39/(16*HarmonicSums`Private`ExpVar^9) - 11/(8*HarmonicSums`Private`ExpVar^8) - 13/(32*HarmonicSums`Private`ExpVar^7) + 11/(32*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (21*z3)/16) + (93*z5)/16), S[2, -1, 1, -1, 1, HarmonicSums`Private`ExpVar] :> li6half + ln2^6/720 - 1860781/(5529600*HarmonicSums`Private`ExpVar^10) + 98654611/(174182400*HarmonicSums`Private`ExpVar^9) + 4895/(258048*HarmonicSums`Private`ExpVar^8) - 33351/(125440*HarmonicSums`Private`ExpVar^7) + 4001/(23040*HarmonicSums`Private`ExpVar^6) - 1261/(57600*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 5/(144*HarmonicSums`Private`ExpVar^3) - s6/4 + ln2^4*(1/(720*HarmonicSums`Private`ExpVar^9) - 1/(1008*HarmonicSums`Private`ExpVar^7) + 1/(720*HarmonicSums`Private`ExpVar^5) - 1/(144*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar) - (7*z2)/48) + (-1)^HarmonicSums`Private`ExpVar* (2007/(256*HarmonicSums`Private`ExpVar^10) + 187/(32*HarmonicSums`Private`ExpVar^9) - 59/(64*HarmonicSums`Private`ExpVar^8) - 55/(64*HarmonicSums`Private`ExpVar^7) + 3/(16*HarmonicSums`Private`ExpVar^6) + 7/(32*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4))*z2 + (1/(80*HarmonicSums`Private`ExpVar^9) - 1/(112*HarmonicSums`Private`ExpVar^7) + 1/(80*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*z2^2 + (113*z2^3)/140 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (629/(64*HarmonicSums`Private`ExpVar^10) + 39/(16*HarmonicSums`Private`ExpVar^9) - 11/(8*HarmonicSums`Private`ExpVar^8) - 13/(32*HarmonicSums`Private`ExpVar^7) + 11/(32*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) - 1861/(15360*HarmonicSums`Private`ExpVar^10) - 23951/(69120*HarmonicSums`Private`ExpVar^9) + 57/(512*HarmonicSums`Private`ExpVar^8) + 485/(2688*HarmonicSums`Private`ExpVar^7) - 107/(384*HarmonicSums`Private`ExpVar^6) + 217/(960*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (-629/(64*HarmonicSums`Private`ExpVar^10) - 39/(16*HarmonicSums`Private`ExpVar^9) + 11/(8*HarmonicSums`Private`ExpVar^8) + 13/(32*HarmonicSums`Private`ExpVar^7) - 11/(32*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3))*z2) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-2007/(256*HarmonicSums`Private`ExpVar^10) - 187/(32*HarmonicSums`Private`ExpVar^9) + 59/(64*HarmonicSums`Private`ExpVar^8) + 55/(64*HarmonicSums`Private`ExpVar^7) - 3/(16*HarmonicSums`Private`ExpVar^6) - 7/(32*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) + (-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - (47*z2^2)/80) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (629/(96*HarmonicSums`Private`ExpVar^10) + 13/(8*HarmonicSums`Private`ExpVar^9) - 11/(12*HarmonicSums`Private`ExpVar^8) - 13/(48*HarmonicSums`Private`ExpVar^7) + 11/(48*HarmonicSums`Private`ExpVar^6) + 1/(12*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3)) + (7*z3)/16) + (-1)^HarmonicSums`Private`ExpVar* (629/(256*HarmonicSums`Private`ExpVar^10) + 39/(64*HarmonicSums`Private`ExpVar^9) - 11/(32*HarmonicSums`Private`ExpVar^8) - 13/(128*HarmonicSums`Private`ExpVar^7) + 11/(128*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3))*z3 - (37*z3^2)/16 + ln2*((-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z3 + z2*((-1)^HarmonicSums`Private`ExpVar* (-629/(64*HarmonicSums`Private`ExpVar^10) - 39/(16*HarmonicSums`Private`ExpVar^9) + 11/(8*HarmonicSums`Private`ExpVar^8) + 13/(32*HarmonicSums`Private`ExpVar^7) - 11/(32*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (9*z3)/8)), S[2, -1, 1, 1, -1, HarmonicSums`Private`ExpVar] :> 7*li6half - ln2^6/90 + li4half*(-(30*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(42*HarmonicSums`Private`ExpVar^7) - 1/(30*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) - 38857/(46080*HarmonicSums`Private`ExpVar^10) + 113/(4608*HarmonicSums`Private`ExpVar^9) + 3085/(9216*HarmonicSums`Private`ExpVar^8) - 779/(2688*HarmonicSums`Private`ExpVar^7) + 43/(288*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^5) + 1/(96*HarmonicSums`Private`ExpVar^4) + 4*s6 + ((-1)^HarmonicSums`Private`ExpVar*ln2* (2007/(128*HarmonicSums`Private`ExpVar^10) + 187/(16*HarmonicSums`Private`ExpVar^9) - 59/(32*HarmonicSums`Private`ExpVar^8) - 55/(32*HarmonicSums`Private`ExpVar^7) + 3/(8*HarmonicSums`Private`ExpVar^6) + 7/(16*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (-629/(64*HarmonicSums`Private`ExpVar^10) - 39/(16*HarmonicSums`Private`ExpVar^9) + 11/(8*HarmonicSums`Private`ExpVar^8) + 13/(32*HarmonicSums`Private`ExpVar^7) - 11/(32*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)))*sinf + (-1)^HarmonicSums`Private`ExpVar*ln2* (-629/(64*HarmonicSums`Private`ExpVar^10) - 39/(16*HarmonicSums`Private`ExpVar^9) + 11/(8*HarmonicSums`Private`ExpVar^8) + 13/(32*HarmonicSums`Private`ExpVar^7) - 11/(32*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3))*sinf^2 - (li4half*z2)/2 + (ln2^4*z2)/12 + (1/(75*HarmonicSums`Private`ExpVar^9) - 1/(105*HarmonicSums`Private`ExpVar^7) + 1/(75*HarmonicSums`Private`ExpVar^5) - 1/(15*HarmonicSums`Private`ExpVar^3) + 1/(5*HarmonicSums`Private`ExpVar^2) - 2/(5*HarmonicSums`Private`ExpVar))* z2^2 - (45*z2^3)/112 + ln2*((-1)^HarmonicSums`Private`ExpVar* (340973/(26880*HarmonicSums`Private`ExpVar^10) - 6203/(640*HarmonicSums`Private`ExpVar^9) - 1649/(960*HarmonicSums`Private`ExpVar^8) + 241/(192*HarmonicSums`Private`ExpVar^7) + 11/(24*HarmonicSums`Private`ExpVar^6) - 1/(2*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* (-629/(64*HarmonicSums`Private`ExpVar^10) - 39/(16*HarmonicSums`Private`ExpVar^9) + 11/(8*HarmonicSums`Private`ExpVar^8) + 13/(32*HarmonicSums`Private`ExpVar^7) - 11/(32*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3))*z2) + ln2^2*(-(li4half/2) + (-1)^HarmonicSums`Private`ExpVar* (2007/(256*HarmonicSums`Private`ExpVar^10) + 187/(32*HarmonicSums`Private`ExpVar^9) - 59/(64*HarmonicSums`Private`ExpVar^8) - 55/(64*HarmonicSums`Private`ExpVar^7) + 3/(16*HarmonicSums`Private`ExpVar^6) + 7/(32*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) - (77*z2^2)/80) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-629/(192*HarmonicSums`Private`ExpVar^10) - 13/(16*HarmonicSums`Private`ExpVar^9) + 11/(24*HarmonicSums`Private`ExpVar^8) + 13/(96*HarmonicSums`Private`ExpVar^7) - 11/(96*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3)) + (7*z3)/16) - (31*z3^2)/16, S[2, -1, 1, 1, 1, HarmonicSums`Private`ExpVar] :> 4*li6half - ln2^6/144 + (-1)^HarmonicSums`Private`ExpVar* (116323/(5760*HarmonicSums`Private`ExpVar^10) - 14557/(11520*HarmonicSums`Private`ExpVar^9) - 413/(192*HarmonicSums`Private`ExpVar^8) - 11/(192*HarmonicSums`Private`ExpVar^7) + 17/(32*HarmonicSums`Private`ExpVar^6) - 1/(6*HarmonicSums`Private`ExpVar^5)) + li4half*(-(30*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(42*HarmonicSums`Private`ExpVar^7) - 1/(30*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) + s6 + (-1)^HarmonicSums`Private`ExpVar* (-2007/(256*HarmonicSums`Private`ExpVar^10) - 187/(32*HarmonicSums`Private`ExpVar^9) + 59/(64*HarmonicSums`Private`ExpVar^8) + 55/(64*HarmonicSums`Private`ExpVar^7) - 3/(16*HarmonicSums`Private`ExpVar^6) - 7/(32*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4))*sinf^2 + (-1)^HarmonicSums`Private`ExpVar* (629/(192*HarmonicSums`Private`ExpVar^10) + 13/(16*HarmonicSums`Private`ExpVar^9) - 11/(24*HarmonicSums`Private`ExpVar^8) - 13/(96*HarmonicSums`Private`ExpVar^7) + 11/(96*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3))*sinf^3 - (ln2^4*z2)/48 + (-li4half + (-1)^HarmonicSums`Private`ExpVar* (-2007/(256*HarmonicSums`Private`ExpVar^10) - 187/(32*HarmonicSums`Private`ExpVar^9) + 59/(64*HarmonicSums`Private`ExpVar^8) + 55/(64*HarmonicSums`Private`ExpVar^7) - 3/(16*HarmonicSums`Private`ExpVar^6) - 7/(32*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)))*z2 - (559*z2^3)/560 + sinf*((-1)^HarmonicSums`Private`ExpVar* (-340973/(26880*HarmonicSums`Private`ExpVar^10) + 6203/(640*HarmonicSums`Private`ExpVar^9) + 1649/(960*HarmonicSums`Private`ExpVar^8) - 241/(192*HarmonicSums`Private`ExpVar^7) - 11/(24*HarmonicSums`Private`ExpVar^6) + 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* (629/(64*HarmonicSums`Private`ExpVar^10) + 39/(16*HarmonicSums`Private`ExpVar^9) - 11/(8*HarmonicSums`Private`ExpVar^8) - 13/(32*HarmonicSums`Private`ExpVar^7) + 11/(32*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*z2) + ln2^2*(-(li4half/2) - (13*z2^2)/16) + (7*ln2^3*z3)/16 + (-1)^HarmonicSums`Private`ExpVar* (629/(96*HarmonicSums`Private`ExpVar^10) + 13/(8*HarmonicSums`Private`ExpVar^9) - 11/(12*HarmonicSums`Private`ExpVar^8) - 13/(48*HarmonicSums`Private`ExpVar^7) + 11/(48*HarmonicSums`Private`ExpVar^6) + 1/(12*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3))*z3 + z3^2/2 + ln2*(-li5half - (21*z2*z3)/16 + (155*z5)/32), S[2, 1, -1, -1, -1, HarmonicSums`Private`ExpVar] :> -9*li6half + ln2^6/80 + (-1)^HarmonicSums`Private`ExpVar* (-6077/(960*HarmonicSums`Private`ExpVar^10) + 24691/(7680*HarmonicSums`Private`ExpVar^9) + 487/(768*HarmonicSums`Private`ExpVar^8) - 355/(384*HarmonicSums`Private`ExpVar^7) + 23/(64*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5)) + li4half*(-(10*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(14*HarmonicSums`Private`ExpVar^7) - 1/(10*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^3) - 3/(2*HarmonicSums`Private`ExpVar^2) + 3/HarmonicSums`Private`ExpVar) - (3*s6)/2 + ln2^4*(-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar) - (11*z2)/16) + ((-9*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (2331/(256*HarmonicSums`Private`ExpVar^10) - 27/(32*HarmonicSums`Private`ExpVar^9) - 155/(128*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^7) + 9/(32*HarmonicSums`Private`ExpVar^6) - 7/(32*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)))*z2 + (1/(25*HarmonicSums`Private`ExpVar^9) - 1/(35*HarmonicSums`Private`ExpVar^7) + 1/(25*HarmonicSums`Private`ExpVar^5) - 1/(5*HarmonicSums`Private`ExpVar^3) + 3/(5*HarmonicSums`Private`ExpVar^2) - 6/(5*HarmonicSums`Private`ExpVar))* z2^2 + (23*z2^3)/7 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (2331/(256*HarmonicSums`Private`ExpVar^10) - 27/(32*HarmonicSums`Private`ExpVar^9) - 155/(128*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^7) + 9/(32*HarmonicSums`Private`ExpVar^6) - 7/(32*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)) + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (6*z2^2)/5) + ln2^3*(-7/(720*HarmonicSums`Private`ExpVar^10) + 11/(2100*HarmonicSums`Private`ExpVar^9) + 5/(1008*HarmonicSums`Private`ExpVar^8) - 19/(6615*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^6) + 7/(2700*HarmonicSums`Private`ExpVar^5) + 1/(144*HarmonicSums`Private`ExpVar^4) - 1/(216*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar) + (7*z3)/48) + (-7/(480*HarmonicSums`Private`ExpVar^10) + 11/(1400*HarmonicSums`Private`ExpVar^9) + 5/(672*HarmonicSums`Private`ExpVar^8) - 19/(4410*HarmonicSums`Private`ExpVar^7) - 1/(160*HarmonicSums`Private`ExpVar^6) + 7/(1800*HarmonicSums`Private`ExpVar^5) + 1/(96*HarmonicSums`Private`ExpVar^4) - 1/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z3 + (25*z3^2)/32 + sinf*(ln2^3*(-(180*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(252*HarmonicSums`Private`ExpVar^7) - 1/(180*HarmonicSums`Private`ExpVar^5) + 1/(36*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar)) + ln2*(-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 + (-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z3) + ln2*(-3*li5half + 7707997/(112896000*HarmonicSums`Private`ExpVar^10) + 413309/(6773760*HarmonicSums`Private`ExpVar^9) - 1113173/(16934400*HarmonicSums`Private`ExpVar^8) - 19043/(403200*HarmonicSums`Private`ExpVar^7) + 36589/(172800*HarmonicSums`Private`ExpVar^6) - 2057/(5760*HarmonicSums`Private`ExpVar^5) + 247/(576*HarmonicSums`Private`ExpVar^4) - 19/(48*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) + z2*(-7/(240*HarmonicSums`Private`ExpVar^10) + 11/(700*HarmonicSums`Private`ExpVar^9) + 5/(336*HarmonicSums`Private`ExpVar^8) - 19/(2205*HarmonicSums`Private`ExpVar^7) - 1/(80*HarmonicSums`Private`ExpVar^6) + 7/(900*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) - (31*z3)/8) + (-(15*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(21*HarmonicSums`Private`ExpVar^7) - 1/(15*HarmonicSums`Private`ExpVar^5) + 1/(3*HarmonicSums`Private`ExpVar^3) - HarmonicSums`Private`ExpVar^ (-2) + 2/HarmonicSums`Private`ExpVar)*z3 - (279*z5)/64), S[2, 1, -1, -1, 1, HarmonicSums`Private`ExpVar] :> -2*li6half - ln2^6/360 + li4half*(-(10*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(14*HarmonicSums`Private`ExpVar^7) - 1/(10*HarmonicSums`Private`ExpVar^5) + 1/(2*HarmonicSums`Private`ExpVar^3) - 3/(2*HarmonicSums`Private`ExpVar^2) + 3/HarmonicSums`Private`ExpVar) - 21979057/(2844979200*HarmonicSums`Private`ExpVar^10) + 30796847/(133358400*HarmonicSums`Private`ExpVar^9) - 439691767/(14224896000*HarmonicSums`Private`ExpVar^8) - 1742297/(9408000*HarmonicSums`Private`ExpVar^7) + 743537/(5184000*HarmonicSums`Private`ExpVar^6) + 1687/(10800*HarmonicSums`Private`ExpVar^5) - 3689/(6912*HarmonicSums`Private`ExpVar^4) + 109/(144*HarmonicSums`Private`ExpVar^3) - 5/(8*HarmonicSums`Private`ExpVar^2) - (3*s6)/4 + ln2^4*(-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar) - z2/3) + (-1)^HarmonicSums`Private`ExpVar* (-2331/(256*HarmonicSums`Private`ExpVar^10) + 27/(32*HarmonicSums`Private`ExpVar^9) + 155/(128*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^7) - 9/(32*HarmonicSums`Private`ExpVar^6) + 7/(32*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4))*z2 + (6*z2^3)/35 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (2331/(256*HarmonicSums`Private`ExpVar^10) - 27/(32*HarmonicSums`Private`ExpVar^9) - 155/(128*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^7) + 9/(32*HarmonicSums`Private`ExpVar^6) - 7/(32*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)) + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 - (11*z2^2)/80) + ln2^3*(-7/(720*HarmonicSums`Private`ExpVar^10) + 11/(2100*HarmonicSums`Private`ExpVar^9) + 5/(1008*HarmonicSums`Private`ExpVar^8) - 19/(6615*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^6) + 7/(2700*HarmonicSums`Private`ExpVar^5) + 1/(144*HarmonicSums`Private`ExpVar^4) - 1/(216*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar) + (7*z3)/48) + ln2*z2*(-7/(240*HarmonicSums`Private`ExpVar^10) + 11/(700*HarmonicSums`Private`ExpVar^9) + 5/(336*HarmonicSums`Private`ExpVar^8) - 19/(2205*HarmonicSums`Private`ExpVar^7) - 1/(80*HarmonicSums`Private`ExpVar^6) + 7/(900*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) + (7*z3)/16) + (49/(480*HarmonicSums`Private`ExpVar^10) - 11/(200*HarmonicSums`Private`ExpVar^9) - 5/(96*HarmonicSums`Private`ExpVar^8) + 19/(630*HarmonicSums`Private`ExpVar^7) + 7/(160*HarmonicSums`Private`ExpVar^6) - 49/(1800*HarmonicSums`Private`ExpVar^5) - 7/(96*HarmonicSums`Private`ExpVar^4) + 7/(144*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2) - 7/(4*HarmonicSums`Private`ExpVar))*z3 + (137*z3^2)/64 + sinf*(ln2^3*(-(180*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(252*HarmonicSums`Private`ExpVar^7) - 1/(180*HarmonicSums`Private`ExpVar^5) + 1/(36*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar)) - 7707997/(112896000*HarmonicSums`Private`ExpVar^10) - 413309/(6773760*HarmonicSums`Private`ExpVar^9) + 1113173/(16934400*HarmonicSums`Private`ExpVar^8) + 19043/(403200*HarmonicSums`Private`ExpVar^7) - 36589/(172800*HarmonicSums`Private`ExpVar^6) + 2057/(5760*HarmonicSums`Private`ExpVar^5) - 247/(576*HarmonicSums`Private`ExpVar^4) + 19/(48*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + ln2*(-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 + (7/(120*HarmonicSums`Private`ExpVar^9) - 1/(24*HarmonicSums`Private`ExpVar^7) + 7/(120*HarmonicSums`Private`ExpVar^5) - 7/(24*HarmonicSums`Private`ExpVar^3) + 7/(8*HarmonicSums`Private`ExpVar^2) - 7/(4*HarmonicSums`Private`ExpVar))*z3), S[2, 1, -1, 1, -1, HarmonicSums`Private`ExpVar] :> -8*li6half + (37*ln2^6)/720 - 39071/(122880*HarmonicSums`Private`ExpVar^10) + 112121/(1658880*HarmonicSums`Private`ExpVar^9) + 827/(4608*HarmonicSums`Private`ExpVar^8) - 8369/(32256*HarmonicSums`Private`ExpVar^7) + 1013/(4608*HarmonicSums`Private`ExpVar^6) - 179/(1280*HarmonicSums`Private`ExpVar^5) + 13/(192*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3) - (5*s6)/4 + ln2^4*(-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar) - (13*z2)/48) + (3*li4half*z2)/2 + (-(600*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(840*HarmonicSums`Private`ExpVar^7) - 1/(600*HarmonicSums`Private`ExpVar^5) + 1/(120*HarmonicSums`Private`ExpVar^3) - 1/(40*HarmonicSums`Private`ExpVar^2) + 1/(20*HarmonicSums`Private`ExpVar))*z2^2 + (55*z2^3)/56 + ln2^2*((3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (-2331/(256*HarmonicSums`Private`ExpVar^10) + 27/(32*HarmonicSums`Private`ExpVar^9) + 155/(128*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^7) - 9/(32*HarmonicSums`Private`ExpVar^6) + 7/(32*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4)) + (1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2 + (17*z2^2)/16) + ln2*((-1)^HarmonicSums`Private`ExpVar* (6583/(256*HarmonicSums`Private`ExpVar^10) + 357/(128*HarmonicSums`Private`ExpVar^9) - 197/(64*HarmonicSums`Private`ExpVar^8) - 3/(16*HarmonicSums`Private`ExpVar^7) + 5/(8*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5)) + z2*(7/(240*HarmonicSums`Private`ExpVar^10) - 11/(700*HarmonicSums`Private`ExpVar^9) - 5/(336*HarmonicSums`Private`ExpVar^8) + 19/(2205*HarmonicSums`Private`ExpVar^7) + 1/(80*HarmonicSums`Private`ExpVar^6) - 7/(900*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) - (5*z3)/8)) + ln2^3*(-7/(720*HarmonicSums`Private`ExpVar^10) + 11/(2100*HarmonicSums`Private`ExpVar^9) + 5/(1008*HarmonicSums`Private`ExpVar^8) - 19/(6615*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^6) + 7/(2700*HarmonicSums`Private`ExpVar^5) + 1/(144*HarmonicSums`Private`ExpVar^4) - 1/(216*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar) + (7*z3)/48) + (7/(960*HarmonicSums`Private`ExpVar^10) - 11/(2800*HarmonicSums`Private`ExpVar^9) - 5/(1344*HarmonicSums`Private`ExpVar^8) + 19/(8820*HarmonicSums`Private`ExpVar^7) + 1/(320*HarmonicSums`Private`ExpVar^6) - 7/(3600*HarmonicSums`Private`ExpVar^5) - 1/(192*HarmonicSums`Private`ExpVar^4) + 1/(288*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z3 + (37*z3^2)/64 + sinf*(ln2^3*(-(180*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(252*HarmonicSums`Private`ExpVar^7) - 1/(180*HarmonicSums`Private`ExpVar^5) + 1/(36*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar)) + ln2*((-1)^HarmonicSums`Private`ExpVar* (-2331/(128*HarmonicSums`Private`ExpVar^10) + 27/(16*HarmonicSums`Private`ExpVar^9) + 155/(64*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^7) - 9/(16*HarmonicSums`Private`ExpVar^6) + 7/(16*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) + (1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2) + (1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z3), S[2, 1, -1, 1, 1, HarmonicSums`Private`ExpVar] :> -11*li6half + ln2^6/18 + (-1)^HarmonicSums`Private`ExpVar* (34087/(3840*HarmonicSums`Private`ExpVar^10) + 24053/(3840*HarmonicSums`Private`ExpVar^9) - 391/(384*HarmonicSums`Private`ExpVar^8) - 173/(192*HarmonicSums`Private`ExpVar^7) + 7/(16*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5)) - (17*s6)/4 + (-1)^HarmonicSums`Private`ExpVar* (2331/(256*HarmonicSums`Private`ExpVar^10) - 27/(32*HarmonicSums`Private`ExpVar^9) - 155/(128*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^7) + 9/(32*HarmonicSums`Private`ExpVar^6) - 7/(32*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4))*sinf^2 + ln2^4*(-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar) - (23*z2)/48) + ((-3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (2331/(256*HarmonicSums`Private`ExpVar^10) - 27/(32*HarmonicSums`Private`ExpVar^9) - 155/(128*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^7) + 9/(32*HarmonicSums`Private`ExpVar^6) - 7/(32*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)))*z2 + (1/(600*HarmonicSums`Private`ExpVar^9) - 1/(840*HarmonicSums`Private`ExpVar^7) + 1/(600*HarmonicSums`Private`ExpVar^5) - 1/(120*HarmonicSums`Private`ExpVar^3) + 1/(40*HarmonicSums`Private`ExpVar^2) - 1/(20*HarmonicSums`Private`ExpVar))*z2^2 + (25*z2^3)/14 + ln2^2*((3*li4half)/2 + (1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2 + (147*z2^2)/80) + ln2^3*(-7/(720*HarmonicSums`Private`ExpVar^10) + 11/(2100*HarmonicSums`Private`ExpVar^9) + 5/(1008*HarmonicSums`Private`ExpVar^8) - 19/(6615*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^6) + 7/(2700*HarmonicSums`Private`ExpVar^5) + 1/(144*HarmonicSums`Private`ExpVar^4) - 1/(216*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar) + (7*z3)/48) + (-49/(960*HarmonicSums`Private`ExpVar^10) + 11/(400*HarmonicSums`Private`ExpVar^9) + 5/(192*HarmonicSums`Private`ExpVar^8) - 19/(1260*HarmonicSums`Private`ExpVar^7) - 7/(320*HarmonicSums`Private`ExpVar^6) + 49/(3600*HarmonicSums`Private`ExpVar^5) + 7/(192*HarmonicSums`Private`ExpVar^4) - 7/(288*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(8*HarmonicSums`Private`ExpVar))*z3 + (81*z3^2)/64 + sinf*((-1)^HarmonicSums`Private`ExpVar* (-6583/(256*HarmonicSums`Private`ExpVar^10) - 357/(128*HarmonicSums`Private`ExpVar^9) + 197/(64*HarmonicSums`Private`ExpVar^8) + 3/(16*HarmonicSums`Private`ExpVar^7) - 5/(8*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5)) + ln2^3*(-(180*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(252*HarmonicSums`Private`ExpVar^7) - 1/(180*HarmonicSums`Private`ExpVar^5) + 1/(36*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar)) + ln2*(1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2 + (-7/(240*HarmonicSums`Private`ExpVar^9) + 1/(48*HarmonicSums`Private`ExpVar^7) - 7/(240*HarmonicSums`Private`ExpVar^5) + 7/(48*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2) + 7/(8*HarmonicSums`Private`ExpVar))*z3) + ln2*(-li5half + z2*(7/(240*HarmonicSums`Private`ExpVar^10) - 11/(700*HarmonicSums`Private`ExpVar^9) - 5/(336*HarmonicSums`Private`ExpVar^8) + 19/(2205*HarmonicSums`Private`ExpVar^7) + 1/(80*HarmonicSums`Private`ExpVar^6) - 7/(900*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) - (31*z3)/16) + (-(30*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(42*HarmonicSums`Private`ExpVar^7) - 1/(30*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1))*z3 - (31*z5)/64), S[2, 1, 1, -1, -1, HarmonicSums`Private`ExpVar] :> -6*li6half + ln2^6/80 + li4half*(1/(30*HarmonicSums`Private`ExpVar^9) - 1/(42*HarmonicSums`Private`ExpVar^7) + 1/(30*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + ln2^3*(7/(360*HarmonicSums`Private`ExpVar^10) - 11/(1050*HarmonicSums`Private`ExpVar^9) - 5/(504*HarmonicSums`Private`ExpVar^8) + 38/(6615*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^6) - 7/(1350*HarmonicSums`Private`ExpVar^5) - 1/(72*HarmonicSums`Private`ExpVar^4) + 1/(108*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(3*HarmonicSums`Private`ExpVar)) - 26390489137/(284497920000*HarmonicSums`Private`ExpVar^10) + 85212671/(1896652800*HarmonicSums`Private`ExpVar^9) + 485639393/(7112448000*HarmonicSums`Private`ExpVar^8) - 4879741/(24192000*HarmonicSums`Private`ExpVar^7) + 3441743/(10368000*HarmonicSums`Private`ExpVar^6) - 5947/(13824*HarmonicSums`Private`ExpVar^5) + 1601/(3456*HarmonicSums`Private`ExpVar^4) - 13/(32*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - (9*s6)/4 + ln2^4*(1/(180*HarmonicSums`Private`ExpVar^9) - 1/(252*HarmonicSums`Private`ExpVar^7) + 1/(180*HarmonicSums`Private`ExpVar^5) - 1/(36*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar) + (13*z2)/48) + (li4half/2 - 429/(11200*HarmonicSums`Private`ExpVar^10) - 329171/(15876000*HarmonicSums`Private`ExpVar^9) + 1243/(70560*HarmonicSums`Private`ExpVar^8) + 137353/(7408800*HarmonicSums`Private`ExpVar^7) - 21/(1600*HarmonicSums`Private`ExpVar^6) - 5743/(108000*HarmonicSums`Private`ExpVar^5) + 83/(576*HarmonicSums`Private`ExpVar^4) - 97/(432*HarmonicSums`Private`ExpVar^3) + 5/(16*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2 + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))* z2^2 + (44*z2^3)/35 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-1183/(256*HarmonicSums`Private`ExpVar^10) + 501/(128*HarmonicSums`Private`ExpVar^9) + 5/(32*HarmonicSums`Private`ExpVar^8) - 51/(64*HarmonicSums`Private`ExpVar^7) + 11/(32*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5)) + (7/(240*HarmonicSums`Private`ExpVar^10) - 11/(700*HarmonicSums`Private`ExpVar^9) - 5/(336*HarmonicSums`Private`ExpVar^8) + 19/(2205*HarmonicSums`Private`ExpVar^7) + 1/(80*HarmonicSums`Private`ExpVar^6) - 7/(900*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2) + sinf^2*(ln2^2*(1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar)) + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2) + ln2^2*(li4half/2 - 429/(11200*HarmonicSums`Private`ExpVar^10) - 329171/(15876000*HarmonicSums`Private`ExpVar^9) + 1243/(70560*HarmonicSums`Private`ExpVar^8) + 137353/(7408800*HarmonicSums`Private`ExpVar^7) - 21/(1600*HarmonicSums`Private`ExpVar^6) - 5743/(108000*HarmonicSums`Private`ExpVar^5) + 83/(576*HarmonicSums`Private`ExpVar^4) - 97/(432*HarmonicSums`Private`ExpVar^3) + 5/(16*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (27*z2^2)/16) + (-49/(960*HarmonicSums`Private`ExpVar^10) + 11/(400*HarmonicSums`Private`ExpVar^9) + 5/(192*HarmonicSums`Private`ExpVar^8) - 19/(1260*HarmonicSums`Private`ExpVar^7) - 7/(320*HarmonicSums`Private`ExpVar^6) + 49/(3600*HarmonicSums`Private`ExpVar^5) + 7/(192*HarmonicSums`Private`ExpVar^4) - 7/(288*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(8*HarmonicSums`Private`ExpVar))*z3 - z3^2/32 + sinf*(ln2^2*(7/(240*HarmonicSums`Private`ExpVar^10) - 11/(700*HarmonicSums`Private`ExpVar^9) - 5/(336*HarmonicSums`Private`ExpVar^8) + 19/(2205*HarmonicSums`Private`ExpVar^7) + 1/(80*HarmonicSums`Private`ExpVar^6) - 7/(900*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + ln2^3*(1/(90*HarmonicSums`Private`ExpVar^9) - 1/(126*HarmonicSums`Private`ExpVar^7) + 1/(90*HarmonicSums`Private`ExpVar^5) - 1/(18*HarmonicSums`Private`ExpVar^3) + 1/(6*HarmonicSums`Private`ExpVar^2) - 1/(3*HarmonicSums`Private`ExpVar)) + (7/(240*HarmonicSums`Private`ExpVar^10) - 11/(700*HarmonicSums`Private`ExpVar^9) - 5/(336*HarmonicSums`Private`ExpVar^8) + 19/(2205*HarmonicSums`Private`ExpVar^7) + 1/(80*HarmonicSums`Private`ExpVar^6) - 7/(900*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2 + ln2*(1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2 + (-7/(240*HarmonicSums`Private`ExpVar^9) + 1/(48*HarmonicSums`Private`ExpVar^7) - 7/(240*HarmonicSums`Private`ExpVar^5) + 7/(48*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2) + 7/(8*HarmonicSums`Private`ExpVar))*z3), S[2, 1, 1, -1, 1, HarmonicSums`Private`ExpVar] :> 3*li6half + (-1)^HarmonicSums`Private`ExpVar* (-795/(64*HarmonicSums`Private`ExpVar^10) + 831/(256*HarmonicSums`Private`ExpVar^9) + 127/(128*HarmonicSums`Private`ExpVar^8) - 43/(64*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6)) + li4half*(1/(30*HarmonicSums`Private`ExpVar^9) - 1/(42*HarmonicSums`Private`ExpVar^7) + 1/(30*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + ln2^3*(7/(360*HarmonicSums`Private`ExpVar^10) - 11/(1050*HarmonicSums`Private`ExpVar^9) - 5/(504*HarmonicSums`Private`ExpVar^8) + 38/(6615*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^6) - 7/(1350*HarmonicSums`Private`ExpVar^5) - 1/(72*HarmonicSums`Private`ExpVar^4) + 1/(108*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(3*HarmonicSums`Private`ExpVar)) - 2*s6 + ln2^4*(1/(180*HarmonicSums`Private`ExpVar^9) - 1/(252*HarmonicSums`Private`ExpVar^7) + 1/(180*HarmonicSums`Private`ExpVar^5) - 1/(36*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar) + (7*z2)/24) + (li4half + 429/(11200*HarmonicSums`Private`ExpVar^10) + 329171/(15876000*HarmonicSums`Private`ExpVar^9) - 1243/(70560*HarmonicSums`Private`ExpVar^8) - 137353/(7408800*HarmonicSums`Private`ExpVar^7) + 21/(1600*HarmonicSums`Private`ExpVar^6) + 5743/(108000*HarmonicSums`Private`ExpVar^5) - 83/(576*HarmonicSums`Private`ExpVar^4) + 97/(432*HarmonicSums`Private`ExpVar^3) - 5/(16*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 + (-13/(600*HarmonicSums`Private`ExpVar^9) + 13/(840*HarmonicSums`Private`ExpVar^7) - 13/(600*HarmonicSums`Private`ExpVar^5) + 13/(120*HarmonicSums`Private`ExpVar^3) - 13/(40*HarmonicSums`Private`ExpVar^2) + 13/(20*HarmonicSums`Private`ExpVar))*z2^2 - (71*z2^3)/35 + sinf^2*(ln2^2*(1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar)) + (-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2) + ln2^2*(li4half/2 - 429/(11200*HarmonicSums`Private`ExpVar^10) - 329171/(15876000*HarmonicSums`Private`ExpVar^9) + 1243/(70560*HarmonicSums`Private`ExpVar^8) + 137353/(7408800*HarmonicSums`Private`ExpVar^7) - 21/(1600*HarmonicSums`Private`ExpVar^6) - 5743/(108000*HarmonicSums`Private`ExpVar^5) + 83/(576*HarmonicSums`Private`ExpVar^4) - 97/(432*HarmonicSums`Private`ExpVar^3) + 5/(16*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) + (-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (11*z2^2)/20) + (7/(960*HarmonicSums`Private`ExpVar^10) - 11/(2800*HarmonicSums`Private`ExpVar^9) - 5/(1344*HarmonicSums`Private`ExpVar^8) + 19/(8820*HarmonicSums`Private`ExpVar^7) + 1/(320*HarmonicSums`Private`ExpVar^6) - 7/(3600*HarmonicSums`Private`ExpVar^5) - 1/(192*HarmonicSums`Private`ExpVar^4) + 1/(288*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z3 + (3*z3^2)/4 + sinf*((-1)^HarmonicSums`Private`ExpVar* (1183/(256*HarmonicSums`Private`ExpVar^10) - 501/(128*HarmonicSums`Private`ExpVar^9) - 5/(32*HarmonicSums`Private`ExpVar^8) + 51/(64*HarmonicSums`Private`ExpVar^7) - 11/(32*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^5)) + ln2^2*(7/(240*HarmonicSums`Private`ExpVar^10) - 11/(700*HarmonicSums`Private`ExpVar^9) - 5/(336*HarmonicSums`Private`ExpVar^8) + 19/(2205*HarmonicSums`Private`ExpVar^7) + 1/(80*HarmonicSums`Private`ExpVar^6) - 7/(900*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + ln2^3*(1/(90*HarmonicSums`Private`ExpVar^9) - 1/(126*HarmonicSums`Private`ExpVar^7) + 1/(90*HarmonicSums`Private`ExpVar^5) - 1/(18*HarmonicSums`Private`ExpVar^3) + 1/(6*HarmonicSums`Private`ExpVar^2) - 1/(3*HarmonicSums`Private`ExpVar)) + ln2*(-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 + (-7/(240*HarmonicSums`Private`ExpVar^10) + 11/(700*HarmonicSums`Private`ExpVar^9) + 5/(336*HarmonicSums`Private`ExpVar^8) - 19/(2205*HarmonicSums`Private`ExpVar^7) - 1/(80*HarmonicSums`Private`ExpVar^6) + 7/(900*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 + (1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z3) + ln2*(3*li5half + (1/(30*HarmonicSums`Private`ExpVar^9) - 1/(42*HarmonicSums`Private`ExpVar^7) + 1/(30*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1))*z3 + z2*(-7/(240*HarmonicSums`Private`ExpVar^10) + 11/(700*HarmonicSums`Private`ExpVar^9) + 5/(336*HarmonicSums`Private`ExpVar^8) - 19/(2205*HarmonicSums`Private`ExpVar^7) - 1/(80*HarmonicSums`Private`ExpVar^6) + 7/(900*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) + (3*z3)/2) + (31*z5)/32), S[2, 1, 1, 1, -1, HarmonicSums`Private`ExpVar] :> 5*li6half - ln2^6/720 + (-1)^HarmonicSums`Private`ExpVar* (-525/(128*HarmonicSums`Private`ExpVar^10) - 283/(256*HarmonicSums`Private`ExpVar^9) + 115/(128*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^7) + 1/(32*HarmonicSums`Private`ExpVar^6)) + ln2^3*(-7/(720*HarmonicSums`Private`ExpVar^10) + 11/(2100*HarmonicSums`Private`ExpVar^9) + 5/(1008*HarmonicSums`Private`ExpVar^8) - 19/(6615*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^6) + 7/(2700*HarmonicSums`Private`ExpVar^5) + 1/(144*HarmonicSums`Private`ExpVar^4) - 1/(216*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar)) + (ln2^2*(-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar)) + ln2*(-7/(240*HarmonicSums`Private`ExpVar^10) + 11/(700*HarmonicSums`Private`ExpVar^9) + 5/(336*HarmonicSums`Private`ExpVar^8) - 19/(2205*HarmonicSums`Private`ExpVar^7) - 1/(80*HarmonicSums`Private`ExpVar^6) + 7/(900*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)))*sinf^2 + ln2*(-(180*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(252*HarmonicSums`Private`ExpVar^7) - 1/(180*HarmonicSums`Private`ExpVar^5) + 1/(36*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar))*sinf^3 + ln2^4*(-(720*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(1008*HarmonicSums`Private`ExpVar^7) - 1/(720*HarmonicSums`Private`ExpVar^5) + 1/(144*HarmonicSums`Private`ExpVar^3) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar) - z2/12) - (8*z2^3)/7 + ln2^2*(429/(11200*HarmonicSums`Private`ExpVar^10) + 329171/(15876000*HarmonicSums`Private`ExpVar^9) - 1243/(70560*HarmonicSums`Private`ExpVar^8) - 137353/(7408800*HarmonicSums`Private`ExpVar^7) + 21/(1600*HarmonicSums`Private`ExpVar^6) + 5743/(108000*HarmonicSums`Private`ExpVar^5) - 83/(576*HarmonicSums`Private`ExpVar^4) + 97/(432*HarmonicSums`Private`ExpVar^3) - 5/(16*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) + (-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - (6*z2^2)/5) + sinf*(ln2^3*(-(180*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(252*HarmonicSums`Private`ExpVar^7) - 1/(180*HarmonicSums`Private`ExpVar^5) + 1/(36*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar)) + ln2^2*(-7/(240*HarmonicSums`Private`ExpVar^10) + 11/(700*HarmonicSums`Private`ExpVar^9) + 5/(336*HarmonicSums`Private`ExpVar^8) - 19/(2205*HarmonicSums`Private`ExpVar^7) - 1/(80*HarmonicSums`Private`ExpVar^6) + 7/(900*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + ln2*(429/(5600*HarmonicSums`Private`ExpVar^10) + 329171/(7938000*HarmonicSums`Private`ExpVar^9) - 1243/(35280*HarmonicSums`Private`ExpVar^8) - 137353/(3704400*HarmonicSums`Private`ExpVar^7) + 21/(800*HarmonicSums`Private`ExpVar^6) + 5743/(54000*HarmonicSums`Private`ExpVar^5) - 83/(288*HarmonicSums`Private`ExpVar^4) + 97/(216*HarmonicSums`Private`ExpVar^3) - 5/(8*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1) + (-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2)) + ln2*(li5half + 951241/(15876000*HarmonicSums`Private`ExpVar^10) - 249423079/(5000940000*HarmonicSums`Private`ExpVar^9) - 956807/(19756800*HarmonicSums`Private`ExpVar^8) + 44711503/(1555848000*HarmonicSums`Private`ExpVar^7) + 45103/(432000*HarmonicSums`Private`ExpVar^6) - 626209/(3240000*HarmonicSums`Private`ExpVar^5) + 367/(3456*HarmonicSums`Private`ExpVar^4) + 221/(1296*HarmonicSums`Private`ExpVar^3) - 9/(16*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1) + (-7/(240*HarmonicSums`Private`ExpVar^10) + 11/(700*HarmonicSums`Private`ExpVar^9) + 5/(336*HarmonicSums`Private`ExpVar^8) - 19/(2205*HarmonicSums`Private`ExpVar^7) - 1/(80*HarmonicSums`Private`ExpVar^6) + 7/(900*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 + (-(90*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(126*HarmonicSums`Private`ExpVar^7) - 1/(90*HarmonicSums`Private`ExpVar^5) + 1/(18*HarmonicSums`Private`ExpVar^3) - 1/(6*HarmonicSums`Private`ExpVar^2) + 1/(3*HarmonicSums`Private`ExpVar))*z3), S[2, 1, 1, 1, 1, HarmonicSums`Private`ExpVar] :> 1855487833/(32006016000*HarmonicSums`Private`ExpVar^10) + 1620354623507/(25204737600000*HarmonicSums`Private`ExpVar^9) - 1411200517/(49787136000*HarmonicSums`Private`ExpVar^8) - 76829044427/(653456160000*HarmonicSums`Private`ExpVar^7) + 1825013/(8640000*HarmonicSums`Private`ExpVar^6) - 38371117/(194400000*HarmonicSums`Private`ExpVar^5) + 6803/(41472*HarmonicSums`Private`ExpVar^4) - 1927/(7776*HarmonicSums`Private`ExpVar^3) + 17/(32*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1) + (7/(720*HarmonicSums`Private`ExpVar^10) - 11/(2100*HarmonicSums`Private`ExpVar^9) - 5/(1008*HarmonicSums`Private`ExpVar^8) + 19/(6615*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^6) - 7/(2700*HarmonicSums`Private`ExpVar^5) - 1/(144*HarmonicSums`Private`ExpVar^4) + 1/(216*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar))*sinf^3 + (1/(720*HarmonicSums`Private`ExpVar^9) - 1/(1008*HarmonicSums`Private`ExpVar^7) + 1/(720*HarmonicSums`Private`ExpVar^5) - 1/(144*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar))*sinf^4 + (-429/(11200*HarmonicSums`Private`ExpVar^10) - 329171/(15876000*HarmonicSums`Private`ExpVar^9) + 1243/(70560*HarmonicSums`Private`ExpVar^8) + 137353/(7408800*HarmonicSums`Private`ExpVar^7) - 21/(1600*HarmonicSums`Private`ExpVar^6) - 5743/(108000*HarmonicSums`Private`ExpVar^5) + 83/(576*HarmonicSums`Private`ExpVar^4) - 97/(432*HarmonicSums`Private`ExpVar^3) + 5/(16*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2 + (3/(400*HarmonicSums`Private`ExpVar^9) - 3/(560*HarmonicSums`Private`ExpVar^7) + 3/(400*HarmonicSums`Private`ExpVar^5) - 3/(80*HarmonicSums`Private`ExpVar^3) + 9/(80*HarmonicSums`Private`ExpVar^2) - 9/(40*HarmonicSums`Private`ExpVar))*z2^2 + (8*z2^3)/7 + sinf^2*(-429/(11200*HarmonicSums`Private`ExpVar^10) - 329171/(15876000*HarmonicSums`Private`ExpVar^9) + 1243/(70560*HarmonicSums`Private`ExpVar^8) + 137353/(7408800*HarmonicSums`Private`ExpVar^7) - 21/(1600*HarmonicSums`Private`ExpVar^6) - 5743/(108000*HarmonicSums`Private`ExpVar^5) + 83/(576*HarmonicSums`Private`ExpVar^4) - 97/(432*HarmonicSums`Private`ExpVar^3) + 5/(16*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2) + (7/(360*HarmonicSums`Private`ExpVar^10) - 11/(1050*HarmonicSums`Private`ExpVar^9) - 5/(504*HarmonicSums`Private`ExpVar^8) + 38/(6615*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^6) - 7/(1350*HarmonicSums`Private`ExpVar^5) - 1/(72*HarmonicSums`Private`ExpVar^4) + 1/(108*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(3*HarmonicSums`Private`ExpVar))*z3 + sinf*(-951241/(15876000*HarmonicSums`Private`ExpVar^10) + 249423079/(5000940000*HarmonicSums`Private`ExpVar^9) + 956807/(19756800*HarmonicSums`Private`ExpVar^8) - 44711503/(1555848000*HarmonicSums`Private`ExpVar^7) - 45103/(432000*HarmonicSums`Private`ExpVar^6) + 626209/(3240000*HarmonicSums`Private`ExpVar^5) - 367/(3456*HarmonicSums`Private`ExpVar^4) - 221/(1296*HarmonicSums`Private`ExpVar^3) + 9/(16*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1) + (7/(240*HarmonicSums`Private`ExpVar^10) - 11/(700*HarmonicSums`Private`ExpVar^9) - 5/(336*HarmonicSums`Private`ExpVar^8) + 19/(2205*HarmonicSums`Private`ExpVar^7) + 1/(80*HarmonicSums`Private`ExpVar^6) - 7/(900*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2 + (1/(90*HarmonicSums`Private`ExpVar^9) - 1/(126*HarmonicSums`Private`ExpVar^7) + 1/(90*HarmonicSums`Private`ExpVar^5) - 1/(18*HarmonicSums`Private`ExpVar^3) + 1/(6*HarmonicSums`Private`ExpVar^2) - 1/(3*HarmonicSums`Private`ExpVar))*z3), S[-1, -2, -1, -1, -1, HarmonicSums`Private`ExpVar] :> 48*li6half - ln2^6/40 + (-1)^HarmonicSums`Private`ExpVar* (4985473/(1935360*HarmonicSums`Private`ExpVar^10) + 492977/(322560*HarmonicSums`Private`ExpVar^9) - 13759/(40320*HarmonicSums`Private`ExpVar^8) - 6287/(11520*HarmonicSums`Private`ExpVar^7) + 1853/(3840*HarmonicSums`Private`ExpVar^6) - 77/(384*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(155/(4*HarmonicSums`Private`ExpVar^10) - 85/(16*HarmonicSums`Private`ExpVar^8) + 5/(4*HarmonicSums`Private`ExpVar^6) - 5/(8*HarmonicSums`Private`ExpVar^4) + 5/(4*HarmonicSums`Private`ExpVar^2) - 5/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-31/(96*HarmonicSums`Private`ExpVar^10) + 17/(384*HarmonicSums`Private`ExpVar^8) - 1/(96*HarmonicSums`Private`ExpVar^6) + 1/(192*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar)) + 26*s6 + (11*ln2^4*z2)/12 - (186*z2^3)/35 + ln2^3*(-173/(240*HarmonicSums`Private`ExpVar^10) - 1/(15*HarmonicSums`Private`ExpVar^9) + 19/(144*HarmonicSums`Private`ExpVar^8) + 5/(252*HarmonicSums`Private`ExpVar^7) - 7/(144*HarmonicSums`Private`ExpVar^6) - 1/(90*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 5/(72*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-217/(48*HarmonicSums`Private`ExpVar^10) + 119/(192*HarmonicSums`Private`ExpVar^8) - 7/(48*HarmonicSums`Private`ExpVar^6) + 7/(96*HarmonicSums`Private`ExpVar^4) - 7/(48*HarmonicSums`Private`ExpVar^2) + 7/(24*HarmonicSums`Private`ExpVar))*z2 - (7*z3)/16) + (-173/(160*HarmonicSums`Private`ExpVar^10) - 1/(10*HarmonicSums`Private`ExpVar^9) + 19/(96*HarmonicSums`Private`ExpVar^8) + 5/(168*HarmonicSums`Private`ExpVar^7) - 7/(96*HarmonicSums`Private`ExpVar^6) - 1/(60*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z3 - (333*z3^2)/32 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-11/(160*HarmonicSums`Private`ExpVar^10) - 883/(420*HarmonicSums`Private`ExpVar^9) + 1/(896*HarmonicSums`Private`ExpVar^8) + 383/(960*HarmonicSums`Private`ExpVar^7) + 7/(480*HarmonicSums`Private`ExpVar^6) - 11/(48*HarmonicSums`Private`ExpVar^5) + 17/(96*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) - (161*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (-651/(64*HarmonicSums`Private`ExpVar^10) + 357/(256*HarmonicSums`Private`ExpVar^8) - 21/(64*HarmonicSums`Private`ExpVar^6) + 21/(128*HarmonicSums`Private`ExpVar^4) - 21/(64*HarmonicSums`Private`ExpVar^2) + 21/(32*HarmonicSums`Private`ExpVar))*z3) + z2*((-1)^HarmonicSums`Private`ExpVar* (-11/(160*HarmonicSums`Private`ExpVar^10) - 883/(420*HarmonicSums`Private`ExpVar^9) + 1/(896*HarmonicSums`Private`ExpVar^8) + 383/(960*HarmonicSums`Private`ExpVar^7) + 7/(480*HarmonicSums`Private`ExpVar^6) - 11/(48*HarmonicSums`Private`ExpVar^5) + 17/(96*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-837/(64*HarmonicSums`Private`ExpVar^10) + 459/(256*HarmonicSums`Private`ExpVar^8) - 27/(64*HarmonicSums`Private`ExpVar^6) + 27/(128*HarmonicSums`Private`ExpVar^4) - 27/(64*HarmonicSums`Private`ExpVar^2) + 27/(32*HarmonicSums`Private`ExpVar))*z3) + ln2*(11*li5half + 826519/(268800*HarmonicSums`Private`ExpVar^10) - 66671/(120960*HarmonicSums`Private`ExpVar^9) - 2939/(4608*HarmonicSums`Private`ExpVar^8) + 1471/(13440*HarmonicSums`Private`ExpVar^7) + 479/(1152*HarmonicSums`Private`ExpVar^6) - 221/(480*HarmonicSums`Private`ExpVar^5) + 17/(64*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (341/(32*HarmonicSums`Private`ExpVar^10) - 187/(128*HarmonicSums`Private`ExpVar^8) + 11/(32*HarmonicSums`Private`ExpVar^6) - 11/(64*HarmonicSums`Private`ExpVar^4) + 11/(32*HarmonicSums`Private`ExpVar^2) - 11/(16*HarmonicSums`Private`ExpVar))*z2^2 + z2*(-173/(80*HarmonicSums`Private`ExpVar^10) - 1/(5*HarmonicSums`Private`ExpVar^9) + 19/(48*HarmonicSums`Private`ExpVar^8) + 5/(84*HarmonicSums`Private`ExpVar^7) - 7/(48*HarmonicSums`Private`ExpVar^6) - 1/(30*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - (15*z3)/16) - (845*z5)/64) + (-1)^HarmonicSums`Private`ExpVar* (-3131/(256*HarmonicSums`Private`ExpVar^10) + 1717/(1024*HarmonicSums`Private`ExpVar^8) - 101/(256*HarmonicSums`Private`ExpVar^6) + 101/(512*HarmonicSums`Private`ExpVar^4) - 101/(256*HarmonicSums`Private`ExpVar^2) + 101/(128*HarmonicSums`Private`ExpVar))*z5, S[-1, -2, -1, -1, 1, HarmonicSums`Private`ExpVar] :> 42*li6half + (7*ln2^6)/240 + (-1)^HarmonicSums`Private`ExpVar*li5half* (341/(4*HarmonicSums`Private`ExpVar^10) - 187/(16*HarmonicSums`Private`ExpVar^8) + 11/(4*HarmonicSums`Private`ExpVar^6) - 11/(8*HarmonicSums`Private`ExpVar^4) + 11/(4*HarmonicSums`Private`ExpVar^2) - 11/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(120*HarmonicSums`Private`ExpVar^10) - 17/(480*HarmonicSums`Private`ExpVar^8) + 1/(120*HarmonicSums`Private`ExpVar^6) - 1/(240*HarmonicSums`Private`ExpVar^4) + 1/(120*HarmonicSums`Private`ExpVar^2) - 1/(60*HarmonicSums`Private`ExpVar)) + 1258074661/(677376000*HarmonicSums`Private`ExpVar^10) + 333158009/(304819200*HarmonicSums`Private`ExpVar^9) - 53665/(258048*HarmonicSums`Private`ExpVar^8) - 2095909/(5644800*HarmonicSums`Private`ExpVar^7) + 2551/(23040*HarmonicSums`Private`ExpVar^6) + 5887/(28800*HarmonicSums`Private`ExpVar^5) - 185/(768*HarmonicSums`Private`ExpVar^4) + 1/(9*HarmonicSums`Private`ExpVar^3) + (47*s6)/2 + (-826519/(268800*HarmonicSums`Private`ExpVar^10) + 66671/(120960*HarmonicSums`Private`ExpVar^9) + 2939/(4608*HarmonicSums`Private`ExpVar^8) - 1471/(13440*HarmonicSums`Private`ExpVar^7) - 479/(1152*HarmonicSums`Private`ExpVar^6) + 221/(480*HarmonicSums`Private`ExpVar^5) - 17/(64*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3))*sinf + (23*ln2^4*z2)/48 - (3019*z2^3)/560 + ln2^3*(-173/(240*HarmonicSums`Private`ExpVar^10) - 1/(15*HarmonicSums`Private`ExpVar^9) + 19/(144*HarmonicSums`Private`ExpVar^8) + 5/(252*HarmonicSums`Private`ExpVar^7) - 7/(144*HarmonicSums`Private`ExpVar^6) - 1/(90*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 5/(72*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-217/(48*HarmonicSums`Private`ExpVar^10) + 119/(192*HarmonicSums`Private`ExpVar^8) - 7/(48*HarmonicSums`Private`ExpVar^6) + 7/(96*HarmonicSums`Private`ExpVar^4) - 7/(48*HarmonicSums`Private`ExpVar^2) + 7/(24*HarmonicSums`Private`ExpVar))*z2 - (7*z3)/16) + (1211/(160*HarmonicSums`Private`ExpVar^10) + 7/(10*HarmonicSums`Private`ExpVar^9) - 133/(96*HarmonicSums`Private`ExpVar^8) - 5/(24*HarmonicSums`Private`ExpVar^7) + 49/(96*HarmonicSums`Private`ExpVar^6) + 7/(60*HarmonicSums`Private`ExpVar^5) - 21/(32*HarmonicSums`Private`ExpVar^4) + 35/(48*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2))*z3 - (417*z3^2)/64 + z2*((3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (11/(160*HarmonicSums`Private`ExpVar^10) + 883/(420*HarmonicSums`Private`ExpVar^9) - 1/(896*HarmonicSums`Private`ExpVar^8) - 383/(960*HarmonicSums`Private`ExpVar^7) - 7/(480*HarmonicSums`Private`ExpVar^6) + 11/(48*HarmonicSums`Private`ExpVar^5) - 17/(96*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (651/(64*HarmonicSums`Private`ExpVar^10) - 357/(256*HarmonicSums`Private`ExpVar^8) + 21/(64*HarmonicSums`Private`ExpVar^6) - 21/(128*HarmonicSums`Private`ExpVar^4) + 21/(64*HarmonicSums`Private`ExpVar^2) - 21/(32*HarmonicSums`Private`ExpVar))*z3) + ln2^2*((3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (-11/(160*HarmonicSums`Private`ExpVar^10) - 883/(420*HarmonicSums`Private`ExpVar^9) + 1/(896*HarmonicSums`Private`ExpVar^8) + 383/(960*HarmonicSums`Private`ExpVar^7) + 7/(480*HarmonicSums`Private`ExpVar^6) - 11/(48*HarmonicSums`Private`ExpVar^5) + 17/(96*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) - (271*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (-651/(64*HarmonicSums`Private`ExpVar^10) + 357/(256*HarmonicSums`Private`ExpVar^8) - 21/(64*HarmonicSums`Private`ExpVar^6) + 21/(128*HarmonicSums`Private`ExpVar^4) - 21/(64*HarmonicSums`Private`ExpVar^2) + 21/(32*HarmonicSums`Private`ExpVar))*z3) + ln2*(11*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (93/(4*HarmonicSums`Private`ExpVar^10) - 51/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (527/(20*HarmonicSums`Private`ExpVar^10) - 289/(80*HarmonicSums`Private`ExpVar^8) + 17/(20*HarmonicSums`Private`ExpVar^6) - 17/(40*HarmonicSums`Private`ExpVar^4) + 17/(20*HarmonicSums`Private`ExpVar^2) - 17/(10*HarmonicSums`Private`ExpVar))*z2^2 + z2*(-173/(80*HarmonicSums`Private`ExpVar^10) - 1/(5*HarmonicSums`Private`ExpVar^9) + 19/(48*HarmonicSums`Private`ExpVar^8) + 5/(84*HarmonicSums`Private`ExpVar^7) - 7/(48*HarmonicSums`Private`ExpVar^6) - 1/(30*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - (21*z3)/16) - (845*z5)/64) + (-1)^HarmonicSums`Private`ExpVar* (-26195/(256*HarmonicSums`Private`ExpVar^10) + 14365/(1024*HarmonicSums`Private`ExpVar^8) - 845/(256*HarmonicSums`Private`ExpVar^6) + 845/(512*HarmonicSums`Private`ExpVar^4) - 845/(256*HarmonicSums`Private`ExpVar^2) + 845/(128*HarmonicSums`Private`ExpVar))*z5, S[-1, -2, -1, 1, -1, HarmonicSums`Private`ExpVar] :> 24*li6half - ln2^6/40 + (-1)^HarmonicSums`Private`ExpVar*li5half* (217/(4*HarmonicSums`Private`ExpVar^10) - 119/(16*HarmonicSums`Private`ExpVar^8) + 7/(4*HarmonicSums`Private`ExpVar^6) - 7/(8*HarmonicSums`Private`ExpVar^4) + 7/(4*HarmonicSums`Private`ExpVar^2) - 7/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-31/(240*HarmonicSums`Private`ExpVar^10) + 17/(960*HarmonicSums`Private`ExpVar^8) - 1/(240*HarmonicSums`Private`ExpVar^6) + 1/(480*HarmonicSums`Private`ExpVar^4) - 1/(240*HarmonicSums`Private`ExpVar^2) + 1/(120*HarmonicSums`Private`ExpVar)) - 25367/(30720*HarmonicSums`Private`ExpVar^10) + 18127/(34560*HarmonicSums`Private`ExpVar^9) + 745/(3072*HarmonicSums`Private`ExpVar^8) - 691/(1792*HarmonicSums`Private`ExpVar^7) + 175/(768*HarmonicSums`Private`ExpVar^6) - 13/(160*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) + 13*s6 + (-1)^HarmonicSums`Private`ExpVar*ln2* (11/(80*HarmonicSums`Private`ExpVar^10) + 883/(210*HarmonicSums`Private`ExpVar^9) - 1/(448*HarmonicSums`Private`ExpVar^8) - 383/(480*HarmonicSums`Private`ExpVar^7) - 7/(240*HarmonicSums`Private`ExpVar^6) + 11/(24*HarmonicSums`Private`ExpVar^5) - 17/(48*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*sinf + (ln2^4*z2)/12 - (107*z2^3)/40 + ln2^3*(-173/(240*HarmonicSums`Private`ExpVar^10) - 1/(15*HarmonicSums`Private`ExpVar^9) + 19/(144*HarmonicSums`Private`ExpVar^8) + 5/(252*HarmonicSums`Private`ExpVar^7) - 7/(144*HarmonicSums`Private`ExpVar^6) - 1/(90*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 5/(72*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (31/(12*HarmonicSums`Private`ExpVar^10) - 17/(48*HarmonicSums`Private`ExpVar^8) + 1/(12*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar))*z2) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (11/(160*HarmonicSums`Private`ExpVar^10) + 883/(420*HarmonicSums`Private`ExpVar^9) - 1/(896*HarmonicSums`Private`ExpVar^8) - 383/(960*HarmonicSums`Private`ExpVar^7) - 7/(480*HarmonicSums`Private`ExpVar^6) + 11/(48*HarmonicSums`Private`ExpVar^5) - 17/(96*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) - (17*z2^2)/8) + (173/(320*HarmonicSums`Private`ExpVar^10) + 1/(20*HarmonicSums`Private`ExpVar^9) - 19/(192*HarmonicSums`Private`ExpVar^8) - 5/(336*HarmonicSums`Private`ExpVar^7) + 7/(192*HarmonicSums`Private`ExpVar^6) + 1/(120*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 5/(96*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2))*z3 - (39*z3^2)/8 + ln2*(7*li5half + (-1)^HarmonicSums`Private`ExpVar* (2671031/(302400*HarmonicSums`Private`ExpVar^10) - 2355979/(705600*HarmonicSums`Private`ExpVar^9) - 677423/(564480*HarmonicSums`Private`ExpVar^8) + 551/(1200*HarmonicSums`Private`ExpVar^7) + 9317/(28800*HarmonicSums`Private`ExpVar^6) - 125/(576*HarmonicSums`Private`ExpVar^5) - 7/(288*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (173/(80*HarmonicSums`Private`ExpVar^10) + 1/(5*HarmonicSums`Private`ExpVar^9) - 19/(48*HarmonicSums`Private`ExpVar^8) - 5/(84*HarmonicSums`Private`ExpVar^7) + 7/(48*HarmonicSums`Private`ExpVar^6) + 1/(30*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (2697/(160*HarmonicSums`Private`ExpVar^10) - 1479/(640*HarmonicSums`Private`ExpVar^8) + 87/(160*HarmonicSums`Private`ExpVar^6) - 87/(320*HarmonicSums`Private`ExpVar^4) + 87/(160*HarmonicSums`Private`ExpVar^2) - 87/(80*HarmonicSums`Private`ExpVar))*z2^2 - (221*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-6851/(128*HarmonicSums`Private`ExpVar^10) + 3757/(512*HarmonicSums`Private`ExpVar^8) - 221/(128*HarmonicSums`Private`ExpVar^6) + 221/(256*HarmonicSums`Private`ExpVar^4) - 221/(128*HarmonicSums`Private`ExpVar^2) + 221/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, -2, -1, 1, 1, HarmonicSums`Private`ExpVar] :> 30*li6half - (3*ln2^6)/80 + (-1)^HarmonicSums`Private`ExpVar* (1930492969/(190512000*HarmonicSums`Private`ExpVar^10) + 29698609/(74088000*HarmonicSums`Private`ExpVar^9) - 91386461/(79027200*HarmonicSums`Private`ExpVar^8) - 6967/(27000*HarmonicSums`Private`ExpVar^7) + 788171/(1728000*HarmonicSums`Private`ExpVar^6) - 1363/(6912*HarmonicSums`Private`ExpVar^5) + 113/(1728*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3)) + ln2^3*(-173/(240*HarmonicSums`Private`ExpVar^10) - 1/(15*HarmonicSums`Private`ExpVar^9) + 19/(144*HarmonicSums`Private`ExpVar^8) + 5/(252*HarmonicSums`Private`ExpVar^7) - 7/(144*HarmonicSums`Private`ExpVar^6) - 1/(90*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 5/(72*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(93/(4*HarmonicSums`Private`ExpVar^10) - 51/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-31/(160*HarmonicSums`Private`ExpVar^10) + 17/(640*HarmonicSums`Private`ExpVar^8) - 1/(160*HarmonicSums`Private`ExpVar^6) + 1/(320*HarmonicSums`Private`ExpVar^4) - 1/(160*HarmonicSums`Private`ExpVar^2) + 1/(80*HarmonicSums`Private`ExpVar)) + (31*s6)/2 + (-1)^HarmonicSums`Private`ExpVar* (-2671031/(302400*HarmonicSums`Private`ExpVar^10) + 2355979/(705600*HarmonicSums`Private`ExpVar^9) + 677423/(564480*HarmonicSums`Private`ExpVar^8) - 551/(1200*HarmonicSums`Private`ExpVar^7) - 9317/(28800*HarmonicSums`Private`ExpVar^6) + 125/(576*HarmonicSums`Private`ExpVar^5) + 7/(288*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3))*sinf + (-1)^HarmonicSums`Private`ExpVar* (-11/(160*HarmonicSums`Private`ExpVar^10) - 883/(420*HarmonicSums`Private`ExpVar^9) + 1/(896*HarmonicSums`Private`ExpVar^8) + 383/(960*HarmonicSums`Private`ExpVar^7) + 7/(480*HarmonicSums`Private`ExpVar^6) - 11/(48*HarmonicSums`Private`ExpVar^5) + 17/(96*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3))*sinf^2 + (17*ln2^4*z2)/48 - (2141*z2^3)/560 + ln2^2*(-(li4half/2) - (47*z2^2)/16) + (-1211/(320*HarmonicSums`Private`ExpVar^10) - 7/(20*HarmonicSums`Private`ExpVar^9) + 133/(192*HarmonicSums`Private`ExpVar^8) + 5/(48*HarmonicSums`Private`ExpVar^7) - 49/(192*HarmonicSums`Private`ExpVar^6) - 7/(120*HarmonicSums`Private`ExpVar^5) + 21/(64*HarmonicSums`Private`ExpVar^4) - 35/(96*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2))*z3 - (891*z3^2)/128 + z2*(li4half/2 + (-1)^HarmonicSums`Private`ExpVar* (-11/(160*HarmonicSums`Private`ExpVar^10) - 883/(420*HarmonicSums`Private`ExpVar^9) + 1/(896*HarmonicSums`Private`ExpVar^8) + 383/(960*HarmonicSums`Private`ExpVar^7) + 7/(480*HarmonicSums`Private`ExpVar^6) - 11/(48*HarmonicSums`Private`ExpVar^5) + 17/(96*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-651/(64*HarmonicSums`Private`ExpVar^10) + 357/(256*HarmonicSums`Private`ExpVar^8) - 21/(64*HarmonicSums`Private`ExpVar^6) + 21/(128*HarmonicSums`Private`ExpVar^4) - 21/(64*HarmonicSums`Private`ExpVar^2) + 21/(32*HarmonicSums`Private`ExpVar))*z3) + ln2*(7*li5half + (-1)^HarmonicSums`Private`ExpVar* (-279/(160*HarmonicSums`Private`ExpVar^10) + 153/(640*HarmonicSums`Private`ExpVar^8) - 9/(160*HarmonicSums`Private`ExpVar^6) + 9/(320*HarmonicSums`Private`ExpVar^4) - 9/(160*HarmonicSums`Private`ExpVar^2) + 9/(80*HarmonicSums`Private`ExpVar))*z2^2 + z2*(173/(80*HarmonicSums`Private`ExpVar^10) + 1/(5*HarmonicSums`Private`ExpVar^9) - 19/(48*HarmonicSums`Private`ExpVar^8) - 5/(84*HarmonicSums`Private`ExpVar^7) + 7/(48*HarmonicSums`Private`ExpVar^6) + 1/(30*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (21*z3)/16) - (221*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (713/(256*HarmonicSums`Private`ExpVar^10) - 391/(1024*HarmonicSums`Private`ExpVar^8) + 23/(256*HarmonicSums`Private`ExpVar^6) - 23/(512*HarmonicSums`Private`ExpVar^4) + 23/(256*HarmonicSums`Private`ExpVar^2) - 23/(128*HarmonicSums`Private`ExpVar))*z5, S[-1, -2, 1, -1, -1, HarmonicSums`Private`ExpVar] :> -15*li6half - (11*ln2^6)/240 + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-31/(60*HarmonicSums`Private`ExpVar^10) + 17/(240*HarmonicSums`Private`ExpVar^8) - 1/(60*HarmonicSums`Private`ExpVar^6) + 1/(120*HarmonicSums`Private`ExpVar^4) - 1/(60*HarmonicSums`Private`ExpVar^2) + 1/(30*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-217/(4*HarmonicSums`Private`ExpVar^10) + 119/(16*HarmonicSums`Private`ExpVar^8) - 7/(4*HarmonicSums`Private`ExpVar^6) + 7/(8*HarmonicSums`Private`ExpVar^4) - 7/(4*HarmonicSums`Private`ExpVar^2) + 7/(2*HarmonicSums`Private`ExpVar)) + 592047877/(225792000*HarmonicSums`Private`ExpVar^10) - 9341513/(25401600*HarmonicSums`Private`ExpVar^9) - 31759/(69120*HarmonicSums`Private`ExpVar^8) - 84953/(806400*HarmonicSums`Private`ExpVar^7) + 7397/(13824*HarmonicSums`Private`ExpVar^6) - 289/(576*HarmonicSums`Private`ExpVar^5) + 35/(128*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) - (37*s6)/4 - (29*ln2^4*z2)/48 + (-2*li4half - 238/(75*HarmonicSums`Private`ExpVar^10) - 56641/(75600*HarmonicSums`Private`ExpVar^9) + 239/(504*HarmonicSums`Private`ExpVar^8) + 5783/(35280*HarmonicSums`Private`ExpVar^7) - 23/(180*HarmonicSums`Private`ExpVar^6) - 221/(3600*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^4) + 1/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (97*z2^3)/40 + sinf*(ln2^2*(173/(80*HarmonicSums`Private`ExpVar^10) + 1/(5*HarmonicSums`Private`ExpVar^9) - 19/(48*HarmonicSums`Private`ExpVar^8) - 5/(84*HarmonicSums`Private`ExpVar^7) + 7/(48*HarmonicSums`Private`ExpVar^6) + 1/(30*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (173/(80*HarmonicSums`Private`ExpVar^10) + 1/(5*HarmonicSums`Private`ExpVar^9) - 19/(48*HarmonicSums`Private`ExpVar^8) - 5/(84*HarmonicSums`Private`ExpVar^7) + 7/(48*HarmonicSums`Private`ExpVar^6) + 1/(30*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2) + ln2^3*(173/(120*HarmonicSums`Private`ExpVar^10) + 2/(15*HarmonicSums`Private`ExpVar^9) - 19/(72*HarmonicSums`Private`ExpVar^8) - 5/(126*HarmonicSums`Private`ExpVar^7) + 7/(72*HarmonicSums`Private`ExpVar^6) + 1/(45*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 5/(36*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (341/(48*HarmonicSums`Private`ExpVar^10) - 187/(192*HarmonicSums`Private`ExpVar^8) + 11/(48*HarmonicSums`Private`ExpVar^6) - 11/(96*HarmonicSums`Private`ExpVar^4) + 11/(48*HarmonicSums`Private`ExpVar^2) - 11/(24*HarmonicSums`Private`ExpVar))*z2) + ln2^2*(-2*li4half - 238/(75*HarmonicSums`Private`ExpVar^10) - 56641/(75600*HarmonicSums`Private`ExpVar^9) + 239/(504*HarmonicSums`Private`ExpVar^8) + 5783/(35280*HarmonicSums`Private`ExpVar^7) - 23/(180*HarmonicSums`Private`ExpVar^6) - 221/(3600*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^4) + 1/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (19*z2^2)/16) + (-1211/(320*HarmonicSums`Private`ExpVar^10) - 7/(20*HarmonicSums`Private`ExpVar^9) + 133/(192*HarmonicSums`Private`ExpVar^8) + 5/(48*HarmonicSums`Private`ExpVar^7) - 49/(192*HarmonicSums`Private`ExpVar^6) - 7/(120*HarmonicSums`Private`ExpVar^5) + 21/(64*HarmonicSums`Private`ExpVar^4) - 35/(96*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2))*z3 + (111*z3^2)/32 + (-1)^HarmonicSums`Private`ExpVar* (14167/(256*HarmonicSums`Private`ExpVar^10) - 7769/(1024*HarmonicSums`Private`ExpVar^8) + 457/(256*HarmonicSums`Private`ExpVar^6) - 457/(512*HarmonicSums`Private`ExpVar^4) + 457/(256*HarmonicSums`Private`ExpVar^2) - 457/(128*HarmonicSums`Private`ExpVar))*z5 + ln2*(-7*li5half + (-1)^HarmonicSums`Private`ExpVar* (23323/(5760*HarmonicSums`Private`ExpVar^10) + 2591/(1680*HarmonicSums`Private`ExpVar^9) - 3743/(5376*HarmonicSums`Private`ExpVar^8) - 113/(320*HarmonicSums`Private`ExpVar^7) + 821/(1920*HarmonicSums`Private`ExpVar^6) - 37/(192*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar*li4half* (-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) + (173/(80*HarmonicSums`Private`ExpVar^10) + 1/(5*HarmonicSums`Private`ExpVar^9) - 19/(48*HarmonicSums`Private`ExpVar^8) - 5/(84*HarmonicSums`Private`ExpVar^7) + 7/(48*HarmonicSums`Private`ExpVar^6) + 1/(30*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-1643/(160*HarmonicSums`Private`ExpVar^10) + 901/(640*HarmonicSums`Private`ExpVar^8) - 53/(160*HarmonicSums`Private`ExpVar^6) + 53/(320*HarmonicSums`Private`ExpVar^4) - 53/(160*HarmonicSums`Private`ExpVar^2) + 53/(80*HarmonicSums`Private`ExpVar))*z2^2 + (457*z5)/64), S[-1, -2, 1, -1, 1, HarmonicSums`Private`ExpVar] :> -21*li6half + ln2^6/120 + (-1)^HarmonicSums`Private`ExpVar* (416401/(1814400*HarmonicSums`Private`ExpVar^10) + 3514097/(1411200*HarmonicSums`Private`ExpVar^9) - 60569/(752640*HarmonicSums`Private`ExpVar^8) - 14491/(28800*HarmonicSums`Private`ExpVar^7) + 23213/(115200*HarmonicSums`Private`ExpVar^6) - 17/(2304*HarmonicSums`Private`ExpVar^5) - 1/(72*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(160*HarmonicSums`Private`ExpVar^10) - 17/(640*HarmonicSums`Private`ExpVar^8) + 1/(160*HarmonicSums`Private`ExpVar^6) - 1/(320*HarmonicSums`Private`ExpVar^4) + 1/(160*HarmonicSums`Private`ExpVar^2) - 1/(80*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) - 10*s6 - (ln2^4*z2)/2 + 2*z2^3 + sinf*((-1)^HarmonicSums`Private`ExpVar* (-23323/(5760*HarmonicSums`Private`ExpVar^10) - 2591/(1680*HarmonicSums`Private`ExpVar^9) + 3743/(5376*HarmonicSums`Private`ExpVar^8) + 113/(320*HarmonicSums`Private`ExpVar^7) - 821/(1920*HarmonicSums`Private`ExpVar^6) + 37/(192*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^4)) + ln2^2*(173/(80*HarmonicSums`Private`ExpVar^10) + 1/(5*HarmonicSums`Private`ExpVar^9) - 19/(48*HarmonicSums`Private`ExpVar^8) - 5/(84*HarmonicSums`Private`ExpVar^7) + 7/(48*HarmonicSums`Private`ExpVar^6) + 1/(30*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (-173/(80*HarmonicSums`Private`ExpVar^10) - 1/(5*HarmonicSums`Private`ExpVar^9) + 19/(48*HarmonicSums`Private`ExpVar^8) + 5/(84*HarmonicSums`Private`ExpVar^7) - 7/(48*HarmonicSums`Private`ExpVar^6) - 1/(30*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2) + ln2^3*(173/(120*HarmonicSums`Private`ExpVar^10) + 2/(15*HarmonicSums`Private`ExpVar^9) - 19/(72*HarmonicSums`Private`ExpVar^8) - 5/(126*HarmonicSums`Private`ExpVar^7) + 7/(72*HarmonicSums`Private`ExpVar^6) + 1/(45*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 5/(36*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2) + ln2^2*(-(li4half/2) - 238/(75*HarmonicSums`Private`ExpVar^10) - 56641/(75600*HarmonicSums`Private`ExpVar^9) + 239/(504*HarmonicSums`Private`ExpVar^8) + 5783/(35280*HarmonicSums`Private`ExpVar^7) - 23/(180*HarmonicSums`Private`ExpVar^6) - 221/(3600*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^4) + 1/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (39*z2^2)/20) + (173/(320*HarmonicSums`Private`ExpVar^10) + 1/(20*HarmonicSums`Private`ExpVar^9) - 19/(192*HarmonicSums`Private`ExpVar^8) - 5/(336*HarmonicSums`Private`ExpVar^7) + 7/(192*HarmonicSums`Private`ExpVar^6) + 1/(120*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 5/(96*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2))*z3 + (501*z3^2)/128 + z2*(li4half/2 + 238/(75*HarmonicSums`Private`ExpVar^10) + 56641/(75600*HarmonicSums`Private`ExpVar^9) - 239/(504*HarmonicSums`Private`ExpVar^8) - 5783/(35280*HarmonicSums`Private`ExpVar^7) + 23/(180*HarmonicSums`Private`ExpVar^6) + 221/(3600*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^4) - 1/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (93/(64*HarmonicSums`Private`ExpVar^10) - 51/(256*HarmonicSums`Private`ExpVar^8) + 3/(64*HarmonicSums`Private`ExpVar^6) - 3/(128*HarmonicSums`Private`ExpVar^4) + 3/(64*HarmonicSums`Private`ExpVar^2) - 3/(32*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (899/(64*HarmonicSums`Private`ExpVar^10) - 493/(256*HarmonicSums`Private`ExpVar^8) + 29/(64*HarmonicSums`Private`ExpVar^6) - 29/(128*HarmonicSums`Private`ExpVar^4) + 29/(64*HarmonicSums`Private`ExpVar^2) - 29/(32*HarmonicSums`Private`ExpVar))*z5 + ln2*(-7*li5half + (-1)^HarmonicSums`Private`ExpVar* (-279/(40*HarmonicSums`Private`ExpVar^10) + 153/(160*HarmonicSums`Private`ExpVar^8) - 9/(40*HarmonicSums`Private`ExpVar^6) + 9/(80*HarmonicSums`Private`ExpVar^4) - 9/(40*HarmonicSums`Private`ExpVar^2) + 9/(20*HarmonicSums`Private`ExpVar))*z2^2 + z2*(-173/(80*HarmonicSums`Private`ExpVar^10) - 1/(5*HarmonicSums`Private`ExpVar^9) + 19/(48*HarmonicSums`Private`ExpVar^8) + 5/(84*HarmonicSums`Private`ExpVar^7) - 7/(48*HarmonicSums`Private`ExpVar^6) - 1/(30*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - (3*z3)/16) + (457*z5)/64), S[-1, -2, 1, 1, -1, HarmonicSums`Private`ExpVar] :> -7*li6half - ln2^6/720 + (-1)^HarmonicSums`Private`ExpVar* (-286909/(92160*HarmonicSums`Private`ExpVar^10) + 24553/(107520*HarmonicSums`Private`ExpVar^9) + 1649/(2688*HarmonicSums`Private`ExpVar^8) - 701/(1920*HarmonicSums`Private`ExpVar^7) + 69/(640*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^5)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-31/(480*HarmonicSums`Private`ExpVar^10) + 17/(1920*HarmonicSums`Private`ExpVar^8) - 1/(480*HarmonicSums`Private`ExpVar^6) + 1/(960*HarmonicSums`Private`ExpVar^4) - 1/(480*HarmonicSums`Private`ExpVar^2) + 1/(240*HarmonicSums`Private`ExpVar)) - (19*s6)/4 + (ln2^2*(-173/(80*HarmonicSums`Private`ExpVar^10) - 1/(5*HarmonicSums`Private`ExpVar^9) + 19/(48*HarmonicSums`Private`ExpVar^8) + 5/(84*HarmonicSums`Private`ExpVar^7) - 7/(48*HarmonicSums`Private`ExpVar^6) - 1/(30*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) + ln2*(476/(75*HarmonicSums`Private`ExpVar^10) + 56641/(37800*HarmonicSums`Private`ExpVar^9) - 239/(252*HarmonicSums`Private`ExpVar^8) - 5783/(17640*HarmonicSums`Private`ExpVar^7) + 23/(90*HarmonicSums`Private`ExpVar^6) + 221/(1800*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^4) - 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)))*sinf + ln2*(-173/(80*HarmonicSums`Private`ExpVar^10) - 1/(5*HarmonicSums`Private`ExpVar^9) + 19/(48*HarmonicSums`Private`ExpVar^8) + 5/(84*HarmonicSums`Private`ExpVar^7) - 7/(48*HarmonicSums`Private`ExpVar^6) - 1/(30*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*sinf^2 + (5*ln2^4*z2)/16 + (22*z2^3)/35 + ln2^3*(-173/(240*HarmonicSums`Private`ExpVar^10) - 1/(15*HarmonicSums`Private`ExpVar^9) + 19/(144*HarmonicSums`Private`ExpVar^8) + 5/(252*HarmonicSums`Private`ExpVar^7) - 7/(144*HarmonicSums`Private`ExpVar^6) - 1/(90*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 5/(72*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar))*z2 - (7*z3)/48) + (-1)^HarmonicSums`Private`ExpVar* (-217/(64*HarmonicSums`Private`ExpVar^10) + 119/(256*HarmonicSums`Private`ExpVar^8) - 7/(64*HarmonicSums`Private`ExpVar^6) + 7/(128*HarmonicSums`Private`ExpVar^4) - 7/(64*HarmonicSums`Private`ExpVar^2) + 7/(32*HarmonicSums`Private`ExpVar))*z2*z3 + (107*z3^2)/64 + ln2^2*(238/(75*HarmonicSums`Private`ExpVar^10) + 56641/(75600*HarmonicSums`Private`ExpVar^9) - 239/(504*HarmonicSums`Private`ExpVar^8) - 5783/(35280*HarmonicSums`Private`ExpVar^7) + 23/(180*HarmonicSums`Private`ExpVar^6) + 221/(3600*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^4) - 1/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) + (29*z2^2)/16 + (-1)^HarmonicSums`Private`ExpVar* (-217/(64*HarmonicSums`Private`ExpVar^10) + 119/(256*HarmonicSums`Private`ExpVar^8) - 7/(64*HarmonicSums`Private`ExpVar^6) + 7/(128*HarmonicSums`Private`ExpVar^4) - 7/(64*HarmonicSums`Private`ExpVar^2) + 7/(32*HarmonicSums`Private`ExpVar))*z3) + ln2*(-li5half - 1376123/(864000*HarmonicSums`Private`ExpVar^10) - 412880647/(190512000*HarmonicSums`Private`ExpVar^9) + 27683/(3386880*HarmonicSums`Private`ExpVar^8) + 6041041/(14817600*HarmonicSums`Private`ExpVar^7) + 7123/(43200*HarmonicSums`Private`ExpVar^6) - 21199/(54000*HarmonicSums`Private`ExpVar^5) + 37/(144*HarmonicSums`Private`ExpVar^4) - 47/(432*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (31/(80*HarmonicSums`Private`ExpVar^10) - 17/(320*HarmonicSums`Private`ExpVar^8) + 1/(80*HarmonicSums`Private`ExpVar^6) - 1/(160*HarmonicSums`Private`ExpVar^4) + 1/(80*HarmonicSums`Private`ExpVar^2) - 1/(40*HarmonicSums`Private`ExpVar))*z2^2 + z2*(-173/(80*HarmonicSums`Private`ExpVar^10) - 1/(5*HarmonicSums`Private`ExpVar^9) + 19/(48*HarmonicSums`Private`ExpVar^8) + 5/(84*HarmonicSums`Private`ExpVar^7) - 7/(48*HarmonicSums`Private`ExpVar^6) - 1/(30*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - (7*z3)/16) + (27*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z5, S[-1, -2, 1, 1, 1, HarmonicSums`Private`ExpVar] :> -li6half - ln2^6/72 + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-31/(120*HarmonicSums`Private`ExpVar^10) + 17/(480*HarmonicSums`Private`ExpVar^8) - 1/(120*HarmonicSums`Private`ExpVar^6) + 1/(240*HarmonicSums`Private`ExpVar^4) - 1/(120*HarmonicSums`Private`ExpVar^2) + 1/(60*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + 36831791207/(15240960000*HarmonicSums`Private`ExpVar^10) - 438209945987/(480090240000*HarmonicSums`Private`ExpVar^9) - 1260167599/(2844979200*HarmonicSums`Private`ExpVar^8) + 45111383/(3111696000*HarmonicSums`Private`ExpVar^7) + 380737/(1296000*HarmonicSums`Private`ExpVar^6) - 69389/(405000*HarmonicSums`Private`ExpVar^5) + 5/(1728*HarmonicSums`Private`ExpVar^4) + 121/(2592*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) - (5*s6)/2 + (-238/(75*HarmonicSums`Private`ExpVar^10) - 56641/(75600*HarmonicSums`Private`ExpVar^9) + 239/(504*HarmonicSums`Private`ExpVar^8) + 5783/(35280*HarmonicSums`Private`ExpVar^7) - 23/(180*HarmonicSums`Private`ExpVar^6) - 221/(3600*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^4) + 1/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*sinf^2 + (173/(240*HarmonicSums`Private`ExpVar^10) + 1/(15*HarmonicSums`Private`ExpVar^9) - 19/(144*HarmonicSums`Private`ExpVar^8) - 5/(252*HarmonicSums`Private`ExpVar^7) + 7/(144*HarmonicSums`Private`ExpVar^6) + 1/(90*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 5/(72*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2))*sinf^3 + (ln2^4*z2)/24 + (18*z2^3)/35 + sinf*(1376123/(864000*HarmonicSums`Private`ExpVar^10) + 412880647/(190512000*HarmonicSums`Private`ExpVar^9) - 27683/(3386880*HarmonicSums`Private`ExpVar^8) - 6041041/(14817600*HarmonicSums`Private`ExpVar^7) - 7123/(43200*HarmonicSums`Private`ExpVar^6) + 21199/(54000*HarmonicSums`Private`ExpVar^5) - 37/(144*HarmonicSums`Private`ExpVar^4) + 47/(432*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (173/(80*HarmonicSums`Private`ExpVar^10) + 1/(5*HarmonicSums`Private`ExpVar^9) - 19/(48*HarmonicSums`Private`ExpVar^8) - 5/(84*HarmonicSums`Private`ExpVar^7) + 7/(48*HarmonicSums`Private`ExpVar^6) + 1/(30*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar))*z2 - (7*z3)/48) + (173/(120*HarmonicSums`Private`ExpVar^10) + 2/(15*HarmonicSums`Private`ExpVar^9) - 19/(72*HarmonicSums`Private`ExpVar^8) - 5/(126*HarmonicSums`Private`ExpVar^7) + 7/(72*HarmonicSums`Private`ExpVar^6) + 1/(45*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 5/(36*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2))*z3 + (109*z3^2)/64 + z2*(-(li4half/2) - 238/(75*HarmonicSums`Private`ExpVar^10) - 56641/(75600*HarmonicSums`Private`ExpVar^9) + 239/(504*HarmonicSums`Private`ExpVar^8) + 5783/(35280*HarmonicSums`Private`ExpVar^7) - 23/(180*HarmonicSums`Private`ExpVar^6) - 221/(3600*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^4) + 1/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (217/(64*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^6) - 7/(128*HarmonicSums`Private`ExpVar^4) + 7/(64*HarmonicSums`Private`ExpVar^2) - 7/(32*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(-(li4half/2) + z2^2/8 + (-1)^HarmonicSums`Private`ExpVar* (-217/(64*HarmonicSums`Private`ExpVar^10) + 119/(256*HarmonicSums`Private`ExpVar^8) - 7/(64*HarmonicSums`Private`ExpVar^6) + 7/(128*HarmonicSums`Private`ExpVar^4) - 7/(64*HarmonicSums`Private`ExpVar^2) + 7/(32*HarmonicSums`Private`ExpVar))*z3) + ln2*(-li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) - (7*z2*z3)/16 + (27*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (837/(128*HarmonicSums`Private`ExpVar^10) - 459/(512*HarmonicSums`Private`ExpVar^8) + 27/(128*HarmonicSums`Private`ExpVar^6) - 27/(256*HarmonicSums`Private`ExpVar^4) + 27/(128*HarmonicSums`Private`ExpVar^2) - 27/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, 2, -1, -1, -1, HarmonicSums`Private`ExpVar] :> -42*li6half + ln2^6/120 + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-217/(480*HarmonicSums`Private`ExpVar^10) + 119/(1920*HarmonicSums`Private`ExpVar^8) - 7/(480*HarmonicSums`Private`ExpVar^6) + 7/(960*HarmonicSums`Private`ExpVar^4) - 7/(480*HarmonicSums`Private`ExpVar^2) + 7/(240*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-62/HarmonicSums`Private`ExpVar^10 + 17/(2*HarmonicSums`Private`ExpVar^8) - 2/HarmonicSums`Private`ExpVar^6 + HarmonicSums`Private`ExpVar^(-4) - 2/HarmonicSums`Private`ExpVar^2 + 4/HarmonicSums`Private`ExpVar) - 112243/(179200*HarmonicSums`Private`ExpVar^10) + 15733/(11520*HarmonicSums`Private`ExpVar^9) + 4181/(46080*HarmonicSums`Private`ExpVar^8) - 1601/(2688*HarmonicSums`Private`ExpVar^7) + 59/(144*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 20*s6 - (19*ln2^4*z2)/24 + (1459*z2^3)/280 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-2297/(720*HarmonicSums`Private`ExpVar^10) + 103/(105*HarmonicSums`Private`ExpVar^9) + 443/(1008*HarmonicSums`Private`ExpVar^8) - 31/(180*HarmonicSums`Private`ExpVar^7) - 77/(720*HarmonicSums`Private`ExpVar^6) + 1/(18*HarmonicSums`Private`ExpVar^5) + 11/(144*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (403/(48*HarmonicSums`Private`ExpVar^10) - 221/(192*HarmonicSums`Private`ExpVar^8) + 13/(48*HarmonicSums`Private`ExpVar^6) - 13/(96*HarmonicSums`Private`ExpVar^4) + 13/(48*HarmonicSums`Private`ExpVar^2) - 13/(24*HarmonicSums`Private`ExpVar))*z2) + ln2^2*(209/(128*HarmonicSums`Private`ExpVar^10) - 473/(720*HarmonicSums`Private`ExpVar^9) - 39/(128*HarmonicSums`Private`ExpVar^8) + 253/(1344*HarmonicSums`Private`ExpVar^7) + 7/(64*HarmonicSums`Private`ExpVar^6) - 23/(120*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + (161*z2^2)/40) + (-1)^HarmonicSums`Private`ExpVar* (-2297/(480*HarmonicSums`Private`ExpVar^10) + 103/(70*HarmonicSums`Private`ExpVar^9) + 443/(672*HarmonicSums`Private`ExpVar^8) - 31/(120*HarmonicSums`Private`ExpVar^7) - 77/(480*HarmonicSums`Private`ExpVar^6) + 1/(12*HarmonicSums`Private`ExpVar^5) + 11/(96*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z3 + (501*z3^2)/64 + z2*(209/(128*HarmonicSums`Private`ExpVar^10) - 473/(720*HarmonicSums`Private`ExpVar^9) - 39/(128*HarmonicSums`Private`ExpVar^8) + 253/(1344*HarmonicSums`Private`ExpVar^7) + 7/(64*HarmonicSums`Private`ExpVar^6) - 23/(120*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (93/(32*HarmonicSums`Private`ExpVar^10) - 51/(128*HarmonicSums`Private`ExpVar^8) + 3/(32*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^2) - 3/(16*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (1891/(32*HarmonicSums`Private`ExpVar^10) - 1037/(128*HarmonicSums`Private`ExpVar^8) + 61/(32*HarmonicSums`Private`ExpVar^6) - 61/(64*HarmonicSums`Private`ExpVar^4) + 61/(32*HarmonicSums`Private`ExpVar^2) - 61/(16*HarmonicSums`Private`ExpVar))*z5 + ln2*(-8*li5half + (-1)^HarmonicSums`Private`ExpVar* (2403/(1792*HarmonicSums`Private`ExpVar^10) - 68309/(20160*HarmonicSums`Private`ExpVar^9) - 9869/(40320*HarmonicSums`Private`ExpVar^8) + 3229/(5760*HarmonicSums`Private`ExpVar^7) + 167/(640*HarmonicSums`Private`ExpVar^6) - 107/(192*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*li4half* (-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-341/(32*HarmonicSums`Private`ExpVar^10) + 187/(128*HarmonicSums`Private`ExpVar^8) - 11/(32*HarmonicSums`Private`ExpVar^6) + 11/(64*HarmonicSums`Private`ExpVar^4) - 11/(32*HarmonicSums`Private`ExpVar^2) + 11/(16*HarmonicSums`Private`ExpVar))*z2^2 + z2*((-1)^HarmonicSums`Private`ExpVar* (-2297/(240*HarmonicSums`Private`ExpVar^10) + 103/(35*HarmonicSums`Private`ExpVar^9) + 443/(336*HarmonicSums`Private`ExpVar^8) - 31/(60*HarmonicSums`Private`ExpVar^7) - 77/(240*HarmonicSums`Private`ExpVar^6) + 1/(6*HarmonicSums`Private`ExpVar^5) + 11/(48*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) - (3*z3)/8) + (61*z5)/8), S[-1, 2, -1, -1, 1, HarmonicSums`Private`ExpVar] :> -48*li6half + ln2^6/16 + (-1)^HarmonicSums`Private`ExpVar* (101123543/(13547520*HarmonicSums`Private`ExpVar^10) + 253149/(156800*HarmonicSums`Private`ExpVar^9) - 5311193/(5644800*HarmonicSums`Private`ExpVar^8) - 62291/(115200*HarmonicSums`Private`ExpVar^7) + 3747/(12800*HarmonicSums`Private`ExpVar^6) + 659/(2304*HarmonicSums`Private`ExpVar^5) - 19/(48*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(120*HarmonicSums`Private`ExpVar^10) - 17/(480*HarmonicSums`Private`ExpVar^8) + 1/(120*HarmonicSums`Private`ExpVar^6) - 1/(240*HarmonicSums`Private`ExpVar^4) + 1/(120*HarmonicSums`Private`ExpVar^2) - 1/(60*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) - 26*s6 + (-1)^HarmonicSums`Private`ExpVar* (-2403/(1792*HarmonicSums`Private`ExpVar^10) + 68309/(20160*HarmonicSums`Private`ExpVar^9) + 9869/(40320*HarmonicSums`Private`ExpVar^8) - 3229/(5760*HarmonicSums`Private`ExpVar^7) - 167/(640*HarmonicSums`Private`ExpVar^6) + 107/(192*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*sinf - (41*ln2^4*z2)/48 + ((-3*li4half)/2 - 209/(128*HarmonicSums`Private`ExpVar^10) + 473/(720*HarmonicSums`Private`ExpVar^9) + 39/(128*HarmonicSums`Private`ExpVar^8) - 253/(1344*HarmonicSums`Private`ExpVar^7) - 7/(64*HarmonicSums`Private`ExpVar^6) + 23/(120*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3))*z2 + (3293*z2^3)/560 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-2297/(720*HarmonicSums`Private`ExpVar^10) + 103/(105*HarmonicSums`Private`ExpVar^9) + 443/(1008*HarmonicSums`Private`ExpVar^8) - 31/(180*HarmonicSums`Private`ExpVar^7) - 77/(720*HarmonicSums`Private`ExpVar^6) + 1/(18*HarmonicSums`Private`ExpVar^5) + 11/(144*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (155/(48*HarmonicSums`Private`ExpVar^10) - 85/(192*HarmonicSums`Private`ExpVar^8) + 5/(48*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^2) - 5/(24*HarmonicSums`Private`ExpVar))*z2) + ln2^2*((3*li4half)/2 + 209/(128*HarmonicSums`Private`ExpVar^10) - 473/(720*HarmonicSums`Private`ExpVar^9) - 39/(128*HarmonicSums`Private`ExpVar^8) + 253/(1344*HarmonicSums`Private`ExpVar^7) + 7/(64*HarmonicSums`Private`ExpVar^6) - 23/(120*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + (463*z2^2)/80) + (-1)^HarmonicSums`Private`ExpVar* (16079/(480*HarmonicSums`Private`ExpVar^10) - 103/(10*HarmonicSums`Private`ExpVar^9) - 443/(96*HarmonicSums`Private`ExpVar^8) + 217/(120*HarmonicSums`Private`ExpVar^7) + 539/(480*HarmonicSums`Private`ExpVar^6) - 7/(12*HarmonicSums`Private`ExpVar^5) - 77/(96*HarmonicSums`Private`ExpVar^4) + 21/(16*HarmonicSums`Private`ExpVar^3) - 7/(8*HarmonicSums`Private`ExpVar^2))*z3 + (39*z3^2)/4 + (-1)^HarmonicSums`Private`ExpVar* (899/(64*HarmonicSums`Private`ExpVar^10) - 493/(256*HarmonicSums`Private`ExpVar^8) + 29/(64*HarmonicSums`Private`ExpVar^6) - 29/(128*HarmonicSums`Private`ExpVar^4) + 29/(64*HarmonicSums`Private`ExpVar^2) - 29/(32*HarmonicSums`Private`ExpVar))*z5 + ln2*(-8*li5half + (-1)^HarmonicSums`Private`ExpVar* (-2297/(240*HarmonicSums`Private`ExpVar^10) + 103/(35*HarmonicSums`Private`ExpVar^9) + 443/(336*HarmonicSums`Private`ExpVar^8) - 31/(60*HarmonicSums`Private`ExpVar^7) - 77/(240*HarmonicSums`Private`ExpVar^6) + 1/(6*HarmonicSums`Private`ExpVar^5) + 11/(48*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-589/(80*HarmonicSums`Private`ExpVar^10) + 323/(320*HarmonicSums`Private`ExpVar^8) - 19/(80*HarmonicSums`Private`ExpVar^6) + 19/(160*HarmonicSums`Private`ExpVar^4) - 19/(80*HarmonicSums`Private`ExpVar^2) + 19/(40*HarmonicSums`Private`ExpVar))*z2^2 + (61*z5)/8), S[-1, 2, -1, 1, -1, HarmonicSums`Private`ExpVar] :> -30*li6half + ln2^6/120 + (-1)^HarmonicSums`Private`ExpVar* (162563/(276480*HarmonicSums`Private`ExpVar^10) + 74593/(107520*HarmonicSums`Private`ExpVar^9) + 111/(3584*HarmonicSums`Private`ExpVar^8) - 479/(1280*HarmonicSums`Private`ExpVar^7) + 517/(1920*HarmonicSums`Private`ExpVar^6) - 5/(48*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(120*HarmonicSums`Private`ExpVar^10) - 17/(480*HarmonicSums`Private`ExpVar^8) + 1/(120*HarmonicSums`Private`ExpVar^6) - 1/(240*HarmonicSums`Private`ExpVar^4) + 1/(120*HarmonicSums`Private`ExpVar^2) - 1/(60*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) - (35*s6)/2 + ln2*(-209/(64*HarmonicSums`Private`ExpVar^10) + 473/(360*HarmonicSums`Private`ExpVar^9) + 39/(64*HarmonicSums`Private`ExpVar^8) - 253/(672*HarmonicSums`Private`ExpVar^7) - 7/(32*HarmonicSums`Private`ExpVar^6) + 23/(60*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3))*sinf + (ln2^4*z2)/8 + 3*z2^3 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-2297/(720*HarmonicSums`Private`ExpVar^10) + 103/(105*HarmonicSums`Private`ExpVar^9) + 443/(1008*HarmonicSums`Private`ExpVar^8) - 31/(180*HarmonicSums`Private`ExpVar^7) - 77/(720*HarmonicSums`Private`ExpVar^6) + 1/(18*HarmonicSums`Private`ExpVar^5) + 11/(144*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(12*HarmonicSums`Private`ExpVar^10) + 17/(48*HarmonicSums`Private`ExpVar^8) - 1/(12*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/16) + (-1)^HarmonicSums`Private`ExpVar* (2297/(960*HarmonicSums`Private`ExpVar^10) - 103/(140*HarmonicSums`Private`ExpVar^9) - 443/(1344*HarmonicSums`Private`ExpVar^8) + 31/(240*HarmonicSums`Private`ExpVar^7) + 77/(960*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^5) - 11/(192*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z3 + (-1)^HarmonicSums`Private`ExpVar* (651/(64*HarmonicSums`Private`ExpVar^10) - 357/(256*HarmonicSums`Private`ExpVar^8) + 21/(64*HarmonicSums`Private`ExpVar^6) - 21/(128*HarmonicSums`Private`ExpVar^4) + 21/(64*HarmonicSums`Private`ExpVar^2) - 21/(32*HarmonicSums`Private`ExpVar))*z2*z3 + (441*z3^2)/64 + ln2^2*(-209/(128*HarmonicSums`Private`ExpVar^10) + 473/(720*HarmonicSums`Private`ExpVar^9) + 39/(128*HarmonicSums`Private`ExpVar^8) - 253/(1344*HarmonicSums`Private`ExpVar^7) - 7/(64*HarmonicSums`Private`ExpVar^6) + 23/(120*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3) + (93*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (651/(64*HarmonicSums`Private`ExpVar^10) - 357/(256*HarmonicSums`Private`ExpVar^8) + 21/(64*HarmonicSums`Private`ExpVar^6) - 21/(128*HarmonicSums`Private`ExpVar^4) + 21/(64*HarmonicSums`Private`ExpVar^2) - 21/(32*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (2635/(256*HarmonicSums`Private`ExpVar^10) - 1445/(1024*HarmonicSums`Private`ExpVar^8) + 85/(256*HarmonicSums`Private`ExpVar^6) - 85/(512*HarmonicSums`Private`ExpVar^4) + 85/(256*HarmonicSums`Private`ExpVar^2) - 85/(128*HarmonicSums`Private`ExpVar))*z5 + ln2*(-6*li5half + 7777/(1152*HarmonicSums`Private`ExpVar^10) - 1176071/(1814400*HarmonicSums`Private`ExpVar^9) - 11647/(10752*HarmonicSums`Private`ExpVar^8) + 24113/(141120*HarmonicSums`Private`ExpVar^7) + 311/(960*HarmonicSums`Private`ExpVar^6) - 749/(3600*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(36*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (-2573/(160*HarmonicSums`Private`ExpVar^10) + 1411/(640*HarmonicSums`Private`ExpVar^8) - 83/(160*HarmonicSums`Private`ExpVar^6) + 83/(320*HarmonicSums`Private`ExpVar^4) - 83/(160*HarmonicSums`Private`ExpVar^2) + 83/(80*HarmonicSums`Private`ExpVar))*z2^2 + z2*((-1)^HarmonicSums`Private`ExpVar* (2297/(240*HarmonicSums`Private`ExpVar^10) - 103/(35*HarmonicSums`Private`ExpVar^9) - 443/(336*HarmonicSums`Private`ExpVar^8) + 31/(60*HarmonicSums`Private`ExpVar^7) + 77/(240*HarmonicSums`Private`ExpVar^6) - 1/(6*HarmonicSums`Private`ExpVar^5) - 11/(48*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (21*z3)/16) + (61*z5)/8), S[-1, 2, -1, 1, 1, HarmonicSums`Private`ExpVar] :> -24*li6half - ln2^6/240 + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (31/(480*HarmonicSums`Private`ExpVar^10) - 17/(1920*HarmonicSums`Private`ExpVar^8) + 1/(480*HarmonicSums`Private`ExpVar^6) - 1/(960*HarmonicSums`Private`ExpVar^4) + 1/(480*HarmonicSums`Private`ExpVar^2) - 1/(240*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-93/(2*HarmonicSums`Private`ExpVar^10) + 51/(8*HarmonicSums`Private`ExpVar^8) - 3/(2*HarmonicSums`Private`ExpVar^6) + 3/(4*HarmonicSums`Private`ExpVar^4) - 3/(2*HarmonicSums`Private`ExpVar^2) + 3/HarmonicSums`Private`ExpVar) + 28656631/(5806080*HarmonicSums`Private`ExpVar^10) + 5784436409/(4572288000*HarmonicSums`Private`ExpVar^9) - 2065411/(3010560*HarmonicSums`Private`ExpVar^8) - 11119181/(29635200*HarmonicSums`Private`ExpVar^7) + 11579/(28800*HarmonicSums`Private`ExpVar^6) - 16081/(108000*HarmonicSums`Private`ExpVar^5) + 17/(576*HarmonicSums`Private`ExpVar^4) - 1/(108*HarmonicSums`Private`ExpVar^3) - (23*s6)/2 + (-7777/(1152*HarmonicSums`Private`ExpVar^10) + 1176071/(1814400*HarmonicSums`Private`ExpVar^9) + 11647/(10752*HarmonicSums`Private`ExpVar^8) - 24113/(141120*HarmonicSums`Private`ExpVar^7) - 311/(960*HarmonicSums`Private`ExpVar^6) + 749/(3600*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(36*HarmonicSums`Private`ExpVar^3))*sinf + (209/(128*HarmonicSums`Private`ExpVar^10) - 473/(720*HarmonicSums`Private`ExpVar^9) - 39/(128*HarmonicSums`Private`ExpVar^8) + 253/(1344*HarmonicSums`Private`ExpVar^7) + 7/(64*HarmonicSums`Private`ExpVar^6) - 23/(120*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3))*sinf^2 - (7*ln2^4*z2)/48 + (-(li4half/2) + 209/(128*HarmonicSums`Private`ExpVar^10) - 473/(720*HarmonicSums`Private`ExpVar^9) - 39/(128*HarmonicSums`Private`ExpVar^8) + 253/(1344*HarmonicSums`Private`ExpVar^7) + 7/(64*HarmonicSums`Private`ExpVar^6) - 23/(120*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3))*z2 + (1991*z2^3)/560 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-2297/(720*HarmonicSums`Private`ExpVar^10) + 103/(105*HarmonicSums`Private`ExpVar^9) + 443/(1008*HarmonicSums`Private`ExpVar^8) - 31/(180*HarmonicSums`Private`ExpVar^7) - 77/(720*HarmonicSums`Private`ExpVar^6) + 1/(18*HarmonicSums`Private`ExpVar^5) + 11/(144*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2)) + (7*z3)/16) + (-1)^HarmonicSums`Private`ExpVar* (-16079/(960*HarmonicSums`Private`ExpVar^10) + 103/(20*HarmonicSums`Private`ExpVar^9) + 443/(192*HarmonicSums`Private`ExpVar^8) - 217/(240*HarmonicSums`Private`ExpVar^7) - 539/(960*HarmonicSums`Private`ExpVar^6) + 7/(24*HarmonicSums`Private`ExpVar^5) + 77/(192*HarmonicSums`Private`ExpVar^4) - 21/(32*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2))*z3 + (405*z3^2)/128 + ln2^2*(-(li4half/2) + (51*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (651/(64*HarmonicSums`Private`ExpVar^10) - 357/(256*HarmonicSums`Private`ExpVar^8) + 21/(64*HarmonicSums`Private`ExpVar^6) - 21/(128*HarmonicSums`Private`ExpVar^4) + 21/(64*HarmonicSums`Private`ExpVar^2) - 21/(32*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (1891/(32*HarmonicSums`Private`ExpVar^10) - 1037/(128*HarmonicSums`Private`ExpVar^8) + 61/(32*HarmonicSums`Private`ExpVar^6) - 61/(64*HarmonicSums`Private`ExpVar^4) + 61/(32*HarmonicSums`Private`ExpVar^2) - 61/(16*HarmonicSums`Private`ExpVar))*z5 + ln2*(-6*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (2297/(240*HarmonicSums`Private`ExpVar^10) - 103/(35*HarmonicSums`Private`ExpVar^9) - 443/(336*HarmonicSums`Private`ExpVar^8) + 31/(60*HarmonicSums`Private`ExpVar^7) + 77/(240*HarmonicSums`Private`ExpVar^6) - 1/(6*HarmonicSums`Private`ExpVar^5) - 11/(48*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-527/(32*HarmonicSums`Private`ExpVar^10) + 289/(128*HarmonicSums`Private`ExpVar^8) - 17/(32*HarmonicSums`Private`ExpVar^6) + 17/(64*HarmonicSums`Private`ExpVar^4) - 17/(32*HarmonicSums`Private`ExpVar^2) + 17/(16*HarmonicSums`Private`ExpVar))*z2^2 + (61*z5)/8), S[-1, 2, 1, -1, -1, HarmonicSums`Private`ExpVar] :> 27*li6half + ln2^6/240 + (-1)^HarmonicSums`Private`ExpVar* (52280287/(33868800*HarmonicSums`Private`ExpVar^10) - 105109531/(33868800*HarmonicSums`Private`ExpVar^9) - 819731/(4838400*HarmonicSums`Private`ExpVar^8) + 120281/(345600*HarmonicSums`Private`ExpVar^7) + 193/(480*HarmonicSums`Private`ExpVar^6) - 703/(1152*HarmonicSums`Private`ExpVar^5) + 37/(96*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(240*HarmonicSums`Private`ExpVar^10) - 17/(960*HarmonicSums`Private`ExpVar^8) + 1/(240*HarmonicSums`Private`ExpVar^6) - 1/(480*HarmonicSums`Private`ExpVar^4) + 1/(240*HarmonicSums`Private`ExpVar^2) - 1/(120*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/(2*HarmonicSums`Private`ExpVar^10) + 17/(8*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) + (43*s6)/4 + (25*ln2^4*z2)/48 - (1133*z2^3)/280 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (2297/(240*HarmonicSums`Private`ExpVar^10) - 103/(35*HarmonicSums`Private`ExpVar^9) - 443/(336*HarmonicSums`Private`ExpVar^8) + 31/(60*HarmonicSums`Private`ExpVar^7) + 77/(240*HarmonicSums`Private`ExpVar^6) - 1/(6*HarmonicSums`Private`ExpVar^5) - 11/(48*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (2297/(240*HarmonicSums`Private`ExpVar^10) - 103/(35*HarmonicSums`Private`ExpVar^9) - 443/(336*HarmonicSums`Private`ExpVar^8) + 31/(60*HarmonicSums`Private`ExpVar^7) + 77/(240*HarmonicSums`Private`ExpVar^6) - 1/(6*HarmonicSums`Private`ExpVar^5) - 11/(48*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (2297/(360*HarmonicSums`Private`ExpVar^10) - 206/(105*HarmonicSums`Private`ExpVar^9) - 443/(504*HarmonicSums`Private`ExpVar^8) + 31/(90*HarmonicSums`Private`ExpVar^7) + 77/(360*HarmonicSums`Private`ExpVar^6) - 1/(9*HarmonicSums`Private`ExpVar^5) - 11/(72*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(6*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-341/(48*HarmonicSums`Private`ExpVar^10) + 187/(192*HarmonicSums`Private`ExpVar^8) - 11/(48*HarmonicSums`Private`ExpVar^6) + 11/(96*HarmonicSums`Private`ExpVar^4) - 11/(48*HarmonicSums`Private`ExpVar^2) + 11/(24*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/16) + (-1)^HarmonicSums`Private`ExpVar* (-16079/(960*HarmonicSums`Private`ExpVar^10) + 103/(20*HarmonicSums`Private`ExpVar^9) + 443/(192*HarmonicSums`Private`ExpVar^8) - 217/(240*HarmonicSums`Private`ExpVar^7) - 539/(960*HarmonicSums`Private`ExpVar^6) + 7/(24*HarmonicSums`Private`ExpVar^5) + 77/(192*HarmonicSums`Private`ExpVar^4) - 21/(32*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2))*z3 - (237*z3^2)/64 + z2*((-1)^HarmonicSums`Private`ExpVar* (-37027/(2800*HarmonicSums`Private`ExpVar^10) + 4687/(58800*HarmonicSums`Private`ExpVar^9) + 205967/(141120*HarmonicSums`Private`ExpVar^8) + 317/(3600*HarmonicSums`Private`ExpVar^7) - 839/(3600*HarmonicSums`Private`ExpVar^6) - 11/(144*HarmonicSums`Private`ExpVar^5) + 11/(288*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (217/(64*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^6) - 7/(128*HarmonicSums`Private`ExpVar^4) + 7/(64*HarmonicSums`Private`ExpVar^2) - 7/(32*HarmonicSums`Private`ExpVar))*z3) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-37027/(2800*HarmonicSums`Private`ExpVar^10) + 4687/(58800*HarmonicSums`Private`ExpVar^9) + 205967/(141120*HarmonicSums`Private`ExpVar^8) + 317/(3600*HarmonicSums`Private`ExpVar^7) - 839/(3600*HarmonicSums`Private`ExpVar^6) - 11/(144*HarmonicSums`Private`ExpVar^5) + 11/(288*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) - (263*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (217/(64*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^6) - 7/(128*HarmonicSums`Private`ExpVar^4) + 7/(64*HarmonicSums`Private`ExpVar^2) - 7/(32*HarmonicSums`Private`ExpVar))*z3) + ln2*(4*li5half + 331/(640*HarmonicSums`Private`ExpVar^10) + 999/(640*HarmonicSums`Private`ExpVar^9) - 401/(1536*HarmonicSums`Private`ExpVar^8) - 3/(7*HarmonicSums`Private`ExpVar^7) + 35/(96*HarmonicSums`Private`ExpVar^6) - 3/(20*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + (-1)^HarmonicSums`Private`ExpVar* (-1519/(160*HarmonicSums`Private`ExpVar^10) + 833/(640*HarmonicSums`Private`ExpVar^8) - 49/(160*HarmonicSums`Private`ExpVar^6) + 49/(320*HarmonicSums`Private`ExpVar^4) - 49/(160*HarmonicSums`Private`ExpVar^2) + 49/(80*HarmonicSums`Private`ExpVar))*z2^2 + z2*((-1)^HarmonicSums`Private`ExpVar* (2297/(240*HarmonicSums`Private`ExpVar^10) - 103/(35*HarmonicSums`Private`ExpVar^9) - 443/(336*HarmonicSums`Private`ExpVar^8) + 31/(60*HarmonicSums`Private`ExpVar^7) + 77/(240*HarmonicSums`Private`ExpVar^6) - 1/(6*HarmonicSums`Private`ExpVar^5) - 11/(48*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (21*z3)/16) - (35*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (713/(256*HarmonicSums`Private`ExpVar^10) - 391/(1024*HarmonicSums`Private`ExpVar^8) + 23/(256*HarmonicSums`Private`ExpVar^6) - 23/(512*HarmonicSums`Private`ExpVar^4) + 23/(256*HarmonicSums`Private`ExpVar^2) - 23/(128*HarmonicSums`Private`ExpVar))*z5, S[-1, 2, 1, -1, 1, HarmonicSums`Private`ExpVar] :> 21*li6half + (7*ln2^6)/120 + (-1)^HarmonicSums`Private`ExpVar*li5half* (31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (341/(480*HarmonicSums`Private`ExpVar^10) - 187/(1920*HarmonicSums`Private`ExpVar^8) + 11/(480*HarmonicSums`Private`ExpVar^6) - 11/(960*HarmonicSums`Private`ExpVar^4) + 11/(480*HarmonicSums`Private`ExpVar^2) - 11/(240*HarmonicSums`Private`ExpVar)) - 326929/(153600*HarmonicSums`Private`ExpVar^10) + 3105659/(1612800*HarmonicSums`Private`ExpVar^9) + 41885/(258048*HarmonicSums`Private`ExpVar^8) - 22397/(47040*HarmonicSums`Private`ExpVar^7) + 1063/(5760*HarmonicSums`Private`ExpVar^6) - 27/(1600*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) + (17*s6)/2 + (ln2^4*z2)/12 - (71*z2^3)/28 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (2297/(240*HarmonicSums`Private`ExpVar^10) - 103/(35*HarmonicSums`Private`ExpVar^9) - 443/(336*HarmonicSums`Private`ExpVar^8) + 31/(60*HarmonicSums`Private`ExpVar^7) + 77/(240*HarmonicSums`Private`ExpVar^6) - 1/(6*HarmonicSums`Private`ExpVar^5) - 11/(48*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) - 331/(640*HarmonicSums`Private`ExpVar^10) - 999/(640*HarmonicSums`Private`ExpVar^9) + 401/(1536*HarmonicSums`Private`ExpVar^8) + 3/(7*HarmonicSums`Private`ExpVar^7) - 35/(96*HarmonicSums`Private`ExpVar^6) + 3/(20*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + (-1)^HarmonicSums`Private`ExpVar* (-2297/(240*HarmonicSums`Private`ExpVar^10) + 103/(35*HarmonicSums`Private`ExpVar^9) + 443/(336*HarmonicSums`Private`ExpVar^8) - 31/(60*HarmonicSums`Private`ExpVar^7) - 77/(240*HarmonicSums`Private`ExpVar^6) + 1/(6*HarmonicSums`Private`ExpVar^5) + 11/(48*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z2) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (2297/(360*HarmonicSums`Private`ExpVar^10) - 206/(105*HarmonicSums`Private`ExpVar^9) - 443/(504*HarmonicSums`Private`ExpVar^8) + 31/(90*HarmonicSums`Private`ExpVar^7) + 77/(360*HarmonicSums`Private`ExpVar^6) - 1/(9*HarmonicSums`Private`ExpVar^5) - 11/(72*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(6*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-341/(48*HarmonicSums`Private`ExpVar^10) + 187/(192*HarmonicSums`Private`ExpVar^8) - 11/(48*HarmonicSums`Private`ExpVar^6) + 11/(96*HarmonicSums`Private`ExpVar^4) - 11/(48*HarmonicSums`Private`ExpVar^2) + 11/(24*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/16) + (-1)^HarmonicSums`Private`ExpVar* (2297/(960*HarmonicSums`Private`ExpVar^10) - 103/(140*HarmonicSums`Private`ExpVar^9) - 443/(1344*HarmonicSums`Private`ExpVar^8) + 31/(240*HarmonicSums`Private`ExpVar^7) + 77/(960*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^5) - 11/(192*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z3 - (723*z3^2)/128 + ln2^2*((3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (-37027/(2800*HarmonicSums`Private`ExpVar^10) + 4687/(58800*HarmonicSums`Private`ExpVar^9) + 205967/(141120*HarmonicSums`Private`ExpVar^8) + 317/(3600*HarmonicSums`Private`ExpVar^7) - 839/(3600*HarmonicSums`Private`ExpVar^6) - 11/(144*HarmonicSums`Private`ExpVar^5) + 11/(288*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) - (53*z2^2)/20 + (-1)^HarmonicSums`Private`ExpVar* (217/(64*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^6) - 7/(128*HarmonicSums`Private`ExpVar^4) + 7/(64*HarmonicSums`Private`ExpVar^2) - 7/(32*HarmonicSums`Private`ExpVar))*z3) + z2*((3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (37027/(2800*HarmonicSums`Private`ExpVar^10) - 4687/(58800*HarmonicSums`Private`ExpVar^9) - 205967/(141120*HarmonicSums`Private`ExpVar^8) - 317/(3600*HarmonicSums`Private`ExpVar^7) + 839/(3600*HarmonicSums`Private`ExpVar^6) + 11/(144*HarmonicSums`Private`ExpVar^5) - 11/(288*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-155/(32*HarmonicSums`Private`ExpVar^10) + 85/(128*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^2) + 5/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(4*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (93/(4*HarmonicSums`Private`ExpVar^10) - 51/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (31/(5*HarmonicSums`Private`ExpVar^10) - 17/(20*HarmonicSums`Private`ExpVar^8) + 1/(5*HarmonicSums`Private`ExpVar^6) - 1/(10*HarmonicSums`Private`ExpVar^4) + 1/(5*HarmonicSums`Private`ExpVar^2) - 2/(5*HarmonicSums`Private`ExpVar))*z2^2 + z2*((-1)^HarmonicSums`Private`ExpVar* (-2297/(240*HarmonicSums`Private`ExpVar^10) + 103/(35*HarmonicSums`Private`ExpVar^9) + 443/(336*HarmonicSums`Private`ExpVar^8) - 31/(60*HarmonicSums`Private`ExpVar^7) - 77/(240*HarmonicSums`Private`ExpVar^6) + 1/(6*HarmonicSums`Private`ExpVar^5) + 11/(48*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (3*z3)/2) - (35*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-1085/(128*HarmonicSums`Private`ExpVar^10) + 595/(512*HarmonicSums`Private`ExpVar^8) - 35/(128*HarmonicSums`Private`ExpVar^6) + 35/(256*HarmonicSums`Private`ExpVar^4) - 35/(128*HarmonicSums`Private`ExpVar^2) + 35/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, 2, 1, 1, -1, HarmonicSums`Private`ExpVar] :> -li6half + (7*ln2^6)/144 + (-1)^HarmonicSums`Private`ExpVar*li5half* (31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (31/(480*HarmonicSums`Private`ExpVar^10) - 17/(1920*HarmonicSums`Private`ExpVar^8) + 1/(480*HarmonicSums`Private`ExpVar^6) - 1/(960*HarmonicSums`Private`ExpVar^4) + 1/(480*HarmonicSums`Private`ExpVar^2) - 1/(240*HarmonicSums`Private`ExpVar)) - 6509/(2560*HarmonicSums`Private`ExpVar^10) - 93/(640*HarmonicSums`Private`ExpVar^9) + 475/(768*HarmonicSums`Private`ExpVar^8) - 71/(224*HarmonicSums`Private`ExpVar^7) + 17/(192*HarmonicSums`Private`ExpVar^6) - 1/(80*HarmonicSums`Private`ExpVar^5) + (11*s6)/4 + ((-1)^HarmonicSums`Private`ExpVar*ln2^2* (-2297/(240*HarmonicSums`Private`ExpVar^10) + 103/(35*HarmonicSums`Private`ExpVar^9) + 443/(336*HarmonicSums`Private`ExpVar^8) - 31/(60*HarmonicSums`Private`ExpVar^7) - 77/(240*HarmonicSums`Private`ExpVar^6) + 1/(6*HarmonicSums`Private`ExpVar^5) + 11/(48*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*ln2* (37027/(1400*HarmonicSums`Private`ExpVar^10) - 4687/(29400*HarmonicSums`Private`ExpVar^9) - 205967/(70560*HarmonicSums`Private`ExpVar^8) - 317/(1800*HarmonicSums`Private`ExpVar^7) + 839/(1800*HarmonicSums`Private`ExpVar^6) + 11/(72*HarmonicSums`Private`ExpVar^5) - 11/(144*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2)))*sinf + (-1)^HarmonicSums`Private`ExpVar*ln2* (-2297/(240*HarmonicSums`Private`ExpVar^10) + 103/(35*HarmonicSums`Private`ExpVar^9) + 443/(336*HarmonicSums`Private`ExpVar^8) - 31/(60*HarmonicSums`Private`ExpVar^7) - 77/(240*HarmonicSums`Private`ExpVar^6) + 1/(6*HarmonicSums`Private`ExpVar^5) + 11/(48*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*sinf^2 + 2*li4half*z2 - (5*ln2^4*z2)/16 + (2*z2^3)/35 + ln2^2*(2*li4half + (-1)^HarmonicSums`Private`ExpVar* (37027/(2800*HarmonicSums`Private`ExpVar^10) - 4687/(58800*HarmonicSums`Private`ExpVar^9) - 205967/(141120*HarmonicSums`Private`ExpVar^8) - 317/(3600*HarmonicSums`Private`ExpVar^7) + 839/(3600*HarmonicSums`Private`ExpVar^6) + 11/(144*HarmonicSums`Private`ExpVar^5) - 11/(288*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (3*z2^2)/16) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-2297/(720*HarmonicSums`Private`ExpVar^10) + 103/(105*HarmonicSums`Private`ExpVar^9) + 443/(1008*HarmonicSums`Private`ExpVar^8) - 31/(180*HarmonicSums`Private`ExpVar^7) - 77/(720*HarmonicSums`Private`ExpVar^6) + 1/(18*HarmonicSums`Private`ExpVar^5) + 11/(144*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (31/(12*HarmonicSums`Private`ExpVar^10) - 17/(48*HarmonicSums`Private`ExpVar^8) + 1/(12*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/24) - (73*z3^2)/64 + ln2*(4*li5half + (-1)^HarmonicSums`Private`ExpVar* (-986046181/(63504000*HarmonicSums`Private`ExpVar^10) - 79915441/(24696000*HarmonicSums`Private`ExpVar^9) + 82874779/(59270400*HarmonicSums`Private`ExpVar^8) + 105967/(216000*HarmonicSums`Private`ExpVar^7) - 38153/(432000*HarmonicSums`Private`ExpVar^6) - 659/(1728*HarmonicSums`Private`ExpVar^5) + 437/(864*HarmonicSums`Private`ExpVar^4) - 9/(16*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (93/(5*HarmonicSums`Private`ExpVar^10) - 51/(20*HarmonicSums`Private`ExpVar^8) + 3/(5*HarmonicSums`Private`ExpVar^6) - 3/(10*HarmonicSums`Private`ExpVar^4) + 3/(5*HarmonicSums`Private`ExpVar^2) - 6/(5*HarmonicSums`Private`ExpVar))*z2^2 + z2*((-1)^HarmonicSums`Private`ExpVar* (-2297/(240*HarmonicSums`Private`ExpVar^10) + 103/(35*HarmonicSums`Private`ExpVar^9) + 443/(336*HarmonicSums`Private`ExpVar^8) - 31/(60*HarmonicSums`Private`ExpVar^7) - 77/(240*HarmonicSums`Private`ExpVar^6) + 1/(6*HarmonicSums`Private`ExpVar^5) + 11/(48*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) - (7*z3)/8) - 4*z5) + (-1)^HarmonicSums`Private`ExpVar*(-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar)*z5, S[-1, 2, 1, 1, 1, HarmonicSums`Private`ExpVar] :> 5*li6half + (13*ln2^6)/360 + (-1)^HarmonicSums`Private`ExpVar* (46773705481/(40007520000*HarmonicSums`Private`ExpVar^10) - 5222721607/(1296540000*HarmonicSums`Private`ExpVar^9) - 12031370831/(24893568000*HarmonicSums`Private`ExpVar^8) + 739187/(1620000*HarmonicSums`Private`ExpVar^7) + 8795461/(25920000*HarmonicSums`Private`ExpVar^6) - 4969/(20736*HarmonicSums`Private`ExpVar^5) - 1171/(5184*HarmonicSums`Private`ExpVar^4) + 17/(32*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2)) + (5*s6)/2 + (-1)^HarmonicSums`Private`ExpVar* (-37027/(2800*HarmonicSums`Private`ExpVar^10) + 4687/(58800*HarmonicSums`Private`ExpVar^9) + 205967/(141120*HarmonicSums`Private`ExpVar^8) + 317/(3600*HarmonicSums`Private`ExpVar^7) - 839/(3600*HarmonicSums`Private`ExpVar^6) - 11/(144*HarmonicSums`Private`ExpVar^5) + 11/(288*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*sinf^2 + (-1)^HarmonicSums`Private`ExpVar* (2297/(720*HarmonicSums`Private`ExpVar^10) - 103/(105*HarmonicSums`Private`ExpVar^9) - 443/(1008*HarmonicSums`Private`ExpVar^8) + 31/(180*HarmonicSums`Private`ExpVar^7) + 77/(720*HarmonicSums`Private`ExpVar^6) - 