maximus

THE CLOSED FORM OF THE SERIES

EulerGamma+((-1)^(5/6) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-95355810527-56528981425 (-1)^(1/3)+38826729409 (-1)^(2/3)-42644414999 Sqrt[5]-25280528825 (-1)^(1/3) Sqrt[5]+17363841129 (-1)^(2/3) Sqrt[5]) (3 I-2 \[Pi]))/(12 (1+(-1)^(1/3)) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+((-1)^(5/6) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (15901284142680329+64939445403758263 (-1)^(1/3)+49038158555308169 (-1)^(2/3)+7111270454514629 Sqrt[5]+29041802868789499 (-1)^(1/3) Sqrt[5]+21930531204216005 (-1)^(2/3) Sqrt[5]) (3 I-2 \[Pi]))/(2 (1+(-1)^(1/3)) (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-((-1)^(5/6) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-57530930968643579379+22245114215551355955 (-1)^(1/3)+79776045494728107021 (-1)^(2/3)-25728614490946973401 Sqrt[5]+9948317510643948313 (-1)^(1/3) Sqrt[5]+35676932140465577639 (-1)^(2/3) Sqrt[5]) (3 I-2 \[Pi]))/((1+(-1)^(1/3)) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(6 (-1)^(5/6) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-341284612733075691581+143214721084327313917 (-1)^(1/3)+484499288426083298691 (-1)^(2/3)-152627118749169507097 Sqrt[5]+64047570344645653081 (-1)^(1/3) Sqrt[5]+216674668794199869863 (-1)^(2/3) Sqrt[5]) (3 I-2 \[Pi]))/((1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(48 (-1)^(5/6) (-4357839028103404543939+298916002832385320707 (-1)^(1/3)+4656755031428327942429 (-1)^(2/3)-1948884860368165791000 Sqrt[5]+133679300379146642968 (-1)^(1/3) Sqrt[5]+2082564160967582180488 (-1)^(2/3) Sqrt[5]) (3 I-2 \[Pi]))/((1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(8 (-1)^(5/6) (597832005551925999257+9313510062969500527015 (-1)^(1/3)+8715678056093964445721 (-1)^(2/3)+267358600707827626751 Sqrt[5]+4165128321985630020161 (-1)^(1/3) Sqrt[5]+3897769720685865922815 (-1)^(2/3) Sqrt[5]) (3 I-2 \[Pi]))/((1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-((-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-95355810527-56528981425 (-1)^(1/3)+38826729409 (-1)^(2/3)-42644414999 Sqrt[5]-25280528825 (-1)^(1/3) Sqrt[5]+17363841129 (-1)^(2/3) Sqrt[5]) (3+I \[Pi]))/(12 (1+(-1)^(1/3)) (1+(-1)^(2/3)) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-((-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (15901284142680329+64939445403758263 (-1)^(1/3)+49038158555308169 (-1)^(2/3)+7111270454514629 Sqrt[5]+29041802868789499 (-1)^(1/3) Sqrt[5]+21930531204216005 (-1)^(2/3) Sqrt[5]) (3+I \[Pi]))/(2 (1+(-1)^(1/3)) (1+(-1)^(2/3)) (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+((-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-57530930968643579379+22245114215551355955 (-1)^(1/3)+79776045494728107021 (-1)^(2/3)-25728614490946973401 Sqrt[5]+9948317510643948313 (-1)^(1/3) Sqrt[5]+35676932140465577639 (-1)^(2/3) Sqrt[5]) (3+I \[Pi]))/((1+(-1)^(1/3)) (1+(-1)^(2/3)) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(6 (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-341284612733075691581+143214721084327313917 (-1)^(1/3)+484499288426083298691 (-1)^(2/3)-152627118749169507097 Sqrt[5]+64047570344645653081 (-1)^(1/3) Sqrt[5]+216674668794199869863 (-1)^(2/3) Sqrt[5]) (3+I \[Pi]))/((1+(-1)^(1/3)) (1+(-1)^(2/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(48 (-4357839028103404543939+298916002832385320707 (-1)^(1/3)+4656755031428327942429 (-1)^(2/3)-1948884860368165791000 Sqrt[5]+133679300379146642968 (-1)^(1/3) Sqrt[5]+2082564160967582180488 (-1)^(2/3) Sqrt[5]) (3+I \[Pi]))/((1+(-1)^(1/3)) (1+(-1)^(2/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(8 (597832005551925999257+9313510062969500527015 (-1)^(1/3)+8715678056093964445721 (-1)^(2/3)+267358600707827626751 Sqrt[5]+4165128321985630020161 (-1)^(1/3) Sqrt[5]+3897769720685865922815 (-1)^(2/3) Sqrt[5]) (3+I \[Pi]))/((1+(-1)^(1/3)) (1+(-1)^(2/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+((5 I+Sqrt[3]) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-82613677+454629805 (-1)^(1/3)+537186755 (-1)^(2/3)-36945969 Sqrt[5]+203316753 (-1)^(1/3) Sqrt[5]+240237279 (-1)^(2/3) Sqrt[5]) \[Pi])/(288 (1+(-1)^(1/3))^2 (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-((I+3 Sqrt[3]) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-82613677+454629805 (-1)^(1/3)+537186755 (-1)^(2/3)-36945969 Sqrt[5]+203316753 (-1)^(1/3) Sqrt[5]+240237279 (-1)^(2/3) Sqrt[5]) \[Pi])/(288 (1+(-1)^(1/3))^2 (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(I (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-95355810527-56528981425 (-1)^(1/3)+38826729409 (-1)^(2/3)-42644414999 Sqrt[5]-25280528825 (-1)^(1/3) Sqrt[5]+17363841129 (-1)^(2/3) Sqrt[5]) \[Pi])/(6 (1+(-1)^(1/3))^2 (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-((-I+Sqrt[3]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-95355810527-56528981425 (-1)^(1/3)+38826729409 (-1)^(2/3)-42644414999 Sqrt[5]-25280528825 (-1)^(1/3) Sqrt[5]+17363841129 (-1)^(2/3) Sqrt[5]) \[Pi])/(24 (1+(-1)^(1/3))^2 (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+((5 I+Sqrt[3]) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-43208880701091+90197767334755 (-1)^(1/3)+133406136721501 (-1)^(2/3)-19323598896515 Sqrt[5]+40337667835459 (-1)^(1/3) Sqrt[5]+59661038065149 (-1)^(2/3) Sqrt[5]) \[Pi])/(16 (1+(-1)^(1/3))^2 (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-((I+3 Sqrt[3]) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-43208880701091+90197767334755 (-1)^(1/3)+133406136721501 (-1)^(2/3)-19323598896515 Sqrt[5]+40337667835459 (-1)^(1/3) Sqrt[5]+59661038065149 (-1)^(2/3) Sqrt[5]) \[Pi])/(16 (1+(-1)^(1/3))^2 (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(I (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (15901284142680329+64939445403758263 (-1)^(1/3)+49038158555308169 (-1)^(2/3)+7111270454514629 Sqrt[5]+29041802868789499 (-1)^(1/3) Sqrt[5]+21930531204216005 (-1)^(2/3) Sqrt[5]) \[Pi])/((1+(-1)^(1/3))^2 (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-((-I+Sqrt[3]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (15901284142680329+64939445403758263 (-1)^(1/3)+49038158555308169 (-1)^(2/3)+7111270454514629 Sqrt[5]+29041802868789499 (-1)^(1/3) Sqrt[5]+21930531204216005 (-1)^(2/3) Sqrt[5]) \[Pi])/(4 (1+(-1)^(1/3))^2 (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+((5 I+Sqrt[3]) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-46790037085253847+114148961463798935 (-1)^(1/3)+160938939867053801 (-1)^(2/3)-20925140718472777 Sqrt[5]+51048967478811529 (-1)^(1/3) Sqrt[5]+71974081953896567 (-1)^(2/3) Sqrt[5]) \[Pi])/(8 (1+(-1)^(1/3))^2 (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-((I+3 