1/(18*HarmonicSums`Private`ExpVar^5) - 11/(144*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2))*sinf^3 - (5*ln2^4*z2)/24 + ((-3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (-37027/(2800*HarmonicSums`Private`ExpVar^10) + 4687/(58800*HarmonicSums`Private`ExpVar^9) + 205967/(141120*HarmonicSums`Private`ExpVar^8) + 317/(3600*HarmonicSums`Private`ExpVar^7) - 839/(3600*HarmonicSums`Private`ExpVar^6) - 11/(144*HarmonicSums`Private`ExpVar^5) + 11/(288*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)))*z2 - (18*z2^3)/35 + sinf*((-1)^HarmonicSums`Private`ExpVar* (986046181/(63504000*HarmonicSums`Private`ExpVar^10) + 79915441/(24696000*HarmonicSums`Private`ExpVar^9) - 82874779/(59270400*HarmonicSums`Private`ExpVar^8) - 105967/(216000*HarmonicSums`Private`ExpVar^7) + 38153/(432000*HarmonicSums`Private`ExpVar^6) + 659/(1728*HarmonicSums`Private`ExpVar^5) - 437/(864*HarmonicSums`Private`ExpVar^4) + 9/(16*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (2297/(240*HarmonicSums`Private`ExpVar^10) - 103/(35*HarmonicSums`Private`ExpVar^9) - 443/(336*HarmonicSums`Private`ExpVar^8) + 31/(60*HarmonicSums`Private`ExpVar^7) + 77/(240*HarmonicSums`Private`ExpVar^6) - 1/(6*HarmonicSums`Private`ExpVar^5) - 11/(48*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2) + ln2^2*((3*li4half)/2 + (3*z2^2)/8) + (7*ln2^3*z3)/24 + (-1)^HarmonicSums`Private`ExpVar* (2297/(360*HarmonicSums`Private`ExpVar^10) - 206/(105*HarmonicSums`Private`ExpVar^9) - 443/(504*HarmonicSums`Private`ExpVar^8) + 31/(90*HarmonicSums`Private`ExpVar^7) + 77/(360*HarmonicSums`Private`ExpVar^6) - 1/(9*HarmonicSums`Private`ExpVar^5) - 11/(72*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(6*HarmonicSums`Private`ExpVar^2))*z3 - (11*z3^2)/64 + ln2*(4*li5half - (7*z2*z3)/8 - 4*z5) + (-1)^HarmonicSums`Private`ExpVar* (-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar)*z5, S[-1, -1, -2, -1, -1, HarmonicSums`Private`ExpVar] :> -48*li6half - ln2^6/24 + (-1)^HarmonicSums`Private`ExpVar* (5499973/(1935360*HarmonicSums`Private`ExpVar^10) + 836737/(322560*HarmonicSums`Private`ExpVar^9) - 4931/(10080*HarmonicSums`Private`ExpVar^8) - 7951/(11520*HarmonicSums`Private`ExpVar^7) + 2159/(3840*HarmonicSums`Private`ExpVar^6) - 83/(384*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-217/(480*HarmonicSums`Private`ExpVar^10) + 119/(1920*HarmonicSums`Private`ExpVar^8) - 7/(480*HarmonicSums`Private`ExpVar^6) + 7/(960*HarmonicSums`Private`ExpVar^4) - 7/(480*HarmonicSums`Private`ExpVar^2) + 7/(240*HarmonicSums`Private`ExpVar)) + li4half*(19/(16*HarmonicSums`Private`ExpVar^10) - 263/(120*HarmonicSums`Private`ExpVar^9) - 9/(32*HarmonicSums`Private`ExpVar^8) + 23/(42*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6) - 19/(60*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 5/(6*HarmonicSums`Private`ExpVar^3) - 3/(2*HarmonicSums`Private`ExpVar^2) + 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*li5half* (-403/(4*HarmonicSums`Private`ExpVar^10) + 221/(16*HarmonicSums`Private`ExpVar^8) - 13/(4*HarmonicSums`Private`ExpVar^6) + 13/(8*HarmonicSums`Private`ExpVar^4) - 13/(4*HarmonicSums`Private`ExpVar^2) + 13/(2*HarmonicSums`Private`ExpVar)) - 26*s6 + ln2^4*(19/(384*HarmonicSums`Private`ExpVar^10) - 263/(2880*HarmonicSums`Private`ExpVar^9) - 3/(256*HarmonicSums`Private`ExpVar^8) + 23/(1008*HarmonicSums`Private`ExpVar^7) + 1/(192*HarmonicSums`Private`ExpVar^6) - 19/(1440*HarmonicSums`Private`ExpVar^5) - 1/(192*HarmonicSums`Private`ExpVar^4) + 5/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar) - (5*z2)/12) + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (527/(48*HarmonicSums`Private`ExpVar^10) - 289/(192*HarmonicSums`Private`ExpVar^8) + 17/(48*HarmonicSums`Private`ExpVar^6) - 17/(96*HarmonicSums`Private`ExpVar^4) + 17/(48*HarmonicSums`Private`ExpVar^2) - 17/(24*HarmonicSums`Private`ExpVar))*z2 + (-133/(320*HarmonicSums`Private`ExpVar^10) + 1841/(2400*HarmonicSums`Private`ExpVar^9) + 63/(640*HarmonicSums`Private`ExpVar^8) - 23/(120*HarmonicSums`Private`ExpVar^7) - 7/(160*HarmonicSums`Private`ExpVar^6) + 133/(1200*HarmonicSums`Private`ExpVar^5) + 7/(160*HarmonicSums`Private`ExpVar^4) - 7/(24*HarmonicSums`Private`ExpVar^3) + 21/(40*HarmonicSums`Private`ExpVar^2) - 7/(10*HarmonicSums`Private`ExpVar))*z2^2 + (421*z2^3)/70 + (39*z3^2)/4 + z2*(-2*li4half + (-1)^HarmonicSums`Private`ExpVar* (1167/(320*HarmonicSums`Private`ExpVar^10) - 9281/(3360*HarmonicSums`Private`ExpVar^9) - 1207/(2688*HarmonicSums`Private`ExpVar^8) + 87/(160*HarmonicSums`Private`ExpVar^7) + 91/(960*HarmonicSums`Private`ExpVar^6) - 29/(96*HarmonicSums`Private`ExpVar^5) + 19/(96*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-651/(64*HarmonicSums`Private`ExpVar^10) + 357/(256*HarmonicSums`Private`ExpVar^8) - 21/(64*HarmonicSums`Private`ExpVar^6) + 21/(128*HarmonicSums`Private`ExpVar^4) - 21/(64*HarmonicSums`Private`ExpVar^2) + 21/(32*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(-2*li4half + (-1)^HarmonicSums`Private`ExpVar* (1167/(320*HarmonicSums`Private`ExpVar^10) - 9281/(3360*HarmonicSums`Private`ExpVar^9) - 1207/(2688*HarmonicSums`Private`ExpVar^8) + 87/(160*HarmonicSums`Private`ExpVar^7) + 91/(960*HarmonicSums`Private`ExpVar^6) - 29/(96*HarmonicSums`Private`ExpVar^5) + 19/(96*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + (19/(128*HarmonicSums`Private`ExpVar^10) - 263/(960*HarmonicSums`Private`ExpVar^9) - 9/(256*HarmonicSums`Private`ExpVar^8) + 23/(336*HarmonicSums`Private`ExpVar^7) + 1/(64*HarmonicSums`Private`ExpVar^6) - 19/(480*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (29*z2^2)/8 + (-1)^HarmonicSums`Private`ExpVar* (-651/(64*HarmonicSums`Private`ExpVar^10) + 357/(256*HarmonicSums`Private`ExpVar^8) - 21/(64*HarmonicSums`Private`ExpVar^6) + 21/(128*HarmonicSums`Private`ExpVar^4) - 21/(64*HarmonicSums`Private`ExpVar^2) + 21/(32*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (28241/(256*HarmonicSums`Private`ExpVar^10) - 15487/(1024*HarmonicSums`Private`ExpVar^8) + 911/(256*HarmonicSums`Private`ExpVar^6) - 911/(512*HarmonicSums`Private`ExpVar^4) + 911/(256*HarmonicSums`Private`ExpVar^2) - 911/(128*HarmonicSums`Private`ExpVar))*z5 + ln2*(-13*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) + 301993/(134400*HarmonicSums`Private`ExpVar^10) + 30209/(120960*HarmonicSums`Private`ExpVar^9) - 15643/(32256*HarmonicSums`Private`ExpVar^8) - 61/(560*HarmonicSums`Private`ExpVar^7) + 1099/(2880*HarmonicSums`Private`ExpVar^6) - 149/(480*HarmonicSums`Private`ExpVar^5) + 29/(192*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (-651/(32*HarmonicSums`Private`ExpVar^10) + 357/(128*HarmonicSums`Private`ExpVar^8) - 21/(32*HarmonicSums`Private`ExpVar^6) + 21/(64*HarmonicSums`Private`ExpVar^4) - 21/(32*HarmonicSums`Private`ExpVar^2) + 21/(16*HarmonicSums`Private`ExpVar))*z2^2 + (399/(512*HarmonicSums`Private`ExpVar^10) - 1841/(1280*HarmonicSums`Private`ExpVar^9) - 189/(1024*HarmonicSums`Private`ExpVar^8) + 23/(64*HarmonicSums`Private`ExpVar^7) + 21/(256*HarmonicSums`Private`ExpVar^6) - 133/(640*HarmonicSums`Private`ExpVar^5) - 21/(256*HarmonicSums`Private`ExpVar^4) + 35/(64*HarmonicSums`Private`ExpVar^3) - 63/(64*HarmonicSums`Private`ExpVar^2) + 21/(16*HarmonicSums`Private`ExpVar))*z3 + (911*z5)/64), S[-1, -1, -2, -1, 1, HarmonicSums`Private`ExpVar] :> -42*li6half - ln2^6/30 + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-217/(480*HarmonicSums`Private`ExpVar^10) + 119/(1920*HarmonicSums`Private`ExpVar^8) - 7/(480*HarmonicSums`Private`ExpVar^6) + 7/(960*HarmonicSums`Private`ExpVar^4) - 7/(480*HarmonicSums`Private`ExpVar^2) + 7/(240*HarmonicSums`Private`ExpVar)) + li4half*(57/(64*HarmonicSums`Private`ExpVar^10) - 263/(160*HarmonicSums`Private`ExpVar^9) - 27/(128*HarmonicSums`Private`ExpVar^8) + 23/(56*HarmonicSums`Private`ExpVar^7) + 3/(32*HarmonicSums`Private`ExpVar^6) - 19/(80*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 5/(8*HarmonicSums`Private`ExpVar^3) - 9/(8*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-403/(4*HarmonicSums`Private`ExpVar^10) + 221/(16*HarmonicSums`Private`ExpVar^8) - 13/(4*HarmonicSums`Private`ExpVar^6) + 13/(8*HarmonicSums`Private`ExpVar^4) - 13/(4*HarmonicSums`Private`ExpVar^2) + 13/(2*HarmonicSums`Private`ExpVar)) + 161939149/(112896000*HarmonicSums`Private`ExpVar^10) + 262646659/(304819200*HarmonicSums`Private`ExpVar^9) - 1900573/(9031680*HarmonicSums`Private`ExpVar^8) - 254839/(940800*HarmonicSums`Private`ExpVar^7) + 317/(1800*HarmonicSums`Private`ExpVar^6) + 223/(28800*HarmonicSums`Private`ExpVar^5) - 149/(2304*HarmonicSums`Private`ExpVar^4) + 5/(144*HarmonicSums`Private`ExpVar^3) - (47*s6)/2 + (-301993/(134400*HarmonicSums`Private`ExpVar^10) - 30209/(120960*HarmonicSums`Private`ExpVar^9) + 15643/(32256*HarmonicSums`Private`ExpVar^8) + 61/(560*HarmonicSums`Private`ExpVar^7) - 1099/(2880*HarmonicSums`Private`ExpVar^6) + 149/(480*HarmonicSums`Private`ExpVar^5) - 29/(192*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3))*sinf + ln2^4*(19/(512*HarmonicSums`Private`ExpVar^10) - 263/(3840*HarmonicSums`Private`ExpVar^9) - 9/(1024*HarmonicSums`Private`ExpVar^8) + 23/(1344*HarmonicSums`Private`ExpVar^7) + 1/(256*HarmonicSums`Private`ExpVar^6) - 19/(1920*HarmonicSums`Private`ExpVar^5) - 1/(256*HarmonicSums`Private`ExpVar^4) + 5/(192*HarmonicSums`Private`ExpVar^3) - 3/(64*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar) - z2/6) + (-2*li4half + (-1)^HarmonicSums`Private`ExpVar* (-1167/(320*HarmonicSums`Private`ExpVar^10) + 9281/(3360*HarmonicSums`Private`ExpVar^9) + 1207/(2688*HarmonicSums`Private`ExpVar^8) - 87/(160*HarmonicSums`Private`ExpVar^7) - 91/(960*HarmonicSums`Private`ExpVar^6) + 29/(96*HarmonicSums`Private`ExpVar^5) - 19/(96*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)))*z2 + (-741/(2560*HarmonicSums`Private`ExpVar^10) + 3419/(6400*HarmonicSums`Private`ExpVar^9) + 351/(5120*HarmonicSums`Private`ExpVar^8) - 299/(2240*HarmonicSums`Private`ExpVar^7) - 39/(1280*HarmonicSums`Private`ExpVar^6) + 247/(3200*HarmonicSums`Private`ExpVar^5) + 39/(1280*HarmonicSums`Private`ExpVar^4) - 13/(64*HarmonicSums`Private`ExpVar^3) + 117/(320*HarmonicSums`Private`ExpVar^2) - 39/(80*HarmonicSums`Private`ExpVar))*z2^2 + (1737*z2^3)/280 + ln2^2*(-2*li4half + (-1)^HarmonicSums`Private`ExpVar* (1167/(320*HarmonicSums`Private`ExpVar^10) - 9281/(3360*HarmonicSums`Private`ExpVar^9) - 1207/(2688*HarmonicSums`Private`ExpVar^8) + 87/(160*HarmonicSums`Private`ExpVar^7) + 91/(960*HarmonicSums`Private`ExpVar^6) - 29/(96*HarmonicSums`Private`ExpVar^5) + 19/(96*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + (47*z2^2)/20) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(6*HarmonicSums`Private`ExpVar^10) - 17/(24*HarmonicSums`Private`ExpVar^8) + 1/(6*HarmonicSums`Private`ExpVar^6) - 1/(12*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^2) - 1/(3*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/16) + (417*z3^2)/64 + (-1)^HarmonicSums`Private`ExpVar* (28241/(256*HarmonicSums`Private`ExpVar^10) - 15487/(1024*HarmonicSums`Private`ExpVar^8) + 911/(256*HarmonicSums`Private`ExpVar^6) - 911/(512*HarmonicSums`Private`ExpVar^4) + 911/(256*HarmonicSums`Private`ExpVar^2) - 911/(128*HarmonicSums`Private`ExpVar))*z5 + ln2*(-13*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (-837/(32*HarmonicSums`Private`ExpVar^10) + 459/(128*HarmonicSums`Private`ExpVar^8) - 27/(32*HarmonicSums`Private`ExpVar^6) + 27/(64*HarmonicSums`Private`ExpVar^4) - 27/(32*HarmonicSums`Private`ExpVar^2) + 27/(16*HarmonicSums`Private`ExpVar))*z2^2 + (21*z2*z3)/16 + (911*z5)/64), S[-1, -1, -2, 1, -1, HarmonicSums`Private`ExpVar] :> 3*li6half + (7*ln2^6)/240 + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-31/(240*HarmonicSums`Private`ExpVar^10) + 17/(960*HarmonicSums`Private`ExpVar^8) - 1/(240*HarmonicSums`Private`ExpVar^6) + 1/(480*HarmonicSums`Private`ExpVar^4) - 1/(240*HarmonicSums`Private`ExpVar^2) + 1/(120*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) - 1881959/(1612800*HarmonicSums`Private`ExpVar^10) + 36191/(96768*HarmonicSums`Private`ExpVar^9) + 42167/(129024*HarmonicSums`Private`ExpVar^8) - 3231/(8960*HarmonicSums`Private`ExpVar^7) + 2131/(11520*HarmonicSums`Private`ExpVar^6) - 19/(320*HarmonicSums`Private`ExpVar^5) + 1/(96*HarmonicSums`Private`ExpVar^4) + 3*s6 + (-1)^HarmonicSums`Private`ExpVar*ln2* (-1167/(160*HarmonicSums`Private`ExpVar^10) + 9281/(1680*HarmonicSums`Private`ExpVar^9) + 1207/(1344*HarmonicSums`Private`ExpVar^8) - 87/(80*HarmonicSums`Private`ExpVar^7) - 91/(480*HarmonicSums`Private`ExpVar^6) + 29/(48*HarmonicSums`Private`ExpVar^5) - 19/(48*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*sinf + (ln2^4*z2)/16 + (-57/(2560*HarmonicSums`Private`ExpVar^10) + 263/(6400*HarmonicSums`Private`ExpVar^9) + 27/(5120*HarmonicSums`Private`ExpVar^8) - 23/(2240*HarmonicSums`Private`ExpVar^7) - 3/(1280*HarmonicSums`Private`ExpVar^6) + 19/(3200*HarmonicSums`Private`ExpVar^5) + 3/(1280*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^3) + 9/(320*HarmonicSums`Private`ExpVar^2) - 3/(80*HarmonicSums`Private`ExpVar))*z2^2 + (2*z2^3)/35 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-1167/(320*HarmonicSums`Private`ExpVar^10) + 9281/(3360*HarmonicSums`Private`ExpVar^9) + 1207/(2688*HarmonicSums`Private`ExpVar^8) - 87/(160*HarmonicSums`Private`ExpVar^7) - 91/(960*HarmonicSums`Private`ExpVar^6) + 29/(96*HarmonicSums`Private`ExpVar^5) - 19/(96*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) + (-57/(256*HarmonicSums`Private`ExpVar^10) + 263/(640*HarmonicSums`Private`ExpVar^9) + 27/(512*HarmonicSums`Private`ExpVar^8) - 23/(224*HarmonicSums`Private`ExpVar^7) - 3/(128*HarmonicSums`Private`ExpVar^6) + 19/(320*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^3) + 9/(32*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*z2 - (9*z2^2)/8) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-93/(16*HarmonicSums`Private`ExpVar^10) + 51/(64*HarmonicSums`Private`ExpVar^8) - 3/(16*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^2) + 3/(8*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/16) - (165*z3^2)/128 + (-1)^HarmonicSums`Private`ExpVar* (3069/(128*HarmonicSums`Private`ExpVar^10) - 1683/(512*HarmonicSums`Private`ExpVar^8) + 99/(128*HarmonicSums`Private`ExpVar^6) - 99/(256*HarmonicSums`Private`ExpVar^4) + 99/(128*HarmonicSums`Private`ExpVar^2) - 99/(64*HarmonicSums`Private`ExpVar))*z5 + ln2*(-3*li5half + (-1)^HarmonicSums`Private`ExpVar* (20479771/(1209600*HarmonicSums`Private`ExpVar^10) - 5785907/(1411200*HarmonicSums`Private`ExpVar^9) - 44803/(23520*HarmonicSums`Private`ExpVar^8) + 9023/(14400*HarmonicSums`Private`ExpVar^7) + 4859/(14400*HarmonicSums`Private`ExpVar^6) - 59/(288*HarmonicSums`Private`ExpVar^5) - 11/(288*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(160*HarmonicSums`Private`ExpVar^10) + 17/(640*HarmonicSums`Private`ExpVar^8) - 1/(160*HarmonicSums`Private`ExpVar^6) + 1/(320*HarmonicSums`Private`ExpVar^4) - 1/(160*HarmonicSums`Private`ExpVar^2) + 1/(80*HarmonicSums`Private`ExpVar))*z2^2 - (21*z2*z3)/16 + (99*z5)/32), S[-1, -1, -2, 1, 1, HarmonicSums`Private`ExpVar] :> -7*li6half + (11*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar* (43674021491/(3048192000*HarmonicSums`Private`ExpVar^10) + 1315890451/(1185408000*HarmonicSums`Private`ExpVar^9) - 89643643/(59270400*HarmonicSums`Private`ExpVar^8) - 6287/(18000*HarmonicSums`Private`ExpVar^7) + 230671/(432000*HarmonicSums`Private`ExpVar^6) - 377/(1728*HarmonicSums`Private`ExpVar^5) + 121/(1728*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-31/(120*HarmonicSums`Private`ExpVar^10) + 17/(480*HarmonicSums`Private`ExpVar^8) - 1/(120*HarmonicSums`Private`ExpVar^6) + 1/(240*HarmonicSums`Private`ExpVar^4) - 1/(120*HarmonicSums`Private`ExpVar^2) + 1/(60*HarmonicSums`Private`ExpVar)) + li4half*(19/(64*HarmonicSums`Private`ExpVar^10) - 263/(480*HarmonicSums`Private`ExpVar^9) - 9/(128*HarmonicSums`Private`ExpVar^8) + 23/(168*HarmonicSums`Private`ExpVar^7) + 1/(32*HarmonicSums`Private`ExpVar^6) - 19/(240*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) - (9*s6)/4 + (-1)^HarmonicSums`Private`ExpVar* (-20479771/(1209600*HarmonicSums`Private`ExpVar^10) + 5785907/(1411200*HarmonicSums`Private`ExpVar^9) + 44803/(23520*HarmonicSums`Private`ExpVar^8) - 9023/(14400*HarmonicSums`Private`ExpVar^7) - 4859/(14400*HarmonicSums`Private`ExpVar^6) + 59/(288*HarmonicSums`Private`ExpVar^5) + 11/(288*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3))*sinf + (-1)^HarmonicSums`Private`ExpVar* (1167/(320*HarmonicSums`Private`ExpVar^10) - 9281/(3360*HarmonicSums`Private`ExpVar^9) - 1207/(2688*HarmonicSums`Private`ExpVar^8) + 87/(160*HarmonicSums`Private`ExpVar^7) + 91/(960*HarmonicSums`Private`ExpVar^6) - 29/(96*HarmonicSums`Private`ExpVar^5) + 19/(96*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3))*sinf^2 + ln2^4*(19/(1536*HarmonicSums`Private`ExpVar^10) - 263/(11520*HarmonicSums`Private`ExpVar^9) - 3/(1024*HarmonicSums`Private`ExpVar^8) + 23/(4032*HarmonicSums`Private`ExpVar^7) + 1/(768*HarmonicSums`Private`ExpVar^6) - 19/(5760*HarmonicSums`Private`ExpVar^5) - 1/(768*HarmonicSums`Private`ExpVar^4) + 5/(576*HarmonicSums`Private`ExpVar^3) - 1/(64*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar) - (7*z2)/48) + (-19/(512*HarmonicSums`Private`ExpVar^10) + 263/(3840*HarmonicSums`Private`ExpVar^9) + 9/(1024*HarmonicSums`Private`ExpVar^8) - 23/(1344*HarmonicSums`Private`ExpVar^7) - 1/(256*HarmonicSums`Private`ExpVar^6) + 19/(1920*HarmonicSums`Private`ExpVar^5) + 1/(256*HarmonicSums`Private`ExpVar^4) - 5/(192*HarmonicSums`Private`ExpVar^3) + 3/(64*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z2^2 + (233*z2^3)/280 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/24) + (241*z3^2)/128 + z2*(-li4half + (-1)^HarmonicSums`Private`ExpVar* (1167/(320*HarmonicSums`Private`ExpVar^10) - 9281/(3360*HarmonicSums`Private`ExpVar^9) - 1207/(2688*HarmonicSums`Private`ExpVar^8) + 87/(160*HarmonicSums`Private`ExpVar^7) + 91/(960*HarmonicSums`Private`ExpVar^6) - 29/(96*HarmonicSums`Private`ExpVar^5) + 19/(96*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-217/(64*HarmonicSums`Private`ExpVar^10) + 119/(256*HarmonicSums`Private`ExpVar^8) - 7/(64*HarmonicSums`Private`ExpVar^6) + 7/(128*HarmonicSums`Private`ExpVar^4) - 7/(64*HarmonicSums`Private`ExpVar^2) + 7/(32*HarmonicSums`Private`ExpVar))*z3) + ln2^2*((-19/(256*HarmonicSums`Private`ExpVar^10) + 263/(1920*HarmonicSums`Private`ExpVar^9) + 9/(512*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) - 1/(128*HarmonicSums`Private`ExpVar^6) + 19/(960*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - 5/(96*HarmonicSums`Private`ExpVar^3) + 3/(32*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 + (5*z2^2)/16 + (-1)^HarmonicSums`Private`ExpVar* (-217/(64*HarmonicSums`Private`ExpVar^10) + 119/(256*HarmonicSums`Private`ExpVar^8) - 7/(64*HarmonicSums`Private`ExpVar^6) + 7/(128*HarmonicSums`Private`ExpVar^4) - 7/(64*HarmonicSums`Private`ExpVar^2) + 7/(32*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (-2511/(256*HarmonicSums`Private`ExpVar^10) + 1377/(1024*HarmonicSums`Private`ExpVar^8) - 81/(256*HarmonicSums`Private`ExpVar^6) + 81/(512*HarmonicSums`Private`ExpVar^4) - 81/(256*HarmonicSums`Private`ExpVar^2) + 81/(128*HarmonicSums`Private`ExpVar))*z5 + ln2*(-3*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (93/(10*HarmonicSums`Private`ExpVar^10) - 51/(40*HarmonicSums`Private`ExpVar^8) + 3/(10*HarmonicSums`Private`ExpVar^6) - 3/(20*HarmonicSums`Private`ExpVar^4) + 3/(10*HarmonicSums`Private`ExpVar^2) - 3/(5*HarmonicSums`Private`ExpVar))*z2^2 + (133/(512*HarmonicSums`Private`ExpVar^10) - 1841/(3840*HarmonicSums`Private`ExpVar^9) - 63/(1024*HarmonicSums`Private`ExpVar^8) + 23/(192*HarmonicSums`Private`ExpVar^7) + 7/(256*HarmonicSums`Private`ExpVar^6) - 133/(1920*HarmonicSums`Private`ExpVar^5) - 7/(256*HarmonicSums`Private`ExpVar^4) + 35/(192*HarmonicSums`Private`ExpVar^3) - 21/(64*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3 - (7*z2*z3)/4 + (99*z5)/32), S[-1, -1, 2, -1, -1, HarmonicSums`Private`ExpVar] :> 48*li6half + (19*ln2^6)/240 + (-1)^HarmonicSums`Private`ExpVar*li5half* (124/HarmonicSums`Private`ExpVar^10 - 17/HarmonicSums`Private`ExpVar^8 + 4/HarmonicSums`Private`ExpVar^6 - 2/HarmonicSums`Private`ExpVar^4 + 4/HarmonicSums`Private`ExpVar^2 - 8/HarmonicSums`Private`ExpVar) + li4half*(-19/(64*HarmonicSums`Private`ExpVar^10) + 263/(480*HarmonicSums`Private`ExpVar^9) + 9/(128*HarmonicSums`Private`ExpVar^8) - 23/(168*HarmonicSums`Private`ExpVar^7) - 1/(32*HarmonicSums`Private`ExpVar^6) + 19/(240*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(120*HarmonicSums`Private`ExpVar^10) - 17/(480*HarmonicSums`Private`ExpVar^8) + 1/(120*HarmonicSums`Private`ExpVar^6) - 1/(240*HarmonicSums`Private`ExpVar^4) + 1/(120*HarmonicSums`Private`ExpVar^2) - 1/(60*HarmonicSums`Private`ExpVar)) + 665093/(403200*HarmonicSums`Private`ExpVar^10) + 36487/(103680*HarmonicSums`Private`ExpVar^9) - 9607/(35840*HarmonicSums`Private`ExpVar^8) - 24853/(80640*HarmonicSums`Private`ExpVar^7) + 1837/(3840*HarmonicSums`Private`ExpVar^6) - 109/(320*HarmonicSums`Private`ExpVar^5) + 5/(32*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + 26*s6 + ln2^4*(-19/(1536*HarmonicSums`Private`ExpVar^10) + 263/(11520*HarmonicSums`Private`ExpVar^9) + 3/(1024*HarmonicSums`Private`ExpVar^8) - 23/(4032*HarmonicSums`Private`ExpVar^7) - 1/(768*HarmonicSums`Private`ExpVar^6) + 19/(5760*HarmonicSums`Private`ExpVar^5) + 1/(768*HarmonicSums`Private`ExpVar^4) - 5/(576*HarmonicSums`Private`ExpVar^3) + 1/(64*HarmonicSums`Private`ExpVar^2) - 1/(48*HarmonicSums`Private`ExpVar) + (17*z2)/48) + ((7*li4half)/2 - 38237/(33600*HarmonicSums`Private`ExpVar^10) - 563/(672*HarmonicSums`Private`ExpVar^9) + 383/(2016*HarmonicSums`Private`ExpVar^8) + 781/(3360*HarmonicSums`Private`ExpVar^7) - 179/(2880*HarmonicSums`Private`ExpVar^6) - 33/(160*HarmonicSums`Private`ExpVar^5) + 59/(192*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (-217/(24*HarmonicSums`Private`ExpVar^10) + 119/(96*HarmonicSums`Private`ExpVar^8) - 7/(24*HarmonicSums`Private`ExpVar^6) + 7/(48*HarmonicSums`Private`ExpVar^4) - 7/(24*HarmonicSums`Private`ExpVar^2) + 7/(12*HarmonicSums`Private`ExpVar))*z2 + (-19/(2560*HarmonicSums`Private`ExpVar^10) + 263/(19200*HarmonicSums`Private`ExpVar^9) + 9/(5120*HarmonicSums`Private`ExpVar^8) - 23/(6720*HarmonicSums`Private`ExpVar^7) - 1/(1280*HarmonicSums`Private`ExpVar^6) + 19/(9600*HarmonicSums`Private`ExpVar^5) + 1/(1280*HarmonicSums`Private`ExpVar^4) - 1/(192*HarmonicSums`Private`ExpVar^3) + 3/(320*HarmonicSums`Private`ExpVar^2) - 1/(80*HarmonicSums`Private`ExpVar))*z2^2 - (3643*z2^3)/560 + ln2^2*((7*li4half)/2 - 38237/(33600*HarmonicSums`Private`ExpVar^10) - 563/(672*HarmonicSums`Private`ExpVar^9) + 383/(2016*HarmonicSums`Private`ExpVar^8) + 781/(3360*HarmonicSums`Private`ExpVar^7) - 179/(2880*HarmonicSums`Private`ExpVar^6) - 33/(160*HarmonicSums`Private`ExpVar^5) + 59/(192*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + (-95/(256*HarmonicSums`Private`ExpVar^10) + 263/(384*HarmonicSums`Private`ExpVar^9) + 45/(512*HarmonicSums`Private`ExpVar^8) - 115/(672*HarmonicSums`Private`ExpVar^7) - 5/(128*HarmonicSums`Private`ExpVar^6) + 19/(192*HarmonicSums`Private`ExpVar^5) + 5/(128*HarmonicSums`Private`ExpVar^4) - 25/(96*HarmonicSums`Private`ExpVar^3) + 15/(32*HarmonicSums`Private`ExpVar^2) - 5/(8*HarmonicSums`Private`ExpVar))*z2 - (263*z2^2)/80) - (39*z3^2)/4 + ln2*(16*li5half + (-1)^HarmonicSums`Private`ExpVar* (56033/(11520*HarmonicSums`Private`ExpVar^10) + 11533/(4480*HarmonicSums`Private`ExpVar^9) - 2417/(2688*HarmonicSums`Private`ExpVar^8) - 457/(960*HarmonicSums`Private`ExpVar^7) + 121/(240*HarmonicSums`Private`ExpVar^6) - 5/(24*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (2511/(80*HarmonicSums`Private`ExpVar^10) - 1377/(320*HarmonicSums`Private`ExpVar^8) + 81/(80*HarmonicSums`Private`ExpVar^6) - 81/(160*HarmonicSums`Private`ExpVar^4) + 81/(80*HarmonicSums`Private`ExpVar^2) - 81/(40*HarmonicSums`Private`ExpVar))*z2^2 - (245*z5)/16) + (-1)^HarmonicSums`Private`ExpVar* (-7595/(64*HarmonicSums`Private`ExpVar^10) + 4165/(256*HarmonicSums`Private`ExpVar^8) - 245/(64*HarmonicSums`Private`ExpVar^6) + 245/(128*HarmonicSums`Private`ExpVar^4) - 245/(64*HarmonicSums`Private`ExpVar^2) + 245/(32*HarmonicSums`Private`ExpVar))*z5, S[-1, -1, 2, -1, 1, HarmonicSums`Private`ExpVar] :> 42*li6half + (17*ln2^6)/240 + (-1)^HarmonicSums`Private`ExpVar* (-3446537/(29030400*HarmonicSums`Private`ExpVar^10) + 4106327/(1254400*HarmonicSums`Private`ExpVar^9) - 74539/(564480*HarmonicSums`Private`ExpVar^8) - 15713/(28800*HarmonicSums`Private`ExpVar^7) + 2923/(14400*HarmonicSums`Private`ExpVar^6) - 1/(288*HarmonicSums`Private`ExpVar^5) - 1/(72*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(217/(2*HarmonicSums`Private`ExpVar^10) - 119/(8*HarmonicSums`Private`ExpVar^8) + 7/(2*HarmonicSums`Private`ExpVar^6) - 7/(4*HarmonicSums`Private`ExpVar^4) + 7/(2*HarmonicSums`Private`ExpVar^2) - 7/HarmonicSums`Private`ExpVar) + li4half*(-19/(16*HarmonicSums`Private`ExpVar^10) + 263/(120*HarmonicSums`Private`ExpVar^9) + 9/(32*HarmonicSums`Private`ExpVar^8) - 23/(42*HarmonicSums`Private`ExpVar^7) - 1/(8*HarmonicSums`Private`ExpVar^6) + 19/(60*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 5/(6*HarmonicSums`Private`ExpVar^3) + 3/(2*HarmonicSums`Private`ExpVar^2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (31/(80*HarmonicSums`Private`ExpVar^10) - 17/(320*HarmonicSums`Private`ExpVar^8) + 1/(80*HarmonicSums`Private`ExpVar^6) - 1/(160*HarmonicSums`Private`ExpVar^4) + 1/(80*HarmonicSums`Private`ExpVar^2) - 1/(40*HarmonicSums`Private`ExpVar)) + 20*s6 + (-1)^HarmonicSums`Private`ExpVar* (-56033/(11520*HarmonicSums`Private`ExpVar^10) - 11533/(4480*HarmonicSums`Private`ExpVar^9) + 2417/(2688*HarmonicSums`Private`ExpVar^8) + 457/(960*HarmonicSums`Private`ExpVar^7) - 121/(240*HarmonicSums`Private`ExpVar^6) + 5/(24*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^4))*sinf + ln2^4*(-19/(384*HarmonicSums`Private`ExpVar^10) + 263/(2880*HarmonicSums`Private`ExpVar^9) + 3/(256*HarmonicSums`Private`ExpVar^8) - 23/(1008*HarmonicSums`Private`ExpVar^7) - 1/(192*HarmonicSums`Private`ExpVar^6) + 19/(1440*HarmonicSums`Private`ExpVar^5) + 1/(192*HarmonicSums`Private`ExpVar^4) - 5/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar) - z2/48) + (19/(32*HarmonicSums`Private`ExpVar^10) - 263/(240*HarmonicSums`Private`ExpVar^9) - 9/(64*HarmonicSums`Private`ExpVar^8) + 23/(84*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^6) - 19/(120*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 5/(12*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1))* z2^2 - (3331*z2^3)/560 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-217/(48*HarmonicSums`Private`ExpVar^10) + 119/(192*HarmonicSums`Private`ExpVar^8) - 7/(48*HarmonicSums`Private`ExpVar^6) + 7/(96*HarmonicSums`Private`ExpVar^4) - 7/(48*HarmonicSums`Private`ExpVar^2) + 7/(24*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/16) - (459*z3^2)/64 + z2*(li4half/2 + 38237/(33600*HarmonicSums`Private`ExpVar^10) + 563/(672*HarmonicSums`Private`ExpVar^9) - 383/(2016*HarmonicSums`Private`ExpVar^8) - 781/(3360*HarmonicSums`Private`ExpVar^7) + 179/(2880*HarmonicSums`Private`ExpVar^6) + 33/(160*HarmonicSums`Private`ExpVar^5) - 59/(192*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (651/(64*HarmonicSums`Private`ExpVar^10) - 357/(256*HarmonicSums`Private`ExpVar^8) + 21/(64*HarmonicSums`Private`ExpVar^6) - 21/(128*HarmonicSums`Private`ExpVar^4) + 21/(64*HarmonicSums`Private`ExpVar^2) - 21/(32*HarmonicSums`Private`ExpVar))*z3) + ln2^2*((7*li4half)/2 - 38237/(33600*HarmonicSums`Private`ExpVar^10) - 563/(672*HarmonicSums`Private`ExpVar^9) + 383/(2016*HarmonicSums`Private`ExpVar^8) + 781/(3360*HarmonicSums`Private`ExpVar^7) - 179/(2880*HarmonicSums`Private`ExpVar^6) - 33/(160*HarmonicSums`Private`ExpVar^5) + 59/(192*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + (19/(256*HarmonicSums`Private`ExpVar^10) - 263/(1920*HarmonicSums`Private`ExpVar^9) - 9/(512*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) + 1/(128*HarmonicSums`Private`ExpVar^6) - 19/(960*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) + 5/(96*HarmonicSums`Private`ExpVar^3) - 3/(32*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 - (191*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (651/(64*HarmonicSums`Private`ExpVar^10) - 357/(256*HarmonicSums`Private`ExpVar^8) + 21/(64*HarmonicSums`Private`ExpVar^6) - 21/(128*HarmonicSums`Private`ExpVar^4) + 21/(64*HarmonicSums`Private`ExpVar^2) - 21/(32*HarmonicSums`Private`ExpVar))*z3) + ln2*(16*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (1519/(80*HarmonicSums`Private`ExpVar^10) - 833/(320*HarmonicSums`Private`ExpVar^8) + 49/(80*HarmonicSums`Private`ExpVar^6) - 49/(160*HarmonicSums`Private`ExpVar^4) + 49/(80*HarmonicSums`Private`ExpVar^2) - 49/(40*HarmonicSums`Private`ExpVar))*z2^2 + (-399/(512*HarmonicSums`Private`ExpVar^10) + 1841/(1280*HarmonicSums`Private`ExpVar^9) + 189/(1024*HarmonicSums`Private`ExpVar^8) - 23/(64*HarmonicSums`Private`ExpVar^7) - 21/(256*HarmonicSums`Private`ExpVar^6) + 133/(640*HarmonicSums`Private`ExpVar^5) + 21/(256*HarmonicSums`Private`ExpVar^4) - 35/(64*HarmonicSums`Private`ExpVar^3) + 63/(64*HarmonicSums`Private`ExpVar^2) - 21/(16*HarmonicSums`Private`ExpVar))*z3 + (21*z2*z3)/16 - (245*z5)/16) + (-1)^HarmonicSums`Private`ExpVar* (-16151/(128*HarmonicSums`Private`ExpVar^10) + 8857/(512*HarmonicSums`Private`ExpVar^8) - 521/(128*HarmonicSums`Private`ExpVar^6) + 521/(256*HarmonicSums`Private`ExpVar^4) - 521/(128*HarmonicSums`Private`ExpVar^2) + 521/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, -1, 2, 1, -1, HarmonicSums`Private`ExpVar] :> 3*li6half + ln2^6/30 + (-1)^HarmonicSums`Private`ExpVar* (-43127/(10240*HarmonicSums`Private`ExpVar^10) + 34771/(107520*HarmonicSums`Private`ExpVar^9) + 3847/(5376*HarmonicSums`Private`ExpVar^8) - 391/(960*HarmonicSums`Private`ExpVar^7) + 73/(640*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^5)) + li4half*(-57/(64*HarmonicSums`Private`ExpVar^10) + 263/(160*HarmonicSums`Private`ExpVar^9) + 27/(128*HarmonicSums`Private`ExpVar^8) - 23/(56*HarmonicSums`Private`ExpVar^7) - 3/(32*HarmonicSums`Private`ExpVar^6) + 19/(80*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 5/(8*HarmonicSums`Private`ExpVar^3) + 9/(8*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar)) - (3*s6)/4 + ln2*(38237/(16800*HarmonicSums`Private`ExpVar^10) + 563/(336*HarmonicSums`Private`ExpVar^9) - 383/(1008*HarmonicSums`Private`ExpVar^8) - 781/(1680*HarmonicSums`Private`ExpVar^7) + 179/(1440*HarmonicSums`Private`ExpVar^6) + 33/(80*HarmonicSums`Private`ExpVar^5) - 59/(96*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*sinf + ln2^4*(-19/(512*HarmonicSums`Private`ExpVar^10) + 263/(3840*HarmonicSums`Private`ExpVar^9) + 9/(1024*HarmonicSums`Private`ExpVar^8) - 23/(1344*HarmonicSums`Private`ExpVar^7) - 1/(256*HarmonicSums`Private`ExpVar^6) + 19/(1920*HarmonicSums`Private`ExpVar^5) + 1/(256*HarmonicSums`Private`ExpVar^4) - 5/(192*HarmonicSums`Private`ExpVar^3) + 3/(64*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar) - (5*z2)/12) + (57/(160*HarmonicSums`Private`ExpVar^10) - 263/(400*HarmonicSums`Private`ExpVar^9) - 27/(320*HarmonicSums`Private`ExpVar^8) + 23/(140*HarmonicSums`Private`ExpVar^7) + 3/(80*HarmonicSums`Private`ExpVar^6) - 19/(200*HarmonicSums`Private`ExpVar^5) - 3/(80*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 9/(20*HarmonicSums`Private`ExpVar^2) + 3/(5*HarmonicSums`Private`ExpVar))*z2^2 - (11*z2^3)/7 + (7*ln2^3*z3)/16 + (39*z3^2)/64 + z2*((3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (651/(64*HarmonicSums`Private`ExpVar^10) - 357/(256*HarmonicSums`Private`ExpVar^8) + 21/(64*HarmonicSums`Private`ExpVar^6) - 21/(128*HarmonicSums`Private`ExpVar^4) + 21/(64*HarmonicSums`Private`ExpVar^2) - 21/(32*HarmonicSums`Private`ExpVar))*z3) + ln2^2*((3*li4half)/2 + 38237/(33600*HarmonicSums`Private`ExpVar^10) + 563/(672*HarmonicSums`Private`ExpVar^9) - 383/(2016*HarmonicSums`Private`ExpVar^8) - 781/(3360*HarmonicSums`Private`ExpVar^7) + 179/(2880*HarmonicSums`Private`ExpVar^6) + 33/(160*HarmonicSums`Private`ExpVar^5) - 59/(192*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (57/(128*HarmonicSums`Private`ExpVar^10) - 263/(320*HarmonicSums`Private`ExpVar^9) - 27/(256*HarmonicSums`Private`ExpVar^8) + 23/(112*HarmonicSums`Private`ExpVar^7) + 3/(64*HarmonicSums`Private`ExpVar^6) - 19/(160*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 5/(16*HarmonicSums`Private`ExpVar^3) - 9/(16*HarmonicSums`Private`ExpVar^2) + 3/(4*HarmonicSums`Private`ExpVar))*z2 + (7*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (651/(64*HarmonicSums`Private`ExpVar^10) - 357/(256*HarmonicSums`Private`ExpVar^8) + 21/(64*HarmonicSums`Private`ExpVar^6) - 21/(128*HarmonicSums`Private`ExpVar^4) + 21/(64*HarmonicSums`Private`ExpVar^2) - 21/(32*HarmonicSums`Private`ExpVar))*z3) + ln2*(4*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (93/(4*HarmonicSums`Private`ExpVar^10) - 51/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + 1800439/(2352000*HarmonicSums`Private`ExpVar^10) - 619807/(423360*HarmonicSums`Private`ExpVar^9) - 69997/(282240*HarmonicSums`Private`ExpVar^8) + 53197/(235200*HarmonicSums`Private`ExpVar^7) + 3961/(28800*HarmonicSums`Private`ExpVar^6) - 33/(1600*HarmonicSums`Private`ExpVar^5) - 371/(1152*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-93/(10*HarmonicSums`Private`ExpVar^10) + 51/(40*HarmonicSums`Private`ExpVar^8) - 3/(10*HarmonicSums`Private`ExpVar^6) + 3/(20*HarmonicSums`Private`ExpVar^4) - 3/(10*HarmonicSums`Private`ExpVar^2) + 3/(5*HarmonicSums`Private`ExpVar))*z2^2 + (-133/(512*HarmonicSums`Private`ExpVar^10) + 1841/(3840*HarmonicSums`Private`ExpVar^9) + 63/(1024*HarmonicSums`Private`ExpVar^8) - 23/(192*HarmonicSums`Private`ExpVar^7) - 7/(256*HarmonicSums`Private`ExpVar^6) + 133/(1920*HarmonicSums`Private`ExpVar^5) + 7/(256*HarmonicSums`Private`ExpVar^4) - 35/(192*HarmonicSums`Private`ExpVar^3) + 21/(64*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3 + (21*z2*z3)/16 - (81*z5)/64) + (-1)^HarmonicSums`Private`ExpVar* (-2697/(128*HarmonicSums`Private`ExpVar^10) + 1479/(512*HarmonicSums`Private`ExpVar^8) - 87/(128*HarmonicSums`Private`ExpVar^6) + 87/(256*HarmonicSums`Private`ExpVar^4) - 87/(128*HarmonicSums`Private`ExpVar^2) + 87/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, -1, 2, 1, 1, HarmonicSums`Private`ExpVar] :> 5*li6half + (13*ln2^6)/360 + (-1)^HarmonicSums`Private`ExpVar*li5half* (31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (341/(480*HarmonicSums`Private`ExpVar^10) - 187/(1920*HarmonicSums`Private`ExpVar^8) + 11/(480*HarmonicSums`Private`ExpVar^6) - 11/(960*HarmonicSums`Private`ExpVar^4) + 11/(480*HarmonicSums`Private`ExpVar^2) - 11/(240*HarmonicSums`Private`ExpVar)) + 36953932889/(17781120000*HarmonicSums`Private`ExpVar^10) - 590334797/(1066867200*HarmonicSums`Private`ExpVar^9) - 473998739/(1422489600*HarmonicSums`Private`ExpVar^8) - 5205847/(148176000*HarmonicSums`Private`ExpVar^7) + 1865329/(5184000*HarmonicSums`Private`ExpVar^6) - 15143/(32000*HarmonicSums`Private`ExpVar^5) + 7613/(13824*HarmonicSums`Private`ExpVar^4) - 7/(12*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2) + (-1800439/(2352000*HarmonicSums`Private`ExpVar^10) + 619807/(423360*HarmonicSums`Private`ExpVar^9) + 69997/(282240*HarmonicSums`Private`ExpVar^8) - 53197/(235200*HarmonicSums`Private`ExpVar^7) - 3961/(28800*HarmonicSums`Private`ExpVar^6) + 33/(1600*HarmonicSums`Private`ExpVar^5) + 371/(1152*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2))*sinf + (-38237/(33600*HarmonicSums`Private`ExpVar^10) - 563/(672*HarmonicSums`Private`ExpVar^9) + 383/(2016*HarmonicSums`Private`ExpVar^8) + 781/(3360*HarmonicSums`Private`ExpVar^7) - 179/(2880*HarmonicSums`Private`ExpVar^6) - 33/(160*HarmonicSums`Private`ExpVar^5) + 59/(192*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*sinf^2 - (ln2^4*z2)/12 + (-57/(160*HarmonicSums`Private`ExpVar^10) + 263/(400*HarmonicSums`Private`ExpVar^9) + 27/(320*HarmonicSums`Private`ExpVar^8) - 23/(140*HarmonicSums`Private`ExpVar^7) - 3/(80*HarmonicSums`Private`ExpVar^6) + 19/(200*HarmonicSums`Private`ExpVar^5) + 3/(80*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 9/(20*HarmonicSums`Private`ExpVar^2) - 3/(5*HarmonicSums`Private`ExpVar))*z2^2 - (3*z2^3)/5 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-155/(48*HarmonicSums`Private`ExpVar^10) + 85/(192*HarmonicSums`Private`ExpVar^8) - 5/(48*HarmonicSums`Private`ExpVar^6) + 5/(96*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^2) + 5/(24*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/24) - (49*z3^2)/32 + ln2^2*((3*li4half)/2 + (9*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (217/(32*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^6) - 7/(64*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3) + z2*((3*li4half)/2 - 38237/(33600*HarmonicSums`Private`ExpVar^10) - 563/(672*HarmonicSums`Private`ExpVar^9) + 383/(2016*HarmonicSums`Private`ExpVar^8) + 781/(3360*HarmonicSums`Private`ExpVar^7) - 179/(2880*HarmonicSums`Private`ExpVar^6) - 33/(160*HarmonicSums`Private`ExpVar^5) + 59/(192*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-217/(32*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^6) + 7/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(4*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (93/(4*HarmonicSums`Private`ExpVar^10) - 51/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z2^2 + (7*z2*z3)/8 - (81*z5)/64) + (-1)^HarmonicSums`Private`ExpVar* (-2511/(256*HarmonicSums`Private`ExpVar^10) + 1377/(1024*HarmonicSums`Private`ExpVar^8) - 81/(256*HarmonicSums`Private`ExpVar^6) + 81/(512*HarmonicSums`Private`ExpVar^4) - 81/(256*HarmonicSums`Private`ExpVar^2) + 81/(128*HarmonicSums`Private`ExpVar))*z5, S[-1, -1, -1, -2, -1, HarmonicSums`Private`ExpVar] :> 16*li6half + (23*ln2^6)/360 + (-1)^HarmonicSums`Private`ExpVar* (-128563/(276480*HarmonicSums`Private`ExpVar^10) + 520679/(322560*HarmonicSums`Private`ExpVar^9) + 9911/(161280*HarmonicSums`Private`ExpVar^8) - 3181/(5760*HarmonicSums`Private`ExpVar^7) + 1321/(3840*HarmonicSums`Private`ExpVar^6) - 15/(128*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(341/(4*HarmonicSums`Private`ExpVar^10) - 187/(16*HarmonicSums`Private`ExpVar^8) + 11/(4*HarmonicSums`Private`ExpVar^6) - 11/(8*HarmonicSums`Private`ExpVar^4) + 11/(4*HarmonicSums`Private`ExpVar^2) - 11/(2*HarmonicSums`Private`ExpVar)) + li4half*(-19/(16*HarmonicSums`Private`ExpVar^10) + 263/(120*HarmonicSums`Private`ExpVar^9) + 9/(32*HarmonicSums`Private`ExpVar^8) - 23/(42*HarmonicSums`Private`ExpVar^7) - 1/(8*HarmonicSums`Private`ExpVar^6) + 19/(60*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4) - 5/(6*HarmonicSums`Private`ExpVar^3) + 3/(2*HarmonicSums`Private`ExpVar^2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (93/(160*HarmonicSums`Private`ExpVar^10) - 51/(640*HarmonicSums`Private`ExpVar^8) + 3/(160*HarmonicSums`Private`ExpVar^6) - 3/(320*HarmonicSums`Private`ExpVar^4) + 3/(160*HarmonicSums`Private`ExpVar^2) - 3/(80*HarmonicSums`Private`ExpVar)) + 4*s6 + ln2^4*(-19/(384*HarmonicSums`Private`ExpVar^10) + 263/(2880*HarmonicSums`Private`ExpVar^9) + 3/(256*HarmonicSums`Private`ExpVar^8) - 23/(1008*HarmonicSums`Private`ExpVar^7) - 1/(192*HarmonicSums`Private`ExpVar^6) + 19/(1440*HarmonicSums`Private`ExpVar^5) + 1/(192*HarmonicSums`Private`ExpVar^4) - 5/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar) - z2/12) + (133/(320*HarmonicSums`Private`ExpVar^10) - 1841/(2400*HarmonicSums`Private`ExpVar^9) - 63/(640*HarmonicSums`Private`ExpVar^8) + 23/(120*HarmonicSums`Private`ExpVar^7) + 7/(160*HarmonicSums`Private`ExpVar^6) - 133/(1200*HarmonicSums`Private`ExpVar^5) - 7/(160*HarmonicSums`Private`ExpVar^4) + 7/(24*HarmonicSums`Private`ExpVar^3) - 21/(40*HarmonicSums`Private`ExpVar^2) + 7/(10*HarmonicSums`Private`ExpVar))*z2^2 - (249*z2^3)/70 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-155/(24*HarmonicSums`Private`ExpVar^10) + 85/(96*HarmonicSums`Private`ExpVar^8) - 5/(24*HarmonicSums`Private`ExpVar^6) + 5/(48*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^2) + 5/(12*HarmonicSums`Private`ExpVar))*z2 + (13*z3)/24) + (-1)^HarmonicSums`Private`ExpVar* (-100969/(12288*HarmonicSums`Private`ExpVar^10) + 4213/(14336*HarmonicSums`Private`ExpVar^9) + 49615/(43008*HarmonicSums`Private`ExpVar^8) - 91/(1536*HarmonicSums`Private`ExpVar^7) - 901/(3072*HarmonicSums`Private`ExpVar^6) + 25/(1536*HarmonicSums`Private`ExpVar^5) + 185/(768*HarmonicSums`Private`ExpVar^4) - 35/(128*HarmonicSums`Private`ExpVar^3) + 5/(32*HarmonicSums`Private`ExpVar^2))*z3 - (9*z3^2)/8 + z2*(2*li4half + (-1)^HarmonicSums`Private`ExpVar* (403/(32*HarmonicSums`Private`ExpVar^10) - 221/(128*HarmonicSums`Private`ExpVar^8) + 13/(32*HarmonicSums`Private`ExpVar^6) - 13/(64*HarmonicSums`Private`ExpVar^4) + 13/(32*HarmonicSums`Private`ExpVar^2) - 13/(16*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(2*li4half + (-19/(128*HarmonicSums`Private`ExpVar^10) + 263/(960*HarmonicSums`Private`ExpVar^9) + 9/(256*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) - 1/(64*HarmonicSums`Private`ExpVar^6) + 19/(480*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 - (39*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (403/(32*HarmonicSums`Private`ExpVar^10) - 221/(128*HarmonicSums`Private`ExpVar^8) + 13/(32*HarmonicSums`Private`ExpVar^6) - 13/(64*HarmonicSums`Private`ExpVar^4) + 13/(32*HarmonicSums`Private`ExpVar^2) - 13/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(5*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + 129169/(44800*HarmonicSums`Private`ExpVar^10) + 98507/(120960*HarmonicSums`Private`ExpVar^9) - 21317/(32256*HarmonicSums`Private`ExpVar^8) - 1483/(6720*HarmonicSums`Private`ExpVar^7) + 359/(720*HarmonicSums`Private`ExpVar^6) - 173/(480*HarmonicSums`Private`ExpVar^5) + 31/(192*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (1271/(160*HarmonicSums`Private`ExpVar^10) - 697/(640*HarmonicSums`Private`ExpVar^8) + 41/(160*HarmonicSums`Private`ExpVar^6) - 41/(320*HarmonicSums`Private`ExpVar^4) + 41/(160*HarmonicSums`Private`ExpVar^2) - 41/(80*HarmonicSums`Private`ExpVar))*z2^2 + (-95/(512*HarmonicSums`Private`ExpVar^10) + 263/(768*HarmonicSums`Private`ExpVar^9) + 45/(1024*HarmonicSums`Private`ExpVar^8) - 115/(1344*HarmonicSums`Private`ExpVar^7) - 5/(256*HarmonicSums`Private`ExpVar^6) + 19/(384*HarmonicSums`Private`ExpVar^5) + 5/(256*HarmonicSums`Private`ExpVar^4) - 25/(192*HarmonicSums`Private`ExpVar^3) + 15/(64*HarmonicSums`Private`ExpVar^2) - 5/(16*HarmonicSums`Private`ExpVar))*z3 + z2*((-1)^HarmonicSums`Private`ExpVar* (100969/(5120*HarmonicSums`Private`ExpVar^10) - 12639/(17920*HarmonicSums`Private`ExpVar^9) - 9923/(3584*HarmonicSums`Private`ExpVar^8) + 91/(640*HarmonicSums`Private`ExpVar^7) + 901/(1280*HarmonicSums`Private`ExpVar^6) - 5/(128*HarmonicSums`Private`ExpVar^5) - 37/(64*HarmonicSums`Private`ExpVar^4) + 21/(32*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2)) + 2*z3) - (101*z5)/64) + (-1)^HarmonicSums`Private`ExpVar* (-26195/(256*HarmonicSums`Private`ExpVar^10) + 14365/(1024*HarmonicSums`Private`ExpVar^8) - 845/(256*HarmonicSums`Private`ExpVar^6) + 845/(512*HarmonicSums`Private`ExpVar^4) - 845/(256*HarmonicSums`Private`ExpVar^2) + 845/(128*HarmonicSums`Private`ExpVar))*z5, S[-1, -1, -1, -2, 1, HarmonicSums`Private`ExpVar] :> 9*li6half + (13*ln2^6)/240 + (-1)^HarmonicSums`Private`ExpVar*li5half* (155/(4*HarmonicSums`Private`ExpVar^10) - 85/(16*HarmonicSums`Private`ExpVar^8) + 5/(4*HarmonicSums`Private`ExpVar^6) - 5/(8*HarmonicSums`Private`ExpVar^4) + 5/(4*HarmonicSums`Private`ExpVar^2) - 5/(2*HarmonicSums`Private`ExpVar)) + li4half*(-57/(64*HarmonicSums`Private`ExpVar^10) + 263/(160*HarmonicSums`Private`ExpVar^9) + 27/(128*HarmonicSums`Private`ExpVar^8) - 23/(56*HarmonicSums`Private`ExpVar^7) - 3/(32*HarmonicSums`Private`ExpVar^6) + 19/(80*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 5/(8*HarmonicSums`Private`ExpVar^3) + 9/(8*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar)) + 633114143/(338688000*HarmonicSums`Private`ExpVar^10) + 394206727/(304819200*HarmonicSums`Private`ExpVar^9) - 3071737/(9031680*HarmonicSums`Private`ExpVar^8) - 124673/(470400*HarmonicSums`Private`ExpVar^7) + 3127/(19200*HarmonicSums`Private`ExpVar^6) + 691/(28800*HarmonicSums`Private`ExpVar^5) - 163/(2304*HarmonicSums`Private`ExpVar^4) + 5/(144*HarmonicSums`Private`ExpVar^3) + (7*s6)/4 + (-129169/(44800*HarmonicSums`Private`ExpVar^10) - 98507/(120960*HarmonicSums`Private`ExpVar^9) + 21317/(32256*HarmonicSums`Private`ExpVar^8) + 1483/(6720*HarmonicSums`Private`ExpVar^7) - 359/(720*HarmonicSums`Private`ExpVar^6) + 173/(480*HarmonicSums`Private`ExpVar^5) - 31/(192*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3))*sinf + ln2^4*(-19/(512*HarmonicSums`Private`ExpVar^10) + 263/(3840*HarmonicSums`Private`ExpVar^9) + 9/(1024*HarmonicSums`Private`ExpVar^8) - 23/(1344*HarmonicSums`Private`ExpVar^7) - 1/(256*HarmonicSums`Private`ExpVar^6) + 19/(1920*HarmonicSums`Private`ExpVar^5) + 1/(256*HarmonicSums`Private`ExpVar^4) - 5/(192*HarmonicSums`Private`ExpVar^3) + 3/(64*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar) - (3*z2)/16) + (171/(2560*HarmonicSums`Private`ExpVar^10) - 789/(6400*HarmonicSums`Private`ExpVar^9) - 81/(5120*HarmonicSums`Private`ExpVar^8) + 69/(2240*HarmonicSums`Private`ExpVar^7) + 9/(1280*HarmonicSums`Private`ExpVar^6) - 57/(3200*HarmonicSums`Private`ExpVar^5) - 9/(1280*HarmonicSums`Private`ExpVar^4) + 3/(64*HarmonicSums`Private`ExpVar^3) - 27/(320*HarmonicSums`Private`ExpVar^2) + 9/(80*HarmonicSums`Private`ExpVar))*z2^2 - (65*z2^3)/56 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-217/(48*HarmonicSums`Private`ExpVar^10) + 119/(192*HarmonicSums`Private`ExpVar^8) - 7/(48*HarmonicSums`Private`ExpVar^6) + 7/(96*HarmonicSums`Private`ExpVar^4) - 7/(48*HarmonicSums`Private`ExpVar^2) + 7/(24*HarmonicSums`Private`ExpVar))*z2 + (13*z3)/24) + (-1)^HarmonicSums`Private`ExpVar* (-100969/(12288*HarmonicSums`Private`ExpVar^10) + 4213/(14336*HarmonicSums`Private`ExpVar^9) + 49615/(43008*HarmonicSums`Private`ExpVar^8) - 91/(1536*HarmonicSums`Private`ExpVar^7) - 901/(3072*HarmonicSums`Private`ExpVar^6) + 25/(1536*HarmonicSums`Private`ExpVar^5) + 185/(768*HarmonicSums`Private`ExpVar^4) - 35/(128*HarmonicSums`Private`ExpVar^3) + 5/(32*HarmonicSums`Private`ExpVar^2))*z3 - (25*z3^2)/8 + ln2^2*(2*li4half + (57/(256*HarmonicSums`Private`ExpVar^10) - 263/(640*HarmonicSums`Private`ExpVar^9) - 27/(512*HarmonicSums`Private`ExpVar^8) + 23/(224*HarmonicSums`Private`ExpVar^7) + 3/(128*HarmonicSums`Private`ExpVar^6) - 19/(320*HarmonicSums`Private`ExpVar^5) - 3/(128*HarmonicSums`Private`ExpVar^4) + 5/(32*HarmonicSums`Private`ExpVar^3) - 9/(32*HarmonicSums`Private`ExpVar^2) + 3/(8*HarmonicSums`Private`ExpVar))*z2 - (49*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (403/(32*HarmonicSums`Private`ExpVar^10) - 221/(128*HarmonicSums`Private`ExpVar^8) + 13/(32*HarmonicSums`Private`ExpVar^6) - 13/(64*HarmonicSums`Private`ExpVar^4) + 13/(32*HarmonicSums`Private`ExpVar^2) - 13/(16*HarmonicSums`Private`ExpVar))*z3) + z2*(2*li4half + (-1)^HarmonicSums`Private`ExpVar* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z3) + ln2*(5*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (-31/(160*HarmonicSums`Private`ExpVar^10) + 17/(640*HarmonicSums`Private`ExpVar^8) - 1/(160*HarmonicSums`Private`ExpVar^6) + 1/(320*HarmonicSums`Private`ExpVar^4) - 1/(160*HarmonicSums`Private`ExpVar^2) + 1/(80*HarmonicSums`Private`ExpVar))*z2^2 + (-95/(512*HarmonicSums`Private`ExpVar^10) + 263/(768*HarmonicSums`Private`ExpVar^9) + 45/(1024*HarmonicSums`Private`ExpVar^8) - 115/(1344*HarmonicSums`Private`ExpVar^7) - 5/(256*HarmonicSums`Private`ExpVar^6) + 19/(384*HarmonicSums`Private`ExpVar^5) + 5/(256*HarmonicSums`Private`ExpVar^4) - 25/(192*HarmonicSums`Private`ExpVar^3) + 15/(64*HarmonicSums`Private`ExpVar^2) - 5/(16*HarmonicSums`Private`ExpVar))*z3 + (13*z2*z3)/8 - (101*z5)/64) + (-1)^HarmonicSums`Private`ExpVar* (-3131/(256*HarmonicSums`Private`ExpVar^10) + 1717/(1024*HarmonicSums`Private`ExpVar^8) - 101/(256*HarmonicSums`Private`ExpVar^6) + 101/(512*HarmonicSums`Private`ExpVar^4) - 101/(256*HarmonicSums`Private`ExpVar^2) + 101/(128*HarmonicSums`Private`ExpVar))*z5, S[-1, -1, -1, 2, -1, HarmonicSums`Private`ExpVar] :> -22*li6half - (17*ln2^6)/360 + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (31/(160*HarmonicSums`Private`ExpVar^10) - 17/(640*HarmonicSums`Private`ExpVar^8) + 1/(160*HarmonicSums`Private`ExpVar^6) - 1/(320*HarmonicSums`Private`ExpVar^4) + 1/(160*HarmonicSums`Private`ExpVar^2) - 1/(80*HarmonicSums`Private`ExpVar)) + li4half*(19/(16*HarmonicSums`Private`ExpVar^10) - 263/(120*HarmonicSums`Private`ExpVar^9) - 9/(32*HarmonicSums`Private`ExpVar^8) + 23/(42*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6) - 19/(60*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 5/(6*HarmonicSums`Private`ExpVar^3) - 3/(2*HarmonicSums`Private`ExpVar^2) + 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*li5half* (-62/HarmonicSums`Private`ExpVar^10 + 17/(2*HarmonicSums`Private`ExpVar^8) - 2/HarmonicSums`Private`ExpVar^6 + HarmonicSums`Private`ExpVar^(-4) - 2/HarmonicSums`Private`ExpVar^2 + 4/HarmonicSums`Private`ExpVar) - 364339/(201600*HarmonicSums`Private`ExpVar^10) + 41569/(80640*HarmonicSums`Private`ExpVar^9) + 26293/(64512*HarmonicSums`Private`ExpVar^8) - 2851/(6720*HarmonicSums`Private`ExpVar^7) + 37/(180*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5) + 1/(96*HarmonicSums`Private`ExpVar^4) - 10*s6 + ln2^4*(19/(384*HarmonicSums`Private`ExpVar^10) - 263/(2880*HarmonicSums`Private`ExpVar^9) - 3/(256*HarmonicSums`Private`ExpVar^8) + 23/(1008*HarmonicSums`Private`ExpVar^7) + 1/(192*HarmonicSums`Private`ExpVar^6) - 19/(1440*HarmonicSums`Private`ExpVar^5) - 1/(192*HarmonicSums`Private`ExpVar^4) + 5/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar) - z2/24) + (-95/(256*HarmonicSums`Private`ExpVar^10) + 263/(384*HarmonicSums`Private`ExpVar^9) + 45/(512*HarmonicSums`Private`ExpVar^8) - 115/(672*HarmonicSums`Private`ExpVar^7) - 5/(128*HarmonicSums`Private`ExpVar^6) + 19/(192*HarmonicSums`Private`ExpVar^5) + 5/(128*HarmonicSums`Private`ExpVar^4) - 25/(96*HarmonicSums`Private`ExpVar^3) + 15/(32*HarmonicSums`Private`ExpVar^2) - 5/(8*HarmonicSums`Private`ExpVar))*z2^2 + (487*z2^3)/140 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(12*HarmonicSums`Private`ExpVar^10) - 17/(48*HarmonicSums`Private`ExpVar^8) + 1/(12*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar))*z2 - z3/24) + (-1)^HarmonicSums`Private`ExpVar* (100969/(30720*HarmonicSums`Private`ExpVar^10) - 4213/(35840*HarmonicSums`Private`ExpVar^9) - 9923/(21504*HarmonicSums`Private`ExpVar^8) + 91/(3840*HarmonicSums`Private`ExpVar^7) + 901/(7680*HarmonicSums`Private`ExpVar^6) - 5/(768*HarmonicSums`Private`ExpVar^5) - 37/(384*HarmonicSums`Private`ExpVar^4) + 7/(64*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z3 + (243*z3^2)/64 + z2*(-2*li4half + (-1)^HarmonicSums`Private`ExpVar* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(-2*li4half + (19/(128*HarmonicSums`Private`ExpVar^10) - 263/(960*HarmonicSums`Private`ExpVar^9) - 9/(256*HarmonicSums`Private`ExpVar^8) + 23/(336*HarmonicSums`Private`ExpVar^7) + 1/(64*HarmonicSums`Private`ExpVar^6) - 19/(480*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (9*z2^2)/10 + (-1)^HarmonicSums`Private`ExpVar* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (1891/(32*HarmonicSums`Private`ExpVar^10) - 1037/(128*HarmonicSums`Private`ExpVar^8) + 61/(32*HarmonicSums`Private`ExpVar^6) - 61/(64*HarmonicSums`Private`ExpVar^4) + 61/(32*HarmonicSums`Private`ExpVar^2) - 61/(16*HarmonicSums`Private`ExpVar))*z5 + ln2*(-8*li5half + (-1)^HarmonicSums`Private`ExpVar* (12283/(960*HarmonicSums`Private`ExpVar^10) - 33997/(10080*HarmonicSums`Private`ExpVar^9) - 147271/(80640*HarmonicSums`Private`ExpVar^8) + 1997/(2880*HarmonicSums`Private`ExpVar^7) + 1271/(1920*HarmonicSums`Private`ExpVar^6) - 155/(192*HarmonicSums`Private`ExpVar^5) + 7/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-1457/(160*HarmonicSums`Private`ExpVar^10) + 799/(640*HarmonicSums`Private`ExpVar^8) - 47/(160*HarmonicSums`Private`ExpVar^6) + 47/(320*HarmonicSums`Private`ExpVar^4) - 47/(160*HarmonicSums`Private`ExpVar^2) + 47/(80*HarmonicSums`Private`ExpVar))*z2^2 + z2*((-1)^HarmonicSums`Private`ExpVar* (-100969/(5120*HarmonicSums`Private`ExpVar^10) + 12639/(17920*HarmonicSums`Private`ExpVar^9) + 9923/(3584*HarmonicSums`Private`ExpVar^8) - 91/(640*HarmonicSums`Private`ExpVar^7) - 901/(1280*HarmonicSums`Private`ExpVar^6) + 5/(128*HarmonicSums`Private`ExpVar^5) + 37/(64*HarmonicSums`Private`ExpVar^4) - 21/(32*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2)) - z3/2) + (19/(256*HarmonicSums`Private`ExpVar^10) - 263/(1920*HarmonicSums`Private`ExpVar^9) - 9/(512*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) + 1/(128*HarmonicSums`Private`ExpVar^6) - 19/(960*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) + 5/(96*HarmonicSums`Private`ExpVar^3) - 3/(32*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z3 + (61*z5)/8), S[-1, -1, -1, 2, 1, HarmonicSums`Private`ExpVar] :> -13*li6half - (5*ln2^6)/144 + (-1)^HarmonicSums`Private`ExpVar* (43952731/(4838400*HarmonicSums`Private`ExpVar^10) + 5273903/(1881600*HarmonicSums`Private`ExpVar^9) - 9682727/(11289600*HarmonicSums`Private`ExpVar^8) - 8977/(14400*HarmonicSums`Private`ExpVar^7) + 6713/(115200*HarmonicSums`Private`ExpVar^6) + 1163/(2304*HarmonicSums`Private`ExpVar^5) - 15/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-31/(480*HarmonicSums`Private`ExpVar^10) + 17/(1920*HarmonicSums`Private`ExpVar^8) - 1/(480*HarmonicSums`Private`ExpVar^6) + 1/(960*HarmonicSums`Private`ExpVar^4) - 1/(480*HarmonicSums`Private`ExpVar^2) + 1/(240*HarmonicSums`Private`ExpVar)) + li4half*(19/(64*HarmonicSums`Private`ExpVar^10) - 263/(480*HarmonicSums`Private`ExpVar^9) - 9/(128*HarmonicSums`Private`ExpVar^8) + 23/(168*HarmonicSums`Private`ExpVar^7) + 1/(32*HarmonicSums`Private`ExpVar^6) - 19/(240*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) - (19*s6)/4 + (-1)^HarmonicSums`Private`ExpVar* (-12283/(960*HarmonicSums`Private`ExpVar^10) + 33997/(10080*HarmonicSums`Private`ExpVar^9) + 147271/(80640*HarmonicSums`Private`ExpVar^8) - 1997/(2880*HarmonicSums`Private`ExpVar^7) - 1271/(1920*HarmonicSums`Private`ExpVar^6) + 155/(192*HarmonicSums`Private`ExpVar^5) - 7/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*sinf + ln2^4*(19/(1536*HarmonicSums`Private`ExpVar^10) - 263/(11520*HarmonicSums`Private`ExpVar^9) - 3/(1024*HarmonicSums`Private`ExpVar^8) + 23/(4032*HarmonicSums`Private`ExpVar^7) + 1/(768*HarmonicSums`Private`ExpVar^6) - 19/(5760*HarmonicSums`Private`ExpVar^5) - 1/(768*HarmonicSums`Private`ExpVar^4) + 5/(576*HarmonicSums`Private`ExpVar^3) - 1/(64*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar) + (7*z2)/48) + (19/(2560*HarmonicSums`Private`ExpVar^10) - 263/(19200*HarmonicSums`Private`ExpVar^9) - 9/(5120*HarmonicSums`Private`ExpVar^8) + 23/(6720*HarmonicSums`Private`ExpVar^7) + 1/(1280*HarmonicSums`Private`ExpVar^6) - 19/(9600*HarmonicSums`Private`ExpVar^5) - 1/(1280*HarmonicSums`Private`ExpVar^4) + 1/(192*HarmonicSums`Private`ExpVar^3) - 3/(320*HarmonicSums`Private`ExpVar^2) + 1/(80*HarmonicSums`Private`ExpVar))*z2^2 + (163*z2^3)/140 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-31/(48*HarmonicSums`Private`ExpVar^10) + 17/(192*HarmonicSums`Private`ExpVar^8) - 1/(48*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar))*z2 - z3/24) + (-1)^HarmonicSums`Private`ExpVar* (100969/(3840*HarmonicSums`Private`ExpVar^10) - 4213/(4480*HarmonicSums`Private`ExpVar^9) - 9923/(2688*HarmonicSums`Private`ExpVar^8) + 91/(480*HarmonicSums`Private`ExpVar^7) + 901/(960*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^5) - 37/(48*HarmonicSums`Private`ExpVar^4) + 7/(8*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2))*z3 + (117*z3^2)/64 + z2*(li4half + (-1)^HarmonicSums`Private`ExpVar* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(-2*li4half + (-19/(256*HarmonicSums`Private`ExpVar^10) + 263/(1920*HarmonicSums`Private`ExpVar^9) + 9/(512*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) - 1/(128*HarmonicSums`Private`ExpVar^6) + 19/(960*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - 5/(96*HarmonicSums`Private`ExpVar^3) + 3/(32*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 - (21*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (899/(64*HarmonicSums`Private`ExpVar^10) - 493/(256*HarmonicSums`Private`ExpVar^8) + 29/(64*HarmonicSums`Private`ExpVar^6) - 29/(128*HarmonicSums`Private`ExpVar^4) + 29/(64*HarmonicSums`Private`ExpVar^2) - 29/(32*HarmonicSums`Private`ExpVar))*z5 + ln2*(-8*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-279/(160*HarmonicSums`Private`ExpVar^10) + 153/(640*HarmonicSums`Private`ExpVar^8) - 9/(160*HarmonicSums`Private`ExpVar^6) + 9/(320*HarmonicSums`Private`ExpVar^4) - 9/(160*HarmonicSums`Private`ExpVar^2) + 9/(80*HarmonicSums`Private`ExpVar))*z2^2 + (19/(256*HarmonicSums`Private`ExpVar^10) - 263/(1920*HarmonicSums`Private`ExpVar^9) - 9/(512*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) + 1/(128*HarmonicSums`Private`ExpVar^6) - 19/(960*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) + 5/(96*HarmonicSums`Private`ExpVar^3) - 3/(32*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z3 - (z2*z3)/8 + (61*z5)/8), S[-1, -1, -1, -1, -2, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (-565021/(276480*HarmonicSums`Private`ExpVar^10) + 589849/(322560*HarmonicSums`Private`ExpVar^9) + 44599/(161280*HarmonicSums`Private`ExpVar^8) - 395/(576*HarmonicSums`Private`ExpVar^7) + 489/(1280*HarmonicSums`Private`ExpVar^6) - 47/(384*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(160*HarmonicSums`Private`ExpVar^10) - 17/(640*HarmonicSums`Private`ExpVar^8) + 1/(160*HarmonicSums`Private`ExpVar^6) - 1/(320*HarmonicSums`Private`ExpVar^4) + 1/(160*HarmonicSums`Private`ExpVar^2) - 1/(80*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) - (ln2^4*z2)/48 + (57/(320*HarmonicSums`Private`ExpVar^10) - 263/(800*HarmonicSums`Private`ExpVar^9) - 27/(640*HarmonicSums`Private`ExpVar^8) + 23/(280*HarmonicSums`Private`ExpVar^7) + 3/(160*HarmonicSums`Private`ExpVar^6) - 19/(400*HarmonicSums`Private`ExpVar^5) - 3/(160*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 9/(40*HarmonicSums`Private`ExpVar^2) + 3/(10*HarmonicSums`Private`ExpVar))*z2^2 - (57*z2^3)/112 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-31/(48*HarmonicSums`Private`ExpVar^10) + 17/(192*HarmonicSums`Private`ExpVar^8) - 1/(48*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar))*z2 + z3/6) + (-1)^HarmonicSums`Private`ExpVar* (1312597/(61440*HarmonicSums`Private`ExpVar^10) - 54769/(71680*HarmonicSums`Private`ExpVar^9) - 128999/(43008*HarmonicSums`Private`ExpVar^8) + 1183/(7680*HarmonicSums`Private`ExpVar^7) + 11713/(15360*HarmonicSums`Private`ExpVar^6) - 65/(1536*HarmonicSums`Private`ExpVar^5) - 481/(768*HarmonicSums`Private`ExpVar^4) + 91/(128*HarmonicSums`Private`ExpVar^3) - 13/(32*HarmonicSums`Private`ExpVar^2))*z3 + z3^2/4 + z2*(-10693/(67200*HarmonicSums`Private`ExpVar^10) + 168251/(322560*HarmonicSums`Private`ExpVar^9) + 11251/(258048*HarmonicSums`Private`ExpVar^8) - 393/(2560*HarmonicSums`Private`ExpVar^7) - 559/(23040*HarmonicSums`Private`ExpVar^6) + 1/(6*HarmonicSums`Private`ExpVar^5) - 145/(768*HarmonicSums`Private`ExpVar^4) + 13/(96*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (93/(16*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^8) + 3/(16*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*z3) + ln2^2*((19/(256*HarmonicSums`Private`ExpVar^10) - 263/(1920*HarmonicSums`Private`ExpVar^9) - 9/(512*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) + 1/(128*HarmonicSums`Private`ExpVar^6) - 19/(960*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) + 5/(96*HarmonicSums`Private`ExpVar^3) - 3/(32*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 - (3*z2^2)/10 + (-1)^HarmonicSums`Private`ExpVar* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (-899/(256*HarmonicSums`Private`ExpVar^10) + 493/(1024*HarmonicSums`Private`ExpVar^8) - 29/(256*HarmonicSums`Private`ExpVar^6) + 29/(512*HarmonicSums`Private`ExpVar^4) - 29/(256*HarmonicSums`Private`ExpVar^2) + 29/(128*HarmonicSums`Private`ExpVar))*z5 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-93/(32*HarmonicSums`Private`ExpVar^10) + 51/(128*HarmonicSums`Private`ExpVar^8) - 3/(32*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^2) + 3/(16*HarmonicSums`Private`ExpVar))*z2^2 + z2*((-1)^HarmonicSums`Private`ExpVar* (-100969/(7680*HarmonicSums`Private`ExpVar^10) + 4213/(8960*HarmonicSums`Private`ExpVar^9) + 9923/(5376*HarmonicSums`Private`ExpVar^8) - 91/(960*HarmonicSums`Private`ExpVar^7) - 901/(1920*HarmonicSums`Private`ExpVar^6) + 5/(192*HarmonicSums`Private`ExpVar^5) + 37/(96*HarmonicSums`Private`ExpVar^4) - 7/(16*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (3*z3)/8) + (-19/(64*HarmonicSums`Private`ExpVar^10) + 263/(480*HarmonicSums`Private`ExpVar^9) + 9/(128*HarmonicSums`Private`ExpVar^8) - 23/(168*HarmonicSums`Private`ExpVar^7) - 1/(32*HarmonicSums`Private`ExpVar^6) + 19/(240*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z3 + z5), S[-1, -1, -1, -1, 2, HarmonicSums`Private`ExpVar] :> 3*li6half + ln2^6/240 + li4half*(-57/(64*HarmonicSums`Private`ExpVar^10) + 263/(160*HarmonicSums`Private`ExpVar^9) + 27/(128*HarmonicSums`Private`ExpVar^8) - 23/(56*HarmonicSums`Private`ExpVar^7) - 3/(32*HarmonicSums`Private`ExpVar^6) + 19/(80*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 5/(8*HarmonicSums`Private`ExpVar^3) + 9/(8*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + 2179691/(1612800*HarmonicSums`Private`ExpVar^10) + 279857/(207360*HarmonicSums`Private`ExpVar^9) - 204139/(645120*HarmonicSums`Private`ExpVar^8) - 49573/(80640*HarmonicSums`Private`ExpVar^7) + 8021/(11520*HarmonicSums`Private`ExpVar^6) - 27/(64*HarmonicSums`Private`ExpVar^5) + 11/(64*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) - (3*s6)/4 + ln2^4*(-19/(512*HarmonicSums`Private`ExpVar^10) + 263/(3840*HarmonicSums`Private`ExpVar^9) + 9/(1024*HarmonicSums`Private`ExpVar^8) - 23/(1344*HarmonicSums`Private`ExpVar^7) - 1/(256*HarmonicSums`Private`ExpVar^6) + 19/(1920*HarmonicSums`Private`ExpVar^5) + 1/(256*HarmonicSums`Private`ExpVar^4) - 5/(192*HarmonicSums`Private`ExpVar^3) + 3/(64*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar) - z2/48) + (57/(512*HarmonicSums`Private`ExpVar^10) - 263/(1280*HarmonicSums`Private`ExpVar^9) - 27/(1024*HarmonicSums`Private`ExpVar^8) + 23/(448*HarmonicSums`Private`ExpVar^7) + 3/(256*HarmonicSums`Private`ExpVar^6) - 19/(640*HarmonicSums`Private`ExpVar^5) - 3/(256*HarmonicSums`Private`ExpVar^4) + 5/(64*HarmonicSums`Private`ExpVar^3) - 9/(64*HarmonicSums`Private`ExpVar^2) + 3/(16*HarmonicSums`Private`ExpVar))*z2^2 - (99*z2^3)/280 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-31/(48*HarmonicSums`Private`ExpVar^10) + 17/(192*HarmonicSums`Private`ExpVar^8) - 1/(48*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar))*z2 + z3/6) + (-1)^HarmonicSums`Private`ExpVar* (-100969/(7680*HarmonicSums`Private`ExpVar^10) + 4213/(8960*HarmonicSums`Private`ExpVar^9) + 9923/(5376*HarmonicSums`Private`ExpVar^8) - 91/(960*HarmonicSums`Private`ExpVar^7) - 901/(1920*HarmonicSums`Private`ExpVar^6) + 5/(192*HarmonicSums`Private`ExpVar^5) + 37/(96*HarmonicSums`Private`ExpVar^4) - 7/(16*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z3 + (13*z3^2)/64 + ln2^2*((19/(256*HarmonicSums`Private`ExpVar^10) - 263/(1920*HarmonicSums`Private`ExpVar^9) - 9/(512*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) + 1/(128*HarmonicSums`Private`ExpVar^6) - 19/(960*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) + 5/(96*HarmonicSums`Private`ExpVar^3) - 3/(32*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 - (3*z2^2)/16 + (-1)^HarmonicSums`Private`ExpVar* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z3) + z2*(10693/(33600*HarmonicSums`Private`ExpVar^10) - 168251/(161280*HarmonicSums`Private`ExpVar^9) - 11251/(129024*HarmonicSums`Private`ExpVar^8) + 393/(1280*HarmonicSums`Private`ExpVar^7) + 559/(11520*HarmonicSums`Private`ExpVar^6) - 1/(3*HarmonicSums`Private`ExpVar^5) + 145/(384*HarmonicSums`Private`ExpVar^4) - 13/(48*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (93/(32*HarmonicSums`Private`ExpVar^10) - 51/(128*HarmonicSums`Private`ExpVar^8) + 3/(32*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^2) - 3/(16*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar*(31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))* z5 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-93/(20*HarmonicSums`Private`ExpVar^10) + 51/(80*HarmonicSums`Private`ExpVar^8) - 3/(20*HarmonicSums`Private`ExpVar^6) + 3/(40*HarmonicSums`Private`ExpVar^4) - 3/(20*HarmonicSums`Private`ExpVar^2) + 3/(10*HarmonicSums`Private`ExpVar))*z2^2 + z2*((-1)^HarmonicSums`Private`ExpVar* (100969/(15360*HarmonicSums`Private`ExpVar^10) - 4213/(17920*HarmonicSums`Private`ExpVar^9) - 9923/(10752*HarmonicSums`Private`ExpVar^8) + 91/(1920*HarmonicSums`Private`ExpVar^7) + 901/(3840*HarmonicSums`Private`ExpVar^6) - 5/(384*HarmonicSums`Private`ExpVar^5) - 37/(192*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (3*z3)/4) + (-19/(64*HarmonicSums`Private`ExpVar^10) + 263/(480*HarmonicSums`Private`ExpVar^9) + 9/(128*HarmonicSums`Private`ExpVar^8) - 23/(168*HarmonicSums`Private`ExpVar^7) - 1/(32*HarmonicSums`Private`ExpVar^6) + 19/(240*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z3 + z5), S[-1, -1, -1, 1, -2, HarmonicSums`Private`ExpVar] :> 2*li6half - (7*ln2^6)/720 + li4half*(-19/(32*HarmonicSums`Private`ExpVar^10) + 263/(240*HarmonicSums`Private`ExpVar^9) + 9/(64*HarmonicSums`Private`ExpVar^8) - 23/(84*HarmonicSums`Private`ExpVar^7) - 1/(16*HarmonicSums`Private`ExpVar^6) + 19/(120*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 5/(12*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-31/(120*HarmonicSums`Private`ExpVar^10) + 17/(480*HarmonicSums`Private`ExpVar^8) - 1/(120*HarmonicSums`Private`ExpVar^6) + 1/(240*HarmonicSums`Private`ExpVar^4) - 1/(120*HarmonicSums`Private`ExpVar^2) + 1/(60*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) - 4386629/(1612800*HarmonicSums`Private`ExpVar^10) + 238061/(483840*HarmonicSums`Private`ExpVar^9) + 76145/(129024*HarmonicSums`Private`ExpVar^8) - 13823/(26880*HarmonicSums`Private`ExpVar^7) + 2641/(11520*HarmonicSums`Private`ExpVar^6) - 21/(320*HarmonicSums`Private`ExpVar^5) + 1/(96*HarmonicSums`Private`ExpVar^4) - (9*s6)/4 + ln2^4*(-19/(768*HarmonicSums`Private`ExpVar^10) + 263/(5760*HarmonicSums`Private`ExpVar^9) + 3/(512*HarmonicSums`Private`ExpVar^8) - 23/(2016*HarmonicSums`Private`ExpVar^7) - 1/(384*HarmonicSums`Private`ExpVar^6) + 19/(2880*HarmonicSums`Private`ExpVar^5) + 1/(384*HarmonicSums`Private`ExpVar^4) - 5/(288*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar) + (7*z2)/48) + (-1)^HarmonicSums`Private`ExpVar* (-100969/(15360*HarmonicSums`Private`ExpVar^10) + 4213/(17920*HarmonicSums`Private`ExpVar^9) + 9923/(10752*HarmonicSums`Private`ExpVar^8) - 91/(1920*HarmonicSums`Private`ExpVar^7) - 901/(3840*HarmonicSums`Private`ExpVar^6) + 5/(384*HarmonicSums`Private`ExpVar^5) + 37/(192*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*sinf*z2 + (19/(320*HarmonicSums`Private`ExpVar^10) - 263/(2400*HarmonicSums`Private`ExpVar^9) - 9/(640*HarmonicSums`Private`ExpVar^8) + 23/(840*HarmonicSums`Private`ExpVar^7) + 1/(160*HarmonicSums`Private`ExpVar^6) - 19/(1200*HarmonicSums`Private`ExpVar^5) - 1/(160*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3) - 3/(40*HarmonicSums`Private`ExpVar^2) + 1/(10*HarmonicSums`Private`ExpVar))*z2^2 - (41*z2^3)/56 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(48*HarmonicSums`Private`ExpVar^10) - 17/(192*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar))*z2 + z3/48) + (-1)^HarmonicSums`Private`ExpVar* (-100969/(61440*HarmonicSums`Private`ExpVar^10) + 4213/(71680*HarmonicSums`Private`ExpVar^9) + 9923/(43008*HarmonicSums`Private`ExpVar^8) - 91/(7680*HarmonicSums`Private`ExpVar^7) - 901/(15360*HarmonicSums`Private`ExpVar^6) + 5/(1536*HarmonicSums`Private`ExpVar^5) + 37/(768*HarmonicSums`Private`ExpVar^4) - 7/(128*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2))*z3 - (189*z3^2)/128 + ln2^2*(-(li4half/2) - (13*z2^2)/16 + (-1)^HarmonicSums`Private`ExpVar* (31/(64*HarmonicSums`Private`ExpVar^10) - 17/(256*HarmonicSums`Private`ExpVar^8) + 1/(64*HarmonicSums`Private`ExpVar^6) - 1/(128*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^2) - 1/(32*HarmonicSums`Private`ExpVar))*z3) + z2*((5*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (10318457/(1433600*HarmonicSums`Private`ExpVar^10) + 13342793/(5017600*HarmonicSums`Private`ExpVar^9) - 3771437/(4515840*HarmonicSums`Private`ExpVar^8) - 26371/(57600*HarmonicSums`Private`ExpVar^7) + 36403/(230400*HarmonicSums`Private`ExpVar^6) + 737/(4608*HarmonicSums`Private`ExpVar^5) - 109/(1152*HarmonicSums`Private`ExpVar^4) - 5/(64*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-93/(32*HarmonicSums`Private`ExpVar^10) + 51/(128*HarmonicSums`Private`ExpVar^8) - 3/(32*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^2) + 3/(16*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (3875/(128*HarmonicSums`Private`ExpVar^10) - 2125/(512*HarmonicSums`Private`ExpVar^8) + 125/(128*HarmonicSums`Private`ExpVar^6) - 125/(256*HarmonicSums`Private`ExpVar^4) + 125/(128*HarmonicSums`Private`ExpVar^2) - 125/(64*HarmonicSums`Private`ExpVar))*z5 + ln2*(-li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-93/(20*HarmonicSums`Private`ExpVar^10) + 51/(80*HarmonicSums`Private`ExpVar^8) - 3/(20*HarmonicSums`Private`ExpVar^6) + 3/(40*HarmonicSums`Private`ExpVar^4) - 3/(20*HarmonicSums`Private`ExpVar^2) + 3/(10*HarmonicSums`Private`ExpVar))*z2^2 + (-19/(512*HarmonicSums`Private`ExpVar^10) + 263/(3840*HarmonicSums`Private`ExpVar^9) + 9/(1024*HarmonicSums`Private`ExpVar^8) - 23/(1344*HarmonicSums`Private`ExpVar^7) - 1/(256*HarmonicSums`Private`ExpVar^6) + 19/(1920*HarmonicSums`Private`ExpVar^5) + 1/(256*HarmonicSums`Private`ExpVar^4) - 5/(192*HarmonicSums`Private`ExpVar^3) + 3/(64*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3 + (47*z2*z3)/16 + (125*z5)/32), S[-1, -1, -1, 1, 2, HarmonicSums`Private`ExpVar] :> -li6half - ln2^6/72 + (-1)^HarmonicSums`Private`ExpVar* (4963981/(387072*HarmonicSums`Private`ExpVar^10) - 61450531/(33868800*HarmonicSums`Private`ExpVar^9) - 4450441/(2419200*HarmonicSums`Private`ExpVar^8) + 251/(1350*HarmonicSums`Private`ExpVar^7) + 11443/(11520*HarmonicSums`Private`ExpVar^6) - 1063/(1152*HarmonicSums`Private`ExpVar^5) + 11/(24*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-31/(480*HarmonicSums`Private`ExpVar^10) + 17/(1920*HarmonicSums`Private`ExpVar^8) - 1/(480*HarmonicSums`Private`ExpVar^6) + 1/(960*HarmonicSums`Private`ExpVar^4) - 1/(480*HarmonicSums`Private`ExpVar^2) + 1/(240*HarmonicSums`Private`ExpVar)) + li4half*(19/(64*HarmonicSums`Private`ExpVar^10) - 263/(480*HarmonicSums`Private`ExpVar^9) - 9/(128*HarmonicSums`Private`ExpVar^8) + 23/(168*HarmonicSums`Private`ExpVar^7) + 1/(32*HarmonicSums`Private`ExpVar^6) - 19/(240*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) - (3*s6)/2 + ln2^4*(19/(1536*HarmonicSums`Private`ExpVar^10) - 263/(11520*HarmonicSums`Private`ExpVar^9) - 3/(1024*HarmonicSums`Private`ExpVar^8) + 23/(4032*HarmonicSums`Private`ExpVar^7) + 1/(768*HarmonicSums`Private`ExpVar^6) - 19/(5760*HarmonicSums`Private`ExpVar^5) - 1/(768*HarmonicSums`Private`ExpVar^4) + 5/(576*HarmonicSums`Private`ExpVar^3) - 1/(64*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar) - z2/24) + (-1)^HarmonicSums`Private`ExpVar* (100969/(7680*HarmonicSums`Private`ExpVar^10) - 4213/(8960*HarmonicSums`Private`ExpVar^9) - 9923/(5376*HarmonicSums`Private`ExpVar^8) + 91/(960*HarmonicSums`Private`ExpVar^7) + 901/(1920*HarmonicSums`Private`ExpVar^6) - 5/(192*HarmonicSums`Private`ExpVar^5) - 37/(96*HarmonicSums`Private`ExpVar^4) + 7/(16*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*sinf*z2 + (19/(1280*HarmonicSums`Private`ExpVar^10) - 263/(9600*HarmonicSums`Private`ExpVar^9) - 9/(2560*HarmonicSums`Private`ExpVar^8) + 23/(3360*HarmonicSums`Private`ExpVar^7) + 1/(640*HarmonicSums`Private`ExpVar^6) - 19/(4800*HarmonicSums`Private`ExpVar^5) - 1/(640*HarmonicSums`Private`ExpVar^4) + 1/(96*HarmonicSums`Private`ExpVar^3) - 3/(160*HarmonicSums`Private`ExpVar^2) + 1/(40*HarmonicSums`Private`ExpVar))*z2^2 - (7*z2^3)/40 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(48*HarmonicSums`Private`ExpVar^10) - 17/(192*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar))*z2 + z3/48) + (-1)^HarmonicSums`Private`ExpVar* (-100969/(7680*HarmonicSums`Private`ExpVar^10) + 4213/(8960*HarmonicSums`Private`ExpVar^9) + 9923/(5376*HarmonicSums`Private`ExpVar^8) - 91/(960*HarmonicSums`Private`ExpVar^7) - 901/(1920*HarmonicSums`Private`ExpVar^6) + 5/(192*HarmonicSums`Private`ExpVar^5) + 37/(96*HarmonicSums`Private`ExpVar^4) - 7/(16*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z3 + (129*z3^2)/64 + z2*(-2*li4half + (-1)^HarmonicSums`Private`ExpVar* (-10318457/(716800*HarmonicSums`Private`ExpVar^10) - 13342793/(2508800*HarmonicSums`Private`ExpVar^9) + 3771437/(2257920*HarmonicSums`Private`ExpVar^8) + 26371/(28800*HarmonicSums`Private`ExpVar^7) - 36403/(115200*HarmonicSums`Private`ExpVar^6) - 737/(2304*HarmonicSums`Private`ExpVar^5) + 109/(576*HarmonicSums`Private`ExpVar^4) + 5/(32*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (465/(64*HarmonicSums`Private`ExpVar^10) - 255/(256*HarmonicSums`Private`ExpVar^8) + 15/(64*HarmonicSums`Private`ExpVar^6) - 15/(128*HarmonicSums`Private`ExpVar^4) + 15/(64*HarmonicSums`Private`ExpVar^2) - 15/(32*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(-(li4half/2) + z2^2/5 + (-1)^HarmonicSums`Private`ExpVar* (31/(64*HarmonicSums`Private`ExpVar^10) - 17/(256*HarmonicSums`Private`ExpVar^8) + 1/(64*HarmonicSums`Private`ExpVar^6) - 1/(128*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^2) - 1/(32*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (-899/(256*HarmonicSums`Private`ExpVar^10) + 493/(1024*HarmonicSums`Private`ExpVar^8) - 29/(256*HarmonicSums`Private`ExpVar^6) + 29/(512*HarmonicSums`Private`ExpVar^4) - 29/(256*HarmonicSums`Private`ExpVar^2) + 29/(128*HarmonicSums`Private`ExpVar))*z5 + ln2*(-li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-93/(32*HarmonicSums`Private`ExpVar^10) + 51/(128*HarmonicSums`Private`ExpVar^8) - 3/(32*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^2) + 3/(16*HarmonicSums`Private`ExpVar))*z2^2 + (-19/(512*HarmonicSums`Private`ExpVar^10) + 263/(3840*HarmonicSums`Private`ExpVar^9) + 9/(1024*HarmonicSums`Private`ExpVar^8) - 23/(1344*HarmonicSums`Private`ExpVar^7) - 1/(256*HarmonicSums`Private`ExpVar^6) + 19/(1920*HarmonicSums`Private`ExpVar^5) + 1/(256*HarmonicSums`Private`ExpVar^4) - 5/(192*HarmonicSums`Private`ExpVar^3) + 3/(64*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3 - (11*z2*z3)/8 + (125*z5)/32), S[-1, -1, 1, -2, -1, HarmonicSums`Private`ExpVar] :> -21*li6half - ln2^6/30 + li4half*(-19/(64*HarmonicSums`Private`ExpVar^10) + 263/(480*HarmonicSums`Private`ExpVar^9) + 9/(128*HarmonicSums`Private`ExpVar^8) - 23/(168*HarmonicSums`Private`ExpVar^7) - 1/(32*HarmonicSums`Private`ExpVar^6) + 19/(240*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(217/(480*HarmonicSums`Private`ExpVar^10) - 119/(1920*HarmonicSums`Private`ExpVar^8) + 7/(480*HarmonicSums`Private`ExpVar^6) - 7/(960*HarmonicSums`Private`ExpVar^4) + 7/(480*HarmonicSums`Private`ExpVar^2) - 7/(240*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-217/(4*HarmonicSums`Private`ExpVar^10) + 119/(16*HarmonicSums`Private`ExpVar^8) - 7/(4*HarmonicSums`Private`ExpVar^6) + 7/(8*HarmonicSums`Private`ExpVar^4) - 7/(4*HarmonicSums`Private`ExpVar^2) + 7/(2*HarmonicSums`Private`ExpVar)) + 5117141/(10584000*HarmonicSums`Private`ExpVar^10) + 9630979/(25401600*HarmonicSums`Private`ExpVar^9) - 106207/(6773760*HarmonicSums`Private`ExpVar^8) - 3609/(11200*HarmonicSums`Private`ExpVar^7) + 28909/(86400*HarmonicSums`Private`ExpVar^6) - 13/(64*HarmonicSums`Private`ExpVar^5) + 97/(1152*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3) - (33*s6)/4 + ln2^4*(-19/(1536*HarmonicSums`Private`ExpVar^10) + 263/(11520*HarmonicSums`Private`ExpVar^9) + 3/(1024*HarmonicSums`Private`ExpVar^8) - 23/(4032*HarmonicSums`Private`ExpVar^7) - 1/(768*HarmonicSums`Private`ExpVar^6) + 19/(5760*HarmonicSums`Private`ExpVar^5) + 1/(768*HarmonicSums`Private`ExpVar^4) - 5/(576*HarmonicSums`Private`ExpVar^3) + 1/(64*HarmonicSums`Private`ExpVar^2) - 1/(48*HarmonicSums`Private`ExpVar) - z2/12) + (19/(512*HarmonicSums`Private`ExpVar^10) - 263/(3840*HarmonicSums`Private`ExpVar^9) - 9/(1024*HarmonicSums`Private`ExpVar^8) + 23/(1344*HarmonicSums`Private`ExpVar^7) + 1/(256*HarmonicSums`Private`ExpVar^6) - 19/(1920*HarmonicSums`Private`ExpVar^5) - 1/(256*HarmonicSums`Private`ExpVar^4) + 5/(192*HarmonicSums`Private`ExpVar^3) - 3/(64*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z2^2 + (1943*z2^3)/560 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar))*z2 + (5*z3)/48) + (-19403/(12288*HarmonicSums`Private`ExpVar^10) + 44769/(71680*HarmonicSums`Private`ExpVar^9) + 49445/(172032*HarmonicSums`Private`ExpVar^8) - 439/(3528*HarmonicSums`Private`ExpVar^7) - 299/(3072*HarmonicSums`Private`ExpVar^6) + 1207/(23040*HarmonicSums`Private`ExpVar^5) + 235/(3072*HarmonicSums`Private`ExpVar^4) - 115/(1152*HarmonicSums`Private`ExpVar^3) - 5/(128*HarmonicSums`Private`ExpVar^2) + 5/(16*HarmonicSums`Private`ExpVar))*z3 + (361*z3^2)/128 + ln2^2*((-3*li4half)/2 + (19/(256*HarmonicSums`Private`ExpVar^10) - 263/(1920*HarmonicSums`Private`ExpVar^9) - 9/(512*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) + 1/(128*HarmonicSums`Private`ExpVar^6) - 19/(960*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) + 5/(96*HarmonicSums`Private`ExpVar^3) - 3/(32*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 + (31*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (155/(64*HarmonicSums`Private`ExpVar^10) - 85/(256*HarmonicSums`Private`ExpVar^8) + 5/(64*HarmonicSums`Private`ExpVar^6) - 5/(128*HarmonicSums`Private`ExpVar^4) + 5/(64*HarmonicSums`Private`ExpVar^2) - 5/(32*HarmonicSums`Private`ExpVar))*z3) + z2*((-3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (-155/(64*HarmonicSums`Private`ExpVar^10) + 85/(256*HarmonicSums`Private`ExpVar^8) - 5/(64*HarmonicSums`Private`ExpVar^6) + 5/(128*HarmonicSums`Private`ExpVar^4) - 5/(64*HarmonicSums`Private`ExpVar^2) + 5/(32*HarmonicSums`Private`ExpVar))*z3) + sinf*(ln2*(-57/(128*HarmonicSums`Private`ExpVar^10) + 263/(320*HarmonicSums`Private`ExpVar^9) + 27/(256*HarmonicSums`Private`ExpVar^8) - 23/(112*HarmonicSums`Private`ExpVar^7) - 3/(64*HarmonicSums`Private`ExpVar^6) + 19/(160*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) - 5/(16*HarmonicSums`Private`ExpVar^3) + 9/(16*HarmonicSums`Private`ExpVar^2) - 3/(4*HarmonicSums`Private`ExpVar))*z2 + (95/(512*HarmonicSums`Private`ExpVar^10) - 263/(768*HarmonicSums`Private`ExpVar^9) - 45/(1024*HarmonicSums`Private`ExpVar^8) + 115/(1344*HarmonicSums`Private`ExpVar^7) + 5/(256*HarmonicSums`Private`ExpVar^6) - 19/(384*HarmonicSums`Private`ExpVar^5) - 5/(256*HarmonicSums`Private`ExpVar^4) + 25/(192*HarmonicSums`Private`ExpVar^3) - 15/(64*HarmonicSums`Private`ExpVar^2) + 5/(16*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (14167/(256*HarmonicSums`Private`ExpVar^10) - 7769/(1024*HarmonicSums`Private`ExpVar^8) + 457/(256*HarmonicSums`Private`ExpVar^6) - 457/(512*HarmonicSums`Private`ExpVar^4) + 457/(256*HarmonicSums`Private`ExpVar^2) - 457/(128*HarmonicSums`Private`ExpVar))*z5 + ln2*(-7*li5half + (-1)^HarmonicSums`Private`ExpVar* (8669/(2880*HarmonicSums`Private`ExpVar^10) + 13337/(3360*HarmonicSums`Private`ExpVar^9) - 1523/(1792*HarmonicSums`Private`ExpVar^8) - 689/(960*HarmonicSums`Private`ExpVar^7) + 1151/(1920*HarmonicSums`Private`ExpVar^6) - 43/(192*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* (-961/(80*HarmonicSums`Private`ExpVar^10) + 527/(320*HarmonicSums`Private`ExpVar^8) - 31/(80*HarmonicSums`Private`ExpVar^6) + 31/(160*HarmonicSums`Private`ExpVar^4) - 31/(80*HarmonicSums`Private`ExpVar^2) + 31/(40*HarmonicSums`Private`ExpVar))*z2^2 + z2*(19403/(5120*HarmonicSums`Private`ExpVar^10) - 134307/(89600*HarmonicSums`Private`ExpVar^9) - 9889/(14336*HarmonicSums`Private`ExpVar^8) + 439/(1470*HarmonicSums`Private`ExpVar^7) + 299/(1280*HarmonicSums`Private`ExpVar^6) - 1207/(9600*HarmonicSums`Private`ExpVar^5) - 47/(256*HarmonicSums`Private`ExpVar^4) + 23/(96*HarmonicSums`Private`ExpVar^3) + 3/(32*HarmonicSums`Private`ExpVar^2) - 3/(4*HarmonicSums`Private`ExpVar) - z3) + (457*z5)/64), S[-1, -1, 1, -2, 1, HarmonicSums`Private`ExpVar] :> -12*li6half - ln2^6/48 + (-1)^HarmonicSums`Private`ExpVar* (-14734241/(7257600*HarmonicSums`Private`ExpVar^10) + 11891549/(2822400*HarmonicSums`Private`ExpVar^9) - 321917/(2257920*HarmonicSums`Private`ExpVar^8) - 1879/(3200*HarmonicSums`Private`ExpVar^7) + 23123/(115200*HarmonicSums`Private`ExpVar^6) + 1/(2304*HarmonicSums`Private`ExpVar^5) - 1/(72*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(160*HarmonicSums`Private`ExpVar^10) - 17/(640*HarmonicSums`Private`ExpVar^8) + 1/(160*HarmonicSums`Private`ExpVar^6) - 1/(320*HarmonicSums`Private`ExpVar^4) + 1/(160*HarmonicSums`Private`ExpVar^2) - 1/(80*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) - (9*s6)/2 + (5*ln2^4*z2)/48 + (57/(2560*HarmonicSums`Private`ExpVar^10) - 263/(6400*HarmonicSums`Private`ExpVar^9) - 27/(5120*HarmonicSums`Private`ExpVar^8) + 23/(2240*HarmonicSums`Private`ExpVar^7) + 3/(1280*HarmonicSums`Private`ExpVar^6) - 19/(3200*HarmonicSums`Private`ExpVar^5) - 3/(1280*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^3) - 9/(320*HarmonicSums`Private`ExpVar^2) + 3/(80*HarmonicSums`Private`ExpVar))*z2^2 + (443*z2^3)/560 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 + (5*z3)/48) + (-19403/(12288*HarmonicSums`Private`ExpVar^10) + 44769/(71680*HarmonicSums`Private`ExpVar^9) + 49445/(172032*HarmonicSums`Private`ExpVar^8) - 439/(3528*HarmonicSums`Private`ExpVar^7) - 299/(3072*HarmonicSums`Private`ExpVar^6) + 1207/(23040*HarmonicSums`Private`ExpVar^5) + 235/(3072*HarmonicSums`Private`ExpVar^4) - 115/(1152*HarmonicSums`Private`ExpVar^3) - 5/(128*HarmonicSums`Private`ExpVar^2) + 5/(16*HarmonicSums`Private`ExpVar))*z3 + (181*z3^2)/128 + ln2^2*((-3*li4half)/2 - (31*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (155/(64*HarmonicSums`Private`ExpVar^10) - 85/(256*HarmonicSums`Private`ExpVar^8) + 5/(64*HarmonicSums`Private`ExpVar^6) - 5/(128*HarmonicSums`Private`ExpVar^4) + 5/(64*HarmonicSums`Private`ExpVar^2) - 5/(32*HarmonicSums`Private`ExpVar))*z3) + z2*((3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (-155/(64*HarmonicSums`Private`ExpVar^10) + 85/(256*HarmonicSums`Private`ExpVar^8) - 5/(64*HarmonicSums`Private`ExpVar^6) + 5/(128*HarmonicSums`Private`ExpVar^4) - 5/(64*HarmonicSums`Private`ExpVar^2) + 5/(32*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar* (-8669/(2880*HarmonicSums`Private`ExpVar^10) - 13337/(3360*HarmonicSums`Private`ExpVar^9) + 1523/(1792*HarmonicSums`Private`ExpVar^8) + 689/(960*HarmonicSums`Private`ExpVar^7) - 1151/(1920*HarmonicSums`Private`ExpVar^6) + 43/(192*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^4)) + (95/(512*HarmonicSums`Private`ExpVar^10) - 263/(768*HarmonicSums`Private`ExpVar^9) - 45/(1024*HarmonicSums`Private`ExpVar^8) + 115/(1344*HarmonicSums`Private`ExpVar^7) + 5/(256*HarmonicSums`Private`ExpVar^6) - 19/(384*HarmonicSums`Private`ExpVar^5) - 5/(256*HarmonicSums`Private`ExpVar^4) + 25/(192*HarmonicSums`Private`ExpVar^3) - 15/(64*HarmonicSums`Private`ExpVar^2) + 5/(16*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (899/(64*HarmonicSums`Private`ExpVar^10) - 493/(256*HarmonicSums`Private`ExpVar^8) + 29/(64*HarmonicSums`Private`ExpVar^6) - 29/(128*HarmonicSums`Private`ExpVar^4) + 29/(64*HarmonicSums`Private`ExpVar^2) - 29/(32*HarmonicSums`Private`ExpVar))*z5 + ln2*(-7*li5half + (-1)^HarmonicSums`Private`ExpVar* (-279/(160*HarmonicSums`Private`ExpVar^10) + 153/(640*HarmonicSums`Private`ExpVar^8) - 9/(160*HarmonicSums`Private`ExpVar^6) + 9/(320*HarmonicSums`Private`ExpVar^4) - 9/(160*HarmonicSums`Private`ExpVar^2) + 9/(80*HarmonicSums`Private`ExpVar))*z2^2 + (5*z2*z3)/16 + (457*z5)/64), S[-1, -1, 1, 2, -1, HarmonicSums`Private`ExpVar] :> 9*li6half - ln2^6/30 + (-1)^HarmonicSums`Private`ExpVar* (-56463/(10240*HarmonicSums`Private`ExpVar^10) + 26059/(107520*HarmonicSums`Private`ExpVar^9) + 4735/(5376*HarmonicSums`Private`ExpVar^8) - 439/(960*HarmonicSums`Private`ExpVar^7) + 77/(640*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^5)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-589/(480*HarmonicSums`Private`ExpVar^10) + 323/(1920*HarmonicSums`Private`ExpVar^8) - 19/(480*HarmonicSums`Private`ExpVar^6) + 19/(960*HarmonicSums`Private`ExpVar^4) - 19/(480*HarmonicSums`Private`ExpVar^2) + 19/(240*HarmonicSums`Private`ExpVar)) + li4half*(57/(64*HarmonicSums`Private`ExpVar^10) - 263/(160*HarmonicSums`Private`ExpVar^9) - 27/(128*HarmonicSums`Private`ExpVar^8) + 23/(56*HarmonicSums`Private`ExpVar^7) + 3/(32*HarmonicSums`Private`ExpVar^6) - 19/(80*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 5/(8*HarmonicSums`Private`ExpVar^3) - 9/(8*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) + (3*s6)/2 + ln2^4*(19/(512*HarmonicSums`Private`ExpVar^10) - 263/(3840*HarmonicSums`Private`ExpVar^9) - 9/(1024*HarmonicSums`Private`ExpVar^8) + 23/(1344*HarmonicSums`Private`ExpVar^7) + 1/(256*HarmonicSums`Private`ExpVar^6) - 19/(1920*HarmonicSums`Private`ExpVar^5) - 1/(256*HarmonicSums`Private`ExpVar^4) + 5/(192*HarmonicSums`Private`ExpVar^3) - 3/(64*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar) + (5*z2)/24) + (-57/(160*HarmonicSums`Private`ExpVar^10) + 263/(400*HarmonicSums`Private`ExpVar^9) + 27/(320*HarmonicSums`Private`ExpVar^8) - 23/(140*HarmonicSums`Private`ExpVar^7) - 3/(80*HarmonicSums`Private`ExpVar^6) + 19/(200*HarmonicSums`Private`ExpVar^5) + 3/(80*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 9/(20*HarmonicSums`Private`ExpVar^2) - 3/(5*HarmonicSums`Private`ExpVar))*z2^2 - (31*z2^3)/35 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(12*HarmonicSums`Private`ExpVar^10) - 17/(48*HarmonicSums`Private`ExpVar^8) + 1/(12*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar))*z2 - (23*z3)/48) + (19403/(30720*HarmonicSums`Private`ExpVar^10) - 44769/(179200*HarmonicSums`Private`ExpVar^9) - 9889/(86016*HarmonicSums`Private`ExpVar^8) + 439/(8820*HarmonicSums`Private`ExpVar^7) + 299/(7680*HarmonicSums`Private`ExpVar^6) - 1207/(57600*HarmonicSums`Private`ExpVar^5) - 47/(1536*HarmonicSums`Private`ExpVar^4) + 23/(576*HarmonicSums`Private`ExpVar^3) + 1/(64*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z3 - (25*z3^2)/32 + sinf*(ln2*(57/(128*HarmonicSums`Private`ExpVar^10) - 263/(320*HarmonicSums`Private`ExpVar^9) - 27/(256*HarmonicSums`Private`ExpVar^8) + 23/(112*HarmonicSums`Private`ExpVar^7) + 3/(64*HarmonicSums`Private`ExpVar^6) - 19/(160*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 5/(16*HarmonicSums`Private`ExpVar^3) - 9/(16*HarmonicSums`Private`ExpVar^2) + 3/(4*HarmonicSums`Private`ExpVar))*z2 + (-19/(256*HarmonicSums`Private`ExpVar^10) + 263/(1920*HarmonicSums`Private`ExpVar^9) + 9/(512*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) - 1/(128*HarmonicSums`Private`ExpVar^6) + 19/(960*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - 5/(96*HarmonicSums`Private`ExpVar^3) + 3/(32*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z3) + z2*((-3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (-589/(64*HarmonicSums`Private`ExpVar^10) + 323/(256*HarmonicSums`Private`ExpVar^8) - 19/(64*HarmonicSums`Private`ExpVar^6) + 19/(128*HarmonicSums`Private`ExpVar^4) - 19/(64*HarmonicSums`Private`ExpVar^2) + 19/(32*HarmonicSums`Private`ExpVar))*z3) + ln2^2*((-3*li4half)/2 + (-57/(256*HarmonicSums`Private`ExpVar^10) + 263/(640*HarmonicSums`Private`ExpVar^9) + 27/(512*HarmonicSums`Private`ExpVar^8) - 23/(224*HarmonicSums`Private`ExpVar^7) - 3/(128*HarmonicSums`Private`ExpVar^6) + 19/(320*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^3) + 9/(32*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*z2 - z2^2/10 + (-1)^HarmonicSums`Private`ExpVar* (-713/(64*HarmonicSums`Private`ExpVar^10) + 391/(256*HarmonicSums`Private`ExpVar^8) - 23/(64*HarmonicSums`Private`ExpVar^6) + 23/(128*HarmonicSums`Private`ExpVar^4) - 23/(64*HarmonicSums`Private`ExpVar^2) + 23/(32*HarmonicSums`Private`ExpVar))*z3) + ln2*(-2*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) - 2272441/(14112000*HarmonicSums`Private`ExpVar^10) - 6785243/(4233600*HarmonicSums`Private`ExpVar^9) - 204793/(3386880*HarmonicSums`Private`ExpVar^8) + 40067/(100800*HarmonicSums`Private`ExpVar^7) + 4703/(21600*HarmonicSums`Private`ExpVar^6) - 113/(160*HarmonicSums`Private`ExpVar^5) + 439/(576*HarmonicSums`Private`ExpVar^4) - 13/(24*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (217/(20*HarmonicSums`Private`ExpVar^10) - 119/(80*HarmonicSums`Private`ExpVar^8) + 7/(20*HarmonicSums`Private`ExpVar^6) - 7/(40*HarmonicSums`Private`ExpVar^4) + 7/(20*HarmonicSums`Private`ExpVar^2) - 7/(10*HarmonicSums`Private`ExpVar))*z2^2 + z2*(-19403/(5120*HarmonicSums`Private`ExpVar^10) + 134307/(89600*HarmonicSums`Private`ExpVar^9) + 9889/(14336*HarmonicSums`Private`ExpVar^8) - 439/(1470*HarmonicSums`Private`ExpVar^7) - 299/(1280*HarmonicSums`Private`ExpVar^6) + 1207/(9600*HarmonicSums`Private`ExpVar^5) + 47/(256*HarmonicSums`Private`ExpVar^4) - 23/(96*HarmonicSums`Private`ExpVar^3) - 3/(32*HarmonicSums`Private`ExpVar^2) + 3/(4*HarmonicSums`Private`ExpVar) - z3/8) + (133/(256*HarmonicSums`Private`ExpVar^10) - 1841/(1920*HarmonicSums`Private`ExpVar^9) - 63/(512*HarmonicSums`Private`ExpVar^8) + 23/(96*HarmonicSums`Private`ExpVar^7) + 7/(128*HarmonicSums`Private`ExpVar^6) - 133/(960*HarmonicSums`Private`ExpVar^5) - 7/(128*HarmonicSums`Private`ExpVar^4) + 35/(96*HarmonicSums`Private`ExpVar^3) - 21/(32*HarmonicSums`Private`ExpVar^2) + 7/(8*HarmonicSums`Private`ExpVar))*z3 + (23*z5)/64) + (-1)^HarmonicSums`Private`ExpVar* (-1085/(128*HarmonicSums`Private`ExpVar^10) + 595/(512*HarmonicSums`Private`ExpVar^8) - 35/(128*HarmonicSums`Private`ExpVar^6) + 35/(256*HarmonicSums`Private`ExpVar^4) - 35/(128*HarmonicSums`Private`ExpVar^2) + 35/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, -1, 1, 2, 1, HarmonicSums`Private`ExpVar] :> 2*li6half - (31*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-403/(480*HarmonicSums`Private`ExpVar^10) + 221/(1920*HarmonicSums`Private`ExpVar^8) - 13/(480*HarmonicSums`Private`ExpVar^6) + 13/(960*HarmonicSums`Private`ExpVar^4) - 13/(480*HarmonicSums`Private`ExpVar^2) + 13/(240*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/(2*HarmonicSums`Private`ExpVar^10) + 17/(8*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) + 4991449387/(1422489600*HarmonicSums`Private`ExpVar^10) + 6461038889/(10668672000*HarmonicSums`Private`ExpVar^9) - 1699604303/(2844979200*HarmonicSums`Private`ExpVar^8) - 7567523/(21168000*HarmonicSums`Private`ExpVar^7) + 494821/(2592000*HarmonicSums`Private`ExpVar^6) + 1827/(3200*HarmonicSums`Private`ExpVar^5) - 7457/(6912*HarmonicSums`Private`ExpVar^4) + 19/(18*HarmonicSums`Private`ExpVar^3) - 5/(8*HarmonicSums`Private`ExpVar^2) + (3*s6)/4 + (5*ln2^4*z2)/48 + (57/(160*HarmonicSums`Private`ExpVar^10) - 263/(400*HarmonicSums`Private`ExpVar^9) - 27/(320*HarmonicSums`Private`ExpVar^8) + 23/(140*HarmonicSums`Private`ExpVar^7) + 3/(80*HarmonicSums`Private`ExpVar^6) - 19/(200*HarmonicSums`Private`ExpVar^5) - 3/(80*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 9/(20*HarmonicSums`Private`ExpVar^2) + 3/(5*HarmonicSums`Private`ExpVar))*z2^2 + (3*z2^3)/7 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (217/(48*HarmonicSums`Private`ExpVar^10) - 119/(192*HarmonicSums`Private`ExpVar^8) + 7/(48*HarmonicSums`Private`ExpVar^6) - 7/(96*HarmonicSums`Private`ExpVar^4) + 7/(48*HarmonicSums`Private`ExpVar^2) - 7/(24*HarmonicSums`Private`ExpVar))*z2 - (23*z3)/48) + (19403/(3840*HarmonicSums`Private`ExpVar^10) - 44769/(22400*HarmonicSums`Private`ExpVar^9) - 9889/(10752*HarmonicSums`Private`ExpVar^8) + 878/(2205*HarmonicSums`Private`ExpVar^7) + 299/(960*HarmonicSums`Private`ExpVar^6) - 1207/(7200*HarmonicSums`Private`ExpVar^5) - 47/(192*HarmonicSums`Private`ExpVar^4) + 23/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1))* z3 + (87*z3^2)/64 + sinf*(2272441/(14112000*HarmonicSums`Private`ExpVar^10) + 6785243/(4233600*HarmonicSums`Private`ExpVar^9) + 204793/(3386880*HarmonicSums`Private`ExpVar^8) - 40067/(100800*HarmonicSums`Private`ExpVar^7) - 4703/(21600*HarmonicSums`Private`ExpVar^6) + 113/(160*HarmonicSums`Private`ExpVar^5) - 439/(576*HarmonicSums`Private`ExpVar^4) + 13/(24*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + (-19/(32*HarmonicSums`Private`ExpVar^10) + 263/(240*HarmonicSums`Private`ExpVar^9) + 9/(64*HarmonicSums`Private`ExpVar^8) - 23/(84*HarmonicSums`Private`ExpVar^7) - 1/(16*HarmonicSums`Private`ExpVar^6) + 19/(120*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 5/(12*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1))*z3) + z2*((-3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (713/(64*HarmonicSums`Private`ExpVar^10) - 391/(256*HarmonicSums`Private`ExpVar^8) + 23/(64*HarmonicSums`Private`ExpVar^6) - 23/(128*HarmonicSums`Private`ExpVar^4) + 23/(64*HarmonicSums`Private`ExpVar^2) - 23/(32*HarmonicSums`Private`ExpVar))*z3) + ln2^2*((-3*li4half)/2 + (21*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (-713/(64*HarmonicSums`Private`ExpVar^10) + 391/(256*HarmonicSums`Private`ExpVar^8) - 23/(64*HarmonicSums`Private`ExpVar^6) + 23/(128*HarmonicSums`Private`ExpVar^4) - 23/(64*HarmonicSums`Private`ExpVar^2) + 23/(32*HarmonicSums`Private`ExpVar))*z3) + ln2*(-2*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(160*HarmonicSums`Private`ExpVar^10) + 17/(640*HarmonicSums`Private`ExpVar^8) - 1/(160*HarmonicSums`Private`ExpVar^6) + 1/(320*HarmonicSums`Private`ExpVar^4) - 1/(160*HarmonicSums`Private`ExpVar^2) + 1/(80*HarmonicSums`Private`ExpVar))*z2^2 - (23*z2*z3)/16 + (23*z5)/64) + (-1)^HarmonicSums`Private`ExpVar* (713/(256*HarmonicSums`Private`ExpVar^10) - 391/(1024*HarmonicSums`Private`ExpVar^8) + 23/(256*HarmonicSums`Private`ExpVar^6) - 23/(512*HarmonicSums`Private`ExpVar^4) + 23/(256*HarmonicSums`Private`ExpVar^2) - 23/(128*HarmonicSums`Private`ExpVar))*z5, S[-1, -1, 1, -1, -2, HarmonicSums`Private`ExpVar] :> 3*li6half - (7*ln2^6)/240 + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-93/(160*HarmonicSums`Private`ExpVar^10) + 51/(640*HarmonicSums`Private`ExpVar^8) - 3/(160*HarmonicSums`Private`ExpVar^6) + 3/(320*HarmonicSums`Private`ExpVar^4) - 3/(160*HarmonicSums`Private`ExpVar^2) + 3/(80*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + li4half*(57/(64*HarmonicSums`Private`ExpVar^10) - 263/(160*HarmonicSums`Private`ExpVar^9) - 27/(128*HarmonicSums`Private`ExpVar^8) + 23/(56*HarmonicSums`Private`ExpVar^7) + 3/(32*HarmonicSums`Private`ExpVar^6) - 19/(80*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 5/(8*HarmonicSums`Private`ExpVar^3) - 9/(8*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) + 14169139/(169344000*HarmonicSums`Private`ExpVar^10) + 29390597/(50803200*HarmonicSums`Private`ExpVar^9) + 804929/(13547520*HarmonicSums`Private`ExpVar^8) - 175181/(403200*HarmonicSums`Private`ExpVar^7) + 68317/(172800*HarmonicSums`Private`ExpVar^6) - 107/(480*HarmonicSums`Private`ExpVar^5) + 101/(1152*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3) - s6/2 + ln2^4*(19/(512*HarmonicSums`Private`ExpVar^10) - 263/(3840*HarmonicSums`Private`ExpVar^9) - 9/(1024*HarmonicSums`Private`ExpVar^8) + 23/(1344*HarmonicSums`Private`ExpVar^7) + 1/(256*HarmonicSums`Private`ExpVar^6) - 19/(1920*HarmonicSums`Private`ExpVar^5) - 1/(256*HarmonicSums`Private`ExpVar^4) + 5/(192*HarmonicSums`Private`ExpVar^3) - 3/(64*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar) + (5*z2)/48) + (-209/(1280*HarmonicSums`Private`ExpVar^10) + 2893/(9600*HarmonicSums`Private`ExpVar^9) + 99/(2560*HarmonicSums`Private`ExpVar^8) - 253/(3360*HarmonicSums`Private`ExpVar^7) - 11/(640*HarmonicSums`Private`ExpVar^6) + 209/(4800*HarmonicSums`Private`ExpVar^5) + 11/(640*HarmonicSums`Private`ExpVar^4) - 11/(96*HarmonicSums`Private`ExpVar^3) + 33/(160*HarmonicSums`Private`ExpVar^2) - 11/(40*HarmonicSums`Private`ExpVar))*z2^2 + z2^3/112 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(12*HarmonicSums`Private`ExpVar^10) - 17/(48*HarmonicSums`Private`ExpVar^8) + 1/(12*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar))*z2 - (13*z3)/48) + (252239/(61440*HarmonicSums`Private`ExpVar^10) - 581997/(358400*HarmonicSums`Private`ExpVar^9) - 128557/(172032*HarmonicSums`Private`ExpVar^8) + 5707/(17640*HarmonicSums`Private`ExpVar^7) + 3887/(15360*HarmonicSums`Private`ExpVar^6) - 15691/(115200*HarmonicSums`Private`ExpVar^5) - 611/(3072*HarmonicSums`Private`ExpVar^4) + 299/(1152*HarmonicSums`Private`ExpVar^3) + 13/(128*HarmonicSums`Private`ExpVar^2) - 13/(16*HarmonicSums`Private`ExpVar))*z3 + (115*z3^2)/128 + sinf*(ln2*(19/(64*HarmonicSums`Private`ExpVar^10) - 263/(480*HarmonicSums`Private`ExpVar^9) - 9/(128*HarmonicSums`Private`ExpVar^8) + 23/(168*HarmonicSums`Private`ExpVar^7) + 1/(32*HarmonicSums`Private`ExpVar^6) - 19/(240*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 + (-247/(512*HarmonicSums`Private`ExpVar^10) + 3419/(3840*HarmonicSums`Private`ExpVar^9) + 117/(1024*HarmonicSums`Private`ExpVar^8) - 299/(1344*HarmonicSums`Private`ExpVar^7) - 13/(256*HarmonicSums`Private`ExpVar^6) + 247/(1920*HarmonicSums`Private`ExpVar^5) + 13/(256*HarmonicSums`Private`ExpVar^4) - 65/(192*HarmonicSums`Private`ExpVar^3) + 39/(64*HarmonicSums`Private`ExpVar^2) - 13/(16*HarmonicSums`Private`ExpVar))*z3) + z2*(-li4half + (-1)^HarmonicSums`Private`ExpVar* (-16555/(4096*HarmonicSums`Private`ExpVar^10) + 6017/(6144*HarmonicSums`Private`ExpVar^9) + 1715/(3072*HarmonicSums`Private`ExpVar^8) - 23/(96*HarmonicSums`Private`ExpVar^7) - 75/(512*HarmonicSums`Private`ExpVar^6) + 51/(256*HarmonicSums`Private`ExpVar^5) - 7/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (217/(32*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^6) - 7/(64*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(-li4half + (-19/(256*HarmonicSums`Private`ExpVar^10) + 263/(1920*HarmonicSums`Private`ExpVar^9) + 9/(512*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) - 1/(128*HarmonicSums`Private`ExpVar^6) + 19/(960*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - 5/(96*HarmonicSums`Private`ExpVar^3) + 3/(32*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 + z2^2/16 + (-1)^HarmonicSums`Private`ExpVar* (-403/(64*HarmonicSums`Private`ExpVar^10) + 221/(256*HarmonicSums`Private`ExpVar^8) - 13/(64*HarmonicSums`Private`ExpVar^6) + 13/(128*HarmonicSums`Private`ExpVar^4) - 13/(64*HarmonicSums`Private`ExpVar^2) + 13/(32*HarmonicSums`Private`ExpVar))*z3) + ln2*(-li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/(2*HarmonicSums`Private`ExpVar^10) + 17/(8*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(80*HarmonicSums`Private`ExpVar^10) + 17/(320*HarmonicSums`Private`ExpVar^8) - 1/(80*HarmonicSums`Private`ExpVar^6) + 1/(160*HarmonicSums`Private`ExpVar^4) - 1/(80*HarmonicSums`Private`ExpVar^2) + 1/(40*HarmonicSums`Private`ExpVar))*z2^2 + z2*(-19403/(7680*HarmonicSums`Private`ExpVar^10) + 44769/(44800*HarmonicSums`Private`ExpVar^9) + 9889/(21504*HarmonicSums`Private`ExpVar^8) - 439/(2205*HarmonicSums`Private`ExpVar^7) - 299/(1920*HarmonicSums`Private`ExpVar^6) + 1207/(14400*HarmonicSums`Private`ExpVar^5) + 47/(384*HarmonicSums`Private`ExpVar^4) - 23/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) + z3/16) + (33*z5)/64) + (-1)^HarmonicSums`Private`ExpVar* (1023/(256*HarmonicSums`Private`ExpVar^10) - 561/(1024*HarmonicSums`Private`ExpVar^8) + 33/(256*HarmonicSums`Private`ExpVar^6) - 33/(512*HarmonicSums`Private`ExpVar^4) + 33/(256*HarmonicSums`Private`ExpVar^2) - 33/(128*HarmonicSums`Private`ExpVar))*z5, S[-1, -1, 1, -1, 2, HarmonicSums`Private`ExpVar] :> -(ln2^6/30) + (-1)^HarmonicSums`Private`ExpVar* (-850981/(387072*HarmonicSums`Private`ExpVar^10) + 467921/(107520*HarmonicSums`Private`ExpVar^9) - 1361/(26880*HarmonicSums`Private`ExpVar^8) - 2219/(1920*HarmonicSums`Private`ExpVar^7) + 689/(960*HarmonicSums`Private`ExpVar^6) - 23/(96*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-31/(80*HarmonicSums`Private`ExpVar^10) + 17/(320*HarmonicSums`Private`ExpVar^8) - 1/(80*HarmonicSums`Private`ExpVar^6) + 1/(160*HarmonicSums`Private`ExpVar^4) - 1/(80*HarmonicSums`Private`ExpVar^2) + 1/(40*HarmonicSums`Private`ExpVar)) + li4half*(19/(32*HarmonicSums`Private`ExpVar^10) - 263/(240*HarmonicSums`Private`ExpVar^9) - 9/(64*HarmonicSums`Private`ExpVar^8) + 23/(84*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^6) - 19/(120*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 5/(12*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar*li5half* (-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) + (7*s6)/4 + ln2^4*(19/(768*HarmonicSums`Private`ExpVar^10) - 263/(5760*HarmonicSums`Private`ExpVar^9) - 3/(512*HarmonicSums`Private`ExpVar^8) + 23/(2016*HarmonicSums`Private`ExpVar^7) + 1/(384*HarmonicSums`Private`ExpVar^6) - 19/(2880*HarmonicSums`Private`ExpVar^5) - 1/(384*HarmonicSums`Private`ExpVar^4) + 5/(288*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar) + (5*z2)/48) + (-133/(512*HarmonicSums`Private`ExpVar^10) + 1841/(3840*HarmonicSums`Private`ExpVar^9) + 63/(1024*HarmonicSums`Private`ExpVar^8) - 23/(192*HarmonicSums`Private`ExpVar^7) - 7/(256*HarmonicSums`Private`ExpVar^6) + 133/(1920*HarmonicSums`Private`ExpVar^5) + 7/(256*HarmonicSums`Private`ExpVar^4) - 35/(192*HarmonicSums`Private`ExpVar^3) + 21/(64*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z2^2 + (31*z2^3)/70 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(12*HarmonicSums`Private`ExpVar^10) - 17/(48*HarmonicSums`Private`ExpVar^8) + 1/(12*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar))*z2 - (13*z3)/48) + (-19403/(7680*HarmonicSums`Private`ExpVar^10) + 44769/(44800*HarmonicSums`Private`ExpVar^9) + 9889/(21504*HarmonicSums`Private`ExpVar^8) - 439/(2205*HarmonicSums`Private`ExpVar^7) - 299/(1920*HarmonicSums`Private`ExpVar^6) + 1207/(14400*HarmonicSums`Private`ExpVar^5) + 47/(384*HarmonicSums`Private`ExpVar^4) - 23/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z3 - (91*z3^2)/64 + ln2^2*(-li4half + (-57/(256*HarmonicSums`Private`ExpVar^10) + 263/(640*HarmonicSums`Private`ExpVar^9) + 27/(512*HarmonicSums`Private`ExpVar^8) - 23/(224*HarmonicSums`Private`ExpVar^7) - 3/(128*HarmonicSums`Private`ExpVar^6) + 19/(320*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^3) + 9/(32*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*z2 - z2^2/20 + (-1)^HarmonicSums`Private`ExpVar* (-403/(64*HarmonicSums`Private`ExpVar^10) + 221/(256*HarmonicSums`Private`ExpVar^8) - 13/(64*HarmonicSums`Private`ExpVar^6) + 13/(128*HarmonicSums`Private`ExpVar^4) - 13/(64*HarmonicSums`Private`ExpVar^2) + 13/(32*HarmonicSums`Private`ExpVar))*z3) + sinf*(ln2*(-19/(128*HarmonicSums`Private`ExpVar^10) + 263/(960*HarmonicSums`Private`ExpVar^9) + 9/(256*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) - 1/(64*HarmonicSums`Private`ExpVar^6) + 19/(480*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (19/(64*HarmonicSums`Private`ExpVar^10) - 263/(480*HarmonicSums`Private`ExpVar^9) - 9/(128*HarmonicSums`Private`ExpVar^8) + 23/(168*HarmonicSums`Private`ExpVar^7) + 1/(32*HarmonicSums`Private`ExpVar^6) - 19/(240*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z3) + z2*(-li4half + (-1)^HarmonicSums`Private`ExpVar* (16555/(2048*HarmonicSums`Private`ExpVar^10) - 6017/(3072*HarmonicSums`Private`ExpVar^9) - 1715/(1536*HarmonicSums`Private`ExpVar^8) + 23/(48*HarmonicSums`Private`ExpVar^7) + 75/(256*HarmonicSums`Private`ExpVar^6) - 51/(128*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-961/(64*HarmonicSums`Private`ExpVar^10) + 527/(256*HarmonicSums`Private`ExpVar^8) - 31/(64*HarmonicSums`Private`ExpVar^6) + 31/(128*HarmonicSums`Private`ExpVar^4) - 31/(64*HarmonicSums`Private`ExpVar^2) + 31/(32*HarmonicSums`Private`ExpVar))*z3) + ln2*(-li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/(2*HarmonicSums`Private`ExpVar^10) + 17/(8*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(20*HarmonicSums`Private`ExpVar^10) + 17/(80*HarmonicSums`Private`ExpVar^8) - 1/(20*HarmonicSums`Private`ExpVar^6) + 1/(40*HarmonicSums`Private`ExpVar^4) - 1/(20*HarmonicSums`Private`ExpVar^2) + 1/(10*HarmonicSums`Private`ExpVar))*z2^2 + z2*(19403/(15360*HarmonicSums`Private`ExpVar^10) - 44769/(89600*HarmonicSums`Private`ExpVar^9) - 9889/(43008*HarmonicSums`Private`ExpVar^8) + 439/(4410*HarmonicSums`Private`ExpVar^7) + 299/(3840*HarmonicSums`Private`ExpVar^6) - 1207/(28800*HarmonicSums`Private`ExpVar^5) - 47/(768*HarmonicSums`Private`ExpVar^4) + 23/(288*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) - (5*z3)/4) + (399/(512*HarmonicSums`Private`ExpVar^10) - 1841/(1280*HarmonicSums`Private`ExpVar^9) - 189/(1024*HarmonicSums`Private`ExpVar^8) + 23/(64*HarmonicSums`Private`ExpVar^7) + 21/(256*HarmonicSums`Private`ExpVar^6) - 133/(640*HarmonicSums`Private`ExpVar^5) - 21/(256*HarmonicSums`Private`ExpVar^4) + 35/(64*HarmonicSums`Private`ExpVar^3) - 63/(64*HarmonicSums`Private`ExpVar^2) + 21/(16*HarmonicSums`Private`ExpVar))*z3 + (33*z5)/64) + (-1)^HarmonicSums`Private`ExpVar* (12555/(256*HarmonicSums`Private`ExpVar^10) - 6885/(1024*HarmonicSums`Private`ExpVar^8) + 405/(256*HarmonicSums`Private`ExpVar^6) - 405/(512*HarmonicSums`Private`ExpVar^4) + 405/(256*HarmonicSums`Private`ExpVar^2) - 405/(128*HarmonicSums`Private`ExpVar))*z5, S[-1, -1, 1, 1, -2, HarmonicSums`Private`ExpVar] :> 3*li6half + ln2^6/120 + (-1)^HarmonicSums`Private`ExpVar* (-604721/(92160*HarmonicSums`Private`ExpVar^10) - 16643/(107520*HarmonicSums`Private`ExpVar^9) + 755/(672*HarmonicSums`Private`ExpVar^8) - 989/(1920*HarmonicSums`Private`ExpVar^7) + 81/(640*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^5)) + li4half*(-19/(64*HarmonicSums`Private`ExpVar^10) + 263/(480*HarmonicSums`Private`ExpVar^9) + 9/(128*HarmonicSums`Private`ExpVar^8) - 23/(168*HarmonicSums`Private`ExpVar^7) - 1/(32*HarmonicSums`Private`ExpVar^6) + 19/(240*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(80*HarmonicSums`Private`ExpVar^10) - 17/(320*HarmonicSums`Private`ExpVar^8) + 1/(80*HarmonicSums`Private`ExpVar^6) - 1/(160*HarmonicSums`Private`ExpVar^4) + 1/(80*HarmonicSums`Private`ExpVar^2) - 1/(40*HarmonicSums`Private`ExpVar)) + ln2^4*(-19/(1536*HarmonicSums`Private`ExpVar^10) + 263/(11520*HarmonicSums`Private`ExpVar^9) + 3/(1024*HarmonicSums`Private`ExpVar^8) - 23/(4032*HarmonicSums`Private`ExpVar^7) - 1/(768*HarmonicSums`Private`ExpVar^6) + 19/(5760*HarmonicSums`Private`ExpVar^5) + 1/(768*HarmonicSums`Private`ExpVar^4) - 5/(576*HarmonicSums`Private`ExpVar^3) + 1/(64*HarmonicSums`Private`ExpVar^2) - 1/(48*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + 2*s6 + (19/(256*HarmonicSums`Private`ExpVar^10) - 263/(1920*HarmonicSums`Private`ExpVar^9) - 9/(512*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) + 1/(128*HarmonicSums`Private`ExpVar^6) - 19/(960*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) + 5/(96*HarmonicSums`Private`ExpVar^3) - 3/(32*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*sinf^2*z2 + (247/(1280*HarmonicSums`Private`ExpVar^10) - 3419/(9600*HarmonicSums`Private`ExpVar^9) - 117/(2560*HarmonicSums`Private`ExpVar^8) + 299/(3360*HarmonicSums`Private`ExpVar^7) + 13/(640*HarmonicSums`Private`ExpVar^6) - 247/(4800*HarmonicSums`Private`ExpVar^5) - 13/(640*HarmonicSums`Private`ExpVar^4) + 13/(96*HarmonicSums`Private`ExpVar^3) - 39/(160*HarmonicSums`Private`ExpVar^2) + 13/(40*HarmonicSums`Private`ExpVar))*z2^2 - (47*z2^3)/35 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar))*z2 + z3/6) + (-19403/(61440*HarmonicSums`Private`ExpVar^10) + 44769/(358400*HarmonicSums`Private`ExpVar^9) + 9889/(172032*HarmonicSums`Private`ExpVar^8) - 439/(17640*HarmonicSums`Private`ExpVar^7) - 299/(15360*HarmonicSums`Private`ExpVar^6) + 1207/(115200*HarmonicSums`Private`ExpVar^5) + 47/(3072*HarmonicSums`Private`ExpVar^4) - 23/(1152*HarmonicSums`Private`ExpVar^3) - 1/(128*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3 - (3*z3^2)/4 + ln2^2*(li4half/2 + (19/(256*HarmonicSums`Private`ExpVar^10) - 263/(1920*HarmonicSums`Private`ExpVar^9) - 9/(512*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) + 1/(128*HarmonicSums`Private`ExpVar^6) - 19/(960*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) + 5/(96*HarmonicSums`Private`ExpVar^3) - 3/(32*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 - (11*z2^2)/20 + (-1)^HarmonicSums`Private`ExpVar* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z3) + z2*(li4half + 9718511/(4300800*HarmonicSums`Private`ExpVar^10) + 17100359/(2032128000*HarmonicSums`Private`ExpVar^9) - 4111957/(12042240*HarmonicSums`Private`ExpVar^8) - 4818869/(118540800*HarmonicSums`Private`ExpVar^7) + 20257/(230400*HarmonicSums`Private`ExpVar^6) + 116309/(1728000*HarmonicSums`Private`ExpVar^5) - 1435/(9216*HarmonicSums`Private`ExpVar^4) + 251/(1728*HarmonicSums`Private`ExpVar^3) - 9/(64*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (93/(32*HarmonicSums`Private`ExpVar^10) - 51/(128*HarmonicSums`Private`ExpVar^8) + 3/(32*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^2) - 3/(16*HarmonicSums`Private`ExpVar))*z3) + sinf*((-19403/(15360*HarmonicSums`Private`ExpVar^10) + 44769/(89600*HarmonicSums`Private`ExpVar^9) + 9889/(43008*HarmonicSums`Private`ExpVar^8) - 439/(4410*HarmonicSums`Private`ExpVar^7) - 299/(3840*HarmonicSums`Private`ExpVar^6) + 1207/(28800*HarmonicSums`Private`ExpVar^5) + 47/(768*HarmonicSums`Private`ExpVar^4) - 23/(288*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (19/(512*HarmonicSums`Private`ExpVar^10) - 263/(3840*HarmonicSums`Private`ExpVar^9) - 9/(1024*HarmonicSums`Private`ExpVar^8) + 23/(1344*HarmonicSums`Private`ExpVar^7) + 1/(256*HarmonicSums`Private`ExpVar^6) - 19/(1920*HarmonicSums`Private`ExpVar^5) - 1/(256*HarmonicSums`Private`ExpVar^4) + 5/(192*HarmonicSums`Private`ExpVar^3) - 3/(64*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(2*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(20*HarmonicSums`Private`ExpVar^10) + 17/(80*HarmonicSums`Private`ExpVar^8) - 1/(20*HarmonicSums`Private`ExpVar^6) + 1/(40*HarmonicSums`Private`ExpVar^4) - 1/(20*HarmonicSums`Private`ExpVar^2) + 1/(10*HarmonicSums`Private`ExpVar))*z2^2 + (-133/(512*HarmonicSums`Private`ExpVar^10) + 1841/(3840*HarmonicSums`Private`ExpVar^9) + 63/(1024*HarmonicSums`Private`ExpVar^8) - 23/(192*HarmonicSums`Private`ExpVar^7) - 7/(256*HarmonicSums`Private`ExpVar^6) + 133/(1920*HarmonicSums`Private`ExpVar^5) + 7/(256*HarmonicSums`Private`ExpVar^4) - 35/(192*HarmonicSums`Private`ExpVar^3) + 21/(64*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3 + (z2*z3)/2 + z5/32) + (-1)^HarmonicSums`Private`ExpVar* (-465/(64*HarmonicSums`Private`ExpVar^10) + 255/(256*HarmonicSums`Private`ExpVar^8) - 15/(64*HarmonicSums`Private`ExpVar^6) + 15/(128*HarmonicSums`Private`ExpVar^4) - 15/(64*HarmonicSums`Private`ExpVar^2) + 15/(32*HarmonicSums`Private`ExpVar))*z5, S[-1, -1, 1, 1, 2, HarmonicSums`Private`ExpVar] :> 6*li6half + ln2^6/80 + (-1)^HarmonicSums`Private`ExpVar*li5half* (31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (31/(160*HarmonicSums`Private`ExpVar^10) - 17/(640*HarmonicSums`Private`ExpVar^8) + 1/(160*HarmonicSums`Private`ExpVar^6) - 1/(320*HarmonicSums`Private`ExpVar^4) + 1/(160*HarmonicSums`Private`ExpVar^2) - 1/(80*HarmonicSums`Private`ExpVar)) + 8030021243/(17781120000*HarmonicSums`Private`ExpVar^10) - 757449739/(592704000*HarmonicSums`Private`ExpVar^9) - 150877367/(1422489600*HarmonicSums`Private`ExpVar^8) + 687829/(6048000*HarmonicSums`Private`ExpVar^7) + 1378847/(2592000*HarmonicSums`Private`ExpVar^6) - 65/(72*HarmonicSums`Private`ExpVar^5) + 2921/(3456*HarmonicSums`Private`ExpVar^4) - 9/(16*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - s6/4 - (ln2^4*z2)/16 + (-19/(128*HarmonicSums`Private`ExpVar^10) + 263/(960*HarmonicSums`Private`ExpVar^9) + 9/(256*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) - 1/(64*HarmonicSums`Private`ExpVar^6) + 19/(480*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*sinf^2*z2 + (-171/(640*HarmonicSums`Private`ExpVar^10) + 789/(1600*HarmonicSums`Private`ExpVar^9) + 81/(1280*HarmonicSums`Private`ExpVar^8) - 69/(560*HarmonicSums`Private`ExpVar^7) - 9/(320*HarmonicSums`Private`ExpVar^6) + 57/(800*HarmonicSums`Private`ExpVar^5) + 9/(320*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 27/(80*HarmonicSums`Private`ExpVar^2) - 9/(20*HarmonicSums`Private`ExpVar))*z2^2 - z2^3/7 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar))*z2 + z3/6) + (-19403/(7680*HarmonicSums`Private`ExpVar^10) + 44769/(44800*HarmonicSums`Private`ExpVar^9) + 9889/(21504*HarmonicSums`Private`ExpVar^8) - 439/(2205*HarmonicSums`Private`ExpVar^7) - 299/(1920*HarmonicSums`Private`ExpVar^6) + 1207/(14400*HarmonicSums`Private`ExpVar^5) + 47/(384*HarmonicSums`Private`ExpVar^4) - 23/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z3 - (25*z3^2)/32 + ln2^2*(li4half/2 - z2^2/16 + (-1)^HarmonicSums`Private`ExpVar* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z3) + z2*(-(li4half/2) - 9718511/(2150400*HarmonicSums`Private`ExpVar^10) - 17100359/(1016064000*HarmonicSums`Private`ExpVar^9) + 4111957/(6021120*HarmonicSums`Private`ExpVar^8) + 4818869/(59270400*HarmonicSums`Private`ExpVar^7) - 20257/(115200*HarmonicSums`Private`ExpVar^6) - 116309/(864000*HarmonicSums`Private`ExpVar^5) + 1435/(4608*HarmonicSums`Private`ExpVar^4) - 251/(864*HarmonicSums`Private`ExpVar^3) + 9/(32*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z3) + sinf*((19403/(7680*HarmonicSums`Private`ExpVar^10) - 44769/(44800*HarmonicSums`Private`ExpVar^9) - 9889/(21504*HarmonicSums`Private`ExpVar^8) + 439/(2205*HarmonicSums`Private`ExpVar^7) + 299/(1920*HarmonicSums`Private`ExpVar^6) - 1207/(14400*HarmonicSums`Private`ExpVar^5) - 47/(384*HarmonicSums`Private`ExpVar^4) + 23/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2 + (19/(64*HarmonicSums`Private`ExpVar^10) - 263/(480*HarmonicSums`Private`ExpVar^9) - 9/(128*HarmonicSums`Private`ExpVar^8) + 23/(168*HarmonicSums`Private`ExpVar^7) + 1/(32*HarmonicSums`Private`ExpVar^6) - 19/(240*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z3) + ln2*(2*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(80*HarmonicSums`Private`ExpVar^10) + 17/(320*HarmonicSums`Private`ExpVar^8) - 1/(80*HarmonicSums`Private`ExpVar^6) + 1/(160*HarmonicSums`Private`ExpVar^4) - 1/(80*HarmonicSums`Private`ExpVar^2) + 1/(40*HarmonicSums`Private`ExpVar))*z2^2 + (z2*z3)/2 + z5/32) + (-1)^HarmonicSums`Private`ExpVar* (31/(128*HarmonicSums`Private`ExpVar^10) - 17/(512*HarmonicSums`Private`ExpVar^8) + 1/(128*HarmonicSums`Private`ExpVar^6) - 1/(256*HarmonicSums`Private`ExpVar^4) + 1/(128*HarmonicSums`Private`ExpVar^2) - 1/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, 1, -2, -1, -1, HarmonicSums`Private`ExpVar] :> 21*li6half - (7*ln2^6)/240 + (-1)^HarmonicSums`Private`ExpVar*li4half* (-1185/(16*HarmonicSums`Private`ExpVar^10) - 119/(8*HarmonicSums`Private`ExpVar^9) + 147/(16*HarmonicSums`Private`ExpVar^8) + 5/(2*HarmonicSums`Private`ExpVar^7) - 15/(8*HarmonicSums`Private`ExpVar^6) - 3/(4*HarmonicSums`Private`ExpVar^5) + 3/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^3) - HarmonicSums`Private`ExpVar^ (-2)) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (31/(60*HarmonicSums`Private`ExpVar^10) - 17/(240*HarmonicSums`Private`ExpVar^8) + 1/(60*HarmonicSums`Private`ExpVar^6) - 1/(120*HarmonicSums`Private`ExpVar^4) + 1/(60*HarmonicSums`Private`ExpVar^2) - 1/(30*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) - 524903/(537600*HarmonicSums`Private`ExpVar^10) + 30053/(13824*HarmonicSums`Private`ExpVar^9) + 2857/(92160*HarmonicSums`Private`ExpVar^8) - 325/(448*HarmonicSums`Private`ExpVar^7) + 547/(1152*HarmonicSums`Private`ExpVar^6) - 27/(160*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + 10*s6 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-395/(128*HarmonicSums`Private`ExpVar^10) - 119/(192*HarmonicSums`Private`ExpVar^9) + 49/(128*HarmonicSums`Private`ExpVar^8) + 5/(48*HarmonicSums`Private`ExpVar^7) - 5/(64*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) + (31*z2)/48) + (2*li4half + 1259/(320*HarmonicSums`Private`ExpVar^10) - 1207/(1440*HarmonicSums`Private`ExpVar^9) - 61/(96*HarmonicSums`Private`ExpVar^8) + 173/(672*HarmonicSums`Private`ExpVar^7) + 35/(192*HarmonicSums`Private`ExpVar^6) - 119/(480*HarmonicSums`Private`ExpVar^5) + 9/(64*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar* (1659/(64*HarmonicSums`Private`ExpVar^10) + 833/(160*HarmonicSums`Private`ExpVar^9) - 1029/(320*HarmonicSums`Private`ExpVar^8) - 7/(8*HarmonicSums`Private`ExpVar^7) + 21/(32*HarmonicSums`Private`ExpVar^6) + 21/(80*HarmonicSums`Private`ExpVar^5) - 21/(80*HarmonicSums`Private`ExpVar^4) - 7/(40*HarmonicSums`Private`ExpVar^3) + 7/(20*HarmonicSums`Private`ExpVar^2))*z2^2 - (263*z2^3)/80 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - (7*z3)/16) - (459*z3^2)/128 + sinf*((-1)^HarmonicSums`Private`ExpVar*li4half* (31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^2*(31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-217/(20*HarmonicSums`Private`ExpVar^10) + 119/(80*HarmonicSums`Private`ExpVar^8) - 7/(20*HarmonicSums`Private`ExpVar^6) + 7/(40*HarmonicSums`Private`ExpVar^4) - 7/(20*HarmonicSums`Private`ExpVar^2) + 7/(10*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (651/(32*HarmonicSums`Private`ExpVar^10) - 357/(128*HarmonicSums`Private`ExpVar^8) + 21/(32*HarmonicSums`Private`ExpVar^6) - 21/(64*HarmonicSums`Private`ExpVar^4) + 21/(32*HarmonicSums`Private`ExpVar^2) - 21/(16*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(-2*li4half + 1259/(320*HarmonicSums`Private`ExpVar^10) - 1207/(1440*HarmonicSums`Private`ExpVar^9) - 61/(96*HarmonicSums`Private`ExpVar^8) + 173/(672*HarmonicSums`Private`ExpVar^7) + 35/(192*HarmonicSums`Private`ExpVar^6) - 119/(480*HarmonicSums`Private`ExpVar^5) + 9/(64*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (263*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (651/(64*HarmonicSums`Private`ExpVar^10) - 357/(256*HarmonicSums`Private`ExpVar^8) + 21/(64*HarmonicSums`Private`ExpVar^6) - 21/(128*HarmonicSums`Private`ExpVar^4) + 21/(64*HarmonicSums`Private`ExpVar^2) - 21/(32*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (3069/(128*HarmonicSums`Private`ExpVar^10) - 1683/(512*HarmonicSums`Private`ExpVar^8) + 99/(128*HarmonicSums`Private`ExpVar^6) - 99/(256*HarmonicSums`Private`ExpVar^4) + 99/(128*HarmonicSums`Private`ExpVar^2) - 99/(64*HarmonicSums`Private`ExpVar))*z5 + ln2*(-3*li5half + (-1)^HarmonicSums`Private`ExpVar* (548563/(172800*HarmonicSums`Private`ExpVar^10) - 1878997/(1411200*HarmonicSums`Private`ExpVar^9) - 140393/(282240*HarmonicSums`Private`ExpVar^8) + 821/(4800*HarmonicSums`Private`ExpVar^7) + 299/(900*HarmonicSums`Private`ExpVar^6) - 55/(144*HarmonicSums`Private`ExpVar^5) + 61/(288*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-1643/(160*HarmonicSums`Private`ExpVar^10) + 901/(640*HarmonicSums`Private`ExpVar^8) - 53/(160*HarmonicSums`Private`ExpVar^6) + 53/(320*HarmonicSums`Private`ExpVar^4) - 53/(160*HarmonicSums`Private`ExpVar^2) + 53/(80*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (-24885/(512*HarmonicSums`Private`ExpVar^10) - 2499/(256*HarmonicSums`Private`ExpVar^9) + 3087/(512*HarmonicSums`Private`ExpVar^8) + 105/(64*HarmonicSums`Private`ExpVar^7) - 315/(256*HarmonicSums`Private`ExpVar^6) - 63/(128*HarmonicSums`Private`ExpVar^5) + 63/(128*HarmonicSums`Private`ExpVar^4) + 21/(64*HarmonicSums`Private`ExpVar^3) - 21/(32*HarmonicSums`Private`ExpVar^2))*z3 + (21*z2*z3)/16 + (99*z5)/32), S[-1, 1, -2, -1, 1, HarmonicSums`Private`ExpVar] :> 15*li6half - (3*ln2^6)/80 + (-1)^HarmonicSums`Private`ExpVar* (6829578491/(1524096000*HarmonicSums`Private`ExpVar^10) + 348958751/(592704000*HarmonicSums`Private`ExpVar^9) - 13674947/(26342400*HarmonicSums`Private`ExpVar^8) - 228287/(864000*HarmonicSums`Private`ExpVar^7) + 386813/(1728000*HarmonicSums`Private`ExpVar^6) + 263/(6912*HarmonicSums`Private`ExpVar^5) - 13/(108*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-3555/(64*HarmonicSums`Private`ExpVar^10) - 357/(32*HarmonicSums`Private`ExpVar^9) + 441/(64*HarmonicSums`Private`ExpVar^8) + 15/(8*HarmonicSums`Private`ExpVar^7) - 45/(32*HarmonicSums`Private`ExpVar^6) - 9/(16*HarmonicSums`Private`ExpVar^5) + 9/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(480*HarmonicSums`Private`ExpVar^10) - 17/(1920*HarmonicSums`Private`ExpVar^8) + 1/(480*HarmonicSums`Private`ExpVar^6) - 1/(960*HarmonicSums`Private`ExpVar^4) + 1/(480*HarmonicSums`Private`ExpVar^2) - 1/(240*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + (37*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-1185/(512*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^9) + 147/(512*HarmonicSums`Private`ExpVar^8) + 5/(64*HarmonicSums`Private`ExpVar^7) - 15/(256*HarmonicSums`Private`ExpVar^6) - 3/(128*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2)) + (19*z2)/48) + (2*li4half - 1259/(320*HarmonicSums`Private`ExpVar^10) + 1207/(1440*HarmonicSums`Private`ExpVar^9) + 61/(96*HarmonicSums`Private`ExpVar^8) - 173/(672*HarmonicSums`Private`ExpVar^7) - 35/(192*HarmonicSums`Private`ExpVar^6) + 119/(480*HarmonicSums`Private`ExpVar^5) - 9/(64*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (-31/(48*HarmonicSums`Private`ExpVar^10) + 17/(192*HarmonicSums`Private`ExpVar^8) - 1/(48*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (9243/(512*HarmonicSums`Private`ExpVar^10) + 4641/(1280*HarmonicSums`Private`ExpVar^9) - 5733/(2560*HarmonicSums`Private`ExpVar^8) - 39/(64*HarmonicSums`Private`ExpVar^7) + 117/(256*HarmonicSums`Private`ExpVar^6) + 117/(640*HarmonicSums`Private`ExpVar^5) - 117/(640*HarmonicSums`Private`ExpVar^4) - 39/(320*HarmonicSums`Private`ExpVar^3) + 39/(160*HarmonicSums`Private`ExpVar^2))*z2^2 - (197*z2^3)/80 + ln2^2*(-2*li4half + 1259/(320*HarmonicSums`Private`ExpVar^10) - 1207/(1440*HarmonicSums`Private`ExpVar^9) - 61/(96*HarmonicSums`Private`ExpVar^8) + 173/(672*HarmonicSums`Private`ExpVar^7) + 35/(192*HarmonicSums`Private`ExpVar^6) - 119/(480*HarmonicSums`Private`ExpVar^5) + 9/(64*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) - (59*z2^2)/20) + sinf*((-1)^HarmonicSums`Private`ExpVar* (-548563/(172800*HarmonicSums`Private`ExpVar^10) + 1878997/(1411200*HarmonicSums`Private`ExpVar^9) + 140393/(282240*HarmonicSums`Private`ExpVar^8) - 821/(4800*HarmonicSums`Private`ExpVar^7) - 299/(900*HarmonicSums`Private`ExpVar^6) + 55/(144*HarmonicSums`Private`ExpVar^5) - 61/(288*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*li4half* (93/(4*HarmonicSums`Private`ExpVar^10) - 51/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-1209/(160*HarmonicSums`Private`ExpVar^10) + 663/(640*HarmonicSums`Private`ExpVar^8) - 39/(160*HarmonicSums`Private`ExpVar^6) + 39/(320*HarmonicSums`Private`ExpVar^4) - 39/(160*HarmonicSums`Private`ExpVar^2) + 39/(80*HarmonicSums`Private`ExpVar))*z2^2) - (111*z3^2)/32 + (-1)^HarmonicSums`Private`ExpVar* (-2511/(256*HarmonicSums`Private`ExpVar^10) + 1377/(1024*HarmonicSums`Private`ExpVar^8) - 81/(256*HarmonicSums`Private`ExpVar^6) + 81/(512*HarmonicSums`Private`ExpVar^4) - 81/(256*HarmonicSums`Private`ExpVar^2) + 81/(128*HarmonicSums`Private`ExpVar))*z5 + ln2*(-3*li5half + (-1)^HarmonicSums`Private`ExpVar* (1333/(160*HarmonicSums`Private`ExpVar^10) - 731/(640*HarmonicSums`Private`ExpVar^8) + 43/(160*HarmonicSums`Private`ExpVar^6) - 43/(320*HarmonicSums`Private`ExpVar^4) + 43/(160*HarmonicSums`Private`ExpVar^2) - 43/(80*HarmonicSums`Private`ExpVar))*z2^2 + (99*z5)/32), S[-1, 1, -2, 1, -1, HarmonicSums`Private`ExpVar] :> -(ln2^6/120) + (-1)^HarmonicSums`Private`ExpVar* (-591029/(2073600*HarmonicSums`Private`ExpVar^10) + 3478717/(5644800*HarmonicSums`Private`ExpVar^9) + 43369/(250880*HarmonicSums`Private`ExpVar^8) - 21193/(57600*HarmonicSums`Private`ExpVar^7) + 25327/(115200*HarmonicSums`Private`ExpVar^6) - 175/(2304*HarmonicSums`Private`ExpVar^5) + 1/(72*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-31/(480*HarmonicSums`Private`ExpVar^10) + 17/(1920*HarmonicSums`Private`ExpVar^8) - 1/(480*HarmonicSums`Private`ExpVar^6) + 1/(960*HarmonicSums`Private`ExpVar^4) - 1/(480*HarmonicSums`Private`ExpVar^2) + 1/(240*HarmonicSums`Private`ExpVar)) - (3*s6)/4 - (7*ln2^4*z2)/24 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (31/(48*HarmonicSums`Private`ExpVar^10) - 17/(192*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (711/(512*HarmonicSums`Private`ExpVar^10) + 357/(1280*HarmonicSums`Private`ExpVar^9) - 441/(2560*HarmonicSums`Private`ExpVar^8) - 3/(64*HarmonicSums`Private`ExpVar^7) + 9/(256*HarmonicSums`Private`ExpVar^6) + 9/(640*HarmonicSums`Private`ExpVar^5) - 9/(640*HarmonicSums`Private`ExpVar^4) - 3/(320*HarmonicSums`Private`ExpVar^3) + 3/(160*HarmonicSums`Private`ExpVar^2))*z2^2 - (103*z2^3)/560 + ln2^2*(-1259/(320*HarmonicSums`Private`ExpVar^10) + 1207/(1440*HarmonicSums`Private`ExpVar^9) + 61/(96*HarmonicSums`Private`ExpVar^8) - 173/(672*HarmonicSums`Private`ExpVar^7) - 35/(192*HarmonicSums`Private`ExpVar^6) + 119/(480*HarmonicSums`Private`ExpVar^5) - 9/(64*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (3555/(256*HarmonicSums`Private`ExpVar^10) + 357/(128*HarmonicSums`Private`ExpVar^9) - 441/(256*HarmonicSums`Private`ExpVar^8) - 15/(32*HarmonicSums`Private`ExpVar^7) + 45/(128*HarmonicSums`Private`ExpVar^6) + 9/(64*HarmonicSums`Private`ExpVar^5) - 9/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2))*z2 + (13*z2^2)/20) + sinf*(ln2*(-1259/(160*HarmonicSums`Private`ExpVar^10) + 1207/(720*HarmonicSums`Private`ExpVar^9) + 61/(48*HarmonicSums`Private`ExpVar^8) - 173/(336*HarmonicSums`Private`ExpVar^7) - 35/(96*HarmonicSums`Private`ExpVar^6) + 119/(240*HarmonicSums`Private`ExpVar^5) - 9/(32*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (-93/(16*HarmonicSums`Private`ExpVar^10) + 51/(64*HarmonicSums`Private`ExpVar^8) - 3/(16*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^2) + 3/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-93/(160*HarmonicSums`Private`ExpVar^10) + 51/(640*HarmonicSums`Private`ExpVar^8) - 3/(160*HarmonicSums`Private`ExpVar^6) + 3/(320*HarmonicSums`Private`ExpVar^4) - 3/(160*HarmonicSums`Private`ExpVar^2) + 3/(80*HarmonicSums`Private`ExpVar))*z2^2) + (9*z3^2)/32 + ln2*(li5half + 89137/(7200*HarmonicSums`Private`ExpVar^10) - 400553/(453600*HarmonicSums`Private`ExpVar^9) - 26977/(16128*HarmonicSums`Private`ExpVar^8) + 42071/(141120*HarmonicSums`Private`ExpVar^7) + 1987/(5760*HarmonicSums`Private`ExpVar^6) - 2987/(14400*HarmonicSums`Private`ExpVar^5) + 5/(384*HarmonicSums`Private`ExpVar^4) + 1/(36*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (31/(80*HarmonicSums`Private`ExpVar^10) - 17/(320*HarmonicSums`Private`ExpVar^8) + 1/(80*HarmonicSums`Private`ExpVar^6) - 1/(160*HarmonicSums`Private`ExpVar^4) + 1/(80*HarmonicSums`Private`ExpVar^2) - 1/(40*HarmonicSums`Private`ExpVar))*z2^2 - (25*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-775/(128*HarmonicSums`Private`ExpVar^10) + 425/(512*HarmonicSums`Private`ExpVar^8) - 25/(128*HarmonicSums`Private`ExpVar^6) + 25/(256*HarmonicSums`Private`ExpVar^4) - 25/(128*HarmonicSums`Private`ExpVar^2) + 25/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, 1, -2, 1, 1, HarmonicSums`Private`ExpVar] :> 2*li6half - ln2^6/180 + (-1)^HarmonicSums`Private`ExpVar*li4half* (-1185/(64*HarmonicSums`Private`ExpVar^10) - 119/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(120*HarmonicSums`Private`ExpVar^10) - 17/(480*HarmonicSums`Private`ExpVar^8) + 1/(120*HarmonicSums`Private`ExpVar^6) - 1/(240*HarmonicSums`Private`ExpVar^4) + 1/(120*HarmonicSums`Private`ExpVar^2) - 1/(60*HarmonicSums`Private`ExpVar)) + 555925679/(72576000*HarmonicSums`Private`ExpVar^10) + 4297098499/(2286144000*HarmonicSums`Private`ExpVar^9) - 12725623/(13547520*HarmonicSums`Private`ExpVar^8) - 27064489/(59270400*HarmonicSums`Private`ExpVar^7) + 160031/(345600*HarmonicSums`Private`ExpVar^6) - 140231/(864000*HarmonicSums`Private`ExpVar^5) + 145/(4608*HarmonicSums`Private`ExpVar^4) - 1/(108*HarmonicSums`Private`ExpVar^3) - s6/4 + (1259/(320*HarmonicSums`Private`ExpVar^10) - 1207/(1440*HarmonicSums`Private`ExpVar^9) - 61/(96*HarmonicSums`Private`ExpVar^8) + 173/(672*HarmonicSums`Private`ExpVar^7) + 35/(192*HarmonicSums`Private`ExpVar^6) - 119/(480*HarmonicSums`Private`ExpVar^5) + 9/(64*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3))*sinf^2 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-395/(512*HarmonicSums`Private`ExpVar^10) - 119/(768*HarmonicSums`Private`ExpVar^9) + 49/(512*HarmonicSums`Private`ExpVar^8) + 5/(192*HarmonicSums`Private`ExpVar^7) - 5/(256*HarmonicSums`Private`ExpVar^6) - 1/(128*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) + 1/(192*HarmonicSums`Private`ExpVar^3) - 1/(96*HarmonicSums`Private`ExpVar^2)) + z2/12) + (li4half + 1259/(320*HarmonicSums`Private`ExpVar^10) - 1207/(1440*HarmonicSums`Private`ExpVar^9) - 61/(96*HarmonicSums`Private`ExpVar^8) + 173/(672*HarmonicSums`Private`ExpVar^7) + 35/(192*HarmonicSums`Private`ExpVar^6) - 119/(480*HarmonicSums`Private`ExpVar^5) + 9/(64*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar* (1185/(512*HarmonicSums`Private`ExpVar^10) + 119/(256*HarmonicSums`Private`ExpVar^9) - 147/(512*HarmonicSums`Private`ExpVar^8) - 5/(64*HarmonicSums`Private`ExpVar^7) + 15/(256*HarmonicSums`Private`ExpVar^6) + 3/(128*HarmonicSums`Private`ExpVar^5) - 3/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2))*z2^2 - (251*z2^3)/560 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar))*z2 - (7*z3)/48) + (19*z3^2)/128 + sinf*((-1)^HarmonicSums`Private`ExpVar*li4half* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(31/(96*HarmonicSums`Private`ExpVar^10) - 17/(384*HarmonicSums`Private`ExpVar^8) + 1/(96*HarmonicSums`Private`ExpVar^6) - 1/(192*HarmonicSums`Private`ExpVar^4) + 1/(96*HarmonicSums`Private`ExpVar^2) - 1/(48*HarmonicSums`Private`ExpVar)) - 89137/(7200*HarmonicSums`Private`ExpVar^10) + 400553/(453600*HarmonicSums`Private`ExpVar^9) + 26977/(16128*HarmonicSums`Private`ExpVar^8) - 42071/(141120*HarmonicSums`Private`ExpVar^7) - 1987/(5760*HarmonicSums`Private`ExpVar^6) + 2987/(14400*HarmonicSums`Private`ExpVar^5) - 5/(384*HarmonicSums`Private`ExpVar^4) - 1/(36*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* ln2^2*(-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (217/(32*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^6) - 7/(64*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (7*z2^2)/20 + (-1)^HarmonicSums`Private`ExpVar* (217/(64*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^6) - 7/(128*HarmonicSums`Private`ExpVar^4) + 7/(64*HarmonicSums`Private`ExpVar^2) - 7/(32*HarmonicSums`Private`ExpVar))*z3) + ln2*(li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-8295/(512*HarmonicSums`Private`ExpVar^10) - 833/(256*HarmonicSums`Private`ExpVar^9) + 1029/(512*HarmonicSums`Private`ExpVar^8) + 35/(64*HarmonicSums`Private`ExpVar^7) - 105/(256*HarmonicSums`Private`ExpVar^6) - 21/(128*HarmonicSums`Private`ExpVar^5) + 21/(128*HarmonicSums`Private`ExpVar^4) + 7/(64*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2))*z3 + (7*z2*z3)/16 - (25*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-775/(128*HarmonicSums`Private`ExpVar^10) + 425/(512*HarmonicSums`Private`ExpVar^8) - 25/(128*HarmonicSums`Private`ExpVar^6) + 25/(256*HarmonicSums`Private`ExpVar^4) - 25/(128*HarmonicSums`Private`ExpVar^2) + 25/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, 1, 2, -1, -1, HarmonicSums`Private`ExpVar] :> -27*li6half - ln2^6/60 + (-1)^HarmonicSums`Private`ExpVar* (2050487/(691200*HarmonicSums`Private`ExpVar^10) - 18556519/(16934400*HarmonicSums`Private`ExpVar^9) - 2398001/(6773760*HarmonicSums`Private`ExpVar^8) - 3017/(86400*HarmonicSums`Private`ExpVar^7) + 17179/(38400*HarmonicSums`Private`ExpVar^6) - 323/(768*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(1185/(64*HarmonicSums`Private`ExpVar^10) + 119/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-31/(120*HarmonicSums`Private`ExpVar^10) + 17/(480*HarmonicSums`Private`ExpVar^8) - 1/(120*HarmonicSums`Private`ExpVar^6) + 1/(240*HarmonicSums`Private`ExpVar^4) - 1/(120*HarmonicSums`Private`ExpVar^2) + 1/(60*HarmonicSums`Private`ExpVar)) - (43*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(512*HarmonicSums`Private`ExpVar^10) + 119/(768*HarmonicSums`Private`ExpVar^9) - 49/(512*HarmonicSums`Private`ExpVar^8) - 5/(192*HarmonicSums`Private`ExpVar^7) + 5/(256*HarmonicSums`Private`ExpVar^6) + 1/(128*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) - 1/(192*HarmonicSums`Private`ExpVar^3) + 1/(96*HarmonicSums`Private`ExpVar^2)) - z2/3) + (-1)^HarmonicSums`Private`ExpVar* (237/(512*HarmonicSums`Private`ExpVar^10) + 119/(1280*HarmonicSums`Private`ExpVar^9) - 147/(2560*HarmonicSums`Private`ExpVar^8) - 1/(64*HarmonicSums`Private`ExpVar^7) + 3/(256*HarmonicSums`Private`ExpVar^6) + 3/(640*HarmonicSums`Private`ExpVar^5) - 3/(640*HarmonicSums`Private`ExpVar^4) - 1/(320*HarmonicSums`Private`ExpVar^3) + 1/(160*HarmonicSums`Private`ExpVar^2))*z2^2 + (2259*z2^3)/560 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(96*HarmonicSums`Private`ExpVar^10) + 17/(384*HarmonicSums`Private`ExpVar^8) - 1/(96*HarmonicSums`Private`ExpVar^6) + 1/(192*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^2*(-155/(16*HarmonicSums`Private`ExpVar^10) + 85/(64*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^4) - 5/(16*HarmonicSums`Private`ExpVar^2) + 5/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-31/(160*HarmonicSums`Private`ExpVar^10) + 17/(640*HarmonicSums`Private`ExpVar^8) - 1/(160*HarmonicSums`Private`ExpVar^6) + 1/(320*HarmonicSums`Private`ExpVar^4) - 1/(160*HarmonicSums`Private`ExpVar^2) + 1/(80*HarmonicSums`Private`ExpVar))*z2^2) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(12*HarmonicSums`Private`ExpVar^10) - 17/(48*HarmonicSums`Private`ExpVar^8) + 1/(12*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar))*z2 - (7*z3)/16) + (237*z3^2)/64 + z2*(-(li4half/2) + (-1)^HarmonicSums`Private`ExpVar* (-17101/(1600*HarmonicSums`Private`ExpVar^10) + 39307/(39200*HarmonicSums`Private`ExpVar^9) + 411413/(282240*HarmonicSums`Private`ExpVar^8) - 1129/(7200*HarmonicSums`Private`ExpVar^7) - 4819/(14400*HarmonicSums`Private`ExpVar^6) - 11/(288*HarmonicSums`Private`ExpVar^5) + 115/(288*HarmonicSums`Private`ExpVar^4) - 7/(16*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-217/(32*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^6) + 7/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(li4half/2 + (-1)^HarmonicSums`Private`ExpVar* (-17101/(1600*HarmonicSums`Private`ExpVar^10) + 39307/(39200*HarmonicSums`Private`ExpVar^9) + 411413/(282240*HarmonicSums`Private`ExpVar^8) - 1129/(7200*HarmonicSums`Private`ExpVar^7) - 4819/(14400*HarmonicSums`Private`ExpVar^6) - 11/(288*HarmonicSums`Private`ExpVar^5) + 115/(288*HarmonicSums`Private`ExpVar^4) - 7/(16*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (5925/(256*HarmonicSums`Private`ExpVar^10) + 595/(128*HarmonicSums`Private`ExpVar^9) - 735/(256*HarmonicSums`Private`ExpVar^8) - 25/(32*HarmonicSums`Private`ExpVar^7) + 75/(128*HarmonicSums`Private`ExpVar^6) + 15/(64*HarmonicSums`Private`ExpVar^5) - 15/(64*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^3) + 5/(16*HarmonicSums`Private`ExpVar^2))*z2 + (29*z2^2)/8 + (-1)^HarmonicSums`Private`ExpVar* (-217/(32*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^6) + 7/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(767/(1280*HarmonicSums`Private`ExpVar^10) + 1511/(640*HarmonicSums`Private`ExpVar^9) - 569/(1536*HarmonicSums`Private`ExpVar^8) - 121/(224*HarmonicSums`Private`ExpVar^7) + 41/(96*HarmonicSums`Private`ExpVar^6) - 13/(80*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + (-1)^HarmonicSums`Private`ExpVar* (1643/(160*HarmonicSums`Private`ExpVar^10) - 901/(640*HarmonicSums`Private`ExpVar^8) + 53/(160*HarmonicSums`Private`ExpVar^6) - 53/(320*HarmonicSums`Private`ExpVar^4) + 53/(160*HarmonicSums`Private`ExpVar^2) - 53/(80*HarmonicSums`Private`ExpVar))*z2^2 - (21*z2*z3)/16 - (87*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-2511/(256*HarmonicSums`Private`ExpVar^10) + 1377/(1024*HarmonicSums`Private`ExpVar^8) - 81/(256*HarmonicSums`Private`ExpVar^6) + 81/(512*HarmonicSums`Private`ExpVar^4) - 81/(256*HarmonicSums`Private`ExpVar^2) + 81/(128*HarmonicSums`Private`ExpVar))*z5, S[-1, 1, 2, -1, 1, HarmonicSums`Private`ExpVar] :> -21*li6half - ln2^6/120 + (-1)^HarmonicSums`Private`ExpVar*li4half* (1185/(16*HarmonicSums`Private`ExpVar^10) + 119/(8*HarmonicSums`Private`ExpVar^9) - 147/(16*HarmonicSums`Private`ExpVar^8) - 5/(2*HarmonicSums`Private`ExpVar^7) + 15/(8*HarmonicSums`Private`ExpVar^6) + 3/(4*HarmonicSums`Private`ExpVar^5) - 3/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^3) + HarmonicSums`Private`ExpVar^ (-2)) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar)) - 415549/(153600*HarmonicSums`Private`ExpVar^10) + 1381297/(537600*HarmonicSums`Private`ExpVar^9) + 33365/(258048*HarmonicSums`Private`ExpVar^8) - 24293/(47040*HarmonicSums`Private`ExpVar^7) + 1087/(5760*HarmonicSums`Private`ExpVar^6) - 23/(1600*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) - (17*s6)/2 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(128*HarmonicSums`Private`ExpVar^10) + 119/(192*HarmonicSums`Private`ExpVar^9) - 49/(128*HarmonicSums`Private`ExpVar^8) - 5/(48*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) - (5*z2)/24) + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (93/(16*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^8) + 3/(16*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(32*HarmonicSums`Private`ExpVar^10) - 119/(16*HarmonicSums`Private`ExpVar^9) + 147/(32*HarmonicSums`Private`ExpVar^8) + 5/(4*HarmonicSums`Private`ExpVar^7) - 15/(16*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2))*z2^2 + (417*z2^3)/112 + (681*z3^2)/128 + z2*((-7*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (17101/(1600*HarmonicSums`Private`ExpVar^10) - 39307/(39200*HarmonicSums`Private`ExpVar^9) - 411413/(282240*HarmonicSums`Private`ExpVar^8) + 1129/(7200*HarmonicSums`Private`ExpVar^7) + 4819/(14400*HarmonicSums`Private`ExpVar^6) + 11/(288*HarmonicSums`Private`ExpVar^5) - 115/(288*HarmonicSums`Private`ExpVar^4) + 7/(16*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (217/(32*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^6) - 7/(64*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(li4half/2 + (-1)^HarmonicSums`Private`ExpVar* (-17101/(1600*HarmonicSums`Private`ExpVar^10) + 39307/(39200*HarmonicSums`Private`ExpVar^9) + 411413/(282240*HarmonicSums`Private`ExpVar^8) - 1129/(7200*HarmonicSums`Private`ExpVar^7) - 4819/(14400*HarmonicSums`Private`ExpVar^6) - 11/(288*HarmonicSums`Private`ExpVar^5) + 115/(288*HarmonicSums`Private`ExpVar^4) - 7/(16*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (233*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (-1085/(64*HarmonicSums`Private`ExpVar^10) + 595/(256*HarmonicSums`Private`ExpVar^8) - 35/(64*HarmonicSums`Private`ExpVar^6) + 35/(128*HarmonicSums`Private`ExpVar^4) - 35/(64*HarmonicSums`Private`ExpVar^2) + 35/(32*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) - 767/(1280*HarmonicSums`Private`ExpVar^10) - 1511/(640*HarmonicSums`Private`ExpVar^9) + 569/(1536*HarmonicSums`Private`ExpVar^8) + 121/(224*HarmonicSums`Private`ExpVar^7) - 41/(96*HarmonicSums`Private`ExpVar^6) + 13/(80*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + (-1)^HarmonicSums`Private`ExpVar* ln2^2*(31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1))*z2^2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (-651/(32*HarmonicSums`Private`ExpVar^10) + 357/(128*HarmonicSums`Private`ExpVar^8) - 21/(32*HarmonicSums`Private`ExpVar^6) + 21/(64*HarmonicSums`Private`ExpVar^4) - 21/(32*HarmonicSums`Private`ExpVar^2) + 21/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*((-1)^HarmonicSums`Private`ExpVar*li4half* (-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (1581/(160*HarmonicSums`Private`ExpVar^10) - 867/(640*HarmonicSums`Private`ExpVar^8) + 51/(160*HarmonicSums`Private`ExpVar^6) - 51/(320*HarmonicSums`Private`ExpVar^4) + 51/(160*HarmonicSums`Private`ExpVar^2) - 51/(80*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (24885/(512*HarmonicSums`Private`ExpVar^10) + 2499/(256*HarmonicSums`Private`ExpVar^9) - 3087/(512*HarmonicSums`Private`ExpVar^8) - 105/(64*HarmonicSums`Private`ExpVar^7) + 315/(256*HarmonicSums`Private`ExpVar^6) + 63/(128*HarmonicSums`Private`ExpVar^5) - 63/(128*HarmonicSums`Private`ExpVar^4) - 21/(64*HarmonicSums`Private`ExpVar^3) + 21/(32*HarmonicSums`Private`ExpVar^2))*z3 - (21*z2*z3)/8 - (87*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-2697/(128*HarmonicSums`Private`ExpVar^10) + 1479/(512*HarmonicSums`Private`ExpVar^8) - 87/(128*HarmonicSums`Private`ExpVar^6) + 87/(256*HarmonicSums`Private`ExpVar^4) - 87/(128*HarmonicSums`Private`ExpVar^2) + 87/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, 1, 2, 1, -1, HarmonicSums`Private`ExpVar] :> -(ln2^6/80) + (-1)^HarmonicSums`Private`ExpVar*li4half* (3555/(64*HarmonicSums`Private`ExpVar^10) + 357/(32*HarmonicSums`Private`ExpVar^9) - 441/(64*HarmonicSums`Private`ExpVar^8) - 15/(8*HarmonicSums`Private`ExpVar^7) + 45/(32*HarmonicSums`Private`ExpVar^6) + 9/(16*HarmonicSums`Private`ExpVar^5) - 9/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-93/(160*HarmonicSums`Private`ExpVar^10) + 51/(640*HarmonicSums`Private`ExpVar^8) - 3/(160*HarmonicSums`Private`ExpVar^6) + 3/(320*HarmonicSums`Private`ExpVar^4) - 3/(160*HarmonicSums`Private`ExpVar^2) + 3/(80*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-93/(2*HarmonicSums`Private`ExpVar^10) + 51/(8*HarmonicSums`Private`ExpVar^8) - 3/(2*HarmonicSums`Private`ExpVar^6) + 3/(4*HarmonicSums`Private`ExpVar^4) - 3/(2*HarmonicSums`Private`ExpVar^2) + 3/HarmonicSums`Private`ExpVar) - 1749/(512*HarmonicSums`Private`ExpVar^10) - 199/(1920*HarmonicSums`Private`ExpVar^9) + 91/(128*HarmonicSums`Private`ExpVar^8) - 79/(224*HarmonicSums`Private`ExpVar^7) + 3/(32*HarmonicSums`Private`ExpVar^6) - 1/(80*HarmonicSums`Private`ExpVar^5) - (15*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (1185/(512*HarmonicSums`Private`ExpVar^10) + 119/(256*HarmonicSums`Private`ExpVar^9) - 147/(512*HarmonicSums`Private`ExpVar^8) - 5/(64*HarmonicSums`Private`ExpVar^7) + 15/(256*HarmonicSums`Private`ExpVar^6) + 3/(128*HarmonicSums`Private`ExpVar^5) - 3/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2)) + z2/16) - (9*li4half*z2)/2 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-711/(32*HarmonicSums`Private`ExpVar^10) - 357/(80*HarmonicSums`Private`ExpVar^9) + 441/(160*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^7) - 9/(16*HarmonicSums`Private`ExpVar^6) - 9/(40*HarmonicSums`Private`ExpVar^5) + 9/(40*HarmonicSums`Private`ExpVar^4) + 3/(20*HarmonicSums`Private`ExpVar^3) - 3/(10*HarmonicSums`Private`ExpVar^2))*z2^2 + z2^3 + (45*z3^2)/32 + ln2^2*((-3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (17101/(1600*HarmonicSums`Private`ExpVar^10) - 39307/(39200*HarmonicSums`Private`ExpVar^9) - 411413/(282240*HarmonicSums`Private`ExpVar^8) + 1129/(7200*HarmonicSums`Private`ExpVar^7) + 4819/(14400*HarmonicSums`Private`ExpVar^6) + 11/(288*HarmonicSums`Private`ExpVar^5) - 115/(288*HarmonicSums`Private`ExpVar^4) + 7/(16*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-3555/(128*HarmonicSums`Private`ExpVar^10) - 357/(64*HarmonicSums`Private`ExpVar^9) + 441/(128*HarmonicSums`Private`ExpVar^8) + 15/(16*HarmonicSums`Private`ExpVar^7) - 45/(64*HarmonicSums`Private`ExpVar^6) - 9/(32*HarmonicSums`Private`ExpVar^5) + 9/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2))*z2 - (3*z2^2)/16 + (-1)^HarmonicSums`Private`ExpVar* (-217/(64*HarmonicSums`Private`ExpVar^10) + 119/(256*HarmonicSums`Private`ExpVar^8) - 7/(64*HarmonicSums`Private`ExpVar^6) + 7/(128*HarmonicSums`Private`ExpVar^4) - 7/(64*HarmonicSums`Private`ExpVar^2) + 7/(32*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^2*(93/(8*HarmonicSums`Private`ExpVar^10) - 51/(32*HarmonicSums`Private`ExpVar^8) + 3/(8*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^2) - 3/(4*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (93/(10*HarmonicSums`Private`ExpVar^10) - 51/(40*HarmonicSums`Private`ExpVar^8) + 3/(10*HarmonicSums`Private`ExpVar^6) - 3/(20*HarmonicSums`Private`ExpVar^4) + 3/(10*HarmonicSums`Private`ExpVar^2) - 3/(5*HarmonicSums`Private`ExpVar))*z2^2 + ln2*((-1)^HarmonicSums`Private`ExpVar* (17101/(800*HarmonicSums`Private`ExpVar^10) - 39307/(19600*HarmonicSums`Private`ExpVar^9) - 411413/(141120*HarmonicSums`Private`ExpVar^8) + 1129/(3600*HarmonicSums`Private`ExpVar^7) + 4819/(7200*HarmonicSums`Private`ExpVar^6) + 11/(144*HarmonicSums`Private`ExpVar^5) - 115/(144*HarmonicSums`Private`ExpVar^4) + 7/(8*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-217/(32*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^6) + 7/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3)) + (-1)^HarmonicSums`Private`ExpVar*(93/(2*HarmonicSums`Private`ExpVar^10) - 51/(8*HarmonicSums`Private`ExpVar^8) + 3/(2*HarmonicSums`Private`ExpVar^6) - 3/(4*HarmonicSums`Private`ExpVar^4) + 3/(2*HarmonicSums`Private`ExpVar^2) - 3/HarmonicSums`Private`ExpVar)* z5 + ln2*(-6*li5half + (-1)^HarmonicSums`Private`ExpVar* (-353615561/(127008000*HarmonicSums`Private`ExpVar^10) - 347209021/(49392000*HarmonicSums`Private`ExpVar^9) - 5438339/(14817600*HarmonicSums`Private`ExpVar^8) + 269881/(216000*HarmonicSums`Private`ExpVar^7) + 77153/(216000*HarmonicSums`Private`ExpVar^6) - 355/(864*HarmonicSums`Private`ExpVar^5) - 257/(432*HarmonicSums`Private`ExpVar^4) + 5/(4*HarmonicSums`Private`ExpVar^3) - HarmonicSums`Private`ExpVar^ (-2)) + (-1)^HarmonicSums`Private`ExpVar*li4half* (-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-93/(5*HarmonicSums`Private`ExpVar^10) + 51/(20*HarmonicSums`Private`ExpVar^8) - 3/(5*HarmonicSums`Private`ExpVar^6) + 3/(10*HarmonicSums`Private`ExpVar^4) - 3/(5*HarmonicSums`Private`ExpVar^2) + 6/(5*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (8295/(512*HarmonicSums`Private`ExpVar^10) + 833/(256*HarmonicSums`Private`ExpVar^9) - 1029/(512*HarmonicSums`Private`ExpVar^8) - 35/(64*HarmonicSums`Private`ExpVar^7) + 105/(256*HarmonicSums`Private`ExpVar^6) + 21/(128*HarmonicSums`Private`ExpVar^5) - 21/(128*HarmonicSums`Private`ExpVar^4) - 7/(64*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2))*z3 + 6*z5), S[-1, 1, 2, 1, 1, HarmonicSums`Private`ExpVar] :> -10*li6half - (19*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar* (-243245748559/(53343360000*HarmonicSums`Private`ExpVar^10) + 2011389763/(768320000*HarmonicSums`Private`ExpVar^9) + 428608933/(553190400*HarmonicSums`Private`ExpVar^8) - 3728981/(4320000*HarmonicSums`Private`ExpVar^7) - 299711/(8640000*HarmonicSums`Private`ExpVar^6) - 673/(6912*HarmonicSums`Private`ExpVar^5) + 1831/(1728*HarmonicSums`Private`ExpVar^4) - 57/(32*HarmonicSums`Private`ExpVar^3) + 3/(2*HarmonicSums`Private`ExpVar^2)) - (15*s6)/4 + (-1)^HarmonicSums`Private`ExpVar* (-17101/(1600*HarmonicSums`Private`ExpVar^10) + 39307/(39200*HarmonicSums`Private`ExpVar^9) + 411413/(282240*HarmonicSums`Private`ExpVar^8) - 1129/(7200*HarmonicSums`Private`ExpVar^7) - 4819/(14400*HarmonicSums`Private`ExpVar^6) - 11/(288*HarmonicSums`Private`ExpVar^5) + 115/(288*HarmonicSums`Private`ExpVar^4) - 7/(16*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*sinf^2 + (7*ln2^4*z2)/48 + ((3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (-17101/(1600*HarmonicSums`Private`ExpVar^10) + 39307/(39200*HarmonicSums`Private`ExpVar^9) + 411413/(282240*HarmonicSums`Private`ExpVar^8) - 1129/(7200*HarmonicSums`Private`ExpVar^7) - 4819/(14400*HarmonicSums`Private`ExpVar^6) - 11/(288*HarmonicSums`Private`ExpVar^5) + 115/(288*HarmonicSums`Private`ExpVar^4) - 7/(16*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)))*z2 + (-1)^HarmonicSums`Private`ExpVar* (711/(32*HarmonicSums`Private`ExpVar^10) + 357/(80*HarmonicSums`Private`ExpVar^9) - 441/(160*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^7) + 9/(16*HarmonicSums`Private`ExpVar^6) + 9/(40*HarmonicSums`Private`ExpVar^5) - 9/(40*HarmonicSums`Private`ExpVar^4) - 3/(20*HarmonicSums`Private`ExpVar^3) + 3/(10*HarmonicSums`Private`ExpVar^2))*z2^2 + (27*z2^3)/35 + ln2^2*((-3*li4half)/2 - (5*z2^2)/16) + sinf*((-1)^HarmonicSums`Private`ExpVar* (353615561/(127008000*HarmonicSums`Private`ExpVar^10) + 347209021/(49392000*HarmonicSums`Private`ExpVar^9) + 5438339/(14817600*HarmonicSums`Private`ExpVar^8) - 269881/(216000*HarmonicSums`Private`ExpVar^7) - 77153/(216000*HarmonicSums`Private`ExpVar^6) + 355/(864*HarmonicSums`Private`ExpVar^5) + 257/(432*HarmonicSums`Private`ExpVar^4) - 5/(4*HarmonicSums`Private`ExpVar^3) + HarmonicSums`Private`ExpVar^ (-2)) + (-1)^HarmonicSums`Private`ExpVar* (-93/(10*HarmonicSums`Private`ExpVar^10) + 51/(40*HarmonicSums`Private`ExpVar^8) - 3/(10*HarmonicSums`Private`ExpVar^6) + 3/(20*HarmonicSums`Private`ExpVar^4) - 3/(10*HarmonicSums`Private`ExpVar^2) + 3/(5*HarmonicSums`Private`ExpVar))*z2^2) - (7*ln2^3*z3)/48 + (131*z3^2)/128 + (-1)^HarmonicSums`Private`ExpVar* (93/(2*HarmonicSums`Private`ExpVar^10) - 51/(8*HarmonicSums`Private`ExpVar^8) + 3/(2*HarmonicSums`Private`ExpVar^6) - 3/(4*HarmonicSums`Private`ExpVar^4) + 3/(2*HarmonicSums`Private`ExpVar^2) - 3/HarmonicSums`Private`ExpVar)* z5 + ln2*(-6*li5half + (7*z2*z3)/16 + 6*z5), S[-1, 1, -1, -2, -1, HarmonicSums`Private`ExpVar] :> ln2^6/40 + (-1)^HarmonicSums`Private`ExpVar*li4half* (1185/(16*HarmonicSums`Private`ExpVar^10) + 119/(8*HarmonicSums`Private`ExpVar^9) - 147/(16*HarmonicSums`Private`ExpVar^8) - 5/(2*HarmonicSums`Private`ExpVar^7) + 15/(8*HarmonicSums`Private`ExpVar^6) + 3/(4*HarmonicSums`Private`ExpVar^5) - 3/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^3) + HarmonicSums`Private`ExpVar^ (-2)) + (-1)^HarmonicSums`Private`ExpVar*li5half* (217/(4*HarmonicSums`Private`ExpVar^10) - 119/(16*HarmonicSums`Private`ExpVar^8) + 7/(4*HarmonicSums`Private`ExpVar^6) - 7/(8*HarmonicSums`Private`ExpVar^4) + 7/(4*HarmonicSums`Private`ExpVar^2) - 7/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-31/(40*HarmonicSums`Private`ExpVar^10) + 17/(160*HarmonicSums`Private`ExpVar^8) - 1/(40*HarmonicSums`Private`ExpVar^6) + 1/(80*HarmonicSums`Private`ExpVar^4) - 1/(40*HarmonicSums`Private`ExpVar^2) + 1/(20*HarmonicSums`Private`ExpVar)) - 56257/(26880*HarmonicSums`Private`ExpVar^10) + 282847/(241920*HarmonicSums`Private`ExpVar^9) + 5089/(15360*HarmonicSums`Private`ExpVar^8) - 2431/(4480*HarmonicSums`Private`ExpVar^7) + 37/(128*HarmonicSums`Private`ExpVar^6) - 11/(120*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(128*HarmonicSums`Private`ExpVar^10) + 119/(192*HarmonicSums`Private`ExpVar^9) - 49/(128*HarmonicSums`Private`ExpVar^8) - 5/(48*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) - z2/4) - 2*li4half*z2 + (-1)^HarmonicSums`Private`ExpVar* (-1659/(64*HarmonicSums`Private`ExpVar^10) - 833/(160*HarmonicSums`Private`ExpVar^9) + 1029/(320*HarmonicSums`Private`ExpVar^8) + 7/(8*HarmonicSums`Private`ExpVar^7) - 21/(32*HarmonicSums`Private`ExpVar^6) - 21/(80*HarmonicSums`Private`ExpVar^5) + 21/(80*HarmonicSums`Private`ExpVar^4) + 7/(40*HarmonicSums`Private`ExpVar^3) - 7/(20*HarmonicSums`Private`ExpVar^2))*z2^2 + (191*z2^3)/280 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(48*HarmonicSums`Private`ExpVar^10) - 17/(192*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar))*z2 + (5*z3)/48) + (-2733/(2048*HarmonicSums`Private`ExpVar^10) - 915/(1024*HarmonicSums`Private`ExpVar^9) + 3205/(12288*HarmonicSums`Private`ExpVar^8) + 105/(512*HarmonicSums`Private`ExpVar^7) - 85/(768*HarmonicSums`Private`ExpVar^6) - 25/(256*HarmonicSums`Private`ExpVar^5) + 95/(512*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^3) + 5/(64*HarmonicSums`Private`ExpVar^2))*z3 - (5*z3^2)/64 + ln2^2*(2*li4half + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (51*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (-155/(64*HarmonicSums`Private`ExpVar^10) + 85/(256*HarmonicSums`Private`ExpVar^8) - 5/(64*HarmonicSums`Private`ExpVar^6) + 5/(128*HarmonicSums`Private`ExpVar^4) - 5/(64*HarmonicSums`Private`ExpVar^2) + 5/(32*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (217/(20*HarmonicSums`Private`ExpVar^10) - 119/(80*HarmonicSums`Private`ExpVar^8) + 7/(20*HarmonicSums`Private`ExpVar^6) - 7/(40*HarmonicSums`Private`ExpVar^4) + 7/(20*HarmonicSums`Private`ExpVar^2) - 7/(10*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (-155/(32*HarmonicSums`Private`ExpVar^10) + 85/(128*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^2) + 5/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(7*li5half + (-1)^HarmonicSums`Private`ExpVar* (222893/(43200*HarmonicSums`Private`ExpVar^10) - 285367/(352800*HarmonicSums`Private`ExpVar^9) - 155803/(188160*HarmonicSums`Private`ExpVar^8) + 1297/(14400*HarmonicSums`Private`ExpVar^7) + 13517/(28800*HarmonicSums`Private`ExpVar^6) - 257/(576*HarmonicSums`Private`ExpVar^5) + 65/(288*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (2821/(160*HarmonicSums`Private`ExpVar^10) - 1547/(640*HarmonicSums`Private`ExpVar^8) + 91/(160*HarmonicSums`Private`ExpVar^6) - 91/(320*HarmonicSums`Private`ExpVar^4) + 91/(160*HarmonicSums`Private`ExpVar^2) - 91/(80*HarmonicSums`Private`ExpVar))*z2^2 + z2*(8199/(2560*HarmonicSums`Private`ExpVar^10) + 549/(256*HarmonicSums`Private`ExpVar^9) - 641/(1024*HarmonicSums`Private`ExpVar^8) - 63/(128*HarmonicSums`Private`ExpVar^7) + 17/(64*HarmonicSums`Private`ExpVar^6) + 15/(64*HarmonicSums`Private`ExpVar^5) - 57/(128*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) - z3/8) + (-1)^HarmonicSums`Private`ExpVar* (5925/(512*HarmonicSums`Private`ExpVar^10) + 595/(256*HarmonicSums`Private`ExpVar^9) - 735/(512*HarmonicSums`Private`ExpVar^8) - 25/(64*HarmonicSums`Private`ExpVar^7) + 75/(256*HarmonicSums`Private`ExpVar^6) + 15/(128*HarmonicSums`Private`ExpVar^5) - 15/(128*HarmonicSums`Private`ExpVar^4) - 5/(64*HarmonicSums`Private`ExpVar^3) + 5/(32*HarmonicSums`Private`ExpVar^2))*z3 - (221*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-6851/(128*HarmonicSums`Private`ExpVar^10) + 3757/(512*HarmonicSums`Private`ExpVar^8) - 221/(128*HarmonicSums`Private`ExpVar^6) + 221/(256*HarmonicSums`Private`ExpVar^4) - 221/(128*HarmonicSums`Private`ExpVar^2) + 221/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, 1, -1, -2, 1, HarmonicSums`Private`ExpVar] :> 9*li6half + (3*ln2^6)/80 + (-1)^HarmonicSums`Private`ExpVar* (4198822967/(762048000*HarmonicSums`Private`ExpVar^10) + 312502837/(296352000*HarmonicSums`Private`ExpVar^9) - 159193897/(237081600*HarmonicSums`Private`ExpVar^8) - 37373/(144000*HarmonicSums`Private`ExpVar^7) + 348937/(1728000*HarmonicSums`Private`ExpVar^6) + 439/(6912*HarmonicSums`Private`ExpVar^5) - 7/(54*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(3555/(64*HarmonicSums`Private`ExpVar^10) + 357/(32*HarmonicSums`Private`ExpVar^9) - 441/(64*HarmonicSums`Private`ExpVar^8) - 15/(8*HarmonicSums`Private`ExpVar^7) + 45/(32*HarmonicSums`Private`ExpVar^6) + 9/(16*HarmonicSums`Private`ExpVar^5) - 9/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(93/(4*HarmonicSums`Private`ExpVar^10) - 51/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-31/(160*HarmonicSums`Private`ExpVar^10) + 17/(640*HarmonicSums`Private`ExpVar^8) - 1/(160*HarmonicSums`Private`ExpVar^6) + 1/(320*HarmonicSums`Private`ExpVar^4) - 1/(160*HarmonicSums`Private`ExpVar^2) + 1/(80*HarmonicSums`Private`ExpVar)) + (15*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (1185/(512*HarmonicSums`Private`ExpVar^10) + 119/(256*HarmonicSums`Private`ExpVar^9) - 147/(512*HarmonicSums`Private`ExpVar^8) - 5/(64*HarmonicSums`Private`ExpVar^7) + 15/(256*HarmonicSums`Private`ExpVar^6) + 3/(128*HarmonicSums`Private`ExpVar^5) - 3/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2)) - (3*z2)/16) - 2*li4half*z2 + (-1)^HarmonicSums`Private`ExpVar* (-2133/(512*HarmonicSums`Private`ExpVar^10) - 1071/(1280*HarmonicSums`Private`ExpVar^9) + 1323/(2560*HarmonicSums`Private`ExpVar^8) + 9/(64*HarmonicSums`Private`ExpVar^7) - 27/(256*HarmonicSums`Private`ExpVar^6) - 27/(640*HarmonicSums`Private`ExpVar^5) + 27/(640*HarmonicSums`Private`ExpVar^4) + 9/(320*HarmonicSums`Private`ExpVar^3) - 9/(160*HarmonicSums`Private`ExpVar^2))*z2^2 - (101*z2^3)/140 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 + (5*z3)/48) + (-2733/(2048*HarmonicSums`Private`ExpVar^10) - 915/(1024*HarmonicSums`Private`ExpVar^9) + 3205/(12288*HarmonicSums`Private`ExpVar^8) + 105/(512*HarmonicSums`Private`ExpVar^7) - 85/(768*HarmonicSums`Private`ExpVar^6) - 25/(256*HarmonicSums`Private`ExpVar^5) + 95/(512*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^3) + 5/(64*HarmonicSums`Private`ExpVar^2))*z3 - (95*z3^2)/64 + ln2^2*(2*li4half + (-1)^HarmonicSums`Private`ExpVar* (-3555/(256*HarmonicSums`Private`ExpVar^10) - 357/(128*HarmonicSums`Private`ExpVar^9) + 441/(256*HarmonicSums`Private`ExpVar^8) + 15/(32*HarmonicSums`Private`ExpVar^7) - 45/(128*HarmonicSums`Private`ExpVar^6) - 9/(64*HarmonicSums`Private`ExpVar^5) + 9/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2))*z2 + (39*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (-155/(64*HarmonicSums`Private`ExpVar^10) + 85/(256*HarmonicSums`Private`ExpVar^8) - 5/(64*HarmonicSums`Private`ExpVar^6) + 5/(128*HarmonicSums`Private`ExpVar^4) - 5/(64*HarmonicSums`Private`ExpVar^2) + 5/(32*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar* (-222893/(43200*HarmonicSums`Private`ExpVar^10) + 285367/(352800*HarmonicSums`Private`ExpVar^9) + 155803/(188160*HarmonicSums`Private`ExpVar^8) - 1297/(14400*HarmonicSums`Private`ExpVar^7) - 13517/(28800*HarmonicSums`Private`ExpVar^6) + 257/(576*HarmonicSums`Private`ExpVar^5) - 65/(288*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^2*(93/(16*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^8) + 3/(16*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (279/(160*HarmonicSums`Private`ExpVar^10) - 153/(640*HarmonicSums`Private`ExpVar^8) + 9/(160*HarmonicSums`Private`ExpVar^6) - 9/(320*HarmonicSums`Private`ExpVar^4) + 9/(160*HarmonicSums`Private`ExpVar^2) - 9/(80*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (-155/(32*HarmonicSums`Private`ExpVar^10) + 85/(128*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^2) + 5/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(7*li5half + (-1)^HarmonicSums`Private`ExpVar* (-1209/(160*HarmonicSums`Private`ExpVar^10) + 663/(640*HarmonicSums`Private`ExpVar^8) - 39/(160*HarmonicSums`Private`ExpVar^6) + 39/(320*HarmonicSums`Private`ExpVar^4) - 39/(160*HarmonicSums`Private`ExpVar^2) + 39/(80*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (5925/(512*HarmonicSums`Private`ExpVar^10) + 595/(256*HarmonicSums`Private`ExpVar^9) - 735/(512*HarmonicSums`Private`ExpVar^8) - 25/(64*HarmonicSums`Private`ExpVar^7) + 75/(256*HarmonicSums`Private`ExpVar^6) + 15/(128*HarmonicSums`Private`ExpVar^5) - 15/(128*HarmonicSums`Private`ExpVar^4) - 5/(64*HarmonicSums`Private`ExpVar^3) + 5/(32*HarmonicSums`Private`ExpVar^2))*z3 - (5*z2*z3)/16 - (221*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (713/(256*HarmonicSums`Private`ExpVar^10) - 391/(1024*HarmonicSums`Private`ExpVar^8) + 23/(256*HarmonicSums`Private`ExpVar^6) - 23/(512*HarmonicSums`Private`ExpVar^4) + 23/(256*HarmonicSums`Private`ExpVar^2) - 23/(128*HarmonicSums`Private`ExpVar))*z5, S[-1, 1, -1, 2, -1, HarmonicSums`Private`ExpVar] :> 6*li6half - ln2^6/24 + (-1)^HarmonicSums`Private`ExpVar* (-4000939/(4147200*HarmonicSums`Private`ExpVar^10) + 3218849/(3763200*HarmonicSums`Private`ExpVar^9) + 136867/(564480*HarmonicSums`Private`ExpVar^8) - 12697/(28800*HarmonicSums`Private`ExpVar^7) + 3527/(14400*HarmonicSums`Private`ExpVar^6) - 23/(288*HarmonicSums`Private`ExpVar^5) + 1/(72*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-1185/(16*HarmonicSums`Private`ExpVar^10) - 119/(8*HarmonicSums`Private`ExpVar^9) + 147/(16*HarmonicSums`Private`ExpVar^8) + 5/(2*HarmonicSums`Private`ExpVar^7) - 15/(8*HarmonicSums`Private`ExpVar^6) - 3/(4*HarmonicSums`Private`ExpVar^5) + 3/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^3) - HarmonicSums`Private`ExpVar^ (-2)) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (31/(80*HarmonicSums`Private`ExpVar^10) - 17/(320*HarmonicSums`Private`ExpVar^8) + 1/(80*HarmonicSums`Private`ExpVar^6) - 1/(160*HarmonicSums`Private`ExpVar^4) + 1/(80*HarmonicSums`Private`ExpVar^2) - 1/(40*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-93/(2*HarmonicSums`Private`ExpVar^10) + 51/(8*HarmonicSums`Private`ExpVar^8) - 3/(2*HarmonicSums`Private`ExpVar^6) + 3/(4*HarmonicSums`Private`ExpVar^4) - 3/(2*HarmonicSums`Private`ExpVar^2) + 3/HarmonicSums`Private`ExpVar) + 6*s6 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-395/(128*HarmonicSums`Private`ExpVar^10) - 119/(192*HarmonicSums`Private`ExpVar^9) + 49/(128*HarmonicSums`Private`ExpVar^8) + 5/(48*HarmonicSums`Private`ExpVar^7) - 5/(64*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) + (3*z2)/8) + (-1)^HarmonicSums`Private`ExpVar* (5925/(256*HarmonicSums`Private`ExpVar^10) + 595/(128*HarmonicSums`Private`ExpVar^9) - 735/(256*HarmonicSums`Private`ExpVar^8) - 25/(32*HarmonicSums`Private`ExpVar^7) + 75/(128*HarmonicSums`Private`ExpVar^6) + 15/(64*HarmonicSums`Private`ExpVar^5) - 15/(64*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^3) + 5/(16*HarmonicSums`Private`ExpVar^2))*z2^2 - (27*z2^3)/40 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 - (23*z3)/48) + (2733/(5120*HarmonicSums`Private`ExpVar^10) + 183/(512*HarmonicSums`Private`ExpVar^9) - 641/(6144*HarmonicSums`Private`ExpVar^8) - 21/(256*HarmonicSums`Private`ExpVar^7) + 17/(384*HarmonicSums`Private`ExpVar^6) + 5/(128*HarmonicSums`Private`ExpVar^5) - 19/(256*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2))*z3 - (163*z3^2)/64 + sinf*((-1)^HarmonicSums`Private`ExpVar*li4half* (31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^2*(31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-155/(16*HarmonicSums`Private`ExpVar^10) + 85/(64*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^4) - 5/(16*HarmonicSums`Private`ExpVar^2) + 5/(8*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(-2*li4half + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (27*z2^2)/20 + (-1)^HarmonicSums`Private`ExpVar* (-589/(64*HarmonicSums`Private`ExpVar^10) + 323/(256*HarmonicSums`Private`ExpVar^8) - 19/(64*HarmonicSums`Private`ExpVar^6) + 19/(128*HarmonicSums`Private`ExpVar^4) - 19/(64*HarmonicSums`Private`ExpVar^2) + 19/(32*HarmonicSums`Private`ExpVar))*z3) + z2*(2*li4half + (-1)^HarmonicSums`Private`ExpVar* (-651/(64*HarmonicSums`Private`ExpVar^10) + 357/(256*HarmonicSums`Private`ExpVar^8) - 21/(64*HarmonicSums`Private`ExpVar^6) + 21/(128*HarmonicSums`Private`ExpVar^4) - 21/(64*HarmonicSums`Private`ExpVar^2) + 21/(32*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (1891/(32*HarmonicSums`Private`ExpVar^10) - 1037/(128*HarmonicSums`Private`ExpVar^8) + 61/(32*HarmonicSums`Private`ExpVar^6) - 61/(64*HarmonicSums`Private`ExpVar^4) + 61/(32*HarmonicSums`Private`ExpVar^2) - 61/(16*HarmonicSums`Private`ExpVar))*z5 + ln2*(-4*li5half + 245993/(26880*HarmonicSums`Private`ExpVar^10) + 47149/(120960*HarmonicSums`Private`ExpVar^9) - 4333/(2560*HarmonicSums`Private`ExpVar^8) + 313/(6720*HarmonicSums`Private`ExpVar^7) + 49/(64*HarmonicSums`Private`ExpVar^6) - 157/(240*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (-651/(80*HarmonicSums`Private`ExpVar^10) + 357/(320*HarmonicSums`Private`ExpVar^8) - 21/(80*HarmonicSums`Private`ExpVar^6) + 21/(160*HarmonicSums`Private`ExpVar^4) - 21/(80*HarmonicSums`Private`ExpVar^2) + 21/(40*HarmonicSums`Private`ExpVar))*z2^2 + z2*(-8199/(2560*HarmonicSums`Private`ExpVar^10) - 549/(256*HarmonicSums`Private`ExpVar^9) + 641/(1024*HarmonicSums`Private`ExpVar^8) + 63/(128*HarmonicSums`Private`ExpVar^7) - 17/(64*HarmonicSums`Private`ExpVar^6) - 15/(64*HarmonicSums`Private`ExpVar^5) + 57/(128*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - (11*z3)/8) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z3 + (85*z5)/64), S[-1, 1, -1, 2, 1, HarmonicSums`Private`ExpVar] :> -li6half - (37*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar*li4half* (-1185/(64*HarmonicSums`Private`ExpVar^10) - 119/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-341/(480*HarmonicSums`Private`ExpVar^10) + 187/(1920*HarmonicSums`Private`ExpVar^8) - 11/(480*HarmonicSums`Private`ExpVar^6) + 11/(960*HarmonicSums`Private`ExpVar^4) - 11/(480*HarmonicSums`Private`ExpVar^2) + 11/(240*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) + 226353529/(67737600*HarmonicSums`Private`ExpVar^10) + 546654509/(304819200*HarmonicSums`Private`ExpVar^9) - 1759073/(6451200*HarmonicSums`Private`ExpVar^8) - 236213/(705600*HarmonicSums`Private`ExpVar^7) - 227/(2880*HarmonicSums`Private`ExpVar^6) + 2587/(7200*HarmonicSums`Private`ExpVar^5) - 7/(24*HarmonicSums`Private`ExpVar^4) + 1/(9*HarmonicSums`Private`ExpVar^3) + s6/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-395/(512*HarmonicSums`Private`ExpVar^10) - 119/(768*HarmonicSums`Private`ExpVar^9) + 49/(512*HarmonicSums`Private`ExpVar^8) + 5/(192*HarmonicSums`Private`ExpVar^7) - 5/(256*HarmonicSums`Private`ExpVar^6) - 1/(128*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) + 1/(192*HarmonicSums`Private`ExpVar^3) - 1/(96*HarmonicSums`Private`ExpVar^2)) + (7*z2)/48) + (-1)^HarmonicSums`Private`ExpVar* (-237/(512*HarmonicSums`Private`ExpVar^10) - 119/(1280*HarmonicSums`Private`ExpVar^9) + 147/(2560*HarmonicSums`Private`ExpVar^8) + 1/(64*HarmonicSums`Private`ExpVar^7) - 3/(256*HarmonicSums`Private`ExpVar^6) - 3/(640*HarmonicSums`Private`ExpVar^5) + 3/(640*HarmonicSums`Private`ExpVar^4) + 1/(320*HarmonicSums`Private`ExpVar^3) - 1/(160*HarmonicSums`Private`ExpVar^2))*z2^2 + (61*z2^3)/280 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (155/(48*HarmonicSums`Private`ExpVar^10) - 85/(192*HarmonicSums`Private`ExpVar^8) + 5/(48*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^2) - 5/(24*HarmonicSums`Private`ExpVar))*z2 - (23*z3)/48) + (2733/(640*HarmonicSums`Private`ExpVar^10) + 183/(64*HarmonicSums`Private`ExpVar^9) - 641/(768*HarmonicSums`Private`ExpVar^8) - 21/(32*HarmonicSums`Private`ExpVar^7) + 17/(48*HarmonicSums`Private`ExpVar^6) + 5/(16*HarmonicSums`Private`ExpVar^5) - 19/(32*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z3 + (75*z3^2)/32 + z2*(-li4half + (-1)^HarmonicSums`Private`ExpVar* (651/(64*HarmonicSums`Private`ExpVar^10) - 357/(256*HarmonicSums`Private`ExpVar^8) + 21/(64*HarmonicSums`Private`ExpVar^6) - 21/(128*HarmonicSums`Private`ExpVar^4) + 21/(64*HarmonicSums`Private`ExpVar^2) - 21/(32*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar*li4half* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(31/(96*HarmonicSums`Private`ExpVar^10) - 17/(384*HarmonicSums`Private`ExpVar^8) + 1/(96*HarmonicSums`Private`ExpVar^6) - 1/(192*HarmonicSums`Private`ExpVar^4) + 1/(96*HarmonicSums`Private`ExpVar^2) - 1/(48*HarmonicSums`Private`ExpVar)) - 245993/(26880*HarmonicSums`Private`ExpVar^10) - 47149/(120960*HarmonicSums`Private`ExpVar^9) + 4333/(2560*HarmonicSums`Private`ExpVar^8) - 313/(6720*HarmonicSums`Private`ExpVar^7) - 49/(64*HarmonicSums`Private`ExpVar^6) + 157/(240*HarmonicSums`Private`ExpVar^5) - 5/(16*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* ln2^2*(-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (31/(160*HarmonicSums`Private`ExpVar^10) - 17/(640*HarmonicSums`Private`ExpVar^8) + 1/(160*HarmonicSums`Private`ExpVar^6) - 1/(320*HarmonicSums`Private`ExpVar^4) + 1/(160*HarmonicSums`Private`ExpVar^2) - 1/(80*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(-2*li4half + (-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (11*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (-589/(64*HarmonicSums`Private`ExpVar^10) + 323/(256*HarmonicSums`Private`ExpVar^8) - 19/(64*HarmonicSums`Private`ExpVar^6) + 19/(128*HarmonicSums`Private`ExpVar^4) - 19/(64*HarmonicSums`Private`ExpVar^2) + 19/(32*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (2635/(256*HarmonicSums`Private`ExpVar^10) - 1445/(1024*HarmonicSums`Private`ExpVar^8) + 85/(256*HarmonicSums`Private`ExpVar^6) - 85/(512*HarmonicSums`Private`ExpVar^4) + 85/(256*HarmonicSums`Private`ExpVar^2) - 85/(128*HarmonicSums`Private`ExpVar))*z5 + ln2*(-4*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(80*HarmonicSums`Private`ExpVar^10) + 17/(320*HarmonicSums`Private`ExpVar^8) - 1/(80*HarmonicSums`Private`ExpVar^6) + 1/(160*HarmonicSums`Private`ExpVar^4) - 1/(80*HarmonicSums`Private`ExpVar^2) + 1/(40*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z3 - (19*z2*z3)/16 + (85*z5)/64), S[-1, 1, -1, -1, -2, HarmonicSums`Private`ExpVar] :> 9*li6half + ln2^6/30 + (-1)^HarmonicSums`Private`ExpVar*li5half* (155/(4*HarmonicSums`Private`ExpVar^10) - 85/(16*HarmonicSums`Private`ExpVar^8) + 5/(4*HarmonicSums`Private`ExpVar^6) - 5/(8*HarmonicSums`Private`ExpVar^4) + 5/(4*HarmonicSums`Private`ExpVar^2) - 5/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(48*HarmonicSums`Private`ExpVar^10) - 17/(192*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar)) - 61179/(17920*HarmonicSums`Private`ExpVar^10) + 148849/(120960*HarmonicSums`Private`ExpVar^9) + 263/(480*HarmonicSums`Private`ExpVar^8) - 2949/(4480*HarmonicSums`Private`ExpVar^7) + 41/(128*HarmonicSums`Private`ExpVar^6) - 23/(240*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) + (29*s6)/4 - (ln2^4*z2)/6 + (-1)^HarmonicSums`Private`ExpVar* (-711/(64*HarmonicSums`Private`ExpVar^10) - 357/(160*HarmonicSums`Private`ExpVar^9) + 441/(320*HarmonicSums`Private`ExpVar^8) + 3/(8*HarmonicSums`Private`ExpVar^7) - 9/(32*HarmonicSums`Private`ExpVar^6) - 9/(80*HarmonicSums`Private`ExpVar^5) + 9/(80*HarmonicSums`Private`ExpVar^4) + 3/(40*HarmonicSums`Private`ExpVar^3) - 3/(20*HarmonicSums`Private`ExpVar^2))*z2^2 - (187*z2^3)/560 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar))*z2 + z3/6) + (35529/(10240*HarmonicSums`Private`ExpVar^10) + 2379/(1024*HarmonicSums`Private`ExpVar^9) - 8333/(12288*HarmonicSums`Private`ExpVar^8) - 273/(512*HarmonicSums`Private`ExpVar^7) + 221/(768*HarmonicSums`Private`ExpVar^6) + 65/(256*HarmonicSums`Private`ExpVar^5) - 247/(512*HarmonicSums`Private`ExpVar^4) + 13/(32*HarmonicSums`Private`ExpVar^3) - 13/(64*HarmonicSums`Private`ExpVar^2))*z3 - (35*z3^2)/64 + z2*((-3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (956779/(204800*HarmonicSums`Private`ExpVar^10) + 523391/(15052800*HarmonicSums`Private`ExpVar^9) - 2838859/(4515840*HarmonicSums`Private`ExpVar^8) - 3073/(115200*HarmonicSums`Private`ExpVar^7) + 30347/(230400*HarmonicSums`Private`ExpVar^6) + 445/(4608*HarmonicSums`Private`ExpVar^5) - 287/(1152*HarmonicSums`Private`ExpVar^4) + 15/(64*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (217/(32*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^6) - 7/(64*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3) + ln2^2*((3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (11*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (93/(20*HarmonicSums`Private`ExpVar^10) - 51/(80*HarmonicSums`Private`ExpVar^8) + 3/(20*HarmonicSums`Private`ExpVar^6) - 3/(40*HarmonicSums`Private`ExpVar^4) + 3/(20*HarmonicSums`Private`ExpVar^2) - 3/(10*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z3) + ln2*(5*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (93/(4*HarmonicSums`Private`ExpVar^10) - 51/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (1829/(160*HarmonicSums`Private`ExpVar^10) - 1003/(640*HarmonicSums`Private`ExpVar^8) + 59/(160*HarmonicSums`Private`ExpVar^6) - 59/(320*HarmonicSums`Private`ExpVar^4) + 59/(160*HarmonicSums`Private`ExpVar^2) - 59/(80*HarmonicSums`Private`ExpVar))*z2^2 + z2*(-2733/(1280*HarmonicSums`Private`ExpVar^10) - 183/(128*HarmonicSums`Private`ExpVar^9) + 641/(1536*HarmonicSums`Private`ExpVar^8) + 21/(64*HarmonicSums`Private`ExpVar^7) - 17/(96*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) + 19/(64*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - (13*z3)/4) + (-1)^HarmonicSums`Private`ExpVar* (1185/(64*HarmonicSums`Private`ExpVar^10) + 119/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z3 - (247*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-7657/(128*HarmonicSums`Private`ExpVar^10) + 4199/(512*HarmonicSums`Private`ExpVar^8) - 247/(128*HarmonicSums`Private`ExpVar^6) + 247/(256*HarmonicSums`Private`ExpVar^4) - 247/(128*HarmonicSums`Private`ExpVar^2) + 247/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, 1, -1, -1, 2, HarmonicSums`Private`ExpVar] :> 6*li6half + (7*ln2^6)/240 + (-1)^HarmonicSums`Private`ExpVar* (21970699/(4838400*HarmonicSums`Private`ExpVar^10) + 526811/(16934400*HarmonicSums`Private`ExpVar^9) - 4400267/(6773760*HarmonicSums`Private`ExpVar^8) - 54589/(172800*HarmonicSums`Private`ExpVar^7) + 27059/(38400*HarmonicSums`Private`ExpVar^6) - 403/(768*HarmonicSums`Private`ExpVar^5) + 23/(96*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(3555/(64*HarmonicSums`Private`ExpVar^10) + 357/(32*HarmonicSums`Private`ExpVar^9) - 441/(64*HarmonicSums`Private`ExpVar^8) - 15/(8*HarmonicSums`Private`ExpVar^7) + 45/(32*HarmonicSums`Private`ExpVar^6) + 9/(16*HarmonicSums`Private`ExpVar^5) - 9/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(93/(2*HarmonicSums`Private`ExpVar^10) - 51/(8*HarmonicSums`Private`ExpVar^8) + 3/(2*HarmonicSums`Private`ExpVar^6) - 3/(4*HarmonicSums`Private`ExpVar^4) + 3/(2*HarmonicSums`Private`ExpVar^2) - 3/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-31/(80*HarmonicSums`Private`ExpVar^10) + 17/(320*HarmonicSums`Private`ExpVar^8) - 1/(80*HarmonicSums`Private`ExpVar^6) + 1/(160*HarmonicSums`Private`ExpVar^4) - 1/(80*HarmonicSums`Private`ExpVar^2) + 1/(40*HarmonicSums`Private`ExpVar)) + (17*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (1185/(512*HarmonicSums`Private`ExpVar^10) + 119/(256*HarmonicSums`Private`ExpVar^9) - 147/(512*HarmonicSums`Private`ExpVar^8) - 5/(64*HarmonicSums`Private`ExpVar^7) + 15/(256*HarmonicSums`Private`ExpVar^6) + 3/(128*HarmonicSums`Private`ExpVar^5) - 3/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2)) - (5*z2)/48) + (-1)^HarmonicSums`Private`ExpVar* (-3555/(512*HarmonicSums`Private`ExpVar^10) - 357/(256*HarmonicSums`Private`ExpVar^9) + 441/(512*HarmonicSums`Private`ExpVar^8) + 15/(64*HarmonicSums`Private`ExpVar^7) - 45/(256*HarmonicSums`Private`ExpVar^6) - 9/(128*HarmonicSums`Private`ExpVar^5) + 9/(128*HarmonicSums`Private`ExpVar^4) + 3/(64*HarmonicSums`Private`ExpVar^3) - 3/(32*HarmonicSums`Private`ExpVar^2))*z2^2 - (157*z2^3)/560 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar))*z2 + z3/6) + (-2733/(1280*HarmonicSums`Private`ExpVar^10) - 183/(128*HarmonicSums`Private`ExpVar^9) + 641/(1536*HarmonicSums`Private`ExpVar^8) + 21/(64*HarmonicSums`Private`ExpVar^7) - 17/(96*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) + 19/(64*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z3 - (97*z3^2)/32 + ln2^2*((3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 - z2^2/40 + (-1)^HarmonicSums`Private`ExpVar* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^2*(31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (93/(32*HarmonicSums`Private`ExpVar^10) - 51/(128*HarmonicSums`Private`ExpVar^8) + 3/(32*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^2) - 3/(16*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z3) + z2*((-1)^HarmonicSums`Private`ExpVar* (-956779/(102400*HarmonicSums`Private`ExpVar^10) - 523391/(7526400*HarmonicSums`Private`ExpVar^9) + 2838859/(2257920*HarmonicSums`Private`ExpVar^8) + 3073/(57600*HarmonicSums`Private`ExpVar^7) - 30347/(115200*HarmonicSums`Private`ExpVar^6) - 445/(2304*HarmonicSums`Private`ExpVar^5) + 287/(576*HarmonicSums`Private`ExpVar^4) - 15/(32*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-217/(16*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^6) + 7/(32*HarmonicSums`Private`ExpVar^4) - 7/(16*HarmonicSums`Private`ExpVar^2) + 7/(8*HarmonicSums`Private`ExpVar))*z3) + ln2*(5*li5half + (-1)^HarmonicSums`Private`ExpVar* (1147/(160*HarmonicSums`Private`ExpVar^10) - 629/(640*HarmonicSums`Private`ExpVar^8) + 37/(160*HarmonicSums`Private`ExpVar^6) - 37/(320*HarmonicSums`Private`ExpVar^4) + 37/(160*HarmonicSums`Private`ExpVar^2) - 37/(80*HarmonicSums`Private`ExpVar))*z2^2 + z2*(2733/(2560*HarmonicSums`Private`ExpVar^10) + 183/(256*HarmonicSums`Private`ExpVar^9) - 641/(3072*HarmonicSums`Private`ExpVar^8) - 21/(128*HarmonicSums`Private`ExpVar^7) + 17/(192*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) - 19/(128*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (7*z3)/8) + (-1)^HarmonicSums`Private`ExpVar* (1185/(64*HarmonicSums`Private`ExpVar^10) + 119/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z3 - (247*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-899/(256*HarmonicSums`Private`ExpVar^10) + 493/(1024*HarmonicSums`Private`ExpVar^8) - 29/(256*HarmonicSums`Private`ExpVar^6) + 29/(512*HarmonicSums`Private`ExpVar^4) - 29/(256*HarmonicSums`Private`ExpVar^2) + 29/(128*HarmonicSums`Private`ExpVar))*z5, S[-1, 1, -1, 1, -2, HarmonicSums`Private`ExpVar] :> 5*li6half + (11*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar* (-4333049/(2073600*HarmonicSums`Private`ExpVar^10) + 5313977/(5644800*HarmonicSums`Private`ExpVar^9) + 963551/(2257920*HarmonicSums`Private`ExpVar^8) - 3487/(6400*HarmonicSums`Private`ExpVar^7) + 31537/(115200*HarmonicSums`Private`ExpVar^6) - 193/(2304*HarmonicSums`Private`ExpVar^5) + 1/(72*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(1185/(32*HarmonicSums`Private`ExpVar^10) + 119/(16*HarmonicSums`Private`ExpVar^9) - 147/(32*HarmonicSums`Private`ExpVar^8) - 5/(4*HarmonicSums`Private`ExpVar^7) + 15/(16*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(155/(4*HarmonicSums`Private`ExpVar^10) - 85/(16*HarmonicSums`Private`ExpVar^8) + 5/(4*HarmonicSums`Private`ExpVar^6) - 5/(8*HarmonicSums`Private`ExpVar^4) + 5/(4*HarmonicSums`Private`ExpVar^2) - 5/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-31/(96*HarmonicSums`Private`ExpVar^10) + 17/(384*HarmonicSums`Private`ExpVar^8) - 1/(96*HarmonicSums`Private`ExpVar^6) + 1/(192*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar)) + (5*s6)/2 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(256*HarmonicSums`Private`ExpVar^10) + 119/(384*HarmonicSums`Private`ExpVar^9) - 49/(256*HarmonicSums`Private`ExpVar^8) - 5/(96*HarmonicSums`Private`ExpVar^7) + 5/(128*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2)) - z2/12) + (-1)^HarmonicSums`Private`ExpVar* (-237/(64*HarmonicSums`Private`ExpVar^10) - 119/(160*HarmonicSums`Private`ExpVar^9) + 147/(320*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^7) - 3/(32*HarmonicSums`Private`ExpVar^6) - 3/(80*HarmonicSums`Private`ExpVar^5) + 3/(80*HarmonicSums`Private`ExpVar^4) + 1/(40*HarmonicSums`Private`ExpVar^3) - 1/(20*HarmonicSums`Private`ExpVar^2))*z2^2 - (139*z2^3)/280 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(48*HarmonicSums`Private`ExpVar^10) - 17/(192*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar))*z2 + z3/48) + (-2733/(10240*HarmonicSums`Private`ExpVar^10) - 183/(1024*HarmonicSums`Private`ExpVar^9) + 641/(12288*HarmonicSums`Private`ExpVar^8) + 21/(512*HarmonicSums`Private`ExpVar^7) - 17/(768*HarmonicSums`Private`ExpVar^6) - 5/(256*HarmonicSums`Private`ExpVar^5) + 19/(512*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3) + 1/(64*HarmonicSums`Private`ExpVar^2))*z3 - (129*z3^2)/128 + ln2^2*(li4half + (9*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (-31/(64*HarmonicSums`Private`ExpVar^10) + 17/(256*HarmonicSums`Private`ExpVar^8) - 1/(64*HarmonicSums`Private`ExpVar^6) + 1/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^2) + 1/(32*HarmonicSums`Private`ExpVar))*z3) + z2*(-li4half + 32639/(307200*HarmonicSums`Private`ExpVar^10) + 31061/(18432*HarmonicSums`Private`ExpVar^9) - 3685/(73728*HarmonicSums`Private`ExpVar^8) - 11/(32*HarmonicSums`Private`ExpVar^7) + 193/(4608*HarmonicSums`Private`ExpVar^6) + 107/(768*HarmonicSums`Private`ExpVar^5) - 53/(512*HarmonicSums`Private`ExpVar^4) + 1/(96*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(48*HarmonicSums`Private`ExpVar^10) + 17/(192*HarmonicSums`Private`ExpVar^8) - 1/(48*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-31/(2*HarmonicSums`Private`ExpVar^10) + 17/(8*HarmonicSums`Private`ExpVar^8) - 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^4) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) + (-2733/(2560*HarmonicSums`Private`ExpVar^10) - 183/(256*HarmonicSums`Private`ExpVar^9) + 641/(3072*HarmonicSums`Private`ExpVar^8) + 21/(128*HarmonicSums`Private`ExpVar^7) - 17/(192*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) + 19/(128*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (31/(20*HarmonicSums`Private`ExpVar^10) - 17/(80*HarmonicSums`Private`ExpVar^8) + 1/(20*HarmonicSums`Private`ExpVar^6) - 1/(40*HarmonicSums`Private`ExpVar^4) + 1/(20*HarmonicSums`Private`ExpVar^2) - 1/(10*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(4*li5half + (-1)^HarmonicSums`Private`ExpVar* (93/(16*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^8) + 3/(16*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (1185/(512*HarmonicSums`Private`ExpVar^10) + 119/(256*HarmonicSums`Private`ExpVar^9) - 147/(512*HarmonicSums`Private`ExpVar^8) - 5/(64*HarmonicSums`Private`ExpVar^7) + 15/(256*HarmonicSums`Private`ExpVar^6) + 3/(128*HarmonicSums`Private`ExpVar^5) - 3/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2))*z3 - (277*z5)/64) + (-1)^HarmonicSums`Private`ExpVar* (-3813/(128*HarmonicSums`Private`ExpVar^10) + 2091/(512*HarmonicSums`Private`ExpVar^8) - 123/(128*HarmonicSums`Private`ExpVar^6) + 123/(256*HarmonicSums`Private`ExpVar^4) - 123/(128*HarmonicSums`Private`ExpVar^2) + 123/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, 1, -1, 1, 2, HarmonicSums`Private`ExpVar] :> 8*li6half + (7*ln2^6)/360 + (-1)^HarmonicSums`Private`ExpVar*li4half* (-1185/(64*HarmonicSums`Private`ExpVar^10) - 119/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (341/(480*HarmonicSums`Private`ExpVar^10) - 187/(1920*HarmonicSums`Private`ExpVar^8) + 11/(480*HarmonicSums`Private`ExpVar^6) - 11/(960*HarmonicSums`Private`ExpVar^4) + 11/(480*HarmonicSums`Private`ExpVar^2) - 11/(240*HarmonicSums`Private`ExpVar)) + 1686065/(225792*HarmonicSums`Private`ExpVar^10) + 1232387/(793800*HarmonicSums`Private`ExpVar^9) - 18383/(12800*HarmonicSums`Private`ExpVar^8) - 10243/(22400*HarmonicSums`Private`ExpVar^7) + 401/(384*HarmonicSums`Private`ExpVar^6) - 67/(90*HarmonicSums`Private`ExpVar^5) + 21/(64*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + (11*s6)/2 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-395/(512*HarmonicSums`Private`ExpVar^10) - 119/(768*HarmonicSums`Private`ExpVar^9) + 49/(512*HarmonicSums`Private`ExpVar^8) + 5/(192*HarmonicSums`Private`ExpVar^7) - 5/(256*HarmonicSums`Private`ExpVar^6) - 1/(128*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) + 1/(192*HarmonicSums`Private`ExpVar^3) - 1/(96*HarmonicSums`Private`ExpVar^2)) + z2/24) + (-1)^HarmonicSums`Private`ExpVar* (-237/(256*HarmonicSums`Private`ExpVar^10) - 119/(640*HarmonicSums`Private`ExpVar^9) + 147/(1280*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^7) - 3/(128*HarmonicSums`Private`ExpVar^6) - 3/(320*HarmonicSums`Private`ExpVar^5) + 3/(320*HarmonicSums`Private`ExpVar^4) + 1/(160*HarmonicSums`Private`ExpVar^3) - 1/(80*HarmonicSums`Private`ExpVar^2))*z2^2 - (23*z2^3)/20 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 + z3/48) + (-2733/(1280*HarmonicSums`Private`ExpVar^10) - 183/(128*HarmonicSums`Private`ExpVar^9) + 641/(1536*HarmonicSums`Private`ExpVar^8) + 21/(64*HarmonicSums`Private`ExpVar^7) - 17/(96*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) + 19/(64*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z3 - (63*z3^2)/32 + z2*(2*li4half - 32639/(153600*HarmonicSums`Private`ExpVar^10) - 31061/(9216*HarmonicSums`Private`ExpVar^9) + 3685/(36864*HarmonicSums`Private`ExpVar^8) + 11/(16*HarmonicSums`Private`ExpVar^7) - 193/(2304*HarmonicSums`Private`ExpVar^6) - 107/(384*HarmonicSums`Private`ExpVar^5) + 53/(256*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (31/(64*HarmonicSums`Private`ExpVar^10) - 17/(256*HarmonicSums`Private`ExpVar^8) + 1/(64*HarmonicSums`Private`ExpVar^6) - 1/(128*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^2) - 1/(32*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(li4half - (3*z2^2)/5 + (-1)^HarmonicSums`Private`ExpVar* (-31/(64*HarmonicSums`Private`ExpVar^10) + 17/(256*HarmonicSums`Private`ExpVar^8) - 1/(64*HarmonicSums`Private`ExpVar^6) + 1/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^2) + 1/(32*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar*li4half* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(31/(96*HarmonicSums`Private`ExpVar^10) - 17/(384*HarmonicSums`Private`ExpVar^8) + 1/(96*HarmonicSums`Private`ExpVar^6) - 1/(192*HarmonicSums`Private`ExpVar^4) + 1/(96*HarmonicSums`Private`ExpVar^2) - 1/(48*HarmonicSums`Private`ExpVar)) + (2733/(1280*HarmonicSums`Private`ExpVar^10) + 183/(128*HarmonicSums`Private`ExpVar^9) - 641/(1536*HarmonicSums`Private`ExpVar^8) - 21/(64*HarmonicSums`Private`ExpVar^7) + 17/(96*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) - 19/(64*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (31/(80*HarmonicSums`Private`ExpVar^10) - 17/(320*HarmonicSums`Private`ExpVar^8) + 1/(80*HarmonicSums`Private`ExpVar^6) - 1/(160*HarmonicSums`Private`ExpVar^4) + 1/(80*HarmonicSums`Private`ExpVar^2) - 1/(40*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(4*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (93/(4*HarmonicSums`Private`ExpVar^10) - 51/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (1147/(160*HarmonicSums`Private`ExpVar^10) - 629/(640*HarmonicSums`Private`ExpVar^8) + 37/(160*HarmonicSums`Private`ExpVar^6) - 37/(320*HarmonicSums`Private`ExpVar^4) + 37/(160*HarmonicSums`Private`ExpVar^2) - 37/(80*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (1185/(512*HarmonicSums`Private`ExpVar^10) + 119/(256*HarmonicSums`Private`ExpVar^9) - 147/(512*HarmonicSums`Private`ExpVar^8) - 5/(64*HarmonicSums`Private`ExpVar^7) + 15/(256*HarmonicSums`Private`ExpVar^6) + 3/(128*HarmonicSums`Private`ExpVar^5) - 3/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2))*z3 - (3*z2*z3)/16 - (277*z5)/64) + (-1)^HarmonicSums`Private`ExpVar* (-8587/(256*HarmonicSums`Private`ExpVar^10) + 4709/(1024*HarmonicSums`Private`ExpVar^8) - 277/(256*HarmonicSums`Private`ExpVar^6) + 277/(512*HarmonicSums`Private`ExpVar^4) - 277/(256*HarmonicSums`Private`ExpVar^2) + 277/(128*HarmonicSums`Private`ExpVar))*z5, S[-1, 1, 1, -2, -1, HarmonicSums`Private`ExpVar] :> 11*li6half + ln2^6/36 + (-1)^HarmonicSums`Private`ExpVar* (744907777/(435456000*HarmonicSums`Private`ExpVar^10) - 305446121/(1185408000*HarmonicSums`Private`ExpVar^9) - 957209/(6585600*HarmonicSums`Private`ExpVar^8) - 79297/(432000*HarmonicSums`Private`ExpVar^7) + 72727/(216000*HarmonicSums`Private`ExpVar^6) - 109/(432*HarmonicSums`Private`ExpVar^5) + 203/(1728*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(1185/(64*HarmonicSums`Private`ExpVar^10) + 119/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(480*HarmonicSums`Private`ExpVar^10) - 17/(1920*HarmonicSums`Private`ExpVar^8) + 1/(480*HarmonicSums`Private`ExpVar^6) - 1/(960*HarmonicSums`Private`ExpVar^4) + 1/(480*HarmonicSums`Private`ExpVar^2) - 1/(240*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + (13*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(512*HarmonicSums`Private`ExpVar^10) + 119/(768*HarmonicSums`Private`ExpVar^9) - 49/(512*HarmonicSums`Private`ExpVar^8) - 5/(192*HarmonicSums`Private`ExpVar^7) + 5/(256*HarmonicSums`Private`ExpVar^6) + 1/(128*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) - 1/(192*HarmonicSums`Private`ExpVar^3) + 1/(96*HarmonicSums`Private`ExpVar^2)) - z2/24) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(512*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^9) + 147/(512*HarmonicSums`Private`ExpVar^8) + 5/(64*HarmonicSums`Private`ExpVar^7) - 15/(256*HarmonicSums`Private`ExpVar^6) - 3/(128*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2))*z2^2 - (927*z2^3)/560 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-31/(48*HarmonicSums`Private`ExpVar^10) + 17/(192*HarmonicSums`Private`ExpVar^8) - 1/(48*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar))*z2 + z3/4) + (-1)^HarmonicSums`Private`ExpVar* (32833/(6144*HarmonicSums`Private`ExpVar^10) + 38279/(7168*HarmonicSums`Private`ExpVar^9) - 4685/(10752*HarmonicSums`Private`ExpVar^8) - 1231/(1536*HarmonicSums`Private`ExpVar^7) + 37/(1536*HarmonicSums`Private`ExpVar^6) + 155/(768*HarmonicSums`Private`ExpVar^5) + 25/(384*HarmonicSums`Private`ExpVar^4) - 15/(64*HarmonicSums`Private`ExpVar^3) + 5/(32*HarmonicSums`Private`ExpVar^2))*z3 - (107*z3^2)/128 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(96*HarmonicSums`Private`ExpVar^10) + 17/(384*HarmonicSums`Private`ExpVar^8) - 1/(96*HarmonicSums`Private`ExpVar^6) + 1/(192*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2*(3555/(128*HarmonicSums`Private`ExpVar^10) + 357/(64*HarmonicSums`Private`ExpVar^9) - 441/(128*HarmonicSums`Private`ExpVar^8) - 15/(16*HarmonicSums`Private`ExpVar^7) + 45/(64*HarmonicSums`Private`ExpVar^6) + 9/(32*HarmonicSums`Private`ExpVar^5) - 9/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (-5925/(512*HarmonicSums`Private`ExpVar^10) - 595/(256*HarmonicSums`Private`ExpVar^9) + 735/(512*HarmonicSums`Private`ExpVar^8) + 25/(64*HarmonicSums`Private`ExpVar^7) - 75/(256*HarmonicSums`Private`ExpVar^6) - 15/(128*HarmonicSums`Private`ExpVar^5) + 15/(128*HarmonicSums`Private`ExpVar^4) + 5/(64*HarmonicSums`Private`ExpVar^3) - 5/(32*HarmonicSums`Private`ExpVar^2))*z3) + z2*(-(li4half/2) + (-1)^HarmonicSums`Private`ExpVar* (93/(16*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^8) + 3/(16*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(li4half/2 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 - (29*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (217/(64*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^6) - 7/(128*HarmonicSums`Private`ExpVar^4) + 7/(64*HarmonicSums`Private`ExpVar^2) - 7/(32*HarmonicSums`Private`ExpVar))*z3) + sinf^2*((-1)^HarmonicSums`Private`ExpVar*ln2* (-93/(16*HarmonicSums`Private`ExpVar^10) + 51/(64*HarmonicSums`Private`ExpVar^8) - 3/(16*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^2) + 3/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (155/(64*HarmonicSums`Private`ExpVar^10) - 85/(256*HarmonicSums`Private`ExpVar^8) + 5/(64*HarmonicSums`Private`ExpVar^6) - 5/(128*HarmonicSums`Private`ExpVar^4) + 5/(64*HarmonicSums`Private`ExpVar^2) - 5/(32*HarmonicSums`Private`ExpVar))*z3) + ln2*(li5half - 1847/(1280*HarmonicSums`Private`ExpVar^10) + 19357/(5760*HarmonicSums`Private`ExpVar^9) - 383/(1536*HarmonicSums`Private`ExpVar^8) - 337/(448*HarmonicSums`Private`ExpVar^7) + 97/(192*HarmonicSums`Private`ExpVar^6) - 7/(40*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + (-1)^HarmonicSums`Private`ExpVar* (-961/(80*HarmonicSums`Private`ExpVar^10) + 527/(320*HarmonicSums`Private`ExpVar^8) - 31/(80*HarmonicSums`Private`ExpVar^6) + 31/(160*HarmonicSums`Private`ExpVar^4) - 31/(80*HarmonicSums`Private`ExpVar^2) + 31/(40*HarmonicSums`Private`ExpVar))*z2^2 + z2*((-1)^HarmonicSums`Private`ExpVar* (-32833/(2560*HarmonicSums`Private`ExpVar^10) - 114837/(8960*HarmonicSums`Private`ExpVar^9) + 937/(896*HarmonicSums`Private`ExpVar^8) + 1231/(640*HarmonicSums`Private`ExpVar^7) - 37/(640*HarmonicSums`Private`ExpVar^6) - 31/(64*HarmonicSums`Private`ExpVar^5) - 5/(32*HarmonicSums`Private`ExpVar^4) + 9/(16*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2)) + z3/8) - z5/8) + (-1)^HarmonicSums`Private`ExpVar* (837/(128*HarmonicSums`Private`ExpVar^10) - 459/(512*HarmonicSums`Private`ExpVar^8) + 27/(128*HarmonicSums`Private`ExpVar^6) - 27/(256*HarmonicSums`Private`ExpVar^4) + 27/(128*HarmonicSums`Private`ExpVar^2) - 27/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, 1, 1, -2, 1, HarmonicSums`Private`ExpVar] :> 4*li6half + (13*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar*li5half* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(120*HarmonicSums`Private`ExpVar^10) - 17/(480*HarmonicSums`Private`ExpVar^8) + 1/(120*HarmonicSums`Private`ExpVar^6) - 1/(240*HarmonicSums`Private`ExpVar^4) + 1/(120*HarmonicSums`Private`ExpVar^2) - 1/(60*HarmonicSums`Private`ExpVar)) - 2131373/(460800*HarmonicSums`Private`ExpVar^10) + 48401057/(14515200*HarmonicSums`Private`ExpVar^9) + 35615/(258048*HarmonicSums`Private`ExpVar^8) - 52603/(94080*HarmonicSums`Private`ExpVar^7) + 137/(720*HarmonicSums`Private`ExpVar^6) - 19/(1600*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) + s6 - (5*ln2^4*z2)/48 + (-1)^HarmonicSums`Private`ExpVar* (-711/(512*HarmonicSums`Private`ExpVar^10) - 357/(1280*HarmonicSums`Private`ExpVar^9) + 441/(2560*HarmonicSums`Private`ExpVar^8) + 3/(64*HarmonicSums`Private`ExpVar^7) - 9/(256*HarmonicSums`Private`ExpVar^6) - 9/(640*HarmonicSums`Private`ExpVar^5) + 9/(640*HarmonicSums`Private`ExpVar^4) + 3/(320*HarmonicSums`Private`ExpVar^3) - 3/(160*HarmonicSums`Private`ExpVar^2))*z2^2 - (243*z2^3)/560 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar))*z2 + z3/4) + (-1)^HarmonicSums`Private`ExpVar* (32833/(6144*HarmonicSums`Private`ExpVar^10) + 38279/(7168*HarmonicSums`Private`ExpVar^9) - 4685/(10752*HarmonicSums`Private`ExpVar^8) - 1231/(1536*HarmonicSums`Private`ExpVar^7) + 37/(1536*HarmonicSums`Private`ExpVar^6) + 155/(768*HarmonicSums`Private`ExpVar^5) + 25/(384*HarmonicSums`Private`ExpVar^4) - 15/(64*HarmonicSums`Private`ExpVar^3) + 5/(32*HarmonicSums`Private`ExpVar^2))*z3 + (-1)^HarmonicSums`Private`ExpVar* (155/(64*HarmonicSums`Private`ExpVar^10) - 85/(256*HarmonicSums`Private`ExpVar^8) + 5/(64*HarmonicSums`Private`ExpVar^6) - 5/(128*HarmonicSums`Private`ExpVar^4) + 5/(64*HarmonicSums`Private`ExpVar^2) - 5/(32*HarmonicSums`Private`ExpVar))*sinf^2*z3 - (111*z3^2)/128 + sinf*(1847/(1280*HarmonicSums`Private`ExpVar^10) - 19357/(5760*HarmonicSums`Private`ExpVar^9) + 383/(1536*HarmonicSums`Private`ExpVar^8) + 337/(448*HarmonicSums`Private`ExpVar^7) - 97/(192*HarmonicSums`Private`ExpVar^6) + 7/(40*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + (-1)^HarmonicSums`Private`ExpVar* (93/(160*HarmonicSums`Private`ExpVar^10) - 51/(640*HarmonicSums`Private`ExpVar^8) + 3/(160*HarmonicSums`Private`ExpVar^6) - 3/(320*HarmonicSums`Private`ExpVar^4) + 3/(160*HarmonicSums`Private`ExpVar^2) - 3/(80*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (-5925/(512*HarmonicSums`Private`ExpVar^10) - 595/(256*HarmonicSums`Private`ExpVar^9) + 735/(512*HarmonicSums`Private`ExpVar^8) + 25/(64*HarmonicSums`Private`ExpVar^7) - 75/(256*HarmonicSums`Private`ExpVar^6) - 15/(128*HarmonicSums`Private`ExpVar^5) + 15/(128*HarmonicSums`Private`ExpVar^4) + 5/(64*HarmonicSums`Private`ExpVar^3) - 5/(32*HarmonicSums`Private`ExpVar^2))*z3) + ln2^2*(li4half/2 - (19*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (217/(64*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^6) - 7/(128*HarmonicSums`Private`ExpVar^4) + 7/(64*HarmonicSums`Private`ExpVar^2) - 7/(32*HarmonicSums`Private`ExpVar))*z3) + z2*(li4half/2 + (-1)^HarmonicSums`Private`ExpVar* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (z2*z3)/8 - z5/8) + (-1)^HarmonicSums`Private`ExpVar* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z5, S[-1, 1, 1, 2, -1, HarmonicSums`Private`ExpVar] :> -3*li6half - ln2^6/60 + (-1)^HarmonicSums`Private`ExpVar*li4half* (-3555/(64*HarmonicSums`Private`ExpVar^10) - 357/(32*HarmonicSums`Private`ExpVar^9) + 441/(64*HarmonicSums`Private`ExpVar^8) + 15/(8*HarmonicSums`Private`ExpVar^7) - 45/(32*HarmonicSums`Private`ExpVar^6) - 9/(16*HarmonicSums`Private`ExpVar^5) + 9/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (341/(480*HarmonicSums`Private`ExpVar^10) - 187/(1920*HarmonicSums`Private`ExpVar^8) + 11/(480*HarmonicSums`Private`ExpVar^6) - 11/(960*HarmonicSums`Private`ExpVar^4) + 11/(480*HarmonicSums`Private`ExpVar^2) - 11/(240*HarmonicSums`Private`ExpVar)) - 11261/(2560*HarmonicSums`Private`ExpVar^10) - 143/(640*HarmonicSums`Private`ExpVar^9) + 659/(768*HarmonicSums`Private`ExpVar^8) - 177/(448*HarmonicSums`Private`ExpVar^7) + 19/(192*HarmonicSums`Private`ExpVar^6) - 1/(80*HarmonicSums`Private`ExpVar^5) + 2*s6 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-1185/(512*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^9) + 147/(512*HarmonicSums`Private`ExpVar^8) + 5/(64*HarmonicSums`Private`ExpVar^7) - 15/(256*HarmonicSums`Private`ExpVar^6) - 3/(128*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2)) + z2/6) + (-1)^HarmonicSums`Private`ExpVar* (711/(32*HarmonicSums`Private`ExpVar^10) + 357/(80*HarmonicSums`Private`ExpVar^9) - 441/(160*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^7) + 9/(16*HarmonicSums`Private`ExpVar^6) + 9/(40*HarmonicSums`Private`ExpVar^5) - 9/(40*HarmonicSums`Private`ExpVar^4) - 3/(20*HarmonicSums`Private`ExpVar^3) + 3/(10*HarmonicSums`Private`ExpVar^2))*z2^2 - (13*z2^3)/35 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-155/(48*HarmonicSums`Private`ExpVar^10) + 85/(192*HarmonicSums`Private`ExpVar^8) - 5/(48*HarmonicSums`Private`ExpVar^6) + 5/(96*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^2) + 5/(24*HarmonicSums`Private`ExpVar))*z2 - z3/3) + (-1)^HarmonicSums`Private`ExpVar* (-32833/(15360*HarmonicSums`Private`ExpVar^10) - 38279/(17920*HarmonicSums`Private`ExpVar^9) + 937/(5376*HarmonicSums`Private`ExpVar^8) + 1231/(3840*HarmonicSums`Private`ExpVar^7) - 37/(3840*HarmonicSums`Private`ExpVar^6) - 31/(384*HarmonicSums`Private`ExpVar^5) - 5/(192*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z3 - (3*z3^2)/4 + ln2^2*(li4half/2 + (-1)^HarmonicSums`Private`ExpVar* (3555/(256*HarmonicSums`Private`ExpVar^10) + 357/(128*HarmonicSums`Private`ExpVar^9) - 441/(256*HarmonicSums`Private`ExpVar^8) - 15/(32*HarmonicSums`Private`ExpVar^7) + 45/(128*HarmonicSums`Private`ExpVar^6) + 9/(64*HarmonicSums`Private`ExpVar^5) - 9/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2))*z2 - z2^2/10 + (-1)^HarmonicSums`Private`ExpVar* (217/(32*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^6) - 7/(64*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3) + z2*((7*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3) + sinf^2*((-1)^HarmonicSums`Private`ExpVar*ln2* (93/(16*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^8) + 3/(16*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar*li4half* (93/(4*HarmonicSums`Private`ExpVar^10) - 51/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^2*(-93/(16*HarmonicSums`Private`ExpVar^10) + 51/(64*HarmonicSums`Private`ExpVar^8) - 3/(16*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^2) + 3/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-93/(10*HarmonicSums`Private`ExpVar^10) + 51/(40*HarmonicSums`Private`ExpVar^8) - 3/(10*HarmonicSums`Private`ExpVar^6) + 3/(20*HarmonicSums`Private`ExpVar^4) - 3/(10*HarmonicSums`Private`ExpVar^2) + 3/(5*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z3 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-3555/(128*HarmonicSums`Private`ExpVar^10) - 357/(64*HarmonicSums`Private`ExpVar^9) + 441/(128*HarmonicSums`Private`ExpVar^8) + 15/(16*HarmonicSums`Private`ExpVar^7) - 45/(64*HarmonicSums`Private`ExpVar^6) - 9/(32*HarmonicSums`Private`ExpVar^5) + 9/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (217/(16*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^6) - 7/(32*HarmonicSums`Private`ExpVar^4) + 7/(16*HarmonicSums`Private`ExpVar^2) - 7/(8*HarmonicSums`Private`ExpVar))*z3)) + ln2*(4*li5half + (-1)^HarmonicSums`Private`ExpVar* (-85070759/(4536000*HarmonicSums`Private`ExpVar^10) + 6260707/(12348000*HarmonicSums`Private`ExpVar^9) + 148907767/(59270400*HarmonicSums`Private`ExpVar^8) - 23873/(216000*HarmonicSums`Private`ExpVar^7) - 165653/(432000*HarmonicSums`Private`ExpVar^6) - 755/(1728*HarmonicSums`Private`ExpVar^5) + 869/(864*HarmonicSums`Private`ExpVar^4) - 15/(16*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*li4half* (93/(4*HarmonicSums`Private`ExpVar^10) - 51/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (961/(80*HarmonicSums`Private`ExpVar^10) - 527/(320*HarmonicSums`Private`ExpVar^8) + 31/(80*HarmonicSums`Private`ExpVar^6) - 31/(160*HarmonicSums`Private`ExpVar^4) + 31/(80*HarmonicSums`Private`ExpVar^2) - 31/(40*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (-8295/(256*HarmonicSums`Private`ExpVar^10) - 833/(128*HarmonicSums`Private`ExpVar^9) + 1029/(256*HarmonicSums`Private`ExpVar^8) + 35/(32*HarmonicSums`Private`ExpVar^7) - 105/(128*HarmonicSums`Private`ExpVar^6) - 21/(64*HarmonicSums`Private`ExpVar^5) + 21/(64*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2))*z3 + z2*((-1)^HarmonicSums`Private`ExpVar* (32833/(2560*HarmonicSums`Private`ExpVar^10) + 114837/(8960*HarmonicSums`Private`ExpVar^9) - 937/(896*HarmonicSums`Private`ExpVar^8) - 1231/(640*HarmonicSums`Private`ExpVar^7) + 37/(640*HarmonicSums`Private`ExpVar^6) + 31/(64*HarmonicSums`Private`ExpVar^5) + 5/(32*HarmonicSums`Private`ExpVar^4) - 9/(16*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2)) + z3) - 4*z5) + (-1)^HarmonicSums`Private`ExpVar*(-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar)*z5, S[-1, 1, 1, 2, 1, HarmonicSums`Private`ExpVar] :> 6*li6half - ln2^6/240 + (-1)^HarmonicSums`Private`ExpVar* (561280766897/(26671680000*HarmonicSums`Private`ExpVar^10) - 84914627533/(10372320000*HarmonicSums`Private`ExpVar^9) - 28929682919/(8297856000*HarmonicSums`Private`ExpVar^8) + 2824883/(2160000*HarmonicSums`Private`ExpVar^7) + 2936987/(2880000*HarmonicSums`Private`ExpVar^6) - 199/(2304*HarmonicSums`Private`ExpVar^5) - 2803/(1728*HarmonicSums`Private`ExpVar^4) + 71/(32*HarmonicSums`Private`ExpVar^3) - 3/(2*HarmonicSums`Private`ExpVar^2)) + (9*s6)/4 + (ln2^4*z2)/16 + (-1)^HarmonicSums`Private`ExpVar* (-711/(32*HarmonicSums`Private`ExpVar^10) - 357/(80*HarmonicSums`Private`ExpVar^9) + 441/(160*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^7) - 9/(16*HarmonicSums`Private`ExpVar^6) - 9/(40*HarmonicSums`Private`ExpVar^5) + 9/(40*HarmonicSums`Private`ExpVar^4) + 3/(20*HarmonicSums`Private`ExpVar^3) - 3/(10*HarmonicSums`Private`ExpVar^2))*z2^2 - (23*z2^3)/35 + ln2^2*(li4half/2 + (9*z2^2)/80) - (ln2^3*z3)/3 + (-1)^HarmonicSums`Private`ExpVar* (-32833/(1920*HarmonicSums`Private`ExpVar^10) - 38279/(2240*HarmonicSums`Private`ExpVar^9) + 937/(672*HarmonicSums`Private`ExpVar^8) + 1231/(480*HarmonicSums`Private`ExpVar^7) - 37/(480*HarmonicSums`Private`ExpVar^6) - 31/(48*HarmonicSums`Private`ExpVar^5) - 5/(24*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2))*z3 + (-1)^HarmonicSums`Private`ExpVar*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))* sinf^2*z3 - (55*z3^2)/32 + sinf*((-1)^HarmonicSums`Private`ExpVar* (85070759/(4536000*HarmonicSums`Private`ExpVar^10) - 6260707/(12348000*HarmonicSums`Private`ExpVar^9) - 148907767/(59270400*HarmonicSums`Private`ExpVar^8) + 23873/(216000*HarmonicSums`Private`ExpVar^7) + 165653/(432000*HarmonicSums`Private`ExpVar^6) + 755/(1728*HarmonicSums`Private`ExpVar^5) - 869/(864*HarmonicSums`Private`ExpVar^4) + 15/(16*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (93/(10*HarmonicSums`Private`ExpVar^10) - 51/(40*HarmonicSums`Private`ExpVar^8) + 3/(10*HarmonicSums`Private`ExpVar^6) - 3/(20*HarmonicSums`Private`ExpVar^4) + 3/(10*HarmonicSums`Private`ExpVar^2) - 