Sqrt[3]) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-46790037085253847+114148961463798935 (-1)^(1/3)+160938939867053801 (-1)^(2/3)-20925140718472777 Sqrt[5]+51048967478811529 (-1)^(1/3) Sqrt[5]+71974081953896567 (-1)^(2/3) Sqrt[5]) \[Pi])/(8 (1+(-1)^(1/3))^2 (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-((5 I+Sqrt[3]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-2905813222920952563-796003203430232397 (-1)^(1/3)+2109784286458422093 (-1)^(2/3)-1299519179273800067 Sqrt[5]-355983454635519037 (-1)^(1/3) Sqrt[5]+943524216476383933 (-1)^(2/3) Sqrt[5]) \[Pi])/(4 (1+(-1)^(1/3))^2 (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+((I+3 Sqrt[3]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-2905813222920952563-796003203430232397 (-1)^(1/3)+2109784286458422093 (-1)^(2/3)-1299519179273800067 Sqrt[5]-355983454635519037 (-1)^(1/3) Sqrt[5]+943524216476383933 (-1)^(2/3) Sqrt[5]) \[Pi])/(4 (1+(-1)^(1/3))^2 (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(2 (5 I+Sqrt[3]) (-15152355923308949236+16290403303697575636 (-1)^(1/3)+31442758947779157260 (-1)^(2/3)-6776339572758081015 Sqrt[5]+7285289833590986967 (-1)^(1/3) Sqrt[5]+14061629281474789449 (-1)^(2/3) Sqrt[5]) \[Pi])/((1+(-1)^(1/3))^2 (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(2 (I+3 Sqrt[3]) (-15152355923308949236+16290403303697575636 (-1)^(1/3)+31442758947779157260 (-1)^(2/3)-6776339572758081015 Sqrt[5]+7285289833590986967 (-1)^(1/3) Sqrt[5]+14061629281474789449 (-1)^(2/3) Sqrt[5]) \[Pi])/((1+(-1)^(1/3))^2 (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-((5 I+Sqrt[3]) (-62885517831584963197-30304711910591249795 (-1)^(1/3)+32580806671368502595 (-1)^(2/3)-28123258534339826271 Sqrt[5]-13552679174125914657 (-1)^(1/3) Sqrt[5]+14570579695791726561 (-1)^(2/3) Sqrt[5]) \[Pi])/(3 (1+(-1)^(1/3))^2 (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+((I+3 Sqrt[3]) (-62885517831584963197-30304711910591249795 (-1)^(1/3)+32580806671368502595 (-1)^(2/3)-28123258534339826271 Sqrt[5]-13552679174125914657 (-1)^(1/3) Sqrt[5]+14570579695791726561 (-1)^(2/3) Sqrt[5]) \[Pi])/(3 (1+(-1)^(1/3))^2 (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(2 I (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-57530930968643579379+22245114215551355955 (-1)^(1/3)+79776045494728107021 (-1)^(2/3)-25728614490946973401 Sqrt[5]+9948317510643948313 (-1)^(1/3) Sqrt[5]+35676932140465577639 (-1)^(2/3) Sqrt[5]) \[Pi])/((1+(-1)^(1/3))^2 (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+((-I+Sqrt[3]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-57530930968643579379+22245114215551355955 (-1)^(1/3)+79776045494728107021 (-1)^(2/3)-25728614490946973401 Sqrt[5]+9948317510643948313 (-1)^(1/3) Sqrt[5]+35676932140465577639 (-1)^(2/3) Sqrt[5]) \[Pi])/(2 (1+(-1)^(1/3))^2 (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(12 I (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-341284612733075691581+143214721084327313917 (-1)^(1/3)+484499288426083298691 (-1)^(2/3)-152627118749169507097 Sqrt[5]+64047570344645653081 (-1)^(1/3) Sqrt[5]+216674668794199869863 (-1)^(2/3) Sqrt[5]) \[Pi])/((1+(-1)^(1/3))^2 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(3 (-I+Sqrt[3]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-341284612733075691581+143214721084327313917 (-1)^(1/3)+484499288426083298691 (-1)^(2/3)-152627118749169507097 Sqrt[5]+64047570344645653081 (-1)^(1/3) Sqrt[5]+216674668794199869863 (-1)^(2/3) Sqrt[5]) \[Pi])/((1+(-1)^(1/3))^2 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(96 I (-4357839028103404543939+298916002832385320707 (-1)^(1/3)+4656755031428327942429 (-1)^(2/3)-1948884860368165791000 Sqrt[5]+133679300379146642968 (-1)^(1/3) Sqrt[5]+2082564160967582180488 (-1)^(2/3) Sqrt[5]) \[Pi])/((1+(-1)^(1/3))^2 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(24 (-I+Sqrt[3]) (-4357839028103404543939+298916002832385320707 (-1)^(1/3)+4656755031428327942429 (-1)^(2/3)-1948884860368165791000 Sqrt[5]+133679300379146642968 (-1)^(1/3) Sqrt[5]+2082564160967582180488 (-1)^(2/3) Sqrt[5]) \[Pi])/((1+(-1)^(1/3))^2 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(16 I (597832005551925999257+9313510062969500527015 (-1)^(1/3)+8715678056093964445721 (-1)^(2/3)+267358600707827626751 Sqrt[5]+4165128321985630020161 (-1)^(1/3) Sqrt[5]+3897769720685865922815 (-1)^(2/3) Sqrt[5]) \[Pi])/((1+(-1)^(1/3))^2 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(4 (-I+Sqrt[3]) (597832005551925999257+9313510062969500527015 (-1)^(1/3)+8715678056093964445721 (-1)^(2/3)+267358600707827626751 Sqrt[5]+4165128321985630020161 (-1)^(1/3) Sqrt[5]+3897769720685865922815 (-1)^(2/3) Sqrt[5]) \[Pi])/((1+(-1)^(1/3))^2 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+((-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (28050512449+41057809823 (-1)^(1/3)+13007434993 (-1)^(2/3)+12544570479 Sqrt[5]+18361610961 (-1)^(1/3) Sqrt[5]+5817101439 (-1)^(2/3) Sqrt[5]) \[Pi]^2)/(144 (1+(-1)^(1/3)) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-((-148122271233+676250245521 (-1)^(1/3)+824372598735 (-1)^(2/3)-66242317841 Sqrt[5]+302428328129 (-1)^(1/3) Sqrt[5]+368670610303 (-1)^(2/3) Sqrt[5]) \[Pi]^2)/(36 (1+(-1)^(1/3)) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+((-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (11491597573125525+11810572106608427 (-1)^(1/3)+318969426037973 (-1)^(2/3)+5139198668716581 Sqrt[5]+5281848416709403 (-1)^(1/3) Sqrt[5]+142647463873381 (-1)^(2/3) Sqrt[5]) \[Pi]^2)/(8 (1+(-1)^(1/3)) (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+((-134772432606987830-103058721012820970 (-1)^(1/3)+31713711614886858 (-1)^(2/3)-60272064160432433 Sqrt[5]-46089261171784175 (-1)^(1/3) Sqrt[5]+14182802997953295 (-1)^(2/3) Sqrt[5]) \[Pi]^2)/((1+(-1)^(1/3)) (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+((-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-937483145409870329+9900516102083973369 (-1)^(1/3)+10837983977275414343 (-1)^(2/3)-419255208179358151 Sqrt[5]+4427645403318202183 (-1)^(1/3) Sqrt[5]+4846893782448272633 (-1)^(2/3) Sqrt[5]) \[Pi]^2)/(4 (1+(-1)^(1/3)) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-((-247947784556034393263-160663828066456862737 (-1)^(1/3)+87283956365421184081 (-1)^(2/3)-110885620227553076175 Sqrt[5]-71851048216387235057 (-1)^(1/3) Sqrt[5]+39034571955641454769 (-1)^(2/3) Sqrt[5]) \[Pi]^2)/((1+(-1)^(1/3)) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-((-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-296859419226011637513-150347326917195645111 (-1)^(1/3)+146511036368198437815 (-1)^(2/3)-132759568230094005883 Sqrt[5]-67237368644446672325 (-1)^(1/3) Sqrt[5]+65521727354647123013 (-1)^(2/3) Sqrt[5]) \[Pi]^2)/(2 (1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(2 (-7630125601824648972497-7292801725705858250863 (-1)^(1/3)+337323883862289718063 (-1)^(2/3)-3412295904508281684309 Sqrt[5]-3261440081021214915051 (-1)^(1/3) Sqrt[5]+150855826950064832811 (-1)^(2/3) Sqrt[5]) \[Pi]^2)/((1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(2 (-5901706151894161326439-1256166018718081237913 (-1)^(1/3)+4645540141761530745689 (-1)^(2/3)-2639323227772808811627 Sqrt[5]-561774521775780557589 (-1)^(1/3) Sqrt[5]+2077548709836558451413 (-1)^(2/3) Sqrt[5]) \[Pi]^2)/((1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(2 (1930813782360423260641+10614711065970004612703 (-1)^(1/3)+8683897295435317761889 (-1)^(2/3)+863486173850278157979 Sqrt[5]+4747043101005636982437 (-1)^(1/3) Sqrt[5]+3883556932443988953243 (-1)^(2/3) Sqrt[5]) \[Pi]^2)/(3 (1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(8 (156067831776072955567539+232313203033480706748045 (-1)^(1/3)+76245371257311604684083 (-1)^(2/3)+69795656190460171793903 Sqrt[5]+103893622810714643683153 (-1)^(1/3) Sqrt[5]+34097966620211470239215 (-1)^(2/3) Sqrt[5]) \[Pi]^2)/(3 (1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(16 (-17523511381847467849479+67948848470342919455079 (-1)^(1/3)+85472359852221864575481 (-1)^(2/3)-7836752530860441744508 Sqrt[5]+30387648834503873419228 (-1)^(1/3) Sqrt[5]+38224401365378394417092 (-1)^(2/3) Sqrt[5]) \[Pi]^2)/((1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+((-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-82613677+454629805 (-1)^(1/3)+537186755 (-1)^(2/3)-36945969 Sqrt[5]+203316753 (-1)^(1/3) Sqrt[5]+240237279 (-1)^(2/3) Sqrt[5]) (3 I+\[Pi]))/(72 (1+(-1)^(1/3)) (I+Sqrt[3]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+((-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-43208880701091+90197767334755 (-1)^(1/3)+133406136721501 (-1)^(2/3)-19323598896515 Sqrt[5]+40337667835459 (-1)^(1/3) Sqrt[5]+59661038065149 (-1)^(2/3) Sqrt[5]) (3 I+\[Pi]))/(4 (1+(-1)^(1/3)) (I+Sqrt[3]) (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+((-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-46790037085253847+114148961463798935 (-1)^(1/3)+160938939867053801 (-1)^(2/3)-20925140718472777 Sqrt[5]+51048967478811529 (-1)^(1/3) Sqrt[5]+71974081953896567 (-1)^(2/3) Sqrt[5]) (3 I+\[Pi]))/(2 (1+(-1)^(1/3)) (I+Sqrt[3]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-((-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-2905813222920952563-796003203430232397 (-1)^(1/3)+2109784286458422093 (-1)^(2/3)-1299519179273800067 Sqrt[5]-355983454635519037 (-1)^(1/3) Sqrt[5]+943524216476383933 (-1)^(2/3) Sqrt[5]) (3 I+\[Pi]))/((1+(-1)^(1/3)) (I+Sqrt[3]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(8 (-15152355923308949236+16290403303697575636 (-1)^(1/3)+31442758947779157260 (-1)^(2/3)-6776339572758081015 Sqrt[5]+7285289833590986967 (-1)^(1/3) Sqrt[5]+14061629281474789449 (-1)^(2/3) Sqrt[5]) (3 I+\[Pi]))/((1+(-1)^(1/3)) (I+Sqrt[3]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(4 (-62885517831584963197-30304711910591249795 (-1)^(1/3)+32580806671368502595 (-1)^(2/3)-28123258534339826271 Sqrt[5]-13552679174125914657 (-1)^(1/3) Sqrt[5]+14570579695791726561 (-1)^(2/3) Sqrt[5]) (3 I+\[Pi]))/(3 (1+(-1)^(1/3)) (I+Sqrt[3]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-((-1)^(1/6) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-82613677+454629805 (-1)^(1/3)+537186755 (-1)^(2/3)-36945969 Sqrt[5]+203316753 (-1)^(1/3) Sqrt[5]+240237279 (-1)^(2/3) Sqrt[5]) (3 I+2 \[Pi]))/(144 (1+(-1)^(1/3)) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-((-1)^(1/6) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-43208880701091+90197767334755 (-1)^(1/3)+133406136721501 (-1)^(2/3)-19323598896515 Sqrt[5]+40337667835459 (-1)^(1/3) Sqrt[5]+59661038065149 (-1)^(2/3) Sqrt[5]) (3 I+2 \[Pi]))/(8 (1+(-1)^(1/3)) (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-((-1)^(1/6) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-46790037085253847+114148961463798935 (-1)^(1/3)+160938939867053801 (-1)^(2/3)-20925140718472777 Sqrt[5]+51048967478811529 (-1)^(1/3) Sqrt[5]+71974081953896567 (-1)^(2/3) Sqrt[5]) (3 I+2 \[Pi]))/(4 (1+(-1)^(1/3)) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+((-1)^(1/6) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-2905813222920952563-796003203430232397 (-1)^(1/3)+2109784286458422093 (-1)^(2/3)-1299519179273800067 Sqrt[5]-355983454635519037 (-1)^(1/3) Sqrt[5]+943524216476383933 (-1)^(2/3) Sqrt[5]) (3 I+2 \[Pi]))/(2 (1+(-1)^(1/3)) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(4 (-1)^(1/6) (-15152355923308949236+16290403303697575636 (-1)^(1/3)+31442758947779157260 (-1)^(2/3)-6776339572758081015 Sqrt[5]+7285289833590986967 (-1)^(1/3) Sqrt[5]+14061629281474789449 (-1)^(2/3) Sqrt[5]) (3 I+2 \[Pi]))/((1+(-1)^(1/3)) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(2 (-1)^(1/6) (-62885517831584963197-30304711910591249795 (-1)^(1/3)+32580806671368502595 (-1)^(2/3)-28123258534339826271 Sqrt[5]-13552679174125914657 (-1)^(1/3) Sqrt[5]+14570579695791726561 (-1)^(2/3) Sqrt[5]) (3 I+2 \[Pi]))/(3 (1+(-1)^(1/3)) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+Log[4]+1/20 (52 Log[2]-8 Log[4]-4 Log[64]-2 Log[1024])+(\[Pi] (-40-8 EulerGamma-38 Log[2]+19 Log[4]+2 Log[64]-2 Log[1024]))/(36 Sqrt[3])+1/20 (-148 Log[2]+22 Log[4]+11 Log[64]+3 Log[1024])+1/12 (8-8 EulerGamma+4 Log[2]+2 Log[64]-2 Log[4096])+1/12 (8-8 EulerGamma-4 Log[2]-4 Log[8]-Log[64]-Log[1024]+2 Log[4096])-(I (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (28050512449+41057809823 (-1)^(1/3)+13007434993 (-1)^(2/3)+12544570479 Sqrt[5]+18361610961 (-1)^(1/3) Sqrt[5]+5817101439 (-1)^(2/3) Sqrt[5]) \[Pi] Log[1/(1+(-1)^(1/3))])/(36 (1+(-1)^(1/3)) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(I (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (11491597573125525+11810572106608427 (-1)^(1/3)+318969426037973 (-1)^(2/3)+5139198668716581 Sqrt[5]+5281848416709403 (-1)^(1/3) Sqrt[5]+142647463873381 (-1)^(2/3) Sqrt[5]) \[Pi] Log[1/(1+(-1)^(1/3))])/(2 (1+(-1)^(1/3)) (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(I (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-937483145409870329+9900516102083973369 (-1)^(1/3)+10837983977275414343 (-1)^(2/3)-419255208179358151 Sqrt[5]+4427645403318202183 (-1)^(1/3) Sqrt[5]+4846893782448272633 (-1)^(2/3) Sqrt[5]) \[Pi] Log[1/(1+(-1)^(1/3))])/((1+(-1)^(1/3)) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(2 I (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-296859419226011637513-150347326917195645111 (-1)^(1/3)+146511036368198437815 (-1)^(2/3)-132759568230094005883 Sqrt[5]-67237368644446672325 (-1)^(1/3) Sqrt[5]+65521727354647123013 (-1)^(2/3) Sqrt[5]) \[Pi] Log[1/(1+(-1)^(1/3))])/((1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(8 I (-7630125601824648972497-7292801725705858250863 (-1)^(1/3)+337323883862289718063 (-1)^(2/3)-3412295904508281684309 Sqrt[5]-3261440081021214915051 (-1)^(1/3) Sqrt[5]+150855826950064832811 (-1)^(2/3) Sqrt[5]) \[Pi] Log[1/(1+(-1)^(1/3))])/((1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(8 I (1930813782360423260641+10614711065970004612703 (-1)^(1/3)+8683897295435317761889 (-1)^(2/3)+863486173850278157979 Sqrt[5]+4747043101005636982437 (-1)^(1/3) Sqrt[5]+3883556932443988953243 (-1)^(2/3) Sqrt[5]) \[Pi] Log[1/(1+(-1)^(1/3))])/(3 (1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(I (-148122271233+676250245521 (-1)^(1/3)+824372598735 (-1)^(2/3)-66242317841 Sqrt[5]+302428328129 (-1)^(1/3) Sqrt[5]+368670610303 (-1)^(2/3) Sqrt[5]) \[Pi] (-Log[6]+Log[3-I Sqrt[3]]))/(18 (1+(-1)^(1/3)) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(2 I (-134772432606987830-103058721012820970 (-1)^(1/3)+31713711614886858 (-1)^(2/3)-60272064160432433 Sqrt[5]-46089261171784175 (-1)^(1/3) Sqrt[5]+14182802997953295 (-1)^(2/3) Sqrt[5]) \[Pi] (-Log[6]+Log[3-I Sqrt[3]]))/((1+(-1)^(1/3)) (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(2 I (-247947784556034393263-160663828066456862737 (-1)^(1/3)+87283956365421184081 (-1)^(2/3)-110885620227553076175 Sqrt[5]-71851048216387235057 (-1)^(1/3) Sqrt[5]+39034571955641454769 (-1)^(2/3) Sqrt[5]) \[Pi] (-Log[6]+Log[3-I Sqrt[3]]))/((1+(-1)^(1/3)) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(4 I (-5901706151894161326439-1256166018718081237913 (-1)^(1/3)+4645540141761530745689 (-1)^(2/3)-2639323227772808811627 Sqrt[5]-561774521775780557589 (-1)^(1/3) Sqrt[5]+2077548709836558451413 (-1)^(2/3) Sqrt[5]) \[Pi] (-Log[6]+Log[3-I Sqrt[3]]))/((1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(16 I (156067831776072955567539+232313203033480706748045 (-1)^(1/3)+76245371257311604684083 (-1)^(2/3)+69795656190460171793903 Sqrt[5]+103893622810714643683153 (-1)^(1/3) Sqrt[5]+34097966620211470239215 (-1)^(2/3) Sqrt[5]) \[Pi] (-Log[6]+Log[3-I Sqrt[3]]))/(3 (1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(32 I (-17523511381847467849479+67948848470342919455079 (-1)^(1/3)+85472359852221864575481 (-1)^(2/3)-7836752530860441744508 Sqrt[5]+30387648834503873419228 (-1)^(1/3) Sqrt[5]+38224401365378394417092 (-1)^(2/3) Sqrt[5]) \[Pi] (-Log[6]+Log[3-I Sqrt[3]]))/((1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(I (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (28050512449+41057809823 (-1)^(1/3)+13007434993 (-1)^(2/3)+12544570479 Sqrt[5]+18361610961 (-1)^(1/3) Sqrt[5]+5817101439 (-1)^(2/3) Sqrt[5]) \[Pi] (-Log[6]+Log[3+I Sqrt[3]]))/(72 (1+(-1)^(1/3)) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(I (-148122271233+676250245521 (-1)^(1/3)+824372598735 (-1)^(2/3)-66242317841 Sqrt[5]+302428328129 (-1)^(1/3) Sqrt[5]+368670610303 (-1)^(2/3) Sqrt[5]) \[Pi] (-Log[6]+Log[3+I Sqrt[3]]))/(9 (1+(-1)^(1/3)) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(I (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (11491597573125525+11810572106608427 (-1)^(1/3)+318969426037973 (-1)^(2/3)+5139198668716581 