3/(5*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (1185/(32*HarmonicSums`Private`ExpVar^10) + 119/(16*HarmonicSums`Private`ExpVar^9) - 147/(32*HarmonicSums`Private`ExpVar^8) - 5/(4*HarmonicSums`Private`ExpVar^7) + 15/(16*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2))*z3) + z2*(-(li4half/2) + (-1)^HarmonicSums`Private`ExpVar* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z3) + ln2*(4*li5half + z2*z3 - 4*z5) + (-1)^HarmonicSums`Private`ExpVar* (-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar)*z5, S[-1, 1, 1, -1, -2, HarmonicSums`Private`ExpVar] :> -6*li6half - (3*ln2^6)/80 + (-1)^HarmonicSums`Private`ExpVar* (359338519/(217728000*HarmonicSums`Private`ExpVar^10) + 13168313/(592704000*HarmonicSums`Private`ExpVar^9) - 29857981/(237081600*HarmonicSums`Private`ExpVar^8) - 85487/(288000*HarmonicSums`Private`ExpVar^7) + 706579/(1728000*HarmonicSums`Private`ExpVar^6) - 1919/(6912*HarmonicSums`Private`ExpVar^5) + 211/(1728*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-3555/(64*HarmonicSums`Private`ExpVar^10) - 357/(32*HarmonicSums`Private`ExpVar^9) + 441/(64*HarmonicSums`Private`ExpVar^8) + 15/(8*HarmonicSums`Private`ExpVar^7) - 45/(32*HarmonicSums`Private`ExpVar^6) - 9/(16*HarmonicSums`Private`ExpVar^5) + 9/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(160*HarmonicSums`Private`ExpVar^10) - 17/(640*HarmonicSums`Private`ExpVar^8) + 1/(160*HarmonicSums`Private`ExpVar^6) - 1/(320*HarmonicSums`Private`ExpVar^4) + 1/(160*HarmonicSums`Private`ExpVar^2) - 1/(80*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) - (5*s6)/2 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-1185/(512*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^9) + 147/(512*HarmonicSums`Private`ExpVar^8) + 5/(64*HarmonicSums`Private`ExpVar^7) - 15/(256*HarmonicSums`Private`ExpVar^6) - 3/(128*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2)) + (3*z2)/16) + (-1)^HarmonicSums`Private`ExpVar* (2607/(256*HarmonicSums`Private`ExpVar^10) + 1309/(640*HarmonicSums`Private`ExpVar^9) - 1617/(1280*HarmonicSums`Private`ExpVar^8) - 11/(32*HarmonicSums`Private`ExpVar^7) + 33/(128*HarmonicSums`Private`ExpVar^6) + 33/(320*HarmonicSums`Private`ExpVar^5) - 33/(320*HarmonicSums`Private`ExpVar^4) - 11/(160*HarmonicSums`Private`ExpVar^3) + 11/(80*HarmonicSums`Private`ExpVar^2))*z2^2 + (81*z2^3)/280 + ln2^2*((-3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 - (11*z2^2)/40) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-31/(48*HarmonicSums`Private`ExpVar^10) + 17/(192*HarmonicSums`Private`ExpVar^8) - 1/(48*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar))*z2 - (13*z3)/48) + (-1)^HarmonicSums`Private`ExpVar* (-426829/(30720*HarmonicSums`Private`ExpVar^10) - 497627/(35840*HarmonicSums`Private`ExpVar^9) + 12181/(10752*HarmonicSums`Private`ExpVar^8) + 16003/(7680*HarmonicSums`Private`ExpVar^7) - 481/(7680*HarmonicSums`Private`ExpVar^6) - 403/(768*HarmonicSums`Private`ExpVar^5) - 65/(384*HarmonicSums`Private`ExpVar^4) + 39/(64*HarmonicSums`Private`ExpVar^3) - 13/(32*HarmonicSums`Private`ExpVar^2))*z3 + (85*z3^2)/128 + sinf*((-1)^HarmonicSums`Private`ExpVar*li4half* (93/(4*HarmonicSums`Private`ExpVar^10) - 51/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2*(-1185/(64*HarmonicSums`Private`ExpVar^10) - 119/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-341/(80*HarmonicSums`Private`ExpVar^10) + 187/(320*HarmonicSums`Private`ExpVar^8) - 11/(80*HarmonicSums`Private`ExpVar^6) + 11/(160*HarmonicSums`Private`ExpVar^4) - 11/(80*HarmonicSums`Private`ExpVar^2) + 11/(40*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (15405/(512*HarmonicSums`Private`ExpVar^10) + 1547/(256*HarmonicSums`Private`ExpVar^9) - 1911/(512*HarmonicSums`Private`ExpVar^8) - 65/(64*HarmonicSums`Private`ExpVar^7) + 195/(256*HarmonicSums`Private`ExpVar^6) + 39/(128*HarmonicSums`Private`ExpVar^5) - 39/(128*HarmonicSums`Private`ExpVar^4) - 13/(64*HarmonicSums`Private`ExpVar^3) + 13/(32*HarmonicSums`Private`ExpVar^2))*z3) + z2*(li4half - 3075/(1024*HarmonicSums`Private`ExpVar^10) - 47/(1152*HarmonicSums`Private`ExpVar^9) + 539/(1024*HarmonicSums`Private`ExpVar^8) - 53/(768*HarmonicSums`Private`ExpVar^7) - 45/(256*HarmonicSums`Private`ExpVar^6) + 31/(192*HarmonicSums`Private`ExpVar^5) - 5/(64*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (31/(64*HarmonicSums`Private`ExpVar^10) - 17/(256*HarmonicSums`Private`ExpVar^8) + 1/(64*HarmonicSums`Private`ExpVar^6) - 1/(128*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^2) - 1/(32*HarmonicSums`Private`ExpVar))*z3) + sinf^2*((-1)^HarmonicSums`Private`ExpVar*ln2* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-403/(64*HarmonicSums`Private`ExpVar^10) + 221/(256*HarmonicSums`Private`ExpVar^8) - 13/(64*HarmonicSums`Private`ExpVar^6) + 13/(128*HarmonicSums`Private`ExpVar^4) - 13/(64*HarmonicSums`Private`ExpVar^2) + 13/(32*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (31/(128*HarmonicSums`Private`ExpVar^10) - 17/(512*HarmonicSums`Private`ExpVar^8) + 1/(128*HarmonicSums`Private`ExpVar^6) - 1/(256*HarmonicSums`Private`ExpVar^4) + 1/(128*HarmonicSums`Private`ExpVar^2) - 1/(64*HarmonicSums`Private`ExpVar))*z5 + ln2*(-4*li5half + (-1)^HarmonicSums`Private`ExpVar* (217/(80*HarmonicSums`Private`ExpVar^10) - 119/(320*HarmonicSums`Private`ExpVar^8) + 7/(80*HarmonicSums`Private`ExpVar^6) - 7/(160*HarmonicSums`Private`ExpVar^4) + 7/(80*HarmonicSums`Private`ExpVar^2) - 7/(40*HarmonicSums`Private`ExpVar))*z2^2 + z2*((-1)^HarmonicSums`Private`ExpVar* (32833/(3840*HarmonicSums`Private`ExpVar^10) + 38279/(4480*HarmonicSums`Private`ExpVar^9) - 937/(1344*HarmonicSums`Private`ExpVar^8) - 1231/(960*HarmonicSums`Private`ExpVar^7) + 37/(960*HarmonicSums`Private`ExpVar^6) + 31/(96*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (3*z3)/8) + (39*z5)/8), S[-1, 1, 1, -1, 2, HarmonicSums`Private`ExpVar] :> -3*li6half - ln2^6/30 + (-1)^HarmonicSums`Private`ExpVar*li4half* (-1185/(32*HarmonicSums`Private`ExpVar^10) - 119/(16*HarmonicSums`Private`ExpVar^9) + 147/(32*HarmonicSums`Private`ExpVar^8) + 5/(4*HarmonicSums`Private`ExpVar^7) - 15/(16*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-31/(480*HarmonicSums`Private`ExpVar^10) + 17/(1920*HarmonicSums`Private`ExpVar^8) - 1/(480*HarmonicSums`Private`ExpVar^6) + 1/(960*HarmonicSums`Private`ExpVar^4) - 1/(480*HarmonicSums`Private`ExpVar^2) + 1/(240*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) - 50703/(8960*HarmonicSums`Private`ExpVar^10) + 7555/(2304*HarmonicSums`Private`ExpVar^9) + 24731/(46080*HarmonicSums`Private`ExpVar^8) - 95/(84*HarmonicSums`Private`ExpVar^7) + 347/(576*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 3*s6 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-395/(256*HarmonicSums`Private`ExpVar^10) - 119/(384*HarmonicSums`Private`ExpVar^9) + 49/(256*HarmonicSums`Private`ExpVar^8) + 5/(96*HarmonicSums`Private`ExpVar^7) - 5/(128*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(96*HarmonicSums`Private`ExpVar^3) - 1/(48*HarmonicSums`Private`ExpVar^2)) + (5*z2)/24) + (-1)^HarmonicSums`Private`ExpVar* (8295/(512*HarmonicSums`Private`ExpVar^10) + 833/(256*HarmonicSums`Private`ExpVar^9) - 1029/(512*HarmonicSums`Private`ExpVar^8) - 35/(64*HarmonicSums`Private`ExpVar^7) + 105/(256*HarmonicSums`Private`ExpVar^6) + 21/(128*HarmonicSums`Private`ExpVar^5) - 21/(128*HarmonicSums`Private`ExpVar^4) - 7/(64*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2))*z2^2 - (17*z2^3)/70 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar))*z2 - (13*z3)/48) + (-1)^HarmonicSums`Private`ExpVar* (32833/(3840*HarmonicSums`Private`ExpVar^10) + 38279/(4480*HarmonicSums`Private`ExpVar^9) - 937/(1344*HarmonicSums`Private`ExpVar^8) - 1231/(960*HarmonicSums`Private`ExpVar^7) + 37/(960*HarmonicSums`Private`ExpVar^6) + 31/(96*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z3 + (65*z3^2)/64 + ln2^2*((-3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (3555/(256*HarmonicSums`Private`ExpVar^10) + 357/(128*HarmonicSums`Private`ExpVar^9) - 441/(256*HarmonicSums`Private`ExpVar^8) - 15/(32*HarmonicSums`Private`ExpVar^7) + 45/(128*HarmonicSums`Private`ExpVar^6) + 9/(64*HarmonicSums`Private`ExpVar^5) - 9/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2))*z2 - (19*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (651/(64*HarmonicSums`Private`ExpVar^10) - 357/(256*HarmonicSums`Private`ExpVar^8) + 21/(64*HarmonicSums`Private`ExpVar^6) - 21/(128*HarmonicSums`Private`ExpVar^4) + 21/(64*HarmonicSums`Private`ExpVar^2) - 21/(32*HarmonicSums`Private`ExpVar))*z3) + sinf^2*((-1)^HarmonicSums`Private`ExpVar*ln2* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z3) + z2*((3*li4half)/2 + 3075/(512*HarmonicSums`Private`ExpVar^10) + 47/(576*HarmonicSums`Private`ExpVar^9) - 539/(512*HarmonicSums`Private`ExpVar^8) + 53/(384*HarmonicSums`Private`ExpVar^7) + 45/(128*HarmonicSums`Private`ExpVar^6) - 31/(96*HarmonicSums`Private`ExpVar^5) + 5/(32*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (31/(64*HarmonicSums`Private`ExpVar^10) - 17/(256*HarmonicSums`Private`ExpVar^8) + 1/(64*HarmonicSums`Private`ExpVar^6) - 1/(128*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^2) - 1/(32*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar*li4half* (31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (31/(48*HarmonicSums`Private`ExpVar^10) - 17/(192*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^2*(-93/(16*HarmonicSums`Private`ExpVar^10) + 51/(64*HarmonicSums`Private`ExpVar^8) - 3/(16*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^2) + 3/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-217/(32*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^6) + 7/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(64*HarmonicSums`Private`ExpVar^10) - 119/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z3 + ln2*((-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (651/(32*HarmonicSums`Private`ExpVar^10) - 357/(128*HarmonicSums`Private`ExpVar^8) + 21/(32*HarmonicSums`Private`ExpVar^6) - 21/(64*HarmonicSums`Private`ExpVar^4) + 21/(32*HarmonicSums`Private`ExpVar^2) - 21/(16*HarmonicSums`Private`ExpVar))*z3)) + (-1)^HarmonicSums`Private`ExpVar* (1209/(32*HarmonicSums`Private`ExpVar^10) - 663/(128*HarmonicSums`Private`ExpVar^8) + 39/(32*HarmonicSums`Private`ExpVar^6) - 39/(64*HarmonicSums`Private`ExpVar^4) + 39/(32*HarmonicSums`Private`ExpVar^2) - 39/(16*HarmonicSums`Private`ExpVar))*z5 + ln2*(-4*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-1891/(160*HarmonicSums`Private`ExpVar^10) + 1037/(640*HarmonicSums`Private`ExpVar^8) - 61/(160*HarmonicSums`Private`ExpVar^6) + 61/(320*HarmonicSums`Private`ExpVar^4) - 61/(160*HarmonicSums`Private`ExpVar^2) + 61/(80*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (-24885/(512*HarmonicSums`Private`ExpVar^10) - 2499/(256*HarmonicSums`Private`ExpVar^9) + 3087/(512*HarmonicSums`Private`ExpVar^8) + 105/(64*HarmonicSums`Private`ExpVar^7) - 315/(256*HarmonicSums`Private`ExpVar^6) - 63/(128*HarmonicSums`Private`ExpVar^5) + 63/(128*HarmonicSums`Private`ExpVar^4) + 21/(64*HarmonicSums`Private`ExpVar^3) - 21/(32*HarmonicSums`Private`ExpVar^2))*z3 + z2*((-1)^HarmonicSums`Private`ExpVar* (-32833/(7680*HarmonicSums`Private`ExpVar^10) - 38279/(8960*HarmonicSums`Private`ExpVar^9) + 937/(2688*HarmonicSums`Private`ExpVar^8) + 1231/(1920*HarmonicSums`Private`ExpVar^7) - 37/(1920*HarmonicSums`Private`ExpVar^6) - 31/(192*HarmonicSums`Private`ExpVar^5) - 5/(96*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (27*z3)/16) + (39*z5)/8), S[-1, 1, 1, 1, -2, HarmonicSums`Private`ExpVar] :> ln2^6/120 + (-1)^HarmonicSums`Private`ExpVar*li4half* (1185/(64*HarmonicSums`Private`ExpVar^10) + 119/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-31/(120*HarmonicSums`Private`ExpVar^10) + 17/(480*HarmonicSums`Private`ExpVar^8) - 1/(120*HarmonicSums`Private`ExpVar^6) + 1/(240*HarmonicSums`Private`ExpVar^4) - 1/(120*HarmonicSums`Private`ExpVar^2) + 1/(60*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) - 3243/(640*HarmonicSums`Private`ExpVar^10) - 2413/(3840*HarmonicSums`Private`ExpVar^9) + 3295/(3072*HarmonicSums`Private`ExpVar^8) - 199/(448*HarmonicSums`Private`ExpVar^7) + 5/(48*HarmonicSums`Private`ExpVar^6) - 1/(80*HarmonicSums`Private`ExpVar^5) - s6 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(512*HarmonicSums`Private`ExpVar^10) + 119/(768*HarmonicSums`Private`ExpVar^9) - 49/(512*HarmonicSums`Private`ExpVar^8) - 5/(192*HarmonicSums`Private`ExpVar^7) + 5/(256*HarmonicSums`Private`ExpVar^6) + 1/(128*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) - 1/(192*HarmonicSums`Private`ExpVar^3) + 1/(96*HarmonicSums`Private`ExpVar^2)) - z2/12) + (-1)^HarmonicSums`Private`ExpVar*(31/(48*HarmonicSums`Private`ExpVar^10) - 17/(192*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar))*sinf^3*z2 + (-1)^HarmonicSums`Private`ExpVar* (-3081/(256*HarmonicSums`Private`ExpVar^10) - 1547/(640*HarmonicSums`Private`ExpVar^9) + 1911/(1280*HarmonicSums`Private`ExpVar^8) + 13/(32*HarmonicSums`Private`ExpVar^7) - 39/(128*HarmonicSums`Private`ExpVar^6) - 39/(320*HarmonicSums`Private`ExpVar^5) + 39/(320*HarmonicSums`Private`ExpVar^4) + 13/(160*HarmonicSums`Private`ExpVar^3) - 13/(80*HarmonicSums`Private`ExpVar^2))*z2^2 + (3*z2^3)/7 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar))*z2 + z3/6) + (-1)^HarmonicSums`Private`ExpVar* (32833/(30720*HarmonicSums`Private`ExpVar^10) + 38279/(35840*HarmonicSums`Private`ExpVar^9) - 937/(10752*HarmonicSums`Private`ExpVar^8) - 1231/(7680*HarmonicSums`Private`ExpVar^7) + 37/(7680*HarmonicSums`Private`ExpVar^6) + 31/(768*HarmonicSums`Private`ExpVar^5) + 5/(384*HarmonicSums`Private`ExpVar^4) - 3/(64*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2))*z3 + (3*z3^2)/8 + z2*(-li4half + (-1)^HarmonicSums`Private`ExpVar* (319181/(53760*HarmonicSums`Private`ExpVar^10) - 232189/(80640*HarmonicSums`Private`ExpVar^9) - 19201/(23040*HarmonicSums`Private`ExpVar^8) + 3691/(11520*HarmonicSums`Private`ExpVar^7) + 35/(192*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^5) - 5/(32*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (341/(192*HarmonicSums`Private`ExpVar^10) - 187/(768*HarmonicSums`Private`ExpVar^8) + 11/(192*HarmonicSums`Private`ExpVar^6) - 11/(384*HarmonicSums`Private`ExpVar^4) + 11/(192*HarmonicSums`Private`ExpVar^2) - 11/(96*HarmonicSums`Private`ExpVar))*z3) + sinf^2*((-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (31/(64*HarmonicSums`Private`ExpVar^10) - 17/(256*HarmonicSums`Private`ExpVar^8) + 1/(64*HarmonicSums`Private`ExpVar^6) - 1/(128*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^2) - 1/(32*HarmonicSums`Private`ExpVar))*z3) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (3*z2^2)/20 + (-1)^HarmonicSums`Private`ExpVar* (-217/(64*HarmonicSums`Private`ExpVar^10) + 119/(256*HarmonicSums`Private`ExpVar^8) - 7/(64*HarmonicSums`Private`ExpVar^6) + 7/(128*HarmonicSums`Private`ExpVar^4) - 7/(64*HarmonicSums`Private`ExpVar^2) + 7/(32*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(96*HarmonicSums`Private`ExpVar^10) + 17/(384*HarmonicSums`Private`ExpVar^8) - 1/(96*HarmonicSums`Private`ExpVar^6) + 1/(192*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (32833/(7680*HarmonicSums`Private`ExpVar^10) + 38279/(8960*HarmonicSums`Private`ExpVar^9) - 937/(2688*HarmonicSums`Private`ExpVar^8) - 1231/(1920*HarmonicSums`Private`ExpVar^7) + 37/(1920*HarmonicSums`Private`ExpVar^6) + 31/(192*HarmonicSums`Private`ExpVar^5) + 5/(96*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (403/(80*HarmonicSums`Private`ExpVar^10) - 221/(320*HarmonicSums`Private`ExpVar^8) + 13/(80*HarmonicSums`Private`ExpVar^6) - 13/(160*HarmonicSums`Private`ExpVar^4) + 13/(80*HarmonicSums`Private`ExpVar^2) - 13/(40*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(512*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^9) + 147/(512*HarmonicSums`Private`ExpVar^8) + 5/(64*HarmonicSums`Private`ExpVar^7) - 15/(256*HarmonicSums`Private`ExpVar^6) - 3/(128*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2))*z3 + (-1)^HarmonicSums`Private`ExpVar*ln2* (-217/(32*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^6) + 7/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar*(31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))* z5 + ln2*(-li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (8295/(512*HarmonicSums`Private`ExpVar^10) + 833/(256*HarmonicSums`Private`ExpVar^9) - 1029/(512*HarmonicSums`Private`ExpVar^8) - 35/(64*HarmonicSums`Private`ExpVar^7) + 105/(256*HarmonicSums`Private`ExpVar^6) + 21/(128*HarmonicSums`Private`ExpVar^5) - 21/(128*HarmonicSums`Private`ExpVar^4) - 7/(64*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2))*z3 - (z2*z3)/2 + z5), S[-1, 1, 1, 1, 2, HarmonicSums`Private`ExpVar] :> -3*li6half + ln2^6/240 + (-1)^HarmonicSums`Private`ExpVar* (-389139129697/(22861440000*HarmonicSums`Private`ExpVar^10) + 1164404809/(6914880000*HarmonicSums`Private`ExpVar^9) + 58624149203/(24893568000*HarmonicSums`Private`ExpVar^8) - 3305851/(12960000*HarmonicSums`Private`ExpVar^7) - 1839211/(25920000*HarmonicSums`Private`ExpVar^6) - 14117/(20736*HarmonicSums`Private`ExpVar^5) + 5815/(5184*HarmonicSums`Private`ExpVar^4) - 31/(32*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2)) - s6/2 - (ln2^4*z2)/24 + (-1)^HarmonicSums`Private`ExpVar* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar))*sinf^3*z2 - (ln2^2*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (2133/(128*HarmonicSums`Private`ExpVar^10) + 1071/(320*HarmonicSums`Private`ExpVar^9) - 1323/(640*HarmonicSums`Private`ExpVar^8) - 9/(16*HarmonicSums`Private`ExpVar^7) + 27/(64*HarmonicSums`Private`ExpVar^6) + 27/(160*HarmonicSums`Private`ExpVar^5) - 27/(160*HarmonicSums`Private`ExpVar^4) - 9/(80*HarmonicSums`Private`ExpVar^3) + 9/(40*HarmonicSums`Private`ExpVar^2))*z2^2 + z2^3/5 + (ln2^3*z3)/6 + (-1)^HarmonicSums`Private`ExpVar* (32833/(3840*HarmonicSums`Private`ExpVar^10) + 38279/(4480*HarmonicSums`Private`ExpVar^9) - 937/(1344*HarmonicSums`Private`ExpVar^8) - 1231/(960*HarmonicSums`Private`ExpVar^7) + 37/(960*HarmonicSums`Private`ExpVar^6) + 31/(96*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z3 + (5*z3^2)/8 + sinf*((-1)^HarmonicSums`Private`ExpVar* (-32833/(3840*HarmonicSums`Private`ExpVar^10) - 38279/(4480*HarmonicSums`Private`ExpVar^9) + 937/(1344*HarmonicSums`Private`ExpVar^8) + 1231/(960*HarmonicSums`Private`ExpVar^7) - 37/(960*HarmonicSums`Private`ExpVar^6) - 31/(96*HarmonicSums`Private`ExpVar^5) - 5/(48*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-279/(40*HarmonicSums`Private`ExpVar^10) + 153/(160*HarmonicSums`Private`ExpVar^8) - 9/(40*HarmonicSums`Private`ExpVar^6) + 9/(80*HarmonicSums`Private`ExpVar^4) - 9/(40*HarmonicSums`Private`ExpVar^2) + 9/(20*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(64*HarmonicSums`Private`ExpVar^10) - 119/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z3) + sinf^2*((-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z3) + z2*((-1)^HarmonicSums`Private`ExpVar* (-319181/(26880*HarmonicSums`Private`ExpVar^10) + 232189/(40320*HarmonicSums`Private`ExpVar^9) + 19201/(11520*HarmonicSums`Private`ExpVar^8) - 3691/(5760*HarmonicSums`Private`ExpVar^7) - 35/(96*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar*(31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))* z5 + ln2*(-li5half - (z2*z3)/2 + z5), S[1, -2, -1, -1, -1, HarmonicSums`Private`ExpVar] :> 7*li6half + (11*ln2^6)/360 - 18889097/(48384000*HarmonicSums`Private`ExpVar^10) + 13691347/(43545600*HarmonicSums`Private`ExpVar^9) + 532813/(3870720*HarmonicSums`Private`ExpVar^8) - 41903/(112896*HarmonicSums`Private`ExpVar^7) + 6031/(17280*HarmonicSums`Private`ExpVar^6) - 6359/(28800*HarmonicSums`Private`ExpVar^5) + 77/(768*HarmonicSums`Private`ExpVar^4) - 1/(36*HarmonicSums`Private`ExpVar^3) + (9*s6)/4 - (ln2^4*z2)/4 + (li4half/2 + 1469/(9600*HarmonicSums`Private`ExpVar^10) - 7757/(151200*HarmonicSums`Private`ExpVar^9) - 509/(8064*HarmonicSums`Private`ExpVar^8) + 6227/(141120*HarmonicSums`Private`ExpVar^7) + 137/(2880*HarmonicSums`Private`ExpVar^6) - 223/(1800*HarmonicSums`Private`ExpVar^5) + 7/(48*HarmonicSums`Private`ExpVar^4) - 17/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 - (431*z2^3)/560 + ln2^2*(li4half/2 + 1469/(9600*HarmonicSums`Private`ExpVar^10) - 7757/(151200*HarmonicSums`Private`ExpVar^9) - 509/(8064*HarmonicSums`Private`ExpVar^8) + 6227/(141120*HarmonicSums`Private`ExpVar^7) + 137/(2880*HarmonicSums`Private`ExpVar^6) - 223/(1800*HarmonicSums`Private`ExpVar^5) + 7/(48*HarmonicSums`Private`ExpVar^4) - 17/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - (29*z2^2)/20) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-187/(48*HarmonicSums`Private`ExpVar^10) - 9/(4*HarmonicSums`Private`ExpVar^9) + 9/(16*HarmonicSums`Private`ExpVar^8) + 1/(3*HarmonicSums`Private`ExpVar^7) - 7/(48*HarmonicSums`Private`ExpVar^6) - 1/(12*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3)) + (7*z3)/8) + (-1)^HarmonicSums`Private`ExpVar* (-187/(32*HarmonicSums`Private`ExpVar^10) - 27/(8*HarmonicSums`Private`ExpVar^9) + 27/(32*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^7) - 7/(32*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5) + 5/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3))*z3 - (269*z3^2)/128 + ln2*((-1)^HarmonicSums`Private`ExpVar* (736781/(26880*HarmonicSums`Private`ExpVar^10) + 359/(384*HarmonicSums`Private`ExpVar^9) - 4527/(1280*HarmonicSums`Private`ExpVar^8) + 31/(384*HarmonicSums`Private`ExpVar^7) + 181/(192*HarmonicSums`Private`ExpVar^6) - 17/(32*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) + z2*((-1)^HarmonicSums`Private`ExpVar* (-187/(16*HarmonicSums`Private`ExpVar^10) - 27/(4*HarmonicSums`Private`ExpVar^9) + 27/(16*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-7) - 7/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (21*z3)/16)) + sinf*(-5*li5half + ln2^5/24 + (7*ln2^3*z2)/12 - (11*ln2*z2^2)/8 + (21*ln2^2*z3)/16 + (27*z2*z3)/16 + (101*z5)/64), S[1, -2, -1, -1, 1, HarmonicSums`Private`ExpVar] :> -3*li6half + ln2^6/240 + (-1)^HarmonicSums`Private`ExpVar* (758563/(5644800*HarmonicSums`Private`ExpVar^10) + 1093/(180*HarmonicSums`Private`ExpVar^9) + 28399/(76800*HarmonicSums`Private`ExpVar^8) - 4417/(4608*HarmonicSums`Private`ExpVar^7) - 107/(1152*HarmonicSums`Private`ExpVar^6) + 21/(64*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) - 3*s6 - (5*ln2^4*z2)/24 + (-(li4half/2) - 1469/(9600*HarmonicSums`Private`ExpVar^10) + 7757/(151200*HarmonicSums`Private`ExpVar^9) + 509/(8064*HarmonicSums`Private`ExpVar^8) - 6227/(141120*HarmonicSums`Private`ExpVar^7) - 137/(2880*HarmonicSums`Private`ExpVar^6) + 223/(1800*HarmonicSums`Private`ExpVar^5) - 7/(48*HarmonicSums`Private`ExpVar^4) + 17/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (3*z2^3)/560 + ln2^2*(-li4half + 1469/(9600*HarmonicSums`Private`ExpVar^10) - 7757/(151200*HarmonicSums`Private`ExpVar^9) - 509/(8064*HarmonicSums`Private`ExpVar^8) + 6227/(141120*HarmonicSums`Private`ExpVar^7) + 137/(2880*HarmonicSums`Private`ExpVar^6) - 223/(1800*HarmonicSums`Private`ExpVar^5) + 7/(48*HarmonicSums`Private`ExpVar^4) - 17/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - (47*z2^2)/40) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-187/(48*HarmonicSums`Private`ExpVar^10) - 9/(4*HarmonicSums`Private`ExpVar^9) + 9/(16*HarmonicSums`Private`ExpVar^8) + 1/(3*HarmonicSums`Private`ExpVar^7) - 7/(48*HarmonicSums`Private`ExpVar^6) - 1/(12*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3)) + (7*z3)/8) + (-1)^HarmonicSums`Private`ExpVar* (1309/(32*HarmonicSums`Private`ExpVar^10) + 189/(8*HarmonicSums`Private`ExpVar^9) - 189/(32*HarmonicSums`Private`ExpVar^8) - 7/(2*HarmonicSums`Private`ExpVar^7) + 49/(32*HarmonicSums`Private`ExpVar^6) + 7/(8*HarmonicSums`Private`ExpVar^5) - 35/(32*HarmonicSums`Private`ExpVar^4) + 7/(16*HarmonicSums`Private`ExpVar^3))*z3 + (165*z3^2)/128 + ln2*(-6*li5half + z2*((-1)^HarmonicSums`Private`ExpVar* (-187/(16*HarmonicSums`Private`ExpVar^10) - 27/(4*HarmonicSums`Private`ExpVar^9) + 27/(16*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-7) - 7/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) - (21*z3)/16) + (93*z5)/8) + sinf*(-11*li5half - ln2^5/30 + (-1)^HarmonicSums`Private`ExpVar* (-736781/(26880*HarmonicSums`Private`ExpVar^10) - 359/(384*HarmonicSums`Private`ExpVar^9) + 4527/(1280*HarmonicSums`Private`ExpVar^8) - 31/(384*HarmonicSums`Private`ExpVar^7) - 181/(192*HarmonicSums`Private`ExpVar^6) + 17/(32*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) + (7*ln2^3*z2)/12 + ln2*(-3*li4half - (17*z2^2)/5) + (21*ln2^2*z3)/16 - (21*z2*z3)/16 + (845*z5)/64), S[1, -2, -1, 1, -1, HarmonicSums`Private`ExpVar] :> -9*li6half + (-1)^HarmonicSums`Private`ExpVar* (-8201/(1536*HarmonicSums`Private`ExpVar^10) + 1369/(768*HarmonicSums`Private`ExpVar^9) + 327/(512*HarmonicSums`Private`ExpVar^8) - 155/(256*HarmonicSums`Private`ExpVar^7) + 13/(64*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5)) + (-1)^HarmonicSums`Private`ExpVar* ln2^3*(-187/(48*HarmonicSums`Private`ExpVar^10) - 9/(4*HarmonicSums`Private`ExpVar^9) + 9/(16*HarmonicSums`Private`ExpVar^8) + 1/(3*HarmonicSums`Private`ExpVar^7) - 7/(48*HarmonicSums`Private`ExpVar^6) - 1/(12*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3)) - (15*s6)/2 - (ln2^4*z2)/48 + (16*z2^3)/35 + ln2^2*(-(li4half/2) - 1469/(9600*HarmonicSums`Private`ExpVar^10) + 7757/(151200*HarmonicSums`Private`ExpVar^9) + 509/(8064*HarmonicSums`Private`ExpVar^8) - 6227/(141120*HarmonicSums`Private`ExpVar^7) - 137/(2880*HarmonicSums`Private`ExpVar^6) + 223/(1800*HarmonicSums`Private`ExpVar^5) - 7/(48*HarmonicSums`Private`ExpVar^4) + 17/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (139*z2^2)/80) + (-1)^HarmonicSums`Private`ExpVar* (187/(64*HarmonicSums`Private`ExpVar^10) + 27/(16*HarmonicSums`Private`ExpVar^9) - 27/(64*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^7) + 7/(64*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^5) - 5/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3))*z3 + (45*z3^2)/16 + sinf*(-7*li5half + ln2^5/60 - (ln2^3*z2)/3 + ln2*(-li4half - 1469/(4800*HarmonicSums`Private`ExpVar^10) + 7757/(75600*HarmonicSums`Private`ExpVar^9) + 509/(4032*HarmonicSums`Private`ExpVar^8) - 6227/(70560*HarmonicSums`Private`ExpVar^7) - 137/(1440*HarmonicSums`Private`ExpVar^6) + 223/(900*HarmonicSums`Private`ExpVar^5) - 7/(24*HarmonicSums`Private`ExpVar^4) + 17/(72*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) - (87*z2^2)/40) + (221*z5)/32) + ln2*(-4*li5half + 4009037/(6048000*HarmonicSums`Private`ExpVar^10) + 2480873/(95256000*HarmonicSums`Private`ExpVar^9) - 412967/(1693440*HarmonicSums`Private`ExpVar^8) + 323657/(14817600*HarmonicSums`Private`ExpVar^7) + 14597/(86400*HarmonicSums`Private`ExpVar^6) - 32297/(216000*HarmonicSums`Private`ExpVar^5) + 7/(1152*HarmonicSums`Private`ExpVar^4) + 25/(216*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (187/(16*HarmonicSums`Private`ExpVar^10) + 27/(4*HarmonicSums`Private`ExpVar^9) - 27/(16*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-7) + 7/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 5/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*z2 + (465*z5)/64), S[1, -2, -1, 1, 1, HarmonicSums`Private`ExpVar] :> li6half + ln2^6/720 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (-187/(48*HarmonicSums`Private`ExpVar^10) - 9/(4*HarmonicSums`Private`ExpVar^9) + 9/(16*HarmonicSums`Private`ExpVar^8) + 1/(3*HarmonicSums`Private`ExpVar^7) - 7/(48*HarmonicSums`Private`ExpVar^6) - 1/(12*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3)) + 251470591/(635040000*HarmonicSums`Private`ExpVar^10) + 12916797337/(40007520000*HarmonicSums`Private`ExpVar^9) - 28680851/(237081600*HarmonicSums`Private`ExpVar^8) - 225667657/(1037232000*HarmonicSums`Private`ExpVar^7) + 251929/(864000*HarmonicSums`Private`ExpVar^6) - 431429/(2160000*HarmonicSums`Private`ExpVar^5) + 275/(2304*HarmonicSums`Private`ExpVar^4) - 89/(864*HarmonicSums`Private`ExpVar^3) + 3/(32*HarmonicSums`Private`ExpVar^2) - (15*s6)/4 + (1469/(9600*HarmonicSums`Private`ExpVar^10) - 7757/(151200*HarmonicSums`Private`ExpVar^9) - 509/(8064*HarmonicSums`Private`ExpVar^8) + 6227/(141120*HarmonicSums`Private`ExpVar^7) + 137/(2880*HarmonicSums`Private`ExpVar^6) - 223/(1800*HarmonicSums`Private`ExpVar^5) + 7/(48*HarmonicSums`Private`ExpVar^4) - 17/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*sinf^2 - (ln2^4*z2)/48 + (-1)^HarmonicSums`Private`ExpVar*ln2* (187/(16*HarmonicSums`Private`ExpVar^10) + 27/(4*HarmonicSums`Private`ExpVar^9) - 27/(16*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-7) + 7/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 5/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*z2 + (1469/(9600*HarmonicSums`Private`ExpVar^10) - 7757/(151200*HarmonicSums`Private`ExpVar^9) - 509/(8064*HarmonicSums`Private`ExpVar^8) + 6227/(141120*HarmonicSums`Private`ExpVar^7) + 137/(2880*HarmonicSums`Private`ExpVar^6) - 223/(1800*HarmonicSums`Private`ExpVar^5) + 7/(48*HarmonicSums`Private`ExpVar^4) - 17/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (43*ln2^2*z2^2)/80 + (6*z2^3)/35 + (-1)^HarmonicSums`Private`ExpVar* (-1309/(64*HarmonicSums`Private`ExpVar^10) - 189/(16*HarmonicSums`Private`ExpVar^9) + 189/(64*HarmonicSums`Private`ExpVar^8) + 7/(4*HarmonicSums`Private`ExpVar^7) - 49/(64*HarmonicSums`Private`ExpVar^6) - 7/(16*HarmonicSums`Private`ExpVar^5) + 35/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^3))*z3 + (131*z3^2)/128 + sinf*(-3*li5half + ln2^5/40 - 4009037/(6048000*HarmonicSums`Private`ExpVar^ 10) - 2480873/(95256000*HarmonicSums`Private`ExpVar^9) + 412967/(1693440*HarmonicSums`Private`ExpVar^8) - 323657/(14817600*HarmonicSums`Private`ExpVar^7) - 14597/(86400*HarmonicSums`Private`ExpVar^6) + 32297/(216000*HarmonicSums`Private`ExpVar^5) - 7/(1152*HarmonicSums`Private`ExpVar^4) - 25/(216*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + (9*ln2*z2^2)/40 + (21*z2*z3)/16 - (23*z5)/64), S[1, -2, 1, -1, -1, HarmonicSums`Private`ExpVar] :> (7*ln2^6)/240 + (-1)^HarmonicSums`Private`ExpVar* (69648211/(2822400*HarmonicSums`Private`ExpVar^10) + 19271/(11520*HarmonicSums`Private`ExpVar^9) - 241649/(76800*HarmonicSums`Private`ExpVar^8) - 1097/(4608*HarmonicSums`Private`ExpVar^7) + 1205/(1152*HarmonicSums`Private`ExpVar^6) - 35/(64*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* ln2^3*(187/(24*HarmonicSums`Private`ExpVar^10) + 9/(2*HarmonicSums`Private`ExpVar^9) - 9/(8*HarmonicSums`Private`ExpVar^8) - 2/(3*HarmonicSums`Private`ExpVar^7) + 7/(24*HarmonicSums`Private`ExpVar^6) + 1/(6*HarmonicSums`Private`ExpVar^5) - 5/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3)) + (3*s6)/4 - (ln2^4*z2)/24 + (-1)^HarmonicSums`Private`ExpVar*(-27/(4*HarmonicSums`Private`ExpVar^10) - 11/HarmonicSums`Private`ExpVar^9 + HarmonicSums`Private`ExpVar^(-8) + 11/(8*HarmonicSums`Private`ExpVar^7) - 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4))*z2 + (41*z2^3)/280 + ln2^2*((3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (-27/(4*HarmonicSums`Private`ExpVar^10) - 11/HarmonicSums`Private`ExpVar^9 + HarmonicSums`Private`ExpVar^(-8) + 11/(8*HarmonicSums`Private`ExpVar^7) - 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) + (11*z2^2)/16) + (-1)^HarmonicSums`Private`ExpVar* (-1309/(64*HarmonicSums`Private`ExpVar^10) - 189/(16*HarmonicSums`Private`ExpVar^9) + 189/(64*HarmonicSums`Private`ExpVar^8) + 7/(4*HarmonicSums`Private`ExpVar^7) - 49/(64*HarmonicSums`Private`ExpVar^6) - 7/(16*HarmonicSums`Private`ExpVar^5) + 35/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^3))*z3 - (9*z3^2)/32 + sinf*(7*li5half + ln2^5/15 + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (187/(16*HarmonicSums`Private`ExpVar^10) + 27/(4*HarmonicSums`Private`ExpVar^9) - 27/(16*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-7) + 7/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 5/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) - (11*ln2^3*z2)/12 + (-1)^HarmonicSums`Private`ExpVar* (187/(16*HarmonicSums`Private`ExpVar^10) + 27/(4*HarmonicSums`Private`ExpVar^9) - 27/(16*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-7) + 7/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 5/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*z2 + ln2*(3*li4half + (53*z2^2)/40) - (457*z5)/64) + ln2*(4*li5half + 331/(57600*HarmonicSums`Private`ExpVar^10) + 371131/(907200*HarmonicSums`Private`ExpVar^9) - 1387/(16128*HarmonicSums`Private`ExpVar^8) - 30311/(141120*HarmonicSums`Private`ExpVar^7) + 1603/(5760*HarmonicSums`Private`ExpVar^6) - 2863/(14400*HarmonicSums`Private`ExpVar^5) + 37/(384*HarmonicSums`Private`ExpVar^4) - 1/(36*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (187/(16*HarmonicSums`Private`ExpVar^10) + 27/(4*HarmonicSums`Private`ExpVar^9) - 27/(16*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-7) + 7/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 5/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*z2 - (341*z5)/64), S[1, -2, 1, -1, 1, HarmonicSums`Private`ExpVar] :> -2*li6half - ln2^6/360 + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (187/(24*HarmonicSums`Private`ExpVar^10) + 9/(2*HarmonicSums`Private`ExpVar^9) - 9/(8*HarmonicSums`Private`ExpVar^8) - 2/(3*HarmonicSums`Private`ExpVar^7) + 7/(24*HarmonicSums`Private`ExpVar^6) + 1/(6*HarmonicSums`Private`ExpVar^5) - 5/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3)) - 19280411/(36288000*HarmonicSums`Private`ExpVar^10) + 677462141/(1143072000*HarmonicSums`Private`ExpVar^9) + 380087/(6773760*HarmonicSums`Private`ExpVar^8) - 8272001/(29635200*HarmonicSums`Private`ExpVar^7) + 29879/(172800*HarmonicSums`Private`ExpVar^6) - 14479/(432000*HarmonicSums`Private`ExpVar^5) - 55/(2304*HarmonicSums`Private`ExpVar^4) + 1/(54*HarmonicSums`Private`ExpVar^3) + s6/4 + (ln2^4*z2)/24 + (-1)^HarmonicSums`Private`ExpVar*(27/(4*HarmonicSums`Private`ExpVar^10) + 11/HarmonicSums`Private`ExpVar^9 - HarmonicSums`Private`ExpVar^(-8) - 11/(8*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4))*z2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (-187/(16*HarmonicSums`Private`ExpVar^10) - 27/(4*HarmonicSums`Private`ExpVar^9) + 27/(16*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-7) - 7/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3))*z2 + (101*z2^3)/280 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-27/(4*HarmonicSums`Private`ExpVar^10) - 11/HarmonicSums`Private`ExpVar^9 + HarmonicSums`Private`ExpVar^(-8) + 11/(8*HarmonicSums`Private`ExpVar^7) - 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) - (41*z2^2)/80) + (-1)^HarmonicSums`Private`ExpVar* (187/(64*HarmonicSums`Private`ExpVar^10) + 27/(16*HarmonicSums`Private`ExpVar^9) - 27/(64*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^7) + 7/(64*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^5) - 5/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3))*z3 - (5*z3^2)/128 + sinf*(3*li5half - ln2^5/40 + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (187/(16*HarmonicSums`Private`ExpVar^10) + 27/(4*HarmonicSums`Private`ExpVar^9) - 27/(16*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-7) + 7/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 5/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) - 331/(57600*HarmonicSums`Private`ExpVar^10) - 371131/(907200*HarmonicSums`Private`ExpVar^9) + 1387/(16128*HarmonicSums`Private`ExpVar^8) + 30311/(141120*HarmonicSums`Private`ExpVar^7) - 1603/(5760*HarmonicSums`Private`ExpVar^6) + 2863/(14400*HarmonicSums`Private`ExpVar^5) - 37/(384*HarmonicSums`Private`ExpVar^4) + 1/(36*HarmonicSums`Private`ExpVar^3) - (ln2^3*z2)/4 + (9*ln2*z2^2)/10 + z2*((-1)^HarmonicSums`Private`ExpVar* (-187/(16*HarmonicSums`Private`ExpVar^10) - 27/(4*HarmonicSums`Private`ExpVar^9) + 27/(16*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-7) - 7/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) - (3*z3)/16) - (29*z5)/16), S[1, -2, 1, 1, -1, HarmonicSums`Private`ExpVar] :> ln2^6/48 - 406067/(460800*HarmonicSums`Private`ExpVar^10) - 370393/(14515200*HarmonicSums`Private`ExpVar^9) + 92833/(258048*HarmonicSums`Private`ExpVar^8) - 26633/(94080*HarmonicSums`Private`ExpVar^7) + 97/(720*HarmonicSums`Private`ExpVar^6) - 69/(1600*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) + (-1)^HarmonicSums`Private`ExpVar* ln2*(-187/(16*HarmonicSums`Private`ExpVar^10) - 27/(4*HarmonicSums`Private`ExpVar^9) + 27/(16*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-7) - 7/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3))*sinf^2 + (li4half*z2)/2 - (5*ln2^4*z2)/48 - (17*z2^3)/280 + ln2^2*(li4half/2 + (-1)^HarmonicSums`Private`ExpVar* (27/(4*HarmonicSums`Private`ExpVar^10) + 11/HarmonicSums`Private`ExpVar^9 - HarmonicSums`Private`ExpVar^(-8) - 11/(8*HarmonicSums`Private`ExpVar^7) + 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) - (3*z2^2)/20) + ln2*((-1)^HarmonicSums`Private`ExpVar* (754421/(26880*HarmonicSums`Private`ExpVar^10) - 5491/(384*HarmonicSums`Private`ExpVar^9) - 1901/(640*HarmonicSums`Private`ExpVar^8) + 311/(192*HarmonicSums`Private`ExpVar^7) + 59/(96*HarmonicSums`Private`ExpVar^6) - 9/(16*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) + z2*((-1)^HarmonicSums`Private`ExpVar* (-187/(16*HarmonicSums`Private`ExpVar^10) - 27/(4*HarmonicSums`Private`ExpVar^9) + 27/(16*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-7) - 7/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (7*z3)/16)) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-187/(48*HarmonicSums`Private`ExpVar^10) - 9/(4*HarmonicSums`Private`ExpVar^9) + 9/(16*HarmonicSums`Private`ExpVar^8) + 1/(3*HarmonicSums`Private`ExpVar^7) - 7/(48*HarmonicSums`Private`ExpVar^6) - 1/(12*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3)) + (7*z3)/24) - (49*z3^2)/128 + sinf*(-li5half + ln2^5/120 + (ln2^3*z2)/6 + ln2*((-1)^HarmonicSums`Private`ExpVar* (27/(2*HarmonicSums`Private`ExpVar^10) + 22/HarmonicSums`Private`ExpVar^9 - 2/HarmonicSums`Private`ExpVar^8 - 11/(4*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^6) + 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^4)) - z2^2/20) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-187/(16*HarmonicSums`Private`ExpVar^10) - 27/(4*HarmonicSums`Private`ExpVar^9) + 27/(16*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-7) - 7/(16*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 5/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (7*z3)/16) + (7*z2*z3)/16 + z5/8), S[1, -2, 1, 1, 1, HarmonicSums`Private`ExpVar] :> 2*li6half + ln2^6/36 + (-1)^HarmonicSums`Private`ExpVar* (371509/(11520*HarmonicSums`Private`ExpVar^10) - 7661/(5760*HarmonicSums`Private`ExpVar^9) - 3/HarmonicSums`Private`ExpVar^8 - 1/(24*HarmonicSums`Private`ExpVar^7) + 7/(12*HarmonicSums`Private`ExpVar^6) - 1/(6*HarmonicSums`Private`ExpVar^5)) + s6/2 + (-1)^HarmonicSums`Private`ExpVar*(-27/(4*HarmonicSums`Private`ExpVar^10) - 11/HarmonicSums`Private`ExpVar^9 + HarmonicSums`Private`ExpVar^(-8) + 11/(8*HarmonicSums`Private`ExpVar^7) - 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4))*sinf^2 + (-1)^HarmonicSums`Private`ExpVar* (187/(48*HarmonicSums`Private`ExpVar^10) + 9/(4*HarmonicSums`Private`ExpVar^9) - 9/(16*HarmonicSums`Private`ExpVar^8) - 1/(3*HarmonicSums`Private`ExpVar^7) + 7/(48*HarmonicSums`Private`ExpVar^6) + 1/(12*HarmonicSums`Private`ExpVar^5) - 5/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3))*sinf^3 - (7*ln2^4*z2)/48 + (-(li4half/2) + (-1)^HarmonicSums`Private`ExpVar* (-27/(4*HarmonicSums`Private`ExpVar^10) - 11/HarmonicSums`Private`ExpVar^9 + HarmonicSums`Private`ExpVar^(-8) + 11/(8*HarmonicSums`Private`ExpVar^7) - 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)))*z2 - (9*z2^3)/40 + ln2^2*(li4half + z2^2/8) + (7*ln2^3*z3)/24 + (-1)^HarmonicSums`Private`ExpVar* (187/(24*HarmonicSums`Private`ExpVar^10) + 9/(2*HarmonicSums`Private`ExpVar^9) - 9/(8*HarmonicSums`Private`ExpVar^8) - 2/(3*HarmonicSums`Private`ExpVar^7) + 7/(24*HarmonicSums`Private`ExpVar^6) + 1/(6*HarmonicSums`Private`ExpVar^5) - 5/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3))*z3 - (17*z3^2)/128 + ln2*(2*li5half - (7*z2*z3)/16 - (31*z5)/32) + sinf*(li5half + li4half*ln2 + ln2^5/30 + (-1)^HarmonicSums`Private`ExpVar* (-754421/(26880*HarmonicSums`Private`ExpVar^10) + 5491/(384*HarmonicSums`Private`ExpVar^9) + 1901/(640*HarmonicSums`Private`ExpVar^8) - 311/(192*HarmonicSums`Private`ExpVar^7) - 59/(96*HarmonicSums`Private`ExpVar^6) + 9/(16*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) - (ln2^3*z2)/6 + z2*((-1)^HarmonicSums`Private`ExpVar* (187/(16*HarmonicSums`Private`ExpVar^10) + 27/(4*HarmonicSums`Private`ExpVar^9) - 27/(16*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-7) + 7/(16*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 5/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) - (7*z3)/16) + (7*ln2^2*z3)/16 - (27*z5)/32), S[1, 2, -1, -1, -1, HarmonicSums`Private`ExpVar] :> -3*li6half + ln2^6/40 + (-1)^HarmonicSums`Private`ExpVar* (-22553/(2560*HarmonicSums`Private`ExpVar^10) + 17273/(3840*HarmonicSums`Private`ExpVar^9) + 551/(768*HarmonicSums`Private`ExpVar^8) - 103/(96*HarmonicSums`Private`ExpVar^7) + 25/(64*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5)) + (3*s6)/4 + (ln2^4*z2)/48 + (-1)^HarmonicSums`Private`ExpVar* (1011/(64*HarmonicSums`Private`ExpVar^10) - 3/(4*HarmonicSums`Private`ExpVar^9) - 243/(128*HarmonicSums`Private`ExpVar^8) + 19/(64*HarmonicSums`Private`ExpVar^7) + 3/(8*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4))*z2 + (34*z2^3)/35 + ln2^2*((3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (1011/(64*HarmonicSums`Private`ExpVar^10) - 3/(4*HarmonicSums`Private`ExpVar^9) - 243/(128*HarmonicSums`Private`ExpVar^8) + 19/(64*HarmonicSums`Private`ExpVar^7) + 3/(8*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)) + (53*z2^2)/40) + ln2^3*(-11/(720*HarmonicSums`Private`ExpVar^10) - 11/(2100*HarmonicSums`Private`ExpVar^9) + 1/(112*HarmonicSums`Private`ExpVar^8) + 19/(6615*HarmonicSums`Private`ExpVar^7) - 7/(720*HarmonicSums`Private`ExpVar^6) - 7/(2700*HarmonicSums`Private`ExpVar^5) + 5/(144*HarmonicSums`Private`ExpVar^4) - 17/(216*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar) - (7*z3)/24) + (-11/(480*HarmonicSums`Private`ExpVar^10) - 11/(1400*HarmonicSums`Private`ExpVar^9) + 3/(224*HarmonicSums`Private`ExpVar^8) + 19/(4410*HarmonicSums`Private`ExpVar^7) - 7/(480*HarmonicSums`Private`ExpVar^6) - 7/(1800*HarmonicSums`Private`ExpVar^5) + 5/(96*HarmonicSums`Private`ExpVar^4) - 17/(144*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z3 - (25*z3^2)/64 + sinf*(8*li5half + (7*ln2^5)/120 - (13*ln2^3*z2)/12 + ln2*(3*li4half + (11*z2^2)/8) - (3*z2*z3)/8 - (61*z5)/8) + ln2*(4*li5half + 574577/(4032000*HarmonicSums`Private`ExpVar^10) + 63649/(604800*HarmonicSums`Private`ExpVar^9) - 26899/(241920*HarmonicSums`Private`ExpVar^8) - 18629/(282240*HarmonicSums`Private`ExpVar^7) + 1109/(4320*HarmonicSums`Private`ExpVar^6) - 567/(1600*HarmonicSums`Private`ExpVar^5) + 131/(384*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + z2*(-11/(240*HarmonicSums`Private`ExpVar^10) - 11/(700*HarmonicSums`Private`ExpVar^9) + 3/(112*HarmonicSums`Private`ExpVar^8) + 19/(2205*HarmonicSums`Private`ExpVar^7) - 7/(240*HarmonicSums`Private`ExpVar^6) - 7/(900*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^4) - 17/(72*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) - (7*z3)/8) - (93*z5)/16), S[1, 2, -1, -1, 1, HarmonicSums`Private`ExpVar] :> -5*li6half - ln2^6/144 - 384339847/(3386880000*HarmonicSums`Private`ExpVar^ 10) + 133991621/(508032000*HarmonicSums`Private`ExpVar^9) + 3048107/(203212800*HarmonicSums`Private`ExpVar^8) - 22610551/(118540800*HarmonicSums`Private`ExpVar^7) + 20699/(207360*HarmonicSums`Private`ExpVar^6) + 18857/(144000*HarmonicSums`Private`ExpVar^5) - 371/(1152*HarmonicSums`Private`ExpVar^4) + 53/(144*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + (5*ln2^4*z2)/48 + (-1)^HarmonicSums`Private`ExpVar* (-1011/(64*HarmonicSums`Private`ExpVar^10) + 3/(4*HarmonicSums`Private`ExpVar^9) + 243/(128*HarmonicSums`Private`ExpVar^8) - 19/(64*HarmonicSums`Private`ExpVar^7) - 3/(8*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4))*z2 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (1011/(64*HarmonicSums`Private`ExpVar^10) - 3/(4*HarmonicSums`Private`ExpVar^9) - 243/(128*HarmonicSums`Private`ExpVar^8) + 19/(64*HarmonicSums`Private`ExpVar^7) + 3/(8*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)) + z2^2/8) + ln2*z2*(-11/(240*HarmonicSums`Private`ExpVar^10) - 11/(700*HarmonicSums`Private`ExpVar^9) + 3/(112*HarmonicSums`Private`ExpVar^8) + 19/(2205*HarmonicSums`Private`ExpVar^7) - 7/(240*HarmonicSums`Private`ExpVar^6) - 7/(900*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^4) - 17/(72*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) - (7*z3)/8) + ln2^3*(-11/(720*HarmonicSums`Private`ExpVar^10) - 11/(2100*HarmonicSums`Private`ExpVar^9) + 1/(112*HarmonicSums`Private`ExpVar^8) + 19/(6615*HarmonicSums`Private`ExpVar^7) - 7/(720*HarmonicSums`Private`ExpVar^6) - 7/(2700*HarmonicSums`Private`ExpVar^5) + 5/(144*HarmonicSums`Private`ExpVar^4) - 17/(216*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar) - (7*z3)/24) + (77/(480*HarmonicSums`Private`ExpVar^10) + 11/(200*HarmonicSums`Private`ExpVar^9) - 3/(32*HarmonicSums`Private`ExpVar^8) - 19/(630*HarmonicSums`Private`ExpVar^7) + 49/(480*HarmonicSums`Private`ExpVar^6) + 49/(1800*HarmonicSums`Private`ExpVar^5) - 35/(96*HarmonicSums`Private`ExpVar^4) + 119/(144*HarmonicSums`Private`ExpVar^3) - 21/(16*HarmonicSums`Private`ExpVar^2) + 7/(4*HarmonicSums`Private`ExpVar))*z3 + (49*z3^2)/32 + sinf*(4*li5half - ln2^5/30 - 574577/(4032000*HarmonicSums`Private`ExpVar^ 10) - 63649/(604800*HarmonicSums`Private`ExpVar^9) + 26899/(241920*HarmonicSums`Private`ExpVar^8) + 18629/(282240*HarmonicSums`Private`ExpVar^7) - 1109/(4320*HarmonicSums`Private`ExpVar^6) + 567/(1600*HarmonicSums`Private`ExpVar^5) - 131/(384*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) - (5*ln2^3*z2)/12 + (19*ln2*z2^2)/20 - (29*z5)/16), S[1, 2, -1, 1, -1, HarmonicSums`Private`ExpVar] :> li6half - (11*ln2^6)/180 - 260713/(691200*HarmonicSums`Private`ExpVar^10) + 3052751/(43545600*HarmonicSums`Private`ExpVar^9) + 52225/(258048*HarmonicSums`Private`ExpVar^8) - 153073/(564480*HarmonicSums`Private`ExpVar^7) + 2437/(11520*HarmonicSums`Private`ExpVar^6) - 1751/(14400*HarmonicSums`Private`ExpVar^5) + 5/(96*HarmonicSums`Private`ExpVar^4) - 1/(72*HarmonicSums`Private`ExpVar^3) - s6 - (3*li4half*z2)/2 + (7*ln2^4*z2)/24 - (163*z2^3)/560 + ln2^2*((-3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (-1011/(64*HarmonicSums`Private`ExpVar^10) + 3/(4*HarmonicSums`Private`ExpVar^9) + 243/(128*HarmonicSums`Private`ExpVar^8) - 19/(64*HarmonicSums`Private`ExpVar^7) - 3/(8*HarmonicSums`Private`ExpVar^6) + 1/(4*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4)) + (79*z2^2)/80) + ln2*((-1)^HarmonicSums`Private`ExpVar* (9813/(256*HarmonicSums`Private`ExpVar^10) + 547/(128*HarmonicSums`Private`ExpVar^9) - 261/(64*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^7) + 11/(16*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5)) + z2*(11/(240*HarmonicSums`Private`ExpVar^10) + 11/(700*HarmonicSums`Private`ExpVar^9) - 3/(112*HarmonicSums`Private`ExpVar^8) - 19/(2205*HarmonicSums`Private`ExpVar^7) + 7/(240*HarmonicSums`Private`ExpVar^6) + 7/(900*HarmonicSums`Private`ExpVar^5) - 5/(48*HarmonicSums`Private`ExpVar^4) + 17/(72*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) - (7*z3)/16)) + ln2^3*(-11/(720*HarmonicSums`Private`ExpVar^10) - 11/(2100*HarmonicSums`Private`ExpVar^9) + 1/(112*HarmonicSums`Private`ExpVar^8) + 19/(6615*HarmonicSums`Private`ExpVar^7) - 7/(720*HarmonicSums`Private`ExpVar^6) - 7/(2700*HarmonicSums`Private`ExpVar^5) + 5/(144*HarmonicSums`Private`ExpVar^4) - 17/(216*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar) - (7*z3)/6) + (11/(960*HarmonicSums`Private`ExpVar^10) + 11/(2800*HarmonicSums`Private`ExpVar^9) - 3/(448*HarmonicSums`Private`ExpVar^8) - 19/(8820*HarmonicSums`Private`ExpVar^7) + 7/(960*HarmonicSums`Private`ExpVar^6) + 7/(3600*HarmonicSums`Private`ExpVar^5) - 5/(192*HarmonicSums`Private`ExpVar^4) + 17/(288*HarmonicSums`Private`ExpVar^3) - 3/(32*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z3 + (209*z3^2)/128 + sinf*(4*li5half - ln2^5/30 + (ln2^3*z2)/3 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-1011/(32*HarmonicSums`Private`ExpVar^10) + 3/(2*HarmonicSums`Private`ExpVar^9) + 243/(64*HarmonicSums`Private`ExpVar^8) - 19/(32*HarmonicSums`Private`ExpVar^7) - 3/(4*HarmonicSums`Private`ExpVar^6) + 1/(2*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) + (83*z2^2)/40) - (21*ln2^2*z3)/16 - (21*z2*z3)/16 - (85*z5)/64), S[1, 2, -1, 1, 1, HarmonicSums`Private`ExpVar] :> 3*li6half - (13*ln2^6)/240 + (-1)^HarmonicSums`Private`ExpVar* (7513/(640*HarmonicSums`Private`ExpVar^10) + 15889/(1920*HarmonicSums`Private`ExpVar^9) - 473/(384*HarmonicSums`Private`ExpVar^8) - 25/(24*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5)) + (9*s6)/4 + (-1)^HarmonicSums`Private`ExpVar* (1011/(64*HarmonicSums`Private`ExpVar^10) - 3/(4*HarmonicSums`Private`ExpVar^9) - 243/(128*HarmonicSums`Private`ExpVar^8) + 19/(64*HarmonicSums`Private`ExpVar^7) + 3/(8*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4))*sinf^2 + (5*ln2^4*z2)/12 + ((3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (1011/(64*HarmonicSums`Private`ExpVar^10) - 3/(4*HarmonicSums`Private`ExpVar^9) - 243/(128*HarmonicSums`Private`ExpVar^8) + 19/(64*HarmonicSums`Private`ExpVar^7) + 3/(8*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)))*z2 - (173*z2^3)/560 + ln2^2*(-li4half + (21*z2^2)/80) + ln2^3*(-11/(720*HarmonicSums`Private`ExpVar^10) - 11/(2100*HarmonicSums`Private`ExpVar^9) + 1/(112*HarmonicSums`Private`ExpVar^8) + 19/(6615*HarmonicSums`Private`ExpVar^7) - 7/(720*HarmonicSums`Private`ExpVar^6) - 7/(2700*HarmonicSums`Private`ExpVar^5) + 5/(144*HarmonicSums`Private`ExpVar^4) - 17/(216*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar) - (7*z3)/6) + (-77/(960*HarmonicSums`Private`ExpVar^10) - 11/(400*HarmonicSums`Private`ExpVar^9) + 3/(64*HarmonicSums`Private`ExpVar^8) + 19/(1260*HarmonicSums`Private`ExpVar^7) - 49/(960*HarmonicSums`Private`ExpVar^6) - 49/(3600*HarmonicSums`Private`ExpVar^5) + 35/(192*HarmonicSums`Private`ExpVar^4) - 119/(288*HarmonicSums`Private`ExpVar^3) + 21/(32*HarmonicSums`Private`ExpVar^2) - 7/(8*HarmonicSums`Private`ExpVar))*z3 - (89*z3^2)/64 + sinf*(6*li5half - ln2^5/120 + (-1)^HarmonicSums`Private`ExpVar* (-9813/(256*HarmonicSums`Private`ExpVar^10) - 547/(128*HarmonicSums`Private`ExpVar^9) + 261/(64*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^7) - 11/(16*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5)) + ln2*(li4half + (17*z2^2)/8) - (21*ln2^2*z3)/16 - (61*z5)/8) + ln2*(2*li5half + z2*(11/(240*HarmonicSums`Private`ExpVar^10) + 11/(700*HarmonicSums`Private`ExpVar^9) - 3/(112*HarmonicSums`Private`ExpVar^8) - 19/(2205*HarmonicSums`Private`ExpVar^7) + 7/(240*HarmonicSums`Private`ExpVar^6) + 7/(900*HarmonicSums`Private`ExpVar^5) - 5/(48*HarmonicSums`Private`ExpVar^4) + 17/(72*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) + (35*z3)/16) - (403*z5)/64), S[1, 2, 1, -1, -1, HarmonicSums`Private`ExpVar] :> 10*li6half - (7*ln2^6)/144 - 50002763/(1128960000*HarmonicSums`Private`ExpVar^10) + 13237151/(152409600*HarmonicSums`Private`ExpVar^9) + 14092861/(406425600*HarmonicSums`Private`ExpVar^8) - 3813709/(16934400*HarmonicSums`Private`ExpVar^7) + 385369/(1036800*HarmonicSums`Private`ExpVar^6) - 94/(225*HarmonicSums`Private`ExpVar^5) + 847/(2304*HarmonicSums`Private`ExpVar^4) - 37/(144*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + (15*s6)/4 + (5*ln2^4*z2)/48 + ((-3*li4half)/2 - 11/(700*HarmonicSums`Private`ExpVar^10) - 27169/(496125*HarmonicSums`Private`ExpVar^9) + 19/(2205*HarmonicSums`Private`ExpVar^8) + 62521/(1852200*HarmonicSums`Private`ExpVar^7) - 7/(900*HarmonicSums`Private`ExpVar^6) - 533/(13500*HarmonicSums`Private`ExpVar^5) + 1/(72*HarmonicSums`Private`ExpVar^4) + 17/(108*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1))* z2 - (48*z2^3)/35 + ln2^2*((-3*li4half)/2 - 11/(700*HarmonicSums`Private`ExpVar^10) - 27169/(496125*HarmonicSums`Private`ExpVar^9) + 19/(2205*HarmonicSums`Private`ExpVar^8) + 62521/(1852200*HarmonicSums`Private`ExpVar^7) - 7/(900*HarmonicSums`Private`ExpVar^6) - 533/(13500*HarmonicSums`Private`ExpVar^5) + 1/(72*HarmonicSums`Private`ExpVar^4) + 17/(108*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1) - (119*z2^2)/80) + ln2*((-1)^HarmonicSums`Private`ExpVar* (-1683/(256*HarmonicSums`Private`ExpVar^10) + 675/(128*HarmonicSums`Private`ExpVar^9) + 3/(16*HarmonicSums`Private`ExpVar^8) - 15/(16*HarmonicSums`Private`ExpVar^7) + 3/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5)) + z2*(11/(240*HarmonicSums`Private`ExpVar^10) + 11/(700*HarmonicSums`Private`ExpVar^9) - 3/(112*HarmonicSums`Private`ExpVar^8) - 19/(2205*HarmonicSums`Private`ExpVar^7) + 7/(240*HarmonicSums`Private`ExpVar^6) + 7/(900*HarmonicSums`Private`ExpVar^5) - 5/(48*HarmonicSums`Private`ExpVar^4) + 17/(72*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) - (7*z3)/16)) + ln2^3*(11/(360*HarmonicSums`Private`ExpVar^10) + 11/(1050*HarmonicSums`Private`ExpVar^9) - 1/(56*HarmonicSums`Private`ExpVar^8) - 38/(6615*HarmonicSums`Private`ExpVar^7) + 7/(360*HarmonicSums`Private`ExpVar^6) + 7/(1350*HarmonicSums`Private`ExpVar^5) - 5/(72*HarmonicSums`Private`ExpVar^4) + 17/(108*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(3*HarmonicSums`Private`ExpVar) - (7*z3)/24) + (-77/(960*HarmonicSums`Private`ExpVar^10) - 11/(400*HarmonicSums`Private`ExpVar^9) + 3/(64*HarmonicSums`Private`ExpVar^8) + 19/(1260*HarmonicSums`Private`ExpVar^7) - 49/(960*HarmonicSums`Private`ExpVar^6) - 49/(3600*HarmonicSums`Private`ExpVar^5) + 35/(192*HarmonicSums`Private`ExpVar^4) - 119/(288*HarmonicSums`Private`ExpVar^3) + 21/(32*HarmonicSums`Private`ExpVar^2) - 7/(8*HarmonicSums`Private`ExpVar))*z3 - (131*z3^2)/128 + sinf*(2*li5half - ln2^5/60 + (11*ln2^3*z2)/12 + (49*ln2*z2^2)/40 + ln2^2*(11/(240*HarmonicSums`Private`ExpVar^10) + 11/(700*HarmonicSums`Private`ExpVar^9) - 3/(112*HarmonicSums`Private`ExpVar^8) - 19/(2205*HarmonicSums`Private`ExpVar^7) + 7/(240*HarmonicSums`Private`ExpVar^6) + 7/(900*HarmonicSums`Private`ExpVar^5) - 5/(48*HarmonicSums`Private`ExpVar^4) + 17/(72*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) - (7*z3)/16) + z2*(11/(240*HarmonicSums`Private`ExpVar^10) + 11/(700*HarmonicSums`Private`ExpVar^9) - 3/(112*HarmonicSums`Private`ExpVar^8) - 19/(2205*HarmonicSums`Private`ExpVar^7) + 7/(240*HarmonicSums`Private`ExpVar^6) + 7/(900*HarmonicSums`Private`ExpVar^5) - 5/(48*HarmonicSums`Private`ExpVar^4) + 17/(72*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) - (7*z3)/16) - (23*z5)/64), S[1, 2, 1, -1, 1, HarmonicSums`Private`ExpVar] :> (-3*ln2^6)/40 + (-1)^HarmonicSums`Private`ExpVar* (-4009/(256*HarmonicSums`Private`ExpVar^10) + 513/(128*HarmonicSums`Private`ExpVar^9) + 71/(64*HarmonicSums`Private`ExpVar^8) - 23/(32*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6)) + (15*s6)/4 + (5*ln2^4*z2)/16 + ((3*li4half)/2 + 11/(700*HarmonicSums`Private`ExpVar^10) + 27169/(496125*HarmonicSums`Private`ExpVar^9) - 19/(2205*HarmonicSums`Private`ExpVar^8) - 62521/(1852200*HarmonicSums`Private`ExpVar^7) + 7/(900*HarmonicSums`Private`ExpVar^6) + 533/(13500*HarmonicSums`Private`ExpVar^5) - 1/(72*HarmonicSums`Private`ExpVar^4) - 17/(108*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1))* z2 + (4*z2^3)/5 + ln2^2*(-3*li4half - 11/(700*HarmonicSums`Private`ExpVar^10) - 27169/(496125*HarmonicSums`Private`ExpVar^9) + 19/(2205*HarmonicSums`Private`ExpVar^8) + 62521/(1852200*HarmonicSums`Private`ExpVar^7) - 7/(900*HarmonicSums`Private`ExpVar^6) - 533/(13500*HarmonicSums`Private`ExpVar^5) + 1/(72*HarmonicSums`Private`ExpVar^4) + 17/(108*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1) - (177*z2^2)/80) + ln2^3*(11/(360*HarmonicSums`Private`ExpVar^10) + 11/(1050*HarmonicSums`Private`ExpVar^9) - 1/(56*HarmonicSums`Private`ExpVar^8) - 38/(6615*HarmonicSums`Private`ExpVar^7) + 7/(360*HarmonicSums`Private`ExpVar^6) + 7/(1350*HarmonicSums`Private`ExpVar^5) - 5/(72*HarmonicSums`Private`ExpVar^4) + 17/(108*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(3*HarmonicSums`Private`ExpVar) - (7*z3)/24) + (11/(960*HarmonicSums`Private`ExpVar^10) + 11/(2800*HarmonicSums`Private`ExpVar^9) - 3/(448*HarmonicSums`Private`ExpVar^8) - 19/(8820*HarmonicSums`Private`ExpVar^7) + 7/(960*HarmonicSums`Private`ExpVar^6) + 7/(3600*HarmonicSums`Private`ExpVar^5) - 5/(192*HarmonicSums`Private`ExpVar^4) + 17/(288*HarmonicSums`Private`ExpVar^3) - 3/(32*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z3 - (97*z3^2)/64 + sinf*(-4*li5half - (11*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar* (1683/(256*HarmonicSums`Private`ExpVar^10) - 675/(128*HarmonicSums`Private`ExpVar^9) - 3/(16*HarmonicSums`Private`ExpVar^8) + 15/(16*HarmonicSums`Private`ExpVar^7) - 3/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^5)) + (11*ln2^3*z2)/12 + ln2*(-3*li4half - (4*z2^2)/5) + ln2^2*(11/(240*HarmonicSums`Private`ExpVar^10) + 11/(700*HarmonicSums`Private`ExpVar^9) - 3/(112*HarmonicSums`Private`ExpVar^8) - 19/(2205*HarmonicSums`Private`ExpVar^7) + 7/(240*HarmonicSums`Private`ExpVar^6) + 7/(900*HarmonicSums`Private`ExpVar^5) - 5/(48*HarmonicSums`Private`ExpVar^4) + 17/(72*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) - (7*z3)/16) + z2*(-11/(240*HarmonicSums`Private`ExpVar^10) - 11/(700*HarmonicSums`Private`ExpVar^9) + 3/(112*HarmonicSums`Private`ExpVar^8) + 19/(2205*HarmonicSums`Private`ExpVar^7) - 7/(240*HarmonicSums`Private`ExpVar^6) - 7/(900*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^4) - 17/(72*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) + (5*z3)/8) + (35*z5)/32) + ln2*(-6*li5half + z2*(-11/(240*HarmonicSums`Private`ExpVar^10) - 11/(700*HarmonicSums`Private`ExpVar^9) + 3/(112*HarmonicSums`Private`ExpVar^8) + 19/(2205*HarmonicSums`Private`ExpVar^7) - 7/(240*HarmonicSums`Private`ExpVar^6) - 7/(900*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^4) - 17/(72*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) + (7*z3)/16) + (93*z5)/64), S[1, 2, 1, 1, -1, HarmonicSums`Private`ExpVar] :> -10*li6half - ln2^6/720 + (-1)^HarmonicSums`Private`ExpVar* (-1335/(256*HarmonicSums`Private`ExpVar^10) - 79/(64*HarmonicSums`Private`ExpVar^9) + HarmonicSums`Private`ExpVar^ (-8) - 17/(64*HarmonicSums`Private`ExpVar^7) + 1/(32*HarmonicSums`Private`ExpVar^6)) + ln2^3*(-11/(720*HarmonicSums`Private`ExpVar^10) - 11/(2100*HarmonicSums`Private`ExpVar^9) + 1/(112*HarmonicSums`Private`ExpVar^8) + 19/(6615*HarmonicSums`Private`ExpVar^7) - 7/(720*HarmonicSums`Private`ExpVar^6) - 7/(2700*HarmonicSums`Private`ExpVar^5) + 5/(144*HarmonicSums`Private`ExpVar^4) - 17/(216*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar)) + ln2*(-11/(240*HarmonicSums`Private`ExpVar^10) - 11/(700*HarmonicSums`Private`ExpVar^9) + 3/(112*HarmonicSums`Private`ExpVar^8) + 19/(2205*HarmonicSums`Private`ExpVar^7) - 7/(240*HarmonicSums`Private`ExpVar^6) - 7/(900*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^4) - 17/(72*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))* sinf^2 + (16*z2^3)/7 + ln2*(-4*li5half + 810617/(5292000*HarmonicSums`Private`ExpVar^10) - 79085171/(1666980000*HarmonicSums`Private`ExpVar^9) - 4924987/(59270400*HarmonicSums`Private`ExpVar^8) + 13169747/(518616000*HarmonicSums`Private`ExpVar^7) + 57841/(432000*HarmonicSums`Private`ExpVar^6) - 295541/(1080000*HarmonicSums`Private`ExpVar^5) + 491/(1152*HarmonicSums`Private`ExpVar^4) - 335/(432*HarmonicSums`Private`ExpVar^3) + 25/(16*HarmonicSums`Private`ExpVar^2) - 3/HarmonicSums`Private`ExpVar + (-11/(240*HarmonicSums`Private`ExpVar^10) - 11/(700*HarmonicSums`Private`ExpVar^9) + 3/(112*HarmonicSums`Private`ExpVar^8) + 19/(2205*HarmonicSums`Private`ExpVar^7) - 7/(240*HarmonicSums`Private`ExpVar^6) - 7/(900*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^4) - 17/(72*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2) + ln2^2*(-(li4half/2) + 11/(700*HarmonicSums`Private`ExpVar^10) + 27169/(496125*HarmonicSums`Private`ExpVar^9) - 19/(2205*HarmonicSums`Private`ExpVar^8) - 62521/(1852200*HarmonicSums`Private`ExpVar^7) + 7/(900*HarmonicSums`Private`ExpVar^6) + 533/(13500*HarmonicSums`Private`ExpVar^5) - 1/(72*HarmonicSums`Private`ExpVar^4) - 17/(108*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1) + (6*z2^2)/5) + sinf*(-4*li5half - ln2^5/120 + ln2^2*(-11/(240*HarmonicSums`Private`ExpVar^10) - 11/(700*HarmonicSums`Private`ExpVar^9) + 3/(112*HarmonicSums`Private`ExpVar^8) + 19/(2205*HarmonicSums`Private`ExpVar^7) - 7/(240*HarmonicSums`Private`ExpVar^6) - 7/(900*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^4) - 17/(72*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) - (ln2^3*z2)/3 + ln2*(-li4half + 11/(350*HarmonicSums`Private`ExpVar^10) + 54338/(496125*HarmonicSums`Private`ExpVar^9) - 38/(2205*HarmonicSums`Private`ExpVar^8) - 62521/(926100*HarmonicSums`Private`ExpVar^7) + 7/(450*HarmonicSums`Private`ExpVar^6) + 533/(6750*HarmonicSums`Private`ExpVar^5) - 1/(36*HarmonicSums`Private`ExpVar^4) - 17/(54*HarmonicSums`Private`ExpVar^3) + HarmonicSums`Private`ExpVar^ (-2) - 2/HarmonicSums`Private`ExpVar - (12*z2^2)/5) + 4*z5), S[1, 2, 1, 1, 1, HarmonicSums`Private`ExpVar] :> 8984279099/(80015040000*HarmonicSums`Private`ExpVar^10) + 1003487045861/(12602368800000*HarmonicSums`Private`ExpVar^9) - 439531697/(8297856000*HarmonicSums`Private`ExpVar^8) - 37018569521/(326728080000*HarmonicSums`Private`ExpVar^7) + 2719297/(12960000*HarmonicSums`Private`ExpVar^6) - 11161891/(97200000*HarmonicSums`Private`ExpVar^5) - 4651/(20736*HarmonicSums`Private`ExpVar^4) + 3467/(3888*HarmonicSums`Private`ExpVar^3) - 33/(16*HarmonicSums`Private`ExpVar^2) + 4/HarmonicSums`Private`ExpVar + (-11/(700*HarmonicSums`Private`ExpVar^10) - 27169/(496125*HarmonicSums`Private`ExpVar^9) + 19/(2205*HarmonicSums`Private`ExpVar^8) + 62521/(1852200*HarmonicSums`Private`ExpVar^7) - 7/(900*HarmonicSums`Private`ExpVar^6) - 533/(13500*HarmonicSums`Private`ExpVar^5) + 1/(72*HarmonicSums`Private`ExpVar^4) + 17/(108*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1))* sinf^2 + (11/(720*HarmonicSums`Private`ExpVar^10) + 11/(2100*HarmonicSums`Private`ExpVar^9) - 1/(112*HarmonicSums`Private`ExpVar^8) - 19/(6615*HarmonicSums`Private`ExpVar^7) + 7/(720*HarmonicSums`Private`ExpVar^6) + 7/(2700*HarmonicSums`Private`ExpVar^5) - 5/(144*HarmonicSums`Private`ExpVar^4) + 17/(216*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar))* sinf^3 + (-11/(700*HarmonicSums`Private`ExpVar^10) - 27169/(496125*HarmonicSums`Private`ExpVar^9) + 19/(2205*HarmonicSums`Private`ExpVar^8) + 62521/(1852200*HarmonicSums`Private`ExpVar^7) - 7/(900*HarmonicSums`Private`ExpVar^6) - 533/(13500*HarmonicSums`Private`ExpVar^5) + 1/(72*HarmonicSums`Private`ExpVar^4) + 17/(108*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1))* z2 - (16*z2^3)/7 + (11/(360*HarmonicSums`Private`ExpVar^10) + 11/(1050*HarmonicSums`Private`ExpVar^9) - 1/(56*HarmonicSums`Private`ExpVar^8) - 38/(6615*HarmonicSums`Private`ExpVar^7) + 7/(360*HarmonicSums`Private`ExpVar^6) + 7/(1350*HarmonicSums`Private`ExpVar^5) - 5/(72*HarmonicSums`Private`ExpVar^4) + 17/(108*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(3*HarmonicSums`Private`ExpVar))* z3 + sinf*(-810617/(5292000*HarmonicSums`Private`ExpVar^10) + 79085171/(1666980000*HarmonicSums`Private`ExpVar^9) + 4924987/(59270400*HarmonicSums`Private`ExpVar^8) - 13169747/(518616000*HarmonicSums`Private`ExpVar^7) - 57841/(432000*HarmonicSums`Private`ExpVar^6) + 295541/(1080000*HarmonicSums`Private`ExpVar^5) - 491/(1152*HarmonicSums`Private`ExpVar^4) + 335/(432*HarmonicSums`Private`ExpVar^3) - 25/(16*HarmonicSums`Private`ExpVar^2) + 3/HarmonicSums`Private`ExpVar + (11/(240*HarmonicSums`Private`ExpVar^10) + 11/(700*HarmonicSums`Private`ExpVar^9) - 3/(112*HarmonicSums`Private`ExpVar^8) - 19/(2205*HarmonicSums`Private`ExpVar^7) + 7/(240*HarmonicSums`Private`ExpVar^6) + 7/(900*HarmonicSums`Private`ExpVar^5) - 5/(48*HarmonicSums`Private`ExpVar^4) + 17/(72*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 + 4*z5), S[1, -1, -2, -1, -1, HarmonicSums`Private`ExpVar] :> -30*li6half + ln2^6/48 + (-1)^HarmonicSums`Private`ExpVar*li4half* (1185/(16*HarmonicSums`Private`ExpVar^10) - 153/(8*HarmonicSums`Private`ExpVar^9) - 147/(16*HarmonicSums`Private`ExpVar^8) + 7/(2*HarmonicSums`Private`ExpVar^7) + 15/(8*HarmonicSums`Private`ExpVar^6) - 5/(4*HarmonicSums`Private`ExpVar^5) - 3/(4*HarmonicSums`Private`ExpVar^4) + 3/(2*HarmonicSums`Private`ExpVar^3) - HarmonicSums`Private`ExpVar^ (-2)) - 2589683/(48384000*HarmonicSums`Private`ExpVar^10) + 22947151/(43545600*HarmonicSums`Private`ExpVar^9) + 118541/(3870720*HarmonicSums`Private`ExpVar^8) - 76879/(188160*HarmonicSums`Private`ExpVar^7) + 443/(1080*HarmonicSums`Private`ExpVar^6) - 7277/(28800*HarmonicSums`Private`ExpVar^5) + 83/(768*HarmonicSums`Private`ExpVar^4) - 1/(36*HarmonicSums`Private`ExpVar^3) - (31*s6)/2 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(128*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^9) - 49/(128*HarmonicSums`Private`ExpVar^8) + 7/(48*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) - (25*z2)/48) + (-(li4half/2) + 1717/(4800*HarmonicSums`Private`ExpVar^10) - 31933/(151200*HarmonicSums`Private`ExpVar^9) - 221/(2016*HarmonicSums`Private`ExpVar^8) + 7019/(70560*HarmonicSums`Private`ExpVar^7) + 173/(2880*HarmonicSums`Private`ExpVar^6) - 1223/(7200*HarmonicSums`Private`ExpVar^5) + 35/(192*HarmonicSums`Private`ExpVar^4) - 19/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-1659/(64*HarmonicSums`Private`ExpVar^10) + 1071/(160*HarmonicSums`Private`ExpVar^9) + 1029/(320*HarmonicSums`Private`ExpVar^8) - 49/(40*HarmonicSums`Private`ExpVar^7) - 21/(32*HarmonicSums`Private`ExpVar^6) + 7/(16*HarmonicSums`Private`ExpVar^5) + 21/(80*HarmonicSums`Private`ExpVar^4) - 21/(40*HarmonicSums`Private`ExpVar^3) + 7/(20*HarmonicSums`Private`ExpVar^2))*z2^2 + (2141*z2^3)/560 + ln2^2*((3*li4half)/2 + 1717/(4800*HarmonicSums`Private`ExpVar^10) - 31933/(151200*HarmonicSums`Private`ExpVar^9) - 221/(2016*HarmonicSums`Private`ExpVar^8) + 7019/(70560*HarmonicSums`Private`ExpVar^7) + 173/(2880*HarmonicSums`Private`ExpVar^6) - 1223/(7200*HarmonicSums`Private`ExpVar^5) + 35/(192*HarmonicSums`Private`ExpVar^4) - 19/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) - 153/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (301*z2^2)/80) + (7*ln2^3*z3)/8 + (597*z3^2)/128 + ln2*((-1)^HarmonicSums`Private`ExpVar* (69659/(5376*HarmonicSums`Private`ExpVar^10) + 41033/(13440*HarmonicSums`Private`ExpVar^9) - 3643/(1920*HarmonicSums`Private`ExpVar^8) - 187/(480*HarmonicSums`Private`ExpVar^7) + 43/(64*HarmonicSums`Private`ExpVar^6) - 29/(96*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* (24885/(512*HarmonicSums`Private`ExpVar^10) - 3213/(256*HarmonicSums`Private`ExpVar^9) - 3087/(512*HarmonicSums`Private`ExpVar^8) + 147/(64*HarmonicSums`Private`ExpVar^7) + 315/(256*HarmonicSums`Private`ExpVar^6) - 105/(128*HarmonicSums`Private`ExpVar^5) - 63/(128*HarmonicSums`Private`ExpVar^4) + 63/(64*HarmonicSums`Private`ExpVar^3) - 21/(32*HarmonicSums`Private`ExpVar^2))*z3 + (21*z2*z3)/16) + sinf*(13*li5half + (7*ln2^5)/120 - (17*ln2^3*z2)/12 + ln2*(4*li4half + (21*z2^2)/8) + (21*ln2^2*z3)/16 + (21*z2*z3)/16 - (911*z5)/64), S[1, -1, -2, -1, 1, HarmonicSums`Private`ExpVar] :> -24*li6half + (7*ln2^6)/240 + (-1)^HarmonicSums`Private`ExpVar* (6817243/(2257920*HarmonicSums`Private`ExpVar^10) + 25108913/(5644800*HarmonicSums`Private`ExpVar^9) - 4921/(12800*HarmonicSums`Private`ExpVar^8) - 35417/(57600*HarmonicSums`Private`ExpVar^7) + 35/(192*HarmonicSums`Private`ExpVar^6) + 25/(576*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(3555/(64*HarmonicSums`Private`ExpVar^10) - 459/(32*HarmonicSums`Private`ExpVar^9) - 441/(64*HarmonicSums`Private`ExpVar^8) + 21/(8*HarmonicSums`Private`ExpVar^7) + 45/(32*HarmonicSums`Private`ExpVar^6) - 15/(16*HarmonicSums`Private`ExpVar^5) - 9/(16*HarmonicSums`Private`ExpVar^4) + 9/(8*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2)) - 13*s6 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (1185/(512*HarmonicSums`Private`ExpVar^10) - 153/(256*HarmonicSums`Private`ExpVar^9) - 147/(512*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^7) + 15/(256*HarmonicSums`Private`ExpVar^6) - 5/(128*HarmonicSums`Private`ExpVar^5) - 3/(128*HarmonicSums`Private`ExpVar^4) + 3/(64*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2)) - (11*z2)/48) + (li4half/2 - 1717/(4800*HarmonicSums`Private`ExpVar^10) + 31933/(151200*HarmonicSums`Private`ExpVar^9) + 221/(2016*HarmonicSums`Private`ExpVar^8) - 7019/(70560*HarmonicSums`Private`ExpVar^7) - 173/(2880*HarmonicSums`Private`ExpVar^6) + 1223/(7200*HarmonicSums`Private`ExpVar^5) - 35/(192*HarmonicSums`Private`ExpVar^4) + 19/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-9243/(512*HarmonicSums`Private`ExpVar^10) + 5967/(1280*HarmonicSums`Private`ExpVar^9) + 5733/(2560*HarmonicSums`Private`ExpVar^8) - 273/(320*HarmonicSums`Private`ExpVar^7) - 117/(256*HarmonicSums`Private`ExpVar^6) + 39/(128*HarmonicSums`Private`ExpVar^5) + 117/(640*HarmonicSums`Private`ExpVar^4) - 117/(320*HarmonicSums`Private`ExpVar^3) + 39/(160*HarmonicSums`Private`ExpVar^2))*z2^2 + (227*z2^3)/80 + ln2^2*((3*li4half)/2 + 1717/(4800*HarmonicSums`Private`ExpVar^10) - 31933/(151200*HarmonicSums`Private`ExpVar^9) - 221/(2016*HarmonicSums`Private`ExpVar^8) + 7019/(70560*HarmonicSums`Private`ExpVar^7) + 173/(2880*HarmonicSums`Private`ExpVar^6) - 1223/(7200*HarmonicSums`Private`ExpVar^5) + 35/(192*HarmonicSums`Private`ExpVar^4) - 19/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) + (269*z2^2)/80) + (39*z3^2)/8 + sinf*(13*li5half + (7*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar* (-69659/(5376*HarmonicSums`Private`ExpVar^10) - 41033/(13440*HarmonicSums`Private`ExpVar^9) + 3643/(1920*HarmonicSums`Private`ExpVar^8) + 187/(480*HarmonicSums`Private`ExpVar^7) - 43/(64*HarmonicSums`Private`ExpVar^6) + 29/(96*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4)) - (2*ln2^3*z2)/3 + ln2*(4*li4half + (27*z2^2)/8) - (911*z5)/64), S[1, -1, -2, 1, -1, HarmonicSums`Private`ExpVar] :> 9*li6half + ln2^6/60 + (-1)^HarmonicSums`Private`ExpVar* (-118595/(21504*HarmonicSums`Private`ExpVar^10) + 53267/(53760*HarmonicSums`Private`ExpVar^9) + 1901/(2560*HarmonicSums`Private`ExpVar^8) - 1931/(3840*HarmonicSums`Private`ExpVar^7) + 19/(128*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^5)) + (15*s6)/2 + (11*ln2^4*z2)/48 + (-1)^HarmonicSums`Private`ExpVar* (-711/(512*HarmonicSums`Private`ExpVar^10) + 459/(1280*HarmonicSums`Private`ExpVar^9) + 441/(2560*HarmonicSums`Private`ExpVar^8) - 21/(320*HarmonicSums`Private`ExpVar^7) - 9/(256*HarmonicSums`Private`ExpVar^6) + 3/(128*HarmonicSums`Private`ExpVar^5) + 9/(640*HarmonicSums`Private`ExpVar^4) - 9/(320*HarmonicSums`Private`ExpVar^3) + 3/(160*HarmonicSums`Private`ExpVar^2))*z2^2 - (16*z2^3)/35 + ln2^2*(li4half/2 - 1717/(4800*HarmonicSums`Private`ExpVar^10) + 31933/(151200*HarmonicSums`Private`ExpVar^9) + 221/(2016*HarmonicSums`Private`ExpVar^8) - 7019/(70560*HarmonicSums`Private`ExpVar^7) - 173/(2880*HarmonicSums`Private`ExpVar^6) + 1223/(7200*HarmonicSums`Private`ExpVar^5) - 35/(192*HarmonicSums`Private`ExpVar^4) + 19/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-3555/(256*HarmonicSums`Private`ExpVar^10) + 459/(128*HarmonicSums`Private`ExpVar^9) + 441/(256*HarmonicSums`Private`ExpVar^8) - 21/(32*HarmonicSums`Private`ExpVar^7) - 45/(128*HarmonicSums`Private`ExpVar^6) + 15/(64*HarmonicSums`Private`ExpVar^5) + 9/(64*HarmonicSums`Private`ExpVar^4) - 9/(32*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2))*z2 - (45*z2^2)/16) - (45*z3^2)/16 + ln2*(2*li5half + 1071479/(756000*HarmonicSums`Private`ExpVar^10) - 17695249/(47628000*HarmonicSums`Private`ExpVar^9) - 582713/(1693440*HarmonicSums`Private`ExpVar^8) + 1940143/(14817600*HarmonicSums`Private`ExpVar^7) + 12053/(86400*HarmonicSums`Private`ExpVar^6) - 28453/(216000*HarmonicSums`Private`ExpVar^5) - 25/(1152*HarmonicSums`Private`ExpVar^4) + 29/(216*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) - (279*z5)/64) + sinf*(3*li5half + ln2^5/60 + (3*ln2^3*z2)/4 + ln2*(li4half - 1717/(2400*HarmonicSums`Private`ExpVar^10) + 31933/(75600*HarmonicSums`Private`ExpVar^9) + 221/(1008*HarmonicSums`Private`ExpVar^8) - 7019/(35280*HarmonicSums`Private`ExpVar^7) - 173/(1440*HarmonicSums`Private`ExpVar^6) + 1223/(3600*HarmonicSums`Private`ExpVar^5) - 35/(96*HarmonicSums`Private`ExpVar^4) + 19/(72*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + z2^2/40) - (99*z5)/32), S[1, -1, -2, 1, 1, HarmonicSums`Private`ExpVar] :> -li6half + (7*ln2^6)/360 + (-1)^HarmonicSums`Private`ExpVar*li4half* (1185/(64*HarmonicSums`Private`ExpVar^10) - 153/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) + 7/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + 6262440253/(5080320000*HarmonicSums`Private`ExpVar^10) + 43609246907/(160030080000*HarmonicSums`Private`ExpVar^9) - 232453181/(948326400*HarmonicSums`Private`ExpVar^8) - 457530301/(2074464000*HarmonicSums`Private`ExpVar^7) + 598247/(1728000*HarmonicSums`Private`ExpVar^6) - 1028747/(4320000*HarmonicSums`Private`ExpVar^5) + 641/(4608*HarmonicSums`Private`ExpVar^4) - 97/(864*HarmonicSums`Private`ExpVar^3) + 3/(32*HarmonicSums`Private`ExpVar^2) + (15*s6)/4 + (1717/(4800*HarmonicSums`Private`ExpVar^10) - 31933/(151200*HarmonicSums`Private`ExpVar^9) - 221/(2016*HarmonicSums`Private`ExpVar^8) + 7019/(70560*HarmonicSums`Private`ExpVar^7) + 173/(2880*HarmonicSums`Private`ExpVar^6) - 1223/(7200*HarmonicSums`Private`ExpVar^5) + 35/(192*HarmonicSums`Private`ExpVar^4) - 19/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*sinf^2 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(512*HarmonicSums`Private`ExpVar^10) - 51/(256*HarmonicSums`Private`ExpVar^9) - 49/(512*HarmonicSums`Private`ExpVar^8) + 7/(192*HarmonicSums`Private`ExpVar^7) + 5/(256*HarmonicSums`Private`ExpVar^6) - 5/(384*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^3) - 1/(96*HarmonicSums`Private`ExpVar^2)) - (5*z2)/48) + (1717/(4800*HarmonicSums`Private`ExpVar^10) - 31933/(151200*HarmonicSums`Private`ExpVar^9) - 221/(2016*HarmonicSums`Private`ExpVar^8) + 7019/(70560*HarmonicSums`Private`ExpVar^7) + 173/(2880*HarmonicSums`Private`ExpVar^6) - 1223/(7200*HarmonicSums`Private`ExpVar^5) + 35/(192*HarmonicSums`Private`ExpVar^4) - 19/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(512*HarmonicSums`Private`ExpVar^10) + 153/(256*HarmonicSums`Private`ExpVar^9) + 147/(512*HarmonicSums`Private`ExpVar^8) - 7/(64*HarmonicSums`Private`ExpVar^7) - 15/(256*HarmonicSums`Private`ExpVar^6) + 5/(128*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) - 3/(64*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2))*z2^2 - (6*z2^3)/35 + ln2^2*(li4half/2 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) + 153/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 - (3*z2^2)/5) + (7*ln2^3*z3)/24 - (229*z3^2)/128 + ln2*((-1)^HarmonicSums`Private`ExpVar* (8295/(512*HarmonicSums`Private`ExpVar^10) - 1071/(256*HarmonicSums`Private`ExpVar^9) - 1029/(512*HarmonicSums`Private`ExpVar^8) + 49/(64*HarmonicSums`Private`ExpVar^7) + 105/(256*HarmonicSums`Private`ExpVar^6) - 35/(128*HarmonicSums`Private`ExpVar^5) - 21/(128*HarmonicSums`Private`ExpVar^4) + 21/(64*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2))*z3 + (7*z2*z3)/16) + sinf*(li5half + ln2^5/30 - 1071479/(756000*HarmonicSums`Private`ExpVar^ 10) + 17695249/(47628000*HarmonicSums`Private`ExpVar^9) + 582713/(1693440*HarmonicSums`Private`ExpVar^8) - 1940143/(14817600*HarmonicSums`Private`ExpVar^7) - 12053/(86400*HarmonicSums`Private`ExpVar^6) + 28453/(216000*HarmonicSums`Private`ExpVar^5) + 25/(1152*HarmonicSums`Private`ExpVar^4) - 29/(216*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - (ln2^3*z2)/6 + ln2*(li4half - (6*z2^2)/5) + (7*ln2^2*z3)/16 + (7*z2*z3)/16 + (81*z5)/64), S[1, -1, 2, -1, -1, HarmonicSums`Private`ExpVar] :> 30*li6half - ln2^6/40 + (-1)^HarmonicSums`Private`ExpVar* (235379/(23040*HarmonicSums`Private`ExpVar^10) + 91247/(26880*HarmonicSums`Private`ExpVar^9) - 33737/(23040*HarmonicSums`Private`ExpVar^8) - 837/(1280*HarmonicSums`Private`ExpVar^7) + 287/(384*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-1185/(64*HarmonicSums`Private`ExpVar^10) + 153/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) - 7/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) + 5/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (35*s6)/2 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-395/(512*HarmonicSums`Private`ExpVar^10) + 51/(256*HarmonicSums`Private`ExpVar^9) + 49/(512*HarmonicSums`Private`ExpVar^8) - 7/(192*HarmonicSums`Private`ExpVar^7) - 5/(256*HarmonicSums`Private`ExpVar^6) + 5/(384*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^3) + 1/(96*HarmonicSums`Private`ExpVar^2)) + (11*z2)/24) + (-1)^HarmonicSums`Private`ExpVar* (1129/(448*HarmonicSums`Private`ExpVar^10) - 27247/(3360*HarmonicSums`Private`ExpVar^9) + 13/(1920*HarmonicSums`Private`ExpVar^8) + 647/(480*HarmonicSums`Private`ExpVar^7) - 7/(64*HarmonicSums`Private`ExpVar^6) - 47/(96*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-237/(512*HarmonicSums`Private`ExpVar^10) + 153/(1280*HarmonicSums`Private`ExpVar^9) + 147/(2560*HarmonicSums`Private`ExpVar^8) - 7/(320*HarmonicSums`Private`ExpVar^7) - 3/(256*HarmonicSums`Private`ExpVar^6) + 1/(128*HarmonicSums`Private`ExpVar^5) + 3/(640*HarmonicSums`Private`ExpVar^4) - 3/(320*HarmonicSums`Private`ExpVar^3) + 1/(160*HarmonicSums`Private`ExpVar^2))*z2^2 - 3*z2^3 + ln2^2*(-2*li4half + (-1)^HarmonicSums`Private`ExpVar* (1129/(448*HarmonicSums`Private`ExpVar^10) - 27247/(3360*HarmonicSums`Private`ExpVar^9) + 13/(1920*HarmonicSums`Private`ExpVar^8) + 647/(480*HarmonicSums`Private`ExpVar^7) - 7/(64*HarmonicSums`Private`ExpVar^6) - 47/(96*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-5925/(256*HarmonicSums`Private`ExpVar^10) + 765/(128*HarmonicSums`Private`ExpVar^9) + 735/(256*HarmonicSums`Private`ExpVar^8) - 35/(32*HarmonicSums`Private`ExpVar^7) - 75/(128*HarmonicSums`Private`ExpVar^6) + 25/(64*HarmonicSums`Private`ExpVar^5) + 15/(64*HarmonicSums`Private`ExpVar^4) - 15/(32*HarmonicSums`Private`ExpVar^3) + 5/(16*HarmonicSums`Private`ExpVar^2))*z2 - (87*z2^2)/20) - (7*ln2^3*z3)/16 - (441*z3^2)/64 + ln2*(-2*li5half + 5741/(11520*HarmonicSums`Private`ExpVar^10) + 1034321/(1814400*HarmonicSums`Private`ExpVar^9) - 2255/(10752*HarmonicSums`Private`ExpVar^8) - 32933/(141120*HarmonicSums`Private`ExpVar^7) + 319/(960*HarmonicSums`Private`ExpVar^6) - 413/(1800*HarmonicSums`Private`ExpVar^5) + 5/(48*HarmonicSums`Private`ExpVar^4) - 1/(36*HarmonicSums`Private`ExpVar^3) - (21*z2*z3)/16 - (31*z5)/32) + sinf*(-16*li5half - ln2^5/30 + (7*ln2^3*z2)/6 + ln2*(-4*li4half - (81*z2^2)/20) + (245*z5)/16), S[1, -1, 2, -1, 1, HarmonicSums`Private`ExpVar] :> 24*li6half - ln2^6/20 + (-1)^HarmonicSums`Private`ExpVar*li4half* (-1185/(16*HarmonicSums`Private`ExpVar^10) + 153/(8*HarmonicSums`Private`ExpVar^9) + 147/(16*HarmonicSums`Private`ExpVar^8) - 7/(2*HarmonicSums`Private`ExpVar^7) - 15/(8*HarmonicSums`Private`ExpVar^6) + 5/(4*HarmonicSums`Private`ExpVar^5) + 3/(4*HarmonicSums`Private`ExpVar^4) - 3/(2*HarmonicSums`Private`ExpVar^3) + HarmonicSums`Private`ExpVar^ (-2)) - 1008241/(7257600*HarmonicSums`Private`ExpVar^10) + 228624827/(285768000*HarmonicSums`Private`ExpVar^9) - 1067/(35280*HarmonicSums`Private`ExpVar^8) - 2108297/(7408800*HarmonicSums`Private`ExpVar^7) + 1273/(7200*HarmonicSums`Private`ExpVar^6) - 1469/(54000*HarmonicSums`Private`ExpVar^5) - 1/(36*HarmonicSums`Private`ExpVar^4) + 1/(54*HarmonicSums`Private`ExpVar^3) + (23*s6)/2 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-395/(128*HarmonicSums`Private`ExpVar^10) + 51/(64*HarmonicSums`Private`ExpVar^9) + 49/(128*HarmonicSums`Private`ExpVar^8) - 7/(48*HarmonicSums`Private`ExpVar^7) - 5/(64*HarmonicSums`Private`ExpVar^6) + 5/(96*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) + (3*z2)/8) + (-1)^HarmonicSums`Private`ExpVar* (-1129/(448*HarmonicSums`Private`ExpVar^10) + 27247/(3360*HarmonicSums`Private`ExpVar^9) - 13/(1920*HarmonicSums`Private`ExpVar^8) - 647/(480*HarmonicSums`Private`ExpVar^7) + 7/(64*HarmonicSums`Private`ExpVar^6) + 47/(96*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar* (1185/(32*HarmonicSums`Private`ExpVar^10) - 153/(16*HarmonicSums`Private`ExpVar^9) - 147/(32*HarmonicSums`Private`ExpVar^8) + 7/(4*HarmonicSums`Private`ExpVar^7) + 15/(16*HarmonicSums`Private`ExpVar^6) - 5/(8*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2))*z2^2 - (1041*z2^3)/280 + ln2^2*(-2*li4half + (-1)^HarmonicSums`Private`ExpVar* (1129/(448*HarmonicSums`Private`ExpVar^10) - 27247/(3360*HarmonicSums`Private`ExpVar^9) + 13/(1920*HarmonicSums`Private`ExpVar^8) + 647/(480*HarmonicSums`Private`ExpVar^7) - 7/(64*HarmonicSums`Private`ExpVar^6) - 47/(96*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) - 153/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 - (29*z2^2)/40) - (21*ln2^3*z3)/16 - (111*z3^2)/128 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-24885/(512*HarmonicSums`Private`ExpVar^10) + 3213/(256*HarmonicSums`Private`ExpVar^9) + 3087/(512*HarmonicSums`Private`ExpVar^8) - 147/(64*HarmonicSums`Private`ExpVar^7) - 315/(256*HarmonicSums`Private`ExpVar^6) + 105/(128*HarmonicSums`Private`ExpVar^5) + 63/(128*HarmonicSums`Private`ExpVar^4) - 63/(64*HarmonicSums`Private`ExpVar^3) + 21/(32*HarmonicSums`Private`ExpVar^2))*z3 - (21*z2*z3)/8) + sinf*(-14*li5half - ln2^5/20 - 5741/(11520*HarmonicSums`Private`ExpVar^ 10) - 1034321/(1814400*HarmonicSums`Private`ExpVar^9) + 2255/(10752*HarmonicSums`Private`ExpVar^8) + 32933/(141120*HarmonicSums`Private`ExpVar^7) - 319/(960*HarmonicSums`Private`ExpVar^6) + 413/(1800*HarmonicSums`Private`ExpVar^5) - 5/(48*HarmonicSums`Private`ExpVar^4) + 1/(36*HarmonicSums`Private`ExpVar^3) + (7*ln2^3*z2)/12 + ln2*(-4*li4half - (49*z2^2)/20) - (21*ln2^2*z3)/16 - (21*z2*z3)/16 + (521*z5)/32), S[1, -1, 2, 1, -1, HarmonicSums`Private`ExpVar] :> -3*li6half - (31*ln2^6)/240 + (-1)^HarmonicSums`Private`ExpVar*li4half* (-3555/(64*HarmonicSums`Private`ExpVar^10) + 459/(32*HarmonicSums`Private`ExpVar^9) + 441/(64*HarmonicSums`Private`ExpVar^8) - 21/(8*HarmonicSums`Private`ExpVar^7) - 45/(32*HarmonicSums`Private`ExpVar^6) + 15/(16*HarmonicSums`Private`ExpVar^5) + 9/(16*HarmonicSums`Private`ExpVar^4) - 9/(8*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2)) - 178811/(153600*HarmonicSums`Private`ExpVar^10) + 47447/(537600*HarmonicSums`Private`ExpVar^9) + 99403/(258048*HarmonicSums`Private`ExpVar^8) - 14983/(47040*HarmonicSums`Private`ExpVar^7) + 857/(5760*HarmonicSums`Private`ExpVar^6) - 73/(1600*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - (9*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-1185/(512*HarmonicSums`Private`ExpVar^10) + 153/(256*HarmonicSums`Private`ExpVar^9) + 147/(512*HarmonicSums`Private`ExpVar^8) - 7/(64*HarmonicSums`Private`ExpVar^7) - 15/(256*HarmonicSums`Private`ExpVar^6) + 5/(128*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) - 3/(64*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2)) + (3*z2)/8) - (3*li4half*z2)/2 + (-1)^HarmonicSums`Private`ExpVar* (711/(32*HarmonicSums`Private`ExpVar^10) - 459/(80*HarmonicSums`Private`ExpVar^9) - 441/(160*HarmonicSums`Private`ExpVar^8) + 21/(20*HarmonicSums`Private`ExpVar^7) + 9/(16*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^5) - 9/(40*HarmonicSums`Private`ExpVar^4) + 9/(20*HarmonicSums`Private`ExpVar^3) - 3/(10*HarmonicSums`Private`ExpVar^2))*z2^2 + (173*z2^3)/560 + ln2^2*(-3*li4half + (-1)^HarmonicSums`Private`ExpVar* (-1129/(448*HarmonicSums`Private`ExpVar^10) + 27247/(3360*HarmonicSums`Private`ExpVar^9) - 13/(1920*HarmonicSums`Private`ExpVar^8) - 647/(480*HarmonicSums`Private`ExpVar^7) + 7/(64*HarmonicSums`Private`ExpVar^6) + 47/(96*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (3555/(128*HarmonicSums`Private`ExpVar^10) - 459/(64*HarmonicSums`Private`ExpVar^9) - 441/(128*HarmonicSums`Private`ExpVar^8) + 21/(16*HarmonicSums`Private`ExpVar^7) + 45/(64*HarmonicSums`Private`ExpVar^6) - 15/(32*HarmonicSums`Private`ExpVar^5) - 9/(32*HarmonicSums`Private`ExpVar^4) + 9/(16*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2))*z2 + (3*z2^2)/2) - (21*ln2^3*z3)/16 + (69*z3^2)/32 + ln2*((-1)^HarmonicSums`Private`ExpVar* (5573377/(188160*HarmonicSums`Private`ExpVar^10) - 9246059/(1411200*HarmonicSums`Private`ExpVar^9) - 10931/(3600*HarmonicSums`Private`ExpVar^8) + 7631/(14400*HarmonicSums`Private`ExpVar^7) + 103/(192*HarmonicSums`Private`ExpVar^6) + 25/(288*HarmonicSums`Private`ExpVar^5) - 7/(16*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-8295/(512*HarmonicSums`Private`ExpVar^10) + 1071/(256*HarmonicSums`Private`ExpVar^9) + 1029/(512*HarmonicSums`Private`ExpVar^8) - 49/(64*HarmonicSums`Private`ExpVar^7) - 105/(256*HarmonicSums`Private`ExpVar^6) + 35/(128*HarmonicSums`Private`ExpVar^5) + 21/(128*HarmonicSums`Private`ExpVar^4) - 21/(64*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2))*z3) + sinf*(-(ln2^5/8) + ln2*(-3*li4half + (-1)^HarmonicSums`Private`ExpVar* (-1129/(224*HarmonicSums`Private`ExpVar^10) + 27247/(1680*HarmonicSums`Private`ExpVar^9) - 13/(960*HarmonicSums`Private`ExpVar^8) - 647/(240*HarmonicSums`Private`ExpVar^7) + 7/(32*HarmonicSums`Private`ExpVar^6) + 47/(48*HarmonicSums`Private`ExpVar^5) - 3/(4*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) + (6*z2^2)/5) - (21*ln2^2*z3)/16 - (21*z2*z3)/16 + (87*z5)/32), S[1, -1, 2, 1, 1, HarmonicSums`Private`ExpVar] :> -li6half - (67*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar* (1766495557/(79027200*HarmonicSums`Private`ExpVar^10) - 1326331319/(592704000*HarmonicSums`Private`ExpVar^9) - 3338299/(1728000*HarmonicSums`Private`ExpVar^8) + 285653/(864000*HarmonicSums`Private`ExpVar^7) + 37/(72*HarmonicSums`Private`ExpVar^6) - 1139/(1728*HarmonicSums`Private`ExpVar^5) + 17/(32*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + s6 + (-1)^HarmonicSums`Private`ExpVar* (1129/(448*HarmonicSums`Private`ExpVar^10) - 27247/(3360*HarmonicSums`Private`ExpVar^9) + 13/(1920*HarmonicSums`Private`ExpVar^8) + 647/(480*HarmonicSums`Private`ExpVar^7) - 7/(64*HarmonicSums`Private`ExpVar^6) - 47/(96*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3))*sinf^2 + (ln2^4*z2)/2 + ((3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (1129/(448*HarmonicSums`Private`ExpVar^10) - 27247/(3360*HarmonicSums`Private`ExpVar^9) + 13/(1920*HarmonicSums`Private`ExpVar^8) + 647/(480*HarmonicSums`Private`ExpVar^7) - 7/(64*HarmonicSums`Private`ExpVar^6) - 47/(96*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-711/(32*HarmonicSums`Private`ExpVar^10) + 459/(80*HarmonicSums`Private`ExpVar^9) + 441/(160*HarmonicSums`Private`ExpVar^8) - 21/(20*HarmonicSums`Private`ExpVar^7) - 9/(16*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^5) + 9/(40*HarmonicSums`Private`ExpVar^4) - 9/(20*HarmonicSums`Private`ExpVar^3) + 3/(10*HarmonicSums`Private`ExpVar^2))*z2^2 + (163*z2^3)/560 + ln2^2*(-3*li4half - (7*z2^2)/16) - (49*ln2^3*z3)/48 - (209*z3^2)/128 + ln2*(-4*li5half + (35*z2*z3)/16 - (93*z5)/64) + sinf*(-4*li5half - (11*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar* (-5573377/(188160*HarmonicSums`Private`ExpVar^10) + 9246059/(1411200*HarmonicSums`Private`ExpVar^9) + 10931/(3600*HarmonicSums`Private`ExpVar^8) - 7631/(14400*HarmonicSums`Private`ExpVar^7) - 103/(192*HarmonicSums`Private`ExpVar^6) - 25/(288*HarmonicSums`Private`ExpVar^5) + 7/(16*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + (5*ln2^3*z2)/12 + ln2*(-3*li4half - z2^2/8) - (7*ln2^2*z3)/8 + (7*z2*z3)/8 + (81*z5)/64), S[1, -1, -1, -2, -1, HarmonicSums`Private`ExpVar] :> 18*li6half + ln2^6/240 + (-1)^HarmonicSums`Private`ExpVar*li4half* (-1185/(16*HarmonicSums`Private`ExpVar^10) + 153/(8*HarmonicSums`Private`ExpVar^9) + 147/(16*HarmonicSums`Private`ExpVar^8) - 7/(2*HarmonicSums`Private`ExpVar^7) - 15/(8*HarmonicSums`Private`ExpVar^6) + 5/(4*HarmonicSums`Private`ExpVar^5) + 3/(4*HarmonicSums`Private`ExpVar^4) - 3/(2*HarmonicSums`Private`ExpVar^3) + HarmonicSums`Private`ExpVar^ (-2)) - 3148381/(6912000*HarmonicSums`Private`ExpVar^10) + 14510009/(43545600*HarmonicSums`Private`ExpVar^9) + 667267/(3870720*HarmonicSums`Private`ExpVar^8) - 11121/(31360*HarmonicSums`Private`ExpVar^7) + 9737/(34560*HarmonicSums`Private`ExpVar^6) - 4363/(28800*HarmonicSums`Private`ExpVar^5) + 15/(256*HarmonicSums`Private`ExpVar^4) - 1/(72*HarmonicSums`Private`ExpVar^3) + 7*s6 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-395/(128*HarmonicSums`Private`ExpVar^10) + 51/(64*HarmonicSums`Private`ExpVar^9) + 49/(128*HarmonicSums`Private`ExpVar^8) - 7/(48*HarmonicSums`Private`ExpVar^7) - 5/(64*HarmonicSums`Private`ExpVar^6) + 5/(96*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) + (5*z2)/16) + (3*li4half*z2)/2 + (-1)^HarmonicSums`Private`ExpVar* (1659/(64*HarmonicSums`Private`ExpVar^10) - 1071/(160*HarmonicSums`Private`ExpVar^9) - 1029/(320*HarmonicSums`Private`ExpVar^8) + 49/(40*HarmonicSums`Private`ExpVar^7) + 21/(32*HarmonicSums`Private`ExpVar^6) - 7/(16*HarmonicSums`Private`ExpVar^5) - 21/(80*HarmonicSums`Private`ExpVar^4) + 21/(40*HarmonicSums`Private`ExpVar^3) - 7/(20*HarmonicSums`Private`ExpVar^2))*z2^2 - (261*z2^3)/80 + ln2^2*(-(li4half/2) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) + 153/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (91*z2^2)/80) - (13*ln2^3*z3)/12 + (-2071/(12288*HarmonicSums`Private`ExpVar^10) - 5919/(71680*HarmonicSums`Private`ExpVar^9) + 8725/(172032*HarmonicSums`Private`ExpVar^8) + 8251/(225792*HarmonicSums`Private`ExpVar^7) - 121/(3072*HarmonicSums`Private`ExpVar^6) - 757/(23040*HarmonicSums`Private`ExpVar^5) + 395/(3072*HarmonicSums`Private`ExpVar^4) - 245/(1152*HarmonicSums`Private`ExpVar^3) + 35/(128*HarmonicSums`Private`ExpVar^2) - 5/(16*HarmonicSums`Private`ExpVar))*z3 - (7*z3^2)/4 + ln2*((-1)^HarmonicSums`Private`ExpVar* (60317/(5376*HarmonicSums`Private`ExpVar^10) + 68587/(13440*HarmonicSums`Private`ExpVar^9) - 311/(160*HarmonicSums`Private`ExpVar^8) - 661/(960*HarmonicSums`Private`ExpVar^7) + 51/(64*HarmonicSums`Private`ExpVar^6) - 31/(96*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* (-5925/(512*HarmonicSums`Private`ExpVar^10) + 765/(256*HarmonicSums`Private`ExpVar^9) + 735/(512*HarmonicSums`Private`ExpVar^8) - 35/(64*HarmonicSums`Private`ExpVar^7) - 75/(256*HarmonicSums`Private`ExpVar^6) + 25/(128*HarmonicSums`Private`ExpVar^5) + 15/(128*HarmonicSums`Private`ExpVar^4) - 15/(64*HarmonicSums`Private`ExpVar^3) + 5/(32*HarmonicSums`Private`ExpVar^2))*z3 + z2*(2071/(5120*HarmonicSums`Private`ExpVar^10) + 17757/(89600*HarmonicSums`Private`ExpVar^9) - 1745/(14336*HarmonicSums`Private`ExpVar^8) - 8251/(94080*HarmonicSums`Private`ExpVar^7) + 121/(1280*HarmonicSums`Private`ExpVar^6) + 757/(9600*HarmonicSums`Private`ExpVar^5) - 79/(256*HarmonicSums`Private`ExpVar^4) + 49/(96*HarmonicSums`Private`ExpVar^3) - 21/(32*HarmonicSums`Private`ExpVar^2) + 3/(4*HarmonicSums`Private`ExpVar) + z3)) + sinf*(-11*li5half - (3*ln2^5)/40 + (5*ln2^3*z2)/6 + ln2*(-4*li4half - (41*z2^2)/40) - (13*ln2^2*z3)/8 - (13*z2*z3)/8 + (845*z5)/64), S[1, -1, -1, -2, 1, HarmonicSums`Private`ExpVar] :> 15*li6half - ln2^6/20 + (-1)^HarmonicSums`Private`ExpVar* (146647/(141120*HarmonicSums`Private`ExpVar^10) + 123367/(22050*HarmonicSums`Private`ExpVar^9) - 23953/(57600*HarmonicSums`Private`ExpVar^8) - 2323/(3600*HarmonicSums`Private`ExpVar^7) + 65/(384*HarmonicSums`Private`ExpVar^6) + 29/(576*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-3555/(64*HarmonicSums`Private`ExpVar^10) + 459/(32*HarmonicSums`Private`ExpVar^9) + 441/(64*HarmonicSums`Private`ExpVar^8) - 21/(8*HarmonicSums`Private`ExpVar^7) - 45/(32*HarmonicSums`Private`ExpVar^6) + 15/(16*HarmonicSums`Private`ExpVar^5) + 9/(16*HarmonicSums`Private`ExpVar^4) - 9/(8*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2)) + (15*s6)/2 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-1185/(512*HarmonicSums`Private`ExpVar^10) + 153/(256*HarmonicSums`Private`ExpVar^9) + 147/(512*HarmonicSums`Private`ExpVar^8) - 7/(64*HarmonicSums`Private`ExpVar^7) - 15/(256*HarmonicSums`Private`ExpVar^6) + 5/(128*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) - 3/(64*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2)) + z2/4) - (3*li4half*z2)/2 + (-1)^HarmonicSums`Private`ExpVar* (2133/(512*HarmonicSums`Private`ExpVar^10) - 1377/(1280*HarmonicSums`Private`ExpVar^9) - 1323/(2560*HarmonicSums`Private`ExpVar^8) + 63/(320*HarmonicSums`Private`ExpVar^7) + 27/(256*HarmonicSums`Private`ExpVar^6) - 9/(128*HarmonicSums`Private`ExpVar^5) - 27/(640*HarmonicSums`Private`ExpVar^4) + 27/(320*HarmonicSums`Private`ExpVar^3) - 9/(160*HarmonicSums`Private`ExpVar^2))*z2^2 - (493*z2^3)/560 + ln2^2*(-(li4half/2) + (-1)^HarmonicSums`Private`ExpVar* (3555/(256*HarmonicSums`Private`ExpVar^10) - 459/(128*HarmonicSums`Private`ExpVar^9) - 441/(256*HarmonicSums`Private`ExpVar^8) + 21/(32*HarmonicSums`Private`ExpVar^7) + 45/(128*HarmonicSums`Private`ExpVar^6) - 15/(64*HarmonicSums`Private`ExpVar^5) - 9/(64*HarmonicSums`Private`ExpVar^4) + 9/(32*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2))*z2 + (29*z2^2)/80) - (13*ln2^3*z3)/12 + (-2071/(12288*HarmonicSums`Private`ExpVar^10) - 5919/(71680*HarmonicSums`Private`ExpVar^9) + 8725/(172032*HarmonicSums`Private`ExpVar^8) + 8251/(225792*HarmonicSums`Private`ExpVar^7) - 121/(3072*HarmonicSums`Private`ExpVar^6) - 757/(23040*HarmonicSums`Private`ExpVar^5) + 395/(3072*HarmonicSums`Private`ExpVar^4) - 245/(1152*HarmonicSums`Private`ExpVar^3) + 35/(128*HarmonicSums`Private`ExpVar^2) - 5/(16*HarmonicSums`Private`ExpVar))*z3 - (13*z3^2)/4 + ln2*(6*li5half + (-1)^HarmonicSums`Private`ExpVar* (-5925/(512*HarmonicSums`Private`ExpVar^10) + 765/(256*HarmonicSums`Private`ExpVar^9) + 735/(512*HarmonicSums`Private`ExpVar^8) - 35/(64*HarmonicSums`Private`ExpVar^7) - 75/(256*HarmonicSums`Private`ExpVar^6) + 25/(128*HarmonicSums`Private`ExpVar^5) + 15/(128*HarmonicSums`Private`ExpVar^4) - 15/(64*HarmonicSums`Private`ExpVar^3) + 5/(32*HarmonicSums`Private`ExpVar^2))*z3 + z2*z3 - (93*z5)/8) + sinf*(-5*li5half - ln2^5/8 + (-1)^HarmonicSums`Private`ExpVar* (-60317/(5376*HarmonicSums`Private`ExpVar^10) - 68587/(13440*HarmonicSums`Private`ExpVar^9) + 311/(160*HarmonicSums`Private`ExpVar^8) + 661/(960*HarmonicSums`Private`ExpVar^7) - 51/(64*HarmonicSums`Private`ExpVar^6) + 31/(96*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4)) + (7*ln2^3*z2)/12 + ln2*(-4*li4half + z2^2/40) - (13*ln2^2*z3)/8 + z2*z3 + (101*z5)/64), S[1, -1, -1, 2, -1, HarmonicSums`Private`ExpVar] :> -12*li6half - (7*ln2^6)/240 + (-1)^HarmonicSums`Private`ExpVar* (-26133/(3584*HarmonicSums`Private`ExpVar^10) + 25693/(26880*HarmonicSums`Private`ExpVar^9) + 1801/(1920*HarmonicSums`Private`ExpVar^8) - 271/(480*HarmonicSums`Private`ExpVar^7) + 5/(32*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^5)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(1185/(16*HarmonicSums`Private`ExpVar^10) - 153/(8*HarmonicSums`Private`ExpVar^9) - 147/(16*HarmonicSums`Private`ExpVar^8) + 7/(2*HarmonicSums`Private`ExpVar^7) + 15/(8*HarmonicSums`Private`ExpVar^6) - 5/(4*HarmonicSums`Private`ExpVar^5) - 3/(4*HarmonicSums`Private`ExpVar^4) + 3/(2*HarmonicSums`Private`ExpVar^3) - HarmonicSums`Private`ExpVar^ (-2)) - (3*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(128*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^9) - 49/(128*HarmonicSums`Private`ExpVar^8) + 7/(48*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) - z2/24) + (-1)^HarmonicSums`Private`ExpVar* (-5925/(256*HarmonicSums`Private`ExpVar^10) + 765/(128*HarmonicSums`Private`ExpVar^9) + 735/(256*HarmonicSums`Private`ExpVar^8) - 35/(32*HarmonicSums`Private`ExpVar^7) - 75/(128*HarmonicSums`Private`ExpVar^6) + 25/(64*HarmonicSums`Private`ExpVar^5) + 15/(64*HarmonicSums`Private`ExpVar^4) - 15/(32*HarmonicSums`Private`ExpVar^3) + 5/(16*HarmonicSums`Private`ExpVar^2))*z2^2 + (86*z2^3)/35 + ln2^2*(li4half/2 + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) - 153/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (29*z2^2)/20) + (ln2^3*z3)/12 + (2071/(30720*HarmonicSums`Private`ExpVar^10) + 5919/(179200*HarmonicSums`Private`ExpVar^9) - 1745/(86016*HarmonicSums`Private`ExpVar^8) - 8251/(564480*HarmonicSums`Private`ExpVar^7) + 121/(7680*HarmonicSums`Private`ExpVar^6) + 757/(57600*HarmonicSums`Private`ExpVar^5) - 79/(1536*HarmonicSums`Private`ExpVar^4) + 49/(576*HarmonicSums`Private`ExpVar^3) - 7/(64*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z3 + (25*z3^2)/64 + sinf*(8*li5half - ln2^5/40 - (ln2^3*z2)/3 + ln2*(li4half + (47*z2^2)/40) + (ln2^2*z3)/8 + (z2*z3)/8 - (61*z5)/8) + ln2*(4*li5half + 45071/(36000*HarmonicSums`Private`ExpVar^10) + 2291/(151200*HarmonicSums`Private`ExpVar^9) - 100609/(241920*HarmonicSums`Private`ExpVar^8) + 797/(141120*HarmonicSums`Private`ExpVar^7) + 7271/(17280*HarmonicSums`Private`ExpVar^6) - 2671/(4800*HarmonicSums`Private`ExpVar^5) + 179/(384*HarmonicSums`Private`ExpVar^4) - 7/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + z2*(-2071/(5120*HarmonicSums`Private`ExpVar^10) - 17757/(89600*HarmonicSums`Private`ExpVar^9) + 1745/(14336*HarmonicSums`Private`ExpVar^8) + 8251/(94080*HarmonicSums`Private`ExpVar^7) - 121/(1280*HarmonicSums`Private`ExpVar^6) - 757/(9600*HarmonicSums`Private`ExpVar^5) + 79/(256*HarmonicSums`Private`ExpVar^4) - 49/(96*HarmonicSums`Private`ExpVar^3) + 21/(32*HarmonicSums`Private`ExpVar^2) - 3/(4*HarmonicSums`Private`ExpVar) - (5*z3)/2) + (-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) - 153/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z3 - (93*z5)/16), S[1, -1, -1, 2, 1, HarmonicSums`Private`ExpVar] :> -7*li6half + ln2^6/90 + (-1)^HarmonicSums`Private`ExpVar*li4half* (1185/(64*HarmonicSums`Private`ExpVar^10) - 153/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) + 7/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + 80576501/(120960000*HarmonicSums`Private`ExpVar^10) + 83557333/(254016000*HarmonicSums`Private`ExpVar^9) - 18645313/(203212800*HarmonicSums`Private`ExpVar^8) - 2148851/(14817600*HarmonicSums`Private`ExpVar^7) - 907/(51840*HarmonicSums`Private`ExpVar^6) + 22241/(72000*HarmonicSums`Private`ExpVar^5) - 539/(1152*HarmonicSums`Private`ExpVar^4) + 31/(72*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) - (3*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(512*HarmonicSums`Private`ExpVar^10) - 51/(256*HarmonicSums`Private`ExpVar^9) - 49/(512*HarmonicSums`Private`ExpVar^8) + 7/(192*HarmonicSums`Private`ExpVar^7) + 5/(256*HarmonicSums`Private`ExpVar^6) - 5/(384*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^3) - 1/(96*HarmonicSums`Private`ExpVar^2)) + z2/48) + (-1)^HarmonicSums`Private`ExpVar* (237/(512*HarmonicSums`Private`ExpVar^10) - 153/(1280*HarmonicSums`Private`ExpVar^9) - 147/(2560*HarmonicSums`Private`ExpVar^8) + 7/(320*HarmonicSums`Private`ExpVar^7) + 3/(256*HarmonicSums`Private`ExpVar^6) - 1/(128*HarmonicSums`Private`ExpVar^5) - 3/(640*HarmonicSums`Private`ExpVar^4) + 3/(320*HarmonicSums`Private`ExpVar^3) - 1/(160*HarmonicSums`Private`ExpVar^2))*z2^2 + (6*z2^3)/35 + ln2^2*(li4half/2 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) + 153/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 - (3*z2^2)/8) + (ln2^3*z3)/12 + (2071/(3840*HarmonicSums`Private`ExpVar^10) + 5919/(22400*HarmonicSums`Private`ExpVar^9) - 1745/(10752*HarmonicSums`Private`ExpVar^8) - 8251/(70560*HarmonicSums`Private`ExpVar^7) + 121/(960*HarmonicSums`Private`ExpVar^6) + 757/(7200*HarmonicSums`Private`ExpVar^5) - 79/(192*HarmonicSums`Private`ExpVar^4) + 49/(72*HarmonicSums`Private`ExpVar^3) - 7/(8*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1))* z3 + (123*z3^2)/64 + ln2*((-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) - 153/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z3 + (z2*z3)/8) + sinf*(4*li5half + ln2^5/120 - 45071/(36000*HarmonicSums`Private`ExpVar^ 10) - 2291/(151200*HarmonicSums`Private`ExpVar^9) + 100609/(241920*HarmonicSums`Private`ExpVar^8) - 797/(141120*HarmonicSums`Private`ExpVar^7) - 7271/(17280*HarmonicSums`Private`ExpVar^6) + 2671/(4800*HarmonicSums`Private`ExpVar^5) - 179/(384*HarmonicSums`Private`ExpVar^4) + 7/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (ln2^3*z2)/12 + ln2*(li4half + (9*z2^2)/40) + (ln2^2*z3)/8 + (z2*z3)/8 - (29*z5)/16), S[1, -1, -1, -1, -2, HarmonicSums`Private`ExpVar] :> -9*li6half - ln2^6/80 - 6102019/(6912000*HarmonicSums`Private`ExpVar^10) + 18843623/(43545600*HarmonicSums`Private`ExpVar^9) + 1050893/(3870720*HarmonicSums`Private`ExpVar^8) - 32041/(70560*HarmonicSums`Private`ExpVar^7) + 2285/(6912*HarmonicSums`Private`ExpVar^6) - 4801/(28800*HarmonicSums`Private`ExpVar^5) + 47/(768*HarmonicSums`Private`ExpVar^4) - 1/(72*HarmonicSums`Private`ExpVar^3) + (ln2^4*z2)/16 + (-1)^HarmonicSums`Private`ExpVar* (-81883/(14336*HarmonicSums`Private`ExpVar^10) + 398887/(107520*HarmonicSums`Private`ExpVar^9) + 8813/(15360*HarmonicSums`Private`ExpVar^8) - 5251/(7680*HarmonicSums`Private`ExpVar^7) - 5/(64*HarmonicSums`Private`ExpVar^6) + 121/(384*HarmonicSums`Private`ExpVar^5) - 13/(64*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar* (711/(64*HarmonicSums`Private`ExpVar^10) - 459/(160*HarmonicSums`Private`ExpVar^9) - 441/(320*HarmonicSums`Private`ExpVar^8) + 21/(40*HarmonicSums`Private`ExpVar^7) + 9/(32*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5) - 9/(80*HarmonicSums`Private`ExpVar^4) + 9/(40*HarmonicSums`Private`ExpVar^3) - 3/(20*HarmonicSums`Private`ExpVar^2))*z2^2 + (241*z2^3)/280 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) - 153/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (13*z2^2)/20) - (ln2^3*z3)/3 + (26923/(61440*HarmonicSums`Private`ExpVar^10) + 76947/(358400*HarmonicSums`Private`ExpVar^9) - 22685/(172032*HarmonicSums`Private`ExpVar^8) - 107263/(1128960*HarmonicSums`Private`ExpVar^7) + 1573/(15360*HarmonicSums`Private`ExpVar^6) + 9841/(115200*HarmonicSums`Private`ExpVar^5) - 1027/(3072*HarmonicSums`Private`ExpVar^4) + 637/(1152*HarmonicSums`Private`ExpVar^3) - 91/(128*HarmonicSums`Private`ExpVar^2) + 13/(16*HarmonicSums`Private`ExpVar))*z3 + (35*z3^2)/16 + ln2*(z2*(-2071/(7680*HarmonicSums`Private`ExpVar^10) - 5919/(44800*HarmonicSums`Private`ExpVar^9) + 1745/(21504*HarmonicSums`Private`ExpVar^8) + 8251/(141120*HarmonicSums`Private`ExpVar^7) - 121/(1920*HarmonicSums`Private`ExpVar^6) - 757/(14400*HarmonicSums`Private`ExpVar^5) + 79/(384*HarmonicSums`Private`ExpVar^4) - 49/(144*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) - (5*z3)/2) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(64*HarmonicSums`Private`ExpVar^10) + 153/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) - 7/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) + 5/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z3) + sinf*(3*li5half - ln2^5/40 + (ln2^3*z2)/12 + (3*ln2*z2^2)/8 - (ln2^2*z3)/2 - (3*z2*z3)/4 + (29*z5)/64), S[1, -1, -1, -1, 2, HarmonicSums`Private`ExpVar] :> -8*li6half + ln2^6/72 + (-1)^HarmonicSums`Private`ExpVar* (203107/(46080*HarmonicSums`Private`ExpVar^10) + 66673/(10752*HarmonicSums`Private`ExpVar^9) - 25397/(23040*HarmonicSums`Private`ExpVar^8) - 4721/(3840*HarmonicSums`Private`ExpVar^7) + 365/(384*HarmonicSums`Private`ExpVar^6) - 11/(32*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-3555/(64*HarmonicSums`Private`ExpVar^10) + 459/(32*HarmonicSums`Private`ExpVar^9) + 441/(64*HarmonicSums`Private`ExpVar^8) - 21/(8*HarmonicSums`Private`ExpVar^7) - 45/(32*HarmonicSums`Private`ExpVar^6) + 15/(16*HarmonicSums`Private`ExpVar^5) + 9/(16*HarmonicSums`Private`ExpVar^4) - 9/(8*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2)) - (15*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-1185/(512*HarmonicSums`Private`ExpVar^10) + 153/(256*HarmonicSums`Private`ExpVar^9) + 147/(512*HarmonicSums`Private`ExpVar^8) - 7/(64*HarmonicSums`Private`ExpVar^7) - 15/(256*HarmonicSums`Private`ExpVar^6) + 5/(128*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) - 3/(64*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2)) - z2/48) + (-1)^HarmonicSums`Private`ExpVar* (81883/(7168*HarmonicSums`Private`ExpVar^10) - 398887/(53760*HarmonicSums`Private`ExpVar^9) - 8813/(7680*HarmonicSums`Private`ExpVar^8) + 5251/(3840*HarmonicSums`Private`ExpVar^7) + 5/(32*HarmonicSums`Private`ExpVar^6) - 121/(192*HarmonicSums`Private`ExpVar^5) + 13/(32*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar* (3555/(512*HarmonicSums`Private`ExpVar^10) - 459/(256*HarmonicSums`Private`ExpVar^9) - 441/(512*HarmonicSums`Private`ExpVar^8) + 21/(64*HarmonicSums`Private`ExpVar^7) + 45/(256*HarmonicSums`Private`ExpVar^6) - 15/(128*HarmonicSums`Private`ExpVar^5) - 9/(128*HarmonicSums`Private`ExpVar^4) + 9/(64*HarmonicSums`Private`ExpVar^3) - 3/(32*HarmonicSums`Private`ExpVar^2))*z2^2 + (859*z2^3)/560 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) - 153/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (83*z2^2)/80) - (ln2^3*z3)/3 + (-2071/(7680*HarmonicSums`Private`ExpVar^10) - 5919/(44800*HarmonicSums`Private`ExpVar^9) + 1745/(21504*HarmonicSums`Private`ExpVar^8) + 8251/(141120*HarmonicSums`Private`ExpVar^7) - 121/(1920*HarmonicSums`Private`ExpVar^6) - 757/(14400*HarmonicSums`Private`ExpVar^5) + 79/(384*HarmonicSums`Private`ExpVar^4) - 49/(144*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z3 + (55*z3^2)/64 + ln2*(-3*li5half + z2*(2071/(15360*HarmonicSums`Private`ExpVar^10) + 5919/(89600*HarmonicSums`Private`ExpVar^9) - 1745/(43008*HarmonicSums`Private`ExpVar^8) - 8251/(282240*HarmonicSums`Private`ExpVar^7) + 121/(3840*HarmonicSums`Private`ExpVar^6) + 757/(28800*HarmonicSums`Private`ExpVar^5) - 79/(768*HarmonicSums`Private`ExpVar^4) + 49/(288*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar) + z3/2) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(64*HarmonicSums`Private`ExpVar^10) + 153/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) - 7/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) + 5/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z3 - (93*z5)/64) + sinf*((ln2^3*z2)/12 + (3*ln2*z2^2)/5 - (ln2^2*z3)/2 - (3*z2*z3)/8 - z5), S[1, -1, -1, 1, -2, HarmonicSums`Private`ExpVar] :> -9*li6half + ln2^6/30 + (-1)^HarmonicSums`Private`ExpVar* (-190933/(21504*HarmonicSums`Private`ExpVar^10) + 29957/(53760*HarmonicSums`Private`ExpVar^9) + 9413/(7680*HarmonicSums`Private`ExpVar^8) - 2441/(3840*HarmonicSums`Private`ExpVar^7) + 21/(128*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^5)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-1185/(32*HarmonicSums`Private`ExpVar^10) + 153/(16*HarmonicSums`Private`ExpVar^9) + 147/(32*HarmonicSums`Private`ExpVar^8) - 7/(4*HarmonicSums`Private`ExpVar^7) - 15/(16*HarmonicSums`Private`ExpVar^6) + 5/(8*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2)) - (15*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-395/(256*HarmonicSums`Private`ExpVar^10) + 51/(128*HarmonicSums`Private`ExpVar^9) + 49/(256*HarmonicSums`Private`ExpVar^8) - 7/(96*HarmonicSums`Private`ExpVar^7) - 5/(128*HarmonicSums`Private`ExpVar^6) + 5/(192*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2)) - (3*z2)/16) + ((-3*li4half)/2 + 10819/(89600*HarmonicSums`Private`ExpVar^10) + 13221301/(63504000*HarmonicSums`Private`ExpVar^9) - 46163/(2257920*HarmonicSums`Private`ExpVar^8) - 4812571/(59270400*HarmonicSums`Private`ExpVar^7) + 839/(57600*HarmonicSums`Private`ExpVar^6) + 15079/(216000*HarmonicSums`Private`ExpVar^5) - 37/(576*HarmonicSums`Private`ExpVar^4) - 11/(216*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))* z2 + (-1)^HarmonicSums`Private`ExpVar* (237/(64*HarmonicSums`Private`ExpVar^10) - 153/(160*HarmonicSums`Private`ExpVar^9) - 147/(320*HarmonicSums`Private`ExpVar^8) + 7/(40*HarmonicSums`Private`ExpVar^7) + 3/(32*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5) - 3/(80*HarmonicSums`Private`ExpVar^4) + 3/(40*HarmonicSums`Private`ExpVar^3) - 1/(20*HarmonicSums`Private`ExpVar^2))*z2^2 + (86*z2^3)/35 + ln2^2*(li4half/2 + (113*z2^2)/80) - (ln2^3*z3)/24 + (-2071/(61440*HarmonicSums`Private`ExpVar^10) - 5919/(358400*HarmonicSums`Private`ExpVar^9) + 1745/(172032*HarmonicSums`Private`ExpVar^8) + 8251/(1128960*HarmonicSums`Private`ExpVar^7) - 121/(15360*HarmonicSums`Private`ExpVar^6) - 757/(115200*HarmonicSums`Private`ExpVar^5) + 79/(3072*HarmonicSums`Private`ExpVar^4) - 49/(1152*HarmonicSums`Private`ExpVar^3) + 7/(128*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3 + (97*z3^2)/64 + ln2*(-3*li5half + (-1)^HarmonicSums`Private`ExpVar* (-1185/(512*HarmonicSums`Private`ExpVar^10) + 153/(256*HarmonicSums`Private`ExpVar^9) + 147/(512*HarmonicSums`Private`ExpVar^8) - 7/(64*HarmonicSums`Private`ExpVar^7) - 15/(256*HarmonicSums`Private`ExpVar^6) + 5/(128*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) - 3/(64*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2))*z3 - (z2*z3)/16 - (279*z5)/64) + sinf*(li5half + ln2^5/30 - (ln2^3*z2)/12 + ln2*(li4half + (3*z2^2)/5) + z2*(-2071/(15360*HarmonicSums`Private`ExpVar^10) - 5919/(89600*HarmonicSums`Private`ExpVar^9) + 1745/(43008*HarmonicSums`Private`ExpVar^8) + 8251/(282240*HarmonicSums`Private`ExpVar^7) - 121/(3840*HarmonicSums`Private`ExpVar^6) - 757/(28800*HarmonicSums`Private`ExpVar^5) + 79/(768*HarmonicSums`Private`ExpVar^4) - 49/(288*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) + (3*z3)/8) - (ln2^2*z3)/16 - (125*z5)/32), S[1, -1, -1, 1, 2, HarmonicSums`Private`ExpVar] :> -10*li6half + ln2^6/144 + (-1)^HarmonicSums`Private`ExpVar*li4half* (1185/(64*HarmonicSums`Private`ExpVar^10) - 153/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) + 7/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + 225243899/(241920000*HarmonicSums`Private`ExpVar^10) + 14211563/(43545600*HarmonicSums`Private`ExpVar^9) - 114105839/(406425600*HarmonicSums`Private`ExpVar^8) - 666641/(2116800*HarmonicSums`Private`ExpVar^7) + 355697/(518400*HarmonicSums`Private`ExpVar^6) - 20243/(28800*HarmonicSums`Private`ExpVar^5) + 1207/(2304*HarmonicSums`Private`ExpVar^4) - 11/(36*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(512*HarmonicSums`Private`ExpVar^10) - 51/(256*HarmonicSums`Private`ExpVar^9) - 49/(512*HarmonicSums`Private`ExpVar^8) + 7/(192*HarmonicSums`Private`ExpVar^7) + 5/(256*HarmonicSums`Private`ExpVar^6) - 5/(384*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^3) - 1/(96*HarmonicSums`Private`ExpVar^2)) + z2/12) + (3*li4half - 10819/(44800*HarmonicSums`Private`ExpVar^10) - 13221301/(31752000*HarmonicSums`Private`ExpVar^9) + 46163/(1128960*HarmonicSums`Private`ExpVar^8) + 4812571/(29635200*HarmonicSums`Private`ExpVar^7) - 839/(28800*HarmonicSums`Private`ExpVar^6) - 15079/(108000*HarmonicSums`Private`ExpVar^5) + 37/(288*HarmonicSums`Private`ExpVar^4) + 11/(108*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1))* z2 + (-1)^HarmonicSums`Private`ExpVar* (237/(256*HarmonicSums`Private`ExpVar^10) - 153/(640*HarmonicSums`Private`ExpVar^9) - 147/(1280*HarmonicSums`Private`ExpVar^8) + 7/(160*HarmonicSums`Private`ExpVar^7) + 3/(128*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^5) - 3/(320*HarmonicSums`Private`ExpVar^4) + 3/(160*HarmonicSums`Private`ExpVar^3) - 1/(80*HarmonicSums`Private`ExpVar^2))*z2^2 + ln2^2*(li4half/2 - z2^2/10) - (ln2^3*z3)/24 + (-2071/(7680*HarmonicSums`Private`ExpVar^10) - 5919/(44800*HarmonicSums`Private`ExpVar^9) + 1745/(21504*HarmonicSums`Private`ExpVar^8) + 8251/(141120*HarmonicSums`Private`ExpVar^7) - 121/(1920*HarmonicSums`Private`ExpVar^6) - 757/(14400*HarmonicSums`Private`ExpVar^5) + 79/(384*HarmonicSums`Private`ExpVar^4) - 49/(144*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z3 + (63*z3^2)/128 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-1185/(512*HarmonicSums`Private`ExpVar^10) + 153/(256*HarmonicSums`Private`ExpVar^9) + 147/(512*HarmonicSums`Private`ExpVar^8) - 7/(64*HarmonicSums`Private`ExpVar^7) - 15/(256*HarmonicSums`Private`ExpVar^6) + 5/(128*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) - 3/(64*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2))*z3 - (z2*z3)/16) + sinf*(4*li5half + ln2^5/120 - (ln2^3*z2)/12 + ln2*(li4half + (3*z2^2)/8) + z2*(2071/(7680*HarmonicSums`Private`ExpVar^10) + 5919/(44800*HarmonicSums`Private`ExpVar^9) - 1745/(21504*HarmonicSums`Private`ExpVar^8) - 8251/(141120*HarmonicSums`Private`ExpVar^7) + 121/(1920*HarmonicSums`Private`ExpVar^6) + 757/(14400*HarmonicSums`Private`ExpVar^5) - 79/(384*HarmonicSums`Private`ExpVar^4) + 49/(144*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) - (15*z3)/16) - (ln2^2*z3)/16 + (29*z5)/64), S[1, -1, 1, -2, -1, HarmonicSums`Private`ExpVar] :> -11*li6half - (7*ln2^6)/144 + (-1)^HarmonicSums`Private`ExpVar* (3082153/(1128960*HarmonicSums`Private`ExpVar^10) + 6743861/(2822400*HarmonicSums`Private`ExpVar^9) - 2757/(6400*HarmonicSums`Private`ExpVar^8) - 1049/(1800*HarmonicSums`Private`ExpVar^7) + 175/(384*HarmonicSums`Private`ExpVar^6) - 97/(576*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-1185/(64*HarmonicSums`Private`ExpVar^10) + 153/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) - 7/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) + 5/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) - (17*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-395/(512*HarmonicSums`Private`ExpVar^10) + 51/(256*HarmonicSums`Private`ExpVar^9) + 49/(512*HarmonicSums`Private`ExpVar^8) - 7/(192*HarmonicSums`Private`ExpVar^7) - 5/(256*HarmonicSums`Private`ExpVar^6) + 5/(384*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^3) + 1/(96*HarmonicSums`Private`ExpVar^2)) + z2/16) + (-1)^HarmonicSums`Private`ExpVar* (1185/(512*HarmonicSums`Private`ExpVar^10) - 153/(256*HarmonicSums`Private`ExpVar^9) - 147/(512*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^7) + 15/(256*HarmonicSums`Private`ExpVar^6) - 5/(128*HarmonicSums`Private`ExpVar^5) - 3/(128*HarmonicSums`Private`ExpVar^4) + 3/(64*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2))*z2^2 + (8*z2^3)/5 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) - 153/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (73*z2^2)/40) - (5*ln2^3*z3)/24 + (-1)^HarmonicSums`Private`ExpVar* (-32715/(1024*HarmonicSums`Private`ExpVar^10) + 735/(512*HarmonicSums`Private`ExpVar^9) + 945/(256*HarmonicSums`Private`ExpVar^8) - 75/(256*HarmonicSums`Private`ExpVar^7) - 175/(256*HarmonicSums`Private`ExpVar^6) + 15/(128*HarmonicSums`Private`ExpVar^5) + 15/(64*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^3))*z3 + (201*z3^2)/128 + sinf*(7*li5half - (7*ln2^5)/120 - (ln2^3*z2)/6 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-3555/(128*HarmonicSums`Private`ExpVar^10) + 459/(64*HarmonicSums`Private`ExpVar^9) + 441/(128*HarmonicSums`Private`ExpVar^8) - 21/(16*HarmonicSums`Private`ExpVar^7) - 45/(64*HarmonicSums`Private`ExpVar^6) + 15/(32*HarmonicSums`Private`ExpVar^5) + 9/(32*HarmonicSums`Private`ExpVar^4) - 9/(16*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2))*z2 + (31*z2^2)/20) - (5*ln2^2*z3)/16 + (-1)^HarmonicSums`Private`ExpVar* (5925/(512*HarmonicSums`Private`ExpVar^10) - 765/(256*HarmonicSums`Private`ExpVar^9) - 735/(512*HarmonicSums`Private`ExpVar^8) + 35/(64*HarmonicSums`Private`ExpVar^7) + 75/(256*HarmonicSums`Private`ExpVar^6) - 25/(128*HarmonicSums`Private`ExpVar^5) - 15/(128*HarmonicSums`Private`ExpVar^4) + 15/(64*HarmonicSums`Private`ExpVar^3) - 5/(32*HarmonicSums`Private`ExpVar^2))*z3 + (5*z2*z3)/16 - (457*z5)/64) + ln2*(4*li5half + 4013/(7200*HarmonicSums`Private`ExpVar^10) + 455993/(453600*HarmonicSums`Private`ExpVar^9) - 4607/(16128*HarmonicSums`Private`ExpVar^8) - 48371/(141120*HarmonicSums`Private`ExpVar^7) + 2453/(5760*HarmonicSums`Private`ExpVar^6) - 3853/(14400*HarmonicSums`Private`ExpVar^5) + 43/(384*HarmonicSums`Private`ExpVar^4) - 1/(36*HarmonicSums`Private`ExpVar^3) + z2*((-1)^HarmonicSums`Private`ExpVar* (19629/(256*HarmonicSums`Private`ExpVar^10) - 441/(128*HarmonicSums`Private`ExpVar^9) - 567/(64*HarmonicSums`Private`ExpVar^8) + 45/(64*HarmonicSums`Private`ExpVar^7) + 105/(64*HarmonicSums`Private`ExpVar^6) - 9/(32*HarmonicSums`Private`ExpVar^5) - 9/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3)) + z3/8) - (341*z5)/64), S[1, -1, 1, -2, 1, HarmonicSums`Private`ExpVar] :> -6*li6half - ln2^6/120 - 2396159/(36288000*HarmonicSums`Private`ExpVar^ 10) + 1351199891/(1143072000*HarmonicSums`Private`ExpVar^9) - 875783/(6773760*HarmonicSums`Private`ExpVar^8) - 8529251/(29635200*HarmonicSums`Private`ExpVar^7) + 29929/(172800*HarmonicSums`Private`ExpVar^6) - 7729/(432000*HarmonicSums`Private`ExpVar^5) - 73/(2304*HarmonicSums`Private`ExpVar^4) + 1/(54*HarmonicSums`Private`ExpVar^3) - (3*s6)/4 + (ln2^4*z2)/8 - (3*ln2^2*z2^2)/8 + (-1)^HarmonicSums`Private`ExpVar* (711/(512*HarmonicSums`Private`ExpVar^10) - 459/(1280*HarmonicSums`Private`ExpVar^9) - 441/(2560*HarmonicSums`Private`ExpVar^8) + 21/(320*HarmonicSums`Private`ExpVar^7) + 9/(256*HarmonicSums`Private`ExpVar^6) - 3/(128*HarmonicSums`Private`ExpVar^5) - 9/(640*HarmonicSums`Private`ExpVar^4) + 9/(320*HarmonicSums`Private`ExpVar^3) - 3/(160*HarmonicSums`Private`ExpVar^2))*z2^2 + (113*z2^3)/140 - (5*ln2^3*z3)/24 + (-1)^HarmonicSums`Private`ExpVar* (-32715/(1024*HarmonicSums`Private`ExpVar^10) + 735/(512*HarmonicSums`Private`ExpVar^9) + 945/(256*HarmonicSums`Private`ExpVar^8) - 75/(256*HarmonicSums`Private`ExpVar^7) - 175/(256*HarmonicSums`Private`ExpVar^6) + 15/(128*HarmonicSums`Private`ExpVar^5) + 15/(64*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^3))*z3 + (5*ln2*z2*z3)/16 + (47*z3^2)/128 + sinf*(3*li5half - ln2^5/40 - 4013/(7200*HarmonicSums`Private`ExpVar^10) - 455993/(453600*HarmonicSums`Private`ExpVar^9) + 4607/(16128*HarmonicSums`Private`ExpVar^8) + 48371/(141120*HarmonicSums`Private`ExpVar^7) - 2453/(5760*HarmonicSums`Private`ExpVar^6) + 3853/(14400*HarmonicSums`Private`ExpVar^5) - 43/(384*HarmonicSums`Private`ExpVar^4) + 1/(36*HarmonicSums`Private`ExpVar^3) + (ln2^3*z2)/4 + (9*ln2*z2^2)/40 - (5*ln2^2*z3)/16 + (-1)^HarmonicSums`Private`ExpVar* (5925/(512*HarmonicSums`Private`ExpVar^10) - 765/(256*HarmonicSums`Private`ExpVar^9) - 735/(512*HarmonicSums`Private`ExpVar^8) + 35/(64*HarmonicSums`Private`ExpVar^7) + 75/(256*HarmonicSums`Private`ExpVar^6) - 25/(128*HarmonicSums`Private`ExpVar^5) - 15/(128*HarmonicSums`Private`ExpVar^4) + 15/(64*HarmonicSums`Private`ExpVar^3) - 5/(32*HarmonicSums`Private`ExpVar^2))*z3 + (5*z2*z3)/16 - (29*z5)/16), S[1, -1, 1, 2, -1, HarmonicSums`Private`ExpVar] :> 11*li6half + (101*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar*li4half* (3555/(64*HarmonicSums`Private`ExpVar^10) - 459/(32*HarmonicSums`Private`ExpVar^9) - 441/(64*HarmonicSums`Private`ExpVar^8) + 21/(8*HarmonicSums`Private`ExpVar^7) + 45/(32*HarmonicSums`Private`ExpVar^6) - 15/(16*HarmonicSums`Private`ExpVar^5) - 9/(16*HarmonicSums`Private`ExpVar^4) + 9/(8*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2)) - 258311/(153600*HarmonicSums`Private`ExpVar^10) + 263309/(1612800*HarmonicSums`Private`ExpVar^9) + 119683/(258048*HarmonicSums`Private`ExpVar^8) - 17497/(47040*HarmonicSums`Private`ExpVar^7) + 953/(5760*HarmonicSums`Private`ExpVar^6) - 77/(1600*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) + (17*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (1185/(512*HarmonicSums`Private`ExpVar^10) - 153/(256*HarmonicSums`Private`ExpVar^9) - 147/(512*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^7) + 15/(256*HarmonicSums`Private`ExpVar^6) - 5/(128*HarmonicSums`Private`ExpVar^5) - 3/(128*HarmonicSums`Private`ExpVar^4) + 3/(64*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2)) - (5*z2)/12) + (3*li4half*z2)/2 + (-1)^HarmonicSums`Private`ExpVar* (-711/(32*HarmonicSums`Private`ExpVar^10) + 459/(80*HarmonicSums`Private`ExpVar^9) + 441/(160*HarmonicSums`Private`ExpVar^8) - 21/(20*HarmonicSums`Private`ExpVar^7) - 9/(16*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^5) + 9/(40*HarmonicSums`Private`ExpVar^4) - 9/(20*HarmonicSums`Private`ExpVar^3) + 3/(10*HarmonicSums`Private`ExpVar^2))*z2^2 - (479*z2^3)/280 + ln2^2*(3*li4half + (-1)^HarmonicSums`Private`ExpVar* (-3555/(256*HarmonicSums`Private`ExpVar^10) + 459/(128*HarmonicSums`Private`ExpVar^9) + 441/(256*HarmonicSums`Private`ExpVar^8) - 21/(32*HarmonicSums`Private`ExpVar^7) - 45/(128*HarmonicSums`Private`ExpVar^6) + 15/(64*HarmonicSums`Private`ExpVar^5) + 9/(64*HarmonicSums`Private`ExpVar^4) - 9/(32*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2))*z2 - (121*z2^2)/80) + (23*ln2^3*z3)/24 + (-1)^HarmonicSums`Private`ExpVar* (6543/(512*HarmonicSums`Private`ExpVar^10) - 147/(256*HarmonicSums`Private`ExpVar^9) - 189/(128*HarmonicSums`Private`ExpVar^8) + 15/(128*HarmonicSums`Private`ExpVar^7) + 35/(128*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3))*z3 - (177*z3^2)/64 + ln2*((-1)^HarmonicSums`Private`ExpVar* (3502739/(188160*HarmonicSums`Private`ExpVar^10) - 19474801/(1411200*HarmonicSums`Private`ExpVar^9) - 27121/(14400*HarmonicSums`Private`ExpVar^8) + 34669/(14400*HarmonicSums`Private`ExpVar^7) + 79/(192*HarmonicSums`Private`ExpVar^6) - 367/(288*HarmonicSums`Private`ExpVar^5) + 13/(16*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (8295/(256*HarmonicSums`Private`ExpVar^10) - 1071/(128*HarmonicSums`Private`ExpVar^9) - 1029/(256*HarmonicSums`Private`ExpVar^8) + 49/(32*HarmonicSums`Private`ExpVar^7) + 105/(128*HarmonicSums`Private`ExpVar^6) - 35/(64*HarmonicSums`Private`ExpVar^5) - 21/(64*HarmonicSums`Private`ExpVar^4) + 21/(32*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2))*z3 + z2*((-1)^HarmonicSums`Private`ExpVar* (-19629/(256*HarmonicSums`Private`ExpVar^10) + 441/(128*HarmonicSums`Private`ExpVar^9) + 567/(64*HarmonicSums`Private`ExpVar^8) - 45/(64*HarmonicSums`Private`ExpVar^7) - 105/(64*HarmonicSums`Private`ExpVar^6) + 9/(32*HarmonicSums`Private`ExpVar^5) + 9/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3)) + (11*z3)/8)) + sinf*(-4*li5half + (19*ln2^5)/120 - (ln2^3*z2)/3 + ln2*(3*li4half + (-1)^HarmonicSums`Private`ExpVar* (3555/(128*HarmonicSums`Private`ExpVar^10) - 459/(64*HarmonicSums`Private`ExpVar^9) - 441/(128*HarmonicSums`Private`ExpVar^8) + 21/(16*HarmonicSums`Private`ExpVar^7) + 45/(64*HarmonicSums`Private`ExpVar^6) - 15/(32*HarmonicSums`Private`ExpVar^5) - 9/(32*HarmonicSums`Private`ExpVar^4) + 9/(16*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2))*z2 - (7*z2^2)/5) + (23*ln2^2*z3)/16 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) + 153/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z3 + (19*z2*z3)/16 + (35*z5)/32), S[1, -1, 1, 2, 1, HarmonicSums`Private`ExpVar] :> 8*li6half + (31*ln2^6)/360 + (-1)^HarmonicSums`Private`ExpVar* (231518159/(9878400*HarmonicSums`Private`ExpVar^10) + 863397041/(74088000*HarmonicSums`Private`ExpVar^9) - 1139443/(432000*HarmonicSums`Private`ExpVar^8) - 521389/(216000*HarmonicSums`Private`ExpVar^7) + 53/(96*HarmonicSums`Private`ExpVar^6) + 547/(432*HarmonicSums`Private`ExpVar^5) - 5/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^3)) + (5*s6)/4 - (3*li4half*z2)/2 - (23*ln2^4*z2)/48 + (-1)^HarmonicSums`Private`ExpVar* (711/(32*HarmonicSums`Private`ExpVar^10) - 459/(80*HarmonicSums`Private`ExpVar^9) - 441/(160*HarmonicSums`Private`ExpVar^8) + 21/(20*HarmonicSums`Private`ExpVar^7) + 9/(16*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^5) - 9/(40*HarmonicSums`Private`ExpVar^4) + 9/(20*HarmonicSums`Private`ExpVar^3) - 3/(10*HarmonicSums`Private`ExpVar^2))*z2^2 - (55*z2^3)/56 + ln2^2*(3*li4half + (29*z2^2)/80) + (23*ln2^3*z3)/24 + (-1)^HarmonicSums`Private`ExpVar* (6543/(64*HarmonicSums`Private`ExpVar^10) - 147/(32*HarmonicSums`Private`ExpVar^9) - 189/(16*HarmonicSums`Private`ExpVar^8) + 15/(16*HarmonicSums`Private`ExpVar^7) + 35/(16*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^5) - 3/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^3))*z3 - (21*z3^2)/64 + ln2*(6*li5half - (23*z2*z3)/16 - (93*z5)/64) + sinf*(2*li5half + (13*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar* (-3502739/(188160*HarmonicSums`Private`ExpVar^10) + 19474801/(1411200*HarmonicSums`Private`ExpVar^9) + 27121/(14400*HarmonicSums`Private`ExpVar^8) - 34669/(14400*HarmonicSums`Private`ExpVar^7) - 79/(192*HarmonicSums`Private`ExpVar^6) + 367/(288*HarmonicSums`Private`ExpVar^5) - 13/(16*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) - (7*ln2^3*z2)/12 + ln2*(3*li4half + z2^2/40) + (23*ln2^2*z3)/16 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(32*HarmonicSums`Private`ExpVar^10) + 153/(16*HarmonicSums`Private`ExpVar^9) + 147/(32*HarmonicSums`Private`ExpVar^8) - 7/(4*HarmonicSums`Private`ExpVar^7) - 15/(16*HarmonicSums`Private`ExpVar^6) + 5/(8*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2))*z3 - (23*z2*z3)/16 - (23*z5)/64), S[1, -1, 1, -1, -2, HarmonicSums`Private`ExpVar] :> -8*li6half + ln2^6/18 + (-1)^HarmonicSums`Private`ExpVar* (1631699/(2257920*HarmonicSums`Private`ExpVar^10) + 16044893/(5644800*HarmonicSums`Private`ExpVar^9) - 24319/(115200*HarmonicSums`Private`ExpVar^8) - 43067/(57600*HarmonicSums`Private`ExpVar^7) + 97/(192*HarmonicSums`Private`ExpVar^6) - 101/(576*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(3555/(64*HarmonicSums`Private`ExpVar^10) - 459/(32*HarmonicSums`Private`ExpVar^9) - 441/(64*HarmonicSums`Private`ExpVar^8) + 21/(8*HarmonicSums`Private`ExpVar^7) + 45/(32*HarmonicSums`Private`ExpVar^6) - 15/(16*HarmonicSums`Private`ExpVar^5) - 9/(16*HarmonicSums`Private`ExpVar^4) + 9/(8*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2)) - (11*s6)/2 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (1185/(512*HarmonicSums`Private`ExpVar^10) - 153/(256*HarmonicSums`Private`ExpVar^9) - 147/(512*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^7) + 15/(256*HarmonicSums`Private`ExpVar^6) - 5/(128*HarmonicSums`Private`ExpVar^5) - 3/(128*HarmonicSums`Private`ExpVar^4) + 3/(64*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2)) - (13*z2)/48) + (-164039/(307200*HarmonicSums`Private`ExpVar^10) + 1211/(18432*HarmonicSums`Private`ExpVar^9) + 10741/(73728*HarmonicSums`Private`ExpVar^8) - 19/(384*HarmonicSums`Private`ExpVar^7) - 373/(4608*HarmonicSums`Private`ExpVar^6) + 101/(768*HarmonicSums`Private`ExpVar^5) - 59/(512*HarmonicSums`Private`ExpVar^4) + 7/(96*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-2607/(256*HarmonicSums`Private`ExpVar^10) + 1683/(640*HarmonicSums`Private`ExpVar^9) + 1617/(1280*HarmonicSums`Private`ExpVar^8) - 77/(160*HarmonicSums`Private`ExpVar^7) - 33/(128*HarmonicSums`Private`ExpVar^6) + 11/(64*HarmonicSums`Private`ExpVar^5) + 33/(320*HarmonicSums`Private`ExpVar^4) - 33/(160*HarmonicSums`Private`ExpVar^3) + 11/(80*HarmonicSums`Private`ExpVar^2))*z2^2 + (389*z2^3)/560 + ln2^2*(li4half + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) + 153/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (39*z2^2)/80) + (13*ln2^3*z3)/24 + (-1)^HarmonicSums`Private`ExpVar* (85059/(1024*HarmonicSums`Private`ExpVar^10) - 1911/(512*HarmonicSums`Private`ExpVar^9) - 2457/(256*HarmonicSums`Private`ExpVar^8) + 195/(256*HarmonicSums`Private`ExpVar^7) + 455/(256*HarmonicSums`Private`ExpVar^6) - 39/(128*HarmonicSums`Private`ExpVar^5) - 39/(64*HarmonicSums`Private`ExpVar^4) + 13/(32*HarmonicSums`Private`ExpVar^3))*z3 + (69*z3^2)/32 + sinf*(li5half + (3*ln2^5)/40 - (ln2^3*z2)/3 + ln2*(2*li4half + (-1)^HarmonicSums`Private`ExpVar* (1185/(64*HarmonicSums`Private`ExpVar^10) - 153/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) + 7/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z2 + z2^2/20) + (13*ln2^2*z3)/16 + (-1)^HarmonicSums`Private`ExpVar* (-15405/(512*HarmonicSums`Private`ExpVar^10) + 1989/(256*HarmonicSums`Private`ExpVar^9) + 1911/(512*HarmonicSums`Private`ExpVar^8) - 91/(64*HarmonicSums`Private`ExpVar^7) - 195/(256*HarmonicSums`Private`ExpVar^6) + 65/(128*HarmonicSums`Private`ExpVar^5) + 39/(128*HarmonicSums`Private`ExpVar^4) - 39/(64*HarmonicSums`Private`ExpVar^3) + 13/(32*HarmonicSums`Private`ExpVar^2))*z3 - (7*z2*z3)/8 - (33*z5)/64) + ln2*(-3*li5half + z2*((-1)^HarmonicSums`Private`ExpVar* (-6543/(128*HarmonicSums`Private`ExpVar^10) + 147/(64*HarmonicSums`Private`ExpVar^9) + 189/(32*HarmonicSums`Private`ExpVar^8) - 15/(32*HarmonicSums`Private`ExpVar^7) - 35/(32*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) - (13*z3)/16) + (93*z5)/16), S[1, -1, 1, -1, 2, HarmonicSums`Private`ExpVar] :> -9*li6half + (7*ln2^6)/240 + (-1)^HarmonicSums`Private`ExpVar*li4half* (1185/(32*HarmonicSums`Private`ExpVar^10) - 153/(16*HarmonicSums`Private`ExpVar^9) - 147/(32*HarmonicSums`Private`ExpVar^8) + 7/(4*HarmonicSums`Private`ExpVar^7) + 15/(16*HarmonicSums`Private`ExpVar^6) - 5/(8*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2)) - 1284061/(1382400*HarmonicSums`Private`ExpVar^10) + 52577389/(43545600*HarmonicSums`Private`ExpVar^9) + 51871/(430080*HarmonicSums`Private`ExpVar^8) - 194563/(282240*HarmonicSums`Private`ExpVar^7) + 1123/(1920*HarmonicSums`Private`ExpVar^6) - 2267/(7200*HarmonicSums`Private`ExpVar^5) + 23/(192*HarmonicSums`Private`ExpVar^4) - 1/(36*HarmonicSums`Private`ExpVar^3) - (21*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(256*HarmonicSums`Private`ExpVar^10) - 51/(128*HarmonicSums`Private`ExpVar^9) - 49/(256*HarmonicSums`Private`ExpVar^8) + 7/(96*HarmonicSums`Private`ExpVar^7) + 5/(128*HarmonicSums`Private`ExpVar^6) - 5/(192*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3) - 1/(48*HarmonicSums`Private`ExpVar^2)) - (3*z2)/16) + (164039/(153600*HarmonicSums`Private`ExpVar^10) - 1211/(9216*HarmonicSums`Private`ExpVar^9) - 10741/(36864*HarmonicSums`Private`ExpVar^8) + 19/(192*HarmonicSums`Private`ExpVar^7) + 373/(2304*HarmonicSums`Private`ExpVar^6) - 101/(384*HarmonicSums`Private`ExpVar^5) + 59/(256*HarmonicSums`Private`ExpVar^4) - 7/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-8295/(512*HarmonicSums`Private`ExpVar^10) + 1071/(256*HarmonicSums`Private`ExpVar^9) + 1029/(512*HarmonicSums`Private`ExpVar^8) - 49/(64*HarmonicSums`Private`ExpVar^7) - 105/(256*HarmonicSums`Private`ExpVar^6) + 35/(128*HarmonicSums`Private`ExpVar^5) + 21/(128*HarmonicSums`Private`ExpVar^4) - 21/(64*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2))*z2^2 + (341*z2^3)/280 + ln2^2*(li4half + (-1)^HarmonicSums`Private`ExpVar* (-3555/(256*HarmonicSums`Private`ExpVar^10) + 459/(128*HarmonicSums`Private`ExpVar^9) + 441/(256*HarmonicSums`Private`ExpVar^8) - 21/(32*HarmonicSums`Private`ExpVar^7) - 45/(128*HarmonicSums`Private`ExpVar^6) + 15/(64*HarmonicSums`Private`ExpVar^5) + 9/(64*HarmonicSums`Private`ExpVar^4) - 9/(32*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2))*z2 + (19*z2^2)/40) + (13*ln2^3*z3)/24 + (-1)^HarmonicSums`Private`ExpVar* (-6543/(128*HarmonicSums`Private`ExpVar^10) + 147/(64*HarmonicSums`Private`ExpVar^9) + 189/(32*HarmonicSums`Private`ExpVar^8) - 15/(32*HarmonicSums`Private`ExpVar^7) - 35/(32*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3))*z3 + (89*z3^2)/128 + ln2*((-1)^HarmonicSums`Private`ExpVar* (24885/(512*HarmonicSums`Private`ExpVar^10) - 3213/(256*HarmonicSums`Private`ExpVar^9) - 3087/(512*HarmonicSums`Private`ExpVar^8) + 147/(64*HarmonicSums`Private`ExpVar^7) + 315/(256*HarmonicSums`Private`ExpVar^6) - 105/(128*HarmonicSums`Private`ExpVar^5) - 63/(128*HarmonicSums`Private`ExpVar^4) + 63/(64*HarmonicSums`Private`ExpVar^3) - 21/(32*HarmonicSums`Private`ExpVar^2))*z3 + z2*((-1)^HarmonicSums`Private`ExpVar* (6543/(256*HarmonicSums`Private`ExpVar^10) - 147/(128*HarmonicSums`Private`ExpVar^9) - 189/(64*HarmonicSums`Private`ExpVar^8) + 15/(64*HarmonicSums`Private`ExpVar^7) + 35/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (29*z3)/16)) + sinf*(4*li5half + ln2^5/20 - (ln2^3*z2)/3 + ln2*(2*li4half + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) + 153/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + z2^2/5) + (13*ln2^2*z3)/16 + (-1)^HarmonicSums`Private`ExpVar* (1185/(64*HarmonicSums`Private`ExpVar^10) - 153/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) + 7/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z3 + (31*z2*z3)/16 - (405*z5)/64), S[1, -1, 1, 1, -2, HarmonicSums`Private`ExpVar] :> -6*li6half - (7*ln2^6)/240 + (-1)^HarmonicSums`Private`ExpVar*li4half* (-1185/(64*HarmonicSums`Private`ExpVar^10) + 153/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) - 7/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) + 5/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) - 1082707/(460800*HarmonicSums`Private`ExpVar^10) + 1135843/(14515200*HarmonicSums`Private`ExpVar^9) + 162709/(258048*HarmonicSums`Private`ExpVar^8) - 42107/(94080*HarmonicSums`Private`ExpVar^7) + 133/(720*HarmonicSums`Private`ExpVar^6) - 81/(1600*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - (3*s6)/2 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-395/(512*HarmonicSums`Private`ExpVar^10) + 51/(256*HarmonicSums`Private`ExpVar^9) + 49/(512*HarmonicSums`Private`ExpVar^8) - 7/(192*HarmonicSums`Private`ExpVar^7) - 5/(256*HarmonicSums`Private`ExpVar^6) + 5/(384*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^3) + 1/(96*HarmonicSums`Private`ExpVar^2)) + z2/12) + (-li4half + (-1)^HarmonicSums`Private`ExpVar* (82487/(3584*HarmonicSums`Private`ExpVar^10) + 131773/(26880*HarmonicSums`Private`ExpVar^9) - 18431/(7680*HarmonicSums`Private`ExpVar^8) - 2603/(3840*HarmonicSums`Private`ExpVar^7) + 25/(64*HarmonicSums`Private`ExpVar^6) + 19/(96*HarmonicSums`Private`ExpVar^5) - 7/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)))*z2 + (-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) - 153/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*sinf^2*z2 + (-1)^HarmonicSums`Private`ExpVar* (3081/(256*HarmonicSums`Private`ExpVar^10) - 1989/(640*HarmonicSums`Private`ExpVar^9) - 1911/(1280*HarmonicSums`Private`ExpVar^8) + 91/(160*HarmonicSums`Private`ExpVar^7) + 39/(128*HarmonicSums`Private`ExpVar^6) - 13/(64*HarmonicSums`Private`ExpVar^5) - 39/(320*HarmonicSums`Private`ExpVar^4) + 39/(160*HarmonicSums`Private`ExpVar^3) - 13/(80*HarmonicSums`Private`ExpVar^2))*z2^2 + (34*z2^3)/35 + ln2^2*(-(li4half/2) + (-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) - 153/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (29*z2^2)/40) - (ln2^3*z3)/3 + (-1)^HarmonicSums`Private`ExpVar* (-6543/(1024*HarmonicSums`Private`ExpVar^10) + 147/(512*HarmonicSums`Private`ExpVar^9) + 189/(256*HarmonicSums`Private`ExpVar^8) - 15/(256*HarmonicSums`Private`ExpVar^7) - 35/(256*HarmonicSums`Private`ExpVar^6) + 3/(128*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3))*z3 + (7*z3^2)/4 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-8295/(512*HarmonicSums`Private`ExpVar^10) + 1071/(256*HarmonicSums`Private`ExpVar^9) + 1029/(512*HarmonicSums`Private`ExpVar^8) - 49/(64*HarmonicSums`Private`ExpVar^7) - 105/(256*HarmonicSums`Private`ExpVar^6) + 35/(128*HarmonicSums`Private`ExpVar^5) + 21/(128*HarmonicSums`Private`ExpVar^4) - 21/(64*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2))*z3 - (11*z2*z3)/8) + sinf*(li5half - ln2^5/20 + (ln2^3*z2)/6 + ln2*(-li4half + z2^2/5) + z2*((-1)^HarmonicSums`Private`ExpVar* (-6543/(256*HarmonicSums`Private`ExpVar^10) + 147/(128*HarmonicSums`Private`ExpVar^9) + 189/(64*HarmonicSums`Private`ExpVar^8) - 15/(64*HarmonicSums`Private`ExpVar^7) - 35/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) - (3*z3)/8) - (ln2^2*z3)/2 + (-1)^HarmonicSums`Private`ExpVar* (1185/(512*HarmonicSums`Private`ExpVar^10) - 153/(256*HarmonicSums`Private`ExpVar^9) - 147/(512*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^7) + 15/(256*HarmonicSums`Private`ExpVar^6) - 5/(128*HarmonicSums`Private`ExpVar^5) - 3/(128*HarmonicSums`Private`ExpVar^4) + 3/(64*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2))*z3 + (15*z5)/16), S[1, -1, 1, 1, 2, HarmonicSums`Private`ExpVar] :> -5*li6half - ln2^6/360 + (-1)^HarmonicSums`Private`ExpVar* (1737242921/(79027200*HarmonicSums`Private`ExpVar^10) - 6842038859/(592704000*HarmonicSums`Private`ExpVar^9) - 4131829/(1728000*HarmonicSums`Private`ExpVar^8) + 1624403/(864000*HarmonicSums`Private`ExpVar^7) + 245/(288*HarmonicSums`Private`ExpVar^6) - 2489/(1728*HarmonicSums`Private`ExpVar^5) + 27/(32*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3)) - (7*s6)/4 + (ln2^4*z2)/16 + (li4half/2 + (-1)^HarmonicSums`Private`ExpVar* (-82487/(1792*HarmonicSums`Private`ExpVar^10) - 131773/(13440*HarmonicSums`Private`ExpVar^9) + 18431/(3840*HarmonicSums`Private`ExpVar^8) + 2603/(1920*HarmonicSums`Private`ExpVar^7) - 25/(32*HarmonicSums`Private`ExpVar^6) - 19/(48*HarmonicSums`Private`ExpVar^5) + 7/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) + 153/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*sinf^2*z2 + (-1)^HarmonicSums`Private`ExpVar* (-2133/(128*HarmonicSums`Private`ExpVar^10) + 1377/(320*HarmonicSums`Private`ExpVar^9) + 1323/(640*HarmonicSums`Private`ExpVar^8) - 63/(80*HarmonicSums`Private`ExpVar^7) - 27/(64*HarmonicSums`Private`ExpVar^6) + 9/(32*HarmonicSums`Private`ExpVar^5) + 27/(160*HarmonicSums`Private`ExpVar^4) - 27/(80*HarmonicSums`Private`ExpVar^3) + 9/(40*HarmonicSums`Private`ExpVar^2))*z2^2 + (11*z2^3)/14 + ln2^2*(-(li4half/2) + (29*z2^2)/80) - (ln2^3*z3)/3 + (-1)^HarmonicSums`Private`ExpVar* (-6543/(128*HarmonicSums`Private`ExpVar^10) + 147/(64*HarmonicSums`Private`ExpVar^9) + 189/(32*HarmonicSums`Private`ExpVar^8) - 15/(32*HarmonicSums`Private`ExpVar^7) - 35/(32*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3))*z3 + (3*z3^2)/32 + ln2*(-3*li5half + z2*z3 - (31*z5)/32) + sinf*(-2*li5half - ln2^5/40 + (ln2^3*z2)/6 + ln2*(-li4half + z2^2/20) + z2*((-1)^HarmonicSums`Private`ExpVar* (6543/(128*HarmonicSums`Private`ExpVar^10) - 147/(64*HarmonicSums`Private`ExpVar^9) - 189/(32*HarmonicSums`Private`ExpVar^8) + 15/(32*HarmonicSums`Private`ExpVar^7) + 35/(32*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) + z3/2) - (ln2^2*z3)/2 + (-1)^HarmonicSums`Private`ExpVar* (1185/(64*HarmonicSums`Private`ExpVar^10) - 153/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) + 7/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z3 - z5/32), S[1, 1, -2, -1, -1, HarmonicSums`Private`ExpVar] :> 7*li6half - ln2^6/36 + (-1)^HarmonicSums`Private`ExpVar* (-220969/(15360*HarmonicSums`Private`ExpVar^10) + 43381/(7680*HarmonicSums`Private`ExpVar^9) + 17/(16*HarmonicSums`Private`ExpVar^8) - 487/(384*HarmonicSums`Private`ExpVar^7) + 27/(64*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5)) + li4half*(-(15*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(21*HarmonicSums`Private`ExpVar^7) - 1/(15*HarmonicSums`Private`ExpVar^5) + 1/(3*HarmonicSums`Private`ExpVar^3) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) + (19*s6)/4 + ln2^4*(-(360*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(504*HarmonicSums`Private`ExpVar^7) - 1/(360*HarmonicSums`Private`ExpVar^5) + 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar) + z2/16) + (-2*li4half + (-1)^HarmonicSums`Private`ExpVar* (1383/(64*HarmonicSums`Private`ExpVar^10) + 37/(32*HarmonicSums`Private`ExpVar^9) - 337/(128*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) + 33/(64*HarmonicSums`Private`ExpVar^6) - 9/(32*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)))*z2 + (7/(300*HarmonicSums`Private`ExpVar^9) - 1/(60*HarmonicSums`Private`ExpVar^7) + 7/(300*HarmonicSums`Private`ExpVar^5) - 7/(60*HarmonicSums`Private`ExpVar^3) + 7/(20*HarmonicSums`Private`ExpVar^2) - 7/(10*HarmonicSums`Private`ExpVar))*z2^2 + z2^3/14 + ln2^2*(-(li4half/2) + (-1)^HarmonicSums`Private`ExpVar* (1383/(64*HarmonicSums`Private`ExpVar^10) + 37/(32*HarmonicSums`Private`ExpVar^9) - 337/(128*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) + 33/(64*HarmonicSums`Private`ExpVar^6) - 9/(32*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)) + (-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - (21*z2^2)/20) - (7*ln2^3*z3)/24 - (107*z3^2)/64 + sinf^2*(-2*li4half - ln2^4/12 - (ln2^2*z2)/4 + (7*z2^2)/10 - (21*ln2*z3)/16) + ln2*(2*li5half + 288569/(6048000*HarmonicSums`Private`ExpVar^10) + 33094597/(190512000*HarmonicSums`Private`ExpVar^9) - 267769/(3386880*HarmonicSums`Private`ExpVar^8) - 1770691/(14817600*HarmonicSums`Private`ExpVar^7) + 10837/(43200*HarmonicSums`Private`ExpVar^6) - 14801/(54000*HarmonicSums`Private`ExpVar^5) + 2/(9*HarmonicSums`Private`ExpVar^4) - 61/(432*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) + (-7/(160*HarmonicSums`Private`ExpVar^9) + 1/(32*HarmonicSums`Private`ExpVar^7) - 7/(160*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^3) - 21/(32*HarmonicSums`Private`ExpVar^2) + 21/(16*HarmonicSums`Private`ExpVar))*z3 - (7*z2*z3)/8 - (279*z5)/64) + sinf*(3*li5half - ln2^5/15 + (ln2^3*z2)/2 + ln2*(-li4half + (53*z2^2)/40) - (21*ln2^2*z3)/16 - (99*z5)/32), S[1, 1, -2, -1, 1, HarmonicSums`Private`ExpVar] :> li6half + ln2^6/720 + li4half*(-(20*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(28*HarmonicSums`Private`ExpVar^7) - 1/(20*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) - 941377553/(5080320000*HarmonicSums`Private`ExpVar^10) + 41967451157/(160030080000*HarmonicSums`Private`ExpVar^9) + 1300787/(63221760*HarmonicSums`Private`ExpVar^8) - 377288881/(2074464000*HarmonicSums`Private`ExpVar^7) + 77839/(576000*HarmonicSums`Private`ExpVar^6) + 2503/(4320000*HarmonicSums`Private`ExpVar^5) - 497/(4608*HarmonicSums`Private`ExpVar^4) + 119/(864*HarmonicSums`Private`ExpVar^3) - 3/(32*HarmonicSums`Private`ExpVar^2) + (5*s6)/2 + ln2^4*(-(480*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(672*HarmonicSums`Private`ExpVar^7) - 1/(480*HarmonicSums`Private`ExpVar^5) + 1/(96*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar) - z2/12) + ((-3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (-1383/(64*HarmonicSums`Private`ExpVar^10) - 37/(32*HarmonicSums`Private`ExpVar^9) + 337/(128*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^7) - 33/(64*HarmonicSums`Private`ExpVar^6) + 9/(32*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4)))*z2 + (13/(800*HarmonicSums`Private`ExpVar^9) - 13/(1120*HarmonicSums`Private`ExpVar^7) + 13/(800*HarmonicSums`Private`ExpVar^5) - 13/(160*HarmonicSums`Private`ExpVar^3) + 39/(160*HarmonicSums`Private`ExpVar^2) - 39/(80*HarmonicSums`Private`ExpVar))*z2^2 + (209*z2^3)/560 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (1383/(64*HarmonicSums`Private`ExpVar^10) + 37/(32*HarmonicSums`Private`ExpVar^9) - 337/(128*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) + 33/(64*HarmonicSums`Private`ExpVar^6) - 9/(32*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)) - (2*z2^2)/5) + sinf^2*((-3*li4half)/2 - ln2^4/16 + (39*z2^2)/80) + (7*ln2^3*z3)/48 + (7*ln2*z2*z3)/16 - (109*z3^2)/64 + sinf*(li5half - ln2^5/120 - 288569/(6048000*HarmonicSums`Private`ExpVar^ 10) - 33094597/(190512000*HarmonicSums`Private`ExpVar^9) + 267769/(3386880*HarmonicSums`Private`ExpVar^8) + 1770691/(14817600*HarmonicSums`Private`ExpVar^7) - 10837/(43200*HarmonicSums`Private`ExpVar^6) + 14801/(54000*HarmonicSums`Private`ExpVar^5) - 2/(9*HarmonicSums`Private`ExpVar^4) + 61/(432*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (ln2^3*z2)/12 - (43*ln2*z2^2)/40 + (81*z5)/64), S[1, 1, -2, 1, -1, HarmonicSums`Private`ExpVar] :> -2*li6half + (13*ln2^6)/720 - 30126619/(72576000*HarmonicSums`Private`ExpVar^10) + 72863449/(2286144000*HarmonicSums`Private`ExpVar^9) + 3127879/(13547520*HarmonicSums`Private`ExpVar^8) - 15683749/(59270400*HarmonicSums`Private`ExpVar^7) + 64261/(345600*HarmonicSums`Private`ExpVar^6) - 83981/(864000*HarmonicSums`Private`ExpVar^5) + 175/(4608*HarmonicSums`Private`ExpVar^4) - 1/(108*HarmonicSums`Private`ExpVar^3) - s6/2 + (li4half*z2)/2 - (ln2^4*z2)/16 + (1/(800*HarmonicSums`Private`ExpVar^9) - 1/(1120*HarmonicSums`Private`ExpVar^7) + 1/(800*HarmonicSums`Private`ExpVar^5) - 1/(160*HarmonicSums`Private`ExpVar^3) + 3/(160*HarmonicSums`Private`ExpVar^2) - 3/(80*HarmonicSums`Private`ExpVar))*z2^2 + (21*z2^3)/80 + sinf^2*((3*ln2^2*z2)/8 + (3*z2^2)/80) + ln2^2*(li4half/2 + (-1)^HarmonicSums`Private`ExpVar* (-1383/(64*HarmonicSums`Private`ExpVar^10) - 37/(32*HarmonicSums`Private`ExpVar^9) + 337/(128*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^7) - 33/(64*HarmonicSums`Private`ExpVar^6) + 9/(32*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4)) + (1/(80*HarmonicSums`Private`ExpVar^9) - 1/(112*HarmonicSums`Private`ExpVar^7) + 1/(80*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*z2 + (13*z2^2)/20) + (7*ln2^3*z3)/48 + (17*z3^2)/128 + ln2*((-1)^HarmonicSums`Private`ExpVar* (12373/(256*HarmonicSums`Private`ExpVar^10) + 1015/(128*HarmonicSums`Private`ExpVar^9) - 653/(128*HarmonicSums`Private`ExpVar^8) - 21/(64*HarmonicSums`Private`ExpVar^7) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5)) - (7*z2*z3)/16) + sinf*(-li5half + ln2^5/120 - (ln2^3*z2)/12 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-1383/(32*HarmonicSums`Private`ExpVar^10) - 37/(16*HarmonicSums`Private`ExpVar^9) + 337/(64*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) - 33/(32*HarmonicSums`Private`ExpVar^6) + 9/(16*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) - z2^2/20) + (25*z5)/32), S[1, 1, -2, 1, 1, HarmonicSums`Private`ExpVar] :> (-1)^HarmonicSums`Private`ExpVar* (41039/(3840*HarmonicSums`Private`ExpVar^10) + 5131/(480*HarmonicSums`Private`ExpVar^9) - 155/(128*HarmonicSums`Private`ExpVar^8) - 59/(48*HarmonicSums`Private`ExpVar^7) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5)) + li4half*(-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + ln2^4*(-(1440*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(2016*HarmonicSums`Private`ExpVar^7) - 1/(1440*HarmonicSums`Private`ExpVar^5) + 1/(288*HarmonicSums`Private`ExpVar^3) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar) - z2/24) + (-li4half + (-1)^HarmonicSums`Private`ExpVar* (1383/(64*HarmonicSums`Private`ExpVar^10) + 37/(32*HarmonicSums`Private`ExpVar^9) - 337/(128*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) + 33/(64*HarmonicSums`Private`ExpVar^6) - 9/(32*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)))*z2 + (1/(480*HarmonicSums`Private`ExpVar^9) - 1/(672*HarmonicSums`Private`ExpVar^7) + 1/(480*HarmonicSums`Private`ExpVar^5) - 1/(96*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z2^2 + (69*z2^3)/560 + ln2^2*((1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 + z2^2/4) + (49*z3^2)/128 + sinf^2*(-(li4half/2) - ln2^4/48 + (-1)^HarmonicSums`Private`ExpVar* (1383/(64*HarmonicSums`Private`ExpVar^10) + 37/(32*HarmonicSums`Private`ExpVar^9) - 337/(128*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) + 33/(64*HarmonicSums`Private`ExpVar^6) - 9/(32*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)) + (ln2^2*z2)/8 + z2^2/16 - (7*ln2*z3)/16) + ln2*((-7/(480*HarmonicSums`Private`ExpVar^9) + 1/(96*HarmonicSums`Private`ExpVar^7) - 7/(480*HarmonicSums`Private`ExpVar^5) + 7/(96*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3 - (7*z2*z3)/8) + sinf*(-li5half - li4half*ln2 - ln2^5/30 + (-1)^HarmonicSums`Private`ExpVar* (-12373/(256*HarmonicSums`Private`ExpVar^10) - 1015/(128*HarmonicSums`Private`ExpVar^9) + 653/(128*HarmonicSums`Private`ExpVar^8) + 21/(64*HarmonicSums`Private`ExpVar^7) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5)) + (ln2^3*z2)/6 - (7*ln2^2*z3)/16 + (25*z5)/32), S[1, 1, 2, -1, -1, HarmonicSums`Private`ExpVar] :> -5*li6half + ln2^6/18 + li4half*(1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) - 430957/(2880000*HarmonicSums`Private`ExpVar^10) + 101432273/(762048000*HarmonicSums`Private`ExpVar^9) + 3241991/(40642560*HarmonicSums`Private`ExpVar^8) - 2024873/(7408800*HarmonicSums`Private`ExpVar^7) + 364643/(1036800*HarmonicSums`Private`ExpVar^6) - 10393/(32000*HarmonicSums`Private`ExpVar^5) + 371/(1536*HarmonicSums`Private`ExpVar^4) - 7/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - (5*s6)/2 + ln2^4*(1/(1440*HarmonicSums`Private`ExpVar^9) - 1/(2016*HarmonicSums`Private`ExpVar^7) + 1/(1440*HarmonicSums`Private`ExpVar^5) - 1/(288*HarmonicSums`Private`ExpVar^3) + 1/(96*HarmonicSums`Private`ExpVar^2) - 1/(48*HarmonicSums`Private`ExpVar) - (3*z2)/16) + (2*li4half + 1331/(33600*HarmonicSums`Private`ExpVar^10) - 659921/(15876000*HarmonicSums`Private`ExpVar^9) - 1207/(70560*HarmonicSums`Private`ExpVar^8) + 291703/(7408800*HarmonicSums`Private`ExpVar^7) + 161/(14400*HarmonicSums`Private`ExpVar^6) - 12493/(108000*HarmonicSums`Private`ExpVar^5) + 137/(576*HarmonicSums`Private`ExpVar^4) - 151/(432*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2 + (1/(2400*HarmonicSums`Private`ExpVar^9) - 1/(3360*HarmonicSums`Private`ExpVar^7) + 1/(2400*HarmonicSums`Private`ExpVar^5) - 1/(480*HarmonicSums`Private`ExpVar^3) + 1/(160*HarmonicSums`Private`ExpVar^2) - 1/(80*HarmonicSums`Private`ExpVar))*z2^2 + (59*z2^3)/112 + sinf^2*(li4half/2 + ln2^4/48 + (5*ln2^2*z2)/8 + z2^2/80) + ln2^2*((3*li4half)/2 + 1331/(33600*HarmonicSums`Private`ExpVar^10) - 659921/(15876000*HarmonicSums`Private`ExpVar^9) - 1207/(70560*HarmonicSums`Private`ExpVar^8) + 291703/(7408800*HarmonicSums`Private`ExpVar^7) + 161/(14400*HarmonicSums`Private`ExpVar^6) - 12493/(108000*HarmonicSums`Private`ExpVar^5) + 137/(576*HarmonicSums`Private`ExpVar^4) - 151/(432*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) + (1/(48*HarmonicSums`Private`ExpVar^9) - 5/(336*HarmonicSums`Private`ExpVar^7) + 1/(48*HarmonicSums`Private`ExpVar^5) - 5/(48*HarmonicSums`Private`ExpVar^3) + 5/(16*HarmonicSums`Private`ExpVar^2) - 5/(8*HarmonicSums`Private`ExpVar))*z2 + (21*z2^2)/20) + (7*ln2^3*z3)/12 + (11*z3^2)/64 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-3003/(256*HarmonicSums`Private`ExpVar^10) + 843/(128*HarmonicSums`Private`ExpVar^9) + 15/(32*HarmonicSums`Private`ExpVar^8) - 9/(8*HarmonicSums`Private`ExpVar^7) + 13/(32*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5)) + (7*z2*z3)/8) + sinf*(-4*li5half + ln2^5/30 - (ln2^3*z2)/3 - (53*ln2*z2^2)/40 + (7*ln2^2*z3)/8 + (7*z2*z3)/8 + (81*z5)/64), S[1, 1, 2, -1, 1, HarmonicSums`Private`ExpVar] :> li6half + (67*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar* (-5251/(256*HarmonicSums`Private`ExpVar^10) + 593/(128*HarmonicSums`Private`ExpVar^9) + 165/(128*HarmonicSums`Private`ExpVar^8) - 49/(64*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6)) + li4half*(1/(15*HarmonicSums`Private`ExpVar^9) - 1/(21*HarmonicSums`Private`ExpVar^7) + 1/(15*HarmonicSums`Private`ExpVar^5) - 1/(3*HarmonicSums`Private`ExpVar^3) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) - (11*s6)/4 + ln2^4*(1/(360*HarmonicSums`Private`ExpVar^9) - 1/(504*HarmonicSums`Private`ExpVar^7) + 1/(360*HarmonicSums`Private`ExpVar^5) - 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar) - (5*z2)/12) + (li4half/2 - 1331/(33600*HarmonicSums`Private`ExpVar^10) + 659921/(15876000*HarmonicSums`Private`ExpVar^9) + 1207/(70560*HarmonicSums`Private`ExpVar^8) - 291703/(7408800*HarmonicSums`Private`ExpVar^7) - 161/(14400*HarmonicSums`Private`ExpVar^6) + 12493/(108000*HarmonicSums`Private`ExpVar^5) - 137/(576*HarmonicSums`Private`ExpVar^4) + 151/(432*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 + (-(30*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(42*HarmonicSums`Private`ExpVar^7) - 1/(30*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^(-1))* z2^2 - (51*z2^3)/35 + ln2^2*(3*li4half + 1331/(33600*HarmonicSums`Private`ExpVar^10) - 659921/(15876000*HarmonicSums`Private`ExpVar^9) - 1207/(70560*HarmonicSums`Private`ExpVar^8) + 291703/(7408800*HarmonicSums`Private`ExpVar^7) + 161/(14400*HarmonicSums`Private`ExpVar^6) - 12493/(108000*HarmonicSums`Private`ExpVar^5) + 137/(576*HarmonicSums`Private`ExpVar^4) - 151/(432*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) + (-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 + (13*z2^2)/20) + (49*ln2^3*z3)/48 + (73*z3^2)/64 + sinf^2*(2*li4half + ln2^4/12 - (ln2^2*z2)/8 - z2^2 + (21*ln2*z3)/16) + ln2*(4*li5half + (7/(160*HarmonicSums`Private`ExpVar^9) - 1/(32*HarmonicSums`Private`ExpVar^7) + 7/(160*HarmonicSums`Private`ExpVar^5) - 7/(32*HarmonicSums`Private`ExpVar^3) + 21/(32*HarmonicSums`Private`ExpVar^2) - 21/(16*HarmonicSums`Private`ExpVar))*z3 + (7*z2*z3)/16 + (93*z5)/64) + sinf*(ln2^5/8 + (-1)^HarmonicSums`Private`ExpVar* (3003/(256*HarmonicSums`Private`ExpVar^10) - 843/(128*HarmonicSums`Private`ExpVar^9) - 15/(32*HarmonicSums`Private`ExpVar^8) + 9/(8*HarmonicSums`Private`ExpVar^7) - 13/(32*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^5)) - (3*ln2^3*z2)/4 + ln2*(3*li4half - (51*z2^2)/40) + (35*ln2^2*z3)/16 - (7*z2*z3)/8 + (87*z5)/32), S[1, 1, 2, 1, -1, HarmonicSums`Private`ExpVar] :> 10*li6half + (19*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar* (-1575/(256*HarmonicSums`Private`ExpVar^10) - 49/(32*HarmonicSums`Private`ExpVar^9) + 9/(8*HarmonicSums`Private`ExpVar^8) - 9/(32*HarmonicSums`Private`ExpVar^7) + 1/(32*HarmonicSums`Private`ExpVar^6)) + li4half*(1/(20*HarmonicSums`Private`ExpVar^9) - 1/(28*HarmonicSums`Private`ExpVar^7) + 1/(20*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + ln2^4*(1/(480*HarmonicSums`Private`ExpVar^9) - 1/(672*HarmonicSums`Private`ExpVar^7) + 1/(480*HarmonicSums`Private`ExpVar^5) - 1/(96*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar) - z2/48) + (3*li4half*z2)/2 + (-(50*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(70*HarmonicSums`Private`ExpVar^7) - 1/(50*HarmonicSums`Private`ExpVar^5) + 1/(10*HarmonicSums`Private`ExpVar^3) - 3/(10*HarmonicSums`Private`ExpVar^2) + 3/(5*HarmonicSums`Private`ExpVar))*z2^2 - (101*z2^3)/35 + ln2^2*((3*li4half)/2 - 1331/(33600*HarmonicSums`Private`ExpVar^10) + 659921/(15876000*HarmonicSums`Private`ExpVar^9) + 1207/(70560*HarmonicSums`Private`ExpVar^8) - 291703/(7408800*HarmonicSums`Private`ExpVar^7) - 161/(14400*HarmonicSums`Private`ExpVar^6) + 12493/(108000*HarmonicSums`Private`ExpVar^5) - 137/(576*HarmonicSums`Private`ExpVar^4) + 151/(432*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) + (-(40*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(56*HarmonicSums`Private`ExpVar^7) - 1/(40*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 3/(4*HarmonicSums`Private`ExpVar))*z2 - (23*z2^2)/20) + (7*ln2^3*z3)/48 + sinf^2*((3*li4half)/2 + ln2^4/16 - (3*ln2^2*z2)/4 - (3*z2^2)/5 + (7*ln2*z3)/16) + ln2*(6*li5half + 573581/(2646000*HarmonicSums`Private`ExpVar^10) - 16407079/(1666980000*HarmonicSums`Private`ExpVar^9) - 1331479/(11854080*HarmonicSums`Private`ExpVar^8) + 9015493/(518616000*HarmonicSums`Private`ExpVar^7) + 46349/(432000*HarmonicSums`Private`ExpVar^6) - 38209/(1080000*HarmonicSums`Private`ExpVar^5) - 397/(1152*HarmonicSums`Private`ExpVar^4) + 443/(432*HarmonicSums`Private`ExpVar^3) - 31/(16*HarmonicSums`Private`ExpVar^2) + 3/HarmonicSums`Private`ExpVar + (7/(480*HarmonicSums`Private`ExpVar^9) - 1/(96*HarmonicSums`Private`ExpVar^7) + 7/(480*HarmonicSums`Private`ExpVar^5) - 7/(96*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3 + (7*z2*z3)/16) + sinf*(6*li5half + (3*ln2^5)/40 - (ln2^3*z2)/4 + ln2*(3*li4half - 1331/(16800*HarmonicSums`Private`ExpVar^10) + 659921/(7938000*HarmonicSums`Private`ExpVar^9) + 1207/(35280*HarmonicSums`Private`ExpVar^8) - 291703/(3704400*HarmonicSums`Private`ExpVar^7) - 161/(7200*HarmonicSums`Private`ExpVar^6) + 12493/(54000*HarmonicSums`Private`ExpVar^5) - 137/(288*HarmonicSums`Private`ExpVar^4) + 151/(216*HarmonicSums`Private`ExpVar^3) - 7/(8*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1) + (12*z2^2)/5) + (7*ln2^2*z3)/16 - 6*z5), S[1, 1, 2, 1, 1, HarmonicSums`Private`ExpVar] :> 25752521/(666792000*HarmonicSums`Private`ExpVar^10) + 164307633533/(1050197400000*HarmonicSums`Private`ExpVar^9) - 59827751/(3111696000*HarmonicSums`Private`ExpVar^8) - 18981154607/(108909360000*HarmonicSums`Private`ExpVar^7) + 1717951/(6480000*HarmonicSums`Private`ExpVar^6) - 6178871/(16200000*HarmonicSums`Private`ExpVar^5) + 77/(96*HarmonicSums`Private`ExpVar^4) - 2317/(1296*HarmonicSums`Private`ExpVar^3) + 7/(2*HarmonicSums`Private`ExpVar^2) - 6/HarmonicSums`Private`ExpVar + (1331/(33600*HarmonicSums`Private`ExpVar^10) - 659921/(15876000*HarmonicSums`Private`ExpVar^9) - 1207/(70560*HarmonicSums`Private`ExpVar^8) + 291703/(7408800*HarmonicSums`Private`ExpVar^7) + 161/(14400*HarmonicSums`Private`ExpVar^6) - 12493/(108000*HarmonicSums`Private`ExpVar^5) + 137/(576*HarmonicSums`Private`ExpVar^4) - 151/(432*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2 + (1/(50*HarmonicSums`Private`ExpVar^9) - 1/(70*HarmonicSums`Private`ExpVar^7) + 1/(50*HarmonicSums`Private`ExpVar^5) - 1/(10*HarmonicSums`Private`ExpVar^3) + 3/(10*HarmonicSums`Private`ExpVar^2) - 3/(5*HarmonicSums`Private`ExpVar))*z2^2 + (101*z2^3)/35 + sinf^2*(1331/(33600*HarmonicSums`Private`ExpVar^10) - 659921/(15876000*HarmonicSums`Private`ExpVar^9) - 1207/(70560*HarmonicSums`Private`ExpVar^8) + 291703/(7408800*HarmonicSums`Private`ExpVar^7) + 161/(14400*HarmonicSums`Private`ExpVar^6) - 12493/(108000*HarmonicSums`Private`ExpVar^5) + 137/(576*HarmonicSums`Private`ExpVar^4) - 151/(432*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) + (3*z2^2)/5) + sinf*(-573581/(2646000*HarmonicSums`Private`ExpVar^10) + 16407079/(1666980000*HarmonicSums`Private`ExpVar^9) + 1331479/(11854080*HarmonicSums`Private`ExpVar^8) - 9015493/(518616000*HarmonicSums`Private`ExpVar^7) - 46349/(432000*HarmonicSums`Private`ExpVar^6) + 38209/(1080000*HarmonicSums`Private`ExpVar^5) + 397/(1152*HarmonicSums`Private`ExpVar^4) - 443/(432*HarmonicSums`Private`ExpVar^3) + 31/(16*HarmonicSums`Private`ExpVar^2) - 3/HarmonicSums`Private`ExpVar - 6*z5), S[1, 1, -1, -2, -1, HarmonicSums`Private`ExpVar] :> -2*li6half + (37*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar* (-116999/(10752*HarmonicSums`Private`ExpVar^10) + 8771/(3840*HarmonicSums`Private`ExpVar^9) + 4213/(3840*HarmonicSums`Private`ExpVar^8) - 101/(128*HarmonicSums`Private`ExpVar^7) + 11/(48*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5)) + li4half*(1/(15*HarmonicSums`Private`ExpVar^9) - 1/(21*HarmonicSums`Private`ExpVar^7) + 1/(15*HarmonicSums`Private`ExpVar^5) - 1/(3*HarmonicSums`Private`ExpVar^3) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar) - (19*s6)/4 + ln2^4*(1/(360*HarmonicSums`Private`ExpVar^9) - 1/(504*HarmonicSums`Private`ExpVar^7) + 1/(360*HarmonicSums`Private`ExpVar^5) - 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar) - z2/12) + 2*li4half*z2 + (-7/(300*HarmonicSums`Private`ExpVar^9) + 1/(60*HarmonicSums`Private`ExpVar^7) - 7/(300*HarmonicSums`Private`ExpVar^5) + 7/(60*HarmonicSums`Private`ExpVar^3) - 7/(20*HarmonicSums`Private`ExpVar^2) + 7/(10*HarmonicSums`Private`ExpVar))*z2^2 - (17*z2^3)/14 + ln2^2*(li4half/2 + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (3*z2^2)/40) + (5*ln2^3*z3)/48 + (-1)^HarmonicSums`Private`ExpVar* (5175/(2048*HarmonicSums`Private`ExpVar^10) - 6615/(1024*HarmonicSums`Private`ExpVar^9) + 35/(512*HarmonicSums`Private`ExpVar^8) + 525/(512*HarmonicSums`Private`ExpVar^7) - 75/(512*HarmonicSums`Private`ExpVar^6) - 75/(256*HarmonicSums`Private`ExpVar^5) + 15/(64*HarmonicSums`Private`ExpVar^4) - 5/(64*HarmonicSums`Private`ExpVar^3))*z3 + (107*z3^2)/64 + sinf^2*(2*li4half + ln2^4/12 + (ln2^2*z2)/4 - (7*z2^2)/10 + (5*ln2*z3)/16) + sinf*(-7*li5half + ln2^5/10 - (ln2^3*z2)/12 + ln2*(li4half - (91*z2^2)/40) + (5*ln2^2*z3)/16 + (221*z5)/32) + ln2*(-4*li5half + 74749/(378000*HarmonicSums`Private`ExpVar^10) + 14060717/(47628000*HarmonicSums`Private`ExpVar^9) - 258623/(1693440*HarmonicSums`Private`ExpVar^8) - 2334179/(14817600*HarmonicSums`Private`ExpVar^7) + 28631/(86400*HarmonicSums`Private`ExpVar^6) - 73051/(216000*HarmonicSums`Private`ExpVar^5) + 293/(1152*HarmonicSums`Private`ExpVar^4) - 65/(432*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) + (1/(96*HarmonicSums`Private`ExpVar^9) - 5/(672*HarmonicSums`Private`ExpVar^7) + 1/(96*HarmonicSums`Private`ExpVar^5) - 5/(96*HarmonicSums`Private`ExpVar^3) + 5/(32*HarmonicSums`Private`ExpVar^2) - 5/(16*HarmonicSums`Private`ExpVar))*z3 + z2*((-1)^HarmonicSums`Private`ExpVar* (-3105/(512*HarmonicSums`Private`ExpVar^10) + 3969/(256*HarmonicSums`Private`ExpVar^9) - 21/(128*HarmonicSums`Private`ExpVar^8) - 315/(128*HarmonicSums`Private`ExpVar^7) + 45/(128*HarmonicSums`Private`ExpVar^6) + 45/(64*HarmonicSums`Private`ExpVar^5) - 9/(16*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3)) + (13*z3)/8) + (465*z5)/64), S[1, 1, -1, -2, 1, HarmonicSums`Private`ExpVar] :> 3*li6half + ln2^6/240 + li4half*(1/(20*HarmonicSums`Private`ExpVar^9) - 1/(28*HarmonicSums`Private`ExpVar^7) + 1/(20*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + ln2^4*(1/(480*HarmonicSums`Private`ExpVar^9) - 1/(672*HarmonicSums`Private`ExpVar^7) + 1/(480*HarmonicSums`Private`ExpVar^5) - 1/(96*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar)) + 17468543/(1270080000*HarmonicSums`Private`ExpVar^10) + 14680261837/(40007520000*HarmonicSums`Private`ExpVar^9) - 2787577/(47416320*HarmonicSums`Private`ExpVar^8) - 161344867/(1037232000*HarmonicSums`Private`ExpVar^7) + 98719/(864000*HarmonicSums`Private`ExpVar^6) + 59821/(2160000*HarmonicSums`Private`ExpVar^5) - 299/(2304*HarmonicSums`Private`ExpVar^4) + 127/(864*HarmonicSums`Private`ExpVar^3) - 3/(32*HarmonicSums`Private`ExpVar^2) - (9*s6)/4 + (3*li4half*z2)/2 + (-3/(800*HarmonicSums`Private`ExpVar^9) + 3/(1120*HarmonicSums`Private`ExpVar^7) - 3/(800*HarmonicSums`Private`ExpVar^5) + 3/(160*HarmonicSums`Private`ExpVar^3) - 9/(160*HarmonicSums`Private`ExpVar^2) + 9/(80*HarmonicSums`Private`ExpVar))*z2^2 - (31*z2^3)/560 + ln2^2*((-(80*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(112*HarmonicSums`Private`ExpVar^7) - 1/(80*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 3/(8*HarmonicSums`Private`ExpVar))*z2 + (9*z2^2)/80) + (5*ln2^3*z3)/48 + (-1)^HarmonicSums`Private`ExpVar* (5175/(2048*HarmonicSums`Private`ExpVar^10) - 6615/(1024*HarmonicSums`Private`ExpVar^9) + 35/(512*HarmonicSums`Private`ExpVar^8) + 525/(512*HarmonicSums`Private`ExpVar^7) - 75/(512*HarmonicSums`Private`ExpVar^6) - 75/(256*HarmonicSums`Private`ExpVar^5) + 15/(64*HarmonicSums`Private`ExpVar^4) - 5/(64*HarmonicSums`Private`ExpVar^3))*z3 - z3^2/32 + sinf^2*((3*li4half)/2 + ln2^4/16 - (3*ln2^2*z2)/8 - (9*z2^2)/80 + (5*ln2*z3)/16) + ln2*((1/(96*HarmonicSums`Private`ExpVar^9) - 5/(672*HarmonicSums`Private`ExpVar^7) + 1/(96*HarmonicSums`Private`ExpVar^5) - 5/(96*HarmonicSums`Private`ExpVar^3) + 5/(32*HarmonicSums`Private`ExpVar^2) - 5/(16*HarmonicSums`Private`ExpVar))*z3 + (5*z2*z3)/16) + sinf*(-3*li5half + ln2^5/40 - 74749/(378000*HarmonicSums`Private`ExpVar^ 10) - 14060717/(47628000*HarmonicSums`Private`ExpVar^9) + 258623/(1693440*HarmonicSums`Private`ExpVar^8) + 2334179/(14817600*HarmonicSums`Private`ExpVar^7) - 28631/(86400*HarmonicSums`Private`ExpVar^6) + 73051/(216000*HarmonicSums`Private`ExpVar^5) - 293/(1152*HarmonicSums`Private`ExpVar^4) + 65/(432*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) - (ln2^3*z2)/4 + (39*ln2*z2^2)/40 + (5*ln2^2*z3)/16 - (23*z5)/64), S[1, 1, -1, 2, -1, HarmonicSums`Private`ExpVar] :> -4*li6half - (19*ln2^6)/720 + li4half*(-(15*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(21*HarmonicSums`Private`ExpVar^7) - 1/(15*HarmonicSums`Private`ExpVar^5) + 1/(3*HarmonicSums`Private`ExpVar^3) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) - 16634803/(29030400*HarmonicSums`Private`ExpVar^10) + 519075959/(4572288000*HarmonicSums`Private`ExpVar^9) + 254817/(1003520*HarmonicSums`Private`ExpVar^8) - 9174371/(29635200*HarmonicSums`Private`ExpVar^7) + 6149/(28800*HarmonicSums`Private`ExpVar^6) - 11581/(108000*HarmonicSums`Private`ExpVar^5) + 23/(576*HarmonicSums`Private`ExpVar^4) - 1/(108*HarmonicSums`Private`ExpVar^3) - s6 + ln2^4*(-(360*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(504*HarmonicSums`Private`ExpVar^7) - 1/(360*HarmonicSums`Private`ExpVar^5) + 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar) - (7*z2)/48) - (5*li4half*z2)/2 + (1/(48*HarmonicSums`Private`ExpVar^9) - 5/(336*HarmonicSums`Private`ExpVar^7) + 1/(48*HarmonicSums`Private`ExpVar^5) - 5/(48*HarmonicSums`Private`ExpVar^3) + 5/(16*HarmonicSums`Private`ExpVar^2) - 5/(8*HarmonicSums`Private`ExpVar))*z2^2 + (909*z2^3)/560 + ln2^2*(-(li4half/2) + (-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - (9*z2^2)/16) + (5*ln2^3*z3)/6 + (-1)^HarmonicSums`Private`ExpVar* (-1035/(1024*HarmonicSums`Private`ExpVar^10) + 1323/(512*HarmonicSums`Private`ExpVar^9) - 7/(256*HarmonicSums`Private`ExpVar^8) - 105/(256*HarmonicSums`Private`ExpVar^7) + 15/(256*HarmonicSums`Private`ExpVar^6) + 15/(128*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3))*z3 - z3^2/2 + sinf^2*(-2*li4half - ln2^4/12 - (ln2^2*z2)/4 + (5*z2^2)/8 - (ln2*z3)/8) + ln2*((-1)^HarmonicSums`Private`ExpVar* (183115/(5376*HarmonicSums`Private`ExpVar^10) + 5593/(640*HarmonicSums`Private`ExpVar^9) - 9623/(1920*HarmonicSums`Private`ExpVar^8) - 47/(64*HarmonicSums`Private`ExpVar^7) + 137/(96*HarmonicSums`Private`ExpVar^6) - 5/(8*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) + z2*((-1)^HarmonicSums`Private`ExpVar* (3105/(512*HarmonicSums`Private`ExpVar^10) - 3969/(256*HarmonicSums`Private`ExpVar^9) + 21/(128*HarmonicSums`Private`ExpVar^8) + 315/(128*HarmonicSums`Private`ExpVar^7) - 45/(128*HarmonicSums`Private`ExpVar^6) - 45/(64*HarmonicSums`Private`ExpVar^5) + 9/(16*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3)) - z3/8) + (-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z3) + sinf*(6*li5half - ln2^5/20 - (ln2^3*z2)/4 + (21*ln2*z2^2)/20 + (19*ln2^2*z3)/16 + (21*z2*z3)/16 - (61*z5)/8), S[1, 1, -1, 2, 1, HarmonicSums`Private`ExpVar] :> -7*li6half + (7*ln2^6)/144 + (-1)^HarmonicSums`Private`ExpVar* (-5353219/(1128960*HarmonicSums`Private`ExpVar^10) + 45399/(6400*HarmonicSums`Private`ExpVar^9) + 44963/(57600*HarmonicSums`Private`ExpVar^8) - 93/(128*HarmonicSums`Private`ExpVar^7) - 107/(288*HarmonicSums`Private`ExpVar^6) + 13/(32*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) + li4half*(-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) - 4*s6 + ln2^4*(-(1440*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(2016*HarmonicSums`Private`ExpVar^7) - 1/(1440*HarmonicSums`Private`ExpVar^5) + 1/(288*HarmonicSums`Private`ExpVar^3) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar) - (13*z2)/48) + (-(2400*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(3360*HarmonicSums`Private`ExpVar^7) - 1/(2400*HarmonicSums`Private`ExpVar^5) + 1/(480*HarmonicSums`Private`ExpVar^3) - 1/(160*HarmonicSums`Private`ExpVar^2) + 1/(80*HarmonicSums`Private`ExpVar))*z2^2 + (109*z2^3)/280 + ln2^2*(li4half + (1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 + z2^2/40) + (5*ln2^3*z3)/6 + (-1)^HarmonicSums`Private`ExpVar* (-1035/(128*HarmonicSums`Private`ExpVar^10) + 1323/(64*HarmonicSums`Private`ExpVar^9) - 7/(32*HarmonicSums`Private`ExpVar^8) - 105/(32*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) + 15/(16*HarmonicSums`Private`ExpVar^5) - 3/(4*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3))*z3 + (31*z3^2)/16 + sinf^2*(-(li4half/2) - ln2^4/48 + (ln2^2*z2)/8 - z2^2/80 - (ln2*z3)/8) + sinf*(4*li5half + (11*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar* (-183115/(5376*HarmonicSums`Private`ExpVar^10) - 5593/(640*HarmonicSums`Private`ExpVar^9) + 9623/(1920*HarmonicSums`Private`ExpVar^8) + 47/(64*HarmonicSums`Private`ExpVar^7) - 137/(96*HarmonicSums`Private`ExpVar^6) + 5/(8*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4)) - (5*ln2^3*z2)/12 + ln2*(3*li4half + z2^2/20) + (19*ln2^2*z3)/16 - (21*z2*z3)/16 - (85*z5)/64) + ln2*(-2*li5half + (-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z3 - (23*z2*z3)/16 + (403*z5)/64), S[1, 1, -1, -1, -2, HarmonicSums`Private`ExpVar] :> 10*li6half - (41*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar* (-71627/(5376*HarmonicSums`Private`ExpVar^10) + 1781/(960*HarmonicSums`Private`ExpVar^9) + 5627/(3840*HarmonicSums`Private`ExpVar^8) - 113/(128*HarmonicSums`Private`ExpVar^7) + 23/(96*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5)) + (11*s6)/4 + (ln2^4*z2)/4 + ((3*li4half)/2 - 389887/(4300800*HarmonicSums`Private`ExpVar^10) + 51507809/(2032128000*HarmonicSums`Private`ExpVar^9) + 478069/(12042240*HarmonicSums`Private`ExpVar^8) - 3460589/(118540800*HarmonicSums`Private`ExpVar^7) - 7493/(230400*HarmonicSums`Private`ExpVar^6) + 181559/(1728000*HarmonicSums`Private`ExpVar^5) - 1525/(9216*HarmonicSums`Private`ExpVar^4) + 359/(1728*HarmonicSums`Private`ExpVar^3) - 15/(64*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (-(100*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(140*HarmonicSums`Private`ExpVar^7) - 1/(100*HarmonicSums`Private`ExpVar^5) + 1/(20*HarmonicSums`Private`ExpVar^3) - 3/(20*HarmonicSums`Private`ExpVar^2) + 3/(10*HarmonicSums`Private`ExpVar))*z2^2 - (193*z2^3)/70 + ln2^2*((-3*li4half)/2 + (-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 - (15*z2^2)/8) + (ln2^3*z3)/6 + (-1)^HarmonicSums`Private`ExpVar* (-13455/(2048*HarmonicSums`Private`ExpVar^10) + 17199/(1024*HarmonicSums`Private`ExpVar^9) - 91/(512*HarmonicSums`Private`ExpVar^8) - 1365/(512*HarmonicSums`Private`ExpVar^7) + 195/(512*HarmonicSums`Private`ExpVar^6) + 195/(256*HarmonicSums`Private`ExpVar^5) - 39/(64*HarmonicSums`Private`ExpVar^4) + 13/(64*HarmonicSums`Private`ExpVar^3))*z3 - (73*z3^2)/64 + sinf^2*(-((ln2^2*z2)/8) - (3*z2^2)/10 + (ln2*z3)/2) + ln2*(li5half + z2*((-1)^HarmonicSums`Private`ExpVar* (1035/(256*HarmonicSums`Private`ExpVar^10) - 1323/(128*HarmonicSums`Private`ExpVar^9) + 7/(64*HarmonicSums`Private`ExpVar^8) + 105/(64*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) - 15/(32*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + z3/2) + (1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z3 + (465*z5)/64) + sinf*(-5*li5half - ln2^5/12 + (ln2^3*z2)/6 + ln2*(-3*li4half - (59*z2^2)/40) + (ln2^2*z3)/2 - (7*z2*z3)/8 + (247*z5)/32), S[1, 1, -1, -1, 2, HarmonicSums`Private`ExpVar] :> 9*li6half + ln2^6/80 + li4half*(1/(20*HarmonicSums`Private`ExpVar^9) - 1/(28*HarmonicSums`Private`ExpVar^7) + 1/(20*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) - 33204319/(120960000*HarmonicSums`Private`ExpVar^10) + 311108383/(762048000*HarmonicSums`Private`ExpVar^9) + 529177/(8128512*HarmonicSums`Private`ExpVar^8) - 26031499/(59270400*HarmonicSums`Private`ExpVar^7) + 551753/(1036800*HarmonicSums`Private`ExpVar^6) - 127177/(288000*HarmonicSums`Private`ExpVar^5) + 451/(1536*HarmonicSums`Private`ExpVar^4) - 23/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) + s6/4 + ln2^4*(1/(480*HarmonicSums`Private`ExpVar^9) - 1/(672*HarmonicSums`Private`ExpVar^7) + 1/(480*HarmonicSums`Private`ExpVar^5) - 1/(96*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar) - z2/8) + ((-3*li4half)/2 + 389887/(2150400*HarmonicSums`Private`ExpVar^10) - 51507809/(1016064000*HarmonicSums`Private`ExpVar^9) - 478069/(6021120*HarmonicSums`Private`ExpVar^8) + 3460589/(59270400*HarmonicSums`Private`ExpVar^7) + 7493/(115200*HarmonicSums`Private`ExpVar^6) - 181559/(864000*HarmonicSums`Private`ExpVar^5) + 1525/(4608*HarmonicSums`Private`ExpVar^4) - 359/(864*HarmonicSums`Private`ExpVar^3) + 15/(32*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z2 + (-(160*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(224*HarmonicSums`Private`ExpVar^7) - 1/(160*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^3) - 3/(32*HarmonicSums`Private`ExpVar^2) + 3/(16*HarmonicSums`Private`ExpVar))*z2^2 - (137*z2^3)/560 + ln2^2*((-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 + (7*z2^2)/80) + (ln2^3*z3)/6 + (-1)^HarmonicSums`Private`ExpVar* (1035/(256*HarmonicSums`Private`ExpVar^10) - 1323/(128*HarmonicSums`Private`ExpVar^9) + 7/(64*HarmonicSums`Private`ExpVar^8) + 105/(64*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) - 15/(32*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3))*z3 - (31*z3^2)/32 + sinf^2*((3*li4half)/2 + ln2^4/16 - (ln2^2*z2)/8 - (3*z2^2)/16 + (ln2*z3)/2) + ln2*(z2*((-1)^HarmonicSums`Private`ExpVar* (-1035/(512*HarmonicSums`Private`ExpVar^10) + 1323/(256*HarmonicSums`Private`ExpVar^9) - 7/(128*HarmonicSums`Private`ExpVar^8) - 105/(128*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 15/(64*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) + z3/2) + (1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z3) + sinf*(-6*li5half + ln2^5/20 - (ln2^3*z2)/6 - (37*ln2*z2^2)/40 + (ln2^2*z3)/2 + (7*z2*z3)/4 + (29*z5)/64), S[1, 1, -1, 1, -2, HarmonicSums`Private`ExpVar] :> 8*li6half + ln2^6/90 + li4half*(1/(30*HarmonicSums`Private`ExpVar^9) - 1/(42*HarmonicSums`Private`ExpVar^7) + 1/(30*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + ln2^4*(1/(720*HarmonicSums`Private`ExpVar^9) - 1/(1008*HarmonicSums`Private`ExpVar^7) + 1/(720*HarmonicSums`Private`ExpVar^5) - 1/(144*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar)) - 65554921/(72576000*HarmonicSums`Private`ExpVar^10) + 330819469/(2286144000*HarmonicSums`Private`ExpVar^9) + 4761119/(13547520*HarmonicSums`Private`ExpVar^8) - 23178019/(59270400*HarmonicSums`Private`ExpVar^7) + 86891/(345600*HarmonicSums`Private`ExpVar^6) - 102611/(864000*HarmonicSums`Private`ExpVar^5) + 193/(4608*HarmonicSums`Private`ExpVar^4) - 1/(108*HarmonicSums`Private`ExpVar^3) + 2*s6 + (li4half + (-1)^HarmonicSums`Private`ExpVar* (-4347/(256*HarmonicSums`Private`ExpVar^10) + 1939/(256*HarmonicSums`Private`ExpVar^9) + 735/(512*HarmonicSums`Private`ExpVar^8) - 285/(256*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) + 9/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4)))*z2 - (9*ln2^2*z2^2)/20 + (-(300*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(420*HarmonicSums`Private`ExpVar^7) - 1/(300*HarmonicSums`Private`ExpVar^5) + 1/(60*HarmonicSums`Private`ExpVar^3) - 1/(20*HarmonicSums`Private`ExpVar^2) + 1/(10*HarmonicSums`Private`ExpVar))*z2^2 - (151*z2^3)/140 + (ln2^3*z3)/48 + (-1)^HarmonicSums`Private`ExpVar* (1035/(2048*HarmonicSums`Private`ExpVar^10) - 1323/(1024*HarmonicSums`Private`ExpVar^9) + 7/(512*HarmonicSums`Private`ExpVar^8) + 105/(512*HarmonicSums`Private`ExpVar^7) - 15/(512*HarmonicSums`Private`ExpVar^6) - 15/(256*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^3))*z3 - (13*z3^2)/8 + sinf^2*(li4half + ln2^4/24 - z2^2/10 + (ln2*z3)/16) + ln2*((1/(480*HarmonicSums`Private`ExpVar^9) - 1/(672*HarmonicSums`Private`ExpVar^7) + 1/(480*HarmonicSums`Private`ExpVar^5) - 1/(96*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3 + (17*z2*z3)/16) + sinf*(-5*li5half + ln2^5/24 - (ln2^3*z2)/12 - (3*ln2*z2^2)/4 + z2*((-1)^HarmonicSums`Private`ExpVar* (1035/(512*HarmonicSums`Private`ExpVar^10) - 1323/(256*HarmonicSums`Private`ExpVar^9) + 7/(128*HarmonicSums`Private`ExpVar^8) + 105/(128*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 15/(64*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + z3/8) + (ln2^2*z3)/16 + (123*z5)/32), S[1, 1, -1, 1, 2, HarmonicSums`Private`ExpVar] :> 9*li6half - (7*ln2^6)/120 + (-1)^HarmonicSums`Private`ExpVar* (6755659/(282240*HarmonicSums`Private`ExpVar^10) + 107299/(9600*HarmonicSums`Private`ExpVar^9) - 232613/(57600*HarmonicSums`Private`ExpVar^8) - 191/(128*HarmonicSums`Private`ExpVar^7) + 119/(72*HarmonicSums`Private`ExpVar^6) - 21/(32*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^4)) + li4half*(-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + (9*s6)/2 + ln2^4*(-(1440*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(2016*HarmonicSums`Private`ExpVar^7) - 1/(1440*HarmonicSums`Private`ExpVar^5) + 1/(288*HarmonicSums`Private`ExpVar^3) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar) + (3*z2)/16) + (-(li4half/2) + (-1)^HarmonicSums`Private`ExpVar* (4347/(128*HarmonicSums`Private`ExpVar^10) - 1939/(128*HarmonicSums`Private`ExpVar^9) - 735/(256*HarmonicSums`Private`ExpVar^8) + 285/(128*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) - 9/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4)))*z2 + (-(1200*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(1680*HarmonicSums`Private`ExpVar^7) - 1/(1200*HarmonicSums`Private`ExpVar^5) + 1/(240*HarmonicSums`Private`ExpVar^3) - 1/(80*HarmonicSums`Private`ExpVar^2) + 1/(40*HarmonicSums`Private`ExpVar))*z2^2 - (181*z2^3)/140 + ln2^2*((-3*li4half)/2 - (11*z2^2)/10) + (ln2^3*z3)/48 + (-1)^HarmonicSums`Private`ExpVar* (1035/(256*HarmonicSums`Private`ExpVar^10) - 1323/(128*HarmonicSums`Private`ExpVar^9) + 7/(64*HarmonicSums`Private`ExpVar^8) + 105/(64*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) - 15/(32*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3))*z3 - (153*z3^2)/128 + sinf^2*(-(li4half/2) - ln2^4/48 - z2^2/40 + (ln2*z3)/16) + ln2*(li5half + (1/(480*HarmonicSums`Private`ExpVar^9) - 1/(672*HarmonicSums`Private`ExpVar^7) + 1/(480*HarmonicSums`Private`ExpVar^5) - 1/(96*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3 - (7*z2*z3)/16 + (31*z5)/64) + sinf*(-4*li5half - (11*ln2^5)/120 + (ln2^3*z2)/4 + ln2*(-3*li4half - (37*z2^2)/40) + z2*((-1)^HarmonicSums`Private`ExpVar* (-1035/(256*HarmonicSums`Private`ExpVar^10) + 1323/(128*HarmonicSums`Private`ExpVar^9) - 7/(64*HarmonicSums`Private`ExpVar^8) - 105/(64*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 15/(32*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) - z3/16) + (ln2^2*z3)/16 + (277*z5)/64), S[1, 1, 1, -2, -1, HarmonicSums`Private`ExpVar] :> li6half - (7*ln2^6)/360 + li4half*(1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) - 3280534387/(15240960000*HarmonicSums`Private`ExpVar^10) + 36341412763/(480090240000*HarmonicSums`Private`ExpVar^9) + 388605583/(2844979200*HarmonicSums`Private`ExpVar^8) - 796631197/(3111696000*HarmonicSums`Private`ExpVar^7) + 345047/(1296000*HarmonicSums`Private`ExpVar^6) - 10783/(50625*HarmonicSums`Private`ExpVar^5) + 245/(1728*HarmonicSums`Private`ExpVar^4) - 203/(2592*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) + ln2^4*(1/(1440*HarmonicSums`Private`ExpVar^9) - 1/(2016*HarmonicSums`Private`ExpVar^7) + 1/(1440*HarmonicSums`Private`ExpVar^5) - 1/(288*HarmonicSums`Private`ExpVar^3) + 1/(96*HarmonicSums`Private`ExpVar^2) - 1/(48*HarmonicSums`Private`ExpVar) + (5*z2)/48) + (-(480*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(672*HarmonicSums`Private`ExpVar^7) - 1/(480*HarmonicSums`Private`ExpVar^5) + 1/(96*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z2^2 - z2^3/16 + ln2^2*(-(li4half/2) + (-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2) + sinf^2*(li4half/2 + ln2^4/48 - (ln2^2*z2)/8 - z2^2/16) + ln2*((-1)^HarmonicSums`Private`ExpVar* (-5093/(256*HarmonicSums`Private`ExpVar^10) + 921/(128*HarmonicSums`Private`ExpVar^9) + 141/(128*HarmonicSums`Private`ExpVar^8) - 87/(64*HarmonicSums`Private`ExpVar^7) + 7/(16*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5)) + z2*(3/(40*HarmonicSums`Private`ExpVar^10) - 1/(24*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + z3/16)) + sinf^3*((ln2*z2)/4 - (5*z3)/48) - (7*ln2^3*z3)/24 + (-(32*HarmonicSums`Private`ExpVar^10)^(-1) + 5/(288*HarmonicSums`Private`ExpVar^8) - 5/(288*HarmonicSums`Private`ExpVar^6) + 5/(96*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 5/(48*HarmonicSums`Private`ExpVar^2))*z3 + (67*z3^2)/384 + sinf*(li5half - ln2^5/120 + (ln2^3*z2)/12 + ln2*((1/(40*HarmonicSums`Private`ExpVar^9) - 1/(56*HarmonicSums`Private`ExpVar^7) + 1/(40*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 3/(4*HarmonicSums`Private`ExpVar))*z2 + (31*z2^2)/20) - (7*ln2^2*z3)/16 + (-(96*HarmonicSums`Private`ExpVar^9)^(-1) + 5/(672*HarmonicSums`Private`ExpVar^7) - 1/(96*HarmonicSums`Private`ExpVar^5) + 5/(96*HarmonicSums`Private`ExpVar^3) - 5/(32*HarmonicSums`Private`ExpVar^2) + 5/(16*HarmonicSums`Private`ExpVar))*z3 - (3*z2*z3)/4 - (27*z5)/32), S[1, 1, 1, -2, 1, HarmonicSums`Private`ExpVar] :> -2*li6half - ln2^6/36 + (-1)^HarmonicSums`Private`ExpVar* (-6873/(256*HarmonicSums`Private`ExpVar^10) + 641/(128*HarmonicSums`Private`ExpVar^9) + 49/(32*HarmonicSums`Private`ExpVar^8) - 13/(16*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6)) - s6/2 + (li4half*z2)/2 + (7*ln2^4*z2)/48 + (-(800*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(1120*HarmonicSums`Private`ExpVar^7) - 1/(800*HarmonicSums`Private`ExpVar^5) + 1/(160*HarmonicSums`Private`ExpVar^3) - 3/(160*HarmonicSums`Private`ExpVar^2) + 3/(80*HarmonicSums`Private`ExpVar))*z2^2 - (3*sinf^2*z2^2)/80 + (15*z2^3)/112 + ln2^2*(-li4half - z2^2/8) - (7*ln2^3*z3)/24 + (-(32*HarmonicSums`Private`ExpVar^10)^(-1) + 5/(288*HarmonicSums`Private`ExpVar^8) - 5/(288*HarmonicSums`Private`ExpVar^6) + 5/(96*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 5/(48*HarmonicSums`Private`ExpVar^2))*z3 - (5*sinf^3*z3)/48 - (29*z3^2)/384 + sinf*(-li5half - li4half*ln2 - ln2^5/30 + (-1)^HarmonicSums`Private`ExpVar* (5093/(256*HarmonicSums`Private`ExpVar^10) - 921/(128*HarmonicSums`Private`ExpVar^9) - 141/(128*HarmonicSums`Private`ExpVar^8) + 87/(64*HarmonicSums`Private`ExpVar^7) - 7/(16*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^5)) + (ln2^3*z2)/6 - (7*ln2^2*z3)/16 + (-(96*HarmonicSums`Private`ExpVar^9)^(-1) + 5/(672*HarmonicSums`Private`ExpVar^7) - 1/(96*HarmonicSums`Private`ExpVar^5) + 5/(96*HarmonicSums`Private`ExpVar^3) - 5/(32*HarmonicSums`Private`ExpVar^2) + 5/(16*HarmonicSums`Private`ExpVar))*z3 + (z2*z3)/8 + z5/8) + ln2*(-2*li5half + (7*z2*z3)/16 + (31*z5)/32), S[1, 1, 1, 2, -1, HarmonicSums`Private`ExpVar] :> -5*li6half - (13*ln2^6)/360 + (-1)^HarmonicSums`Private`ExpVar* (-1665/(256*HarmonicSums`Private`ExpVar^10) - 131/(64*HarmonicSums`Private`ExpVar^9) + 163/(128*HarmonicSums`Private`ExpVar^8) - 19/(64*HarmonicSums`Private`ExpVar^7) + 1/(32*HarmonicSums`Private`ExpVar^6)) + li4half*(-(20*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(28*HarmonicSums`Private`ExpVar^7) - 1/(20*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) + ln2^4*(-(480*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(672*HarmonicSums`Private`ExpVar^7) - 1/(480*HarmonicSums`Private`ExpVar^5) + 1/(96*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar) + z2/12) - (3*li4half*z2)/2 + (1/(50*HarmonicSums`Private`ExpVar^9) - 1/(70*HarmonicSums`Private`ExpVar^7) + 1/(50*HarmonicSums`Private`ExpVar^5) - 1/(10*HarmonicSums`Private`ExpVar^3) + 3/(10*HarmonicSums`Private`ExpVar^2) - 3/(5*HarmonicSums`Private`ExpVar))*z2^2 + (61*z2^3)/35 + ln2^2*((-3*li4half)/2 + (1/(80*HarmonicSums`Private`ExpVar^9) - 1/(112*HarmonicSums`Private`ExpVar^7) + 1/(80*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*z2 + (3*z2^2)/8) + sinf^3*(-((ln2*z2)/4) + z3/24) - (7*ln2^3*z3)/24 + (1/(80*HarmonicSums`Private`ExpVar^10) - 1/(144*HarmonicSums`Private`ExpVar^8) + 1/(144*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2))*z3 + z3^2/12 + sinf^2*((-3*li4half)/2 - ln2^4/16 + (3*ln2^2*z2)/8 + (3*z2^2)/5 - (7*ln2*z3)/8) + ln2*(-4*li5half + 455543/(3969000*HarmonicSums`Private`ExpVar^10) + 231609829/(5000940000*HarmonicSums`Private`ExpVar^9) - 1905199/(19756800*HarmonicSums`Private`ExpVar^8) - 35635723/(1555848000*HarmonicSums`Private`ExpVar^7) + 105707/(432000*HarmonicSums`Private`ExpVar^6) - 1567541/(3240000*HarmonicSums`Private`ExpVar^5) + 2375/(3456*HarmonicSums`Private`ExpVar^4) - 1085/(1296*HarmonicSums`Private`ExpVar^3) + 15/(16*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1) + z2*(-3/(40*HarmonicSums`Private`ExpVar^10) + 1/(24*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - (11*z3)/8) + (-7/(240*HarmonicSums`Private`ExpVar^9) + 1/(48*HarmonicSums`Private`ExpVar^7) - 7/(240*HarmonicSums`Private`ExpVar^5) + 7/(48*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2) + 7/(8*HarmonicSums`Private`ExpVar))*z3) + sinf*(-4*li5half - (11*ln2^5)/120 + (5*ln2^3*z2)/12 + ln2*(-3*li4half + (-(40*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(56*HarmonicSums`Private`ExpVar^7) - 1/(40*HarmonicSums`Private`ExpVar^5) + 1/(8*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 3/(4*HarmonicSums`Private`ExpVar))*z2 - (31*z2^2)/20) - (7*ln2^2*z3)/8 + (1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z3 + (z2*z3)/8 + 4*z5), S[1, 1, 1, 2, 1, HarmonicSums`Private`ExpVar] :> 609491333/(80015040000*HarmonicSums`Private`ExpVar^10) + 1962179859611/(12602368800000*HarmonicSums`Private`ExpVar^9) - 626964557/(24893568000*HarmonicSums`Private`ExpVar^8) - 41630578391/(326728080000*HarmonicSums`Private`ExpVar^7) + 607727/(12960000*HarmonicSums`Private`ExpVar^6) + 34681859/(97200000*HarmonicSums`Private`ExpVar^5) - 21685/(20736*HarmonicSums`Private`ExpVar^4) + 7517/(3888*HarmonicSums`Private`ExpVar^3) - 47/(16*HarmonicSums`Private`ExpVar^2) + 4/HarmonicSums`Private`ExpVar + (-(50*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(70*HarmonicSums`Private`ExpVar^7) - 1/(50*HarmonicSums`Private`ExpVar^5) + 1/(10*HarmonicSums`Private`ExpVar^3) - 3/(10*HarmonicSums`Private`ExpVar^2) + 3/(5*HarmonicSums`Private`ExpVar))*z2^2 - (3*sinf^2*z2^2)/5 - (61*z2^3)/35 + (1/(10*HarmonicSums`Private`ExpVar^10) - 1/(18*HarmonicSums`Private`ExpVar^8) + 1/(18*HarmonicSums`Private`ExpVar^6) - 1/(6*HarmonicSums`Private`ExpVar^4) + 1/(3*HarmonicSums`Private`ExpVar^3) - 1/(3*HarmonicSums`Private`ExpVar^2))*z3 + (sinf^3*z3)/3 + (2*z3^2)/3 + sinf*(-455543/(3969000*HarmonicSums`Private`ExpVar^10) - 231609829/(5000940000*HarmonicSums`Private`ExpVar^9) + 1905199/(19756800*HarmonicSums`Private`ExpVar^8) + 35635723/(1555848000*HarmonicSums`Private`ExpVar^7) - 105707/(432000*HarmonicSums`Private`ExpVar^6) + 1567541/(3240000*HarmonicSums`Private`ExpVar^5) - 2375/(3456*HarmonicSums`Private`ExpVar^4) + 1085/(1296*HarmonicSums`Private`ExpVar^3) - 15/(16*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1) + (1/(30*HarmonicSums`Private`ExpVar^9) - 1/(42*HarmonicSums`Private`ExpVar^7) + 1/(30*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1))*z3 + z2*z3 + 4*z5), S[1, 1, 1, -1, -2, HarmonicSums`Private`ExpVar] :> -3*li6half - ln2^6/240 + ln2^4*(-(480*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(672*HarmonicSums`Private`ExpVar^7) - 1/(480*HarmonicSums`Private`ExpVar^5) + 1/(96*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar)) + li4half*(-(20*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(28*HarmonicSums`Private`ExpVar^7) - 1/(20*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) - 2717038441/(7620480000*HarmonicSums`Private`ExpVar^10) + 30853990861/(240045120000*HarmonicSums`Private`ExpVar^9) + 261742151/(1422489600*HarmonicSums`Private`ExpVar^8) - 2067503911/(6223392000*HarmonicSums`Private`ExpVar^7) + 1685297/(5184000*HarmonicSums`Private`ExpVar^6) - 3174737/(12960000*HarmonicSums`Private`ExpVar^5) + 2135/(13824*HarmonicSums`Private`ExpVar^4) - 211/(2592*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) + s6/2 + (-(li4half/2) + (-1)^HarmonicSums`Private`ExpVar* (-315/(32*HarmonicSums`Private`ExpVar^10) - 609/(256*HarmonicSums`Private`ExpVar^9) + 735/(512*HarmonicSums`Private`ExpVar^8) + 35/(256*HarmonicSums`Private`ExpVar^7) - 45/(128*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4)))*z2 + (11/(1200*HarmonicSums`Private`ExpVar^9) - 11/(1680*HarmonicSums`Private`ExpVar^7) + 11/(1200*HarmonicSums`Private`ExpVar^5) - 11/(240*HarmonicSums`Private`ExpVar^3) + 11/(80*HarmonicSums`Private`ExpVar^2) - 11/(40*HarmonicSums`Private`ExpVar))*z2^2 + (11*z2^3)/40 + ln2^2*((1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 - z2^2/20) + sinf^2*((-3*li4half)/2 - ln2^4/16 + (ln2^2*z2)/8 + (11*z2^2)/40) + ln2*z2*(-(20*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(36*HarmonicSums`Private`ExpVar^8) - 1/(36*HarmonicSums`Private`ExpVar^6) + 1/(12*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(6*HarmonicSums`Private`ExpVar^2) - z3/3) + sinf^3*(-((ln2*z2)/6) + (13*z3)/48) + (13/(160*HarmonicSums`Private`ExpVar^10) - 13/(288*HarmonicSums`Private`ExpVar^8) + 13/(288*HarmonicSums`Private`ExpVar^6) - 13/(96*HarmonicSums`Private`ExpVar^4) + 13/(48*HarmonicSums`Private`ExpVar^3) - 13/(48*HarmonicSums`Private`ExpVar^2))*z3 + (19*z3^2)/24 + sinf*(3*li5half - ln2^5/40 + (ln2^3*z2)/12 + ln2*((-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z2 - (7*z2^2)/20) + (13/(480*HarmonicSums`Private`ExpVar^9) - 13/(672*HarmonicSums`Private`ExpVar^7) + 13/(480*HarmonicSums`Private`ExpVar^5) - 13/(96*HarmonicSums`Private`ExpVar^3) + 13/(32*HarmonicSums`Private`ExpVar^2) - 13/(16*HarmonicSums`Private`ExpVar))*z3 - (z2*z3)/16 - z5/32), S[1, 1, 1, -1, 2, HarmonicSums`Private`ExpVar] :> -2*li6half + (7*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar* (-13667/(512*HarmonicSums`Private`ExpVar^10) + 20783/(3840*HarmonicSums`Private`ExpVar^9) + 445/(192*HarmonicSums`Private`ExpVar^8) - 317/(192*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5)) + li4half*(-(30*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(42*HarmonicSums`Private`ExpVar^7) - 1/(30*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1)) + s6/2 + ln2^4*(-(720*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(1008*HarmonicSums`Private`ExpVar^7) - 1/(720*HarmonicSums`Private`ExpVar^5) + 1/(144*HarmonicSums`Private`ExpVar^3) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar) - z2/24) + ((-3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (315/(16*HarmonicSums`Private`ExpVar^10) + 609/(128*HarmonicSums`Private`ExpVar^9) - 735/(256*HarmonicSums`Private`ExpVar^8) - 35/(128*HarmonicSums`Private`ExpVar^7) + 45/(64*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)))*z2 + (7/(480*HarmonicSums`Private`ExpVar^9) - 1/(96*HarmonicSums`Private`ExpVar^7) + 7/(480*HarmonicSums`Private`ExpVar^5) - 7/(96*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z2^2 + (661*z2^3)/560 + ln2^2*(li4half/2 + (1/(80*HarmonicSums`Private`ExpVar^9) - 1/(112*HarmonicSums`Private`ExpVar^7) + 1/(80*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 3/(8*HarmonicSums`Private`ExpVar))*z2 + (91*z2^2)/80) + sinf^3*((ln2*z2)/12 - z3/6) - (7*ln2^3*z3)/16 + (-(20*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(36*HarmonicSums`Private`ExpVar^8) - 1/(36*HarmonicSums`Private`ExpVar^6) + 1/(12*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(6*HarmonicSums`Private`ExpVar^2))*z3 - (179*z3^2)/384 + sinf^2*(-li4half - ln2^4/24 + (3*ln2^2*z2)/8 + (7*z2^2)/16 - (21*ln2*z3)/16) + sinf*(4*li5half + ln2^5/120 + (ln2^3*z2)/6 + ln2*(li4half + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (61*z2^2)/40) - (21*ln2^2*z3)/16 + (-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z3 - (z2*z3)/16 - (39*z5)/8) + ln2*(li5half + z2*(1/(40*HarmonicSums`Private`ExpVar^10) - 1/(72*HarmonicSums`Private`ExpVar^8) + 1/(72*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) - (55*z3)/48) + (-7/(160*HarmonicSums`Private`ExpVar^9) + 1/(32*HarmonicSums`Private`ExpVar^7) - 7/(160*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^3) - 21/(32*HarmonicSums`Private`ExpVar^2) + 21/(16*HarmonicSums`Private`ExpVar))*z3 - (155*z5)/32), S[1, 1, 1, 1, -2, HarmonicSums`Private`ExpVar] :> li6half + ln2^6/72 + (-1)^HarmonicSums`Private`ExpVar* (-2925/(512*HarmonicSums`Private`ExpVar^10) - 725/(256*HarmonicSums`Private`ExpVar^9) + 185/(128*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 1/(32*HarmonicSums`Private`ExpVar^6)) + li4half*(1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + ln2^4*(1/(1440*HarmonicSums`Private`ExpVar^9) - 1/(2016*HarmonicSums`Private`ExpVar^7) + 1/(1440*HarmonicSums`Private`ExpVar^5) - 1/(288*HarmonicSums`Private`ExpVar^3) + 1/(96*HarmonicSums`Private`ExpVar^2) - 1/(48*HarmonicSums`Private`ExpVar) - z2/24) + (li4half/2 + 121/(33600*HarmonicSums`Private`ExpVar^10) + 59/(2016*HarmonicSums`Private`ExpVar^9) - 23/(10080*HarmonicSums`Private`ExpVar^8) - 11/(480*HarmonicSums`Private`ExpVar^7) + 7/(2880*HarmonicSums`Private`ExpVar^6) + 5/(96*HarmonicSums`Private`ExpVar^5) - 19/(192*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 - (sinf^4*z2)/48 + (-13/(1200*HarmonicSums`Private`ExpVar^9) + 13/(1680*HarmonicSums`Private`ExpVar^7) - 13/(1200*HarmonicSums`Private`ExpVar^5) + 13/(240*HarmonicSums`Private`ExpVar^3) - 13/(80*HarmonicSums`Private`ExpVar^2) + 13/(40*HarmonicSums`Private`ExpVar))*z2^2 - (303*z2^3)/560 + ln2^2*(li4half/2 + (-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 - z2^2/8) + (7*ln2^3*z3)/48 + (-(160*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(288*HarmonicSums`Private`ExpVar^8) - 1/(288*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2))*z3 - (sinf^3*z3)/48 - z3^2/24 + sinf^2*(li4half/2 + ln2^4/48 - (ln2^2*z2)/8 + (-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 - (13*z2^2)/40 + (7*ln2*z3)/16) + ln2*(li5half + (7/(480*HarmonicSums`Private`ExpVar^9) - 1/(96*HarmonicSums`Private`ExpVar^7) + 7/(480*HarmonicSums`Private`ExpVar^5) - 7/(96*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3 + (7*z2*z3)/16) + sinf*(li5half + li4half*ln2 + ln2^5/30 - (ln2^3*z2)/6 + z2*(-(40*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(72*HarmonicSums`Private`ExpVar^8) - 1/(72*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - (11*z3)/48) + (7*ln2^2*z3)/16 + (-(480*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(672*HarmonicSums`Private`ExpVar^7) - 1/(480*HarmonicSums`Private`ExpVar^5) + 1/(96*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3 - z5), S[1, 1, 1, 1, 2, HarmonicSums`Private`ExpVar] :> -8370805069/(160030080000*HarmonicSums`Private`ExpVar^10) + 2801782330757/(25204737600000*HarmonicSums`Private`ExpVar^9) + 986967829/(49787136000*HarmonicSums`Private`ExpVar^8) - 164540407607/(653456160000*HarmonicSums`Private`ExpVar^7) + 12724109/(25920000*HarmonicSums`Private`ExpVar^6) - 133377367/(194400000*HarmonicSums`Private`ExpVar^5) + 34205/(41472*HarmonicSums`Private`ExpVar^4) - 7111/(7776*HarmonicSums`Private`ExpVar^3) + 31/(32*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^(-1) + (-121/(16800*HarmonicSums`Private`ExpVar^10) - 59/(1008*HarmonicSums`Private`ExpVar^9) + 23/(5040*HarmonicSums`Private`ExpVar^8) + 11/(240*HarmonicSums`Private`ExpVar^7) - 7/(1440*HarmonicSums`Private`ExpVar^6) - 5/(48*HarmonicSums`Private`ExpVar^5) + 19/(96*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (sinf^4*z2)/24 + (3/(200*HarmonicSums`Private`ExpVar^9) - 3/(280*HarmonicSums`Private`ExpVar^7) + 3/(200*HarmonicSums`Private`ExpVar^5) - 3/(40*HarmonicSums`Private`ExpVar^3) + 9/(40*HarmonicSums`Private`ExpVar^2) - 9/(20*HarmonicSums`Private`ExpVar))*z2^2 + (183*z2^3)/280 + sinf^2*((1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (9*z2^2)/20) + (-(20*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(36*HarmonicSums`Private`ExpVar^8) - 1/(36*HarmonicSums`Private`ExpVar^6) + 1/(12*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^3) + 1/(6*HarmonicSums`Private`ExpVar^2))*z3 - (sinf^3*z3)/6 - z3^2/3 + sinf*(z2*(1/(20*HarmonicSums`Private`ExpVar^10) - 1/(36*HarmonicSums`Private`ExpVar^8) + 1/(36*HarmonicSums`Private`ExpVar^6) - 1/(12*HarmonicSums`Private`ExpVar^4) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(6*HarmonicSums`Private`ExpVar^2) - z3/6) + (-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z3 - z5), S[-1, -1, -1, -1, -1, -1, HarmonicSums`Private`ExpVar] :> ln2^6/720 + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (31/(480*HarmonicSums`Private`ExpVar^10) - 17/(1920*HarmonicSums`Private`ExpVar^8) + 1/(480*HarmonicSums`Private`ExpVar^6) - 1/(960*HarmonicSums`Private`ExpVar^4) + 1/(480*HarmonicSums`Private`ExpVar^2) - 1/(240*HarmonicSums`Private`ExpVar)) + 370903/(5160960*HarmonicSums`Private`ExpVar^10) + 8659283/(11612160*HarmonicSums`Private`ExpVar^9) + 943/(184320*HarmonicSums`Private`ExpVar^8) - 20219/(46080*HarmonicSums`Private`ExpVar^7) + 3739/(9216*HarmonicSums`Private`ExpVar^6) - 291/(1280*HarmonicSums`Private`ExpVar^5) + 17/(192*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3) + ln2^4*(-19/(1536*HarmonicSums`Private`ExpVar^10) + 263/(11520*HarmonicSums`Private`ExpVar^9) + 3/(1024*HarmonicSums`Private`ExpVar^8) - 23/(4032*HarmonicSums`Private`ExpVar^7) - 1/(768*HarmonicSums`Private`ExpVar^6) + 19/(5760*HarmonicSums`Private`ExpVar^5) + 1/(768*HarmonicSums`Private`ExpVar^4) - 5/(576*HarmonicSums`Private`ExpVar^3) + 1/(64*HarmonicSums`Private`ExpVar^2) - 1/(48*HarmonicSums`Private`ExpVar) + z2/48) + (-171/(2560*HarmonicSums`Private`ExpVar^10) + 789/(6400*HarmonicSums`Private`ExpVar^9) + 81/(5120*HarmonicSums`Private`ExpVar^8) - 69/(2240*HarmonicSums`Private`ExpVar^7) - 9/(1280*HarmonicSums`Private`ExpVar^6) + 57/(3200*HarmonicSums`Private`ExpVar^5) + 9/(1280*HarmonicSums`Private`ExpVar^4) - 3/(64*HarmonicSums`Private`ExpVar^3) + 27/(320*HarmonicSums`Private`ExpVar^2) - 9/(80*HarmonicSums`Private`ExpVar))*z2^2 + (61*z2^3)/560 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-100969/(46080*HarmonicSums`Private`ExpVar^10) + 4213/(53760*HarmonicSums`Private`ExpVar^9) + 9923/(32256*HarmonicSums`Private`ExpVar^8) - 91/(5760*HarmonicSums`Private`ExpVar^7) - 901/(11520*HarmonicSums`Private`ExpVar^6) + 5/(1152*HarmonicSums`Private`ExpVar^5) + 37/(576*HarmonicSums`Private`ExpVar^4) - 7/(96*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (31/(48*HarmonicSums`Private`ExpVar^10) - 17/(192*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar))*z2 + z3/24) + (-1)^HarmonicSums`Private`ExpVar* (-100969/(30720*HarmonicSums`Private`ExpVar^10) + 4213/(35840*HarmonicSums`Private`ExpVar^9) + 9923/(21504*HarmonicSums`Private`ExpVar^8) - 91/(3840*HarmonicSums`Private`ExpVar^7) - 901/(7680*HarmonicSums`Private`ExpVar^6) + 5/(768*HarmonicSums`Private`ExpVar^5) + 37/(384*HarmonicSums`Private`ExpVar^4) - 7/(64*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z3 + z3^2/32 + z2*(10693/(67200*HarmonicSums`Private`ExpVar^10) - 168251/(322560*HarmonicSums`Private`ExpVar^9) - 11251/(258048*HarmonicSums`Private`ExpVar^8) + 393/(2560*HarmonicSums`Private`ExpVar^7) + 559/(23040*HarmonicSums`Private`ExpVar^6) - 1/(6*HarmonicSums`Private`ExpVar^5) + 145/(768*HarmonicSums`Private`ExpVar^4) - 13/(96*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(10693/(67200*HarmonicSums`Private`ExpVar^10) - 168251/(322560*HarmonicSums`Private`ExpVar^9) - 11251/(258048*HarmonicSums`Private`ExpVar^8) + 393/(2560*HarmonicSums`Private`ExpVar^7) + 559/(23040*HarmonicSums`Private`ExpVar^6) - 1/(6*HarmonicSums`Private`ExpVar^5) + 145/(768*HarmonicSums`Private`ExpVar^4) - 13/(96*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) + (-19/(256*HarmonicSums`Private`ExpVar^10) + 263/(1920*HarmonicSums`Private`ExpVar^9) + 9/(512*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) - 1/(128*HarmonicSums`Private`ExpVar^6) + 19/(960*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - 5/(96*HarmonicSums`Private`ExpVar^3) + 3/(32*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 + (9*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*((-1)^HarmonicSums`Private`ExpVar* (510875/(73728*HarmonicSums`Private`ExpVar^10) - 1033057/(1290240*HarmonicSums`Private`ExpVar^9) - 24523/(23040*HarmonicSums`Private`ExpVar^8) + 3521/(23040*HarmonicSums`Private`ExpVar^7) + 247/(512*HarmonicSums`Private`ExpVar^6) - 353/(768*HarmonicSums`Private`ExpVar^5) + 11/(48*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (279/(160*HarmonicSums`Private`ExpVar^10) - 153/(640*HarmonicSums`Private`ExpVar^8) + 9/(160*HarmonicSums`Private`ExpVar^6) - 9/(320*HarmonicSums`Private`ExpVar^4) + 9/(160*HarmonicSums`Private`ExpVar^2) - 9/(80*HarmonicSums`Private`ExpVar))*z2^2 + z2*((-1)^HarmonicSums`Private`ExpVar* (-100969/(15360*HarmonicSums`Private`ExpVar^10) + 4213/(17920*HarmonicSums`Private`ExpVar^9) + 9923/(10752*HarmonicSums`Private`ExpVar^8) - 91/(1920*HarmonicSums`Private`ExpVar^7) - 901/(3840*HarmonicSums`Private`ExpVar^6) + 5/(384*HarmonicSums`Private`ExpVar^5) + 37/(192*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) + z3/8) + (-19/(256*HarmonicSums`Private`ExpVar^10) + 263/(1920*HarmonicSums`Private`ExpVar^9) + 9/(512*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) - 1/(128*HarmonicSums`Private`ExpVar^6) + 19/(960*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - 5/(96*HarmonicSums`Private`ExpVar^3) + 3/(32*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z3 + (3*z5)/16) + (-1)^HarmonicSums`Private`ExpVar*(93/(64*HarmonicSums`Private`ExpVar^10) - 51/(256*HarmonicSums`Private`ExpVar^8) + 3/(64*HarmonicSums`Private`ExpVar^6) - 3/(128*HarmonicSums`Private`ExpVar^4) + 3/(64*HarmonicSums`Private`ExpVar^2) - 3/(32*HarmonicSums`Private`ExpVar))*z5, S[-1, -1, -1, -1, -1, 1, HarmonicSums`Private`ExpVar] :> ln2^6/720 + (-1)^HarmonicSums`Private`ExpVar* (695146237/(185794560*HarmonicSums`Private`ExpVar^10) + 335671219/(120422400*HarmonicSums`Private`ExpVar^9) - 452497/(1075200*HarmonicSums`Private`ExpVar^8) - 92213/(153600*HarmonicSums`Private`ExpVar^7) + 5081/(30720*HarmonicSums`Private`ExpVar^6) + 2057/(9216*HarmonicSums`Private`ExpVar^5) - 67/(288*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(480*HarmonicSums`Private`ExpVar^10) - 17/(1920*HarmonicSums`Private`ExpVar^8) + 1/(480*HarmonicSums`Private`ExpVar^6) - 1/(960*HarmonicSums`Private`ExpVar^4) + 1/(480*HarmonicSums`Private`ExpVar^2) - 1/(240*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-510875/(73728*HarmonicSums`Private`ExpVar^10) + 1033057/(1290240*HarmonicSums`Private`ExpVar^9) + 24523/(23040*HarmonicSums`Private`ExpVar^8) - 3521/(23040*HarmonicSums`Private`ExpVar^7) - 247/(512*HarmonicSums`Private`ExpVar^6) + 353/(768*HarmonicSums`Private`ExpVar^5) - 11/(48*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3))*sinf + ln2^4*(-19/(1536*HarmonicSums`Private`ExpVar^10) + 263/(11520*HarmonicSums`Private`ExpVar^9) + 3/(1024*HarmonicSums`Private`ExpVar^8) - 23/(4032*HarmonicSums`Private`ExpVar^7) - 1/(768*HarmonicSums`Private`ExpVar^6) + 19/(5760*HarmonicSums`Private`ExpVar^5) + 1/(768*HarmonicSums`Private`ExpVar^4) - 5/(576*HarmonicSums`Private`ExpVar^3) + 1/(64*HarmonicSums`Private`ExpVar^2) - 1/(48*HarmonicSums`Private`ExpVar) + z2/48) + (361/(2560*HarmonicSums`Private`ExpVar^10) - 4997/(19200*HarmonicSums`Private`ExpVar^9) - 171/(5120*HarmonicSums`Private`ExpVar^8) + 437/(6720*HarmonicSums`Private`ExpVar^7) + 19/(1280*HarmonicSums`Private`ExpVar^6) - 361/(9600*HarmonicSums`Private`ExpVar^5) - 19/(1280*HarmonicSums`Private`ExpVar^4) + 19/(192*HarmonicSums`Private`ExpVar^3) - 57/(320*HarmonicSums`Private`ExpVar^2) + 19/(80*HarmonicSums`Private`ExpVar))*z2^2 - (187*z2^3)/560 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-100969/(46080*HarmonicSums`Private`ExpVar^10) + 4213/(53760*HarmonicSums`Private`ExpVar^9) + 9923/(32256*HarmonicSums`Private`ExpVar^8) - 91/(5760*HarmonicSums`Private`ExpVar^7) - 901/(11520*HarmonicSums`Private`ExpVar^6) + 5/(1152*HarmonicSums`Private`ExpVar^5) + 37/(576*HarmonicSums`Private`ExpVar^4) - 7/(96*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (31/(48*HarmonicSums`Private`ExpVar^10) - 17/(192*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar))*z2 + z3/24) + (-1)^HarmonicSums`Private`ExpVar* (706783/(30720*HarmonicSums`Private`ExpVar^10) - 4213/(5120*HarmonicSums`Private`ExpVar^9) - 9923/(3072*HarmonicSums`Private`ExpVar^8) + 637/(3840*HarmonicSums`Private`ExpVar^7) + 6307/(7680*HarmonicSums`Private`ExpVar^6) - 35/(768*HarmonicSums`Private`ExpVar^5) - 259/(384*HarmonicSums`Private`ExpVar^4) + 49/(64*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2))*z3 + z3^2/32 + z2*(-10693/(67200*HarmonicSums`Private`ExpVar^10) + 168251/(322560*HarmonicSums`Private`ExpVar^9) + 11251/(258048*HarmonicSums`Private`ExpVar^8) - 393/(2560*HarmonicSums`Private`ExpVar^7) - 559/(23040*HarmonicSums`Private`ExpVar^6) + 1/(6*HarmonicSums`Private`ExpVar^5) - 145/(768*HarmonicSums`Private`ExpVar^4) + 13/(96*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(10693/(67200*HarmonicSums`Private`ExpVar^10) - 168251/(322560*HarmonicSums`Private`ExpVar^9) - 11251/(258048*HarmonicSums`Private`ExpVar^8) + 393/(2560*HarmonicSums`Private`ExpVar^7) + 559/(23040*HarmonicSums`Private`ExpVar^6) - 1/(6*HarmonicSums`Private`ExpVar^5) + 145/(768*HarmonicSums`Private`ExpVar^4) - 13/(96*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) + (-19/(256*HarmonicSums`Private`ExpVar^10) + 263/(1920*HarmonicSums`Private`ExpVar^9) + 9/(512*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) - 1/(128*HarmonicSums`Private`ExpVar^6) + 19/(960*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - 5/(96*HarmonicSums`Private`ExpVar^3) + 3/(32*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 + (9*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*((-1)^HarmonicSums`Private`ExpVar* (279/(160*HarmonicSums`Private`ExpVar^10) - 153/(640*HarmonicSums`Private`ExpVar^8) + 9/(160*HarmonicSums`Private`ExpVar^6) - 9/(320*HarmonicSums`Private`ExpVar^4) + 9/(160*HarmonicSums`Private`ExpVar^2) - 9/(80*HarmonicSums`Private`ExpVar))*z2^2 + z2*((-1)^HarmonicSums`Private`ExpVar* (-100969/(15360*HarmonicSums`Private`ExpVar^10) + 4213/(17920*HarmonicSums`Private`ExpVar^9) + 9923/(10752*HarmonicSums`Private`ExpVar^8) - 91/(1920*HarmonicSums`Private`ExpVar^7) - 901/(3840*HarmonicSums`Private`ExpVar^6) + 5/(384*HarmonicSums`Private`ExpVar^5) + 37/(192*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) + z3/8) + (-19/(256*HarmonicSums`Private`ExpVar^10) + 263/(1920*HarmonicSums`Private`ExpVar^9) + 9/(512*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) - 1/(128*HarmonicSums`Private`ExpVar^6) + 19/(960*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - 5/(96*HarmonicSums`Private`ExpVar^3) + 3/(32*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z3 + (3*z5)/16) + (-1)^HarmonicSums`Private`ExpVar* (-899/(64*HarmonicSums`Private`ExpVar^10) + 493/(256*HarmonicSums`Private`ExpVar^8) - 29/(64*HarmonicSums`Private`ExpVar^6) + 29/(128*HarmonicSums`Private`ExpVar^4) - 29/(64*HarmonicSums`Private`ExpVar^2) + 29/(32*HarmonicSums`Private`ExpVar))*z5, S[-1, -1, -1, -1, 1, -1, HarmonicSums`Private`ExpVar] :> 3*li6half + (31*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar* (-4164187/(2211840*HarmonicSums`Private`ExpVar^10) + 223631/(286720*HarmonicSums`Private`ExpVar^9) + 15097/(43008*HarmonicSums`Private`ExpVar^8) - 6641/(15360*HarmonicSums`Private`ExpVar^7) + 1631/(7680*HarmonicSums`Private`ExpVar^6) - 49/(768*HarmonicSums`Private`ExpVar^5) + 1/(96*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(93/(4*HarmonicSums`Private`ExpVar^10) - 51/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + li4half*(-57/(64*HarmonicSums`Private`ExpVar^10) + 263/(160*HarmonicSums`Private`ExpVar^9) + 27/(128*HarmonicSums`Private`ExpVar^8) - 23/(56*HarmonicSums`Private`ExpVar^7) - 3/(32*HarmonicSums`Private`ExpVar^6) + 19/(80*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 5/(8*HarmonicSums`Private`ExpVar^3) + 9/(8*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(403/(480*HarmonicSums`Private`ExpVar^10) - 221/(1920*HarmonicSums`Private`ExpVar^8) + 13/(480*HarmonicSums`Private`ExpVar^6) - 13/(960*HarmonicSums`Private`ExpVar^4) + 13/(480*HarmonicSums`Private`ExpVar^2) - 13/(240*HarmonicSums`Private`ExpVar)) - (3*s6)/4 + ln2*(-10693/(33600*HarmonicSums`Private`ExpVar^10) + 168251/(161280*HarmonicSums`Private`ExpVar^9) + 11251/(129024*HarmonicSums`Private`ExpVar^8) - 393/(1280*HarmonicSums`Private`ExpVar^7) - 559/(11520*HarmonicSums`Private`ExpVar^6) + 1/(3*HarmonicSums`Private`ExpVar^5) - 145/(384*HarmonicSums`Private`ExpVar^4) + 13/(48*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*sinf + ln2^4*(-19/(384*HarmonicSums`Private`ExpVar^10) + 263/(2880*HarmonicSums`Private`ExpVar^9) + 3/(256*HarmonicSums`Private`ExpVar^8) - 23/(1008*HarmonicSums`Private`ExpVar^7) - 1/(192*HarmonicSums`Private`ExpVar^6) + 19/(1440*HarmonicSums`Private`ExpVar^5) + 1/(192*HarmonicSums`Private`ExpVar^4) - 5/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar) - (5*z2)/48) + (57/(160*HarmonicSums`Private`ExpVar^10) - 263/(400*HarmonicSums`Private`ExpVar^9) - 27/(320*HarmonicSums`Private`ExpVar^8) + 23/(140*HarmonicSums`Private`ExpVar^7) + 3/(80*HarmonicSums`Private`ExpVar^6) - 19/(200*HarmonicSums`Private`ExpVar^5) - 3/(80*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 9/(20*HarmonicSums`Private`ExpVar^2) + 3/(5*HarmonicSums`Private`ExpVar))*z2^2 - (11*z2^3)/7 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-100969/(46080*HarmonicSums`Private`ExpVar^10) + 4213/(53760*HarmonicSums`Private`ExpVar^9) + 9923/(32256*HarmonicSums`Private`ExpVar^8) - 91/(5760*HarmonicSums`Private`ExpVar^7) - 901/(11520*HarmonicSums`Private`ExpVar^6) + 5/(1152*HarmonicSums`Private`ExpVar^5) + 37/(576*HarmonicSums`Private`ExpVar^4) - 7/(96*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-155/(48*HarmonicSums`Private`ExpVar^10) + 85/(192*HarmonicSums`Private`ExpVar^8) - 5/(48*HarmonicSums`Private`ExpVar^6) + 5/(96*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^2) + 5/(24*HarmonicSums`Private`ExpVar))*z2 + (23*z3)/48) + (-1)^HarmonicSums`Private`ExpVar* (100969/(61440*HarmonicSums`Private`ExpVar^10) - 4213/(71680*HarmonicSums`Private`ExpVar^9) - 9923/(43008*HarmonicSums`Private`ExpVar^8) + 91/(7680*HarmonicSums`Private`ExpVar^7) + 901/(15360*HarmonicSums`Private`ExpVar^6) - 5/(1536*HarmonicSums`Private`ExpVar^5) - 37/(768*HarmonicSums`Private`ExpVar^4) + 7/(128*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2))*z3 + (41*z3^2)/64 + z2*((3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (713/(64*HarmonicSums`Private`ExpVar^10) - 391/(256*HarmonicSums`Private`ExpVar^8) + 23/(64*HarmonicSums`Private`ExpVar^6) - 23/(128*HarmonicSums`Private`ExpVar^4) + 23/(64*HarmonicSums`Private`ExpVar^2) - 23/(32*HarmonicSums`Private`ExpVar))*z3) + ln2^2*((3*li4half)/2 - 10693/(67200*HarmonicSums`Private`ExpVar^10) + 168251/(322560*HarmonicSums`Private`ExpVar^9) + 11251/(258048*HarmonicSums`Private`ExpVar^8) - 393/(2560*HarmonicSums`Private`ExpVar^7) - 559/(23040*HarmonicSums`Private`ExpVar^6) + 1/(6*HarmonicSums`Private`ExpVar^5) - 145/(768*HarmonicSums`Private`ExpVar^4) + 13/(96*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (19/(128*HarmonicSums`Private`ExpVar^10) - 263/(960*HarmonicSums`Private`ExpVar^9) - 9/(256*HarmonicSums`Private`ExpVar^8) + 23/(336*HarmonicSums`Private`ExpVar^7) + 1/(64*HarmonicSums`Private`ExpVar^6) - 19/(480*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - (21*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (713/(64*HarmonicSums`Private`ExpVar^10) - 391/(256*HarmonicSums`Private`ExpVar^8) + 23/(64*HarmonicSums`Private`ExpVar^6) - 23/(128*HarmonicSums`Private`ExpVar^4) + 23/(64*HarmonicSums`Private`ExpVar^2) - 23/(32*HarmonicSums`Private`ExpVar))*z3) + ln2*(3*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (93/(4*HarmonicSums`Private`ExpVar^10) - 51/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + 382216721/(112896000*HarmonicSums`Private`ExpVar^10) - 274226641/(406425600*HarmonicSums`Private`ExpVar^9) - 23090533/(36126720*HarmonicSums`Private`ExpVar^8) + 215749/(1612800*HarmonicSums`Private`ExpVar^7) + 58969/(230400*HarmonicSums`Private`ExpVar^6) - 403/(2880*HarmonicSums`Private`ExpVar^5) - 553/(4608*HarmonicSums`Private`ExpVar^4) + 71/(288*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-589/(160*HarmonicSums`Private`ExpVar^10) + 323/(640*HarmonicSums`Private`ExpVar^8) - 19/(160*HarmonicSums`Private`ExpVar^6) + 19/(320*HarmonicSums`Private`ExpVar^4) - 19/(160*HarmonicSums`Private`ExpVar^2) + 19/(80*HarmonicSums`Private`ExpVar))*z2^2 + (-133/(512*HarmonicSums`Private`ExpVar^10) + 1841/(3840*HarmonicSums`Private`ExpVar^9) + 63/(1024*HarmonicSums`Private`ExpVar^8) - 23/(192*HarmonicSums`Private`ExpVar^7) - 7/(256*HarmonicSums`Private`ExpVar^6) + 133/(1920*HarmonicSums`Private`ExpVar^5) + 7/(256*HarmonicSums`Private`ExpVar^4) - 35/(192*HarmonicSums`Private`ExpVar^3) + 21/(64*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3 + z2*((-1)^HarmonicSums`Private`ExpVar* (100969/(15360*HarmonicSums`Private`ExpVar^10) - 4213/(17920*HarmonicSums`Private`ExpVar^9) - 9923/(10752*HarmonicSums`Private`ExpVar^8) + 91/(1920*HarmonicSums`Private`ExpVar^7) + 901/(3840*HarmonicSums`Private`ExpVar^6) - 5/(384*HarmonicSums`Private`ExpVar^5) - 37/(192*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (23*z3)/16) - (23*z5)/64) + (-1)^HarmonicSums`Private`ExpVar* (-11625/(256*HarmonicSums`Private`ExpVar^10) + 6375/(1024*HarmonicSums`Private`ExpVar^8) - 375/(256*HarmonicSums`Private`ExpVar^6) + 375/(512*HarmonicSums`Private`ExpVar^4) - 375/(256*HarmonicSums`Private`ExpVar^2) + 375/(128*HarmonicSums`Private`ExpVar))*z5, S[-1, -1, -1, -1, 1, 1, HarmonicSums`Private`ExpVar] :> 3*li6half + (31*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar*li5half* (93/(4*HarmonicSums`Private`ExpVar^10) - 51/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + li4half*(-57/(64*HarmonicSums`Private`ExpVar^10) + 263/(160*HarmonicSums`Private`ExpVar^9) + 27/(128*HarmonicSums`Private`ExpVar^8) - 23/(56*HarmonicSums`Private`ExpVar^7) - 3/(32*HarmonicSums`Private`ExpVar^6) + 19/(80*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 5/(8*HarmonicSums`Private`ExpVar^3) + 9/(8*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(403/(480*HarmonicSums`Private`ExpVar^10) - 221/(1920*HarmonicSums`Private`ExpVar^8) + 13/(480*HarmonicSums`Private`ExpVar^6) - 13/(960*HarmonicSums`Private`ExpVar^4) + 13/(480*HarmonicSums`Private`ExpVar^2) - 13/(240*HarmonicSums`Private`ExpVar)) + 805523702507/(284497920000*HarmonicSums`Private`ExpVar^10) + 447847339039/(1024192512000*HarmonicSums`Private`ExpVar^9) - 37730579413/(91039334400*HarmonicSums`Private`ExpVar^8) - 5279483/(25088000*HarmonicSums`Private`ExpVar^7) + 14099191/(41472000*HarmonicSums`Private`ExpVar^6) - 11881/(43200*HarmonicSums`Private`ExpVar^5) + 14767/(55296*HarmonicSums`Private`ExpVar^4) - 493/(1728*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2) - (3*s6)/4 + (-382216721/(112896000*HarmonicSums`Private`ExpVar^10) + 274226641/(406425600*HarmonicSums`Private`ExpVar^9) + 23090533/(36126720*HarmonicSums`Private`ExpVar^8) - 215749/(1612800*HarmonicSums`Private`ExpVar^7) - 58969/(230400*HarmonicSums`Private`ExpVar^6) + 403/(2880*HarmonicSums`Private`ExpVar^5) + 553/(4608*HarmonicSums`Private`ExpVar^4) - 71/(288*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2))*sinf + (10693/(67200*HarmonicSums`Private`ExpVar^10) - 168251/(322560*HarmonicSums`Private`ExpVar^9) - 11251/(258048*HarmonicSums`Private`ExpVar^8) + 393/(2560*HarmonicSums`Private`ExpVar^7) + 559/(23040*HarmonicSums`Private`ExpVar^6) - 1/(6*HarmonicSums`Private`ExpVar^5) + 145/(768*HarmonicSums`Private`ExpVar^4) - 13/(96*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*sinf^2 + ln2^4*(-19/(384*HarmonicSums`Private`ExpVar^10) + 263/(2880*HarmonicSums`Private`ExpVar^9) + 3/(256*HarmonicSums`Private`ExpVar^8) - 23/(1008*HarmonicSums`Private`ExpVar^7) - 1/(192*HarmonicSums`Private`ExpVar^6) + 19/(1440*HarmonicSums`Private`ExpVar^5) + 1/(192*HarmonicSums`Private`ExpVar^4) - 5/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar) - (5*z2)/48) - (3*z2^3)/7 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-100969/(46080*HarmonicSums`Private`ExpVar^10) + 4213/(53760*HarmonicSums`Private`ExpVar^9) + 9923/(32256*HarmonicSums`Private`ExpVar^8) - 91/(5760*HarmonicSums`Private`ExpVar^7) - 901/(11520*HarmonicSums`Private`ExpVar^6) + 5/(1152*HarmonicSums`Private`ExpVar^5) + 37/(576*HarmonicSums`Private`ExpVar^4) - 7/(96*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-155/(48*HarmonicSums`Private`ExpVar^10) + 85/(192*HarmonicSums`Private`ExpVar^8) - 5/(48*HarmonicSums`Private`ExpVar^6) + 5/(96*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^2) + 5/(24*HarmonicSums`Private`ExpVar))*z2 + (23*z3)/48) + (-1)^HarmonicSums`Private`ExpVar* (-706783/(61440*HarmonicSums`Private`ExpVar^10) + 4213/(10240*HarmonicSums`Private`ExpVar^9) + 9923/(6144*HarmonicSums`Private`ExpVar^8) - 637/(7680*HarmonicSums`Private`ExpVar^7) - 6307/(15360*HarmonicSums`Private`ExpVar^6) + 35/(1536*HarmonicSums`Private`ExpVar^5) + 259/(768*HarmonicSums`Private`ExpVar^4) - 49/(128*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2))*z3 - (87*z3^2)/64 + ln2^2*((3*li4half)/2 + (19/(128*HarmonicSums`Private`ExpVar^10) - 263/(960*HarmonicSums`Private`ExpVar^9) - 9/(256*HarmonicSums`Private`ExpVar^8) + 23/(336*HarmonicSums`Private`ExpVar^7) + 1/(64*HarmonicSums`Private`ExpVar^6) - 19/(480*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - (21*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (713/(64*HarmonicSums`Private`ExpVar^10) - 391/(256*HarmonicSums`Private`ExpVar^8) + 23/(64*HarmonicSums`Private`ExpVar^6) - 23/(128*HarmonicSums`Private`ExpVar^4) + 23/(64*HarmonicSums`Private`ExpVar^2) - 23/(32*HarmonicSums`Private`ExpVar))*z3) + z2*((3*li4half)/2 + 10693/(67200*HarmonicSums`Private`ExpVar^10) - 168251/(322560*HarmonicSums`Private`ExpVar^9) - 11251/(258048*HarmonicSums`Private`ExpVar^8) + 393/(2560*HarmonicSums`Private`ExpVar^7) + 559/(23040*HarmonicSums`Private`ExpVar^6) - 1/(6*HarmonicSums`Private`ExpVar^5) + 145/(768*HarmonicSums`Private`ExpVar^4) - 13/(96*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-279/(64*HarmonicSums`Private`ExpVar^10) + 153/(256*HarmonicSums`Private`ExpVar^8) - 9/(64*HarmonicSums`Private`ExpVar^6) + 9/(128*HarmonicSums`Private`ExpVar^4) - 9/(64*HarmonicSums`Private`ExpVar^2) + 9/(32*HarmonicSums`Private`ExpVar))*z3) + ln2*(3*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (93/(4*HarmonicSums`Private`ExpVar^10) - 51/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-589/(160*HarmonicSums`Private`ExpVar^10) + 323/(640*HarmonicSums`Private`ExpVar^8) - 19/(160*HarmonicSums`Private`ExpVar^6) + 19/(320*HarmonicSums`Private`ExpVar^4) - 19/(160*HarmonicSums`Private`ExpVar^2) + 19/(80*HarmonicSums`Private`ExpVar))*z2^2 + (-133/(512*HarmonicSums`Private`ExpVar^10) + 1841/(3840*HarmonicSums`Private`ExpVar^9) + 63/(1024*HarmonicSums`Private`ExpVar^8) - 23/(192*HarmonicSums`Private`ExpVar^7) - 7/(256*HarmonicSums`Private`ExpVar^6) + 133/(1920*HarmonicSums`Private`ExpVar^5) + 7/(256*HarmonicSums`Private`ExpVar^4) - 35/(192*HarmonicSums`Private`ExpVar^3) + 21/(64*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3 + z2*((-1)^HarmonicSums`Private`ExpVar* (100969/(15360*HarmonicSums`Private`ExpVar^10) - 4213/(17920*HarmonicSums`Private`ExpVar^9) - 9923/(10752*HarmonicSums`Private`ExpVar^8) + 91/(1920*HarmonicSums`Private`ExpVar^7) + 901/(3840*HarmonicSums`Private`ExpVar^6) - 5/(384*HarmonicSums`Private`ExpVar^5) - 37/(192*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (23*z3)/16) - (23*z5)/64) + (-1)^HarmonicSums`Private`ExpVar* (-713/(256*HarmonicSums`Private`ExpVar^10) + 391/(1024*HarmonicSums`Private`ExpVar^8) - 23/(256*HarmonicSums`Private`ExpVar^6) + 23/(512*HarmonicSums`Private`ExpVar^4) - 23/(256*HarmonicSums`Private`ExpVar^2) + 23/(128*HarmonicSums`Private`ExpVar))*z5, S[-1, -1, -1, 1, -1, -1, HarmonicSums`Private`ExpVar] :> -6*li6half + (13*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar* (61468481/(10321920*HarmonicSums`Private`ExpVar^10) - 278434193/(541900800*HarmonicSums`Private`ExpVar^9) - 2291947/(2764800*HarmonicSums`Private`ExpVar^8) - 114203/(1382400*HarmonicSums`Private`ExpVar^7) + 5461/(9216*HarmonicSums`Private`ExpVar^6) - 2267/(4608*HarmonicSums`Private`ExpVar^5) + 15/(64*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(120*HarmonicSums`Private`ExpVar^10) - 17/(480*HarmonicSums`Private`ExpVar^8) + 1/(120*HarmonicSums`Private`ExpVar^6) - 1/(240*HarmonicSums`Private`ExpVar^4) + 1/(120*HarmonicSums`Private`ExpVar^2) - 1/(60*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) - 6*s6 + ln2^4*(-19/(1536*HarmonicSums`Private`ExpVar^10) + 263/(11520*HarmonicSums`Private`ExpVar^9) + 3/(1024*HarmonicSums`Private`ExpVar^8) - 23/(4032*HarmonicSums`Private`ExpVar^7) - 1/(768*HarmonicSums`Private`ExpVar^6) + 19/(5760*HarmonicSums`Private`ExpVar^5) + 1/(768*HarmonicSums`Private`ExpVar^4) - 5/(576*HarmonicSums`Private`ExpVar^3) + 1/(64*HarmonicSums`Private`ExpVar^2) - 1/(48*HarmonicSums`Private`ExpVar) - (5*z2)/48) + (19/(512*HarmonicSums`Private`ExpVar^10) - 263/(3840*HarmonicSums`Private`ExpVar^9) - 9/(1024*HarmonicSums`Private`ExpVar^8) + 23/(1344*HarmonicSums`Private`ExpVar^7) + 1/(256*HarmonicSums`Private`ExpVar^6) - 19/(1920*HarmonicSums`Private`ExpVar^5) - 1/(256*HarmonicSums`Private`ExpVar^4) + 5/(192*HarmonicSums`Private`ExpVar^3) - 3/(64*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z2^2 - (11*z2^3)/80 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (100969/(15360*HarmonicSums`Private`ExpVar^10) - 4213/(17920*HarmonicSums`Private`ExpVar^9) - 9923/(10752*HarmonicSums`Private`ExpVar^8) + 91/(1920*HarmonicSums`Private`ExpVar^7) + 901/(3840*HarmonicSums`Private`ExpVar^6) - 5/(384*HarmonicSums`Private`ExpVar^5) - 37/(192*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (100969/(15360*HarmonicSums`Private`ExpVar^10) - 4213/(17920*HarmonicSums`Private`ExpVar^9) - 9923/(10752*HarmonicSums`Private`ExpVar^8) + 91/(1920*HarmonicSums`Private`ExpVar^7) + 901/(3840*HarmonicSums`Private`ExpVar^6) - 5/(384*HarmonicSums`Private`ExpVar^5) - 37/(192*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (100969/(23040*HarmonicSums`Private`ExpVar^10) - 4213/(26880*HarmonicSums`Private`ExpVar^9) - 9923/(16128*HarmonicSums`Private`ExpVar^8) + 91/(2880*HarmonicSums`Private`ExpVar^7) + 901/(5760*HarmonicSums`Private`ExpVar^6) - 5/(576*HarmonicSums`Private`ExpVar^5) - 37/(288*HarmonicSums`Private`ExpVar^4) + 7/(48*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar))*z2 + (23*z3)/48) + (-1)^HarmonicSums`Private`ExpVar* (-706783/(61440*HarmonicSums`Private`ExpVar^10) + 4213/(10240*HarmonicSums`Private`ExpVar^9) + 9923/(6144*HarmonicSums`Private`ExpVar^8) - 637/(7680*HarmonicSums`Private`ExpVar^7) - 6307/(15360*HarmonicSums`Private`ExpVar^6) + 35/(1536*HarmonicSums`Private`ExpVar^5) + 259/(768*HarmonicSums`Private`ExpVar^4) - 49/(128*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2))*z3 + (167*z3^2)/64 + z2*((-1)^HarmonicSums`Private`ExpVar* (-10318457/(1433600*HarmonicSums`Private`ExpVar^10) - 13342793/(5017600*HarmonicSums`Private`ExpVar^9) + 3771437/(4515840*HarmonicSums`Private`ExpVar^8) + 26371/(57600*HarmonicSums`Private`ExpVar^7) - 36403/(230400*HarmonicSums`Private`ExpVar^6) - 737/(4608*HarmonicSums`Private`ExpVar^5) + 109/(1152*HarmonicSums`Private`ExpVar^4) + 5/(64*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (217/(64*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^6) - 7/(128*HarmonicSums`Private`ExpVar^4) + 7/(64*HarmonicSums`Private`ExpVar^2) - 7/(32*HarmonicSums`Private`ExpVar))*z3) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-10318457/(1433600*HarmonicSums`Private`ExpVar^10) - 13342793/(5017600*HarmonicSums`Private`ExpVar^9) + 3771437/(4515840*HarmonicSums`Private`ExpVar^8) + 26371/(57600*HarmonicSums`Private`ExpVar^7) - 36403/(230400*HarmonicSums`Private`ExpVar^6) - 737/(4608*HarmonicSums`Private`ExpVar^5) + 109/(1152*HarmonicSums`Private`ExpVar^4) + 5/(64*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (19/(256*HarmonicSums`Private`ExpVar^10) - 263/(1920*HarmonicSums`Private`ExpVar^9) - 9/(512*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) + 1/(128*HarmonicSums`Private`ExpVar^6) - 19/(960*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) + 5/(96*HarmonicSums`Private`ExpVar^3) - 3/(32*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 - (19*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (217/(64*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^6) - 7/(128*HarmonicSums`Private`ExpVar^4) + 7/(64*HarmonicSums`Private`ExpVar^2) - 7/(32*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (2511/(256*HarmonicSums`Private`ExpVar^10) - 1377/(1024*HarmonicSums`Private`ExpVar^8) + 81/(256*HarmonicSums`Private`ExpVar^6) - 81/(512*HarmonicSums`Private`ExpVar^4) + 81/(256*HarmonicSums`Private`ExpVar^2) - 81/(128*HarmonicSums`Private`ExpVar))*z5 + ln2*(-3*li5half + 10501/(12288*HarmonicSums`Private`ExpVar^10) + 57517/(69120*HarmonicSums`Private`ExpVar^9) - 3343/(12288*HarmonicSums`Private`ExpVar^8) - 2869/(10752*HarmonicSums`Private`ExpVar^7) + 521/(1536*HarmonicSums`Private`ExpVar^6) - 403/(1920*HarmonicSums`Private`ExpVar^5) + 11/(128*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (-93/(10*HarmonicSums`Private`ExpVar^10) + 51/(40*HarmonicSums`Private`ExpVar^8) - 3/(10*HarmonicSums`Private`ExpVar^6) + 3/(20*HarmonicSums`Private`ExpVar^4) - 3/(10*HarmonicSums`Private`ExpVar^2) + 3/(5*HarmonicSums`Private`ExpVar))*z2^2 + (19/(512*HarmonicSums`Private`ExpVar^10) - 263/(3840*HarmonicSums`Private`ExpVar^9) - 9/(1024*HarmonicSums`Private`ExpVar^8) + 23/(1344*HarmonicSums`Private`ExpVar^7) + 1/(256*HarmonicSums`Private`ExpVar^6) - 19/(1920*HarmonicSums`Private`ExpVar^5) - 1/(256*HarmonicSums`Private`ExpVar^4) + 5/(192*HarmonicSums`Private`ExpVar^3) - 3/(64*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3 + z2*((-1)^HarmonicSums`Private`ExpVar* (100969/(15360*HarmonicSums`Private`ExpVar^10) - 4213/(17920*HarmonicSums`Private`ExpVar^9) - 9923/(10752*HarmonicSums`Private`ExpVar^8) + 91/(1920*HarmonicSums`Private`ExpVar^7) + 901/(3840*HarmonicSums`Private`ExpVar^6) - 5/(384*HarmonicSums`Private`ExpVar^5) - 37/(192*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (23*z3)/16) + (369*z5)/64), S[-1, -1, -1, 1, -1, 1, HarmonicSums`Private`ExpVar] :> -6*li6half + (13*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (31/(120*HarmonicSums`Private`ExpVar^10) - 17/(480*HarmonicSums`Private`ExpVar^8) + 1/(120*HarmonicSums`Private`ExpVar^6) - 1/(240*HarmonicSums`Private`ExpVar^4) + 1/(120*HarmonicSums`Private`ExpVar^2) - 1/(60*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) - 3172873/(4423680*HarmonicSums`Private`ExpVar^10) + 111668911/(87091200*HarmonicSums`Private`ExpVar^9) + 7097/(229376*HarmonicSums`Private`ExpVar^8) - 186853/(501760*HarmonicSums`Private`ExpVar^7) + 5561/(30720*HarmonicSums`Private`ExpVar^6) - 1219/(115200*HarmonicSums`Private`ExpVar^5) - 17/(512*HarmonicSums`Private`ExpVar^4) + 5/(288*HarmonicSums`Private`ExpVar^3) - 6*s6 + ln2^4*(-19/(1536*HarmonicSums`Private`ExpVar^10) + 263/(11520*HarmonicSums`Private`ExpVar^9) + 3/(1024*HarmonicSums`Private`ExpVar^8) - 23/(4032*HarmonicSums`Private`ExpVar^7) - 1/(768*HarmonicSums`Private`ExpVar^6) + 19/(5760*HarmonicSums`Private`ExpVar^5) + 1/(768*HarmonicSums`Private`ExpVar^4) - 5/(576*HarmonicSums`Private`ExpVar^3) + 1/(64*HarmonicSums`Private`ExpVar^2) - 1/(48*HarmonicSums`Private`ExpVar) - (5*z2)/48) + (-57/(512*HarmonicSums`Private`ExpVar^10) + 263/(1280*HarmonicSums`Private`ExpVar^9) + 27/(1024*HarmonicSums`Private`ExpVar^8) - 23/(448*HarmonicSums`Private`ExpVar^7) - 3/(256*HarmonicSums`Private`ExpVar^6) + 19/(640*HarmonicSums`Private`ExpVar^5) + 3/(256*HarmonicSums`Private`ExpVar^4) - 5/(64*HarmonicSums`Private`ExpVar^3) + 9/(64*HarmonicSums`Private`ExpVar^2) - 3/(16*HarmonicSums`Private`ExpVar))*z2^2 + (2089*z2^3)/1680 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (100969/(15360*HarmonicSums`Private`ExpVar^10) - 4213/(17920*HarmonicSums`Private`ExpVar^9) - 9923/(10752*HarmonicSums`Private`ExpVar^8) + 91/(1920*HarmonicSums`Private`ExpVar^7) + 901/(3840*HarmonicSums`Private`ExpVar^6) - 5/(384*HarmonicSums`Private`ExpVar^5) - 37/(192*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) - 10501/(12288*HarmonicSums`Private`ExpVar^10) - 57517/(69120*HarmonicSums`Private`ExpVar^9) + 3343/(12288*HarmonicSums`Private`ExpVar^8) + 2869/(10752*HarmonicSums`Private`ExpVar^7) - 521/(1536*HarmonicSums`Private`ExpVar^6) + 403/(1920*HarmonicSums`Private`ExpVar^5) - 11/(128*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (-100969/(15360*HarmonicSums`Private`ExpVar^10) + 4213/(17920*HarmonicSums`Private`ExpVar^9) + 9923/(10752*HarmonicSums`Private`ExpVar^8) - 91/(1920*HarmonicSums`Private`ExpVar^7) - 901/(3840*HarmonicSums`Private`ExpVar^6) + 5/(384*HarmonicSums`Private`ExpVar^5) + 37/(192*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (100969/(23040*HarmonicSums`Private`ExpVar^10) - 4213/(26880*HarmonicSums`Private`ExpVar^9) - 9923/(16128*HarmonicSums`Private`ExpVar^8) + 91/(2880*HarmonicSums`Private`ExpVar^7) + 901/(5760*HarmonicSums`Private`ExpVar^6) - 5/(576*HarmonicSums`Private`ExpVar^5) - 37/(288*HarmonicSums`Private`ExpVar^4) + 7/(48*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar))*z2 + (23*z3)/48) + (-1)^HarmonicSums`Private`ExpVar* (100969/(61440*HarmonicSums`Private`ExpVar^10) - 4213/(71680*HarmonicSums`Private`ExpVar^9) - 9923/(43008*HarmonicSums`Private`ExpVar^8) + 91/(7680*HarmonicSums`Private`ExpVar^7) + 901/(15360*HarmonicSums`Private`ExpVar^6) - 5/(1536*HarmonicSums`Private`ExpVar^5) - 37/(768*HarmonicSums`Private`ExpVar^4) + 7/(128*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2))*z3 - (25*z3^2)/64 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-10318457/(1433600*HarmonicSums`Private`ExpVar^10) - 13342793/(5017600*HarmonicSums`Private`ExpVar^9) + 3771437/(4515840*HarmonicSums`Private`ExpVar^8) + 26371/(57600*HarmonicSums`Private`ExpVar^7) - 36403/(230400*HarmonicSums`Private`ExpVar^6) - 737/(4608*HarmonicSums`Private`ExpVar^5) + 109/(1152*HarmonicSums`Private`ExpVar^4) + 5/(64*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (19/(256*HarmonicSums`Private`ExpVar^10) - 263/(1920*HarmonicSums`Private`ExpVar^9) - 9/(512*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) + 1/(128*HarmonicSums`Private`ExpVar^6) - 19/(960*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) + 5/(96*HarmonicSums`Private`ExpVar^3) - 3/(32*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 - (19*z2^2)/80 + (-1)^HarmonicSums`Private`ExpVar* (217/(64*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^6) - 7/(128*HarmonicSums`Private`ExpVar^4) + 7/(64*HarmonicSums`Private`ExpVar^2) - 7/(32*HarmonicSums`Private`ExpVar))*z3) + z2*((-1)^HarmonicSums`Private`ExpVar* (10318457/(1433600*HarmonicSums`Private`ExpVar^10) + 13342793/(5017600*HarmonicSums`Private`ExpVar^9) - 3771437/(4515840*HarmonicSums`Private`ExpVar^8) - 26371/(57600*HarmonicSums`Private`ExpVar^7) + 36403/(230400*HarmonicSums`Private`ExpVar^6) + 737/(4608*HarmonicSums`Private`ExpVar^5) - 109/(1152*HarmonicSums`Private`ExpVar^4) - 5/(64*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-279/(64*HarmonicSums`Private`ExpVar^10) + 153/(256*HarmonicSums`Private`ExpVar^8) - 9/(64*HarmonicSums`Private`ExpVar^6) + 9/(128*HarmonicSums`Private`ExpVar^4) - 9/(64*HarmonicSums`Private`ExpVar^2) + 9/(32*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (11439/(256*HarmonicSums`Private`ExpVar^10) - 6273/(1024*HarmonicSums`Private`ExpVar^8) + 369/(256*HarmonicSums`Private`ExpVar^6) - 369/(512*HarmonicSums`Private`ExpVar^4) + 369/(256*HarmonicSums`Private`ExpVar^2) - 369/(128*HarmonicSums`Private`ExpVar))*z5 + ln2*(-3*li5half + (-1)^HarmonicSums`Private`ExpVar* (-93/(10*HarmonicSums`Private`ExpVar^10) + 51/(40*HarmonicSums`Private`ExpVar^8) - 3/(10*HarmonicSums`Private`ExpVar^6) + 3/(20*HarmonicSums`Private`ExpVar^4) - 3/(10*HarmonicSums`Private`ExpVar^2) + 3/(5*HarmonicSums`Private`ExpVar))*z2^2 + (19/(512*HarmonicSums`Private`ExpVar^10) - 263/(3840*HarmonicSums`Private`ExpVar^9) - 9/(1024*HarmonicSums`Private`ExpVar^8) + 23/(1344*HarmonicSums`Private`ExpVar^7) + 1/(256*HarmonicSums`Private`ExpVar^6) - 19/(1920*HarmonicSums`Private`ExpVar^5) - 1/(256*HarmonicSums`Private`ExpVar^4) + 5/(192*HarmonicSums`Private`ExpVar^3) - 3/(64*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3 + z2*((-1)^HarmonicSums`Private`ExpVar* (-100969/(15360*HarmonicSums`Private`ExpVar^10) + 4213/(17920*HarmonicSums`Private`ExpVar^9) + 9923/(10752*HarmonicSums`Private`ExpVar^8) - 91/(1920*HarmonicSums`Private`ExpVar^7) - 901/(3840*HarmonicSums`Private`ExpVar^6) + 5/(384*HarmonicSums`Private`ExpVar^5) + 37/(192*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) + (23*z3)/16) + (369*z5)/64), S[-1, -1, -1, 1, 1, -1, HarmonicSums`Private`ExpVar] :> -7*li6half + ln2^6/240 + li4half*(19/(64*HarmonicSums`Private`ExpVar^10) - 263/(480*HarmonicSums`Private`ExpVar^9) - 9/(128*HarmonicSums`Private`ExpVar^8) + 23/(168*HarmonicSums`Private`ExpVar^7) + 1/(32*HarmonicSums`Private`ExpVar^6) - 19/(240*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) - 313343/(184320*HarmonicSums`Private`ExpVar^10) + 113/(3840*HarmonicSums`Private`ExpVar^9) + 17063/(36864*HarmonicSums`Private`ExpVar^8) - 61/(192*HarmonicSums`Private`ExpVar^7) + 295/(2304*HarmonicSums`Private`ExpVar^6) - 11/(320*HarmonicSums`Private`ExpVar^5) + 1/(192*HarmonicSums`Private`ExpVar^4) - (9*s6)/4 + ((-1)^HarmonicSums`Private`ExpVar*ln2^2* (-100969/(15360*HarmonicSums`Private`ExpVar^10) + 4213/(17920*HarmonicSums`Private`ExpVar^9) + 9923/(10752*HarmonicSums`Private`ExpVar^8) - 91/(1920*HarmonicSums`Private`ExpVar^7) - 901/(3840*HarmonicSums`Private`ExpVar^6) + 5/(384*HarmonicSums`Private`ExpVar^5) + 37/(192*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*ln2* (10318457/(716800*HarmonicSums`Private`ExpVar^10) + 13342793/(2508800*HarmonicSums`Private`ExpVar^9) - 3771437/(2257920*HarmonicSums`Private`ExpVar^8) - 26371/(28800*HarmonicSums`Private`ExpVar^7) + 36403/(115200*HarmonicSums`Private`ExpVar^6) + 737/(2304*HarmonicSums`Private`ExpVar^5) - 109/(576*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)))*sinf + (-1)^HarmonicSums`Private`ExpVar*ln2* (-100969/(15360*HarmonicSums`Private`ExpVar^10) + 4213/(17920*HarmonicSums`Private`ExpVar^9) + 9923/(10752*HarmonicSums`Private`ExpVar^8) - 91/(1920*HarmonicSums`Private`ExpVar^7) - 901/(3840*HarmonicSums`Private`ExpVar^6) + 5/(384*HarmonicSums`Private`ExpVar^5) + 37/(192*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*sinf^2 - (li4half*z2)/2 - (ln2^4*z2)/16 + (-19/(160*HarmonicSums`Private`ExpVar^10) + 263/(1200*HarmonicSums`Private`ExpVar^9) + 9/(320*HarmonicSums`Private`ExpVar^8) - 23/(420*HarmonicSums`Private`ExpVar^7) - 1/(80*HarmonicSums`Private`ExpVar^6) + 19/(600*HarmonicSums`Private`ExpVar^5) + 1/(80*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + 3/(20*HarmonicSums`Private`ExpVar^2) - 1/(5*HarmonicSums`Private`ExpVar))*z2^2 + (143*z2^3)/105 + ln2^2*(-(li4half/2) + (-1)^HarmonicSums`Private`ExpVar* (10318457/(1433600*HarmonicSums`Private`ExpVar^10) + 13342793/(5017600*HarmonicSums`Private`ExpVar^9) - 3771437/(4515840*HarmonicSums`Private`ExpVar^8) - 26371/(57600*HarmonicSums`Private`ExpVar^7) + 36403/(230400*HarmonicSums`Private`ExpVar^6) + 737/(4608*HarmonicSums`Private`ExpVar^5) - 109/(1152*HarmonicSums`Private`ExpVar^4) - 5/(64*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) - (9*z2^2)/80) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-100969/(46080*HarmonicSums`Private`ExpVar^10) + 4213/(53760*HarmonicSums`Private`ExpVar^9) + 9923/(32256*HarmonicSums`Private`ExpVar^8) - 91/(5760*HarmonicSums`Private`ExpVar^7) - 901/(11520*HarmonicSums`Private`ExpVar^6) + 5/(1152*HarmonicSums`Private`ExpVar^5) + 37/(576*HarmonicSums`Private`ExpVar^4) - 7/(96*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) + z3/3) + (23*z3^2)/32 + (-1)^HarmonicSums`Private`ExpVar*(31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar)*z5 + ln2*(-4*li5half + (-1)^HarmonicSums`Private`ExpVar* (16977776527/(16257024000*HarmonicSums`Private`ExpVar^10) - 33262108153/(6322176000*HarmonicSums`Private`ExpVar^9) - 329046913/(948326400*HarmonicSums`Private`ExpVar^8) + 1223023/(1728000*HarmonicSums`Private`ExpVar^7) + 1372361/(6912000*HarmonicSums`Private`ExpVar^6) - 10633/(27648*HarmonicSums`Private`ExpVar^5) + 961/(3456*HarmonicSums`Private`ExpVar^4) - 17/(64*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + z2*((-1)^HarmonicSums`Private`ExpVar* (-100969/(15360*HarmonicSums`Private`ExpVar^10) + 4213/(17920*HarmonicSums`Private`ExpVar^9) + 9923/(10752*HarmonicSums`Private`ExpVar^8) - 91/(1920*HarmonicSums`Private`ExpVar^7) - 901/(3840*HarmonicSums`Private`ExpVar^6) + 5/(384*HarmonicSums`Private`ExpVar^5) + 37/(192*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) - z3) + 4*z5), S[-1, -1, -1, 1, 1, 1, HarmonicSums`Private`ExpVar] :> -7*li6half + ln2^6/240 + (-1)^HarmonicSums`Private`ExpVar* (411075016865267/(40967700480000*HarmonicSums`Private`ExpVar^10) - 10611351872071/(5310627840000*HarmonicSums`Private`ExpVar^9) - 488472938503/(398297088000*HarmonicSums`Private`ExpVar^8) + 13735249/(103680000*HarmonicSums`Private`ExpVar^7) + 178801793/(414720000*HarmonicSums`Private`ExpVar^6) - 70013/(331776*HarmonicSums`Private`ExpVar^5) - 2003/(20736*HarmonicSums`Private`ExpVar^4) + 33/(128*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + li4half*(19/(64*HarmonicSums`Private`ExpVar^10) - 263/(480*HarmonicSums`Private`ExpVar^9) - 9/(128*HarmonicSums`Private`ExpVar^8) + 23/(168*HarmonicSums`Private`ExpVar^7) + 1/(32*HarmonicSums`Private`ExpVar^6) - 19/(240*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) - (9*s6)/4 + (-1)^HarmonicSums`Private`ExpVar* (-10318457/(1433600*HarmonicSums`Private`ExpVar^10) - 13342793/(5017600*HarmonicSums`Private`ExpVar^9) + 3771437/(4515840*HarmonicSums`Private`ExpVar^8) + 26371/(57600*HarmonicSums`Private`ExpVar^7) - 36403/(230400*HarmonicSums`Private`ExpVar^6) - 737/(4608*HarmonicSums`Private`ExpVar^5) + 109/(1152*HarmonicSums`Private`ExpVar^4) + 5/(64*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*sinf^2 + (-1)^HarmonicSums`Private`ExpVar* (100969/(46080*HarmonicSums`Private`ExpVar^10) - 4213/(53760*HarmonicSums`Private`ExpVar^9) - 9923/(32256*HarmonicSums`Private`ExpVar^8) + 91/(5760*HarmonicSums`Private`ExpVar^7) + 901/(11520*HarmonicSums`Private`ExpVar^6) - 5/(1152*HarmonicSums`Private`ExpVar^5) - 37/(576*HarmonicSums`Private`ExpVar^4) + 7/(96*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2))*sinf^3 - (ln2^4*z2)/16 + (-(li4half/2) + (-1)^HarmonicSums`Private`ExpVar* (-10318457/(1433600*HarmonicSums`Private`ExpVar^10) - 13342793/(5017600*HarmonicSums`Private`ExpVar^9) + 3771437/(4515840*HarmonicSums`Private`ExpVar^8) + 26371/(57600*HarmonicSums`Private`ExpVar^7) - 36403/(230400*HarmonicSums`Private`ExpVar^6) - 737/(4608*HarmonicSums`Private`ExpVar^5) + 109/(1152*HarmonicSums`Private`ExpVar^4) + 5/(64*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)))*z2 + (23*z2^3)/35 + sinf*((-1)^HarmonicSums`Private`ExpVar* (-16977776527/(16257024000*HarmonicSums`Private`ExpVar^10) + 33262108153/(6322176000*HarmonicSums`Private`ExpVar^9) + 329046913/(948326400*HarmonicSums`Private`ExpVar^8) - 1223023/(1728000*HarmonicSums`Private`ExpVar^7) - 1372361/(6912000*HarmonicSums`Private`ExpVar^6) + 10633/(27648*HarmonicSums`Private`ExpVar^5) - 961/(3456*HarmonicSums`Private`ExpVar^4) + 17/(64*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (100969/(15360*HarmonicSums`Private`ExpVar^10) - 4213/(17920*HarmonicSums`Private`ExpVar^9) - 9923/(10752*HarmonicSums`Private`ExpVar^8) + 91/(1920*HarmonicSums`Private`ExpVar^7) + 901/(3840*HarmonicSums`Private`ExpVar^6) - 5/(384*HarmonicSums`Private`ExpVar^5) - 37/(192*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2) + ln2^2*(-(li4half/2) - (9*z2^2)/80) + (ln2^3*z3)/3 + (-1)^HarmonicSums`Private`ExpVar* (100969/(23040*HarmonicSums`Private`ExpVar^10) - 4213/(26880*HarmonicSums`Private`ExpVar^9) - 9923/(16128*HarmonicSums`Private`ExpVar^8) + 91/(2880*HarmonicSums`Private`ExpVar^7) + 901/(5760*HarmonicSums`Private`ExpVar^6) - 5/(576*HarmonicSums`Private`ExpVar^5) - 37/(288*HarmonicSums`Private`ExpVar^4) + 7/(48*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2))*z3 + (55*z3^2)/32 + ln2*(-4*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) - z2*z3 + 4*z5), S[-1, -1, 1, -1, -1, -1, HarmonicSums`Private`ExpVar] :> (-13*ln2^6)/360 + (-1)^HarmonicSums`Private`ExpVar* (-39910187/(15482880*HarmonicSums`Private`ExpVar^10) + 598001/(286720*HarmonicSums`Private`ExpVar^9) + 9461/(35840*HarmonicSums`Private`ExpVar^8) - 679/(960*HarmonicSums`Private`ExpVar^7) + 2999/(7680*HarmonicSums`Private`ExpVar^6) - 95/(768*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-341/(480*HarmonicSums`Private`ExpVar^10) + 187/(1920*HarmonicSums`Private`ExpVar^8) - 11/(480*HarmonicSums`Private`ExpVar^6) + 11/(960*HarmonicSums`Private`ExpVar^4) - 11/(480*HarmonicSums`Private`ExpVar^2) + 11/(240*HarmonicSums`Private`ExpVar)) + li4half*(57/(64*HarmonicSums`Private`ExpVar^10) - 263/(160*HarmonicSums`Private`ExpVar^9) - 27/(128*HarmonicSums`Private`ExpVar^8) + 23/(56*HarmonicSums`Private`ExpVar^7) + 3/(32*HarmonicSums`Private`ExpVar^6) - 19/(80*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 5/(8*HarmonicSums`Private`ExpVar^3) - 9/(8*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) + ln2^4*(19/(256*HarmonicSums`Private`ExpVar^10) - 263/(1920*HarmonicSums`Private`ExpVar^9) - 9/(512*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) + 1/(128*HarmonicSums`Private`ExpVar^6) - 19/(960*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) + 5/(96*HarmonicSums`Private`ExpVar^3) - 3/(32*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar) + z2/12) + (-57/(160*HarmonicSums`Private`ExpVar^10) + 263/(400*HarmonicSums`Private`ExpVar^9) + 27/(320*HarmonicSums`Private`ExpVar^8) - 23/(140*HarmonicSums`Private`ExpVar^7) - 3/(80*HarmonicSums`Private`ExpVar^6) + 19/(200*HarmonicSums`Private`ExpVar^5) + 3/(80*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^3) + 9/(20*HarmonicSums`Private`ExpVar^2) - 3/(5*HarmonicSums`Private`ExpVar))*z2^2 + (3*z2^3)/5 + ln2^3*(-19403/(46080*HarmonicSums`Private`ExpVar^10) + 14923/(89600*HarmonicSums`Private`ExpVar^9) + 9889/(129024*HarmonicSums`Private`ExpVar^8) - 439/(13230*HarmonicSums`Private`ExpVar^7) - 299/(11520*HarmonicSums`Private`ExpVar^6) + 1207/(86400*HarmonicSums`Private`ExpVar^5) + 47/(2304*HarmonicSums`Private`ExpVar^4) - 23/(864*HarmonicSums`Private`ExpVar^3) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (155/(48*HarmonicSums`Private`ExpVar^10) - 85/(192*HarmonicSums`Private`ExpVar^8) + 5/(48*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^2) - 5/(24*HarmonicSums`Private`ExpVar))*z2 - (7*z3)/24) + (-19403/(30720*HarmonicSums`Private`ExpVar^10) + 44769/(179200*HarmonicSums`Private`ExpVar^9) + 9889/(86016*HarmonicSums`Private`ExpVar^8) - 439/(8820*HarmonicSums`Private`ExpVar^7) - 299/(7680*HarmonicSums`Private`ExpVar^6) + 1207/(57600*HarmonicSums`Private`ExpVar^5) + 47/(1536*HarmonicSums`Private`ExpVar^4) - 23/(576*HarmonicSums`Private`ExpVar^3) - 1/(64*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z3 - (15*z3^2)/32 + sinf*(ln2^3*(19/(384*HarmonicSums`Private`ExpVar^10) - 263/(2880*HarmonicSums`Private`ExpVar^9) - 3/(256*HarmonicSums`Private`ExpVar^8) + 23/(1008*HarmonicSums`Private`ExpVar^7) + 1/(192*HarmonicSums`Private`ExpVar^6) - 19/(1440*HarmonicSums`Private`ExpVar^5) - 1/(192*HarmonicSums`Private`ExpVar^4) + 5/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) + ln2*(19/(128*HarmonicSums`Private`ExpVar^10) - 263/(960*HarmonicSums`Private`ExpVar^9) - 9/(256*HarmonicSums`Private`ExpVar^8) + 23/(336*HarmonicSums`Private`ExpVar^7) + 1/(64*HarmonicSums`Private`ExpVar^6) - 19/(480*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (19/(256*HarmonicSums`Private`ExpVar^10) - 263/(1920*HarmonicSums`Private`ExpVar^9) - 9/(512*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) + 1/(128*HarmonicSums`Private`ExpVar^6) - 19/(960*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) + 5/(96*HarmonicSums`Private`ExpVar^3) - 3/(32*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z3) + ln2^2*((-3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (16555/(4096*HarmonicSums`Private`ExpVar^10) - 6017/(6144*HarmonicSums`Private`ExpVar^9) - 1715/(3072*HarmonicSums`Private`ExpVar^8) + 23/(96*HarmonicSums`Private`ExpVar^7) + 75/(512*HarmonicSums`Private`ExpVar^6) - 51/(256*HarmonicSums`Private`ExpVar^5) + 7/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3)) + (-19/(256*HarmonicSums`Private`ExpVar^10) + 263/(1920*HarmonicSums`Private`ExpVar^9) + 9/(512*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) - 1/(128*HarmonicSums`Private`ExpVar^6) + 19/(960*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - 5/(96*HarmonicSums`Private`ExpVar^3) + 3/(32*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 - (9*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (-341/(32*HarmonicSums`Private`ExpVar^10) + 187/(128*HarmonicSums`Private`ExpVar^8) - 11/(32*HarmonicSums`Private`ExpVar^6) + 11/(64*HarmonicSums`Private`ExpVar^4) - 11/(32*HarmonicSums`Private`ExpVar^2) + 11/(16*HarmonicSums`Private`ExpVar))*z3) + z2*((-3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (16555/(4096*HarmonicSums`Private`ExpVar^10) - 6017/(6144*HarmonicSums`Private`ExpVar^9) - 1715/(3072*HarmonicSums`Private`ExpVar^8) + 23/(96*HarmonicSums`Private`ExpVar^7) + 75/(512*HarmonicSums`Private`ExpVar^6) - 51/(256*HarmonicSums`Private`ExpVar^5) + 7/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-403/(32*HarmonicSums`Private`ExpVar^10) + 221/(128*HarmonicSums`Private`ExpVar^8) - 13/(32*HarmonicSums`Private`ExpVar^6) + 13/(64*HarmonicSums`Private`ExpVar^4) - 13/(32*HarmonicSums`Private`ExpVar^2) + 13/(16*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (11439/(256*HarmonicSums`Private`ExpVar^10) - 6273/(1024*HarmonicSums`Private`ExpVar^8) + 369/(256*HarmonicSums`Private`ExpVar^6) - 369/(512*HarmonicSums`Private`ExpVar^4) + 369/(256*HarmonicSums`Private`ExpVar^2) - 369/(128*HarmonicSums`Private`ExpVar))*z5 + ln2*(-3*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) + 198432809/(451584000*HarmonicSums`Private`ExpVar^10) - 1156879/(1881600*HarmonicSums`Private`ExpVar^9) - 8002499/(54190080*HarmonicSums`Private`ExpVar^8) + 27853/(230400*HarmonicSums`Private`ExpVar^7) + 165503/(691200*HarmonicSums`Private`ExpVar^6) - 341/(768*HarmonicSums`Private`ExpVar^5) + 971/(2304*HarmonicSums`Private`ExpVar^4) - 9/(32*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z2^2 + z2*(-19403/(15360*HarmonicSums`Private`ExpVar^10) + 44769/(89600*HarmonicSums`Private`ExpVar^9) + 9889/(43008*HarmonicSums`Private`ExpVar^8) - 439/(4410*HarmonicSums`Private`ExpVar^7) - 299/(3840*HarmonicSums`Private`ExpVar^6) + 1207/(28800*HarmonicSums`Private`ExpVar^5) + 47/(768*HarmonicSums`Private`ExpVar^4) - 23/(288*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar) - (7*z3)/8) + (19/(32*HarmonicSums`Private`ExpVar^10) - 263/(240*HarmonicSums`Private`ExpVar^9) - 9/(64*HarmonicSums`Private`ExpVar^8) + 23/(84*HarmonicSums`Private`ExpVar^7) + 1/(16*HarmonicSums`Private`ExpVar^6) - 19/(120*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 5/(12*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1))*z3 + (81*z5)/64), S[-1, -1, 1, -1, -1, 1, HarmonicSums`Private`ExpVar] :> (-13*ln2^6)/360 + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-341/(480*HarmonicSums`Private`ExpVar^10) + 187/(1920*HarmonicSums`Private`ExpVar^8) - 11/(480*HarmonicSums`Private`ExpVar^6) + 11/(960*HarmonicSums`Private`ExpVar^4) - 11/(480*HarmonicSums`Private`ExpVar^2) + 11/(240*HarmonicSums`Private`ExpVar)) + li4half*(57/(64*HarmonicSums`Private`ExpVar^10) - 263/(160*HarmonicSums`Private`ExpVar^9) - 27/(128*HarmonicSums`Private`ExpVar^8) + 23/(56*HarmonicSums`Private`ExpVar^7) + 3/(32*HarmonicSums`Private`ExpVar^6) - 19/(80*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 5/(8*HarmonicSums`Private`ExpVar^3) - 9/(8*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) + 48875285831/(22759833600*HarmonicSums`Private`ExpVar^10) + 13580868583/(18966528000*HarmonicSums`Private`ExpVar^9) - 16695761689/(45519667200*HarmonicSums`Private`ExpVar^8) - 2289751/(6912000*HarmonicSums`Private`ExpVar^7) + 4562749/(20736000*HarmonicSums`Private`ExpVar^6) + 5549/(23040*HarmonicSums`Private`ExpVar^5) - 14821/(27648*HarmonicSums`Private`ExpVar^4) + 17/(32*HarmonicSums`Private`ExpVar^3) - 5/(16*HarmonicSums`Private`ExpVar^2) + ln2^4*(19/(256*HarmonicSums`Private`ExpVar^10) - 263/(1920*HarmonicSums`Private`ExpVar^9) - 9/(512*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) + 1/(128*HarmonicSums`Private`ExpVar^6) - 19/(960*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) + 5/(96*HarmonicSums`Private`ExpVar^3) - 3/(32*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar) + z2/12) + (3*z2^3)/5 + ln2^3*(-19403/(46080*HarmonicSums`Private`ExpVar^10) + 14923/(89600*HarmonicSums`Private`ExpVar^9) + 9889/(129024*HarmonicSums`Private`ExpVar^8) - 439/(13230*HarmonicSums`Private`ExpVar^7) - 299/(11520*HarmonicSums`Private`ExpVar^6) + 1207/(86400*HarmonicSums`Private`ExpVar^5) + 47/(2304*HarmonicSums`Private`ExpVar^4) - 23/(864*HarmonicSums`Private`ExpVar^3) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (155/(48*HarmonicSums`Private`ExpVar^10) - 85/(192*HarmonicSums`Private`ExpVar^8) + 5/(48*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^2) - 5/(24*HarmonicSums`Private`ExpVar))*z2 - (7*z3)/24) + (135821/(30720*HarmonicSums`Private`ExpVar^10) - 44769/(25600*HarmonicSums`Private`ExpVar^9) - 9889/(12288*HarmonicSums`Private`ExpVar^8) + 439/(1260*HarmonicSums`Private`ExpVar^7) + 2093/(7680*HarmonicSums`Private`ExpVar^6) - 8449/(57600*HarmonicSums`Private`ExpVar^5) - 329/(1536*HarmonicSums`Private`ExpVar^4) + 161/(576*HarmonicSums`Private`ExpVar^3) + 7/(64*HarmonicSums`Private`ExpVar^2) - 7/(8*HarmonicSums`Private`ExpVar))*z3 + (49*z3^2)/32 + sinf*(ln2^3*(19/(384*HarmonicSums`Private`ExpVar^10) - 263/(2880*HarmonicSums`Private`ExpVar^9) - 3/(256*HarmonicSums`Private`ExpVar^8) + 23/(1008*HarmonicSums`Private`ExpVar^7) + 1/(192*HarmonicSums`Private`ExpVar^6) - 19/(1440*HarmonicSums`Private`ExpVar^5) - 1/(192*HarmonicSums`Private`ExpVar^4) + 5/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) - 198432809/(451584000*HarmonicSums`Private`ExpVar^10) + 1156879/(1881600*HarmonicSums`Private`ExpVar^9) + 8002499/(54190080*HarmonicSums`Private`ExpVar^8) - 27853/(230400*HarmonicSums`Private`ExpVar^7) - 165503/(691200*HarmonicSums`Private`ExpVar^6) + 341/(768*HarmonicSums`Private`ExpVar^5) - 971/(2304*HarmonicSums`Private`ExpVar^4) + 9/(32*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + ln2*(19/(128*HarmonicSums`Private`ExpVar^10) - 263/(960*HarmonicSums`Private`ExpVar^9) - 9/(256*HarmonicSums`Private`ExpVar^8) + 23/(336*HarmonicSums`Private`ExpVar^7) + 1/(64*HarmonicSums`Private`ExpVar^6) - 19/(480*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (-133/(256*HarmonicSums`Private`ExpVar^10) + 1841/(1920*HarmonicSums`Private`ExpVar^9) + 63/(512*HarmonicSums`Private`ExpVar^8) - 23/(96*HarmonicSums`Private`ExpVar^7) - 7/(128*HarmonicSums`Private`ExpVar^6) + 133/(960*HarmonicSums`Private`ExpVar^5) + 7/(128*HarmonicSums`Private`ExpVar^4) - 35/(96*HarmonicSums`Private`ExpVar^3) + 21/(32*HarmonicSums`Private`ExpVar^2) - 7/(8*HarmonicSums`Private`ExpVar))*z3) + z2*((-3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (-16555/(4096*HarmonicSums`Private`ExpVar^10) + 6017/(6144*HarmonicSums`Private`ExpVar^9) + 1715/(3072*HarmonicSums`Private`ExpVar^8) - 23/(96*HarmonicSums`Private`ExpVar^7) - 75/(512*HarmonicSums`Private`ExpVar^6) + 51/(256*HarmonicSums`Private`ExpVar^5) - 7/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (341/(32*HarmonicSums`Private`ExpVar^10) - 187/(128*HarmonicSums`Private`ExpVar^8) + 11/(32*HarmonicSums`Private`ExpVar^6) - 11/(64*HarmonicSums`Private`ExpVar^4) + 11/(32*HarmonicSums`Private`ExpVar^2) - 11/(16*HarmonicSums`Private`ExpVar))*z3) + ln2^2*((-3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (16555/(4096*HarmonicSums`Private`ExpVar^10) - 6017/(6144*HarmonicSums`Private`ExpVar^9) - 1715/(3072*HarmonicSums`Private`ExpVar^8) + 23/(96*HarmonicSums`Private`ExpVar^7) + 75/(512*HarmonicSums`Private`ExpVar^6) - 51/(256*HarmonicSums`Private`ExpVar^5) + 7/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3)) + (-19/(256*HarmonicSums`Private`ExpVar^10) + 263/(1920*HarmonicSums`Private`ExpVar^9) + 9/(512*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) - 1/(128*HarmonicSums`Private`ExpVar^6) + 19/(960*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - 5/(96*HarmonicSums`Private`ExpVar^3) + 3/(32*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 - (9*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (-341/(32*HarmonicSums`Private`ExpVar^10) + 187/(128*HarmonicSums`Private`ExpVar^8) - 11/(32*HarmonicSums`Private`ExpVar^6) + 11/(64*HarmonicSums`Private`ExpVar^4) - 11/(32*HarmonicSums`Private`ExpVar^2) + 11/(16*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (2511/(256*HarmonicSums`Private`ExpVar^10) - 1377/(1024*HarmonicSums`Private`ExpVar^8) + 81/(256*HarmonicSums`Private`ExpVar^6) - 81/(512*HarmonicSums`Private`ExpVar^4) + 81/(256*HarmonicSums`Private`ExpVar^2) - 81/(128*HarmonicSums`Private`ExpVar))*z5 + ln2*(-3*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(32*HarmonicSums`Private`ExpVar^10) + 17/(128*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z2^2 + z2*(-19403/(15360*HarmonicSums`Private`ExpVar^10) + 44769/(89600*HarmonicSums`Private`ExpVar^9) + 9889/(43008*HarmonicSums`Private`ExpVar^8) - 439/(4410*HarmonicSums`Private`ExpVar^7) - 299/(3840*HarmonicSums`Private`ExpVar^6) + 1207/(28800*HarmonicSums`Private`ExpVar^5) + 47/(768*HarmonicSums`Private`ExpVar^4) - 23/(288*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar) - (7*z3)/8) + (81*z5)/64), S[-1, -1, 1, -1, 1, -1, HarmonicSums`Private`ExpVar] :> 3*li6half + ln2^6/180 + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (31/(480*HarmonicSums`Private`ExpVar^10) - 17/(1920*HarmonicSums`Private`ExpVar^8) + 1/(480*HarmonicSums`Private`ExpVar^6) - 1/(960*HarmonicSums`Private`ExpVar^4) + 1/(480*HarmonicSums`Private`ExpVar^2) - 1/(240*HarmonicSums`Private`ExpVar)) - 160969/(491520*HarmonicSums`Private`ExpVar^10) + 929063/(3317760*HarmonicSums`Private`ExpVar^9) + 24169/(147456*HarmonicSums`Private`ExpVar^8) - 5749/(18432*HarmonicSums`Private`ExpVar^7) + 4375/(18432*HarmonicSums`Private`ExpVar^6) - 941/(7680*HarmonicSums`Private`ExpVar^5) + 35/(768*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^3) + 3*s6 + ln2^4*(19/(512*HarmonicSums`Private`ExpVar^10) - 263/(3840*HarmonicSums`Private`ExpVar^9) - 9/(1024*HarmonicSums`Private`ExpVar^8) + 23/(1344*HarmonicSums`Private`ExpVar^7) + 1/(256*HarmonicSums`Private`ExpVar^6) - 19/(1920*HarmonicSums`Private`ExpVar^5) - 1/(256*HarmonicSums`Private`ExpVar^4) + 5/(192*HarmonicSums`Private`ExpVar^3) - 3/(64*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar) - z2/24) + (19/(1280*HarmonicSums`Private`ExpVar^10) - 263/(9600*HarmonicSums`Private`ExpVar^9) - 9/(2560*HarmonicSums`Private`ExpVar^8) + 23/(3360*HarmonicSums`Private`ExpVar^7) + 1/(640*HarmonicSums`Private`ExpVar^6) - 19/(4800*HarmonicSums`Private`ExpVar^5) - 1/(640*HarmonicSums`Private`ExpVar^4) + 1/(96*HarmonicSums`Private`ExpVar^3) - 3/(160*HarmonicSums`Private`ExpVar^2) + 1/(40*HarmonicSums`Private`ExpVar))*z2^2 - z2^3/56 + ln2^3*(-19403/(46080*HarmonicSums`Private`ExpVar^10) + 14923/(89600*HarmonicSums`Private`ExpVar^9) + 9889/(129024*HarmonicSums`Private`ExpVar^8) - 439/(13230*HarmonicSums`Private`ExpVar^7) - 299/(11520*HarmonicSums`Private`ExpVar^6) + 1207/(86400*HarmonicSums`Private`ExpVar^5) + 47/(2304*HarmonicSums`Private`ExpVar^4) - 23/(864*HarmonicSums`Private`ExpVar^3) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (-31/(48*HarmonicSums`Private`ExpVar^10) + 17/(192*HarmonicSums`Private`ExpVar^8) - 1/(48*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/48) + (19403/(61440*HarmonicSums`Private`ExpVar^10) - 44769/(358400*HarmonicSums`Private`ExpVar^9) - 9889/(172032*HarmonicSums`Private`ExpVar^8) + 439/(17640*HarmonicSums`Private`ExpVar^7) + 299/(15360*HarmonicSums`Private`ExpVar^6) - 1207/(115200*HarmonicSums`Private`ExpVar^5) - 47/(3072*HarmonicSums`Private`ExpVar^4) + 23/(1152*HarmonicSums`Private`ExpVar^3) + 1/(128*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3 + (-1)^HarmonicSums`Private`ExpVar*(31/(64*HarmonicSums`Private`ExpVar^10) - 17/(256*HarmonicSums`Private`ExpVar^8) + 1/(64*HarmonicSums`Private`ExpVar^6) - 1/(128*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^2) - 1/(32*HarmonicSums`Private`ExpVar))*z2*z3 - (69*z3^2)/64 + sinf*(ln2^3*(19/(384*HarmonicSums`Private`ExpVar^10) - 263/(2880*HarmonicSums`Private`ExpVar^9) - 3/(256*HarmonicSums`Private`ExpVar^8) + 23/(1008*HarmonicSums`Private`ExpVar^7) + 1/(192*HarmonicSums`Private`ExpVar^6) - 19/(1440*HarmonicSums`Private`ExpVar^5) - 1/(192*HarmonicSums`Private`ExpVar^4) + 5/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) + ln2*((-1)^HarmonicSums`Private`ExpVar* (-16555/(2048*HarmonicSums`Private`ExpVar^10) + 6017/(3072*HarmonicSums`Private`ExpVar^9) + 1715/(1536*HarmonicSums`Private`ExpVar^8) - 23/(48*HarmonicSums`Private`ExpVar^7) - 75/(256*HarmonicSums`Private`ExpVar^6) + 51/(128*HarmonicSums`Private`ExpVar^5) - 7/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) + (-19/(128*HarmonicSums`Private`ExpVar^10) + 263/(960*HarmonicSums`Private`ExpVar^9) + 9/(256*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) - 1/(64*HarmonicSums`Private`ExpVar^6) + 19/(480*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2) + (-19/(512*HarmonicSums`Private`ExpVar^10) + 263/(3840*HarmonicSums`Private`ExpVar^9) + 9/(1024*HarmonicSums`Private`ExpVar^8) - 23/(1344*HarmonicSums`Private`ExpVar^7) - 1/(256*HarmonicSums`Private`ExpVar^6) + 19/(1920*HarmonicSums`Private`ExpVar^5) + 1/(256*HarmonicSums`Private`ExpVar^4) - 5/(192*HarmonicSums`Private`ExpVar^3) + 3/(64*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-16555/(4096*HarmonicSums`Private`ExpVar^10) + 6017/(6144*HarmonicSums`Private`ExpVar^9) + 1715/(3072*HarmonicSums`Private`ExpVar^8) - 23/(96*HarmonicSums`Private`ExpVar^7) - 75/(512*HarmonicSums`Private`ExpVar^6) + 51/(256*HarmonicSums`Private`ExpVar^5) - 7/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3)) + (-19/(128*HarmonicSums`Private`ExpVar^10) + 263/(960*HarmonicSums`Private`ExpVar^9) + 9/(256*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) - 1/(64*HarmonicSums`Private`ExpVar^6) + 19/(480*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 - (3*z2^2)/5 + (-1)^HarmonicSums`Private`ExpVar* (-31/(64*HarmonicSums`Private`ExpVar^10) + 17/(256*HarmonicSums`Private`ExpVar^8) - 1/(64*HarmonicSums`Private`ExpVar^6) + 1/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^2) + 1/(32*HarmonicSums`Private`ExpVar))*z3) + ln2*((-1)^HarmonicSums`Private`ExpVar* (2230261/(147456*HarmonicSums`Private`ExpVar^10) + 29459/(73728*HarmonicSums`Private`ExpVar^9) - 35927/(18432*HarmonicSums`Private`ExpVar^8) + 61/(1152*HarmonicSums`Private`ExpVar^7) + 1427/(3072*HarmonicSums`Private`ExpVar^6) - 311/(1536*HarmonicSums`Private`ExpVar^5) - 1/(192*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (93/(32*HarmonicSums`Private`ExpVar^10) - 51/(128*HarmonicSums`Private`ExpVar^8) + 3/(32*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^2) - 3/(16*HarmonicSums`Private`ExpVar))*z2^2 + z2*(19403/(15360*HarmonicSums`Private`ExpVar^10) - 44769/(89600*HarmonicSums`Private`ExpVar^9) - 9889/(43008*HarmonicSums`Private`ExpVar^8) + 439/(4410*HarmonicSums`Private`ExpVar^7) + 299/(3840*HarmonicSums`Private`ExpVar^6) - 1207/(28800*HarmonicSums`Private`ExpVar^5) - 47/(768*HarmonicSums`Private`ExpVar^4) + 23/(288*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) - (9*z3)/16) - (3*z5)/64) + (-1)^HarmonicSums`Private`ExpVar* (-93/(256*HarmonicSums`Private`ExpVar^10) + 51/(1024*HarmonicSums`Private`ExpVar^8) - 3/(256*HarmonicSums`Private`ExpVar^6) + 3/(512*HarmonicSums`Private`ExpVar^4) - 3/(256*HarmonicSums`Private`ExpVar^2) + 3/(128*HarmonicSums`Private`ExpVar))*z5, S[-1, -1, 1, -1, 1, 1, HarmonicSums`Private`ExpVar] :> 3*li6half + ln2^6/180 + (-1)^HarmonicSums`Private`ExpVar* (2791098353/(371589120*HarmonicSums`Private`ExpVar^10) + 40825465/(12386304*HarmonicSums`Private`ExpVar^9) - 6979069/(7741440*HarmonicSums`Private`ExpVar^8) - 79577/(138240*HarmonicSums`Private`ExpVar^7) + 77147/(184320*HarmonicSums`Private`ExpVar^6) - 2227/(18432*HarmonicSums`Private`ExpVar^5) + 35/(1152*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(480*HarmonicSums`Private`ExpVar^10) - 17/(1920*HarmonicSums`Private`ExpVar^8) + 1/(480*HarmonicSums`Private`ExpVar^6) - 1/(960*HarmonicSums`Private`ExpVar^4) + 1/(480*HarmonicSums`Private`ExpVar^2) - 1/(240*HarmonicSums`Private`ExpVar)) + 3*s6 + (-1)^HarmonicSums`Private`ExpVar* (16555/(4096*HarmonicSums`Private`ExpVar^10) - 6017/(6144*HarmonicSums`Private`ExpVar^9) - 1715/(3072*HarmonicSums`Private`ExpVar^8) + 23/(96*HarmonicSums`Private`ExpVar^7) + 75/(512*HarmonicSums`Private`ExpVar^6) - 51/(256*HarmonicSums`Private`ExpVar^5) + 7/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3))*sinf^2 + ln2^4*(19/(512*HarmonicSums`Private`ExpVar^10) - 263/(3840*HarmonicSums`Private`ExpVar^9) - 9/(1024*HarmonicSums`Private`ExpVar^8) + 23/(1344*HarmonicSums`Private`ExpVar^7) + 1/(256*HarmonicSums`Private`ExpVar^6) - 19/(1920*HarmonicSums`Private`ExpVar^5) - 1/(256*HarmonicSums`Private`ExpVar^4) + 5/(192*HarmonicSums`Private`ExpVar^3) - 3/(64*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar) - z2/24) + (-19/(1280*HarmonicSums`Private`ExpVar^10) + 263/(9600*HarmonicSums`Private`ExpVar^9) + 9/(2560*HarmonicSums`Private`ExpVar^8) - 23/(3360*HarmonicSums`Private`ExpVar^7) - 1/(640*HarmonicSums`Private`ExpVar^6) + 19/(4800*HarmonicSums`Private`ExpVar^5) + 1/(640*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^3) + 3/(160*HarmonicSums`Private`ExpVar^2) - 1/(40*HarmonicSums`Private`ExpVar))*z2^2 - (71*z2^3)/168 + ln2^3*(-19403/(46080*HarmonicSums`Private`ExpVar^10) + 14923/(89600*HarmonicSums`Private`ExpVar^9) + 9889/(129024*HarmonicSums`Private`ExpVar^8) - 439/(13230*HarmonicSums`Private`ExpVar^7) - 299/(11520*HarmonicSums`Private`ExpVar^6) + 1207/(86400*HarmonicSums`Private`ExpVar^5) + 47/(2304*HarmonicSums`Private`ExpVar^4) - 23/(864*HarmonicSums`Private`ExpVar^3) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (-31/(48*HarmonicSums`Private`ExpVar^10) + 17/(192*HarmonicSums`Private`ExpVar^8) - 1/(48*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/48) + (-135821/(61440*HarmonicSums`Private`ExpVar^10) + 44769/(51200*HarmonicSums`Private`ExpVar^9) + 9889/(24576*HarmonicSums`Private`ExpVar^8) - 439/(2520*HarmonicSums`Private`ExpVar^7) - 2093/(15360*HarmonicSums`Private`ExpVar^6) + 8449/(115200*HarmonicSums`Private`ExpVar^5) + 329/(3072*HarmonicSums`Private`ExpVar^4) - 161/(1152*HarmonicSums`Private`ExpVar^3) - 7/(128*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3 - (101*z3^2)/64 + ln2^2*((-19/(128*HarmonicSums`Private`ExpVar^10) + 263/(960*HarmonicSums`Private`ExpVar^9) + 9/(256*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) - 1/(64*HarmonicSums`Private`ExpVar^6) + 19/(480*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 - (3*z2^2)/5 + (-1)^HarmonicSums`Private`ExpVar* (-31/(64*HarmonicSums`Private`ExpVar^10) + 17/(256*HarmonicSums`Private`ExpVar^8) - 1/(64*HarmonicSums`Private`ExpVar^6) + 1/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^2) + 1/(32*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar* (-2230261/(147456*HarmonicSums`Private`ExpVar^10) - 29459/(73728*HarmonicSums`Private`ExpVar^9) + 35927/(18432*HarmonicSums`Private`ExpVar^8) - 61/(1152*HarmonicSums`Private`ExpVar^7) - 1427/(3072*HarmonicSums`Private`ExpVar^6) + 311/(1536*HarmonicSums`Private`ExpVar^5) + 1/(192*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3)) + ln2^3*(19/(384*HarmonicSums`Private`ExpVar^10) - 263/(2880*HarmonicSums`Private`ExpVar^9) - 3/(256*HarmonicSums`Private`ExpVar^8) + 23/(1008*HarmonicSums`Private`ExpVar^7) + 1/(192*HarmonicSums`Private`ExpVar^6) - 19/(1440*HarmonicSums`Private`ExpVar^5) - 1/(192*HarmonicSums`Private`ExpVar^4) + 5/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) + ln2*(-19/(128*HarmonicSums`Private`ExpVar^10) + 263/(960*HarmonicSums`Private`ExpVar^9) + 9/(256*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) - 1/(64*HarmonicSums`Private`ExpVar^6) + 19/(480*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (133/(512*HarmonicSums`Private`ExpVar^10) - 1841/(3840*HarmonicSums`Private`ExpVar^9) - 63/(1024*HarmonicSums`Private`ExpVar^8) + 23/(192*HarmonicSums`Private`ExpVar^7) + 7/(256*HarmonicSums`Private`ExpVar^6) - 133/(1920*HarmonicSums`Private`ExpVar^5) - 7/(256*HarmonicSums`Private`ExpVar^4) + 35/(192*HarmonicSums`Private`ExpVar^3) - 21/(64*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3) + z2*((-1)^HarmonicSums`Private`ExpVar* (16555/(4096*HarmonicSums`Private`ExpVar^10) - 6017/(6144*HarmonicSums`Private`ExpVar^9) - 1715/(3072*HarmonicSums`Private`ExpVar^8) + 23/(96*HarmonicSums`Private`ExpVar^7) + 75/(512*HarmonicSums`Private`ExpVar^6) - 51/(256*HarmonicSums`Private`ExpVar^5) + 7/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-465/(64*HarmonicSums`Private`ExpVar^10) + 255/(256*HarmonicSums`Private`ExpVar^8) - 15/(64*HarmonicSums`Private`ExpVar^6) + 15/(128*HarmonicSums`Private`ExpVar^4) - 15/(64*HarmonicSums`Private`ExpVar^2) + 15/(32*HarmonicSums`Private`ExpVar))*z3) + ln2*((-1)^HarmonicSums`Private`ExpVar* (93/(32*HarmonicSums`Private`ExpVar^10) - 51/(128*HarmonicSums`Private`ExpVar^8) + 3/(32*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^2) - 3/(16*HarmonicSums`Private`ExpVar))*z2^2 + z2*(19403/(15360*HarmonicSums`Private`ExpVar^10) - 44769/(89600*HarmonicSums`Private`ExpVar^9) - 9889/(43008*HarmonicSums`Private`ExpVar^8) + 439/(4410*HarmonicSums`Private`ExpVar^7) + 299/(3840*HarmonicSums`Private`ExpVar^6) - 1207/(28800*HarmonicSums`Private`ExpVar^5) - 47/(768*HarmonicSums`Private`ExpVar^4) + 23/(288*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) - (9*z3)/16) + (19/(64*HarmonicSums`Private`ExpVar^10) - 263/(480*HarmonicSums`Private`ExpVar^9) - 9/(128*HarmonicSums`Private`ExpVar^8) + 23/(168*HarmonicSums`Private`ExpVar^7) + 1/(32*HarmonicSums`Private`ExpVar^6) - 19/(240*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 3/(8*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z3 - (3*z5)/64) + (-1)^HarmonicSums`Private`ExpVar* (899/(256*HarmonicSums`Private`ExpVar^10) - 493/(1024*HarmonicSums`Private`ExpVar^8) + 29/(256*HarmonicSums`Private`ExpVar^6) - 29/(512*HarmonicSums`Private`ExpVar^4) + 29/(256*HarmonicSums`Private`ExpVar^2) - 29/(128*HarmonicSums`Private`ExpVar))*z5, S[-1, -1, 1, 1, -1, -1, HarmonicSums`Private`ExpVar] :> 6*li6half + ln2^6/72 + (-1)^HarmonicSums`Private`ExpVar*li5half* (31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + li4half*(-19/(64*HarmonicSums`Private`ExpVar^10) + 263/(480*HarmonicSums`Private`ExpVar^9) + 9/(128*HarmonicSums`Private`ExpVar^8) - 23/(168*HarmonicSums`Private`ExpVar^7) - 1/(32*HarmonicSums`Private`ExpVar^6) + 19/(240*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(120*HarmonicSums`Private`ExpVar^10) - 17/(480*HarmonicSums`Private`ExpVar^8) + 1/(120*HarmonicSums`Private`ExpVar^6) - 1/(240*HarmonicSums`Private`ExpVar^4) + 1/(120*HarmonicSums`Private`ExpVar^2) - 1/(60*HarmonicSums`Private`ExpVar)) + 282428994361/(1137991680000*HarmonicSums`Private`ExpVar^10) - 30419853817/(56899584000*HarmonicSums`Private`ExpVar^9) - 336958171/(22759833600*HarmonicSums`Private`ExpVar^8) - 823789/(13824000*HarmonicSums`Private`ExpVar^7) + 15199861/(41472000*HarmonicSums`Private`ExpVar^6) - 23377/(46080*HarmonicSums`Private`ExpVar^5) + 6145/(13824*HarmonicSums`Private`ExpVar^4) - 55/(192*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) + (5*s6)/2 + ln2^4*(-19/(384*HarmonicSums`Private`ExpVar^10) + 263/(2880*HarmonicSums`Private`ExpVar^9) + 3/(256*HarmonicSums`Private`ExpVar^8) - 23/(1008*HarmonicSums`Private`ExpVar^7) - 1/(192*HarmonicSums`Private`ExpVar^6) + 19/(1440*HarmonicSums`Private`ExpVar^5) + 1/(192*HarmonicSums`Private`ExpVar^4) - 5/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar) - z2/24) + (-19/(256*HarmonicSums`Private`ExpVar^10) + 263/(1920*HarmonicSums`Private`ExpVar^9) + 9/(512*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) - 1/(128*HarmonicSums`Private`ExpVar^6) + 19/(960*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - 5/(96*HarmonicSums`Private`ExpVar^3) + 3/(32*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2^2 - (18*z2^3)/35 + sinf^2*(ln2^2*(-19/(256*HarmonicSums`Private`ExpVar^10) + 263/(1920*HarmonicSums`Private`ExpVar^9) + 9/(512*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) - 1/(128*HarmonicSums`Private`ExpVar^6) + 19/(960*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - 5/(96*HarmonicSums`Private`ExpVar^3) + 3/(32*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar)) + (-19/(256*HarmonicSums`Private`ExpVar^10) + 263/(1920*HarmonicSums`Private`ExpVar^9) + 9/(512*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) - 1/(128*HarmonicSums`Private`ExpVar^6) + 19/(960*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - 5/(96*HarmonicSums`Private`ExpVar^3) + 3/(32*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2) + ln2^3*(19403/(23040*HarmonicSums`Private`ExpVar^10) - 14923/(44800*HarmonicSums`Private`ExpVar^9) - 9889/(64512*HarmonicSums`Private`ExpVar^8) + 439/(6615*HarmonicSums`Private`ExpVar^7) + 299/(5760*HarmonicSums`Private`ExpVar^6) - 1207/(43200*HarmonicSums`Private`ExpVar^5) - 47/(1152*HarmonicSums`Private`ExpVar^4) + 23/(432*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/48) + (-135821/(61440*HarmonicSums`Private`ExpVar^10) + 44769/(51200*HarmonicSums`Private`ExpVar^9) + 9889/(24576*HarmonicSums`Private`ExpVar^8) - 439/(2520*HarmonicSums`Private`ExpVar^7) - 2093/(15360*HarmonicSums`Private`ExpVar^6) + 8449/(115200*HarmonicSums`Private`ExpVar^5) + 329/(3072*HarmonicSums`Private`ExpVar^4) - 161/(1152*HarmonicSums`Private`ExpVar^3) - 7/(128*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3 - (109*z3^2)/64 + ln2^2*(li4half/2 - 9718511/(4300800*HarmonicSums`Private`ExpVar^10) - 17100359/(2032128000*HarmonicSums`Private`ExpVar^9) + 4111957/(12042240*HarmonicSums`Private`ExpVar^8) + 4818869/(118540800*HarmonicSums`Private`ExpVar^7) - 20257/(230400*HarmonicSums`Private`ExpVar^6) - 116309/(1728000*HarmonicSums`Private`ExpVar^5) + 1435/(9216*HarmonicSums`Private`ExpVar^4) - 251/(1728*HarmonicSums`Private`ExpVar^3) + 9/(64*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) + (-19/(256*HarmonicSums`Private`ExpVar^10) + 263/(1920*HarmonicSums`Private`ExpVar^9) + 9/(512*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) - 1/(128*HarmonicSums`Private`ExpVar^6) + 19/(960*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - 5/(96*HarmonicSums`Private`ExpVar^3) + 3/(32*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 - z2^2/8 + (-1)^HarmonicSums`Private`ExpVar* (217/(64*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^6) - 7/(128*HarmonicSums`Private`ExpVar^4) + 7/(64*HarmonicSums`Private`ExpVar^2) - 7/(32*HarmonicSums`Private`ExpVar))*z3) + z2*(li4half/2 - 9718511/(4300800*HarmonicSums`Private`ExpVar^10) - 17100359/(2032128000*HarmonicSums`Private`ExpVar^9) + 4111957/(12042240*HarmonicSums`Private`ExpVar^8) + 4818869/(118540800*HarmonicSums`Private`ExpVar^7) - 20257/(230400*HarmonicSums`Private`ExpVar^6) - 116309/(1728000*HarmonicSums`Private`ExpVar^5) + 1435/(9216*HarmonicSums`Private`ExpVar^4) - 251/(1728*HarmonicSums`Private`ExpVar^3) + 9/(64*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (-217/(64*HarmonicSums`Private`ExpVar^10) + 119/(256*HarmonicSums`Private`ExpVar^8) - 7/(64*HarmonicSums`Private`ExpVar^6) + 7/(128*HarmonicSums`Private`ExpVar^4) - 7/(64*HarmonicSums`Private`ExpVar^2) + 7/(32*HarmonicSums`Private`ExpVar))*z3) + sinf*(ln2^2*(19403/(15360*HarmonicSums`Private`ExpVar^10) - 44769/(89600*HarmonicSums`Private`ExpVar^9) - 9889/(43008*HarmonicSums`Private`ExpVar^8) + 439/(4410*HarmonicSums`Private`ExpVar^7) + 299/(3840*HarmonicSums`Private`ExpVar^6) - 1207/(28800*HarmonicSums`Private`ExpVar^5) - 47/(768*HarmonicSums`Private`ExpVar^4) + 23/(288*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar)) + ln2^3*(-19/(192*HarmonicSums`Private`ExpVar^10) + 263/(1440*HarmonicSums`Private`ExpVar^9) + 3/(128*HarmonicSums`Private`ExpVar^8) - 23/(504*HarmonicSums`Private`ExpVar^7) - 1/(96*HarmonicSums`Private`ExpVar^6) + 19/(720*HarmonicSums`Private`ExpVar^5) + 1/(96*HarmonicSums`Private`ExpVar^4) - 5/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar)) + (19403/(15360*HarmonicSums`Private`ExpVar^10) - 44769/(89600*HarmonicSums`Private`ExpVar^9) - 9889/(43008*HarmonicSums`Private`ExpVar^8) + 439/(4410*HarmonicSums`Private`ExpVar^7) + 299/(3840*HarmonicSums`Private`ExpVar^6) - 1207/(28800*HarmonicSums`Private`ExpVar^5) - 47/(768*HarmonicSums`Private`ExpVar^4) + 23/(288*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + ln2*(-19/(128*HarmonicSums`Private`ExpVar^10) + 263/(960*HarmonicSums`Private`ExpVar^9) + 9/(256*HarmonicSums`Private`ExpVar^8) - 23/(336*HarmonicSums`Private`ExpVar^7) - 1/(64*HarmonicSums`Private`ExpVar^6) + 19/(480*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 3/(16*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (133/(512*HarmonicSums`Private`ExpVar^10) - 1841/(3840*HarmonicSums`Private`ExpVar^9) - 63/(1024*HarmonicSums`Private`ExpVar^8) + 23/(192*HarmonicSums`Private`ExpVar^7) + 7/(256*HarmonicSums`Private`ExpVar^6) - 133/(1920*HarmonicSums`Private`ExpVar^5) - 7/(256*HarmonicSums`Private`ExpVar^4) + 35/(192*HarmonicSums`Private`ExpVar^3) - 21/(64*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(2*li5half + (-1)^HarmonicSums`Private`ExpVar* (-21731/(18432*HarmonicSums`Private`ExpVar^10) + 2539/(1024*HarmonicSums`Private`ExpVar^9) - 211/(1536*HarmonicSums`Private`ExpVar^8) - 427/(768*HarmonicSums`Private`ExpVar^7) + 137/(384*HarmonicSums`Private`ExpVar^6) - 23/(192*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (31/(10*HarmonicSums`Private`ExpVar^10) - 17/(40*HarmonicSums`Private`ExpVar^8) + 1/(10*HarmonicSums`Private`ExpVar^6) - 1/(20*HarmonicSums`Private`ExpVar^4) + 1/(10*HarmonicSums`Private`ExpVar^2) - 1/(5*HarmonicSums`Private`ExpVar))*z2^2 + z2*(19403/(15360*HarmonicSums`Private`ExpVar^10) - 44769/(89600*HarmonicSums`Private`ExpVar^9) - 9889/(43008*HarmonicSums`Private`ExpVar^8) + 439/(4410*HarmonicSums`Private`ExpVar^7) + 299/(3840*HarmonicSums`Private`ExpVar^6) - 1207/(28800*HarmonicSums`Private`ExpVar^5) - 47/(768*HarmonicSums`Private`ExpVar^4) + 23/(288*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) + (7*z3)/16) - (27*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-837/(128*HarmonicSums`Private`ExpVar^10) + 459/(512*HarmonicSums`Private`ExpVar^8) - 27/(128*HarmonicSums`Private`ExpVar^6) + 27/(256*HarmonicSums`Private`ExpVar^4) - 27/(128*HarmonicSums`Private`ExpVar^2) + 27/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, -1, 1, 1, -1, 1, HarmonicSums`Private`ExpVar] :> 6*li6half + ln2^6/72 + (-1)^HarmonicSums`Private`ExpVar* (-42398767/(6635520*HarmonicSums`Private`ExpVar^10) + 2210371/(860160*HarmonicSums`Private`ExpVar^9) + 16159/(32256*HarmonicSums`Private`ExpVar^8) - 13103/(23040*HarmonicSums`Private`ExpVar^7) + 3701/(23040*HarmonicSums`Private`ExpVar^6) - 13/(2304*HarmonicSums`Private`ExpVar^5) - 1/(144*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar*li5half* (31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + li4half*(-19/(64*HarmonicSums`Private`ExpVar^10) + 263/(480*HarmonicSums`Private`ExpVar^9) + 9/(128*HarmonicSums`Private`ExpVar^8) - 23/(168*HarmonicSums`Private`ExpVar^7) - 1/(32*HarmonicSums`Private`ExpVar^6) + 19/(240*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(120*HarmonicSums`Private`ExpVar^10) - 17/(480*HarmonicSums`Private`ExpVar^8) + 1/(120*HarmonicSums`Private`ExpVar^6) - 1/(240*HarmonicSums`Private`ExpVar^4) + 1/(120*HarmonicSums`Private`ExpVar^2) - 1/(60*HarmonicSums`Private`ExpVar)) + (5*s6)/2 + ln2^4*(-19/(384*HarmonicSums`Private`ExpVar^10) + 263/(2880*HarmonicSums`Private`ExpVar^9) + 3/(256*HarmonicSums`Private`ExpVar^8) - 23/(1008*HarmonicSums`Private`ExpVar^7) - 1/(192*HarmonicSums`Private`ExpVar^6) + 19/(1440*HarmonicSums`Private`ExpVar^5) + 1/(192*HarmonicSums`Private`ExpVar^4) - 5/(144*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar) - z2/24) + (247/(1280*HarmonicSums`Private`ExpVar^10) - 3419/(9600*HarmonicSums`Private`ExpVar^9) - 117/(2560*HarmonicSums`Private`ExpVar^8) + 299/(3360*HarmonicSums`Private`ExpVar^7) + 13/(640*HarmonicSums`Private`ExpVar^6) - 247/(4800*HarmonicSums`Private`ExpVar^5) - 13/(640*HarmonicSums`Private`ExpVar^4) + 13/(96*HarmonicSums`Private`ExpVar^3) - 39/(160*HarmonicSums`Private`ExpVar^2) + 13/(40*HarmonicSums`Private`ExpVar))*z2^2 - (172*z2^3)/105 + sinf^2*(ln2^2*(-19/(256*HarmonicSums`Private`ExpVar^10) + 263/(1920*HarmonicSums`Private`ExpVar^9) + 9/(512*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) - 1/(128*HarmonicSums`Private`ExpVar^6) + 19/(960*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - 5/(96*HarmonicSums`Private`ExpVar^3) + 3/(32*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar)) + (19/(256*HarmonicSums`Private`ExpVar^10) - 263/(1920*HarmonicSums`Private`ExpVar^9) - 9/(512*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) + 1/(128*HarmonicSums`Private`ExpVar^6) - 19/(960*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) + 5/(96*HarmonicSums`Private`ExpVar^3) - 3/(32*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2) + ln2^3*(19403/(23040*HarmonicSums`Private`ExpVar^10) - 14923/(44800*HarmonicSums`Private`ExpVar^9) - 9889/(64512*HarmonicSums`Private`ExpVar^8) + 439/(6615*HarmonicSums`Private`ExpVar^7) + 299/(5760*HarmonicSums`Private`ExpVar^6) - 1207/(43200*HarmonicSums`Private`ExpVar^5) - 47/(1152*HarmonicSums`Private`ExpVar^4) + 23/(432*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/48) + (19403/(61440*HarmonicSums`Private`ExpVar^10) - 44769/(358400*HarmonicSums`Private`ExpVar^9) - 9889/(172032*HarmonicSums`Private`ExpVar^8) + 439/(17640*HarmonicSums`Private`ExpVar^7) + 299/(15360*HarmonicSums`Private`ExpVar^6) - 1207/(115200*HarmonicSums`Private`ExpVar^5) - 47/(3072*HarmonicSums`Private`ExpVar^4) + 23/(1152*HarmonicSums`Private`ExpVar^3) + 1/(128*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3 - (45*z3^2)/64 + z2*(li4half/2 + 9718511/(4300800*HarmonicSums`Private`ExpVar^10) + 17100359/(2032128000*HarmonicSums`Private`ExpVar^9) - 4111957/(12042240*HarmonicSums`Private`ExpVar^8) - 4818869/(118540800*HarmonicSums`Private`ExpVar^7) + 20257/(230400*HarmonicSums`Private`ExpVar^6) + 116309/(1728000*HarmonicSums`Private`ExpVar^5) - 1435/(9216*HarmonicSums`Private`ExpVar^4) + 251/(1728*HarmonicSums`Private`ExpVar^3) - 9/(64*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (279/(64*HarmonicSums`Private`ExpVar^10) - 153/(256*HarmonicSums`Private`ExpVar^8) + 9/(64*HarmonicSums`Private`ExpVar^6) - 9/(128*HarmonicSums`Private`ExpVar^4) + 9/(64*HarmonicSums`Private`ExpVar^2) - 9/(32*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(li4half/2 - 9718511/(4300800*HarmonicSums`Private`ExpVar^10) - 17100359/(2032128000*HarmonicSums`Private`ExpVar^9) + 4111957/(12042240*HarmonicSums`Private`ExpVar^8) + 4818869/(118540800*HarmonicSums`Private`ExpVar^7) - 20257/(230400*HarmonicSums`Private`ExpVar^6) - 116309/(1728000*HarmonicSums`Private`ExpVar^5) + 1435/(9216*HarmonicSums`Private`ExpVar^4) - 251/(1728*HarmonicSums`Private`ExpVar^3) + 9/(64*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) + (19/(256*HarmonicSums`Private`ExpVar^10) - 263/(1920*HarmonicSums`Private`ExpVar^9) - 9/(512*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) + 1/(128*HarmonicSums`Private`ExpVar^6) - 19/(960*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) + 5/(96*HarmonicSums`Private`ExpVar^3) - 3/(32*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 - z2^2/8 + (-1)^HarmonicSums`Private`ExpVar* (217/(64*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^6) - 7/(128*HarmonicSums`Private`ExpVar^4) + 7/(64*HarmonicSums`Private`ExpVar^2) - 7/(32*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar* (21731/(18432*HarmonicSums`Private`ExpVar^10) - 2539/(1024*HarmonicSums`Private`ExpVar^9) + 211/(1536*HarmonicSums`Private`ExpVar^8) + 427/(768*HarmonicSums`Private`ExpVar^7) - 137/(384*HarmonicSums`Private`ExpVar^6) + 23/(192*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^4)) + ln2^2*(19403/(15360*HarmonicSums`Private`ExpVar^10) - 44769/(89600*HarmonicSums`Private`ExpVar^9) - 9889/(43008*HarmonicSums`Private`ExpVar^8) + 439/(4410*HarmonicSums`Private`ExpVar^7) + 299/(3840*HarmonicSums`Private`ExpVar^6) - 1207/(28800*HarmonicSums`Private`ExpVar^5) - 47/(768*HarmonicSums`Private`ExpVar^4) + 23/(288*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar)) + ln2^3*(-19/(192*HarmonicSums`Private`ExpVar^10) + 263/(1440*HarmonicSums`Private`ExpVar^9) + 3/(128*HarmonicSums`Private`ExpVar^8) - 23/(504*HarmonicSums`Private`ExpVar^7) - 1/(96*HarmonicSums`Private`ExpVar^6) + 19/(720*HarmonicSums`Private`ExpVar^5) + 1/(96*HarmonicSums`Private`ExpVar^4) - 5/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar)) + ln2*(19/(128*HarmonicSums`Private`ExpVar^10) - 263/(960*HarmonicSums`Private`ExpVar^9) - 9/(256*HarmonicSums`Private`ExpVar^8) + 23/(336*HarmonicSums`Private`ExpVar^7) + 1/(64*HarmonicSums`Private`ExpVar^6) - 19/(480*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (-19403/(15360*HarmonicSums`Private`ExpVar^10) + 44769/(89600*HarmonicSums`Private`ExpVar^9) + 9889/(43008*HarmonicSums`Private`ExpVar^8) - 439/(4410*HarmonicSums`Private`ExpVar^7) - 299/(3840*HarmonicSums`Private`ExpVar^6) + 1207/(28800*HarmonicSums`Private`ExpVar^5) + 47/(768*HarmonicSums`Private`ExpVar^4) - 23/(288*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (-19/(512*HarmonicSums`Private`ExpVar^10) + 263/(3840*HarmonicSums`Private`ExpVar^9) + 9/(1024*HarmonicSums`Private`ExpVar^8) - 23/(1344*HarmonicSums`Private`ExpVar^7) - 1/(256*HarmonicSums`Private`ExpVar^6) + 19/(1920*HarmonicSums`Private`ExpVar^5) + 1/(256*HarmonicSums`Private`ExpVar^4) - 5/(192*HarmonicSums`Private`ExpVar^3) + 3/(64*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(2*li5half + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (31/(10*HarmonicSums`Private`ExpVar^10) - 17/(40*HarmonicSums`Private`ExpVar^8) + 1/(10*HarmonicSums`Private`ExpVar^6) - 1/(20*HarmonicSums`Private`ExpVar^4) + 1/(10*HarmonicSums`Private`ExpVar^2) - 1/(5*HarmonicSums`Private`ExpVar))*z2^2 + z2*(-19403/(15360*HarmonicSums`Private`ExpVar^10) + 44769/(89600*HarmonicSums`Private`ExpVar^9) + 9889/(43008*HarmonicSums`Private`ExpVar^8) - 439/(4410*HarmonicSums`Private`ExpVar^7) - 299/(3840*HarmonicSums`Private`ExpVar^6) + 1207/(28800*HarmonicSums`Private`ExpVar^5) + 47/(768*HarmonicSums`Private`ExpVar^4) - 23/(288*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar) + (7*z3)/16) + (-19/(64*HarmonicSums`Private`ExpVar^10) + 263/(480*HarmonicSums`Private`ExpVar^9) + 9/(128*HarmonicSums`Private`ExpVar^8) - 23/(168*HarmonicSums`Private`ExpVar^7) - 1/(32*HarmonicSums`Private`ExpVar^6) + 19/(240*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 5/(24*HarmonicSums`Private`ExpVar^3) + 3/(8*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z3 - (27*z5)/32) + (-1)^HarmonicSums`Private`ExpVar* (-3813/(128*HarmonicSums`Private`ExpVar^10) + 2091/(512*HarmonicSums`Private`ExpVar^8) - 123/(128*HarmonicSums`Private`ExpVar^6) + 123/(256*HarmonicSums`Private`ExpVar^4) - 123/(128*HarmonicSums`Private`ExpVar^2) + 123/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, -1, 1, 1, 1, -1, HarmonicSums`Private`ExpVar] :> 5*li6half + (-1)^HarmonicSums`Private`ExpVar* (-26495/(8192*HarmonicSums`Private`ExpVar^10) - 6419/(12288*HarmonicSums`Private`ExpVar^9) + 35/(48*HarmonicSums`Private`ExpVar^8) - 223/(768*HarmonicSums`Private`ExpVar^7) + 17/(256*HarmonicSums`Private`ExpVar^6) - 1/(128*HarmonicSums`Private`ExpVar^5)) + (-1)^HarmonicSums`Private`ExpVar*li5half* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + ln2^4*(19/(1536*HarmonicSums`Private`ExpVar^10) - 263/(11520*HarmonicSums`Private`ExpVar^9) - 3/(1024*HarmonicSums`Private`ExpVar^8) + 23/(4032*HarmonicSums`Private`ExpVar^7) + 1/(768*HarmonicSums`Private`ExpVar^6) - 19/(5760*HarmonicSums`Private`ExpVar^5) - 1/(768*HarmonicSums`Private`ExpVar^4) + 5/(576*HarmonicSums`Private`ExpVar^3) - 1/(64*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar)) + ln2^3*(-19403/(46080*HarmonicSums`Private`ExpVar^10) + 14923/(89600*HarmonicSums`Private`ExpVar^9) + 9889/(129024*HarmonicSums`Private`ExpVar^8) - 439/(13230*HarmonicSums`Private`ExpVar^7) - 299/(11520*HarmonicSums`Private`ExpVar^6) + 1207/(86400*HarmonicSums`Private`ExpVar^5) + 47/(2304*HarmonicSums`Private`ExpVar^4) - 23/(864*HarmonicSums`Private`ExpVar^3) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) + (ln2^2*(19/(256*HarmonicSums`Private`ExpVar^10) - 263/(1920*HarmonicSums`Private`ExpVar^9) - 9/(512*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) + 1/(128*HarmonicSums`Private`ExpVar^6) - 19/(960*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) + 5/(96*HarmonicSums`Private`ExpVar^3) - 3/(32*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar)) + ln2*(-19403/(15360*HarmonicSums`Private`ExpVar^10) + 44769/(89600*HarmonicSums`Private`ExpVar^9) + 9889/(43008*HarmonicSums`Private`ExpVar^8) - 439/(4410*HarmonicSums`Private`ExpVar^7) - 299/(3840*HarmonicSums`Private`ExpVar^6) + 1207/(28800*HarmonicSums`Private`ExpVar^5) + 47/(768*HarmonicSums`Private`ExpVar^4) - 23/(288*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar)))*sinf^2 + ln2*(19/(384*HarmonicSums`Private`ExpVar^10) - 263/(2880*HarmonicSums`Private`ExpVar^9) - 3/(256*HarmonicSums`Private`ExpVar^8) + 23/(1008*HarmonicSums`Private`ExpVar^7) + 1/(192*HarmonicSums`Private`ExpVar^6) - 19/(1440*HarmonicSums`Private`ExpVar^5) - 1/(192*HarmonicSums`Private`ExpVar^4) + 5/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar))*sinf^3 - (8*z2^3)/7 + ln2^2*(9718511/(4300800*HarmonicSums`Private`ExpVar^10) + 17100359/(2032128000*HarmonicSums`Private`ExpVar^9) - 4111957/(12042240*HarmonicSums`Private`ExpVar^8) - 4818869/(118540800*HarmonicSums`Private`ExpVar^7) + 20257/(230400*HarmonicSums`Private`ExpVar^6) + 116309/(1728000*HarmonicSums`Private`ExpVar^5) - 1435/(9216*HarmonicSums`Private`ExpVar^4) + 251/(1728*HarmonicSums`Private`ExpVar^3) - 9/(64*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar) + (19/(256*HarmonicSums`Private`ExpVar^10) - 263/(1920*HarmonicSums`Private`ExpVar^9) - 9/(512*HarmonicSums`Private`ExpVar^8) + 23/(672*HarmonicSums`Private`ExpVar^7) + 1/(128*HarmonicSums`Private`ExpVar^6) - 19/(960*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) + 5/(96*HarmonicSums`Private`ExpVar^3) - 3/(32*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2) + sinf*(ln2^3*(19/(384*HarmonicSums`Private`ExpVar^10) - 263/(2880*HarmonicSums`Private`ExpVar^9) - 3/(256*HarmonicSums`Private`ExpVar^8) + 23/(1008*HarmonicSums`Private`ExpVar^7) + 1/(192*HarmonicSums`Private`ExpVar^6) - 19/(1440*HarmonicSums`Private`ExpVar^5) - 1/(192*HarmonicSums`Private`ExpVar^4) + 5/(144*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) + ln2^2*(-19403/(15360*HarmonicSums`Private`ExpVar^10) + 44769/(89600*HarmonicSums`Private`ExpVar^9) + 9889/(43008*HarmonicSums`Private`ExpVar^8) - 439/(4410*HarmonicSums`Private`ExpVar^7) - 299/(3840*HarmonicSums`Private`ExpVar^6) + 1207/(28800*HarmonicSums`Private`ExpVar^5) + 47/(768*HarmonicSums`Private`ExpVar^4) - 23/(288*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar)) + ln2*(9718511/(2150400*HarmonicSums`Private`ExpVar^10) + 17100359/(1016064000*HarmonicSums`Private`ExpVar^9) - 4111957/(6021120*HarmonicSums`Private`ExpVar^8) - 4818869/(59270400*HarmonicSums`Private`ExpVar^7) + 20257/(115200*HarmonicSums`Private`ExpVar^6) + 116309/(864000*HarmonicSums`Private`ExpVar^5) - 1435/(4608*HarmonicSums`Private`ExpVar^4) + 251/(864*HarmonicSums`Private`ExpVar^3) - 9/(32*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) + (19/(128*HarmonicSums`Private`ExpVar^10) - 263/(960*HarmonicSums`Private`ExpVar^9) - 9/(256*HarmonicSums`Private`ExpVar^8) + 23/(336*HarmonicSums`Private`ExpVar^7) + 1/(64*HarmonicSums`Private`ExpVar^6) - 19/(480*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3) - 3/(16*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2)) + ln2*(li5half - 7846201757/(3251404800*HarmonicSums`Private`ExpVar^10) - 2686066398139/(2560481280000*HarmonicSums`Private`ExpVar^9) + 3126388697/(15173222400*HarmonicSums`Private`ExpVar^8) + 5769432239/(24893568000*HarmonicSums`Private`ExpVar^7) + 162413/(2304000*HarmonicSums`Private`ExpVar^6) - 13875917/(51840000*HarmonicSums`Private`ExpVar^5) + 8879/(55296*HarmonicSums`Private`ExpVar^4) + 313/(5184*HarmonicSums`Private`ExpVar^3) - 17/(64*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) + (-19403/(15360*HarmonicSums`Private`ExpVar^10) + 44769/(89600*HarmonicSums`Private`ExpVar^9) + 9889/(43008*HarmonicSums`Private`ExpVar^8) - 439/(4410*HarmonicSums`Private`ExpVar^7) - 299/(3840*HarmonicSums`Private`ExpVar^6) + 1207/(28800*HarmonicSums`Private`ExpVar^5) + 47/(768*HarmonicSums`Private`ExpVar^4) - 23/(288*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (19/(192*HarmonicSums`Private`ExpVar^10) - 263/(1440*HarmonicSums`Private`ExpVar^9) - 3/(128*HarmonicSums`Private`ExpVar^8) + 23/(504*HarmonicSums`Private`ExpVar^7) + 1/(96*HarmonicSums`Private`ExpVar^6) - 19/(720*HarmonicSums`Private`ExpVar^5) - 1/(96*HarmonicSums`Private`ExpVar^4) + 5/(72*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))* z5, S[-1, -1, 1, 1, 1, 1, HarmonicSums`Private`ExpVar] :> 5*li6half + li5half*ln2 + (-1)^HarmonicSums`Private`ExpVar*li5half* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + 23853978709339/ (40967700480000*HarmonicSums`Private`ExpVar^10) - 4051318645351319/(6452412825600000*HarmonicSums`Private`ExpVar^9) - 751618834187/(4248502272000*HarmonicSums`Private`ExpVar^8) - 189525681151/(10455298560000*HarmonicSums`Private`ExpVar^7) + 106187207/(414720000*HarmonicSums`Private`ExpVar^6) - 647324621/(3110400000*HarmonicSums`Private`ExpVar^5) + 66931/(663552*HarmonicSums`Private`ExpVar^4) - 3515/(31104*HarmonicSums`Private`ExpVar^3) + 33/(128*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) + (19403/(46080*HarmonicSums`Private`ExpVar^10) - 14923/(89600*HarmonicSums`Private`ExpVar^9) - 9889/(129024*HarmonicSums`Private`ExpVar^8) + 439/(13230*HarmonicSums`Private`ExpVar^7) + 299/(11520*HarmonicSums`Private`ExpVar^6) - 1207/(86400*HarmonicSums`Private`ExpVar^5) - 47/(2304*HarmonicSums`Private`ExpVar^4) + 23/(864*HarmonicSums`Private`ExpVar^3) + 1/(96*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar))*sinf^3 + (-19/(1536*HarmonicSums`Private`ExpVar^10) + 263/(11520*HarmonicSums`Private`ExpVar^9) + 3/(1024*HarmonicSums`Private`ExpVar^8) - 23/(4032*HarmonicSums`Private`ExpVar^7) - 1/(768*HarmonicSums`Private`ExpVar^6) + 19/(5760*HarmonicSums`Private`ExpVar^5) + 1/(768*HarmonicSums`Private`ExpVar^4) - 5/(576*HarmonicSums`Private`ExpVar^3) + 1/(64*HarmonicSums`Private`ExpVar^2) - 1/(48*HarmonicSums`Private`ExpVar))*sinf^4 + (-9718511/(4300800*HarmonicSums`Private`ExpVar^10) - 17100359/(2032128000*HarmonicSums`Private`ExpVar^9) + 4111957/(12042240*HarmonicSums`Private`ExpVar^8) + 4818869/(118540800*HarmonicSums`Private`ExpVar^7) - 20257/(230400*HarmonicSums`Private`ExpVar^6) - 116309/(1728000*HarmonicSums`Private`ExpVar^5) + 1435/(9216*HarmonicSums`Private`ExpVar^4) - 251/(1728*HarmonicSums`Private`ExpVar^3) + 9/(64*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (-171/(2560*HarmonicSums`Private`ExpVar^10) + 789/(6400*HarmonicSums`Private`ExpVar^9) + 81/(5120*HarmonicSums`Private`ExpVar^8) - 69/(2240*HarmonicSums`Private`ExpVar^7) - 9/(1280*HarmonicSums`Private`ExpVar^6) + 57/(3200*HarmonicSums`Private`ExpVar^5) + 9/(1280*HarmonicSums`Private`ExpVar^4) - 3/(64*HarmonicSums`Private`ExpVar^3) + 27/(320*HarmonicSums`Private`ExpVar^2) - 9/(80*HarmonicSums`Private`ExpVar))*z2^2 + sinf^2*(-9718511/(4300800*HarmonicSums`Private`ExpVar^10) - 17100359/(2032128000*HarmonicSums`Private`ExpVar^9) + 4111957/(12042240*HarmonicSums`Private`ExpVar^8) + 4818869/(118540800*HarmonicSums`Private`ExpVar^7) - 20257/(230400*HarmonicSums`Private`ExpVar^6) - 116309/(1728000*HarmonicSums`Private`ExpVar^5) + 1435/(9216*HarmonicSums`Private`ExpVar^4) - 251/(1728*HarmonicSums`Private`ExpVar^3) + 9/(64*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) + (-19/(256*HarmonicSums`Private`ExpVar^10) + 263/(1920*HarmonicSums`Private`ExpVar^9) + 9/(512*HarmonicSums`Private`ExpVar^8) - 23/(672*HarmonicSums`Private`ExpVar^7) - 1/(128*HarmonicSums`Private`ExpVar^6) + 19/(960*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - 5/(96*HarmonicSums`Private`ExpVar^3) + 3/(32*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2) + (19403/(23040*HarmonicSums`Private`ExpVar^10) - 14923/(44800*HarmonicSums`Private`ExpVar^9) - 9889/(64512*HarmonicSums`Private`ExpVar^8) + 439/(6615*HarmonicSums`Private`ExpVar^7) + 299/(5760*HarmonicSums`Private`ExpVar^6) - 1207/(43200*HarmonicSums`Private`ExpVar^5) - 47/(1152*HarmonicSums`Private`ExpVar^4) + 23/(432*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar))*z3 + sinf*(7846201757/(3251404800*HarmonicSums`Private`ExpVar^10) + 2686066398139/(2560481280000*HarmonicSums`Private`ExpVar^9) - 3126388697/(15173222400*HarmonicSums`Private`ExpVar^8) - 5769432239/(24893568000*HarmonicSums`Private`ExpVar^7) - 162413/(2304000*HarmonicSums`Private`ExpVar^6) + 13875917/(51840000*HarmonicSums`Private`ExpVar^5) - 8879/(55296*HarmonicSums`Private`ExpVar^4) - 313/(5184*HarmonicSums`Private`ExpVar^3) + 17/(64*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) + (19403/(15360*HarmonicSums`Private`ExpVar^10) - 44769/(89600*HarmonicSums`Private`ExpVar^9) - 9889/(43008*HarmonicSums`Private`ExpVar^8) + 439/(4410*HarmonicSums`Private`ExpVar^7) + 299/(3840*HarmonicSums`Private`ExpVar^6) - 1207/(28800*HarmonicSums`Private`ExpVar^5) - 47/(768*HarmonicSums`Private`ExpVar^4) + 23/(288*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (-19/(192*HarmonicSums`Private`ExpVar^10) + 263/(1440*HarmonicSums`Private`ExpVar^9) + 3/(128*HarmonicSums`Private`ExpVar^8) - 23/(504*HarmonicSums`Private`ExpVar^7) - 1/(96*HarmonicSums`Private`ExpVar^6) + 19/(720*HarmonicSums`Private`ExpVar^5) + 1/(96*HarmonicSums`Private`ExpVar^4) - 5/(72*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar))*z3), S[-1, 1, -1, -1, -1, -1, HarmonicSums`Private`ExpVar] :> 6*li6half - (11*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar* (336466937/(185794560*HarmonicSums`Private`ExpVar^10) + 1210105/(6193152*HarmonicSums`Private`ExpVar^9) - 154949/(774144*HarmonicSums`Private`ExpVar^8) - 5141/(17280*HarmonicSums`Private`ExpVar^7) + 38807/(92160*HarmonicSums`Private`ExpVar^6) - 2611/(9216*HarmonicSums`Private`ExpVar^5) + 71/(576*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(93/(4*HarmonicSums`Private`ExpVar^10) - 51/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-217/(480*HarmonicSums`Private`ExpVar^10) + 119/(1920*HarmonicSums`Private`ExpVar^8) - 7/(480*HarmonicSums`Private`ExpVar^6) + 7/(960*HarmonicSums`Private`ExpVar^4) - 7/(480*HarmonicSums`Private`ExpVar^2) + 7/(240*HarmonicSums`Private`ExpVar)) + 6*s6 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(512*HarmonicSums`Private`ExpVar^10) + 119/(768*HarmonicSums`Private`ExpVar^9) - 49/(512*HarmonicSums`Private`ExpVar^8) - 5/(192*HarmonicSums`Private`ExpVar^7) + 5/(256*HarmonicSums`Private`ExpVar^6) + 1/(128*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) - 1/(192*HarmonicSums`Private`ExpVar^3) + 1/(96*HarmonicSums`Private`ExpVar^2)) + (5*z2)/48) + (-1)^HarmonicSums`Private`ExpVar* (2133/(512*HarmonicSums`Private`ExpVar^10) + 1071/(1280*HarmonicSums`Private`ExpVar^9) - 1323/(2560*HarmonicSums`Private`ExpVar^8) - 9/(64*HarmonicSums`Private`ExpVar^7) + 27/(256*HarmonicSums`Private`ExpVar^6) + 27/(640*HarmonicSums`Private`ExpVar^5) - 27/(640*HarmonicSums`Private`ExpVar^4) - 9/(320*HarmonicSums`Private`ExpVar^3) + 9/(160*HarmonicSums`Private`ExpVar^2))*z2^2 - (3*z2^3)/80 + ln2^3*(-911/(2560*HarmonicSums`Private`ExpVar^10) - 61/(256*HarmonicSums`Private`ExpVar^9) + 641/(9216*HarmonicSums`Private`ExpVar^8) + 7/(128*HarmonicSums`Private`ExpVar^7) - 17/(576*HarmonicSums`Private`ExpVar^6) - 5/(192*HarmonicSums`Private`ExpVar^5) + 19/(384*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2) - (11*z3)/24) + (-2733/(5120*HarmonicSums`Private`ExpVar^10) - 183/(512*HarmonicSums`Private`ExpVar^9) + 641/(6144*HarmonicSums`Private`ExpVar^8) + 21/(256*HarmonicSums`Private`ExpVar^7) - 17/(384*HarmonicSums`Private`ExpVar^6) - 5/(128*HarmonicSums`Private`ExpVar^5) + 19/(256*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2))*z3 - (169*z3^2)/64 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(96*HarmonicSums`Private`ExpVar^10) + 17/(384*HarmonicSums`Private`ExpVar^8) - 1/(96*HarmonicSums`Private`ExpVar^6) + 1/(192*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^2*(-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-279/(160*HarmonicSums`Private`ExpVar^10) + 153/(640*HarmonicSums`Private`ExpVar^8) - 9/(160*HarmonicSums`Private`ExpVar^6) + 9/(320*HarmonicSums`Private`ExpVar^4) - 9/(160*HarmonicSums`Private`ExpVar^2) + 9/(80*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z3) + z2*((-1)^HarmonicSums`Private`ExpVar* (-956779/(204800*HarmonicSums`Private`ExpVar^10) - 523391/(15052800*HarmonicSums`Private`ExpVar^9) + 2838859/(4515840*HarmonicSums`Private`ExpVar^8) + 3073/(115200*HarmonicSums`Private`ExpVar^7) - 30347/(230400*HarmonicSums`Private`ExpVar^6) - 445/(4608*HarmonicSums`Private`ExpVar^5) + 287/(1152*HarmonicSums`Private`ExpVar^4) - 15/(64*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z3) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-956779/(204800*HarmonicSums`Private`ExpVar^10) - 523391/(15052800*HarmonicSums`Private`ExpVar^9) + 2838859/(4515840*HarmonicSums`Private`ExpVar^8) + 3073/(115200*HarmonicSums`Private`ExpVar^7) - 30347/(230400*HarmonicSums`Private`ExpVar^6) - 445/(4608*HarmonicSums`Private`ExpVar^5) + 287/(1152*HarmonicSums`Private`ExpVar^4) - 15/(64*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 - z2^2/16 + (-1)^HarmonicSums`Private`ExpVar* (-279/(32*HarmonicSums`Private`ExpVar^10) + 153/(128*HarmonicSums`Private`ExpVar^8) - 9/(32*HarmonicSums`Private`ExpVar^6) + 9/(64*HarmonicSums`Private`ExpVar^4) - 9/(32*HarmonicSums`Private`ExpVar^2) + 9/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(3*li5half + 87851/(21504*HarmonicSums`Private`ExpVar^10) + 179465/(193536*HarmonicSums`Private`ExpVar^9) - 52501/(61440*HarmonicSums`Private`ExpVar^8) - 4759/(26880*HarmonicSums`Private`ExpVar^7) + 49/(96*HarmonicSums`Private`ExpVar^6) - 89/(240*HarmonicSums`Private`ExpVar^5) + 21/(128*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (1209/(160*HarmonicSums`Private`ExpVar^10) - 663/(640*HarmonicSums`Private`ExpVar^8) + 39/(160*HarmonicSums`Private`ExpVar^6) - 39/(320*HarmonicSums`Private`ExpVar^4) + 39/(160*HarmonicSums`Private`ExpVar^2) - 39/(80*HarmonicSums`Private`ExpVar))*z2^2 + z2*(-2733/(2560*HarmonicSums`Private`ExpVar^10) - 183/(256*HarmonicSums`Private`ExpVar^9) + 641/(3072*HarmonicSums`Private`ExpVar^8) + 21/(128*HarmonicSums`Private`ExpVar^7) - 17/(192*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) + 19/(128*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - (13*z3)/8) + (-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z3 - (375*z5)/64) + (-1)^HarmonicSums`Private`ExpVar* (-713/(256*HarmonicSums`Private`ExpVar^10) + 391/(1024*HarmonicSums`Private`ExpVar^8) - 23/(256*HarmonicSums`Private`ExpVar^6) + 23/(512*HarmonicSums`Private`ExpVar^4) - 23/(256*HarmonicSums`Private`ExpVar^2) + 23/(128*HarmonicSums`Private`ExpVar))*z5, S[-1, 1, -1, -1, -1, 1, HarmonicSums`Private`ExpVar] :> 6*li6half - (11*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar*li5half* (93/(4*HarmonicSums`Private`ExpVar^10) - 51/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-217/(480*HarmonicSums`Private`ExpVar^10) + 119/(1920*HarmonicSums`Private`ExpVar^8) - 7/(480*HarmonicSums`Private`ExpVar^6) + 7/(960*HarmonicSums`Private`ExpVar^4) - 7/(480*HarmonicSums`Private`ExpVar^2) + 7/(240*HarmonicSums`Private`ExpVar)) - 2753195/(21676032*HarmonicSums`Private`ExpVar^10) + 952099333/(487710720*HarmonicSums`Private`ExpVar^9) + 121021/(17203200*HarmonicSums`Private`ExpVar^8) - 157487/(352800*HarmonicSums`Private`ExpVar^7) + 1237/(15360*HarmonicSums`Private`ExpVar^6) + 8857/(57600*HarmonicSums`Private`ExpVar^5) - 221/(1536*HarmonicSums`Private`ExpVar^4) + 1/(18*HarmonicSums`Private`ExpVar^3) + 6*s6 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(512*HarmonicSums`Private`ExpVar^10) + 119/(768*HarmonicSums`Private`ExpVar^9) - 49/(512*HarmonicSums`Private`ExpVar^8) - 5/(192*HarmonicSums`Private`ExpVar^7) + 5/(256*HarmonicSums`Private`ExpVar^6) + 1/(128*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) - 1/(192*HarmonicSums`Private`ExpVar^3) + 1/(96*HarmonicSums`Private`ExpVar^2)) + (5*z2)/48) + (-1)^HarmonicSums`Private`ExpVar* (-4503/(512*HarmonicSums`Private`ExpVar^10) - 2261/(1280*HarmonicSums`Private`ExpVar^9) + 2793/(2560*HarmonicSums`Private`ExpVar^8) + 19/(64*HarmonicSums`Private`ExpVar^7) - 57/(256*HarmonicSums`Private`ExpVar^6) - 57/(640*HarmonicSums`Private`ExpVar^5) + 57/(640*HarmonicSums`Private`ExpVar^4) + 19/(320*HarmonicSums`Private`ExpVar^3) - 19/(160*HarmonicSums`Private`ExpVar^2))*z2^2 - (1207*z2^3)/1680 + ln2^3*(-911/(2560*HarmonicSums`Private`ExpVar^10) - 61/(256*HarmonicSums`Private`ExpVar^9) + 641/(9216*HarmonicSums`Private`ExpVar^8) + 7/(128*HarmonicSums`Private`ExpVar^7) - 17/(576*HarmonicSums`Private`ExpVar^6) - 5/(192*HarmonicSums`Private`ExpVar^5) + 19/(384*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2) - (11*z3)/24) + (19131/(5120*HarmonicSums`Private`ExpVar^10) + 1281/(512*HarmonicSums`Private`ExpVar^9) - 4487/(6144*HarmonicSums`Private`ExpVar^8) - 147/(256*HarmonicSums`Private`ExpVar^7) + 119/(384*HarmonicSums`Private`ExpVar^6) + 35/(128*HarmonicSums`Private`ExpVar^5) - 133/(256*HarmonicSums`Private`ExpVar^4) + 7/(16*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2))*z3 + (23*z3^2)/64 + z2*((-1)^HarmonicSums`Private`ExpVar* (956779/(204800*HarmonicSums`Private`ExpVar^10) + 523391/(15052800*HarmonicSums`Private`ExpVar^9) - 2838859/(4515840*HarmonicSums`Private`ExpVar^8) - 3073/(115200*HarmonicSums`Private`ExpVar^7) + 30347/(230400*HarmonicSums`Private`ExpVar^6) + 445/(4608*HarmonicSums`Private`ExpVar^5) - 287/(1152*HarmonicSums`Private`ExpVar^4) + 15/(64*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(96*HarmonicSums`Private`ExpVar^10) + 17/(384*HarmonicSums`Private`ExpVar^8) - 1/(96*HarmonicSums`Private`ExpVar^6) + 1/(192*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar)) - 87851/(21504*HarmonicSums`Private`ExpVar^10) - 179465/(193536*HarmonicSums`Private`ExpVar^9) + 52501/(61440*HarmonicSums`Private`ExpVar^8) + 4759/(26880*HarmonicSums`Private`ExpVar^7) - 49/(96*HarmonicSums`Private`ExpVar^6) + 89/(240*HarmonicSums`Private`ExpVar^5) - 21/(128*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* ln2^2*(-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (589/(160*HarmonicSums`Private`ExpVar^10) - 323/(640*HarmonicSums`Private`ExpVar^8) + 19/(160*HarmonicSums`Private`ExpVar^6) - 19/(320*HarmonicSums`Private`ExpVar^4) + 19/(160*HarmonicSums`Private`ExpVar^2) - 19/(80*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z3) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-956779/(204800*HarmonicSums`Private`ExpVar^10) - 523391/(15052800*HarmonicSums`Private`ExpVar^9) + 2838859/(4515840*HarmonicSums`Private`ExpVar^8) + 3073/(115200*HarmonicSums`Private`ExpVar^7) - 30347/(230400*HarmonicSums`Private`ExpVar^6) - 445/(4608*HarmonicSums`Private`ExpVar^5) + 287/(1152*HarmonicSums`Private`ExpVar^4) - 15/(64*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 - z2^2/16 + (-1)^HarmonicSums`Private`ExpVar* (-279/(32*HarmonicSums`Private`ExpVar^10) + 153/(128*HarmonicSums`Private`ExpVar^8) - 9/(32*HarmonicSums`Private`ExpVar^6) + 9/(64*HarmonicSums`Private`ExpVar^4) - 9/(32*HarmonicSums`Private`ExpVar^2) + 9/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(3*li5half + (-1)^HarmonicSums`Private`ExpVar* (2077/(160*HarmonicSums`Private`ExpVar^10) - 1139/(640*HarmonicSums`Private`ExpVar^8) + 67/(160*HarmonicSums`Private`ExpVar^6) - 67/(320*HarmonicSums`Private`ExpVar^4) + 67/(160*HarmonicSums`Private`ExpVar^2) - 67/(80*HarmonicSums`Private`ExpVar))*z2^2 + z2*(-2733/(2560*HarmonicSums`Private`ExpVar^10) - 183/(256*HarmonicSums`Private`ExpVar^9) + 641/(3072*HarmonicSums`Private`ExpVar^8) + 21/(128*HarmonicSums`Private`ExpVar^7) - 17/(192*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) + 19/(128*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - (13*z3)/8) + (-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z3 - (375*z5)/64) + (-1)^HarmonicSums`Private`ExpVar* (-11625/(256*HarmonicSums`Private`ExpVar^10) + 6375/(1024*HarmonicSums`Private`ExpVar^8) - 375/(256*HarmonicSums`Private`ExpVar^6) + 375/(512*HarmonicSums`Private`ExpVar^4) - 375/(256*HarmonicSums`Private`ExpVar^2) + 375/(128*HarmonicSums`Private`ExpVar))*z5, S[-1, 1, -1, -1, 1, -1, HarmonicSums`Private`ExpVar] :> 9*li6half + (19*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar*li4half* (3555/(64*HarmonicSums`Private`ExpVar^10) + 357/(32*HarmonicSums`Private`ExpVar^9) - 441/(64*HarmonicSums`Private`ExpVar^8) - 15/(8*HarmonicSums`Private`ExpVar^7) + 45/(32*HarmonicSums`Private`ExpVar^6) + 9/(16*HarmonicSums`Private`ExpVar^5) - 9/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(93/(2*HarmonicSums`Private`ExpVar^10) - 51/(8*HarmonicSums`Private`ExpVar^8) + 3/(2*HarmonicSums`Private`ExpVar^6) - 3/(4*HarmonicSums`Private`ExpVar^4) + 3/(2*HarmonicSums`Private`ExpVar^2) - 3/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-31/(48*HarmonicSums`Private`ExpVar^10) + 17/(192*HarmonicSums`Private`ExpVar^8) - 1/(48*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar)) - 28451/(12288*HarmonicSums`Private`ExpVar^10) + 4213/(10240*HarmonicSums`Private`ExpVar^9) + 11675/(24576*HarmonicSums`Private`ExpVar^8) - 13/(32*HarmonicSums`Private`ExpVar^7) + 91/(512*HarmonicSums`Private`ExpVar^6) - 1/(20*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) + (15*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(128*HarmonicSums`Private`ExpVar^10) + 119/(192*HarmonicSums`Private`ExpVar^9) - 49/(128*HarmonicSums`Private`ExpVar^8) - 5/(48*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) - (7*z2)/48) - (3*li4half*z2)/2 + (-1)^HarmonicSums`Private`ExpVar* (-711/(32*HarmonicSums`Private`ExpVar^10) - 357/(80*HarmonicSums`Private`ExpVar^9) + 441/(160*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^7) - 9/(16*HarmonicSums`Private`ExpVar^6) - 9/(40*HarmonicSums`Private`ExpVar^5) + 9/(40*HarmonicSums`Private`ExpVar^4) + 3/(20*HarmonicSums`Private`ExpVar^3) - 3/(10*HarmonicSums`Private`ExpVar^2))*z2^2 - (23*z2^3)/35 + ln2^3*(-911/(2560*HarmonicSums`Private`ExpVar^10) - 61/(256*HarmonicSums`Private`ExpVar^9) + 641/(9216*HarmonicSums`Private`ExpVar^8) + 7/(128*HarmonicSums`Private`ExpVar^7) - 17/(576*HarmonicSums`Private`ExpVar^6) - 5/(192*HarmonicSums`Private`ExpVar^5) + 19/(384*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 - z3/48) + (2733/(10240*HarmonicSums`Private`ExpVar^10) + 183/(1024*HarmonicSums`Private`ExpVar^9) - 641/(12288*HarmonicSums`Private`ExpVar^8) - 21/(512*HarmonicSums`Private`ExpVar^7) + 17/(768*HarmonicSums`Private`ExpVar^6) + 5/(256*HarmonicSums`Private`ExpVar^5) - 19/(512*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3) - 1/(64*HarmonicSums`Private`ExpVar^2))*z3 - (179*z3^2)/128 + ln2^2*((3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (956779/(204800*HarmonicSums`Private`ExpVar^10) + 523391/(15052800*HarmonicSums`Private`ExpVar^9) - 2838859/(4515840*HarmonicSums`Private`ExpVar^8) - 3073/(115200*HarmonicSums`Private`ExpVar^7) + 30347/(230400*HarmonicSums`Private`ExpVar^6) + 445/(4608*HarmonicSums`Private`ExpVar^5) - 287/(1152*HarmonicSums`Private`ExpVar^4) + 15/(64*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (5*z2^2)/16 + (-1)^HarmonicSums`Private`ExpVar* (-217/(64*HarmonicSums`Private`ExpVar^10) + 119/(256*HarmonicSums`Private`ExpVar^8) - 7/(64*HarmonicSums`Private`ExpVar^6) + 7/(128*HarmonicSums`Private`ExpVar^4) - 7/(64*HarmonicSums`Private`ExpVar^2) + 7/(32*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^2*(31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (93/(10*HarmonicSums`Private`ExpVar^10) - 51/(40*HarmonicSums`Private`ExpVar^8) + 3/(10*HarmonicSums`Private`ExpVar^6) - 3/(20*HarmonicSums`Private`ExpVar^4) + 3/(10*HarmonicSums`Private`ExpVar^2) - 3/(5*HarmonicSums`Private`ExpVar))*z2^2 + ln2*((-1)^HarmonicSums`Private`ExpVar* (956779/(102400*HarmonicSums`Private`ExpVar^10) + 523391/(7526400*HarmonicSums`Private`ExpVar^9) - 2838859/(2257920*HarmonicSums`Private`ExpVar^8) - 3073/(57600*HarmonicSums`Private`ExpVar^7) + 30347/(115200*HarmonicSums`Private`ExpVar^6) + 445/(2304*HarmonicSums`Private`ExpVar^5) - 287/(576*HarmonicSums`Private`ExpVar^4) + 15/(32*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-217/(32*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^6) + 7/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3)) + ln2*(6*li5half + (-1)^HarmonicSums`Private`ExpVar* (94184813/(31752000*HarmonicSums`Private`ExpVar^10) - 3627002573/(790272000*HarmonicSums`Private`ExpVar^9) - 363869339/(474163200*HarmonicSums`Private`ExpVar^8) + 2749253/(3456000*HarmonicSums`Private`ExpVar^7) + 607757/(1728000*HarmonicSums`Private`ExpVar^6) - 1217/(3456*HarmonicSums`Private`ExpVar^5) - 439/(1728*HarmonicSums`Private`ExpVar^4) + 5/(8*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (93/(10*HarmonicSums`Private`ExpVar^10) - 51/(40*HarmonicSums`Private`ExpVar^8) + 3/(10*HarmonicSums`Private`ExpVar^6) - 3/(20*HarmonicSums`Private`ExpVar^4) + 3/(10*HarmonicSums`Private`ExpVar^2) - 3/(5*HarmonicSums`Private`ExpVar))*z2^2 + z2*(2733/(2560*HarmonicSums`Private`ExpVar^10) + 183/(256*HarmonicSums`Private`ExpVar^9) - 641/(3072*HarmonicSums`Private`ExpVar^8) - 21/(128*HarmonicSums`Private`ExpVar^7) + 17/(192*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) - 19/(128*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + z3/16) + (-1)^HarmonicSums`Private`ExpVar* (8295/(512*HarmonicSums`Private`ExpVar^10) + 833/(256*HarmonicSums`Private`ExpVar^9) - 1029/(512*HarmonicSums`Private`ExpVar^8) - 35/(64*HarmonicSums`Private`ExpVar^7) + 105/(256*HarmonicSums`Private`ExpVar^6) + 21/(128*HarmonicSums`Private`ExpVar^5) - 21/(128*HarmonicSums`Private`ExpVar^4) - 7/(64*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2))*z3 - 6*z5) + (-1)^HarmonicSums`Private`ExpVar*(-93/(2*HarmonicSums`Private`ExpVar^10) + 51/(8*HarmonicSums`Private`ExpVar^8) - 3/(2*HarmonicSums`Private`ExpVar^6) + 3/(4*HarmonicSums`Private`ExpVar^4) - 3/(2*HarmonicSums`Private`ExpVar^2) + 3/HarmonicSums`Private`ExpVar)*z5, S[-1, 1, -1, -1, 1, 1, HarmonicSums`Private`ExpVar] :> 9*li6half + (19*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar* (25245289192903/(13655900160000*HarmonicSums`Private`ExpVar^10) + 9460040846183/(5310627840000*HarmonicSums`Private`ExpVar^9) - 2021355373/(26553139200*HarmonicSums`Private`ExpVar^8) - 41304803/(69120000*HarmonicSums`Private`ExpVar^7) + 23830457/(138240000*HarmonicSums`Private`ExpVar^6) - 10337/(110592*HarmonicSums`Private`ExpVar^5) + 3575/(6912*HarmonicSums`Private`ExpVar^4) - 113/(128*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(3555/(64*HarmonicSums`Private`ExpVar^10) + 357/(32*HarmonicSums`Private`ExpVar^9) - 441/(64*HarmonicSums`Private`ExpVar^8) - 15/(8*HarmonicSums`Private`ExpVar^7) + 45/(32*HarmonicSums`Private`ExpVar^6) + 9/(16*HarmonicSums`Private`ExpVar^5) - 9/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(93/(2*HarmonicSums`Private`ExpVar^10) - 51/(8*HarmonicSums`Private`ExpVar^8) + 3/(2*HarmonicSums`Private`ExpVar^6) - 3/(4*HarmonicSums`Private`ExpVar^4) + 3/(2*HarmonicSums`Private`ExpVar^2) - 3/HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-31/(48*HarmonicSums`Private`ExpVar^10) + 17/(192*HarmonicSums`Private`ExpVar^8) - 1/(48*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar)) + (15*s6)/4 + (-1)^HarmonicSums`Private`ExpVar* (-956779/(204800*HarmonicSums`Private`ExpVar^10) - 523391/(15052800*HarmonicSums`Private`ExpVar^9) + 2838859/(4515840*HarmonicSums`Private`ExpVar^8) + 3073/(115200*HarmonicSums`Private`ExpVar^7) - 30347/(230400*HarmonicSums`Private`ExpVar^6) - 445/(4608*HarmonicSums`Private`ExpVar^5) + 287/(1152*HarmonicSums`Private`ExpVar^4) - 15/(64*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*sinf^2 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(128*HarmonicSums`Private`ExpVar^10) + 119/(192*HarmonicSums`Private`ExpVar^9) - 49/(128*HarmonicSums`Private`ExpVar^8) - 5/(48*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) - (7*z2)/48) + ((-3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (-956779/(204800*HarmonicSums`Private`ExpVar^10) - 523391/(15052800*HarmonicSums`Private`ExpVar^9) + 2838859/(4515840*HarmonicSums`Private`ExpVar^8) + 3073/(115200*HarmonicSums`Private`ExpVar^7) - 30347/(230400*HarmonicSums`Private`ExpVar^6) - 445/(4608*HarmonicSums`Private`ExpVar^5) + 287/(1152*HarmonicSums`Private`ExpVar^4) - 15/(64*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)))*z2 - (27*z2^3)/35 + ln2^3*(-911/(2560*HarmonicSums`Private`ExpVar^10) - 61/(256*HarmonicSums`Private`ExpVar^9) + 641/(9216*HarmonicSums`Private`ExpVar^8) + 7/(128*HarmonicSums`Private`ExpVar^7) - 17/(576*HarmonicSums`Private`ExpVar^6) - 5/(192*HarmonicSums`Private`ExpVar^5) + 19/(384*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 - z3/48) + (-19131/(10240*HarmonicSums`Private`ExpVar^10) - 1281/(1024*HarmonicSums`Private`ExpVar^9) + 4487/(12288*HarmonicSums`Private`ExpVar^8) + 147/(512*HarmonicSums`Private`ExpVar^7) - 119/(768*HarmonicSums`Private`ExpVar^6) - 35/(256*HarmonicSums`Private`ExpVar^5) + 133/(512*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^3) + 7/(64*HarmonicSums`Private`ExpVar^2))*z3 - (243*z3^2)/128 + ln2^2*((3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (5*z2^2)/16 + (-1)^HarmonicSums`Private`ExpVar* (-217/(64*HarmonicSums`Private`ExpVar^10) + 119/(256*HarmonicSums`Private`ExpVar^8) - 7/(64*HarmonicSums`Private`ExpVar^6) + 7/(128*HarmonicSums`Private`ExpVar^4) - 7/(64*HarmonicSums`Private`ExpVar^2) + 7/(32*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar* (-94184813/(31752000*HarmonicSums`Private`ExpVar^10) + 3627002573/(790272000*HarmonicSums`Private`ExpVar^9) + 363869339/(474163200*HarmonicSums`Private`ExpVar^8) - 2749253/(3456000*HarmonicSums`Private`ExpVar^7) - 607757/(1728000*HarmonicSums`Private`ExpVar^6) + 1217/(3456*HarmonicSums`Private`ExpVar^5) + 439/(1728*HarmonicSums`Private`ExpVar^4) - 5/(8*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-93/(4*HarmonicSums`Private`ExpVar^10) + 51/(16*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^4) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^2*(31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (-217/(32*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^6) + 7/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(6*li5half + z2*(2733/(2560*HarmonicSums`Private`ExpVar^10) + 183/(256*HarmonicSums`Private`ExpVar^9) - 641/(3072*HarmonicSums`Private`ExpVar^8) - 21/(128*HarmonicSums`Private`ExpVar^7) + 17/(192*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) - 19/(128*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + z3/16) + (-1)^HarmonicSums`Private`ExpVar* (8295/(512*HarmonicSums`Private`ExpVar^10) + 833/(256*HarmonicSums`Private`ExpVar^9) - 1029/(512*HarmonicSums`Private`ExpVar^8) - 35/(64*HarmonicSums`Private`ExpVar^7) + 105/(256*HarmonicSums`Private`ExpVar^6) + 21/(128*HarmonicSums`Private`ExpVar^5) - 21/(128*HarmonicSums`Private`ExpVar^4) - 7/(64*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2))*z3 - 6*z5), S[-1, 1, -1, 1, -1, -1, HarmonicSums`Private`ExpVar] :> ln2^6/720 + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (-31/(120*HarmonicSums`Private`ExpVar^10) + 17/(480*HarmonicSums`Private`ExpVar^8) - 1/(120*HarmonicSums`Private`ExpVar^6) + 1/(240*HarmonicSums`Private`ExpVar^4) - 1/(120*HarmonicSums`Private`ExpVar^2) + 1/(60*HarmonicSums`Private`ExpVar)) + 53327891/(18063360*HarmonicSums`Private`ExpVar^10) + 416079287/(406425600*HarmonicSums`Private`ExpVar^9) - 690599/(1228800*HarmonicSums`Private`ExpVar^8) - 2539/(6400*HarmonicSums`Private`ExpVar^7) + 617/(1024*HarmonicSums`Private`ExpVar^6) - 1141/(2880*HarmonicSums`Private`ExpVar^5) + 43/(256*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(512*HarmonicSums`Private`ExpVar^10) + 119/(768*HarmonicSums`Private`ExpVar^9) - 49/(512*HarmonicSums`Private`ExpVar^8) - 5/(192*HarmonicSums`Private`ExpVar^7) + 5/(256*HarmonicSums`Private`ExpVar^6) + 1/(128*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) - 1/(192*HarmonicSums`Private`ExpVar^3) + 1/(96*HarmonicSums`Private`ExpVar^2)) - z2/48) + (-32639/(307200*HarmonicSums`Private`ExpVar^10) - 31061/(18432*HarmonicSums`Private`ExpVar^9) + 3685/(73728*HarmonicSums`Private`ExpVar^8) + 11/(32*HarmonicSums`Private`ExpVar^7) - 193/(4608*HarmonicSums`Private`ExpVar^6) - 107/(768*HarmonicSums`Private`ExpVar^5) + 53/(512*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(512*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^9) + 147/(512*HarmonicSums`Private`ExpVar^8) + 5/(64*HarmonicSums`Private`ExpVar^7) - 15/(256*HarmonicSums`Private`ExpVar^6) - 3/(128*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2))*z2^2 + (53*z2^3)/560 + ln2^3*(911/(1280*HarmonicSums`Private`ExpVar^10) + 61/(128*HarmonicSums`Private`ExpVar^9) - 641/(4608*HarmonicSums`Private`ExpVar^8) - 7/(64*HarmonicSums`Private`ExpVar^7) + 17/(288*HarmonicSums`Private`ExpVar^6) + 5/(96*HarmonicSums`Private`ExpVar^5) - 19/(192*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 - z3/48) + (-19131/(10240*HarmonicSums`Private`ExpVar^10) - 1281/(1024*HarmonicSums`Private`ExpVar^9) + 4487/(12288*HarmonicSums`Private`ExpVar^8) + 147/(512*HarmonicSums`Private`ExpVar^7) - 119/(768*HarmonicSums`Private`ExpVar^6) - 35/(256*HarmonicSums`Private`ExpVar^5) + 133/(512*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^3) + 7/(64*HarmonicSums`Private`ExpVar^2))*z3 + z3^2/128 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(96*HarmonicSums`Private`ExpVar^10) + 17/(384*HarmonicSums`Private`ExpVar^8) - 1/(96*HarmonicSums`Private`ExpVar^6) + 1/(192*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar)) + (2733/(2560*HarmonicSums`Private`ExpVar^10) + 183/(256*HarmonicSums`Private`ExpVar^9) - 641/(3072*HarmonicSums`Private`ExpVar^8) - 21/(128*HarmonicSums`Private`ExpVar^7) + 17/(192*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) - 19/(128*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z2^2 + ln2^2*(2733/(2560*HarmonicSums`Private`ExpVar^10) + 183/(256*HarmonicSums`Private`ExpVar^9) - 641/(3072*HarmonicSums`Private`ExpVar^8) - 21/(128*HarmonicSums`Private`ExpVar^7) + 17/(192*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) - 19/(128*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2) + (-1)^HarmonicSums`Private`ExpVar*ln2* (31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(-32639/(307200*HarmonicSums`Private`ExpVar^10) - 31061/(18432*HarmonicSums`Private`ExpVar^9) + 3685/(73728*HarmonicSums`Private`ExpVar^8) + 11/(32*HarmonicSums`Private`ExpVar^7) - 193/(4608*HarmonicSums`Private`ExpVar^6) - 107/(768*HarmonicSums`Private`ExpVar^5) + 53/(512*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (3*z2^2)/16 + (-1)^HarmonicSums`Private`ExpVar* (31/(64*HarmonicSums`Private`ExpVar^10) - 17/(256*HarmonicSums`Private`ExpVar^8) + 1/(64*HarmonicSums`Private`ExpVar^6) - 1/(128*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^2) - 1/(32*HarmonicSums`Private`ExpVar))*z3) + ln2*((-1)^HarmonicSums`Private`ExpVar* (380347/(147456*HarmonicSums`Private`ExpVar^10) + 10549/(73728*HarmonicSums`Private`ExpVar^9) - 8227/(18432*HarmonicSums`Private`ExpVar^8) - 511/(4608*HarmonicSums`Private`ExpVar^7) + 1049/(3072*HarmonicSums`Private`ExpVar^6) - 401/(1536*HarmonicSums`Private`ExpVar^5) + 23/(192*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (93/(160*HarmonicSums`Private`ExpVar^10) - 51/(640*HarmonicSums`Private`ExpVar^8) + 3/(160*HarmonicSums`Private`ExpVar^6) - 3/(320*HarmonicSums`Private`ExpVar^4) + 3/(160*HarmonicSums`Private`ExpVar^2) - 3/(80*HarmonicSums`Private`ExpVar))*z2^2 + z2*(2733/(2560*HarmonicSums`Private`ExpVar^10) + 183/(256*HarmonicSums`Private`ExpVar^9) - 641/(3072*HarmonicSums`Private`ExpVar^8) - 21/(128*HarmonicSums`Private`ExpVar^7) + 17/(192*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) - 19/(128*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + z3/16) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(512*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^9) + 147/(512*HarmonicSums`Private`ExpVar^8) + 5/(64*HarmonicSums`Private`ExpVar^7) - 15/(256*HarmonicSums`Private`ExpVar^6) - 3/(128*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2))*z3 - (3*z5)/64) + (-1)^HarmonicSums`Private`ExpVar* (-93/(256*HarmonicSums`Private`ExpVar^10) + 51/(1024*HarmonicSums`Private`ExpVar^8) - 3/(256*HarmonicSums`Private`ExpVar^6) + 3/(512*HarmonicSums`Private`ExpVar^4) - 3/(256*HarmonicSums`Private`ExpVar^2) + 3/(128*HarmonicSums`Private`ExpVar))*z5, S[-1, 1, -1, 1, -1, 1, HarmonicSums`Private`ExpVar] :> ln2^6/720 + (-1)^HarmonicSums`Private`ExpVar* (112393/(65536*HarmonicSums`Private`ExpVar^10) + 1261217/(884736*HarmonicSums`Private`ExpVar^9) - 12887/(55296*HarmonicSums`Private`ExpVar^8) - 20999/(55296*HarmonicSums`Private`ExpVar^7) + 1321/(6144*HarmonicSums`Private`ExpVar^6) + 17/(3072*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-31/(120*HarmonicSums`Private`ExpVar^10) + 17/(480*HarmonicSums`Private`ExpVar^8) - 1/(120*HarmonicSums`Private`ExpVar^6) + 1/(240*HarmonicSums`Private`ExpVar^4) - 1/(120*HarmonicSums`Private`ExpVar^2) + 1/(60*HarmonicSums`Private`ExpVar)) + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(512*HarmonicSums`Private`ExpVar^10) + 119/(768*HarmonicSums`Private`ExpVar^9) - 49/(512*HarmonicSums`Private`ExpVar^8) - 5/(192*HarmonicSums`Private`ExpVar^7) + 5/(256*HarmonicSums`Private`ExpVar^6) + 1/(128*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) - 1/(192*HarmonicSums`Private`ExpVar^3) + 1/(96*HarmonicSums`Private`ExpVar^2)) - z2/48) + (32639/(307200*HarmonicSums`Private`ExpVar^10) + 31061/(18432*HarmonicSums`Private`ExpVar^9) - 3685/(73728*HarmonicSums`Private`ExpVar^8) - 11/(32*HarmonicSums`Private`ExpVar^7) + 193/(4608*HarmonicSums`Private`ExpVar^6) + 107/(768*HarmonicSums`Private`ExpVar^5) - 53/(512*HarmonicSums`Private`ExpVar^4) + 1/(96*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (3555/(512*HarmonicSums`Private`ExpVar^10) + 357/(256*HarmonicSums`Private`ExpVar^9) - 441/(512*HarmonicSums`Private`ExpVar^8) - 15/(64*HarmonicSums`Private`ExpVar^7) + 45/(256*HarmonicSums`Private`ExpVar^6) + 9/(128*HarmonicSums`Private`ExpVar^5) - 9/(128*HarmonicSums`Private`ExpVar^4) - 3/(64*HarmonicSums`Private`ExpVar^3) + 3/(32*HarmonicSums`Private`ExpVar^2))*z2^2 - (123*z2^3)/560 + ln2^3*(911/(1280*HarmonicSums`Private`ExpVar^10) + 61/(128*HarmonicSums`Private`ExpVar^9) - 641/(4608*HarmonicSums`Private`ExpVar^8) - 7/(64*HarmonicSums`Private`ExpVar^7) + 17/(288*HarmonicSums`Private`ExpVar^6) + 5/(96*HarmonicSums`Private`ExpVar^5) - 19/(192*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 - z3/48) + (2733/(10240*HarmonicSums`Private`ExpVar^10) + 183/(1024*HarmonicSums`Private`ExpVar^9) - 641/(12288*HarmonicSums`Private`ExpVar^8) - 21/(512*HarmonicSums`Private`ExpVar^7) + 17/(768*HarmonicSums`Private`ExpVar^6) + 5/(256*HarmonicSums`Private`ExpVar^5) - 19/(512*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3) - 1/(64*HarmonicSums`Private`ExpVar^2))*z3 + z3^2/128 + sinf*((-1)^HarmonicSums`Private`ExpVar* (-380347/(147456*HarmonicSums`Private`ExpVar^10) - 10549/(73728*HarmonicSums`Private`ExpVar^9) + 8227/(18432*HarmonicSums`Private`ExpVar^8) + 511/(4608*HarmonicSums`Private`ExpVar^7) - 1049/(3072*HarmonicSums`Private`ExpVar^6) + 401/(1536*HarmonicSums`Private`ExpVar^5) - 23/(192*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(96*HarmonicSums`Private`ExpVar^10) + 17/(384*HarmonicSums`Private`ExpVar^8) - 1/(96*HarmonicSums`Private`ExpVar^6) + 1/(192*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar)) + (-2733/(2560*HarmonicSums`Private`ExpVar^10) - 183/(256*HarmonicSums`Private`ExpVar^9) + 641/(3072*HarmonicSums`Private`ExpVar^8) + 21/(128*HarmonicSums`Private`ExpVar^7) - 17/(192*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) + 19/(128*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-93/(32*HarmonicSums`Private`ExpVar^10) + 51/(128*HarmonicSums`Private`ExpVar^8) - 3/(32*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^2) + 3/(16*HarmonicSums`Private`ExpVar))*z2^2 + ln2^2*(2733/(2560*HarmonicSums`Private`ExpVar^10) + 183/(256*HarmonicSums`Private`ExpVar^9) - 641/(3072*HarmonicSums`Private`ExpVar^8) - 21/(128*HarmonicSums`Private`ExpVar^7) + 17/(192*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) - 19/(128*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2) + (-1)^HarmonicSums`Private`ExpVar*ln2* (31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(-32639/(307200*HarmonicSums`Private`ExpVar^10) - 31061/(18432*HarmonicSums`Private`ExpVar^9) + 3685/(73728*HarmonicSums`Private`ExpVar^8) + 11/(32*HarmonicSums`Private`ExpVar^7) - 193/(4608*HarmonicSums`Private`ExpVar^6) - 107/(768*HarmonicSums`Private`ExpVar^5) + 53/(512*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (3*z2^2)/16 + (-1)^HarmonicSums`Private`ExpVar* (31/(64*HarmonicSums`Private`ExpVar^10) - 17/(256*HarmonicSums`Private`ExpVar^8) + 1/(64*HarmonicSums`Private`ExpVar^6) - 1/(128*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^2) - 1/(32*HarmonicSums`Private`ExpVar))*z3) + ln2*((-1)^HarmonicSums`Private`ExpVar* (-527/(160*HarmonicSums`Private`ExpVar^10) + 289/(640*HarmonicSums`Private`ExpVar^8) - 17/(160*HarmonicSums`Private`ExpVar^6) + 17/(320*HarmonicSums`Private`ExpVar^4) - 17/(160*HarmonicSums`Private`ExpVar^2) + 17/(80*HarmonicSums`Private`ExpVar))*z2^2 + z2*(-2733/(2560*HarmonicSums`Private`ExpVar^10) - 183/(256*HarmonicSums`Private`ExpVar^9) + 641/(3072*HarmonicSums`Private`ExpVar^8) + 21/(128*HarmonicSums`Private`ExpVar^7) - 17/(192*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) + 19/(128*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) + z3/16) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(512*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^9) + 147/(512*HarmonicSums`Private`ExpVar^8) + 5/(64*HarmonicSums`Private`ExpVar^7) - 15/(256*HarmonicSums`Private`ExpVar^6) - 3/(128*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2))*z3 - (3*z5)/64) + (-1)^HarmonicSums`Private`ExpVar* (899/(256*HarmonicSums`Private`ExpVar^10) - 493/(1024*HarmonicSums`Private`ExpVar^8) + 29/(256*HarmonicSums`Private`ExpVar^6) - 29/(512*HarmonicSums`Private`ExpVar^4) + 29/(256*HarmonicSums`Private`ExpVar^2) - 29/(128*HarmonicSums`Private`ExpVar))*z5, S[-1, 1, -1, 1, 1, -1, HarmonicSums`Private`ExpVar] :> -li6half - ln2^6/80 + (-1)^HarmonicSums`Private`ExpVar* (-10512863/(6635520*HarmonicSums`Private`ExpVar^10) + 259019/(860160*HarmonicSums`Private`ExpVar^9) + 12653/(32256*HarmonicSums`Private`ExpVar^8) - 7897/(23040*HarmonicSums`Private`ExpVar^7) + 3529/(23040*HarmonicSums`Private`ExpVar^6) - 101/(2304*HarmonicSums`Private`ExpVar^5) + 1/(144*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar*li4half* (-1185/(64*HarmonicSums`Private`ExpVar^10) - 119/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-31/(160*HarmonicSums`Private`ExpVar^10) + 17/(640*HarmonicSums`Private`ExpVar^8) - 1/(160*HarmonicSums`Private`ExpVar^6) + 1/(320*HarmonicSums`Private`ExpVar^4) - 1/(160*HarmonicSums`Private`ExpVar^2) + 1/(80*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + s6/4 + ln2*(-2733/(2560*HarmonicSums`Private`ExpVar^10) - 183/(256*HarmonicSums`Private`ExpVar^9) + 641/(3072*HarmonicSums`Private`ExpVar^8) + 21/(128*HarmonicSums`Private`ExpVar^7) - 17/(192*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) + 19/(128*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*sinf^2 + (ln2^4*z2)/16 + (-1)^HarmonicSums`Private`ExpVar* (237/(32*HarmonicSums`Private`ExpVar^10) + 119/(80*HarmonicSums`Private`ExpVar^9) - 147/(160*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^7) + 3/(16*HarmonicSums`Private`ExpVar^6) + 3/(40*HarmonicSums`Private`ExpVar^5) - 3/(40*HarmonicSums`Private`ExpVar^4) - 1/(20*HarmonicSums`Private`ExpVar^3) + 1/(10*HarmonicSums`Private`ExpVar^2))*z2^2 + (13*z2^3)/105 + sinf*(ln2^2*(-2733/(2560*HarmonicSums`Private`ExpVar^10) - 183/(256*HarmonicSums`Private`ExpVar^9) + 641/(3072*HarmonicSums`Private`ExpVar^8) + 21/(128*HarmonicSums`Private`ExpVar^7) - 17/(192*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) + 19/(128*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2)) + ln2*(32639/(153600*HarmonicSums`Private`ExpVar^10) + 31061/(9216*HarmonicSums`Private`ExpVar^9) - 3685/(36864*HarmonicSums`Private`ExpVar^8) - 11/(16*HarmonicSums`Private`ExpVar^7) + 193/(2304*HarmonicSums`Private`ExpVar^6) + 107/(384*HarmonicSums`Private`ExpVar^5) - 53/(256*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*li4half* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(10*HarmonicSums`Private`ExpVar^10) + 17/(40*HarmonicSums`Private`ExpVar^8) - 1/(10*HarmonicSums`Private`ExpVar^6) + 1/(20*HarmonicSums`Private`ExpVar^4) - 1/(10*HarmonicSums`Private`ExpVar^2) + 1/(5*HarmonicSums`Private`ExpVar))*z2^2) + ln2^3*(-911/(2560*HarmonicSums`Private`ExpVar^10) - 61/(256*HarmonicSums`Private`ExpVar^9) + 641/(9216*HarmonicSums`Private`ExpVar^8) + 7/(128*HarmonicSums`Private`ExpVar^7) - 17/(576*HarmonicSums`Private`ExpVar^6) - 5/(192*HarmonicSums`Private`ExpVar^5) + 19/(384*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(48*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar))*z2 - z3/6) - (7*z3^2)/32 + z2*(li4half/2 + (-1)^HarmonicSums`Private`ExpVar* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(-(li4half/2) + 32639/(307200*HarmonicSums`Private`ExpVar^10) + 31061/(18432*HarmonicSums`Private`ExpVar^9) - 3685/(73728*HarmonicSums`Private`ExpVar^8) - 11/(32*HarmonicSums`Private`ExpVar^7) + 193/(4608*HarmonicSums`Private`ExpVar^6) + 107/(768*HarmonicSums`Private`ExpVar^5) - 53/(512*HarmonicSums`Private`ExpVar^4) + 1/(96*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) + z2^2/16 + (-1)^HarmonicSums`Private`ExpVar* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z3) + ln2*(-li5half + 797312951/(129024000*HarmonicSums`Private`ExpVar^10) - 57764617/(23224320*HarmonicSums`Private`ExpVar^9) - 4068107/(4423680*HarmonicSums`Private`ExpVar^8) + 70541/(161280*HarmonicSums`Private`ExpVar^7) + 8729/(27648*HarmonicSums`Private`ExpVar^6) - 8303/(23040*HarmonicSums`Private`ExpVar^5) + 481/(3072*HarmonicSums`Private`ExpVar^4) - 13/(288*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-217/(80*HarmonicSums`Private`ExpVar^10) + 119/(320*HarmonicSums`Private`ExpVar^8) - 7/(80*HarmonicSums`Private`ExpVar^6) + 7/(160*HarmonicSums`Private`ExpVar^4) - 7/(80*HarmonicSums`Private`ExpVar^2) + 7/(40*HarmonicSums`Private`ExpVar))*z2^2 + z2*(-2733/(2560*HarmonicSums`Private`ExpVar^10) - 183/(256*HarmonicSums`Private`ExpVar^9) + 641/(3072*HarmonicSums`Private`ExpVar^8) + 21/(128*HarmonicSums`Private`ExpVar^7) - 17/(192*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) + 19/(128*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - z3/2) - z5/32) + (-1)^HarmonicSums`Private`ExpVar* (1953/(128*HarmonicSums`Private`ExpVar^10) - 1071/(512*HarmonicSums`Private`ExpVar^8) + 63/(128*HarmonicSums`Private`ExpVar^6) - 63/(256*HarmonicSums`Private`ExpVar^4) + 63/(128*HarmonicSums`Private`ExpVar^2) - 63/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, 1, -1, 1, 1, 1, HarmonicSums`Private`ExpVar] :> -li6half - ln2^6/80 + (-1)^HarmonicSums`Private`ExpVar*li4half* (-1185/(64*HarmonicSums`Private`ExpVar^10) - 119/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-31/(160*HarmonicSums`Private`ExpVar^10) + 17/(640*HarmonicSums`Private`ExpVar^8) - 1/(160*HarmonicSums`Private`ExpVar^6) + 1/(320*HarmonicSums`Private`ExpVar^4) - 1/(160*HarmonicSums`Private`ExpVar^2) + 1/(80*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + 310640304389/(46448640000*HarmonicSums`Private`ExpVar^10) + 1666028773/(8360755200*HarmonicSums`Private`ExpVar^9) - 655939513/(743178240*HarmonicSums`Private`ExpVar^8) - 145393/(903168*HarmonicSums`Private`ExpVar^7) + 631837/(1658880*HarmonicSums`Private`ExpVar^6) - 225119/(1382400*HarmonicSums`Private`ExpVar^5) + 413/(36864*HarmonicSums`Private`ExpVar^4) + 35/(1728*HarmonicSums`Private`ExpVar^3) - 1/(64*HarmonicSums`Private`ExpVar^2) + s6/4 + (-32639/(307200*HarmonicSums`Private`ExpVar^10) - 31061/(18432*HarmonicSums`Private`ExpVar^9) + 3685/(73728*HarmonicSums`Private`ExpVar^8) + 11/(32*HarmonicSums`Private`ExpVar^7) - 193/(4608*HarmonicSums`Private`ExpVar^6) - 107/(768*HarmonicSums`Private`ExpVar^5) + 53/(512*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2))*sinf^2 + (911/(2560*HarmonicSums`Private`ExpVar^10) + 61/(256*HarmonicSums`Private`ExpVar^9) - 641/(9216*HarmonicSums`Private`ExpVar^8) - 7/(128*HarmonicSums`Private`ExpVar^7) + 17/(576*HarmonicSums`Private`ExpVar^6) + 5/(192*HarmonicSums`Private`ExpVar^5) - 19/(384*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(48*HarmonicSums`Private`ExpVar^2))*sinf^3 + (ln2^4*z2)/16 + z2^3/7 + sinf*((-1)^HarmonicSums`Private`ExpVar*li4half* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) - 797312951/(129024000*HarmonicSums`Private`ExpVar^10) + 57764617/(23224320*HarmonicSums`Private`ExpVar^9) + 4068107/(4423680*HarmonicSums`Private`ExpVar^8) - 70541/(161280*HarmonicSums`Private`ExpVar^7) - 8729/(27648*HarmonicSums`Private`ExpVar^6) + 8303/(23040*HarmonicSums`Private`ExpVar^5) - 481/(3072*HarmonicSums`Private`ExpVar^4) + 13/(288*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + (2733/(2560*HarmonicSums`Private`ExpVar^10) + 183/(256*HarmonicSums`Private`ExpVar^9) - 641/(3072*HarmonicSums`Private`ExpVar^8) - 21/(128*HarmonicSums`Private`ExpVar^7) + 17/(192*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) - 19/(128*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar))*z2 - z3/6) + (911/(1280*HarmonicSums`Private`ExpVar^10) + 61/(128*HarmonicSums`Private`ExpVar^9) - 641/(4608*HarmonicSums`Private`ExpVar^8) - 7/(64*HarmonicSums`Private`ExpVar^7) + 17/(288*HarmonicSums`Private`ExpVar^6) + 5/(96*HarmonicSums`Private`ExpVar^5) - 19/(192*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2))*z3 + (25*z3^2)/32 + z2*(li4half/2 - 32639/(307200*HarmonicSums`Private`ExpVar^10) - 31061/(18432*HarmonicSums`Private`ExpVar^9) + 3685/(73728*HarmonicSums`Private`ExpVar^8) + 11/(32*HarmonicSums`Private`ExpVar^7) - 193/(4608*HarmonicSums`Private`ExpVar^6) - 107/(768*HarmonicSums`Private`ExpVar^5) + 53/(512*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(-(li4half/2) + z2^2/16 + (-1)^HarmonicSums`Private`ExpVar* (-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z3) + ln2*(-li5half + (-1)^HarmonicSums`Private`ExpVar* (31/(80*HarmonicSums`Private`ExpVar^10) - 17/(320*HarmonicSums`Private`ExpVar^8) + 1/(80*HarmonicSums`Private`ExpVar^6) - 1/(160*HarmonicSums`Private`ExpVar^4) + 1/(80*HarmonicSums`Private`ExpVar^2) - 1/(40*HarmonicSums`Private`ExpVar))*z2^2 - (z2*z3)/2 - z5/32) + (-1)^HarmonicSums`Private`ExpVar* (-31/(128*HarmonicSums`Private`ExpVar^10) + 17/(512*HarmonicSums`Private`ExpVar^8) - 1/(128*HarmonicSums`Private`ExpVar^6) + 1/(256*HarmonicSums`Private`ExpVar^4) - 1/(128*HarmonicSums`Private`ExpVar^2) + 1/(64*HarmonicSums`Private`ExpVar))*z5, S[-1, 1, 1, -1, -1, -1, HarmonicSums`Private`ExpVar] :> -6*li6half - (13*ln2^6)/360 + (-1)^HarmonicSums`Private`ExpVar*li4half* (-3555/(64*HarmonicSums`Private`ExpVar^10) - 357/(32*HarmonicSums`Private`ExpVar^9) + 441/(64*HarmonicSums`Private`ExpVar^8) + 15/(8*HarmonicSums`Private`ExpVar^7) - 45/(32*HarmonicSums`Private`ExpVar^6) - 9/(16*HarmonicSums`Private`ExpVar^5) + 9/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(48*HarmonicSums`Private`ExpVar^10) - 17/(192*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) - 565147/(143360*HarmonicSums`Private`ExpVar^10) + 3677/(2560*HarmonicSums`Private`ExpVar^9) + 100237/(184320*HarmonicSums`Private`ExpVar^8) - 65/(96*HarmonicSums`Private`ExpVar^7) + 377/(1152*HarmonicSums`Private`ExpVar^6) - 31/(320*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) - (5*s6)/2 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2)) + (5*z2)/24) + (-1)^HarmonicSums`Private`ExpVar* (711/(32*HarmonicSums`Private`ExpVar^10) + 357/(80*HarmonicSums`Private`ExpVar^9) - 441/(160*HarmonicSums`Private`ExpVar^8) - 3/(4*HarmonicSums`Private`ExpVar^7) + 9/(16*HarmonicSums`Private`ExpVar^6) + 9/(40*HarmonicSums`Private`ExpVar^5) - 9/(40*HarmonicSums`Private`ExpVar^4) - 3/(20*HarmonicSums`Private`ExpVar^3) + 3/(10*HarmonicSums`Private`ExpVar^2))*z2^2 + (5*z2^3)/21 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (32833/(23040*HarmonicSums`Private`ExpVar^10) + 38279/(26880*HarmonicSums`Private`ExpVar^9) - 937/(8064*HarmonicSums`Private`ExpVar^8) - 1231/(5760*HarmonicSums`Private`ExpVar^7) + 37/(5760*HarmonicSums`Private`ExpVar^6) + 31/(576*HarmonicSums`Private`ExpVar^5) + 5/(288*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) - (7*z3)/24) + (-1)^HarmonicSums`Private`ExpVar* (32833/(15360*HarmonicSums`Private`ExpVar^10) + 38279/(17920*HarmonicSums`Private`ExpVar^9) - 937/(5376*HarmonicSums`Private`ExpVar^8) - 1231/(3840*HarmonicSums`Private`ExpVar^7) + 37/(3840*HarmonicSums`Private`ExpVar^6) + 31/(384*HarmonicSums`Private`ExpVar^5) + 5/(192*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z3 + (75*z3^2)/64 + ln2^2*((-3*li4half)/2 + 3075/(1024*HarmonicSums`Private`ExpVar^10) + 47/(1152*HarmonicSums`Private`ExpVar^9) - 539/(1024*HarmonicSums`Private`ExpVar^8) + 53/(768*HarmonicSums`Private`ExpVar^7) + 45/(256*HarmonicSums`Private`ExpVar^6) - 31/(192*HarmonicSums`Private`ExpVar^5) + 5/(64*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 - (7*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z3) + z2*((3*li4half)/2 + 3075/(1024*HarmonicSums`Private`ExpVar^10) + 47/(1152*HarmonicSums`Private`ExpVar^9) - 539/(1024*HarmonicSums`Private`ExpVar^8) + 53/(768*HarmonicSums`Private`ExpVar^7) + 45/(256*HarmonicSums`Private`ExpVar^6) - 31/(192*HarmonicSums`Private`ExpVar^5) + 5/(64*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3) + sinf^2*((-1)^HarmonicSums`Private`ExpVar*ln2^3* (31/(48*HarmonicSums`Private`ExpVar^10) - 17/(192*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2*(31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^3* (-395/(128*HarmonicSums`Private`ExpVar^10) - 119/(192*HarmonicSums`Private`ExpVar^9) + 49/(128*HarmonicSums`Private`ExpVar^8) + 5/(48*HarmonicSums`Private`ExpVar^7) - 5/(64*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*li4half* (93/(4*HarmonicSums`Private`ExpVar^10) - 51/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^2*(-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-93/(10*HarmonicSums`Private`ExpVar^10) + 51/(40*HarmonicSums`Private`ExpVar^8) - 3/(10*HarmonicSums`Private`ExpVar^6) + 3/(20*HarmonicSums`Private`ExpVar^4) - 3/(10*HarmonicSums`Private`ExpVar^2) + 3/(5*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z3 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (31/(2*HarmonicSums`Private`ExpVar^10) - 17/(8*HarmonicSums`Private`ExpVar^8) + 1/(2*HarmonicSums`Private`ExpVar^6) - 1/(4*HarmonicSums`Private`ExpVar^4) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1))*z3)) + (-1)^HarmonicSums`Private`ExpVar* (31/HarmonicSums`Private`ExpVar^10 - 17/(4*HarmonicSums`Private`ExpVar^8) + HarmonicSums`Private`ExpVar^ (-6) - 1/(2*HarmonicSums`Private`ExpVar^4) + HarmonicSums`Private`ExpVar^(-2) - 2/HarmonicSums`Private`ExpVar)*z5 + ln2*(-4*li5half + (-1)^HarmonicSums`Private`ExpVar* (-19371727769/(2322432000*HarmonicSums`Private`ExpVar^10) + 127089979/(2107392000*HarmonicSums`Private`ExpVar^9) + 1040959571/(948326400*HarmonicSums`Private`ExpVar^8) - 203749/(3456000*HarmonicSums`Private`ExpVar^7) - 464389/(6912000*HarmonicSums`Private`ExpVar^6) - 9151/(27648*HarmonicSums`Private`ExpVar^5) + 1933/(3456*HarmonicSums`Private`ExpVar^4) - 31/(64*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-589/(80*HarmonicSums`Private`ExpVar^10) + 323/(320*HarmonicSums`Private`ExpVar^8) - 19/(80*HarmonicSums`Private`ExpVar^6) + 19/(160*HarmonicSums`Private`ExpVar^4) - 19/(80*HarmonicSums`Private`ExpVar^2) + 19/(40*HarmonicSums`Private`ExpVar))*z2^2 + z2*((-1)^HarmonicSums`Private`ExpVar* (32833/(7680*HarmonicSums`Private`ExpVar^10) + 38279/(8960*HarmonicSums`Private`ExpVar^9) - 937/(2688*HarmonicSums`Private`ExpVar^8) - 1231/(1920*HarmonicSums`Private`ExpVar^7) + 37/(1920*HarmonicSums`Private`ExpVar^6) + 31/(192*HarmonicSums`Private`ExpVar^5) + 5/(96*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) + (7*z3)/8) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(32*HarmonicSums`Private`ExpVar^10) - 119/(16*HarmonicSums`Private`ExpVar^9) + 147/(32*HarmonicSums`Private`ExpVar^8) + 5/(4*HarmonicSums`Private`ExpVar^7) - 15/(16*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^5) + 3/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2))*z3 + 4*z5), S[-1, 1, 1, -1, -1, 1, HarmonicSums`Private`ExpVar] :> -6*li6half - (13*ln2^6)/360 + (-1)^HarmonicSums`Private`ExpVar*li4half* (-3555/(64*HarmonicSums`Private`ExpVar^10) - 357/(32*HarmonicSums`Private`ExpVar^9) + 441/(64*HarmonicSums`Private`ExpVar^8) + 15/(8*HarmonicSums`Private`ExpVar^7) - 45/(32*HarmonicSums`Private`ExpVar^6) - 9/(16*HarmonicSums`Private`ExpVar^5) + 9/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (165085038409727/(13655900160000*HarmonicSums`Private`ExpVar^10) - 20646993866153/(5310627840000*HarmonicSums`Private`ExpVar^9) - 85235347049/(44255232000*HarmonicSums`Private`ExpVar^8) + 18568379/(34560000*HarmonicSums`Private`ExpVar^7) + 29699431/(46080000*HarmonicSums`Private`ExpVar^6) - 3323/(36864*HarmonicSums`Private`ExpVar^5) - 5627/(6912*HarmonicSums`Private`ExpVar^4) + 143/(128*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(48*HarmonicSums`Private`ExpVar^10) - 17/(192*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/HarmonicSums`Private`ExpVar^10 + 17/(4*HarmonicSums`Private`ExpVar^8) - HarmonicSums`Private`ExpVar^ (-6) + 1/(2*HarmonicSums`Private`ExpVar^4) - HarmonicSums`Private`ExpVar^(-2) + 2/HarmonicSums`Private`ExpVar) - (5*s6)/2 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2)) + (5*z2)/24) + (11*z2^3)/35 + ln2^2*((-3*li4half)/2 + 3075/(1024*HarmonicSums`Private`ExpVar^10) + 47/(1152*HarmonicSums`Private`ExpVar^9) - 539/(1024*HarmonicSums`Private`ExpVar^8) + 53/(768*HarmonicSums`Private`ExpVar^7) + 45/(256*HarmonicSums`Private`ExpVar^6) - 31/(192*HarmonicSums`Private`ExpVar^5) + 5/(64*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 - (7*z2^2)/40) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (32833/(23040*HarmonicSums`Private`ExpVar^10) + 38279/(26880*HarmonicSums`Private`ExpVar^9) - 937/(8064*HarmonicSums`Private`ExpVar^8) - 1231/(5760*HarmonicSums`Private`ExpVar^7) + 37/(5760*HarmonicSums`Private`ExpVar^6) + 31/(576*HarmonicSums`Private`ExpVar^5) + 5/(288*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) - (7*z3)/24) + (-1)^HarmonicSums`Private`ExpVar* (-229831/(15360*HarmonicSums`Private`ExpVar^10) - 38279/(2560*HarmonicSums`Private`ExpVar^9) + 937/(768*HarmonicSums`Private`ExpVar^8) + 8617/(3840*HarmonicSums`Private`ExpVar^7) - 259/(3840*HarmonicSums`Private`ExpVar^6) - 217/(384*HarmonicSums`Private`ExpVar^5) - 35/(192*HarmonicSums`Private`ExpVar^4) + 21/(32*HarmonicSums`Private`ExpVar^3) - 7/(16*HarmonicSums`Private`ExpVar^2))*z3 + (11*z3^2)/64 + sinf*((-1)^HarmonicSums`Private`ExpVar* (19371727769/(2322432000*HarmonicSums`Private`ExpVar^10) - 127089979/(2107392000*HarmonicSums`Private`ExpVar^9) - 1040959571/(948326400*HarmonicSums`Private`ExpVar^8) + 203749/(3456000*HarmonicSums`Private`ExpVar^7) + 464389/(6912000*HarmonicSums`Private`ExpVar^6) + 9151/(27648*HarmonicSums`Private`ExpVar^5) - 1933/(3456*HarmonicSums`Private`ExpVar^4) + 31/(64*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (-395/(128*HarmonicSums`Private`ExpVar^10) - 119/(192*HarmonicSums`Private`ExpVar^9) + 49/(128*HarmonicSums`Private`ExpVar^8) + 5/(48*HarmonicSums`Private`ExpVar^7) - 5/(64*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*li4half* (93/(4*HarmonicSums`Private`ExpVar^10) - 51/(16*HarmonicSums`Private`ExpVar^8) + 3/(4*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^4*(31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2*(-1185/(128*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (8295/(256*HarmonicSums`Private`ExpVar^10) + 833/(128*HarmonicSums`Private`ExpVar^9) - 1029/(256*HarmonicSums`Private`ExpVar^8) - 35/(32*HarmonicSums`Private`ExpVar^7) + 105/(128*HarmonicSums`Private`ExpVar^6) + 21/(64*HarmonicSums`Private`ExpVar^5) - 21/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2))*z3) + z2*((3*li4half)/2 - 3075/(1024*HarmonicSums`Private`ExpVar^10) - 47/(1152*HarmonicSums`Private`ExpVar^9) + 539/(1024*HarmonicSums`Private`ExpVar^8) - 53/(768*HarmonicSums`Private`ExpVar^7) - 45/(256*HarmonicSums`Private`ExpVar^6) + 31/(192*HarmonicSums`Private`ExpVar^5) - 5/(64*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (-217/(32*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^6) + 7/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3) + sinf^2*((-1)^HarmonicSums`Private`ExpVar*ln2^3* (31/(48*HarmonicSums`Private`ExpVar^10) - 17/(192*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2*(31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-217/(32*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^6) + 7/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3) + ln2*(-4*li5half + (-1)^HarmonicSums`Private`ExpVar* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2^2 + z2*((-1)^HarmonicSums`Private`ExpVar* (32833/(7680*HarmonicSums`Private`ExpVar^10) + 38279/(8960*HarmonicSums`Private`ExpVar^9) - 937/(2688*HarmonicSums`Private`ExpVar^8) - 1231/(1920*HarmonicSums`Private`ExpVar^7) + 37/(1920*HarmonicSums`Private`ExpVar^6) + 31/(192*HarmonicSums`Private`ExpVar^5) + 5/(96*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) + (7*z3)/8) + 4*z5), S[-1, 1, 1, -1, 1, -1, HarmonicSums`Private`ExpVar] :> -3*li6half + ln2^6/180 + (-1)^HarmonicSums`Private`ExpVar* (27969679/(53084160*HarmonicSums`Private`ExpVar^10) + 4694477/(61931520*HarmonicSums`Private`ExpVar^9) + 74197/(1548288*HarmonicSums`Private`ExpVar^8) - 69031/(276480*HarmonicSums`Private`ExpVar^7) + 46423/(184320*HarmonicSums`Private`ExpVar^6) - 2819/(18432*HarmonicSums`Private`ExpVar^5) + 73/(1152*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(217/(480*HarmonicSums`Private`ExpVar^10) - 119/(1920*HarmonicSums`Private`ExpVar^8) + 7/(480*HarmonicSums`Private`ExpVar^6) - 7/(960*HarmonicSums`Private`ExpVar^4) + 7/(480*HarmonicSums`Private`ExpVar^2) - 7/(240*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) - 3*s6 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-1185/(512*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^9) + 147/(512*HarmonicSums`Private`ExpVar^8) + 5/(64*HarmonicSums`Private`ExpVar^7) - 15/(256*HarmonicSums`Private`ExpVar^6) - 3/(128*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2)) - z2/24) + (-1)^HarmonicSums`Private`ExpVar* (-237/(256*HarmonicSums`Private`ExpVar^10) - 119/(640*HarmonicSums`Private`ExpVar^9) + 147/(1280*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^7) - 3/(128*HarmonicSums`Private`ExpVar^6) - 3/(320*HarmonicSums`Private`ExpVar^5) + 3/(320*HarmonicSums`Private`ExpVar^4) + 1/(160*HarmonicSums`Private`ExpVar^3) - 1/(80*HarmonicSums`Private`ExpVar^2))*z2^2 + z2^3/120 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (32833/(23040*HarmonicSums`Private`ExpVar^10) + 38279/(26880*HarmonicSums`Private`ExpVar^9) - 937/(8064*HarmonicSums`Private`ExpVar^8) - 1231/(5760*HarmonicSums`Private`ExpVar^7) + 37/(5760*HarmonicSums`Private`ExpVar^6) + 31/(576*HarmonicSums`Private`ExpVar^5) + 5/(288*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/48) + (-1)^HarmonicSums`Private`ExpVar* (-32833/(30720*HarmonicSums`Private`ExpVar^10) - 38279/(35840*HarmonicSums`Private`ExpVar^9) + 937/(10752*HarmonicSums`Private`ExpVar^8) + 1231/(7680*HarmonicSums`Private`ExpVar^7) - 37/(7680*HarmonicSums`Private`ExpVar^6) - 31/(768*HarmonicSums`Private`ExpVar^5) - 5/(384*HarmonicSums`Private`ExpVar^4) + 3/(64*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2))*z3 + (-1)^HarmonicSums`Private`ExpVar* (217/(64*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^6) - 7/(128*HarmonicSums`Private`ExpVar^4) + 7/(64*HarmonicSums`Private`ExpVar^2) - 7/(32*HarmonicSums`Private`ExpVar))*z2*z3 + (153*z3^2)/128 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^3* (-395/(128*HarmonicSums`Private`ExpVar^10) - 119/(192*HarmonicSums`Private`ExpVar^9) + 49/(128*HarmonicSums`Private`ExpVar^8) + 5/(48*HarmonicSums`Private`ExpVar^7) - 5/(64*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^2*(-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (31/(80*HarmonicSums`Private`ExpVar^10) - 17/(320*HarmonicSums`Private`ExpVar^8) + 1/(80*HarmonicSums`Private`ExpVar^6) - 1/(160*HarmonicSums`Private`ExpVar^4) + 1/(80*HarmonicSums`Private`ExpVar^2) - 1/(40*HarmonicSums`Private`ExpVar))*z2^2 + ln2*(-3075/(512*HarmonicSums`Private`ExpVar^10) - 47/(576*HarmonicSums`Private`ExpVar^9) + 539/(512*HarmonicSums`Private`ExpVar^8) - 53/(384*HarmonicSums`Private`ExpVar^7) - 45/(128*HarmonicSums`Private`ExpVar^6) + 31/(96*HarmonicSums`Private`ExpVar^5) - 5/(32*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2) + (-1)^HarmonicSums`Private`ExpVar* (1185/(512*HarmonicSums`Private`ExpVar^10) + 119/(256*HarmonicSums`Private`ExpVar^9) - 147/(512*HarmonicSums`Private`ExpVar^8) - 5/(64*HarmonicSums`Private`ExpVar^7) + 15/(256*HarmonicSums`Private`ExpVar^6) + 3/(128*HarmonicSums`Private`ExpVar^5) - 3/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2))*z3) + ln2^2*(-3075/(1024*HarmonicSums`Private`ExpVar^10) - 47/(1152*HarmonicSums`Private`ExpVar^9) + 539/(1024*HarmonicSums`Private`ExpVar^8) - 53/(768*HarmonicSums`Private`ExpVar^7) - 45/(256*HarmonicSums`Private`ExpVar^6) + 31/(192*HarmonicSums`Private`ExpVar^5) - 5/(64*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + z2^2/5 + (-1)^HarmonicSums`Private`ExpVar* (31/(8*HarmonicSums`Private`ExpVar^10) - 17/(32*HarmonicSums`Private`ExpVar^8) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z3) + sinf^2*((-1)^HarmonicSums`Private`ExpVar*ln2^3* (31/(48*HarmonicSums`Private`ExpVar^10) - 17/(192*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2*(-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-31/(64*HarmonicSums`Private`ExpVar^10) + 17/(256*HarmonicSums`Private`ExpVar^8) - 1/(64*HarmonicSums`Private`ExpVar^6) + 1/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^2) + 1/(32*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (-31/(128*HarmonicSums`Private`ExpVar^10) + 17/(512*HarmonicSums`Private`ExpVar^8) - 1/(128*HarmonicSums`Private`ExpVar^6) + 1/(256*HarmonicSums`Private`ExpVar^4) - 1/(128*HarmonicSums`Private`ExpVar^2) + 1/(64*HarmonicSums`Private`ExpVar))*z5 + ln2*(-li5half + 161033/(18432*HarmonicSums`Private`ExpVar^10) + 775439/(414720*HarmonicSums`Private`ExpVar^9) - 5875/(4096*HarmonicSums`Private`ExpVar^8) - 2551/(16128*HarmonicSums`Private`ExpVar^7) + 331/(768*HarmonicSums`Private`ExpVar^6) - 539/(2880*HarmonicSums`Private`ExpVar^5) + 7/(384*HarmonicSums`Private`ExpVar^4) + 1/(72*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (-93/(20*HarmonicSums`Private`ExpVar^10) + 51/(80*HarmonicSums`Private`ExpVar^8) - 3/(20*HarmonicSums`Private`ExpVar^6) + 3/(40*HarmonicSums`Private`ExpVar^4) - 3/(20*HarmonicSums`Private`ExpVar^2) + 3/(10*HarmonicSums`Private`ExpVar))*z2^2 + z2*((-1)^HarmonicSums`Private`ExpVar* (-32833/(7680*HarmonicSums`Private`ExpVar^10) - 38279/(8960*HarmonicSums`Private`ExpVar^9) + 937/(2688*HarmonicSums`Private`ExpVar^8) + 1231/(1920*HarmonicSums`Private`ExpVar^7) - 37/(1920*HarmonicSums`Private`ExpVar^6) - 31/(192*HarmonicSums`Private`ExpVar^5) - 5/(96*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (9*z3)/16) + (63*z5)/32), S[-1, 1, 1, -1, 1, 1, HarmonicSums`Private`ExpVar] :> -3*li6half + ln2^6/180 + (-1)^HarmonicSums`Private`ExpVar*ln2^5* (217/(480*HarmonicSums`Private`ExpVar^10) - 119/(1920*HarmonicSums`Private`ExpVar^8) + 7/(480*HarmonicSums`Private`ExpVar^6) - 7/(960*HarmonicSums`Private`ExpVar^4) + 7/(480*HarmonicSums`Private`ExpVar^2) - 7/(240*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + 104976511/(46448640*HarmonicSums`Private`ExpVar^10) + 3254786299/(1045094400*HarmonicSums`Private`ExpVar^9) - 4495583/(10321920*HarmonicSums`Private`ExpVar^8) - 2028293/(3386880*HarmonicSums`Private`ExpVar^7) + 4217/(11520*HarmonicSums`Private`ExpVar^6) - 16337/(172800*HarmonicSums`Private`ExpVar^5) + 59/(4608*HarmonicSums`Private`ExpVar^4) - 1/(216*HarmonicSums`Private`ExpVar^3) - 3*s6 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-1185/(512*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^9) + 147/(512*HarmonicSums`Private`ExpVar^8) + 5/(64*HarmonicSums`Private`ExpVar^7) - 15/(256*HarmonicSums`Private`ExpVar^6) - 3/(128*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2)) - z2/24) + (-1)^HarmonicSums`Private`ExpVar* (237/(256*HarmonicSums`Private`ExpVar^10) + 119/(640*HarmonicSums`Private`ExpVar^9) - 147/(1280*HarmonicSums`Private`ExpVar^8) - 1/(32*HarmonicSums`Private`ExpVar^7) + 3/(128*HarmonicSums`Private`ExpVar^6) + 3/(320*HarmonicSums`Private`ExpVar^5) - 3/(320*HarmonicSums`Private`ExpVar^4) - 1/(160*HarmonicSums`Private`ExpVar^3) + 1/(80*HarmonicSums`Private`ExpVar^2))*z2^2 + (121*z2^3)/280 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (32833/(23040*HarmonicSums`Private`ExpVar^10) + 38279/(26880*HarmonicSums`Private`ExpVar^9) - 937/(8064*HarmonicSums`Private`ExpVar^8) - 1231/(5760*HarmonicSums`Private`ExpVar^7) + 37/(5760*HarmonicSums`Private`ExpVar^6) + 31/(576*HarmonicSums`Private`ExpVar^5) + 5/(288*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/48) + (-1)^HarmonicSums`Private`ExpVar* (229831/(30720*HarmonicSums`Private`ExpVar^10) + 38279/(5120*HarmonicSums`Private`ExpVar^9) - 937/(1536*HarmonicSums`Private`ExpVar^8) - 8617/(7680*HarmonicSums`Private`ExpVar^7) + 259/(7680*HarmonicSums`Private`ExpVar^6) + 217/(768*HarmonicSums`Private`ExpVar^5) + 35/(384*HarmonicSums`Private`ExpVar^4) - 21/(64*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2))*z3 + (89*z3^2)/128 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + z2^2/5 + (-1)^HarmonicSums`Private`ExpVar* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z3) + sinf^2*((-1)^HarmonicSums`Private`ExpVar*ln2^3* (31/(48*HarmonicSums`Private`ExpVar^10) - 17/(192*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar)) + 3075/(1024*HarmonicSums`Private`ExpVar^10) + 47/(1152*HarmonicSums`Private`ExpVar^9) - 539/(1024*HarmonicSums`Private`ExpVar^8) + 53/(768*HarmonicSums`Private`ExpVar^7) + 45/(256*HarmonicSums`Private`ExpVar^6) - 31/(192*HarmonicSums`Private`ExpVar^5) + 5/(64*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* ln2*(-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (217/(64*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^6) - 7/(128*HarmonicSums`Private`ExpVar^4) + 7/(64*HarmonicSums`Private`ExpVar^2) - 7/(32*HarmonicSums`Private`ExpVar))*z3) + z2*(3075/(1024*HarmonicSums`Private`ExpVar^10) + 47/(1152*HarmonicSums`Private`ExpVar^9) - 539/(1024*HarmonicSums`Private`ExpVar^8) + 53/(768*HarmonicSums`Private`ExpVar^7) + 45/(256*HarmonicSums`Private`ExpVar^6) - 31/(192*HarmonicSums`Private`ExpVar^5) + 5/(64*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* (-31/(64*HarmonicSums`Private`ExpVar^10) + 17/(256*HarmonicSums`Private`ExpVar^8) - 1/(64*HarmonicSums`Private`ExpVar^6) + 1/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^2) + 1/(32*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^3* (-395/(128*HarmonicSums`Private`ExpVar^10) - 119/(192*HarmonicSums`Private`ExpVar^9) + 49/(128*HarmonicSums`Private`ExpVar^8) + 5/(48*HarmonicSums`Private`ExpVar^7) - 5/(64*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (31/(32*HarmonicSums`Private`ExpVar^10) - 17/(128*HarmonicSums`Private`ExpVar^8) + 1/(32*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar)) - 161033/(18432*HarmonicSums`Private`ExpVar^10) - 775439/(414720*HarmonicSums`Private`ExpVar^9) + 5875/(4096*HarmonicSums`Private`ExpVar^8) + 2551/(16128*HarmonicSums`Private`ExpVar^7) - 331/(768*HarmonicSums`Private`ExpVar^6) + 539/(2880*HarmonicSums`Private`ExpVar^5) - 7/(384*HarmonicSums`Private`ExpVar^4) - 1/(72*HarmonicSums`Private`ExpVar^3) + (-1)^HarmonicSums`Private`ExpVar* ln2^2*(-31/(8*HarmonicSums`Private`ExpVar^10) + 17/(32*HarmonicSums`Private`ExpVar^8) - 1/(8*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-31/(80*HarmonicSums`Private`ExpVar^10) + 17/(320*HarmonicSums`Private`ExpVar^8) - 1/(80*HarmonicSums`Private`ExpVar^6) + 1/(160*HarmonicSums`Private`ExpVar^4) - 1/(80*HarmonicSums`Private`ExpVar^2) + 1/(40*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (-8295/(512*HarmonicSums`Private`ExpVar^10) - 833/(256*HarmonicSums`Private`ExpVar^9) + 1029/(512*HarmonicSums`Private`ExpVar^8) + 35/(64*HarmonicSums`Private`ExpVar^7) - 105/(256*HarmonicSums`Private`ExpVar^6) - 21/(128*HarmonicSums`Private`ExpVar^5) + 21/(128*HarmonicSums`Private`ExpVar^4) + 7/(64*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2))*z3 + ln2*((-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z3)) + (-1)^HarmonicSums`Private`ExpVar* (1953/(128*HarmonicSums`Private`ExpVar^10) - 1071/(512*HarmonicSums`Private`ExpVar^8) + 63/(128*HarmonicSums`Private`ExpVar^6) - 63/(256*HarmonicSums`Private`ExpVar^4) + 63/(128*HarmonicSums`Private`ExpVar^2) - 63/(64*HarmonicSums`Private`ExpVar))*z5 + ln2*(-li5half + (-1)^HarmonicSums`Private`ExpVar* (-217/(40*HarmonicSums`Private`ExpVar^10) + 119/(160*HarmonicSums`Private`ExpVar^8) - 7/(40*HarmonicSums`Private`ExpVar^6) + 7/(80*HarmonicSums`Private`ExpVar^4) - 7/(40*HarmonicSums`Private`ExpVar^2) + 7/(20*HarmonicSums`Private`ExpVar))*z2^2 + z2*((-1)^HarmonicSums`Private`ExpVar* (-32833/(7680*HarmonicSums`Private`ExpVar^10) - 38279/(8960*HarmonicSums`Private`ExpVar^9) + 937/(2688*HarmonicSums`Private`ExpVar^8) + 1231/(1920*HarmonicSums`Private`ExpVar^7) - 37/(1920*HarmonicSums`Private`ExpVar^6) - 31/(192*HarmonicSums`Private`ExpVar^5) - 5/(96*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (9*z3)/16) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(64*HarmonicSums`Private`ExpVar^10) - 119/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) + 5/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) - 3/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z3 + (63*z5)/32), S[-1, 1, 1, 1, -1, -1, HarmonicSums`Private`ExpVar] :> ln2^6/72 + (-1)^HarmonicSums`Private`ExpVar* (-47521830934451/(5852528640000*HarmonicSums`Private`ExpVar^10) + 286314896041/(5310627840000*HarmonicSums`Private`ExpVar^9) + 466454894539/(398297088000*HarmonicSums`Private`ExpVar^8) - 43721363/(207360000*HarmonicSums`Private`ExpVar^7) + 28531957/(414720000*HarmonicSums`Private`ExpVar^6) - 136045/(331776*HarmonicSums`Private`ExpVar^5) + 12263/(20736*HarmonicSums`Private`ExpVar^4) - 63/(128*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(1185/(64*HarmonicSums`Private`ExpVar^10) + 119/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-31/(96*HarmonicSums`Private`ExpVar^10) + 17/(384*HarmonicSums`Private`ExpVar^8) - 1/(96*HarmonicSums`Private`ExpVar^6) + 1/(192*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar)) + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(128*HarmonicSums`Private`ExpVar^10) + 119/(192*HarmonicSums`Private`ExpVar^9) - 49/(128*HarmonicSums`Private`ExpVar^8) - 5/(48*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) - z2/12) + (-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2^2 + sinf^3*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (-31/(48*HarmonicSums`Private`ExpVar^10) + 17/(192*HarmonicSums`Private`ExpVar^8) - 1/(48*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(48*HarmonicSums`Private`ExpVar^10) + 17/(192*HarmonicSums`Private`ExpVar^8) - 1/(48*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar))*z2) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-32833/(11520*HarmonicSums`Private`ExpVar^10) - 38279/(13440*HarmonicSums`Private`ExpVar^9) + 937/(4032*HarmonicSums`Private`ExpVar^8) + 1231/(2880*HarmonicSums`Private`ExpVar^7) - 37/(2880*HarmonicSums`Private`ExpVar^6) - 31/(288*HarmonicSums`Private`ExpVar^5) - 5/(144*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar))*z2 + (7*z3)/48) + (-1)^HarmonicSums`Private`ExpVar* (229831/(30720*HarmonicSums`Private`ExpVar^10) + 38279/(5120*HarmonicSums`Private`ExpVar^9) - 937/(1536*HarmonicSums`Private`ExpVar^8) - 8617/(7680*HarmonicSums`Private`ExpVar^7) + 259/(7680*HarmonicSums`Private`ExpVar^6) + 217/(768*HarmonicSums`Private`ExpVar^5) + 35/(384*HarmonicSums`Private`ExpVar^4) - 21/(64*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2))*z3 + (49*z3^2)/128 + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^3* (395/(64*HarmonicSums`Private`ExpVar^10) + 119/(96*HarmonicSums`Private`ExpVar^9) - 49/(64*HarmonicSums`Private`ExpVar^8) - 5/(24*HarmonicSums`Private`ExpVar^7) + 5/(32*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-32833/(7680*HarmonicSums`Private`ExpVar^10) - 38279/(8960*HarmonicSums`Private`ExpVar^9) + 937/(2688*HarmonicSums`Private`ExpVar^8) + 1231/(1920*HarmonicSums`Private`ExpVar^7) - 37/(1920*HarmonicSums`Private`ExpVar^6) - 31/(192*HarmonicSums`Private`ExpVar^5) - 5/(96*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (1185/(128*HarmonicSums`Private`ExpVar^10) + 119/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) - 5/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2^2 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-32833/(7680*HarmonicSums`Private`ExpVar^10) - 38279/(8960*HarmonicSums`Private`ExpVar^9) + 937/(2688*HarmonicSums`Private`ExpVar^8) + 1231/(1920*HarmonicSums`Private`ExpVar^7) - 37/(1920*HarmonicSums`Private`ExpVar^6) - 31/(192*HarmonicSums`Private`ExpVar^5) - 5/(96*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2) + (-1)^HarmonicSums`Private`ExpVar* (-8295/(512*HarmonicSums`Private`ExpVar^10) - 833/(256*HarmonicSums`Private`ExpVar^9) + 1029/(512*HarmonicSums`Private`ExpVar^8) + 35/(64*HarmonicSums`Private`ExpVar^7) - 105/(256*HarmonicSums`Private`ExpVar^6) - 21/(128*HarmonicSums`Private`ExpVar^5) + 21/(128*HarmonicSums`Private`ExpVar^4) + 7/(64*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2))*z3) + sinf^2*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (1185/(256*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (217/(64*HarmonicSums`Private`ExpVar^10) - 119/(256*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^6) - 7/(128*HarmonicSums`Private`ExpVar^4) + 7/(64*HarmonicSums`Private`ExpVar^2) - 7/(32*HarmonicSums`Private`ExpVar))*z3) + z2*(-(li4half/2) + (-1)^HarmonicSums`Private`ExpVar* (-319181/(53760*HarmonicSums`Private`ExpVar^10) + 232189/(80640*HarmonicSums`Private`ExpVar^9) + 19201/(23040*HarmonicSums`Private`ExpVar^8) - 3691/(11520*HarmonicSums`Private`ExpVar^7) - 35/(192*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^5) + 5/(32*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (403/(192*HarmonicSums`Private`ExpVar^10) - 221/(768*HarmonicSums`Private`ExpVar^8) + 13/(192*HarmonicSums`Private`ExpVar^6) - 13/(384*HarmonicSums`Private`ExpVar^4) + 13/(192*HarmonicSums`Private`ExpVar^2) - 13/(96*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(li4half/2 + (-1)^HarmonicSums`Private`ExpVar* (-319181/(53760*HarmonicSums`Private`ExpVar^10) + 232189/(80640*HarmonicSums`Private`ExpVar^9) + 19201/(23040*HarmonicSums`Private`ExpVar^8) - 3691/(11520*HarmonicSums`Private`ExpVar^7) - 35/(192*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^5) + 5/(32*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + z2^2/8 + (-1)^HarmonicSums`Private`ExpVar* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar))*z3) + ln2*(li5half - 3097/(1024*HarmonicSums`Private`ExpVar^10) + 987/(512*HarmonicSums`Private`ExpVar^9) + 1043/(6144*HarmonicSums`Private`ExpVar^8) - 35/(64*HarmonicSums`Private`ExpVar^7) + 115/(384*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4) + (-1)^HarmonicSums`Private`ExpVar* (-31/(16*HarmonicSums`Private`ExpVar^10) + 17/(64*HarmonicSums`Private`ExpVar^8) - 1/(16*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2^2 + z2*((-1)^HarmonicSums`Private`ExpVar* (-32833/(7680*HarmonicSums`Private`ExpVar^10) - 38279/(8960*HarmonicSums`Private`ExpVar^9) + 937/(2688*HarmonicSums`Private`ExpVar^8) + 1231/(1920*HarmonicSums`Private`ExpVar^7) - 37/(1920*HarmonicSums`Private`ExpVar^6) - 31/(192*HarmonicSums`Private`ExpVar^5) - 5/(96*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) - (7*z3)/16) - z5), S[-1, 1, 1, 1, -1, 1, HarmonicSums`Private`ExpVar] :> ln2^6/72 + (-1)^HarmonicSums`Private`ExpVar*li4half* (1185/(64*HarmonicSums`Private`ExpVar^10) + 119/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* li5half*(31/(4*HarmonicSums`Private`ExpVar^10) - 17/(16*HarmonicSums`Private`ExpVar^8) + 1/(4*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(-31/(96*HarmonicSums`Private`ExpVar^10) + 17/(384*HarmonicSums`Private`ExpVar^8) - 1/(96*HarmonicSums`Private`ExpVar^6) + 1/(192*HarmonicSums`Private`ExpVar^4) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar)) - 833161/(122880*HarmonicSums`Private`ExpVar^10) + 109543/(61440*HarmonicSums`Private`ExpVar^9) + 92743/(147456*HarmonicSums`Private`ExpVar^8) - 401/(768*HarmonicSums`Private`ExpVar^7) + 169/(1152*HarmonicSums`Private`ExpVar^6) - 7/(640*HarmonicSums`Private`ExpVar^5) - 1/(256*HarmonicSums`Private`ExpVar^4) + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(128*HarmonicSums`Private`ExpVar^10) + 119/(192*HarmonicSums`Private`ExpVar^9) - 49/(128*HarmonicSums`Private`ExpVar^8) - 5/(48*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) - z2/12) + (-1)^HarmonicSums`Private`ExpVar* (-3081/(256*HarmonicSums`Private`ExpVar^10) - 1547/(640*HarmonicSums`Private`ExpVar^9) + 1911/(1280*HarmonicSums`Private`ExpVar^8) + 13/(32*HarmonicSums`Private`ExpVar^7) - 39/(128*HarmonicSums`Private`ExpVar^6) - 39/(320*HarmonicSums`Private`ExpVar^5) + 39/(320*HarmonicSums`Private`ExpVar^4) + 13/(160*HarmonicSums`Private`ExpVar^3) - 13/(80*HarmonicSums`Private`ExpVar^2))*z2^2 + (2*z2^3)/5 + sinf^3*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (-31/(48*HarmonicSums`Private`ExpVar^10) + 17/(192*HarmonicSums`Private`ExpVar^8) - 1/(48*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (31/(48*HarmonicSums`Private`ExpVar^10) - 17/(192*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar))*z2) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-32833/(11520*HarmonicSums`Private`ExpVar^10) - 38279/(13440*HarmonicSums`Private`ExpVar^9) + 937/(4032*HarmonicSums`Private`ExpVar^8) + 1231/(2880*HarmonicSums`Private`ExpVar^7) - 37/(2880*HarmonicSums`Private`ExpVar^6) - 31/(288*HarmonicSums`Private`ExpVar^5) - 5/(144*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2)) + (7*z3)/48) + (-1)^HarmonicSums`Private`ExpVar* (-32833/(30720*HarmonicSums`Private`ExpVar^10) - 38279/(35840*HarmonicSums`Private`ExpVar^9) + 937/(10752*HarmonicSums`Private`ExpVar^8) + 1231/(7680*HarmonicSums`Private`ExpVar^7) - 37/(7680*HarmonicSums`Private`ExpVar^6) - 31/(768*HarmonicSums`Private`ExpVar^5) - 5/(384*HarmonicSums`Private`ExpVar^4) + 3/(64*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2))*z3 - (15*z3^2)/128 + z2*(-(li4half/2) + (-1)^HarmonicSums`Private`ExpVar* (319181/(53760*HarmonicSums`Private`ExpVar^10) - 232189/(80640*HarmonicSums`Private`ExpVar^9) - 19201/(23040*HarmonicSums`Private`ExpVar^8) + 3691/(11520*HarmonicSums`Private`ExpVar^7) + 35/(192*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^5) - 5/(32*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (155/(192*HarmonicSums`Private`ExpVar^10) - 85/(768*HarmonicSums`Private`ExpVar^8) + 5/(192*HarmonicSums`Private`ExpVar^6) - 5/(384*HarmonicSums`Private`ExpVar^4) + 5/(192*HarmonicSums`Private`ExpVar^2) - 5/(96*HarmonicSums`Private`ExpVar))*z3) + sinf^2*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (1185/(256*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-31/(64*HarmonicSums`Private`ExpVar^10) + 17/(256*HarmonicSums`Private`ExpVar^8) - 1/(64*HarmonicSums`Private`ExpVar^6) + 1/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^2) + 1/(32*HarmonicSums`Private`ExpVar))*z3) + ln2^2*(li4half/2 + (-1)^HarmonicSums`Private`ExpVar* (-319181/(53760*HarmonicSums`Private`ExpVar^10) + 232189/(80640*HarmonicSums`Private`ExpVar^9) + 19201/(23040*HarmonicSums`Private`ExpVar^8) - 3691/(11520*HarmonicSums`Private`ExpVar^7) - 35/(192*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^5) + 5/(32*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + z2^2/8 + (-1)^HarmonicSums`Private`ExpVar* (-31/(6*HarmonicSums`Private`ExpVar^10) + 17/(24*HarmonicSums`Private`ExpVar^8) - 1/(6*HarmonicSums`Private`ExpVar^6) + 1/(12*HarmonicSums`Private`ExpVar^4) - 1/(6*HarmonicSums`Private`ExpVar^2) + 1/(3*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^3* (395/(64*HarmonicSums`Private`ExpVar^10) + 119/(96*HarmonicSums`Private`ExpVar^9) - 49/(64*HarmonicSums`Private`ExpVar^8) - 5/(24*HarmonicSums`Private`ExpVar^7) + 5/(32*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + 3097/(1024*HarmonicSums`Private`ExpVar^10) - 987/(512*HarmonicSums`Private`ExpVar^9) - 1043/(6144*HarmonicSums`Private`ExpVar^8) + 35/(64*HarmonicSums`Private`ExpVar^7) - 115/(384*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4) + (-1)^HarmonicSums`Private`ExpVar* (32833/(7680*HarmonicSums`Private`ExpVar^10) + 38279/(8960*HarmonicSums`Private`ExpVar^9) - 937/(2688*HarmonicSums`Private`ExpVar^8) - 1231/(1920*HarmonicSums`Private`ExpVar^7) + 37/(1920*HarmonicSums`Private`ExpVar^6) + 31/(192*HarmonicSums`Private`ExpVar^5) + 5/(96*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (403/(80*HarmonicSums`Private`ExpVar^10) - 221/(320*HarmonicSums`Private`ExpVar^8) + 13/(80*HarmonicSums`Private`ExpVar^6) - 13/(160*HarmonicSums`Private`ExpVar^4) + 13/(80*HarmonicSums`Private`ExpVar^2) - 13/(40*HarmonicSums`Private`ExpVar))*z2^2 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-32833/(7680*HarmonicSums`Private`ExpVar^10) - 38279/(8960*HarmonicSums`Private`ExpVar^9) + 937/(2688*HarmonicSums`Private`ExpVar^8) + 1231/(1920*HarmonicSums`Private`ExpVar^7) - 37/(1920*HarmonicSums`Private`ExpVar^6) - 31/(192*HarmonicSums`Private`ExpVar^5) - 5/(96*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2) + (-1)^HarmonicSums`Private`ExpVar* (1185/(512*HarmonicSums`Private`ExpVar^10) + 119/(256*HarmonicSums`Private`ExpVar^9) - 147/(512*HarmonicSums`Private`ExpVar^8) - 5/(64*HarmonicSums`Private`ExpVar^7) + 15/(256*HarmonicSums`Private`ExpVar^6) + 3/(128*HarmonicSums`Private`ExpVar^5) - 3/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2))*z3 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z3)) + ln2*(li5half + (-1)^HarmonicSums`Private`ExpVar* (403/(80*HarmonicSums`Private`ExpVar^10) - 221/(320*HarmonicSums`Private`ExpVar^8) + 13/(80*HarmonicSums`Private`ExpVar^6) - 13/(160*HarmonicSums`Private`ExpVar^4) + 13/(80*HarmonicSums`Private`ExpVar^2) - 13/(40*HarmonicSums`Private`ExpVar))*z2^2 + z2*((-1)^HarmonicSums`Private`ExpVar* (32833/(7680*HarmonicSums`Private`ExpVar^10) + 38279/(8960*HarmonicSums`Private`ExpVar^9) - 937/(2688*HarmonicSums`Private`ExpVar^8) - 1231/(1920*HarmonicSums`Private`ExpVar^7) + 37/(1920*HarmonicSums`Private`ExpVar^6) + 31/(192*HarmonicSums`Private`ExpVar^5) + 5/(96*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) - (7*z3)/16) + (-1)^HarmonicSums`Private`ExpVar* (1185/(64*HarmonicSums`Private`ExpVar^10) + 119/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) - 5/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) + 3/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z3 - z5) + (-1)^HarmonicSums`Private`ExpVar*(-31/(4*HarmonicSums`Private`ExpVar^10) + 17/(16*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^4) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))* z5, S[-1, 1, 1, 1, 1, -1, HarmonicSums`Private`ExpVar] :> -li6half + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (-395/(512*HarmonicSums`Private`ExpVar^10) - 119/(768*HarmonicSums`Private`ExpVar^9) + 49/(512*HarmonicSums`Private`ExpVar^8) + 5/(192*HarmonicSums`Private`ExpVar^7) - 5/(256*HarmonicSums`Private`ExpVar^6) - 1/(128*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) + 1/(192*HarmonicSums`Private`ExpVar^3) - 1/(96*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* ln2^5*(31/(480*HarmonicSums`Private`ExpVar^10) - 17/(1920*HarmonicSums`Private`ExpVar^8) + 1/(480*HarmonicSums`Private`ExpVar^6) - 1/(960*HarmonicSums`Private`ExpVar^4) + 1/(480*HarmonicSums`Private`ExpVar^2) - 1/(240*HarmonicSums`Private`ExpVar)) - 4725/(2048*HarmonicSums`Private`ExpVar^10) - 5663/(7680*HarmonicSums`Private`ExpVar^9) + 175/(256*HarmonicSums`Private`ExpVar^8) - 1/(4*HarmonicSums`Private`ExpVar^7) + 7/(128*HarmonicSums`Private`ExpVar^6) - 1/(160*HarmonicSums`Private`ExpVar^5) + ((-1)^HarmonicSums`Private`ExpVar*ln2* (-395/(128*HarmonicSums`Private`ExpVar^10) - 119/(192*HarmonicSums`Private`ExpVar^9) + 49/(128*HarmonicSums`Private`ExpVar^8) + 5/(48*HarmonicSums`Private`ExpVar^7) - 5/(64*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (31/(48*HarmonicSums`Private`ExpVar^10) - 17/(192*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar)))*sinf^3 + (-1)^HarmonicSums`Private`ExpVar*ln2* (31/(96*HarmonicSums`Private`ExpVar^10) - 17/(384*HarmonicSums`Private`ExpVar^8) + 1/(96*HarmonicSums`Private`ExpVar^6) - 1/(192*HarmonicSums`Private`ExpVar^4) + 1/(96*HarmonicSums`Private`ExpVar^2) - 1/(48*HarmonicSums`Private`ExpVar))*sinf^4 + (8*z2^3)/35 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (32833/(23040*HarmonicSums`Private`ExpVar^10) + 38279/(26880*HarmonicSums`Private`ExpVar^9) - 937/(8064*HarmonicSums`Private`ExpVar^8) - 1231/(5760*HarmonicSums`Private`ExpVar^7) + 37/(5760*HarmonicSums`Private`ExpVar^6) + 31/(576*HarmonicSums`Private`ExpVar^5) + 5/(288*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (31/(48*HarmonicSums`Private`ExpVar^10) - 17/(192*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar))*z2) + sinf^2*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (-1185/(256*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (31/(48*HarmonicSums`Private`ExpVar^10) - 17/(192*HarmonicSums`Private`ExpVar^8) + 1/(48*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^2) - 1/(24*HarmonicSums`Private`ExpVar)) + ln2*((-1)^HarmonicSums`Private`ExpVar* (32833/(7680*HarmonicSums`Private`ExpVar^10) + 38279/(8960*HarmonicSums`Private`ExpVar^9) - 937/(2688*HarmonicSums`Private`ExpVar^8) - 1231/(1920*HarmonicSums`Private`ExpVar^7) + 37/(1920*HarmonicSums`Private`ExpVar^6) + 31/(192*HarmonicSums`Private`ExpVar^5) + 5/(96*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2)) + ln2*((-1)^HarmonicSums`Private`ExpVar* (-4477769/(322560*HarmonicSums`Private`ExpVar^10) - 3385/(10752*HarmonicSums`Private`ExpVar^9) + 1013/(720*HarmonicSums`Private`ExpVar^8) + 1169/(5760*HarmonicSums`Private`ExpVar^7) - 43/(384*HarmonicSums`Private`ExpVar^6) - 53/(192*HarmonicSums`Private`ExpVar^5) + 23/(96*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (32833/(7680*HarmonicSums`Private`ExpVar^10) + 38279/(8960*HarmonicSums`Private`ExpVar^9) - 937/(2688*HarmonicSums`Private`ExpVar^8) - 1231/(1920*HarmonicSums`Private`ExpVar^7) + 37/(1920*HarmonicSums`Private`ExpVar^6) + 31/(192*HarmonicSums`Private`ExpVar^5) + 5/(96*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (279/(160*HarmonicSums`Private`ExpVar^10) - 153/(640*HarmonicSums`Private`ExpVar^8) + 9/(160*HarmonicSums`Private`ExpVar^6) - 9/(320*HarmonicSums`Private`ExpVar^4) + 9/(160*HarmonicSums`Private`ExpVar^2) - 9/(80*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (-395/(64*HarmonicSums`Private`ExpVar^10) - 119/(96*HarmonicSums`Private`ExpVar^9) + 49/(64*HarmonicSums`Private`ExpVar^8) + 5/(24*HarmonicSums`Private`ExpVar^7) - 5/(32*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2))*z3) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (319181/(53760*HarmonicSums`Private`ExpVar^10) - 232189/(80640*HarmonicSums`Private`ExpVar^9) - 19201/(23040*HarmonicSums`Private`ExpVar^8) + 3691/(11520*HarmonicSums`Private`ExpVar^7) + 35/(192*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^5) - 5/(32*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) - 119/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 3/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (31/(24*HarmonicSums`Private`ExpVar^10) - 17/(96*HarmonicSums`Private`ExpVar^8) + 1/(24*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar))*z3) + sinf*((-1)^HarmonicSums`Private`ExpVar*ln2^3* (-395/(128*HarmonicSums`Private`ExpVar^10) - 119/(192*HarmonicSums`Private`ExpVar^9) + 49/(128*HarmonicSums`Private`ExpVar^8) + 5/(48*HarmonicSums`Private`ExpVar^7) - 5/(64*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar*ln2^4* (31/(96*HarmonicSums`Private`ExpVar^10) - 17/(384*HarmonicSums`Private`ExpVar^8) + 1/(96*HarmonicSums`Private`ExpVar^6) - 1/(192*HarmonicSums`Private`ExpVar^4) + 1/(96*HarmonicSums`Private`ExpVar^2) - 1/(48*HarmonicSums`Private`ExpVar)) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (32833/(7680*HarmonicSums`Private`ExpVar^10) + 38279/(8960*HarmonicSums`Private`ExpVar^9) - 937/(2688*HarmonicSums`Private`ExpVar^8) - 1231/(1920*HarmonicSums`Private`ExpVar^7) + 37/(1920*HarmonicSums`Private`ExpVar^6) + 31/(192*HarmonicSums`Private`ExpVar^5) + 5/(96*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (31/(16*HarmonicSums`Private`ExpVar^10) - 17/(64*HarmonicSums`Private`ExpVar^8) + 1/(16*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2) + ln2*((-1)^HarmonicSums`Private`ExpVar* (319181/(26880*HarmonicSums`Private`ExpVar^10) - 232189/(40320*HarmonicSums`Private`ExpVar^9) - 19201/(11520*HarmonicSums`Private`ExpVar^8) + 3691/(5760*HarmonicSums`Private`ExpVar^7) + 35/(96*HarmonicSums`Private`ExpVar^6) - 1/(48*HarmonicSums`Private`ExpVar^5) - 5/(16*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) - 119/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) + 5/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (31/(12*HarmonicSums`Private`ExpVar^10) - 17/(48*HarmonicSums`Private`ExpVar^8) + 1/(12*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar))*z3)), S[-1, 1, 1, 1, 1, 1, HarmonicSums`Private`ExpVar] :> -li6half + (-1)^HarmonicSums`Private`ExpVar* (-699779/(193536*HarmonicSums`Private`ExpVar^10) - 8501/(4608*HarmonicSums`Private`ExpVar^9) + 1177/(7680*HarmonicSums`Private`ExpVar^8) + 569/(3840*HarmonicSums`Private`ExpVar^7) + 31/(144*HarmonicSums`Private`ExpVar^6) - 73/(320*HarmonicSums`Private`ExpVar^5) + 7/(96*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* (395/(512*HarmonicSums`Private`ExpVar^10) + 119/(768*HarmonicSums`Private`ExpVar^9) - 49/(512*HarmonicSums`Private`ExpVar^8) - 5/(192*HarmonicSums`Private`ExpVar^7) + 5/(256*HarmonicSums`Private`ExpVar^6) + 1/(128*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) - 1/(192*HarmonicSums`Private`ExpVar^3) + 1/(96*HarmonicSums`Private`ExpVar^2))*sinf^4 + (-1)^HarmonicSums`Private`ExpVar* (-31/(480*HarmonicSums`Private`ExpVar^10) + 17/(1920*HarmonicSums`Private`ExpVar^8) - 1/(480*HarmonicSums`Private`ExpVar^6) + 1/(960*HarmonicSums`Private`ExpVar^4) - 1/(480*HarmonicSums`Private`ExpVar^2) + 1/(240*HarmonicSums`Private`ExpVar))*sinf^5 + (-1)^HarmonicSums`Private`ExpVar* (2133/(512*HarmonicSums`Private`ExpVar^10) + 1071/(1280*HarmonicSums`Private`ExpVar^9) - 1323/(2560*HarmonicSums`Private`ExpVar^8) - 9/(64*HarmonicSums`Private`ExpVar^7) + 27/(256*HarmonicSums`Private`ExpVar^6) + 27/(640*HarmonicSums`Private`ExpVar^5) - 27/(640*HarmonicSums`Private`ExpVar^4) - 9/(320*HarmonicSums`Private`ExpVar^3) + 9/(160*HarmonicSums`Private`ExpVar^2))*z2^2 + sinf^3*((-1)^HarmonicSums`Private`ExpVar* (-32833/(23040*HarmonicSums`Private`ExpVar^10) - 38279/(26880*HarmonicSums`Private`ExpVar^9) + 937/(8064*HarmonicSums`Private`ExpVar^8) + 1231/(5760*HarmonicSums`Private`ExpVar^7) - 37/(5760*HarmonicSums`Private`ExpVar^6) - 31/(576*HarmonicSums`Private`ExpVar^5) - 5/(288*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(48*HarmonicSums`Private`ExpVar^10) + 17/(192*HarmonicSums`Private`ExpVar^8) - 1/(48*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^2) + 1/(24*HarmonicSums`Private`ExpVar))*z2) + (-1)^HarmonicSums`Private`ExpVar* (-32833/(11520*HarmonicSums`Private`ExpVar^10) - 38279/(13440*HarmonicSums`Private`ExpVar^9) + 937/(4032*HarmonicSums`Private`ExpVar^8) + 1231/(2880*HarmonicSums`Private`ExpVar^7) - 37/(2880*HarmonicSums`Private`ExpVar^6) - 31/(288*HarmonicSums`Private`ExpVar^5) - 5/(144*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2))*z3 + sinf*((-1)^HarmonicSums`Private`ExpVar* (4477769/(322560*HarmonicSums`Private`ExpVar^10) + 3385/(10752*HarmonicSums`Private`ExpVar^9) - 1013/(720*HarmonicSums`Private`ExpVar^8) - 1169/(5760*HarmonicSums`Private`ExpVar^7) + 43/(384*HarmonicSums`Private`ExpVar^6) + 53/(192*HarmonicSums`Private`ExpVar^5) - 23/(96*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-32833/(7680*HarmonicSums`Private`ExpVar^10) - 38279/(8960*HarmonicSums`Private`ExpVar^9) + 937/(2688*HarmonicSums`Private`ExpVar^8) + 1231/(1920*HarmonicSums`Private`ExpVar^7) - 37/(1920*HarmonicSums`Private`ExpVar^6) - 31/(192*HarmonicSums`Private`ExpVar^5) - 5/(96*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-279/(160*HarmonicSums`Private`ExpVar^10) + 153/(640*HarmonicSums`Private`ExpVar^8) - 9/(160*HarmonicSums`Private`ExpVar^6) + 9/(320*HarmonicSums`Private`ExpVar^4) - 9/(160*HarmonicSums`Private`ExpVar^2) + 9/(80*HarmonicSums`Private`ExpVar))*z2^2 + (-1)^HarmonicSums`Private`ExpVar* (395/(64*HarmonicSums`Private`ExpVar^10) + 119/(96*HarmonicSums`Private`ExpVar^9) - 49/(64*HarmonicSums`Private`ExpVar^8) - 5/(24*HarmonicSums`Private`ExpVar^7) + 5/(32*HarmonicSums`Private`ExpVar^6) + 1/(16*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2))*z3) + z2*((-1)^HarmonicSums`Private`ExpVar* (-319181/(53760*HarmonicSums`Private`ExpVar^10) + 232189/(80640*HarmonicSums`Private`ExpVar^9) + 19201/(23040*HarmonicSums`Private`ExpVar^8) - 3691/(11520*HarmonicSums`Private`ExpVar^7) - 35/(192*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^5) + 5/(32*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar))*z3) + sinf^2*((-1)^HarmonicSums`Private`ExpVar* (-319181/(53760*HarmonicSums`Private`ExpVar^10) + 232189/(80640*HarmonicSums`Private`ExpVar^9) + 19201/(23040*HarmonicSums`Private`ExpVar^8) - 3691/(11520*HarmonicSums`Private`ExpVar^7) - 35/(192*HarmonicSums`Private`ExpVar^6) + 1/(96*HarmonicSums`Private`ExpVar^5) + 5/(32*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) + 119/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) - 5/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-31/(24*HarmonicSums`Private`ExpVar^10) + 17/(96*HarmonicSums`Private`ExpVar^8) - 1/(24*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar))*z3) + (-1)^HarmonicSums`Private`ExpVar* (-31/(20*HarmonicSums`Private`ExpVar^10) + 17/(80*HarmonicSums`Private`ExpVar^8) - 1/(20*HarmonicSums`Private`ExpVar^6) + 1/(40*HarmonicSums`Private`ExpVar^4) - 1/(20*HarmonicSums`Private`ExpVar^2) + 1/(10*HarmonicSums`Private`ExpVar))*z5, S[1, -1, -1, -1, -1, -1, HarmonicSums`Private`ExpVar] :> -3*li6half - ln2^6/90 + (-1)^HarmonicSums`Private`ExpVar* (409861/(2580480*HarmonicSums`Private`ExpVar^10) + 16283/(5120*HarmonicSums`Private`ExpVar^9) - 21637/(92160*HarmonicSums`Private`ExpVar^8) - 793/(1024*HarmonicSums`Private`ExpVar^7) + 793/(1536*HarmonicSums`Private`ExpVar^6) - 17/(96*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4)) + (3*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-395/(512*HarmonicSums`Private`ExpVar^10) + 51/(256*HarmonicSums`Private`ExpVar^9) + 49/(512*HarmonicSums`Private`ExpVar^8) - 7/(192*HarmonicSums`Private`ExpVar^7) - 5/(256*HarmonicSums`Private`ExpVar^6) + 5/(384*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^3) + 1/(96*HarmonicSums`Private`ExpVar^2)) - z2/48) + (-1)^HarmonicSums`Private`ExpVar* (81883/(14336*HarmonicSums`Private`ExpVar^10) - 398887/(107520*HarmonicSums`Private`ExpVar^9) - 8813/(15360*HarmonicSums`Private`ExpVar^8) + 5251/(7680*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) - 121/(384*HarmonicSums`Private`ExpVar^5) + 13/(64*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-2133/(512*HarmonicSums`Private`ExpVar^10) + 1377/(1280*HarmonicSums`Private`ExpVar^9) + 1323/(2560*HarmonicSums`Private`ExpVar^8) - 63/(320*HarmonicSums`Private`ExpVar^7) - 27/(256*HarmonicSums`Private`ExpVar^6) + 9/(128*HarmonicSums`Private`ExpVar^5) + 27/(640*HarmonicSums`Private`ExpVar^4) - 27/(320*HarmonicSums`Private`ExpVar^3) + 9/(160*HarmonicSums`Private`ExpVar^2))*z2^2 + (34*z2^3)/35 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (81883/(14336*HarmonicSums`Private`ExpVar^10) - 398887/(107520*HarmonicSums`Private`ExpVar^9) - 8813/(15360*HarmonicSums`Private`ExpVar^8) + 5251/(7680*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) - 121/(384*HarmonicSums`Private`ExpVar^5) + 13/(64*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) + 153/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (3*z2^2)/8) + ln2^3*(-2071/(46080*HarmonicSums`Private`ExpVar^10) - 1973/(89600*HarmonicSums`Private`ExpVar^9) + 1745/(129024*HarmonicSums`Private`ExpVar^8) + 8251/(846720*HarmonicSums`Private`ExpVar^7) - 121/(11520*HarmonicSums`Private`ExpVar^6) - 757/(86400*HarmonicSums`Private`ExpVar^5) + 79/(2304*HarmonicSums`Private`ExpVar^4) - 49/(864*HarmonicSums`Private`ExpVar^3) + 7/(96*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar) - (5*z3)/12) + (-2071/(30720*HarmonicSums`Private`ExpVar^10) - 5919/(179200*HarmonicSums`Private`ExpVar^9) + 1745/(86016*HarmonicSums`Private`ExpVar^8) + 8251/(564480*HarmonicSums`Private`ExpVar^7) - 121/(7680*HarmonicSums`Private`ExpVar^6) - 757/(57600*HarmonicSums`Private`ExpVar^5) + 79/(1536*HarmonicSums`Private`ExpVar^4) - 49/(576*HarmonicSums`Private`ExpVar^3) + 7/(64*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z3 - (27*z3^2)/64 + ln2*(5751893/(9216000*HarmonicSums`Private`ExpVar^10) + 377801/(1658880*HarmonicSums`Private`ExpVar^9) - 3651293/(15482880*HarmonicSums`Private`ExpVar^8) - 16439/(161280*HarmonicSums`Private`ExpVar^7) + 11117/(34560*HarmonicSums`Private`ExpVar^6) - 3983/(11520*HarmonicSums`Private`ExpVar^5) + 401/(1536*HarmonicSums`Private`ExpVar^4) - 11/(72*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) + z2*(-2071/(15360*HarmonicSums`Private`ExpVar^10) - 5919/(89600*HarmonicSums`Private`ExpVar^9) + 1745/(43008*HarmonicSums`Private`ExpVar^8) + 8251/(282240*HarmonicSums`Private`ExpVar^7) - 121/(3840*HarmonicSums`Private`ExpVar^6) - 757/(28800*HarmonicSums`Private`ExpVar^5) + 79/(768*HarmonicSums`Private`ExpVar^4) - 49/(288*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) - (9*z3)/8) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) + 153/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z3 - 2*z5) + sinf*(-(ln2^5/120) - (ln2^3*z2)/12 - (9*ln2*z2^2)/40 - (ln2^2*z3)/8 - (z2*z3)/8 - (3*z5)/16), S[1, -1, -1, -1, -1, 1, HarmonicSums`Private`ExpVar] :> -3*li6half - ln2^6/90 + 146287307/(2903040000*HarmonicSums`Private`ExpVar^ 10) + 554424881/(1045094400*HarmonicSums`Private`ExpVar^9) - 48643199/(3251404800*HarmonicSums`Private`ExpVar^8) - 16167169/(67737600*HarmonicSums`Private`ExpVar^7) + 437087/(4147200*HarmonicSums`Private`ExpVar^6) + 4847/(43200*HarmonicSums`Private`ExpVar^5) - 349/(1536*HarmonicSums`Private`ExpVar^4) + 187/(864*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (3*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-395/(512*HarmonicSums`Private`ExpVar^10) + 51/(256*HarmonicSums`Private`ExpVar^9) + 49/(512*HarmonicSums`Private`ExpVar^8) - 7/(192*HarmonicSums`Private`ExpVar^7) - 5/(256*HarmonicSums`Private`ExpVar^6) + 5/(384*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^3) + 1/(96*HarmonicSums`Private`ExpVar^2)) - z2/48) + (-1)^HarmonicSums`Private`ExpVar* (-81883/(14336*HarmonicSums`Private`ExpVar^10) + 398887/(107520*HarmonicSums`Private`ExpVar^9) + 8813/(15360*HarmonicSums`Private`ExpVar^8) - 5251/(7680*HarmonicSums`Private`ExpVar^7) - 5/(64*HarmonicSums`Private`ExpVar^6) + 121/(384*HarmonicSums`Private`ExpVar^5) - 13/(64*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar* (4503/(512*HarmonicSums`Private`ExpVar^10) - 2907/(1280*HarmonicSums`Private`ExpVar^9) - 2793/(2560*HarmonicSums`Private`ExpVar^8) + 133/(320*HarmonicSums`Private`ExpVar^7) + 57/(256*HarmonicSums`Private`ExpVar^6) - 19/(128*HarmonicSums`Private`ExpVar^5) - 57/(640*HarmonicSums`Private`ExpVar^4) + 57/(320*HarmonicSums`Private`ExpVar^3) - 19/(160*HarmonicSums`Private`ExpVar^2))*z2^2 - (6*z2^3)/35 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (81883/(14336*HarmonicSums`Private`ExpVar^10) - 398887/(107520*HarmonicSums`Private`ExpVar^9) - 8813/(15360*HarmonicSums`Private`ExpVar^8) + 5251/(7680*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) - 121/(384*HarmonicSums`Private`ExpVar^5) + 13/(64*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) + 153/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (3*z2^2)/8) + ln2^3*(-2071/(46080*HarmonicSums`Private`ExpVar^10) - 1973/(89600*HarmonicSums`Private`ExpVar^9) + 1745/(129024*HarmonicSums`Private`ExpVar^8) + 8251/(846720*HarmonicSums`Private`ExpVar^7) - 121/(11520*HarmonicSums`Private`ExpVar^6) - 757/(86400*HarmonicSums`Private`ExpVar^5) + 79/(2304*HarmonicSums`Private`ExpVar^4) - 49/(864*HarmonicSums`Private`ExpVar^3) + 7/(96*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar) - (5*z3)/12) + (14497/(30720*HarmonicSums`Private`ExpVar^10) + 5919/(25600*HarmonicSums`Private`ExpVar^9) - 1745/(12288*HarmonicSums`Private`ExpVar^8) - 8251/(80640*HarmonicSums`Private`ExpVar^7) + 847/(7680*HarmonicSums`Private`ExpVar^6) + 5299/(57600*HarmonicSums`Private`ExpVar^5) - 553/(1536*HarmonicSums`Private`ExpVar^4) + 343/(576*HarmonicSums`Private`ExpVar^3) - 49/(64*HarmonicSums`Private`ExpVar^2) + 7/(8*HarmonicSums`Private`ExpVar))*z3 + (101*z3^2)/64 + ln2*(z2*(-2071/(15360*HarmonicSums`Private`ExpVar^10) - 5919/(89600*HarmonicSums`Private`ExpVar^9) + 1745/(43008*HarmonicSums`Private`ExpVar^8) + 8251/(282240*HarmonicSums`Private`ExpVar^7) - 121/(3840*HarmonicSums`Private`ExpVar^6) - 757/(28800*HarmonicSums`Private`ExpVar^5) + 79/(768*HarmonicSums`Private`ExpVar^4) - 49/(288*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) - (9*z3)/8) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) + 153/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z3) + sinf*(-(ln2^5/120) - 5751893/(9216000*HarmonicSums`Private`ExpVar^10) - 377801/(1658880*HarmonicSums`Private`ExpVar^9) + 3651293/(15482880*HarmonicSums`Private`ExpVar^8) + 16439/(161280*HarmonicSums`Private`ExpVar^7) - 11117/(34560*HarmonicSums`Private`ExpVar^6) + 3983/(11520*HarmonicSums`Private`ExpVar^5) - 401/(1536*HarmonicSums`Private`ExpVar^4) + 11/(72*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) - (ln2^3*z2)/12 - (9*ln2*z2^2)/40 - (ln2^2*z3)/8 - (z2*z3)/8 + (29*z5)/16), S[1, -1, -1, -1, 1, -1, HarmonicSums`Private`ExpVar] :> (-5*ln2^6)/72 + (-1)^HarmonicSums`Private`ExpVar*li4half* (-3555/(64*HarmonicSums`Private`ExpVar^10) + 459/(32*HarmonicSums`Private`ExpVar^9) + 441/(64*HarmonicSums`Private`ExpVar^8) - 21/(8*HarmonicSums`Private`ExpVar^7) - 45/(32*HarmonicSums`Private`ExpVar^6) + 15/(16*HarmonicSums`Private`ExpVar^5) + 9/(16*HarmonicSums`Private`ExpVar^4) - 9/(8*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2)) - 1612687/(2211840*HarmonicSums`Private`ExpVar^10) + 50136161/(348364800*HarmonicSums`Private`ExpVar^9) + 561941/(2064384*HarmonicSums`Private`ExpVar^8) - 698129/(2257920*HarmonicSums`Private`ExpVar^7) + 9091/(46080*HarmonicSums`Private`ExpVar^6) - 5293/(57600*HarmonicSums`Private`ExpVar^5) + 49/(1536*HarmonicSums`Private`ExpVar^4) - 1/(144*HarmonicSums`Private`ExpVar^3) + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-395/(128*HarmonicSums`Private`ExpVar^10) + 51/(64*HarmonicSums`Private`ExpVar^9) + 49/(128*HarmonicSums`Private`ExpVar^8) - 7/(48*HarmonicSums`Private`ExpVar^7) - 5/(64*HarmonicSums`Private`ExpVar^6) + 5/(96*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) + (7*z2)/24) + (-1)^HarmonicSums`Private`ExpVar* (711/(32*HarmonicSums`Private`ExpVar^10) - 459/(80*HarmonicSums`Private`ExpVar^9) - 441/(160*HarmonicSums`Private`ExpVar^8) + 21/(20*HarmonicSums`Private`ExpVar^7) + 9/(16*HarmonicSums`Private`ExpVar^6) - 3/(8*HarmonicSums`Private`ExpVar^5) - 9/(40*HarmonicSums`Private`ExpVar^4) + 9/(20*HarmonicSums`Private`ExpVar^3) - 3/(10*HarmonicSums`Private`ExpVar^2))*z2^2 - (29*z2^3)/60 + ln2^2*((-3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (-81883/(14336*HarmonicSums`Private`ExpVar^10) + 398887/(107520*HarmonicSums`Private`ExpVar^9) + 8813/(15360*HarmonicSums`Private`ExpVar^8) - 5251/(7680*HarmonicSums`Private`ExpVar^7) - 5/(64*HarmonicSums`Private`ExpVar^6) + 121/(384*HarmonicSums`Private`ExpVar^5) - 13/(64*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) - 153/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (43*z2^2)/40) + ln2^3*(-2071/(46080*HarmonicSums`Private`ExpVar^10) - 1973/(89600*HarmonicSums`Private`ExpVar^9) + 1745/(129024*HarmonicSums`Private`ExpVar^8) + 8251/(846720*HarmonicSums`Private`ExpVar^7) - 121/(11520*HarmonicSums`Private`ExpVar^6) - 757/(86400*HarmonicSums`Private`ExpVar^5) + 79/(2304*HarmonicSums`Private`ExpVar^4) - 49/(864*HarmonicSums`Private`ExpVar^3) + 7/(96*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar) - (31*z3)/24) + (2071/(61440*HarmonicSums`Private`ExpVar^10) + 5919/(358400*HarmonicSums`Private`ExpVar^9) - 1745/(172032*HarmonicSums`Private`ExpVar^8) - 8251/(1128960*HarmonicSums`Private`ExpVar^7) + 121/(15360*HarmonicSums`Private`ExpVar^6) + 757/(115200*HarmonicSums`Private`ExpVar^5) - 79/(3072*HarmonicSums`Private`ExpVar^4) + 49/(1152*HarmonicSums`Private`ExpVar^3) - 7/(128*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3 + (177*z3^2)/128 + ln2*((-1)^HarmonicSums`Private`ExpVar* (3533079/(125440*HarmonicSums`Private`ExpVar^10) - 10346767/(22579200*HarmonicSums`Private`ExpVar^9) - 1455149/(460800*HarmonicSums`Private`ExpVar^8) + 13453/(230400*HarmonicSums`Private`ExpVar^7) + 961/(1536*HarmonicSums`Private`ExpVar^6) - 91/(1152*HarmonicSums`Private`ExpVar^5) - 13/(64*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + z2*(2071/(15360*HarmonicSums`Private`ExpVar^10) + 5919/(89600*HarmonicSums`Private`ExpVar^9) - 1745/(43008*HarmonicSums`Private`ExpVar^8) - 8251/(282240*HarmonicSums`Private`ExpVar^7) + 121/(3840*HarmonicSums`Private`ExpVar^6) + 757/(28800*HarmonicSums`Private`ExpVar^5) - 79/(768*HarmonicSums`Private`ExpVar^4) + 49/(288*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar) - (7*z3)/16) + (-1)^HarmonicSums`Private`ExpVar* (-8295/(512*HarmonicSums`Private`ExpVar^10) + 1071/(256*HarmonicSums`Private`ExpVar^9) + 1029/(512*HarmonicSums`Private`ExpVar^8) - 49/(64*HarmonicSums`Private`ExpVar^7) - 105/(256*HarmonicSums`Private`ExpVar^6) + 35/(128*HarmonicSums`Private`ExpVar^5) + 21/(128*HarmonicSums`Private`ExpVar^4) - 21/(64*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2))*z3) + sinf*(-3*li5half - (13*ln2^5)/120 + (5*ln2^3*z2)/12 + ln2*(-3*li4half + (-1)^HarmonicSums`Private`ExpVar* (-81883/(7168*HarmonicSums`Private`ExpVar^10) + 398887/(53760*HarmonicSums`Private`ExpVar^9) + 8813/(7680*HarmonicSums`Private`ExpVar^8) - 5251/(3840*HarmonicSums`Private`ExpVar^7) - 5/(32*HarmonicSums`Private`ExpVar^6) + 121/(192*HarmonicSums`Private`ExpVar^5) - 13/(32*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (19*z2^2)/40) - (23*ln2^2*z3)/16 - (23*z2*z3)/16 + (375*z5)/64), S[1, -1, -1, -1, 1, 1, HarmonicSums`Private`ExpVar] :> (-5*ln2^6)/72 + (-1)^HarmonicSums`Private`ExpVar* (35087794667/(2528870400*HarmonicSums`Private`ExpVar^10) + 24137756603/(9483264000*HarmonicSums`Private`ExpVar^9) - 36292337/(27648000*HarmonicSums`Private`ExpVar^8) - 4137611/(13824000*HarmonicSums`Private`ExpVar^7) + 7871/(18432*HarmonicSums`Private`ExpVar^6) - 2311/(6912*HarmonicSums`Private`ExpVar^5) + 33/(128*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-3555/(64*HarmonicSums`Private`ExpVar^10) + 459/(32*HarmonicSums`Private`ExpVar^9) + 441/(64*HarmonicSums`Private`ExpVar^8) - 21/(8*HarmonicSums`Private`ExpVar^7) - 45/(32*HarmonicSums`Private`ExpVar^6) + 15/(16*HarmonicSums`Private`ExpVar^5) + 9/(16*HarmonicSums`Private`ExpVar^4) - 9/(8*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (81883/(14336*HarmonicSums`Private`ExpVar^10) - 398887/(107520*HarmonicSums`Private`ExpVar^9) - 8813/(15360*HarmonicSums`Private`ExpVar^8) + 5251/(7680*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) - 121/(384*HarmonicSums`Private`ExpVar^5) + 13/(64*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3))*sinf^2 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-395/(128*HarmonicSums`Private`ExpVar^10) + 51/(64*HarmonicSums`Private`ExpVar^9) + 49/(128*HarmonicSums`Private`ExpVar^8) - 7/(48*HarmonicSums`Private`ExpVar^7) - 5/(64*HarmonicSums`Private`ExpVar^6) + 5/(96*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) + (7*z2)/24) + (-1)^HarmonicSums`Private`ExpVar* (81883/(14336*HarmonicSums`Private`ExpVar^10) - 398887/(107520*HarmonicSums`Private`ExpVar^9) - 8813/(15360*HarmonicSums`Private`ExpVar^8) + 5251/(7680*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) - 121/(384*HarmonicSums`Private`ExpVar^5) + 13/(64*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3))*z2 + (29*z2^3)/60 + ln2^2*((-3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) - 153/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + (43*z2^2)/40) + ln2^3*(-2071/(46080*HarmonicSums`Private`ExpVar^10) - 1973/(89600*HarmonicSums`Private`ExpVar^9) + 1745/(129024*HarmonicSums`Private`ExpVar^8) + 8251/(846720*HarmonicSums`Private`ExpVar^7) - 121/(11520*HarmonicSums`Private`ExpVar^6) - 757/(86400*HarmonicSums`Private`ExpVar^5) + 79/(2304*HarmonicSums`Private`ExpVar^4) - 49/(864*HarmonicSums`Private`ExpVar^3) + 7/(96*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar) - (31*z3)/24) + (-14497/(61440*HarmonicSums`Private`ExpVar^10) - 5919/(51200*HarmonicSums`Private`ExpVar^9) + 1745/(24576*HarmonicSums`Private`ExpVar^8) + 8251/(161280*HarmonicSums`Private`ExpVar^7) - 847/(15360*HarmonicSums`Private`ExpVar^6) - 5299/(115200*HarmonicSums`Private`ExpVar^5) + 553/(3072*HarmonicSums`Private`ExpVar^4) - 343/(1152*HarmonicSums`Private`ExpVar^3) + 49/(128*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3 - (79*z3^2)/128 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-8295/(512*HarmonicSums`Private`ExpVar^10) + 1071/(256*HarmonicSums`Private`ExpVar^9) + 1029/(512*HarmonicSums`Private`ExpVar^8) - 49/(64*HarmonicSums`Private`ExpVar^7) - 105/(256*HarmonicSums`Private`ExpVar^6) + 35/(128*HarmonicSums`Private`ExpVar^5) + 21/(128*HarmonicSums`Private`ExpVar^4) - 21/(64*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2))*z3 + z2*(2071/(15360*HarmonicSums`Private`ExpVar^10) + 5919/(89600*HarmonicSums`Private`ExpVar^9) - 1745/(43008*HarmonicSums`Private`ExpVar^8) - 8251/(282240*HarmonicSums`Private`ExpVar^7) + 121/(3840*HarmonicSums`Private`ExpVar^6) + 757/(28800*HarmonicSums`Private`ExpVar^5) - 79/(768*HarmonicSums`Private`ExpVar^4) + 49/(288*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar) + (25*z3)/16) - (11*z5)/2) + sinf*(-3*li5half - (13*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar* (-3533079/(125440*HarmonicSums`Private`ExpVar^10) + 10346767/(22579200*HarmonicSums`Private`ExpVar^9) + 1455149/(460800*HarmonicSums`Private`ExpVar^8) - 13453/(230400*HarmonicSums`Private`ExpVar^7) - 961/(1536*HarmonicSums`Private`ExpVar^6) + 91/(1152*HarmonicSums`Private`ExpVar^5) + 13/(64*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (5*ln2^3*z2)/12 + ln2*(-3*li4half + (19*z2^2)/40) - (23*ln2^2*z3)/16 + (9*z2*z3)/16 + (23*z5)/64), S[1, -1, -1, 1, -1, -1, HarmonicSums`Private`ExpVar] :> -9*li6half - (7*ln2^6)/360 + 1025604887/ (3870720000*HarmonicSums`Private`ExpVar^10) + 17868793/(77414400*HarmonicSums`Private`ExpVar^9) - 336408157/(6502809600*HarmonicSums`Private`ExpVar^8) - 383729/(1382400*HarmonicSums`Private`ExpVar^7) + 1771253/(4147200*HarmonicSums`Private`ExpVar^6) - 9061/(23040*HarmonicSums`Private`ExpVar^5) + 2555/(9216*HarmonicSums`Private`ExpVar^4) - 5/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - (15*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-395/(512*HarmonicSums`Private`ExpVar^10) + 51/(256*HarmonicSums`Private`ExpVar^9) + 49/(512*HarmonicSums`Private`ExpVar^8) - 7/(192*HarmonicSums`Private`ExpVar^7) - 5/(256*HarmonicSums`Private`ExpVar^6) + 5/(384*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^3) + 1/(96*HarmonicSums`Private`ExpVar^2)) + (5*z2)/48) + (-10819/(89600*HarmonicSums`Private`ExpVar^10) - 13221301/(63504000*HarmonicSums`Private`ExpVar^9) + 46163/(2257920*HarmonicSums`Private`ExpVar^8) + 4812571/(59270400*HarmonicSums`Private`ExpVar^7) - 839/(57600*HarmonicSums`Private`ExpVar^6) - 15079/(216000*HarmonicSums`Private`ExpVar^5) + 37/(576*HarmonicSums`Private`ExpVar^4) + 11/(216*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))* z2 + (-1)^HarmonicSums`Private`ExpVar* (1185/(512*HarmonicSums`Private`ExpVar^10) - 153/(256*HarmonicSums`Private`ExpVar^9) - 147/(512*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^7) + 15/(256*HarmonicSums`Private`ExpVar^6) - 5/(128*HarmonicSums`Private`ExpVar^5) - 3/(128*HarmonicSums`Private`ExpVar^4) + 3/(64*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2))*z2^2 + (27*z2^3)/35 + ln2^2*(-10819/(89600*HarmonicSums`Private`ExpVar^10) - 13221301/(63504000*HarmonicSums`Private`ExpVar^9) + 46163/(2257920*HarmonicSums`Private`ExpVar^8) + 4812571/(59270400*HarmonicSums`Private`ExpVar^7) - 839/(57600*HarmonicSums`Private`ExpVar^6) - 15079/(216000*HarmonicSums`Private`ExpVar^5) + 37/(576*HarmonicSums`Private`ExpVar^4) + 11/(216*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) - 153/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (6*z2^2)/5) + ln2^3*(2071/(23040*HarmonicSums`Private`ExpVar^10) + 1973/(44800*HarmonicSums`Private`ExpVar^9) - 1745/(64512*HarmonicSums`Private`ExpVar^8) - 8251/(423360*HarmonicSums`Private`ExpVar^7) + 121/(5760*HarmonicSums`Private`ExpVar^6) + 757/(43200*HarmonicSums`Private`ExpVar^5) - 79/(1152*HarmonicSums`Private`ExpVar^4) + 49/(432*HarmonicSums`Private`ExpVar^3) - 7/(48*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar) - (7*z3)/24) + (-14497/(61440*HarmonicSums`Private`ExpVar^10) - 5919/(51200*HarmonicSums`Private`ExpVar^9) + 1745/(24576*HarmonicSums`Private`ExpVar^8) + 8251/(161280*HarmonicSums`Private`ExpVar^7) - 847/(15360*HarmonicSums`Private`ExpVar^6) - 5299/(115200*HarmonicSums`Private`ExpVar^5) + 553/(3072*HarmonicSums`Private`ExpVar^4) - 343/(1152*HarmonicSums`Private`ExpVar^3) + 49/(128*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3 + (229*z3^2)/128 + ln2*((-1)^HarmonicSums`Private`ExpVar* (7009/(3072*HarmonicSums`Private`ExpVar^10) + 3513/(1024*HarmonicSums`Private`ExpVar^9) - 2101/(3072*HarmonicSums`Private`ExpVar^8) - 301/(512*HarmonicSums`Private`ExpVar^7) + 121/(256*HarmonicSums`Private`ExpVar^6) - 11/(64*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4)) + z2*(2071/(15360*HarmonicSums`Private`ExpVar^10) + 5919/(89600*HarmonicSums`Private`ExpVar^9) - 1745/(43008*HarmonicSums`Private`ExpVar^8) - 8251/(282240*HarmonicSums`Private`ExpVar^7) + 121/(3840*HarmonicSums`Private`ExpVar^6) + 757/(28800*HarmonicSums`Private`ExpVar^5) - 79/(768*HarmonicSums`Private`ExpVar^4) + 49/(288*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar) - (7*z3)/16) + (-1)^HarmonicSums`Private`ExpVar* (1185/(512*HarmonicSums`Private`ExpVar^10) - 153/(256*HarmonicSums`Private`ExpVar^9) - 147/(512*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^7) + 15/(256*HarmonicSums`Private`ExpVar^6) - 5/(128*HarmonicSums`Private`ExpVar^5) - 3/(128*HarmonicSums`Private`ExpVar^4) + 3/(64*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2))*z3) + sinf*(3*li5half - ln2^5/30 + (ln2^3*z2)/6 + (6*ln2*z2^2)/5 + ln2^2*(2071/(15360*HarmonicSums`Private`ExpVar^10) + 5919/(89600*HarmonicSums`Private`ExpVar^9) - 1745/(43008*HarmonicSums`Private`ExpVar^8) - 8251/(282240*HarmonicSums`Private`ExpVar^7) + 121/(3840*HarmonicSums`Private`ExpVar^6) + 757/(28800*HarmonicSums`Private`ExpVar^5) - 79/(768*HarmonicSums`Private`ExpVar^4) + 49/(288*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar) - (7*z3)/16) + z2*(2071/(15360*HarmonicSums`Private`ExpVar^10) + 5919/(89600*HarmonicSums`Private`ExpVar^9) - 1745/(43008*HarmonicSums`Private`ExpVar^8) - 8251/(282240*HarmonicSums`Private`ExpVar^7) + 121/(3840*HarmonicSums`Private`ExpVar^6) + 757/(28800*HarmonicSums`Private`ExpVar^5) - 79/(768*HarmonicSums`Private`ExpVar^4) + 49/(288*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar) - (7*z3)/16) - (81*z5)/64), S[1, -1, -1, 1, -1, 1, HarmonicSums`Private`ExpVar] :> -9*li6half - (7*ln2^6)/360 + (-1)^HarmonicSums`Private`ExpVar* (-920933/(147456*HarmonicSums`Private`ExpVar^10) + 46091/(12288*HarmonicSums`Private`ExpVar^9) + 14567/(36864*HarmonicSums`Private`ExpVar^8) - 3977/(6144*HarmonicSums`Private`ExpVar^7) + 161/(1024*HarmonicSums`Private`ExpVar^6) + 7/(384*HarmonicSums`Private`ExpVar^5) - 1/(64*HarmonicSums`Private`ExpVar^4)) - (15*s6)/4 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-395/(512*HarmonicSums`Private`ExpVar^10) + 51/(256*HarmonicSums`Private`ExpVar^9) + 49/(512*HarmonicSums`Private`ExpVar^8) - 7/(192*HarmonicSums`Private`ExpVar^7) - 5/(256*HarmonicSums`Private`ExpVar^6) + 5/(384*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^3) + 1/(96*HarmonicSums`Private`ExpVar^2)) + (5*z2)/48) + (10819/(89600*HarmonicSums`Private`ExpVar^10) + 13221301/(63504000*HarmonicSums`Private`ExpVar^9) - 46163/(2257920*HarmonicSums`Private`ExpVar^8) - 4812571/(59270400*HarmonicSums`Private`ExpVar^7) + 839/(57600*HarmonicSums`Private`ExpVar^6) + 15079/(216000*HarmonicSums`Private`ExpVar^5) - 37/(576*HarmonicSums`Private`ExpVar^4) - 11/(216*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))* z2 + (-1)^HarmonicSums`Private`ExpVar* (-3555/(512*HarmonicSums`Private`ExpVar^10) + 459/(256*HarmonicSums`Private`ExpVar^9) + 441/(512*HarmonicSums`Private`ExpVar^8) - 21/(64*HarmonicSums`Private`ExpVar^7) - 45/(256*HarmonicSums`Private`ExpVar^6) + 15/(128*HarmonicSums`Private`ExpVar^5) + 9/(128*HarmonicSums`Private`ExpVar^4) - 9/(64*HarmonicSums`Private`ExpVar^3) + 3/(32*HarmonicSums`Private`ExpVar^2))*z2^2 + (13*z2^3)/7 + ln2^2*(-10819/(89600*HarmonicSums`Private`ExpVar^10) - 13221301/(63504000*HarmonicSums`Private`ExpVar^9) + 46163/(2257920*HarmonicSums`Private`ExpVar^8) + 4812571/(59270400*HarmonicSums`Private`ExpVar^7) - 839/(57600*HarmonicSums`Private`ExpVar^6) - 15079/(216000*HarmonicSums`Private`ExpVar^5) + 37/(576*HarmonicSums`Private`ExpVar^4) + 11/(216*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) + (-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) - 153/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (6*z2^2)/5) + ln2^3*(2071/(23040*HarmonicSums`Private`ExpVar^10) + 1973/(44800*HarmonicSums`Private`ExpVar^9) - 1745/(64512*HarmonicSums`Private`ExpVar^8) - 8251/(423360*HarmonicSums`Private`ExpVar^7) + 121/(5760*HarmonicSums`Private`ExpVar^6) + 757/(43200*HarmonicSums`Private`ExpVar^5) - 79/(1152*HarmonicSums`Private`ExpVar^4) + 49/(432*HarmonicSums`Private`ExpVar^3) - 7/(48*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar) - (7*z3)/24) + (2071/(61440*HarmonicSums`Private`ExpVar^10) + 5919/(358400*HarmonicSums`Private`ExpVar^9) - 1745/(172032*HarmonicSums`Private`ExpVar^8) - 8251/(1128960*HarmonicSums`Private`ExpVar^7) + 121/(15360*HarmonicSums`Private`ExpVar^6) + 757/(115200*HarmonicSums`Private`ExpVar^5) - 79/(3072*HarmonicSums`Private`ExpVar^4) + 49/(1152*HarmonicSums`Private`ExpVar^3) - 7/(128*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3 + (165*z3^2)/128 + sinf*(3*li5half - ln2^5/30 + (-1)^HarmonicSums`Private`ExpVar* (-7009/(3072*HarmonicSums`Private`ExpVar^10) - 3513/(1024*HarmonicSums`Private`ExpVar^9) + 2101/(3072*HarmonicSums`Private`ExpVar^8) + 301/(512*HarmonicSums`Private`ExpVar^7) - 121/(256*HarmonicSums`Private`ExpVar^6) + 11/(64*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4)) + (ln2^3*z2)/6 + (6*ln2*z2^2)/5 + ln2^2*(2071/(15360*HarmonicSums`Private`ExpVar^10) + 5919/(89600*HarmonicSums`Private`ExpVar^9) - 1745/(43008*HarmonicSums`Private`ExpVar^8) - 8251/(282240*HarmonicSums`Private`ExpVar^7) + 121/(3840*HarmonicSums`Private`ExpVar^6) + 757/(28800*HarmonicSums`Private`ExpVar^5) - 79/(768*HarmonicSums`Private`ExpVar^4) + 49/(288*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar) - (7*z3)/16) + z2*(-2071/(15360*HarmonicSums`Private`ExpVar^10) - 5919/(89600*HarmonicSums`Private`ExpVar^9) + 1745/(43008*HarmonicSums`Private`ExpVar^8) + 8251/(282240*HarmonicSums`Private`ExpVar^7) - 121/(3840*HarmonicSums`Private`ExpVar^6) - 757/(28800*HarmonicSums`Private`ExpVar^5) + 79/(768*HarmonicSums`Private`ExpVar^4) - 49/(288*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) + (9*z3)/16) - (369*z5)/64) + ln2*(z2*(-2071/(15360*HarmonicSums`Private`ExpVar^10) - 5919/(89600*HarmonicSums`Private`ExpVar^9) + 1745/(43008*HarmonicSums`Private`ExpVar^8) + 8251/(282240*HarmonicSums`Private`ExpVar^7) - 121/(3840*HarmonicSums`Private`ExpVar^6) - 757/(28800*HarmonicSums`Private`ExpVar^5) + 79/(768*HarmonicSums`Private`ExpVar^4) - 49/(288*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) + (9*z3)/16) + (-1)^HarmonicSums`Private`ExpVar* (1185/(512*HarmonicSums`Private`ExpVar^10) - 153/(256*HarmonicSums`Private`ExpVar^9) - 147/(512*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^7) + 15/(256*HarmonicSums`Private`ExpVar^6) - 5/(128*HarmonicSums`Private`ExpVar^5) - 3/(128*HarmonicSums`Private`ExpVar^4) + 3/(64*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2))*z3 - (9*z5)/2), S[1, -1, -1, 1, 1, -1, HarmonicSums`Private`ExpVar] :> -10*li6half + (-1)^HarmonicSums`Private`ExpVar* (-2375/(512*HarmonicSums`Private`ExpVar^10) - 629/(3072*HarmonicSums`Private`ExpVar^9) + 623/(768*HarmonicSums`Private`ExpVar^8) - 275/(768*HarmonicSums`Private`ExpVar^7) + 11/(128*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^5)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(1185/(64*HarmonicSums`Private`ExpVar^10) - 153/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) + 7/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + ln2^2*(li4half/2 + 10819/(89600*HarmonicSums`Private`ExpVar^10) + 13221301/(63504000*HarmonicSums`Private`ExpVar^9) - 46163/(2257920*HarmonicSums`Private`ExpVar^8) - 4812571/(59270400*HarmonicSums`Private`ExpVar^7) + 839/(57600*HarmonicSums`Private`ExpVar^6) + 15079/(216000*HarmonicSums`Private`ExpVar^5) - 37/(576*HarmonicSums`Private`ExpVar^4) - 11/(216*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + ln2^3*(-2071/(46080*HarmonicSums`Private`ExpVar^10) - 1973/(89600*HarmonicSums`Private`ExpVar^9) + 1745/(129024*HarmonicSums`Private`ExpVar^8) + 8251/(846720*HarmonicSums`Private`ExpVar^7) - 121/(11520*HarmonicSums`Private`ExpVar^6) - 757/(86400*HarmonicSums`Private`ExpVar^5) + 79/(2304*HarmonicSums`Private`ExpVar^4) - 49/(864*HarmonicSums`Private`ExpVar^3) + 7/(96*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar)) + ln2*(-2071/(15360*HarmonicSums`Private`ExpVar^10) - 5919/(89600*HarmonicSums`Private`ExpVar^9) + 1745/(43008*HarmonicSums`Private`ExpVar^8) + 8251/(282240*HarmonicSums`Private`ExpVar^7) - 121/(3840*HarmonicSums`Private`ExpVar^6) - 757/(28800*HarmonicSums`Private`ExpVar^5) + 79/(768*HarmonicSums`Private`ExpVar^4) - 49/(288*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*sinf^2 + (-1)^HarmonicSums`Private`ExpVar* (-237/(32*HarmonicSums`Private`ExpVar^10) + 153/(80*HarmonicSums`Private`ExpVar^9) + 147/(160*HarmonicSums`Private`ExpVar^8) - 7/(20*HarmonicSums`Private`ExpVar^7) - 3/(16*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5) + 3/(40*HarmonicSums`Private`ExpVar^4) - 3/(20*HarmonicSums`Private`ExpVar^3) + 1/(10*HarmonicSums`Private`ExpVar^2))*z2^2 + (16*z2^3)/7 + sinf*(4*li5half + ln2*(li4half + 10819/(44800*HarmonicSums`Private`ExpVar^ 10) + 13221301/(31752000*HarmonicSums`Private`ExpVar^9) - 46163/(1128960*HarmonicSums`Private`ExpVar^8) - 4812571/(29635200*HarmonicSums`Private`ExpVar^7) + 839/(28800*HarmonicSums`Private`ExpVar^6) + 15079/(108000*HarmonicSums`Private`ExpVar^5) - 37/(288*HarmonicSums`Private`ExpVar^4) - 11/(108*HarmonicSums`Private`ExpVar^3) + 1/(2*HarmonicSums`Private`ExpVar^2) - HarmonicSums`Private`ExpVar^ (-1)) + ln2^2*(-2071/(15360*HarmonicSums`Private`ExpVar^10) - 5919/(89600*HarmonicSums`Private`ExpVar^9) + 1745/(43008*HarmonicSums`Private`ExpVar^8) + 8251/(282240*HarmonicSums`Private`ExpVar^7) - 121/(3840*HarmonicSums`Private`ExpVar^6) - 757/(28800*HarmonicSums`Private`ExpVar^5) + 79/(768*HarmonicSums`Private`ExpVar^4) - 49/(288*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar)) - 4*z5) + ln2*(2701317643/(5419008000*HarmonicSums`Private`ExpVar^10) - 304595351111/(853493760000*HarmonicSums`Private`ExpVar^9) - 2694932521/(15173222400*HarmonicSums`Private`ExpVar^8) + 809324911/(8297856000*HarmonicSums`Private`ExpVar^7) + 1151233/(6912000*HarmonicSums`Private`ExpVar^6) - 4736833/(17280000*HarmonicSums`Private`ExpVar^5) + 5131/(18432*HarmonicSums`Private`ExpVar^4) - 667/(1728*HarmonicSums`Private`ExpVar^3) + 49/(64*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar) + (-2071/(15360*HarmonicSums`Private`ExpVar^10) - 5919/(89600*HarmonicSums`Private`ExpVar^9) + 1745/(43008*HarmonicSums`Private`ExpVar^8) + 8251/(282240*HarmonicSums`Private`ExpVar^7) - 121/(3840*HarmonicSums`Private`ExpVar^6) - 757/(28800*HarmonicSums`Private`ExpVar^5) + 79/(768*HarmonicSums`Private`ExpVar^4) - 49/(288*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 - 4*z5), S[1, -1, -1, 1, 1, 1, HarmonicSums`Private`ExpVar] :> -10*li6half + (li4half*ln2^2)/2 + (-1)^HarmonicSums`Private`ExpVar*li4half* (1185/(64*HarmonicSums`Private`ExpVar^10) - 153/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) + 7/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2)) + 15466435481773/(20483850240000*HarmonicSums`Private`ExpVar^10) + 176109369281263/(3226206412800000*HarmonicSums`Private`ExpVar^9) - 1125717235703/(6372753408000*HarmonicSums`Private`ExpVar^8) - 645376147573/(5227649280000*HarmonicSums`Private`ExpVar^7) + 5883329/(23040000*HarmonicSums`Private`ExpVar^6) - 234091883/(1555200000*HarmonicSums`Private`ExpVar^5) - 26987/(331776*HarmonicSums`Private`ExpVar^4) + 6715/(15552*HarmonicSums`Private`ExpVar^3) - 65/(64*HarmonicSums`Private`ExpVar^2) + 2/HarmonicSums`Private`ExpVar + (-10819/(89600*HarmonicSums`Private`ExpVar^10) - 13221301/(63504000*HarmonicSums`Private`ExpVar^9) + 46163/(2257920*HarmonicSums`Private`ExpVar^8) + 4812571/(59270400*HarmonicSums`Private`ExpVar^7) - 839/(57600*HarmonicSums`Private`ExpVar^6) - 15079/(216000*HarmonicSums`Private`ExpVar^5) + 37/(576*HarmonicSums`Private`ExpVar^4) + 11/(216*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))* sinf^2 + (2071/(46080*HarmonicSums`Private`ExpVar^10) + 1973/(89600*HarmonicSums`Private`ExpVar^9) - 1745/(129024*HarmonicSums`Private`ExpVar^8) - 8251/(846720*HarmonicSums`Private`ExpVar^7) + 121/(11520*HarmonicSums`Private`ExpVar^6) + 757/(86400*HarmonicSums`Private`ExpVar^5) - 79/(2304*HarmonicSums`Private`ExpVar^4) + 49/(864*HarmonicSums`Private`ExpVar^3) - 7/(96*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar))*sinf^3 + (-10819/(89600*HarmonicSums`Private`ExpVar^10) - 13221301/(63504000*HarmonicSums`Private`ExpVar^9) + 46163/(2257920*HarmonicSums`Private`ExpVar^8) + 4812571/(59270400*HarmonicSums`Private`ExpVar^7) - 839/(57600*HarmonicSums`Private`ExpVar^6) - 15079/(216000*HarmonicSums`Private`ExpVar^5) + 37/(576*HarmonicSums`Private`ExpVar^4) + 11/(216*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))* z2 + sinf*(4*li5half + li4half*ln2 - 2701317643/ (5419008000*HarmonicSums`Private`ExpVar^10) + 304595351111/(853493760000*HarmonicSums`Private`ExpVar^9) + 2694932521/(15173222400*HarmonicSums`Private`ExpVar^8) - 809324911/(8297856000*HarmonicSums`Private`ExpVar^7) - 1151233/(6912000*HarmonicSums`Private`ExpVar^6) + 4736833/(17280000*HarmonicSums`Private`ExpVar^5) - 5131/(18432*HarmonicSums`Private`ExpVar^4) + 667/(1728*HarmonicSums`Private`ExpVar^3) - 49/(64*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar) + (2071/(15360*HarmonicSums`Private`ExpVar^10) + 5919/(89600*HarmonicSums`Private`ExpVar^9) - 1745/(43008*HarmonicSums`Private`ExpVar^8) - 8251/(282240*HarmonicSums`Private`ExpVar^7) + 121/(3840*HarmonicSums`Private`ExpVar^6) + 757/(28800*HarmonicSums`Private`ExpVar^5) - 79/(768*HarmonicSums`Private`ExpVar^4) + 49/(288*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2) + (2071/(23040*HarmonicSums`Private`ExpVar^10) + 1973/(44800*HarmonicSums`Private`ExpVar^9) - 1745/(64512*HarmonicSums`Private`ExpVar^8) - 8251/(423360*HarmonicSums`Private`ExpVar^7) + 121/(5760*HarmonicSums`Private`ExpVar^6) + 757/(43200*HarmonicSums`Private`ExpVar^5) - 79/(1152*HarmonicSums`Private`ExpVar^4) + 49/(432*HarmonicSums`Private`ExpVar^3) - 7/(48*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar))*z3, S[1, -1, 1, -1, -1, -1, HarmonicSums`Private`ExpVar] :> -3*li6half + (37*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar*li4half* (3555/(64*HarmonicSums`Private`ExpVar^10) - 459/(32*HarmonicSums`Private`ExpVar^9) - 441/(64*HarmonicSums`Private`ExpVar^8) + 21/(8*HarmonicSums`Private`ExpVar^7) + 45/(32*HarmonicSums`Private`ExpVar^6) - 15/(16*HarmonicSums`Private`ExpVar^5) - 9/(16*HarmonicSums`Private`ExpVar^4) + 9/(8*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2)) - 2148263/(2211840*HarmonicSums`Private`ExpVar^10) + 200676439/(348364800*HarmonicSums`Private`ExpVar^9) + 2390567/(10321920*HarmonicSums`Private`ExpVar^8) - 259081/(564480*HarmonicSums`Private`ExpVar^7) + 7807/(23040*HarmonicSums`Private`ExpVar^6) - 9797/(57600*HarmonicSums`Private`ExpVar^5) + 95/(1536*HarmonicSums`Private`ExpVar^4) - 1/(72*HarmonicSums`Private`ExpVar^3) - 3*s6 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) - 153/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2)) - (11*z2)/48) + (164039/(307200*HarmonicSums`Private`ExpVar^10) - 1211/(18432*HarmonicSums`Private`ExpVar^9) - 10741/(73728*HarmonicSums`Private`ExpVar^8) + 19/(384*HarmonicSums`Private`ExpVar^7) + 373/(4608*HarmonicSums`Private`ExpVar^6) - 101/(768*HarmonicSums`Private`ExpVar^5) + 59/(512*HarmonicSums`Private`ExpVar^4) - 7/(96*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-711/(32*HarmonicSums`Private`ExpVar^10) + 459/(80*HarmonicSums`Private`ExpVar^9) + 441/(160*HarmonicSums`Private`ExpVar^8) - 21/(20*HarmonicSums`Private`ExpVar^7) - 9/(16*HarmonicSums`Private`ExpVar^6) + 3/(8*HarmonicSums`Private`ExpVar^5) + 9/(40*HarmonicSums`Private`ExpVar^4) - 9/(20*HarmonicSums`Private`ExpVar^3) + 3/(10*HarmonicSums`Private`ExpVar^2))*z2^2 + (47*z2^3)/105 + ln2^2*((3*li4half)/2 + 164039/(307200*HarmonicSums`Private`ExpVar^10) - 1211/(18432*HarmonicSums`Private`ExpVar^9) - 10741/(73728*HarmonicSums`Private`ExpVar^8) + 19/(384*HarmonicSums`Private`ExpVar^7) + 373/(4608*HarmonicSums`Private`ExpVar^6) - 101/(768*HarmonicSums`Private`ExpVar^5) + 59/(512*HarmonicSums`Private`ExpVar^4) - 7/(96*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) + 153/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + z2^2/10) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-2181/(256*HarmonicSums`Private`ExpVar^10) + 49/(128*HarmonicSums`Private`ExpVar^9) + 63/(64*HarmonicSums`Private`ExpVar^8) - 5/(64*HarmonicSums`Private`ExpVar^7) - 35/(192*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3)) + (11*z3)/12) + (-1)^HarmonicSums`Private`ExpVar* (-6543/(512*HarmonicSums`Private`ExpVar^10) + 147/(256*HarmonicSums`Private`ExpVar^9) + 189/(128*HarmonicSums`Private`ExpVar^8) - 15/(128*HarmonicSums`Private`ExpVar^7) - 35/(128*HarmonicSums`Private`ExpVar^6) + 3/(64*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3))*z3 - (13*z3^2)/64 + ln2*((-1)^HarmonicSums`Private`ExpVar* (4426459/(376320*HarmonicSums`Private`ExpVar^10) - 129434063/(22579200*HarmonicSums`Private`ExpVar^9) - 624421/(460800*HarmonicSums`Private`ExpVar^8) + 233597/(230400*HarmonicSums`Private`ExpVar^7) + 625/(1536*HarmonicSums`Private`ExpVar^6) - 827/(1152*HarmonicSums`Private`ExpVar^5) + 27/(64*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (1185/(32*HarmonicSums`Private`ExpVar^10) - 153/(16*HarmonicSums`Private`ExpVar^9) - 147/(32*HarmonicSums`Private`ExpVar^8) + 7/(4*HarmonicSums`Private`ExpVar^7) + 15/(16*HarmonicSums`Private`ExpVar^6) - 5/(8*HarmonicSums`Private`ExpVar^5) - 3/(8*HarmonicSums`Private`ExpVar^4) + 3/(4*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2))*z3 + z2*((-1)^HarmonicSums`Private`ExpVar* (-6543/(256*HarmonicSums`Private`ExpVar^10) + 147/(128*HarmonicSums`Private`ExpVar^9) + 189/(64*HarmonicSums`Private`ExpVar^8) - 15/(64*HarmonicSums`Private`ExpVar^7) - 35/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (13*z3)/8)) + sinf*(3*li5half + (11*ln2^5)/120 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (395/(128*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^9) - 49/(128*HarmonicSums`Private`ExpVar^8) + 7/(48*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) - (5*z2)/12) + ln2*(3*li4half + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) - 153/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + z2^2/8) + (11*ln2^2*z3)/8 + (-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) - 153/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z3 + (13*z2*z3)/8 - (369*z5)/64), S[1, -1, 1, -1, -1, 1, HarmonicSums`Private`ExpVar] :> -3*li6half + (37*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar* (3922884059/(316108800*HarmonicSums`Private`ExpVar^10) + 18375252041/(2370816000*HarmonicSums`Private`ExpVar^9) - 5183017/(3456000*HarmonicSums`Private`ExpVar^8) - 2622691/(1728000*HarmonicSums`Private`ExpVar^7) + 83/(192*HarmonicSums`Private`ExpVar^6) + 1043/(1728*HarmonicSums`Private`ExpVar^5) - 5/(8*HarmonicSums`Private`ExpVar^4) + 1/(4*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(3555/(64*HarmonicSums`Private`ExpVar^10) - 459/(32*HarmonicSums`Private`ExpVar^9) - 441/(64*HarmonicSums`Private`ExpVar^8) + 21/(8*HarmonicSums`Private`ExpVar^7) + 45/(32*HarmonicSums`Private`ExpVar^6) - 15/(16*HarmonicSums`Private`ExpVar^5) - 9/(16*HarmonicSums`Private`ExpVar^4) + 9/(8*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2)) - 3*s6 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) - 153/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2)) - (11*z2)/48) + (-164039/(307200*HarmonicSums`Private`ExpVar^10) + 1211/(18432*HarmonicSums`Private`ExpVar^9) + 10741/(73728*HarmonicSums`Private`ExpVar^8) - 19/(384*HarmonicSums`Private`ExpVar^7) - 373/(4608*HarmonicSums`Private`ExpVar^6) + 101/(768*HarmonicSums`Private`ExpVar^5) - 59/(512*HarmonicSums`Private`ExpVar^4) + 7/(96*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2))*z2 + (3*z2^3)/70 + ln2^2*((3*li4half)/2 + 164039/(307200*HarmonicSums`Private`ExpVar^10) - 1211/(18432*HarmonicSums`Private`ExpVar^9) - 10741/(73728*HarmonicSums`Private`ExpVar^8) + 19/(384*HarmonicSums`Private`ExpVar^7) + 373/(4608*HarmonicSums`Private`ExpVar^6) - 101/(768*HarmonicSums`Private`ExpVar^5) + 59/(512*HarmonicSums`Private`ExpVar^4) - 7/(96*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) + 153/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + z2^2/10) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-2181/(256*HarmonicSums`Private`ExpVar^10) + 49/(128*HarmonicSums`Private`ExpVar^9) + 63/(64*HarmonicSums`Private`ExpVar^8) - 5/(64*HarmonicSums`Private`ExpVar^7) - 35/(192*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3)) + (11*z3)/12) + (-1)^HarmonicSums`Private`ExpVar* (45801/(512*HarmonicSums`Private`ExpVar^10) - 1029/(256*HarmonicSums`Private`ExpVar^9) - 1323/(128*HarmonicSums`Private`ExpVar^8) + 105/(128*HarmonicSums`Private`ExpVar^7) + 245/(128*HarmonicSums`Private`ExpVar^6) - 21/(64*HarmonicSums`Private`ExpVar^5) - 21/(32*HarmonicSums`Private`ExpVar^4) + 7/(16*HarmonicSums`Private`ExpVar^3))*z3 + (83*z3^2)/64 + sinf*(3*li5half + (11*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar* (-4426459/(376320*HarmonicSums`Private`ExpVar^10) + 129434063/(22579200*HarmonicSums`Private`ExpVar^9) + 624421/(460800*HarmonicSums`Private`ExpVar^8) - 233597/(230400*HarmonicSums`Private`ExpVar^7) - 625/(1536*HarmonicSums`Private`ExpVar^6) + 827/(1152*HarmonicSums`Private`ExpVar^5) - 27/(64*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (395/(128*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^9) - 49/(128*HarmonicSums`Private`ExpVar^8) + 7/(48*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) - (5*z2)/12) + ln2*(3*li4half + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) - 153/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 + z2^2/8) + (11*ln2^2*z3)/8 + (-1)^HarmonicSums`Private`ExpVar* (-8295/(256*HarmonicSums`Private`ExpVar^10) + 1071/(128*HarmonicSums`Private`ExpVar^9) + 1029/(256*HarmonicSums`Private`ExpVar^8) - 49/(32*HarmonicSums`Private`ExpVar^7) - 105/(128*HarmonicSums`Private`ExpVar^6) + 35/(64*HarmonicSums`Private`ExpVar^5) + 21/(64*HarmonicSums`Private`ExpVar^4) - 21/(32*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2))*z3 - (11*z2*z3)/8 - (81*z5)/64) + ln2*(z2*((-1)^HarmonicSums`Private`ExpVar* (-6543/(256*HarmonicSums`Private`ExpVar^10) + 147/(128*HarmonicSums`Private`ExpVar^9) + 189/(64*HarmonicSums`Private`ExpVar^8) - 15/(64*HarmonicSums`Private`ExpVar^7) - 35/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) - (11*z3)/8) + (9*z5)/2), S[1, -1, 1, -1, 1, -1, HarmonicSums`Private`ExpVar] :> -(ln2^6/144) + (-1)^HarmonicSums`Private`ExpVar* (-130915/(147456*HarmonicSums`Private`ExpVar^10) + 5699/(4096*HarmonicSums`Private`ExpVar^9) + 4753/(36864*HarmonicSums`Private`ExpVar^8) - 2975/(6144*HarmonicSums`Private`ExpVar^7) + 287/(1024*HarmonicSums`Private`ExpVar^6) - 35/(384*HarmonicSums`Private`ExpVar^5) + 1/(64*HarmonicSums`Private`ExpVar^4)) + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (1185/(512*HarmonicSums`Private`ExpVar^10) - 153/(256*HarmonicSums`Private`ExpVar^9) - 147/(512*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^7) + 15/(256*HarmonicSums`Private`ExpVar^6) - 5/(128*HarmonicSums`Private`ExpVar^5) - 3/(128*HarmonicSums`Private`ExpVar^4) + 3/(64*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2)) + z2/12) + (-1)^HarmonicSums`Private`ExpVar* (237/(256*HarmonicSums`Private`ExpVar^10) - 153/(640*HarmonicSums`Private`ExpVar^9) - 147/(1280*HarmonicSums`Private`ExpVar^8) + 7/(160*HarmonicSums`Private`ExpVar^7) + 3/(128*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^5) - 3/(320*HarmonicSums`Private`ExpVar^4) + 3/(160*HarmonicSums`Private`ExpVar^3) - 1/(80*HarmonicSums`Private`ExpVar^2))*z2^2 + ln2^2*(-164039/(307200*HarmonicSums`Private`ExpVar^10) + 1211/(18432*HarmonicSums`Private`ExpVar^9) + 10741/(73728*HarmonicSums`Private`ExpVar^8) - 19/(384*HarmonicSums`Private`ExpVar^7) - 373/(4608*HarmonicSums`Private`ExpVar^6) + 101/(768*HarmonicSums`Private`ExpVar^5) - 59/(512*HarmonicSums`Private`ExpVar^4) + 7/(96*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) + 153/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (2*z2^2)/5) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-2181/(256*HarmonicSums`Private`ExpVar^10) + 49/(128*HarmonicSums`Private`ExpVar^9) + 63/(64*HarmonicSums`Private`ExpVar^8) - 5/(64*HarmonicSums`Private`ExpVar^7) - 35/(192*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3)) + z3/24) + (-1)^HarmonicSums`Private`ExpVar* (6543/(1024*HarmonicSums`Private`ExpVar^10) - 147/(512*HarmonicSums`Private`ExpVar^9) - 189/(256*HarmonicSums`Private`ExpVar^8) + 15/(256*HarmonicSums`Private`ExpVar^7) + 35/(256*HarmonicSums`Private`ExpVar^6) - 3/(128*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3))*z3 + z3^2/128 + sinf*(-(ln2^5/120) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (395/(128*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^9) - 49/(128*HarmonicSums`Private`ExpVar^8) + 7/(48*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) + z2/12) + ln2*(-164039/(153600*HarmonicSums`Private`ExpVar^10) + 1211/(9216*HarmonicSums`Private`ExpVar^9) + 10741/(36864*HarmonicSums`Private`ExpVar^8) - 19/(192*HarmonicSums`Private`ExpVar^7) - 373/(2304*HarmonicSums`Private`ExpVar^6) + 101/(384*HarmonicSums`Private`ExpVar^5) - 59/(256*HarmonicSums`Private`ExpVar^4) + 7/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) + 153/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (3*z2^2)/8) + (ln2^2*z3)/16 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(512*HarmonicSums`Private`ExpVar^10) + 153/(256*HarmonicSums`Private`ExpVar^9) + 147/(512*HarmonicSums`Private`ExpVar^8) - 7/(64*HarmonicSums`Private`ExpVar^7) - 15/(256*HarmonicSums`Private`ExpVar^6) + 5/(128*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) - 3/(64*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2))*z3 - (z2*z3)/16 + (3*z5)/64) + ln2*(19216007/(9216000*HarmonicSums`Private`ExpVar^10) + 8051/(36864*HarmonicSums`Private`ExpVar^9) - 222761/(442368*HarmonicSums`Private`ExpVar^8) - 5/(2304*HarmonicSums`Private`ExpVar^7) + 3403/(13824*HarmonicSums`Private`ExpVar^6) - 45/(256*HarmonicSums`Private`ExpVar^5) + 13/(512*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + z2*((-1)^HarmonicSums`Private`ExpVar* (6543/(256*HarmonicSums`Private`ExpVar^10) - 147/(128*HarmonicSums`Private`ExpVar^9) - 189/(64*HarmonicSums`Private`ExpVar^8) + 15/(64*HarmonicSums`Private`ExpVar^7) + 35/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) - z3/16) + z5/2), S[1, -1, 1, -1, 1, 1, HarmonicSums`Private`ExpVar] :> -(ln2^6/144) + 7289648119/(6635520000*HarmonicSums`Private`ExpVar^10) + 6660228257/(8360755200*HarmonicSums`Private`ExpVar^9) - 56084087/(247726080*HarmonicSums`Private`ExpVar^8) - 828511/(2709504*HarmonicSums`Private`ExpVar^7) + 172931/(552960*HarmonicSums`Private`ExpVar^6) - 215251/(1382400*HarmonicSums`Private`ExpVar^5) + 2425/(36864*HarmonicSums`Private`ExpVar^4) - 89/(1728*HarmonicSums`Private`ExpVar^3) + 3/(64*HarmonicSums`Private`ExpVar^2) + (164039/(307200*HarmonicSums`Private`ExpVar^10) - 1211/(18432*HarmonicSums`Private`ExpVar^9) - 10741/(73728*HarmonicSums`Private`ExpVar^8) + 19/(384*HarmonicSums`Private`ExpVar^7) + 373/(4608*HarmonicSums`Private`ExpVar^6) - 101/(768*HarmonicSums`Private`ExpVar^5) + 59/(512*HarmonicSums`Private`ExpVar^4) - 7/(96*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2))*sinf^2 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (1185/(512*HarmonicSums`Private`ExpVar^10) - 153/(256*HarmonicSums`Private`ExpVar^9) - 147/(512*HarmonicSums`Private`ExpVar^8) + 7/(64*HarmonicSums`Private`ExpVar^7) + 15/(256*HarmonicSums`Private`ExpVar^6) - 5/(128*HarmonicSums`Private`ExpVar^5) - 3/(128*HarmonicSums`Private`ExpVar^4) + 3/(64*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2)) + z2/12) + (164039/(307200*HarmonicSums`Private`ExpVar^10) - 1211/(18432*HarmonicSums`Private`ExpVar^9) - 10741/(73728*HarmonicSums`Private`ExpVar^8) + 19/(384*HarmonicSums`Private`ExpVar^7) + 373/(4608*HarmonicSums`Private`ExpVar^6) - 101/(768*HarmonicSums`Private`ExpVar^5) + 59/(512*HarmonicSums`Private`ExpVar^4) - 7/(96*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-237/(256*HarmonicSums`Private`ExpVar^10) + 153/(640*HarmonicSums`Private`ExpVar^9) + 147/(1280*HarmonicSums`Private`ExpVar^8) - 7/(160*HarmonicSums`Private`ExpVar^7) - 3/(128*HarmonicSums`Private`ExpVar^6) + 1/(64*HarmonicSums`Private`ExpVar^5) + 3/(320*HarmonicSums`Private`ExpVar^4) - 3/(160*HarmonicSums`Private`ExpVar^3) + 1/(80*HarmonicSums`Private`ExpVar^2))*z2^2 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) + 153/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (2*z2^2)/5) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-2181/(256*HarmonicSums`Private`ExpVar^10) + 49/(128*HarmonicSums`Private`ExpVar^9) + 63/(64*HarmonicSums`Private`ExpVar^8) - 5/(64*HarmonicSums`Private`ExpVar^7) - 35/(192*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3)) + z3/24) + (-1)^HarmonicSums`Private`ExpVar* (-45801/(1024*HarmonicSums`Private`ExpVar^10) + 1029/(512*HarmonicSums`Private`ExpVar^9) + 1323/(256*HarmonicSums`Private`ExpVar^8) - 105/(256*HarmonicSums`Private`ExpVar^7) - 245/(256*HarmonicSums`Private`ExpVar^6) + 21/(128*HarmonicSums`Private`ExpVar^5) + 21/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^3))*z3 - (63*z3^2)/128 + ln2*(z2*((-1)^HarmonicSums`Private`ExpVar* (6543/(256*HarmonicSums`Private`ExpVar^10) - 147/(128*HarmonicSums`Private`ExpVar^9) - 189/(64*HarmonicSums`Private`ExpVar^8) + 15/(64*HarmonicSums`Private`ExpVar^7) + 35/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (15*z3)/16) + (-1)^HarmonicSums`Private`ExpVar* (1185/(64*HarmonicSums`Private`ExpVar^10) - 153/(32*HarmonicSums`Private`ExpVar^9) - 147/(64*HarmonicSums`Private`ExpVar^8) + 7/(8*HarmonicSums`Private`ExpVar^7) + 15/(32*HarmonicSums`Private`ExpVar^6) - 5/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 3/(8*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2))*z3) + sinf*(-(ln2^5/120) - 19216007/(9216000*HarmonicSums`Private`ExpVar^10) - 8051/(36864*HarmonicSums`Private`ExpVar^9) + 222761/(442368*HarmonicSums`Private`ExpVar^8) + 5/(2304*HarmonicSums`Private`ExpVar^7) - 3403/(13824*HarmonicSums`Private`ExpVar^6) + 45/(256*HarmonicSums`Private`ExpVar^5) - 13/(512*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (395/(128*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^9) - 49/(128*HarmonicSums`Private`ExpVar^8) + 7/(48*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) + z2/12) + ln2*((-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) + 153/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (3*z2^2)/8) + (ln2^2*z3)/16 + (-1)^HarmonicSums`Private`ExpVar* (8295/(512*HarmonicSums`Private`ExpVar^10) - 1071/(256*HarmonicSums`Private`ExpVar^9) - 1029/(512*HarmonicSums`Private`ExpVar^8) + 49/(64*HarmonicSums`Private`ExpVar^7) + 105/(256*HarmonicSums`Private`ExpVar^6) - 35/(128*HarmonicSums`Private`ExpVar^5) - 21/(128*HarmonicSums`Private`ExpVar^4) + 21/(64*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2))*z3 + (15*z2*z3)/16 - (29*z5)/64), S[1, -1, 1, 1, -1, -1, HarmonicSums`Private`ExpVar] :> 3*li6half - (17*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar* (28326053821/(2528870400*HarmonicSums`Private`ExpVar^10) - 48659805367/(9483264000*HarmonicSums`Private`ExpVar^9) - 33802727/(27648000*HarmonicSums`Private`ExpVar^8) + 10341139/(13824000*HarmonicSums`Private`ExpVar^7) + 10177/(18432*HarmonicSums`Private`ExpVar^6) - 5281/(6912*HarmonicSums`Private`ExpVar^5) + 55/(128*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* li4half*(-1185/(64*HarmonicSums`Private`ExpVar^10) + 153/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) - 7/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) + 5/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) + 3*s6 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-395/(128*HarmonicSums`Private`ExpVar^10) + 51/(64*HarmonicSums`Private`ExpVar^9) + 49/(128*HarmonicSums`Private`ExpVar^8) - 7/(48*HarmonicSums`Private`ExpVar^7) - 5/(64*HarmonicSums`Private`ExpVar^6) + 5/(96*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) + (7*z2)/48) + (-1)^HarmonicSums`Private`ExpVar* (-82487/(3584*HarmonicSums`Private`ExpVar^10) - 131773/(26880*HarmonicSums`Private`ExpVar^9) + 18431/(7680*HarmonicSums`Private`ExpVar^8) + 2603/(3840*HarmonicSums`Private`ExpVar^7) - 25/(64*HarmonicSums`Private`ExpVar^6) - 19/(96*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) + 153/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2^2 + z2^3/60 + sinf^2*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (-1185/(256*HarmonicSums`Private`ExpVar^10) + 153/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) + 153/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2) + ln2^2*(-(li4half/2) + (-1)^HarmonicSums`Private`ExpVar* (-82487/(3584*HarmonicSums`Private`ExpVar^10) - 131773/(26880*HarmonicSums`Private`ExpVar^9) + 18431/(7680*HarmonicSums`Private`ExpVar^8) + 2603/(3840*HarmonicSums`Private`ExpVar^7) - 25/(64*HarmonicSums`Private`ExpVar^6) - 19/(96*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) + 153/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 - (3*z2^2)/8) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (2181/(128*HarmonicSums`Private`ExpVar^10) - 49/(64*HarmonicSums`Private`ExpVar^9) - 63/(32*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) + 35/(96*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3)) - (11*z3)/24) + (-1)^HarmonicSums`Private`ExpVar* (-45801/(1024*HarmonicSums`Private`ExpVar^10) + 1029/(512*HarmonicSums`Private`ExpVar^9) + 1323/(256*HarmonicSums`Private`ExpVar^8) - 105/(256*HarmonicSums`Private`ExpVar^7) - 245/(256*HarmonicSums`Private`ExpVar^6) + 21/(128*HarmonicSums`Private`ExpVar^5) + 21/(64*HarmonicSums`Private`ExpVar^4) - 7/(32*HarmonicSums`Private`ExpVar^3))*z3 - (167*z3^2)/128 + ln2*(-7331/(18432*HarmonicSums`Private`ExpVar^10) + 318871/(414720*HarmonicSums`Private`ExpVar^9) - 505/(12288*HarmonicSums`Private`ExpVar^8) - 5009/(16128*HarmonicSums`Private`ExpVar^7) + 73/(256*HarmonicSums`Private`ExpVar^6) - 451/(2880*HarmonicSums`Private`ExpVar^5) + 23/(384*HarmonicSums`Private`ExpVar^4) - 1/(72*HarmonicSums`Private`ExpVar^3) + z2*((-1)^HarmonicSums`Private`ExpVar* (6543/(256*HarmonicSums`Private`ExpVar^10) - 147/(128*HarmonicSums`Private`ExpVar^9) - 189/(64*HarmonicSums`Private`ExpVar^8) + 15/(64*HarmonicSums`Private`ExpVar^7) + 35/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) - z3/16) - 3*z5) + sinf*(-2*li5half - ln2^5/30 + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-395/(64*HarmonicSums`Private`ExpVar^10) + 51/(32*HarmonicSums`Private`ExpVar^9) + 49/(64*HarmonicSums`Private`ExpVar^8) - 7/(24*HarmonicSums`Private`ExpVar^7) - 5/(32*HarmonicSums`Private`ExpVar^6) + 5/(48*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2)) + z2/6) + ln2*(-li4half + (-1)^HarmonicSums`Private`ExpVar* (-1185/(128*HarmonicSums`Private`ExpVar^10) + 153/(64*HarmonicSums`Private`ExpVar^9) + 147/(128*HarmonicSums`Private`ExpVar^8) - 7/(16*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 3/(16*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (2*z2^2)/5) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (6543/(256*HarmonicSums`Private`ExpVar^10) - 147/(128*HarmonicSums`Private`ExpVar^9) - 189/(64*HarmonicSums`Private`ExpVar^8) + 15/(64*HarmonicSums`Private`ExpVar^7) + 35/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) - (7*z3)/16) + z2*((-1)^HarmonicSums`Private`ExpVar* (6543/(256*HarmonicSums`Private`ExpVar^10) - 147/(128*HarmonicSums`Private`ExpVar^9) - 189/(64*HarmonicSums`Private`ExpVar^8) + 15/(64*HarmonicSums`Private`ExpVar^7) + 35/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (7*z3)/16) + (-1)^HarmonicSums`Private`ExpVar* (8295/(512*HarmonicSums`Private`ExpVar^10) - 1071/(256*HarmonicSums`Private`ExpVar^9) - 1029/(512*HarmonicSums`Private`ExpVar^8) + 49/(64*HarmonicSums`Private`ExpVar^7) + 105/(256*HarmonicSums`Private`ExpVar^6) - 35/(128*HarmonicSums`Private`ExpVar^5) - 21/(128*HarmonicSums`Private`ExpVar^4) + 21/(64*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2))*z3 + (27*z5)/32), S[1, -1, 1, 1, -1, 1, HarmonicSums`Private`ExpVar] :> 3*li6half - (17*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar*li4half* (-1185/(64*HarmonicSums`Private`ExpVar^10) + 153/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) - 7/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) + 5/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2)) - 42719/(25920*HarmonicSums`Private`ExpVar^10) + 63064657/(65318400*HarmonicSums`Private`ExpVar^9) + 2929/(16128*HarmonicSums`Private`ExpVar^8) - 152773/(423360*HarmonicSums`Private`ExpVar^7) + 247/(1440*HarmonicSums`Private`ExpVar^6) - 607/(21600*HarmonicSums`Private`ExpVar^5) - 1/(72*HarmonicSums`Private`ExpVar^4) + 1/(108*HarmonicSums`Private`ExpVar^3) + 3*s6 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (-395/(128*HarmonicSums`Private`ExpVar^10) + 51/(64*HarmonicSums`Private`ExpVar^9) + 49/(128*HarmonicSums`Private`ExpVar^8) - 7/(48*HarmonicSums`Private`ExpVar^7) - 5/(64*HarmonicSums`Private`ExpVar^6) + 5/(96*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2)) + (7*z2)/48) + (-1)^HarmonicSums`Private`ExpVar* (82487/(3584*HarmonicSums`Private`ExpVar^10) + 131773/(26880*HarmonicSums`Private`ExpVar^9) - 18431/(7680*HarmonicSums`Private`ExpVar^8) - 2603/(3840*HarmonicSums`Private`ExpVar^7) + 25/(64*HarmonicSums`Private`ExpVar^6) + 19/(96*HarmonicSums`Private`ExpVar^5) - 7/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar* (3081/(256*HarmonicSums`Private`ExpVar^10) - 1989/(640*HarmonicSums`Private`ExpVar^9) - 1911/(1280*HarmonicSums`Private`ExpVar^8) + 91/(160*HarmonicSums`Private`ExpVar^7) + 39/(128*HarmonicSums`Private`ExpVar^6) - 13/(64*HarmonicSums`Private`ExpVar^5) - 39/(320*HarmonicSums`Private`ExpVar^4) + 39/(160*HarmonicSums`Private`ExpVar^3) - 13/(80*HarmonicSums`Private`ExpVar^2))*z2^2 - (71*z2^3)/140 + sinf^2*((-1)^HarmonicSums`Private`ExpVar*ln2^2* (-1185/(256*HarmonicSums`Private`ExpVar^10) + 153/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2)) + (-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) - 153/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2) + ln2^2*(-(li4half/2) + (-1)^HarmonicSums`Private`ExpVar* (-82487/(3584*HarmonicSums`Private`ExpVar^10) - 131773/(26880*HarmonicSums`Private`ExpVar^9) + 18431/(7680*HarmonicSums`Private`ExpVar^8) + 2603/(3840*HarmonicSums`Private`ExpVar^7) - 25/(64*HarmonicSums`Private`ExpVar^6) - 19/(96*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) - 153/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 - (3*z2^2)/8) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (2181/(128*HarmonicSums`Private`ExpVar^10) - 49/(64*HarmonicSums`Private`ExpVar^9) - 63/(32*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) + 35/(96*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3)) - (11*z3)/24) + (-1)^HarmonicSums`Private`ExpVar* (6543/(1024*HarmonicSums`Private`ExpVar^10) - 147/(512*HarmonicSums`Private`ExpVar^9) - 189/(256*HarmonicSums`Private`ExpVar^8) + 15/(256*HarmonicSums`Private`ExpVar^7) + 35/(256*HarmonicSums`Private`ExpVar^6) - 3/(128*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 1/(32*HarmonicSums`Private`ExpVar^3))*z3 + (25*z3^2)/128 + ln2*(z2*((-1)^HarmonicSums`Private`ExpVar* (-6543/(256*HarmonicSums`Private`ExpVar^10) + 147/(128*HarmonicSums`Private`ExpVar^9) + 189/(64*HarmonicSums`Private`ExpVar^8) - 15/(64*HarmonicSums`Private`ExpVar^7) - 35/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) - (17*z3)/16) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(64*HarmonicSums`Private`ExpVar^10) + 153/(32*HarmonicSums`Private`ExpVar^9) + 147/(64*HarmonicSums`Private`ExpVar^8) - 7/(8*HarmonicSums`Private`ExpVar^7) - 15/(32*HarmonicSums`Private`ExpVar^6) + 5/(16*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 3/(8*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2))*z3) + sinf*(-2*li5half - ln2^5/30 + 7331/(18432*HarmonicSums`Private`ExpVar^ 10) - 318871/(414720*HarmonicSums`Private`ExpVar^9) + 505/(12288*HarmonicSums`Private`ExpVar^8) + 5009/(16128*HarmonicSums`Private`ExpVar^7) - 73/(256*HarmonicSums`Private`ExpVar^6) + 451/(2880*HarmonicSums`Private`ExpVar^5) - 23/(384*HarmonicSums`Private`ExpVar^4) + 1/(72*HarmonicSums`Private`ExpVar^3) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-395/(64*HarmonicSums`Private`ExpVar^10) + 51/(32*HarmonicSums`Private`ExpVar^9) + 49/(64*HarmonicSums`Private`ExpVar^8) - 7/(24*HarmonicSums`Private`ExpVar^7) - 5/(32*HarmonicSums`Private`ExpVar^6) + 5/(48*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2)) + z2/6) + ln2*(-li4half + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) - 153/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2 - (2*z2^2)/5) + z2*((-1)^HarmonicSums`Private`ExpVar* (-6543/(256*HarmonicSums`Private`ExpVar^10) + 147/(128*HarmonicSums`Private`ExpVar^9) + 189/(64*HarmonicSums`Private`ExpVar^8) - 15/(64*HarmonicSums`Private`ExpVar^7) - 35/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) - (9*z3)/16) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (6543/(256*HarmonicSums`Private`ExpVar^10) - 147/(128*HarmonicSums`Private`ExpVar^9) - 189/(64*HarmonicSums`Private`ExpVar^8) + 15/(64*HarmonicSums`Private`ExpVar^7) + 35/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) - (7*z3)/16) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(512*HarmonicSums`Private`ExpVar^10) + 153/(256*HarmonicSums`Private`ExpVar^9) + 147/(512*HarmonicSums`Private`ExpVar^8) - 7/(64*HarmonicSums`Private`ExpVar^7) - 15/(256*HarmonicSums`Private`ExpVar^6) + 5/(128*HarmonicSums`Private`ExpVar^5) + 3/(128*HarmonicSums`Private`ExpVar^4) - 3/(64*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2))*z3 + (123*z5)/32), S[1, -1, 1, 1, 1, -1, HarmonicSums`Private`ExpVar] :> 2*li6half - ln2^6/240 - 164759/(122880*HarmonicSums`Private`ExpVar^10) - 11767/(61440*HarmonicSums`Private`ExpVar^9) + 68537/(147456*HarmonicSums`Private`ExpVar^8) - 211/(768*HarmonicSums`Private`ExpVar^7) + 119/(1152*HarmonicSums`Private`ExpVar^6) - 17/(640*HarmonicSums`Private`ExpVar^5) + 1/(256*HarmonicSums`Private`ExpVar^4) + s6/2 + ((-1)^HarmonicSums`Private`ExpVar*ln2* (-6543/(256*HarmonicSums`Private`ExpVar^10) + 147/(128*HarmonicSums`Private`ExpVar^9) + 189/(64*HarmonicSums`Private`ExpVar^8) - 15/(64*HarmonicSums`Private`ExpVar^7) - 35/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (1185/(256*HarmonicSums`Private`ExpVar^10) - 153/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2)))*sinf^2 + (-1)^HarmonicSums`Private`ExpVar*ln2* (395/(128*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^9) - 49/(128*HarmonicSums`Private`ExpVar^8) + 7/(48*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2))*sinf^3 + ln2^4*((-1)^HarmonicSums`Private`ExpVar* (395/(512*HarmonicSums`Private`ExpVar^10) - 51/(256*HarmonicSums`Private`ExpVar^9) - 49/(512*HarmonicSums`Private`ExpVar^8) + 7/(192*HarmonicSums`Private`ExpVar^7) + 5/(256*HarmonicSums`Private`ExpVar^6) - 5/(384*HarmonicSums`Private`ExpVar^5) - 1/(128*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^3) - 1/(96*HarmonicSums`Private`ExpVar^2)) + z2/24) - (13*z2^3)/35 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (82487/(3584*HarmonicSums`Private`ExpVar^10) + 131773/(26880*HarmonicSums`Private`ExpVar^9) - 18431/(7680*HarmonicSums`Private`ExpVar^8) - 2603/(3840*HarmonicSums`Private`ExpVar^7) + 25/(64*HarmonicSums`Private`ExpVar^6) + 19/(96*HarmonicSums`Private`ExpVar^5) - 7/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (1185/(256*HarmonicSums`Private`ExpVar^10) - 153/(128*HarmonicSums`Private`ExpVar^9) - 147/(256*HarmonicSums`Private`ExpVar^8) + 7/(32*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 3/(32*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + z2^2/40) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-2181/(256*HarmonicSums`Private`ExpVar^10) + 49/(128*HarmonicSums`Private`ExpVar^9) + 63/(64*HarmonicSums`Private`ExpVar^8) - 5/(64*HarmonicSums`Private`ExpVar^7) - 35/(192*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3)) - z3/6) - z3^2/8 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-399943/(80640*HarmonicSums`Private`ExpVar^10) - 23093/(1920*HarmonicSums`Private`ExpVar^9) + 67/(720*HarmonicSums`Private`ExpVar^8) + 143/(96*HarmonicSums`Private`ExpVar^7) + 13/(96*HarmonicSums`Private`ExpVar^6) - 23/(48*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^4)) + z2*((-1)^HarmonicSums`Private`ExpVar* (-6543/(256*HarmonicSums`Private`ExpVar^10) + 147/(128*HarmonicSums`Private`ExpVar^9) + 189/(64*HarmonicSums`Private`ExpVar^8) - 15/(64*HarmonicSums`Private`ExpVar^7) - 35/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + z3/2) + (-1)^HarmonicSums`Private`ExpVar* (395/(64*HarmonicSums`Private`ExpVar^10) - 51/(32*HarmonicSums`Private`ExpVar^9) - 49/(64*HarmonicSums`Private`ExpVar^8) + 7/(24*HarmonicSums`Private`ExpVar^7) + 5/(32*HarmonicSums`Private`ExpVar^6) - 5/(48*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2))*z3) + sinf*(-li5half + (-1)^HarmonicSums`Private`ExpVar*ln2^2* (-6543/(256*HarmonicSums`Private`ExpVar^10) + 147/(128*HarmonicSums`Private`ExpVar^9) + 189/(64*HarmonicSums`Private`ExpVar^8) - 15/(64*HarmonicSums`Private`ExpVar^7) - 35/(64*HarmonicSums`Private`ExpVar^6) + 3/(32*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar*ln2^3* (395/(128*HarmonicSums`Private`ExpVar^10) - 51/(64*HarmonicSums`Private`ExpVar^9) - 49/(128*HarmonicSums`Private`ExpVar^8) + 7/(48*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2)) + ln2*((-1)^HarmonicSums`Private`ExpVar* (82487/(1792*HarmonicSums`Private`ExpVar^10) + 131773/(13440*HarmonicSums`Private`ExpVar^9) - 18431/(3840*HarmonicSums`Private`ExpVar^8) - 2603/(1920*HarmonicSums`Private`ExpVar^7) + 25/(32*HarmonicSums`Private`ExpVar^6) + 19/(48*HarmonicSums`Private`ExpVar^5) - 7/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (1185/(128*HarmonicSums`Private`ExpVar^10) - 153/(64*HarmonicSums`Private`ExpVar^9) - 147/(128*HarmonicSums`Private`ExpVar^8) + 7/(16*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4) + 3/(16*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2))*z2) + z5), S[1, -1, 1, 1, 1, 1, HarmonicSums`Private`ExpVar] :> 2*li6half - ln2^6/240 + (-1)^HarmonicSums`Private`ExpVar* (5193017/(322560*HarmonicSums`Private`ExpVar^10) - 90947/(23040*HarmonicSums`Private`ExpVar^9) - 40063/(23040*HarmonicSums`Private`ExpVar^8) + 65/(256*HarmonicSums`Private`ExpVar^7) + 91/(192*HarmonicSums`Private`ExpVar^6) - 15/(64*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4)) + s6/2 + (-1)^HarmonicSums`Private`ExpVar* (2181/(256*HarmonicSums`Private`ExpVar^10) - 49/(128*HarmonicSums`Private`ExpVar^9) - 63/(64*HarmonicSums`Private`ExpVar^8) + 5/(64*HarmonicSums`Private`ExpVar^7) + 35/(192*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3))*sinf^3 + (-1)^HarmonicSums`Private`ExpVar* (-395/(512*HarmonicSums`Private`ExpVar^10) + 51/(256*HarmonicSums`Private`ExpVar^9) + 49/(512*HarmonicSums`Private`ExpVar^8) - 7/(192*HarmonicSums`Private`ExpVar^7) - 5/(256*HarmonicSums`Private`ExpVar^6) + 5/(384*HarmonicSums`Private`ExpVar^5) + 1/(128*HarmonicSums`Private`ExpVar^4) - 1/(64*HarmonicSums`Private`ExpVar^3) + 1/(96*HarmonicSums`Private`ExpVar^2))*sinf^4 + (ln2^4*z2)/24 + (-1)^HarmonicSums`Private`ExpVar* (-82487/(3584*HarmonicSums`Private`ExpVar^10) - 131773/(26880*HarmonicSums`Private`ExpVar^9) + 18431/(7680*HarmonicSums`Private`ExpVar^8) + 2603/(3840*HarmonicSums`Private`ExpVar^7) - 25/(64*HarmonicSums`Private`ExpVar^6) - 19/(96*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3))*z2 + (ln2^2*z2^2)/40 + (-1)^HarmonicSums`Private`ExpVar* (-2133/(512*HarmonicSums`Private`ExpVar^10) + 1377/(1280*HarmonicSums`Private`ExpVar^9) + 1323/(2560*HarmonicSums`Private`ExpVar^8) - 63/(320*HarmonicSums`Private`ExpVar^7) - 27/(256*HarmonicSums`Private`ExpVar^6) + 9/(128*HarmonicSums`Private`ExpVar^5) + 27/(640*HarmonicSums`Private`ExpVar^4) - 27/(320*HarmonicSums`Private`ExpVar^3) + 9/(160*HarmonicSums`Private`ExpVar^2))*z2^2 - z2^3/5 + sinf^2*((-1)^HarmonicSums`Private`ExpVar* (-82487/(3584*HarmonicSums`Private`ExpVar^10) - 131773/(26880*HarmonicSums`Private`ExpVar^9) + 18431/(7680*HarmonicSums`Private`ExpVar^8) + 2603/(3840*HarmonicSums`Private`ExpVar^7) - 25/(64*HarmonicSums`Private`ExpVar^6) - 19/(96*HarmonicSums`Private`ExpVar^5) + 7/(32*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + (-1)^HarmonicSums`Private`ExpVar* (-1185/(256*HarmonicSums`Private`ExpVar^10) + 153/(128*HarmonicSums`Private`ExpVar^9) + 147/(256*HarmonicSums`Private`ExpVar^8) - 7/(32*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) + 3/(64*HarmonicSums`Private`ExpVar^4) - 3/(32*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2) - (ln2^3*z3)/6 + (-1)^HarmonicSums`Private`ExpVar* (2181/(128*HarmonicSums`Private`ExpVar^10) - 49/(64*HarmonicSums`Private`ExpVar^9) - 63/(32*HarmonicSums`Private`ExpVar^8) + 5/(32*HarmonicSums`Private`ExpVar^7) + 35/(96*HarmonicSums`Private`ExpVar^6) - 1/(16*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3))*z3 - (5*z3^2)/8 + sinf*(-li5half + (-1)^HarmonicSums`Private`ExpVar* (399943/(80640*HarmonicSums`Private`ExpVar^10) + 23093/(1920*HarmonicSums`Private`ExpVar^9) - 67/(720*HarmonicSums`Private`ExpVar^8) - 143/(96*HarmonicSums`Private`ExpVar^7) - 13/(96*HarmonicSums`Private`ExpVar^6) + 23/(48*HarmonicSums`Private`ExpVar^5) - 1/(6*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* (6543/(256*HarmonicSums`Private`ExpVar^10) - 147/(128*HarmonicSums`Private`ExpVar^9) - 189/(64*HarmonicSums`Private`ExpVar^8) + 15/(64*HarmonicSums`Private`ExpVar^7) + 35/(64*HarmonicSums`Private`ExpVar^6) - 3/(32*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(8*HarmonicSums`Private`ExpVar^3))*z2 + (-1)^HarmonicSums`Private`ExpVar* (-395/(64*HarmonicSums`Private`ExpVar^10) + 51/(32*HarmonicSums`Private`ExpVar^9) + 49/(64*HarmonicSums`Private`ExpVar^8) - 7/(24*HarmonicSums`Private`ExpVar^7) - 5/(32*HarmonicSums`Private`ExpVar^6) + 5/(48*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(8*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2))*z3) + ln2*((z2*z3)/2 - z5), S[1, 1, -1, -1, -1, -1, HarmonicSums`Private`ExpVar] :> 7*li6half + (17*ln2^6)/720 + ln2^4*(1/(1440*HarmonicSums`Private`ExpVar^9) - 1/(2016*HarmonicSums`Private`ExpVar^7) + 1/(1440*HarmonicSums`Private`ExpVar^5) - 1/(288*HarmonicSums`Private`ExpVar^3) + 1/(96*HarmonicSums`Private`ExpVar^2) - 1/(48*HarmonicSums`Private`ExpVar)) - 7718439389/(23224320000*HarmonicSums`Private`ExpVar^10) + 847213667/(4180377600*HarmonicSums`Private`ExpVar^9) + 51350473/(371589120*HarmonicSums`Private`ExpVar^8) - 40493/(125440*HarmonicSums`Private`ExpVar^7) + 273761/(829440*HarmonicSums`Private`ExpVar^6) - 173221/(691200*HarmonicSums`Private`ExpVar^5) + 2899/(18432*HarmonicSums`Private`ExpVar^4) - 71/(864*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) + (9*s6)/4 + (389887/(4300800*HarmonicSums`Private`ExpVar^10) - 51507809/(2032128000*HarmonicSums`Private`ExpVar^9) - 478069/(12042240*HarmonicSums`Private`ExpVar^8) + 3460589/(118540800*HarmonicSums`Private`ExpVar^7) + 7493/(230400*HarmonicSums`Private`ExpVar^6) - 181559/(1728000*HarmonicSums`Private`ExpVar^5) + 1525/(9216*HarmonicSums`Private`ExpVar^4) - 359/(1728*HarmonicSums`Private`ExpVar^3) + 15/(64*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (3/(800*HarmonicSums`Private`ExpVar^9) - 3/(1120*HarmonicSums`Private`ExpVar^7) + 3/(800*HarmonicSums`Private`ExpVar^5) - 3/(160*HarmonicSums`Private`ExpVar^3) + 9/(160*HarmonicSums`Private`ExpVar^2) - 9/(80*HarmonicSums`Private`ExpVar))*z2^2 - (61*z2^3)/112 + ln2^2*(389887/(4300800*HarmonicSums`Private`ExpVar^10) - 51507809/(2032128000*HarmonicSums`Private`ExpVar^9) - 478069/(12042240*HarmonicSums`Private`ExpVar^8) + 3460589/(118540800*HarmonicSums`Private`ExpVar^7) + 7493/(230400*HarmonicSums`Private`ExpVar^6) - 181559/(1728000*HarmonicSums`Private`ExpVar^5) + 1525/(9216*HarmonicSums`Private`ExpVar^4) - 359/(1728*HarmonicSums`Private`ExpVar^3) + 15/(64*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) + (1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 - (77*z2^2)/80) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (345/(512*HarmonicSums`Private`ExpVar^10) - 441/(256*HarmonicSums`Private`ExpVar^9) + 7/(384*HarmonicSums`Private`ExpVar^8) + 35/(128*HarmonicSums`Private`ExpVar^7) - 5/(128*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3)) + (17*z3)/24) + (-1)^HarmonicSums`Private`ExpVar* (1035/(1024*HarmonicSums`Private`ExpVar^10) - 1323/(512*HarmonicSums`Private`ExpVar^9) + 7/(256*HarmonicSums`Private`ExpVar^8) + 105/(256*HarmonicSums`Private`ExpVar^7) - 15/(256*HarmonicSums`Private`ExpVar^6) - 15/(128*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4) - 1/(32*HarmonicSums`Private`ExpVar^3))*z3 - (55*z3^2)/32 + sinf^2*(ln2^4/48 + (ln2^2*z2)/8 + (9*z2^2)/80 + (ln2*z3)/8) + ln2*((-1)^HarmonicSums`Private`ExpVar* (528319/(43008*HarmonicSums`Private`ExpVar^10) + 30567/(5120*HarmonicSums`Private`ExpVar^9) - 16801/(7680*HarmonicSums`Private`ExpVar^8) - 91/(128*HarmonicSums`Private`ExpVar^7) + 79/(96*HarmonicSums`Private`ExpVar^6) - 21/(64*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)) + (1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z3 + z2*((-1)^HarmonicSums`Private`ExpVar* (1035/(512*HarmonicSums`Private`ExpVar^10) - 1323/(256*HarmonicSums`Private`ExpVar^9) + 7/(128*HarmonicSums`Private`ExpVar^8) + 105/(128*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 15/(64*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + (9*z3)/8)) + sinf*(-3*li5half + (7*ln2^5)/120 - (39*ln2*z2^2)/40 + (9*ln2^2*z3)/8 + z2*z3 + (23*z5)/64), S[1, 1, -1, -1, -1, 1, HarmonicSums`Private`ExpVar] :> 7*li6half + (17*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar* (-209444267/(18063360*HarmonicSums`Private`ExpVar^10) + 1611211/(307200*HarmonicSums`Private`ExpVar^9) + 122843/(115200*HarmonicSums`Private`ExpVar^8) - 783/(1024*HarmonicSums`Private`ExpVar^7) - 7/(72*HarmonicSums`Private`ExpVar^6) + 25/(128*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4)) + ln2^4*(1/(1440*HarmonicSums`Private`ExpVar^9) - 1/(2016*HarmonicSums`Private`ExpVar^7) + 1/(1440*HarmonicSums`Private`ExpVar^5) - 1/(288*HarmonicSums`Private`ExpVar^3) + 1/(96*HarmonicSums`Private`ExpVar^2) - 1/(48*HarmonicSums`Private`ExpVar)) + (9*s6)/4 + (-389887/(4300800*HarmonicSums`Private`ExpVar^10) + 51507809/(2032128000*HarmonicSums`Private`ExpVar^9) + 478069/(12042240*HarmonicSums`Private`ExpVar^8) - 3460589/(118540800*HarmonicSums`Private`ExpVar^7) - 7493/(230400*HarmonicSums`Private`ExpVar^6) + 181559/(1728000*HarmonicSums`Private`ExpVar^5) - 1525/(9216*HarmonicSums`Private`ExpVar^4) + 359/(1728*HarmonicSums`Private`ExpVar^3) - 15/(64*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (-19/(2400*HarmonicSums`Private`ExpVar^9) + 19/(3360*HarmonicSums`Private`ExpVar^7) - 19/(2400*HarmonicSums`Private`ExpVar^5) + 19/(480*HarmonicSums`Private`ExpVar^3) - 19/(160*HarmonicSums`Private`ExpVar^2) + 19/(80*HarmonicSums`Private`ExpVar))*z2^2 - (2687*z2^3)/1680 + ln2^2*(389887/(4300800*HarmonicSums`Private`ExpVar^10) - 51507809/(2032128000*HarmonicSums`Private`ExpVar^9) - 478069/(12042240*HarmonicSums`Private`ExpVar^8) + 3460589/(118540800*HarmonicSums`Private`ExpVar^7) + 7493/(230400*HarmonicSums`Private`ExpVar^6) - 181559/(1728000*HarmonicSums`Private`ExpVar^5) + 1525/(9216*HarmonicSums`Private`ExpVar^4) - 359/(1728*HarmonicSums`Private`ExpVar^3) + 15/(64*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) + (1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 - (21*z2^2)/16) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (345/(512*HarmonicSums`Private`ExpVar^10) - 441/(256*HarmonicSums`Private`ExpVar^9) + 7/(384*HarmonicSums`Private`ExpVar^8) + 35/(128*HarmonicSums`Private`ExpVar^7) - 5/(128*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3)) + (17*z3)/24) + (-1)^HarmonicSums`Private`ExpVar* (-7245/(1024*HarmonicSums`Private`ExpVar^10) + 9261/(512*HarmonicSums`Private`ExpVar^9) - 49/(256*HarmonicSums`Private`ExpVar^8) - 735/(256*HarmonicSums`Private`ExpVar^7) + 105/(256*HarmonicSums`Private`ExpVar^6) + 105/(128*HarmonicSums`Private`ExpVar^5) - 21/(32*HarmonicSums`Private`ExpVar^4) + 7/(32*HarmonicSums`Private`ExpVar^3))*z3 - (23*z3^2)/32 + sinf^2*(ln2^4/48 + (ln2^2*z2)/8 - (19*z2^2)/80 + (ln2*z3)/8) + ln2*(z2*((-1)^HarmonicSums`Private`ExpVar* (1035/(512*HarmonicSums`Private`ExpVar^10) - 1323/(256*HarmonicSums`Private`ExpVar^9) + 7/(128*HarmonicSums`Private`ExpVar^8) + 105/(128*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 15/(64*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) - (7*z3)/8) + (1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z3 + (11*z5)/2) + sinf*(-3*li5half + (7*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar* (-528319/(43008*HarmonicSums`Private`ExpVar^10) - 30567/(5120*HarmonicSums`Private`ExpVar^9) + 16801/(7680*HarmonicSums`Private`ExpVar^8) + 91/(128*HarmonicSums`Private`ExpVar^7) - 79/(96*HarmonicSums`Private`ExpVar^6) + 21/(64*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4)) - (67*ln2*z2^2)/40 + (9*ln2^2*z3)/8 - z2*z3 + (375*z5)/64), S[1, 1, -1, -1, 1, -1, HarmonicSums`Private`ExpVar] :> 10*li6half + ln2^6/36 + (-1)^HarmonicSums`Private`ExpVar* (-29625/(4096*HarmonicSums`Private`ExpVar^10) + 2269/(6144*HarmonicSums`Private`ExpVar^9) + 63/(64*HarmonicSums`Private`ExpVar^8) - 253/(512*HarmonicSums`Private`ExpVar^7) + 1/(8*HarmonicSums`Private`ExpVar^6) - 1/(64*HarmonicSums`Private`ExpVar^5)) + li4half*(1/(20*HarmonicSums`Private`ExpVar^9) - 1/(28*HarmonicSums`Private`ExpVar^7) + 1/(20*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + ln2^4*(1/(360*HarmonicSums`Private`ExpVar^9) - 1/(504*HarmonicSums`Private`ExpVar^7) + 1/(360*HarmonicSums`Private`ExpVar^5) - 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar)) + (3*li4half*z2)/2 + (-(50*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(70*HarmonicSums`Private`ExpVar^7) - 1/(50*HarmonicSums`Private`ExpVar^5) + 1/(10*HarmonicSums`Private`ExpVar^3) - 3/(10*HarmonicSums`Private`ExpVar^2) + 3/(5*HarmonicSums`Private`ExpVar))*z2^2 - (101*z2^3)/35 + ln2^2*(-389887/(4300800*HarmonicSums`Private`ExpVar^10) + 51507809/(2032128000*HarmonicSums`Private`ExpVar^9) + 478069/(12042240*HarmonicSums`Private`ExpVar^8) - 3460589/(118540800*HarmonicSums`Private`ExpVar^7) - 7493/(230400*HarmonicSums`Private`ExpVar^6) + 181559/(1728000*HarmonicSums`Private`ExpVar^5) - 1525/(9216*HarmonicSums`Private`ExpVar^4) + 359/(1728*HarmonicSums`Private`ExpVar^3) - 15/(64*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar) + (-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - (17*z2^2)/20) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (345/(512*HarmonicSums`Private`ExpVar^10) - 441/(256*HarmonicSums`Private`ExpVar^9) + 7/(384*HarmonicSums`Private`ExpVar^8) + 35/(128*HarmonicSums`Private`ExpVar^7) - 5/(128*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3)) + (7*z3)/48) + (-1)^HarmonicSums`Private`ExpVar* (-1035/(2048*HarmonicSums`Private`ExpVar^10) + 1323/(1024*HarmonicSums`Private`ExpVar^9) - 7/(512*HarmonicSums`Private`ExpVar^8) - 105/(512*HarmonicSums`Private`ExpVar^7) + 15/(512*HarmonicSums`Private`ExpVar^6) + 15/(256*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^3))*z3 + sinf^2*((3*li4half)/2 + ln2^4/12 - (ln2^2*z2)/4 - (3*z2^2)/5 + (7*ln2*z3)/16) + sinf*(-6*li5half + ln2^5/12 - (ln2^3*z2)/4 + ln2*(-389887/(2150400*HarmonicSums`Private`ExpVar^10) + 51507809/(1016064000*HarmonicSums`Private`ExpVar^9) + 478069/(6021120*HarmonicSums`Private`ExpVar^8) - 3460589/(59270400*HarmonicSums`Private`ExpVar^7) - 7493/(115200*HarmonicSums`Private`ExpVar^6) + 181559/(864000*HarmonicSums`Private`ExpVar^5) - 1525/(4608*HarmonicSums`Private`ExpVar^4) + 359/(864*HarmonicSums`Private`ExpVar^3) - 15/(32*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) - (6*z2^2)/5) + (7*ln2^2*z3)/16 + 6*z5) + ln2*(2216694083/(5419008000*HarmonicSums`Private`ExpVar^10) + 52607557361/(853493760000*HarmonicSums`Private`ExpVar^9) - 181382599/(1011548160*HarmonicSums`Private`ExpVar^8) - 4461691/(8297856000*HarmonicSums`Private`ExpVar^7) + 40231/(256000*HarmonicSums`Private`ExpVar^6) - 2061917/(17280000*HarmonicSums`Private`ExpVar^5) - 2261/(18432*HarmonicSums`Private`ExpVar^4) + 883/(1728*HarmonicSums`Private`ExpVar^3) - 63/(64*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar) + z2*((-1)^HarmonicSums`Private`ExpVar* (-1035/(512*HarmonicSums`Private`ExpVar^10) + 1323/(256*HarmonicSums`Private`ExpVar^9) - 7/(128*HarmonicSums`Private`ExpVar^8) - 105/(128*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 15/(64*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) + (7*z3)/16) + (7/(480*HarmonicSums`Private`ExpVar^9) - 1/(96*HarmonicSums`Private`ExpVar^7) + 7/(480*HarmonicSums`Private`ExpVar^5) - 7/(96*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3 + 6*z5), S[1, 1, -1, -1, 1, 1, HarmonicSums`Private`ExpVar] :> 10*li6half + ln2^6/36 + li4half*(1/(20*HarmonicSums`Private`ExpVar^9) - 1/(28*HarmonicSums`Private`ExpVar^7) + 1/(20*HarmonicSums`Private`ExpVar^5) - 1/(4*HarmonicSums`Private`ExpVar^3) + 3/(4*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar)) + ln2^4*(1/(360*HarmonicSums`Private`ExpVar^9) - 1/(504*HarmonicSums`Private`ExpVar^7) + 1/(360*HarmonicSums`Private`ExpVar^5) - 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar)) + 48513688211/(341397504000*HarmonicSums`Private`ExpVar^10) + 70152614235139/(268850534400000*HarmonicSums`Private`ExpVar^9) - 2502103363/(49787136000*HarmonicSums`Private`ExpVar^8) - 350207591491/(1742549760000*HarmonicSums`Private`ExpVar^7) + 26543663/(103680000*HarmonicSums`Private`ExpVar^6) - 64856623/(259200000*HarmonicSums`Private`ExpVar^5) + 157/(384*HarmonicSums`Private`ExpVar^4) - 4601/(5184*HarmonicSums`Private`ExpVar^3) + 7/(4*HarmonicSums`Private`ExpVar^2) - 3/HarmonicSums`Private`ExpVar + ((3*li4half)/2 + 389887/(4300800*HarmonicSums`Private`ExpVar^10) - 51507809/(2032128000*HarmonicSums`Private`ExpVar^9) - 478069/(12042240*HarmonicSums`Private`ExpVar^8) + 3460589/(118540800*HarmonicSums`Private`ExpVar^7) + 7493/(230400*HarmonicSums`Private`ExpVar^6) - 181559/(1728000*HarmonicSums`Private`ExpVar^5) + 1525/(9216*HarmonicSums`Private`ExpVar^4) - 359/(1728*HarmonicSums`Private`ExpVar^3) + 15/(64*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + ln2^2*((-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - z2^2/4) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (345/(512*HarmonicSums`Private`ExpVar^10) - 441/(256*HarmonicSums`Private`ExpVar^9) + 7/(384*HarmonicSums`Private`ExpVar^8) + 35/(128*HarmonicSums`Private`ExpVar^7) - 5/(128*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3)) + (7*z3)/48) + (-1)^HarmonicSums`Private`ExpVar* (7245/(2048*HarmonicSums`Private`ExpVar^10) - 9261/(1024*HarmonicSums`Private`ExpVar^9) + 49/(512*HarmonicSums`Private`ExpVar^8) + 735/(512*HarmonicSums`Private`ExpVar^7) - 105/(512*HarmonicSums`Private`ExpVar^6) - 105/(256*HarmonicSums`Private`ExpVar^5) + 21/(64*HarmonicSums`Private`ExpVar^4) - 7/(64*HarmonicSums`Private`ExpVar^3))*z3 + sinf^2*((3*li4half)/2 + ln2^4/12 + 389887/(4300800*HarmonicSums`Private`ExpVar^10) - 51507809/(2032128000*HarmonicSums`Private`ExpVar^9) - 478069/(12042240*HarmonicSums`Private`ExpVar^8) + 3460589/(118540800*HarmonicSums`Private`ExpVar^7) + 7493/(230400*HarmonicSums`Private`ExpVar^6) - 181559/(1728000*HarmonicSums`Private`ExpVar^5) + 1525/(9216*HarmonicSums`Private`ExpVar^4) - 359/(1728*HarmonicSums`Private`ExpVar^3) + 15/(64*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar) - (ln2^2*z2)/4 + (7*ln2*z3)/16) + sinf*(-6*li5half + ln2^5/12 - 2216694083/(5419008000* HarmonicSums`Private`ExpVar^10) - 52607557361/ (853493760000*HarmonicSums`Private`ExpVar^9) + 181382599/(1011548160*HarmonicSums`Private`ExpVar^8) + 4461691/(8297856000*HarmonicSums`Private`ExpVar^7) - 40231/(256000*HarmonicSums`Private`ExpVar^6) + 2061917/(17280000*HarmonicSums`Private`ExpVar^5) + 2261/(18432*HarmonicSums`Private`ExpVar^4) - 883/(1728*HarmonicSums`Private`ExpVar^3) + 63/(64*HarmonicSums`Private`ExpVar^2) - 3/(2*HarmonicSums`Private`ExpVar) - (ln2^3*z2)/4 + (7*ln2^2*z3)/16) + ln2*(z2*((-1)^HarmonicSums`Private`ExpVar* (-1035/(512*HarmonicSums`Private`ExpVar^10) + 1323/(256*HarmonicSums`Private`ExpVar^9) - 7/(128*HarmonicSums`Private`ExpVar^8) - 105/(128*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 15/(64*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) + (7*z3)/16) + (7/(480*HarmonicSums`Private`ExpVar^9) - 1/(96*HarmonicSums`Private`ExpVar^7) + 7/(480*HarmonicSums`Private`ExpVar^5) - 7/(96*HarmonicSums`Private`ExpVar^3) + 7/(32*HarmonicSums`Private`ExpVar^2) - 7/(16*HarmonicSums`Private`ExpVar))*z3), S[1, 1, -1, 1, -1, -1, HarmonicSums`Private`ExpVar] :> li6half + (11*ln2^6)/720 + (-1)^HarmonicSums`Private`ExpVar* (159569813/(18063360*HarmonicSums`Private`ExpVar^10) + 1837199/(307200*HarmonicSums`Private`ExpVar^9) - 188993/(115200*HarmonicSums`Private`ExpVar^8) - 991/(1024*HarmonicSums`Private`ExpVar^7) + 1021/(1152*HarmonicSums`Private`ExpVar^6) - 43/(128*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)) - s6/4 + ln2^4*(1/(1440*HarmonicSums`Private`ExpVar^9) - 1/(2016*HarmonicSums`Private`ExpVar^7) + 1/(1440*HarmonicSums`Private`ExpVar^5) - 1/(288*HarmonicSums`Private`ExpVar^3) + 1/(96*HarmonicSums`Private`ExpVar^2) - 1/(48*HarmonicSums`Private`ExpVar) - z2/8) + (-1)^HarmonicSums`Private`ExpVar* (4347/(256*HarmonicSums`Private`ExpVar^10) - 1939/(256*HarmonicSums`Private`ExpVar^9) - 735/(512*HarmonicSums`Private`ExpVar^8) + 285/(256*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) - 9/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4))*z2 + (-(480*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(672*HarmonicSums`Private`ExpVar^7) - 1/(480*HarmonicSums`Private`ExpVar^5) + 1/(96*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z2^2 - (649*z2^3)/1680 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (4347/(256*HarmonicSums`Private`ExpVar^10) - 1939/(256*HarmonicSums`Private`ExpVar^9) - 735/(512*HarmonicSums`Private`ExpVar^8) + 285/(256*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) - 9/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4)) + (-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 - (27*z2^2)/80) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-345/(256*HarmonicSums`Private`ExpVar^10) + 441/(128*HarmonicSums`Private`ExpVar^9) - 7/(192*HarmonicSums`Private`ExpVar^8) - 35/(64*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3)) + (7*z3)/48) + (-1)^HarmonicSums`Private`ExpVar* (7245/(2048*HarmonicSums`Private`ExpVar^10) - 9261/(1024*HarmonicSums`Private`ExpVar^9) + 49/(512*HarmonicSums`Private`ExpVar^8) + 735/(512*HarmonicSums`Private`ExpVar^7) - 105/(512*HarmonicSums`Private`ExpVar^6) - 105/(256*HarmonicSums`Private`ExpVar^5) + 21/(64*HarmonicSums`Private`ExpVar^4) - 7/(64*HarmonicSums`Private`ExpVar^3))*z3 + (7*z3^2)/32 + sinf^2*(ln2^4/48 - (ln2^2*z2)/8 - z2^2/16 - (ln2*z3)/16) + sinf*(ln2^5/30 - (ln2^3*z2)/4 + (-1)^HarmonicSums`Private`ExpVar* (-1035/(512*HarmonicSums`Private`ExpVar^10) + 1323/(256*HarmonicSums`Private`ExpVar^9) - 7/(128*HarmonicSums`Private`ExpVar^8) - 105/(128*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 15/(64*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3))*z2 - (3*ln2*z2^2)/40 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-1035/(512*HarmonicSums`Private`ExpVar^10) + 1323/(256*HarmonicSums`Private`ExpVar^9) - 7/(128*HarmonicSums`Private`ExpVar^8) - 105/(128*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 15/(64*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) - z3/16) + (3*z5)/64) + ln2*(-328669/(6144000*HarmonicSums`Private`ExpVar^10) + 953497/(3317760*HarmonicSums`Private`ExpVar^9) - 47311/(884736*HarmonicSums`Private`ExpVar^8) - 1871/(10752*HarmonicSums`Private`ExpVar^7) + 6893/(27648*HarmonicSums`Private`ExpVar^6) - 4987/(23040*HarmonicSums`Private`ExpVar^5) + 449/(3072*HarmonicSums`Private`ExpVar^4) - 23/(288*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) + z2*((-1)^HarmonicSums`Private`ExpVar* (-1035/(512*HarmonicSums`Private`ExpVar^10) + 1323/(256*HarmonicSums`Private`ExpVar^9) - 7/(128*HarmonicSums`Private`ExpVar^8) - 105/(128*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 15/(64*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) + (7*z3)/16) + (-(480*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(672*HarmonicSums`Private`ExpVar^7) - 1/(480*HarmonicSums`Private`ExpVar^5) + 1/(96*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3 + z5/2), S[1, 1, -1, 1, -1, 1, HarmonicSums`Private`ExpVar] :> li6half + (11*ln2^6)/720 - 2994567119/(6635520000* HarmonicSums`Private`ExpVar^10) + 3446197127/(8360755200*HarmonicSums`Private`ExpVar^9) + 3114571/(49545216*HarmonicSums`Private`ExpVar^8) - 3207047/(13547520*HarmonicSums`Private`ExpVar^7) + 86521/(552960*HarmonicSums`Private`ExpVar^6) - 33001/(1382400*HarmonicSums`Private`ExpVar^5) - 2105/(36864*HarmonicSums`Private`ExpVar^4) + 127/(1728*HarmonicSums`Private`ExpVar^3) - 3/(64*HarmonicSums`Private`ExpVar^2) - s6/4 + ln2^4*(1/(1440*HarmonicSums`Private`ExpVar^9) - 1/(2016*HarmonicSums`Private`ExpVar^7) + 1/(1440*HarmonicSums`Private`ExpVar^5) - 1/(288*HarmonicSums`Private`ExpVar^3) + 1/(96*HarmonicSums`Private`ExpVar^2) - 1/(48*HarmonicSums`Private`ExpVar) - z2/8) + (-1)^HarmonicSums`Private`ExpVar* (-4347/(256*HarmonicSums`Private`ExpVar^10) + 1939/(256*HarmonicSums`Private`ExpVar^9) + 735/(512*HarmonicSums`Private`ExpVar^8) - 285/(256*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) + 9/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4))*z2 + (1/(160*HarmonicSums`Private`ExpVar^9) - 1/(224*HarmonicSums`Private`ExpVar^7) + 1/(160*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^3) + 3/(32*HarmonicSums`Private`ExpVar^2) - 3/(16*HarmonicSums`Private`ExpVar))*z2^2 + (137*z2^3)/560 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (4347/(256*HarmonicSums`Private`ExpVar^10) - 1939/(256*HarmonicSums`Private`ExpVar^9) - 735/(512*HarmonicSums`Private`ExpVar^8) + 285/(256*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) - 9/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4)) + (-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 - (7*z2^2)/80) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (-345/(256*HarmonicSums`Private`ExpVar^10) + 441/(128*HarmonicSums`Private`ExpVar^9) - 7/(192*HarmonicSums`Private`ExpVar^8) - 35/(64*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3)) + (7*z3)/48) + (-1)^HarmonicSums`Private`ExpVar* (-1035/(2048*HarmonicSums`Private`ExpVar^10) + 1323/(1024*HarmonicSums`Private`ExpVar^9) - 7/(512*HarmonicSums`Private`ExpVar^8) - 105/(512*HarmonicSums`Private`ExpVar^7) + 15/(512*HarmonicSums`Private`ExpVar^6) + 15/(256*HarmonicSums`Private`ExpVar^5) - 3/(64*HarmonicSums`Private`ExpVar^4) + 1/(64*HarmonicSums`Private`ExpVar^3))*z3 - (25*z3^2)/32 + sinf^2*(ln2^4/48 - (ln2^2*z2)/8 + (3*z2^2)/16 - (ln2*z3)/16) + ln2*(z2*((-1)^HarmonicSums`Private`ExpVar* (1035/(512*HarmonicSums`Private`ExpVar^10) - 1323/(256*HarmonicSums`Private`ExpVar^9) + 7/(128*HarmonicSums`Private`ExpVar^8) + 105/(128*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 15/(64*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + (7*z3)/16) + (-(480*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(672*HarmonicSums`Private`ExpVar^7) - 1/(480*HarmonicSums`Private`ExpVar^5) + 1/(96*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar))*z3) + sinf*(ln2^5/30 + 328669/(6144000*HarmonicSums`Private`ExpVar^10) - 953497/(3317760*HarmonicSums`Private`ExpVar^9) + 47311/(884736*HarmonicSums`Private`ExpVar^8) + 1871/(10752*HarmonicSums`Private`ExpVar^7) - 6893/(27648*HarmonicSums`Private`ExpVar^6) + 4987/(23040*HarmonicSums`Private`ExpVar^5) - 449/(3072*HarmonicSums`Private`ExpVar^4) + 23/(288*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) - (ln2^3*z2)/4 + (-1)^HarmonicSums`Private`ExpVar* (1035/(512*HarmonicSums`Private`ExpVar^10) - 1323/(256*HarmonicSums`Private`ExpVar^9) + 7/(128*HarmonicSums`Private`ExpVar^8) + 105/(128*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 15/(64*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3))*z2 + (17*ln2*z2^2)/40 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-1035/(512*HarmonicSums`Private`ExpVar^10) + 1323/(256*HarmonicSums`Private`ExpVar^9) - 7/(128*HarmonicSums`Private`ExpVar^8) - 105/(128*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 15/(64*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) - z3/16) - (29*z5)/64), S[1, 1, -1, 1, 1, -1, HarmonicSums`Private`ExpVar] :> ln2^6/72 + li4half*(-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) - 4145201/(6635520*HarmonicSums`Private`ExpVar^10) - 32481251/(1045094400*HarmonicSums`Private`ExpVar^9) + 617299/(2064384*HarmonicSums`Private`ExpVar^8) - 890513/(3386880*HarmonicSums`Private`ExpVar^7) + 193/(1280*HarmonicSums`Private`ExpVar^6) - 11387/(172800*HarmonicSums`Private`ExpVar^5) + 101/(4608*HarmonicSums`Private`ExpVar^4) - 1/(216*HarmonicSums`Private`ExpVar^3) - (li4half*z2)/2 - (ln2^4*z2)/8 + (1/(150*HarmonicSums`Private`ExpVar^9) - 1/(210*HarmonicSums`Private`ExpVar^7) + 1/(150*HarmonicSums`Private`ExpVar^5) - 1/(30*HarmonicSums`Private`ExpVar^3) + 1/(10*HarmonicSums`Private`ExpVar^2) - 1/(5*HarmonicSums`Private`ExpVar))*z2^2 + (51*z2^3)/140 + ln2*((-1)^HarmonicSums`Private`ExpVar* (558385/(10752*HarmonicSums`Private`ExpVar^10) - 5287/(1280*HarmonicSums`Private`ExpVar^9) - 18983/(3840*HarmonicSums`Private`ExpVar^8) + 43/(64*HarmonicSums`Private`ExpVar^7) + 155/(192*HarmonicSums`Private`ExpVar^6) - 13/(32*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4)) + (-1)^HarmonicSums`Private`ExpVar* (1035/(512*HarmonicSums`Private`ExpVar^10) - 1323/(256*HarmonicSums`Private`ExpVar^9) + 7/(128*HarmonicSums`Private`ExpVar^8) + 105/(128*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 15/(64*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3))*z2) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-4347/(256*HarmonicSums`Private`ExpVar^10) + 1939/(256*HarmonicSums`Private`ExpVar^9) + 735/(512*HarmonicSums`Private`ExpVar^8) - 285/(256*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) + 9/(32*HarmonicSums`Private`ExpVar^5) - 3/(32*HarmonicSums`Private`ExpVar^4)) - z2^2/20) + sinf^2*(-(li4half/2) + (-1)^HarmonicSums`Private`ExpVar*ln2* (1035/(512*HarmonicSums`Private`ExpVar^10) - 1323/(256*HarmonicSums`Private`ExpVar^9) + 7/(128*HarmonicSums`Private`ExpVar^8) + 105/(128*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 15/(64*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + z2^2/5) + ln2^3*((-1)^HarmonicSums`Private`ExpVar* (345/(512*HarmonicSums`Private`ExpVar^10) - 441/(256*HarmonicSums`Private`ExpVar^9) + 7/(384*HarmonicSums`Private`ExpVar^8) + 35/(128*HarmonicSums`Private`ExpVar^7) - 5/(128*HarmonicSums`Private`ExpVar^6) - 5/(64*HarmonicSums`Private`ExpVar^5) + 1/(16*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3)) + z3/2) - z3^2/2 + sinf*(li5half + ln2^5/40 - (ln2^3*z2)/6 + ln2*((-1)^HarmonicSums`Private`ExpVar* (-4347/(128*HarmonicSums`Private`ExpVar^10) + 1939/(128*HarmonicSums`Private`ExpVar^9) + 735/(256*HarmonicSums`Private`ExpVar^8) - 285/(128*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 9/(16*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4)) + (7*z2^2)/20) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (1035/(512*HarmonicSums`Private`ExpVar^10) - 1323/(256*HarmonicSums`Private`ExpVar^9) + 7/(128*HarmonicSums`Private`ExpVar^8) + 105/(128*HarmonicSums`Private`ExpVar^7) - 15/(128*HarmonicSums`Private`ExpVar^6) - 15/(64*HarmonicSums`Private`ExpVar^5) + 3/(16*HarmonicSums`Private`ExpVar^4) - 1/(16*HarmonicSums`Private`ExpVar^3)) + z3/2) + (z2*z3)/2 - (63*z5)/32), S[1, 1, -1, 1, 1, 1, HarmonicSums`Private`ExpVar] :> ln2^6/72 + (-1)^HarmonicSums`Private`ExpVar* (142897/(5120*HarmonicSums`Private`ExpVar^10) + 63751/(11520*HarmonicSums`Private`ExpVar^9) - 165/(64*HarmonicSums`Private`ExpVar^8) - 253/(384*HarmonicSums`Private`ExpVar^7) + 109/(192*HarmonicSums`Private`ExpVar^6) - 11/(96*HarmonicSums`Private`ExpVar^5)) + li4half*(-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar)) + (-(li4half/2) + (-1)^HarmonicSums`Private`ExpVar* (4347/(256*HarmonicSums`Private`ExpVar^10) - 1939/(256*HarmonicSums`Private`ExpVar^9) - 735/(512*HarmonicSums`Private`ExpVar^8) + 285/(256*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) - 9/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4)))*sinf^2 + (-1)^HarmonicSums`Private`ExpVar* (-345/(512*HarmonicSums`Private`ExpVar^10) + 441/(256*HarmonicSums`Private`ExpVar^9) - 7/(384*HarmonicSums`Private`ExpVar^8) - 35/(128*HarmonicSums`Private`ExpVar^7) + 5/(128*HarmonicSums`Private`ExpVar^6) + 5/(64*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^3))*sinf^3 - (ln2^4*z2)/8 + (-(li4half/2) + (-1)^HarmonicSums`Private`ExpVar* (4347/(256*HarmonicSums`Private`ExpVar^10) - 1939/(256*HarmonicSums`Private`ExpVar^9) - 735/(512*HarmonicSums`Private`ExpVar^8) + 285/(256*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) - 9/(32*HarmonicSums`Private`ExpVar^5) + 3/(32*HarmonicSums`Private`ExpVar^4)))*z2 - (ln2^2*z2^2)/4 - (23*z2^3)/140 + (ln2^3*z3)/2 + (-1)^HarmonicSums`Private`ExpVar* (-345/(256*HarmonicSums`Private`ExpVar^10) + 441/(128*HarmonicSums`Private`ExpVar^9) - 7/(192*HarmonicSums`Private`ExpVar^8) - 35/(64*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) - 1/(8*HarmonicSums`Private`ExpVar^4) + 1/(24*HarmonicSums`Private`ExpVar^3))*z3 + z3^2/2 + sinf*(li5half + ln2^5/40 + (-1)^HarmonicSums`Private`ExpVar* (-558385/(10752*HarmonicSums`Private`ExpVar^10) + 5287/(1280*HarmonicSums`Private`ExpVar^9) + 18983/(3840*HarmonicSums`Private`ExpVar^8) - 43/(64*HarmonicSums`Private`ExpVar^7) - 155/(192*HarmonicSums`Private`ExpVar^6) + 13/(32*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4)) - (ln2^3*z2)/6 - (ln2*z2^2)/20 + z2*((-1)^HarmonicSums`Private`ExpVar* (-1035/(512*HarmonicSums`Private`ExpVar^10) + 1323/(256*HarmonicSums`Private`ExpVar^9) - 7/(128*HarmonicSums`Private`ExpVar^8) - 105/(128*HarmonicSums`Private`ExpVar^7) + 15/(128*HarmonicSums`Private`ExpVar^6) + 15/(64*HarmonicSums`Private`ExpVar^5) - 3/(16*HarmonicSums`Private`ExpVar^4) + 1/(16*HarmonicSums`Private`ExpVar^3)) - z3/2) + (ln2^2*z3)/2 + z5/32) + ln2*(-(z2*z3) + 2*z5), S[1, 1, 1, -1, -1, -1, HarmonicSums`Private`ExpVar] :> -5*li6half - ln2^6/48 + (-1)^HarmonicSums`Private`ExpVar* (-14929/(1024*HarmonicSums`Private`ExpVar^10) + 30241/(15360*HarmonicSums`Private`ExpVar^9) + 1169/(768*HarmonicSums`Private`ExpVar^8) - 347/(384*HarmonicSums`Private`ExpVar^7) + 31/(128*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5)) + li4half*(-(20*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(28*HarmonicSums`Private`ExpVar^7) - 1/(20*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) + ln2^4*(-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar) - (5*z2)/48) + ((-3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (315/(32*HarmonicSums`Private`ExpVar^10) + 609/(256*HarmonicSums`Private`ExpVar^9) - 735/(512*HarmonicSums`Private`ExpVar^8) - 35/(256*HarmonicSums`Private`ExpVar^7) + 45/(128*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4)))*z2 + (1/(50*HarmonicSums`Private`ExpVar^9) - 1/(70*HarmonicSums`Private`ExpVar^7) + 1/(50*HarmonicSums`Private`ExpVar^5) - 1/(10*HarmonicSums`Private`ExpVar^3) + 3/(10*HarmonicSums`Private`ExpVar^2) - 3/(5*HarmonicSums`Private`ExpVar))*z2^2 + (61*z2^3)/35 + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (315/(32*HarmonicSums`Private`ExpVar^10) + 609/(256*HarmonicSums`Private`ExpVar^9) - 735/(512*HarmonicSums`Private`ExpVar^8) - 35/(256*HarmonicSums`Private`ExpVar^7) + 45/(128*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4)) + (1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 + (29*z2^2)/40) + ln2^3*(-(120*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(216*HarmonicSums`Private`ExpVar^8) - 1/(216*HarmonicSums`Private`ExpVar^6) + 1/(72*HarmonicSums`Private`ExpVar^4) - 1/(36*HarmonicSums`Private`ExpVar^3) + 1/(36*HarmonicSums`Private`ExpVar^2) - (7*z3)/18) + sinf^3*(-(ln2^3/36) - (ln2*z2)/12 - z3/24) + (-(80*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(144*HarmonicSums`Private`ExpVar^8) - 1/(144*HarmonicSums`Private`ExpVar^6) + 1/(48*HarmonicSums`Private`ExpVar^4) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2))*z3 - z3^2/12 + sinf^2*((-3*li4half)/2 - ln2^4/8 + (ln2^2*z2)/8 + (3*z2^2)/5 - ln2*z3) + ln2*(545566807/(16257024000*HarmonicSums`Private`ExpVar^10) + 244235585389/(2560481280000*HarmonicSums`Private`ExpVar^9) - 889750951/(15173222400*HarmonicSums`Private`ExpVar^8) - 1789918799/(24893568000*HarmonicSums`Private`ExpVar^7) + 1484291/(6912000*HarmonicSums`Private`ExpVar^6) - 17072833/(51840000*HarmonicSums`Private`ExpVar^5) + 22543/(55296*HarmonicSums`Private`ExpVar^4) - 2365/(5184*HarmonicSums`Private`ExpVar^3) + 31/(64*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) + z2*(-(40*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(72*HarmonicSums`Private`ExpVar^8) - 1/(72*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - (7*z3)/6) + (-(30*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(42*HarmonicSums`Private`ExpVar^7) - 1/(30*HarmonicSums`Private`ExpVar^5) + 1/(6*HarmonicSums`Private`ExpVar^3) - 1/(2*HarmonicSums`Private`ExpVar^2) + HarmonicSums`Private`ExpVar^ (-1))*z3 - 4*z5) + sinf*(4*li5half - ln2^5/12 + ln2^3*(-(360*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(504*HarmonicSums`Private`ExpVar^7) - 1/(360*HarmonicSums`Private`ExpVar^5) + 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) + ln2*((-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 + (19*z2^2)/20) - ln2^2*z3 + (-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z3 - (z2*z3)/8 - 4*z5), S[1, 1, 1, -1, -1, 1, HarmonicSums`Private`ExpVar] :> -5*li6half - ln2^6/48 + li4half*(-(20*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(28*HarmonicSums`Private`ExpVar^7) - 1/(20*HarmonicSums`Private`ExpVar^5) + 1/(4*HarmonicSums`Private`ExpVar^3) - 3/(4*HarmonicSums`Private`ExpVar^2) + 3/(2*HarmonicSums`Private`ExpVar)) - 2732334774317/(20483850240000*HarmonicSums`Private`ExpVar^10) + 643154078242513/(3226206412800000*HarmonicSums`Private`ExpVar^9) + 103292412919/(6372753408000*HarmonicSums`Private`ExpVar^8) - 895469853883/(5227649280000*HarmonicSums`Private`ExpVar^7) + 8209517/(69120000*HarmonicSums`Private`ExpVar^6) + 206401867/(1555200000*HarmonicSums`Private`ExpVar^5) - 172565/(331776*HarmonicSums`Private`ExpVar^4) + 15301/(15552*HarmonicSums`Private`ExpVar^3) - 95/(64*HarmonicSums`Private`ExpVar^2) + 2/HarmonicSums`Private`ExpVar + ln2^4*(-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar) - (5*z2)/48) + ((-3*li4half)/2 + (-1)^HarmonicSums`Private`ExpVar* (-315/(32*HarmonicSums`Private`ExpVar^10) - 609/(256*HarmonicSums`Private`ExpVar^9) + 735/(512*HarmonicSums`Private`ExpVar^8) + 35/(256*HarmonicSums`Private`ExpVar^7) - 45/(128*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4)))*z2 + sinf^2*((-3*li4half)/2 - ln2^4/8 + (ln2^2*z2)/8) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (315/(32*HarmonicSums`Private`ExpVar^10) + 609/(256*HarmonicSums`Private`ExpVar^9) - 735/(512*HarmonicSums`Private`ExpVar^8) - 35/(256*HarmonicSums`Private`ExpVar^7) + 45/(128*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4)) + (1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 + z2^2/8) + ln2*z2*(-(40*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(72*HarmonicSums`Private`ExpVar^8) - 1/(72*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - z3/6) + ln2^3*(-(120*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(216*HarmonicSums`Private`ExpVar^8) - 1/(216*HarmonicSums`Private`ExpVar^6) + 1/(72*HarmonicSums`Private`ExpVar^4) - 1/(36*HarmonicSums`Private`ExpVar^3) + 1/(36*HarmonicSums`Private`ExpVar^2) - z3/18) + sinf^3*(-(ln2^3/36) - (ln2*z2)/12 + (7*z3)/24) + (7/(80*HarmonicSums`Private`ExpVar^10) - 7/(144*HarmonicSums`Private`ExpVar^8) + 7/(144*HarmonicSums`Private`ExpVar^6) - 7/(48*HarmonicSums`Private`ExpVar^4) + 7/(24*HarmonicSums`Private`ExpVar^3) - 7/(24*HarmonicSums`Private`ExpVar^2))*z3 + (7*z3^2)/12 + sinf*(4*li5half - ln2^5/12 + ln2^3*(-(360*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(504*HarmonicSums`Private`ExpVar^7) - 1/(360*HarmonicSums`Private`ExpVar^5) + 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar)) - 545566807/(16257024000*HarmonicSums`Private`ExpVar^10) - 244235585389/(2560481280000*HarmonicSums`Private`ExpVar^9) + 889750951/(15173222400*HarmonicSums`Private`ExpVar^8) + 1789918799/(24893568000*HarmonicSums`Private`ExpVar^7) - 1484291/(6912000*HarmonicSums`Private`ExpVar^6) + 17072833/(51840000*HarmonicSums`Private`ExpVar^5) - 22543/(55296*HarmonicSums`Private`ExpVar^4) + 2365/(5184*HarmonicSums`Private`ExpVar^3) - 31/(64*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar) + ln2*((-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - z2^2/4) + (7/(240*HarmonicSums`Private`ExpVar^9) - 1/(48*HarmonicSums`Private`ExpVar^7) + 7/(240*HarmonicSums`Private`ExpVar^5) - 7/(48*HarmonicSums`Private`ExpVar^3) + 7/(16*HarmonicSums`Private`ExpVar^2) - 7/(8*HarmonicSums`Private`ExpVar))*z3 + (7*z2*z3)/8), S[1, 1, 1, -1, 1, -1, HarmonicSums`Private`ExpVar] :> -2*li6half - ln2^6/60 - 1959325627/(6635520000*HarmonicSums`Private`ExpVar^ 10) + 216738163/(8360755200*HarmonicSums`Private`ExpVar^9) + 27606053/(148635648*HarmonicSums`Private`ExpVar^8) - 3311423/(13547520*HarmonicSums`Private`ExpVar^7) + 345167/(1658880*HarmonicSums`Private`ExpVar^6) - 197669/(1382400*HarmonicSums`Private`ExpVar^5) + 3107/(36864*HarmonicSums`Private`ExpVar^4) - 73/(1728*HarmonicSums`Private`ExpVar^3) + 1/(64*HarmonicSums`Private`ExpVar^2) - s6/2 + ln2^4*(-(480*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(672*HarmonicSums`Private`ExpVar^7) - 1/(480*HarmonicSums`Private`ExpVar^5) + 1/(96*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar) + z2/16) + (-(1200*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(1680*HarmonicSums`Private`ExpVar^7) - 1/(1200*HarmonicSums`Private`ExpVar^5) + 1/(240*HarmonicSums`Private`ExpVar^3) - 1/(80*HarmonicSums`Private`ExpVar^2) + 1/(40*HarmonicSums`Private`ExpVar))*z2^2 + (7*z2^3)/40 + sinf^2*(-(ln2^4/16) + (ln2^2*z2)/4 - z2^2/40) + ln2^2*((-1)^HarmonicSums`Private`ExpVar* (-315/(32*HarmonicSums`Private`ExpVar^10) - 609/(256*HarmonicSums`Private`ExpVar^9) + 735/(512*HarmonicSums`Private`ExpVar^8) + 35/(256*HarmonicSums`Private`ExpVar^7) - 45/(128*HarmonicSums`Private`ExpVar^6) + 5/(32*HarmonicSums`Private`ExpVar^5) - 1/(32*HarmonicSums`Private`ExpVar^4)) + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (5*z2^2)/8) + ln2*((-1)^HarmonicSums`Private`ExpVar* (3633/(256*HarmonicSums`Private`ExpVar^10) + 1365/(128*HarmonicSums`Private`ExpVar^9) - 315/(128*HarmonicSums`Private`ExpVar^8) - 15/(16*HarmonicSums`Private`ExpVar^7) + 5/(8*HarmonicSums`Private`ExpVar^6) - 1/(8*HarmonicSums`Private`ExpVar^5)) + z2*(1/(40*HarmonicSums`Private`ExpVar^10) - 1/(72*HarmonicSums`Private`ExpVar^8) + 1/(72*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) - z3/3)) + ln2^3*(-(120*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(216*HarmonicSums`Private`ExpVar^8) - 1/(216*HarmonicSums`Private`ExpVar^6) + 1/(72*HarmonicSums`Private`ExpVar^4) - 1/(36*HarmonicSums`Private`ExpVar^3) + 1/(36*HarmonicSums`Private`ExpVar^2) - (7*z3)/18) + sinf^3*(-(ln2^3/36) + (ln2*z2)/12 + z3/48) + (1/(160*HarmonicSums`Private`ExpVar^10) - 1/(288*HarmonicSums`Private`ExpVar^8) + 1/(288*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(48*HarmonicSums`Private`ExpVar^2))*z3 + (2*z3^2)/3 + sinf*(li5half - (7*ln2^5)/120 + ln2^3*(-(360*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(504*HarmonicSums`Private`ExpVar^7) - 1/(360*HarmonicSums`Private`ExpVar^5) + 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar) + z2/4) + ln2*((-1)^HarmonicSums`Private`ExpVar* (-315/(16*HarmonicSums`Private`ExpVar^10) - 609/(128*HarmonicSums`Private`ExpVar^9) + 735/(256*HarmonicSums`Private`ExpVar^8) + 35/(128*HarmonicSums`Private`ExpVar^7) - 45/(64*HarmonicSums`Private`ExpVar^6) + 5/(16*HarmonicSums`Private`ExpVar^5) - 1/(16*HarmonicSums`Private`ExpVar^4)) + (1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (3*z2^2)/5) - (ln2^2*z3)/2 + (1/(480*HarmonicSums`Private`ExpVar^9) - 1/(672*HarmonicSums`Private`ExpVar^7) + 1/(480*HarmonicSums`Private`ExpVar^5) - 1/(96*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3 - (7*z2*z3)/16 + z5/32), S[1, 1, 1, -1, 1, 1, HarmonicSums`Private`ExpVar] :> -2*li6half - ln2^6/60 + (-1)^HarmonicSums`Private`ExpVar* (-11343/(1024*HarmonicSums`Private`ExpVar^10) + 34429/(3840*HarmonicSums`Private`ExpVar^9) + 65/(192*HarmonicSums`Private`ExpVar^8) - 437/(384*HarmonicSums`Private`ExpVar^7) + 21/(64*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5)) - s6/2 + ln2^4*(-(480*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(672*HarmonicSums`Private`ExpVar^7) - 1/(480*HarmonicSums`Private`ExpVar^5) + 1/(96*HarmonicSums`Private`ExpVar^3) - 1/(32*HarmonicSums`Private`ExpVar^2) + 1/(16*HarmonicSums`Private`ExpVar) + z2/16) + (-1)^HarmonicSums`Private`ExpVar* (315/(32*HarmonicSums`Private`ExpVar^10) + 609/(256*HarmonicSums`Private`ExpVar^9) - 735/(512*HarmonicSums`Private`ExpVar^8) - 35/(256*HarmonicSums`Private`ExpVar^7) + 45/(128*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4))*z2 + (1/(1200*HarmonicSums`Private`ExpVar^9) - 1/(1680*HarmonicSums`Private`ExpVar^7) + 1/(1200*HarmonicSums`Private`ExpVar^5) - 1/(240*HarmonicSums`Private`ExpVar^3) + 1/(80*HarmonicSums`Private`ExpVar^2) - 1/(40*HarmonicSums`Private`ExpVar))*z2^2 + (111*z2^3)/280 + ln2^2*((1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (27*z2^2)/40) + ln2^3*(-(120*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(216*HarmonicSums`Private`ExpVar^8) - 1/(216*HarmonicSums`Private`ExpVar^6) + 1/(72*HarmonicSums`Private`ExpVar^4) - 1/(36*HarmonicSums`Private`ExpVar^3) + 1/(36*HarmonicSums`Private`ExpVar^2) - (5*z3)/9) + sinf^3*(-(ln2^3/36) + (ln2*z2)/12 - (7*z3)/48) + (-7/(160*HarmonicSums`Private`ExpVar^10) + 7/(288*HarmonicSums`Private`ExpVar^8) - 7/(288*HarmonicSums`Private`ExpVar^6) + 7/(96*HarmonicSums`Private`ExpVar^4) - 7/(48*HarmonicSums`Private`ExpVar^3) + 7/(48*HarmonicSums`Private`ExpVar^2))*z3 - z3^2/6 + sinf^2*(-(ln2^4/16) + (-1)^HarmonicSums`Private`ExpVar* (315/(32*HarmonicSums`Private`ExpVar^10) + 609/(256*HarmonicSums`Private`ExpVar^9) - 735/(512*HarmonicSums`Private`ExpVar^8) - 35/(256*HarmonicSums`Private`ExpVar^7) + 45/(128*HarmonicSums`Private`ExpVar^6) - 5/(32*HarmonicSums`Private`ExpVar^5) + 1/(32*HarmonicSums`Private`ExpVar^4)) + (ln2^2*z2)/4 + z2^2/40 - (ln2*z3)/2) + ln2*(z2*(1/(40*HarmonicSums`Private`ExpVar^10) - 1/(72*HarmonicSums`Private`ExpVar^8) + 1/(72*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) + z3/6) + (-(60*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(84*HarmonicSums`Private`ExpVar^7) - 1/(60*HarmonicSums`Private`ExpVar^5) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(4*HarmonicSums`Private`ExpVar^2) + 1/(2*HarmonicSums`Private`ExpVar))*z3 - 2*z5) + sinf*(li5half - (7*ln2^5)/120 + (-1)^HarmonicSums`Private`ExpVar* (-3633/(256*HarmonicSums`Private`ExpVar^10) - 1365/(128*HarmonicSums`Private`ExpVar^9) + 315/(128*HarmonicSums`Private`ExpVar^8) + 15/(16*HarmonicSums`Private`ExpVar^7) - 5/(8*HarmonicSums`Private`ExpVar^6) + 1/(8*HarmonicSums`Private`ExpVar^5)) + ln2^3*(-(360*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(504*HarmonicSums`Private`ExpVar^7) - 1/(360*HarmonicSums`Private`ExpVar^5) + 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar) + z2/4) + ln2*((1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + (7*z2^2)/10) - ln2^2*z3 + (-7/(480*HarmonicSums`Private`ExpVar^9) + 1/(96*HarmonicSums`Private`ExpVar^7) - 7/(480*HarmonicSums`Private`ExpVar^5) + 7/(96*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3 + (z2*z3)/16 - (63*z5)/32), S[1, 1, 1, 1, -1, -1, HarmonicSums`Private`ExpVar] :> li6half + ln2^6/120 + li4half*(1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) - 4402094581571/(40967700480000*HarmonicSums`Private`ExpVar^10) + 393339225380431/(6452412825600000*HarmonicSums`Private`ExpVar^9) + 11855756497/(157351936000*HarmonicSums`Private`ExpVar^8) - 2281142040991/(10455298560000*HarmonicSums`Private`ExpVar^7) + 136841117/(414720000*HarmonicSums`Private`ExpVar^6) - 1260055871/(3110400000*HarmonicSums`Private`ExpVar^5) + 299341/(663552*HarmonicSums`Private`ExpVar^4) - 14855/(31104*HarmonicSums`Private`ExpVar^3) + 63/(128*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar) + sinf^4*(ln2^2/48 + z2/48) + ln2^4*(1/(360*HarmonicSums`Private`ExpVar^9) - 1/(504*HarmonicSums`Private`ExpVar^7) + 1/(360*HarmonicSums`Private`ExpVar^5) - 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar) + z2/12) + (li4half/2 - 121/(33600*HarmonicSums`Private`ExpVar^10) - 59/(2016*HarmonicSums`Private`ExpVar^9) + 23/(10080*HarmonicSums`Private`ExpVar^8) + 11/(480*HarmonicSums`Private`ExpVar^7) - 7/(2880*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^5) + 19/(192*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2^2 + (9*z2^3)/80 + ln2^2*(-121/(33600*HarmonicSums`Private`ExpVar^10) - 59/(2016*HarmonicSums`Private`ExpVar^9) + 23/(10080*HarmonicSums`Private`ExpVar^8) + 11/(480*HarmonicSums`Private`ExpVar^7) - 7/(2880*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^5) + 19/(192*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) + (1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 + (9*z2^2)/80) + sinf^2*(li4half/2 + ln2^4/12 + ln2^2*(1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar) + z2/8) + (1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 + z2^2/8) + ln2*((-1)^HarmonicSums`Private`ExpVar* (-14595/(1024*HarmonicSums`Private`ExpVar^10) + 1575/(512*HarmonicSums`Private`ExpVar^9) + 35/(32*HarmonicSums`Private`ExpVar^8) - 105/(128*HarmonicSums`Private`ExpVar^7) + 15/(64*HarmonicSums`Private`ExpVar^6) - 1/(32*HarmonicSums`Private`ExpVar^5)) + z2*(1/(40*HarmonicSums`Private`ExpVar^10) - 1/(72*HarmonicSums`Private`ExpVar^8) + 1/(72*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) + z3/6)) + sinf^3*(ln2^3/18 + (ln2*z2)/12 - (7*z3)/48) + ln2^3*(1/(60*HarmonicSums`Private`ExpVar^10) - 1/(108*HarmonicSums`Private`ExpVar^8) + 1/(108*HarmonicSums`Private`ExpVar^6) - 1/(36*HarmonicSums`Private`ExpVar^4) + 1/(18*HarmonicSums`Private`ExpVar^3) - 1/(18*HarmonicSums`Private`ExpVar^2) + z3/9) + (-7/(160*HarmonicSums`Private`ExpVar^10) + 7/(288*HarmonicSums`Private`ExpVar^8) - 7/(288*HarmonicSums`Private`ExpVar^6) + 7/(96*HarmonicSums`Private`ExpVar^4) - 7/(48*HarmonicSums`Private`ExpVar^3) + 7/(48*HarmonicSums`Private`ExpVar^2))*z3 - (7*z3^2)/24 + sinf*(-li5half + ln2^5/24 + ln2^3*(1/(180*HarmonicSums`Private`ExpVar^9) - 1/(252*HarmonicSums`Private`ExpVar^7) + 1/(180*HarmonicSums`Private`ExpVar^5) - 1/(36*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar) + z2/6) + ln2*((1/(120*HarmonicSums`Private`ExpVar^9) - 1/(168*HarmonicSums`Private`ExpVar^7) + 1/(120*HarmonicSums`Private`ExpVar^5) - 1/(24*HarmonicSums`Private`ExpVar^3) + 1/(8*HarmonicSums`Private`ExpVar^2) - 1/(4*HarmonicSums`Private`ExpVar))*z2 + z2^2/4) + z2*(1/(40*HarmonicSums`Private`ExpVar^10) - 1/(72*HarmonicSums`Private`ExpVar^8) + 1/(72*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) - (13*z3)/48) + ln2^2*(1/(40*HarmonicSums`Private`ExpVar^10) - 1/(72*HarmonicSums`Private`ExpVar^8) + 1/(72*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) + z3/6) + (-7/(480*HarmonicSums`Private`ExpVar^9) + 1/(96*HarmonicSums`Private`ExpVar^7) - 7/(480*HarmonicSums`Private`ExpVar^5) + 7/(96*HarmonicSums`Private`ExpVar^3) - 7/(32*HarmonicSums`Private`ExpVar^2) + 7/(16*HarmonicSums`Private`ExpVar))*z3), S[1, 1, 1, 1, -1, 1, HarmonicSums`Private`ExpVar] :> li6half + ln2^6/120 + (-1)^HarmonicSums`Private`ExpVar* (-20475/(1024*HarmonicSums`Private`ExpVar^10) + 35/(32*HarmonicSums`Private`ExpVar^9) + 105/(64*HarmonicSums`Private`ExpVar^8) - 75/(128*HarmonicSums`Private`ExpVar^7) + 5/(64*HarmonicSums`Private`ExpVar^6)) + li4half*(1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar)) + sinf^4*(ln2^2/48 - z2/48) + ln2^4*(1/(360*HarmonicSums`Private`ExpVar^9) - 1/(504*HarmonicSums`Private`ExpVar^7) + 1/(360*HarmonicSums`Private`ExpVar^5) - 1/(72*HarmonicSums`Private`ExpVar^3) + 1/(24*HarmonicSums`Private`ExpVar^2) - 1/(12*HarmonicSums`Private`ExpVar) + z2/24) + (li4half/2 + 121/(33600*HarmonicSums`Private`ExpVar^10) + 59/(2016*HarmonicSums`Private`ExpVar^9) - 23/(10080*HarmonicSums`Private`ExpVar^8) - 11/(480*HarmonicSums`Private`ExpVar^7) + 7/(2880*HarmonicSums`Private`ExpVar^6) + 5/(96*HarmonicSums`Private`ExpVar^5) - 19/(192*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (-13/(1200*HarmonicSums`Private`ExpVar^9) + 13/(1680*HarmonicSums`Private`ExpVar^7) - 13/(1200*HarmonicSums`Private`ExpVar^5) + 13/(240*HarmonicSums`Private`ExpVar^3) - 13/(80*HarmonicSums`Private`ExpVar^2) + 13/(40*HarmonicSums`Private`ExpVar))*z2^2 - (303*z2^3)/560 + ln2^2*(-121/(33600*HarmonicSums`Private`ExpVar^10) - 59/(2016*HarmonicSums`Private`ExpVar^9) + 23/(10080*HarmonicSums`Private`ExpVar^8) + 11/(480*HarmonicSums`Private`ExpVar^7) - 7/(2880*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^5) + 19/(192*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) + (-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 - (27*z2^2)/80) + sinf^3*(ln2^3/18 - (ln2*z2)/12 + z3/48) + ln2^3*(1/(60*HarmonicSums`Private`ExpVar^10) - 1/(108*HarmonicSums`Private`ExpVar^8) + 1/(108*HarmonicSums`Private`ExpVar^6) - 1/(36*HarmonicSums`Private`ExpVar^4) + 1/(18*HarmonicSums`Private`ExpVar^3) - 1/(18*HarmonicSums`Private`ExpVar^2) + (5*z3)/18) + (1/(160*HarmonicSums`Private`ExpVar^10) - 1/(288*HarmonicSums`Private`ExpVar^8) + 1/(288*HarmonicSums`Private`ExpVar^6) - 1/(96*HarmonicSums`Private`ExpVar^4) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(48*HarmonicSums`Private`ExpVar^2))*z3 + z3^2/24 + sinf^2*(li4half/2 + ln2^4/12 + ln2^2*(1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar) - z2/8) + (-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 - (13*z2^2)/40 + (ln2*z3)/2) + ln2*(z2*(-(40*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(72*HarmonicSums`Private`ExpVar^8) - 1/(72*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) + z3/3) + (1/(60*HarmonicSums`Private`ExpVar^9) - 1/(84*HarmonicSums`Private`ExpVar^7) + 1/(60*HarmonicSums`Private`ExpVar^5) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(4*HarmonicSums`Private`ExpVar^2) - 1/(2*HarmonicSums`Private`ExpVar))*z3 + z5) + sinf*(-li5half + ln2^5/24 + (-1)^HarmonicSums`Private`ExpVar* (14595/(1024*HarmonicSums`Private`ExpVar^10) - 1575/(512*HarmonicSums`Private`ExpVar^9) - 35/(32*HarmonicSums`Private`ExpVar^8) + 105/(128*HarmonicSums`Private`ExpVar^7) - 15/(64*HarmonicSums`Private`ExpVar^6) + 1/(32*HarmonicSums`Private`ExpVar^5)) + ln2^3*(1/(180*HarmonicSums`Private`ExpVar^9) - 1/(252*HarmonicSums`Private`ExpVar^7) + 1/(180*HarmonicSums`Private`ExpVar^5) - 1/(36*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar)) + ln2*((-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - (13*z2^2)/20) + z2*(-(40*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(72*HarmonicSums`Private`ExpVar^8) - 1/(72*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - (5*z3)/48) + ln2^2*(1/(40*HarmonicSums`Private`ExpVar^10) - 1/(72*HarmonicSums`Private`ExpVar^8) + 1/(72*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) + (2*z3)/3) + (1/(480*HarmonicSums`Private`ExpVar^9) - 1/(672*HarmonicSums`Private`ExpVar^7) + 1/(480*HarmonicSums`Private`ExpVar^5) - 1/(96*HarmonicSums`Private`ExpVar^3) + 1/(32*HarmonicSums`Private`ExpVar^2) - 1/(16*HarmonicSums`Private`ExpVar))*z3 + z5), S[1, 1, 1, 1, 1, -1, HarmonicSums`Private`ExpVar] :> -(ln2^6/720) + (-1)^HarmonicSums`Private`ExpVar* (-1575/(1024*HarmonicSums`Private`ExpVar^10) - 63/(32*HarmonicSums`Private`ExpVar^9) + 105/(128*HarmonicSums`Private`ExpVar^8) - 21/(128*HarmonicSums`Private`ExpVar^7) + 1/(64*HarmonicSums`Private`ExpVar^6)) - (ln2^2*sinf^4)/48 - (ln2*sinf^5)/120 + sinf^3*(-(ln2^3/36) + ln2*(-(360*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(504*HarmonicSums`Private`ExpVar^7) - 1/(360*HarmonicSums`Private`ExpVar^5) + 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar) - z2/12)) + ln2^4*(-(1440*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(2016*HarmonicSums`Private`ExpVar^7) - 1/(1440*HarmonicSums`Private`ExpVar^5) + 1/(288*HarmonicSums`Private`ExpVar^3) - 1/(96*HarmonicSums`Private`ExpVar^2) + 1/(48*HarmonicSums`Private`ExpVar) - z2/48) + ln2^2*(121/(33600*HarmonicSums`Private`ExpVar^10) + 59/(2016*HarmonicSums`Private`ExpVar^9) - 23/(10080*HarmonicSums`Private`ExpVar^8) - 11/(480*HarmonicSums`Private`ExpVar^7) + 7/(2880*HarmonicSums`Private`ExpVar^6) + 5/(96*HarmonicSums`Private`ExpVar^5) - 19/(192*HarmonicSums`Private`ExpVar^4) + 5/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + (-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar))*z2 - (9*z2^2)/80) + sinf^2*(-(ln2^4/48) + ln2^2*(-(240*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(336*HarmonicSums`Private`ExpVar^7) - 1/(240*HarmonicSums`Private`ExpVar^5) + 1/(48*HarmonicSums`Private`ExpVar^3) - 1/(16*HarmonicSums`Private`ExpVar^2) + 1/(8*HarmonicSums`Private`ExpVar) - z2/8) + ln2*(-(40*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(72*HarmonicSums`Private`ExpVar^8) - 1/(72*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - z3/6)) + sinf*(-(ln2^5/120) + ln2^3*(-(360*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(504*HarmonicSums`Private`ExpVar^7) - 1/(360*HarmonicSums`Private`ExpVar^5) + 1/(72*HarmonicSums`Private`ExpVar^3) - 1/(24*HarmonicSums`Private`ExpVar^2) + 1/(12*HarmonicSums`Private`ExpVar) - z2/12) + ln2*(121/(16800*HarmonicSums`Private`ExpVar^10) + 59/(1008*HarmonicSums`Private`ExpVar^9) - 23/(5040*HarmonicSums`Private`ExpVar^8) - 11/(240*HarmonicSums`Private`ExpVar^7) + 7/(1440*HarmonicSums`Private`ExpVar^6) + 5/(48*HarmonicSums`Private`ExpVar^5) - 19/(96*HarmonicSums`Private`ExpVar^4) + 5/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + (-(120*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(168*HarmonicSums`Private`ExpVar^7) - 1/(120*HarmonicSums`Private`ExpVar^5) + 1/(24*HarmonicSums`Private`ExpVar^3) - 1/(8*HarmonicSums`Private`ExpVar^2) + 1/(4*HarmonicSums`Private`ExpVar))*z2 - (9*z2^2)/40) + ln2^2*(-(40*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(72*HarmonicSums`Private`ExpVar^8) - 1/(72*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - z3/6)) + ln2^3*(-(120*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(216*HarmonicSums`Private`ExpVar^8) - 1/(216*HarmonicSums`Private`ExpVar^6) + 1/(72*HarmonicSums`Private`ExpVar^4) - 1/(36*HarmonicSums`Private`ExpVar^3) + 1/(36*HarmonicSums`Private`ExpVar^2) - z3/18) + ln2*(61/(560*HarmonicSums`Private`ExpVar^10) - 23/(1890*HarmonicSums`Private`ExpVar^9) - 49/(720*HarmonicSums`Private`ExpVar^8) + 7/(720*HarmonicSums`Private`ExpVar^7) + 17/(144*HarmonicSums`Private`ExpVar^6) - 71/(360*HarmonicSums`Private`ExpVar^5) + 7/(40*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + z2*(-(40*HarmonicSums`Private`ExpVar^10)^(-1) + 1/(72*HarmonicSums`Private`ExpVar^8) - 1/(72*HarmonicSums`Private`ExpVar^6) + 1/(24*HarmonicSums`Private`ExpVar^4) - 1/(12*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - z3/6) + (-(180*HarmonicSums`Private`ExpVar^9)^(-1) + 1/(252*HarmonicSums`Private`ExpVar^7) - 1/(180*HarmonicSums`Private`ExpVar^5) + 1/(36*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) + 1/(6*HarmonicSums`Private`ExpVar))*z3 - z5/5), S[1, 1, 1, 1, 1, 1, HarmonicSums`Private`ExpVar] :> 331/(12096*HarmonicSums`Private`ExpVar^10) + 17153/(181440*HarmonicSums`Private`ExpVar^9) - 61/(3456*HarmonicSums`Private`ExpVar^8) - 251/(1920*HarmonicSums`Private`ExpVar^7) + 235/(1152*HarmonicSums`Private`ExpVar^6) - 491/(2880*HarmonicSums`Private`ExpVar^5) + 25/(288*HarmonicSums`Private`ExpVar^4) - 1/(48*HarmonicSums`Private`ExpVar^3) + sinf^6/720 + sinf^4*(1/(1440*HarmonicSums`Private`ExpVar^9) - 1/(2016*HarmonicSums`Private`ExpVar^7) + 1/(1440*HarmonicSums`Private`ExpVar^5) - 1/(288*HarmonicSums`Private`ExpVar^3) + 1/(96*HarmonicSums`Private`ExpVar^2) - 1/(48*HarmonicSums`Private`ExpVar) + z2/48) + (-121/(33600*HarmonicSums`Private`ExpVar^10) - 59/(2016*HarmonicSums`Private`ExpVar^9) + 23/(10080*HarmonicSums`Private`ExpVar^8) + 11/(480*HarmonicSums`Private`ExpVar^7) - 7/(2880*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^5) + 19/(192*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2))*z2 + (3/(800*HarmonicSums`Private`ExpVar^9) - 3/(1120*HarmonicSums`Private`ExpVar^7) + 3/(800*HarmonicSums`Private`ExpVar^5) - 3/(160*HarmonicSums`Private`ExpVar^3) + 9/(160*HarmonicSums`Private`ExpVar^2) - 9/(80*HarmonicSums`Private`ExpVar))*z2^2 + (61*z2^3)/560 + sinf^2*(-121/(33600*HarmonicSums`Private`ExpVar^10) - 59/(2016*HarmonicSums`Private`ExpVar^9) + 23/(10080*HarmonicSums`Private`ExpVar^8) + 11/(480*HarmonicSums`Private`ExpVar^7) - 7/(2880*HarmonicSums`Private`ExpVar^6) - 5/(96*HarmonicSums`Private`ExpVar^5) + 19/(192*HarmonicSums`Private`ExpVar^4) - 5/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) + (1/(240*HarmonicSums`Private`ExpVar^9) - 1/(336*HarmonicSums`Private`ExpVar^7) + 1/(240*HarmonicSums`Private`ExpVar^5) - 1/(48*HarmonicSums`Private`ExpVar^3) + 1/(16*HarmonicSums`Private`ExpVar^2) - 1/(8*HarmonicSums`Private`ExpVar))*z2 + (9*z2^2)/80) + sinf^3*(1/(120*HarmonicSums`Private`ExpVar^10) - 1/(216*HarmonicSums`Private`ExpVar^8) + 1/(216*HarmonicSums`Private`ExpVar^6) - 1/(72*HarmonicSums`Private`ExpVar^4) + 1/(36*HarmonicSums`Private`ExpVar^3) - 1/(36*HarmonicSums`Private`ExpVar^2) + z3/18) + (1/(60*HarmonicSums`Private`ExpVar^10) - 1/(108*HarmonicSums`Private`ExpVar^8) + 1/(108*HarmonicSums`Private`ExpVar^6) - 1/(36*HarmonicSums`Private`ExpVar^4) + 1/(18*HarmonicSums`Private`ExpVar^3) - 1/(18*HarmonicSums`Private`ExpVar^2))*z3 + z3^2/18 + sinf*(-61/(560*HarmonicSums`Private`ExpVar^10) + 23/(1890*HarmonicSums`Private`ExpVar^9) + 49/(720*HarmonicSums`Private`ExpVar^8) - 7/(720*HarmonicSums`Private`ExpVar^7) - 17/(144*HarmonicSums`Private`ExpVar^6) + 71/(360*HarmonicSums`Private`ExpVar^5) - 7/(40*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) + z2*(1/(40*HarmonicSums`Private`ExpVar^10) - 1/(72*HarmonicSums`Private`ExpVar^8) + 1/(72*HarmonicSums`Private`ExpVar^6) - 1/(24*HarmonicSums`Private`ExpVar^4) + 1/(12*HarmonicSums`Private`ExpVar^3) - 1/(12*HarmonicSums`Private`ExpVar^2) + z3/6) + (1/(180*HarmonicSums`Private`ExpVar^9) - 1/(252*HarmonicSums`Private`ExpVar^7) + 1/(180*HarmonicSums`Private`ExpVar^5) - 1/(36*HarmonicSums`Private`ExpVar^3) + 1/(12*HarmonicSums`Private`ExpVar^2) - 1/(6*HarmonicSums`Private`ExpVar))*z3 + z5/5)}