Sqrt[5]+5281848416709403 (-1)^(1/3) Sqrt[5]+142647463873381 (-1)^(2/3) Sqrt[5]) \[Pi] (-Log[6]+Log[3+I Sqrt[3]]))/(4 (1+(-1)^(1/3)) (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(4 I (-134772432606987830-103058721012820970 (-1)^(1/3)+31713711614886858 (-1)^(2/3)-60272064160432433 Sqrt[5]-46089261171784175 (-1)^(1/3) Sqrt[5]+14182802997953295 (-1)^(2/3) Sqrt[5]) \[Pi] (-Log[6]+Log[3+I Sqrt[3]]))/((1+(-1)^(1/3)) (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(I (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-937483145409870329+9900516102083973369 (-1)^(1/3)+10837983977275414343 (-1)^(2/3)-419255208179358151 Sqrt[5]+4427645403318202183 (-1)^(1/3) Sqrt[5]+4846893782448272633 (-1)^(2/3) Sqrt[5]) \[Pi] (-Log[6]+Log[3+I Sqrt[3]]))/(2 (1+(-1)^(1/3)) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(4 I (-247947784556034393263-160663828066456862737 (-1)^(1/3)+87283956365421184081 (-1)^(2/3)-110885620227553076175 Sqrt[5]-71851048216387235057 (-1)^(1/3) Sqrt[5]+39034571955641454769 (-1)^(2/3) Sqrt[5]) \[Pi] (-Log[6]+Log[3+I Sqrt[3]]))/((1+(-1)^(1/3)) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(I (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-296859419226011637513-150347326917195645111 (-1)^(1/3)+146511036368198437815 (-1)^(2/3)-132759568230094005883 Sqrt[5]-67237368644446672325 (-1)^(1/3) Sqrt[5]+65521727354647123013 (-1)^(2/3) Sqrt[5]) \[Pi] (-Log[6]+Log[3+I Sqrt[3]]))/((1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(4 I (-7630125601824648972497-7292801725705858250863 (-1)^(1/3)+337323883862289718063 (-1)^(2/3)-3412295904508281684309 Sqrt[5]-3261440081021214915051 (-1)^(1/3) Sqrt[5]+150855826950064832811 (-1)^(2/3) Sqrt[5]) \[Pi] (-Log[6]+Log[3+I Sqrt[3]]))/((1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(8 I (-5901706151894161326439-1256166018718081237913 (-1)^(1/3)+4645540141761530745689 (-1)^(2/3)-2639323227772808811627 Sqrt[5]-561774521775780557589 (-1)^(1/3) Sqrt[5]+2077548709836558451413 (-1)^(2/3) Sqrt[5]) \[Pi] (-Log[6]+Log[3+I Sqrt[3]]))/((1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(4 I (1930813782360423260641+10614711065970004612703 (-1)^(1/3)+8683897295435317761889 (-1)^(2/3)+863486173850278157979 Sqrt[5]+4747043101005636982437 (-1)^(1/3) Sqrt[5]+3883556932443988953243 (-1)^(2/3) Sqrt[5]) \[Pi] (-Log[6]+Log[3+I Sqrt[3]]))/(3 (1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(32 I (156067831776072955567539+232313203033480706748045 (-1)^(1/3)+76245371257311604684083 (-1)^(2/3)+69795656190460171793903 Sqrt[5]+103893622810714643683153 (-1)^(1/3) Sqrt[5]+34097966620211470239215 (-1)^(2/3) Sqrt[5]) \[Pi] (-Log[6]+Log[3+I Sqrt[3]]))/(3 (1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(64 I (-17523511381847467849479+67948848470342919455079 (-1)^(1/3)+85472359852221864575481 (-1)^(2/3)-7836752530860441744508 Sqrt[5]+30387648834503873419228 (-1)^(1/3) Sqrt[5]+38224401365378394417092 (-1)^(2/3) Sqrt[5]) \[Pi] (-Log[6]+Log[3+I Sqrt[3]]))/((1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-((40+358 Log[2]-107 Log[4]-26 Log[64]+2 Log[1024]) (-Log[2]+Log[3-Sqrt[5]]))/(40 Sqrt[5])-((-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-965145+500095 (-1)^(1/3)+1483645 (-1)^(2/3)-431636 Sqrt[5]+223734 (-1)^(1/3) Sqrt[5]+663482 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]+I (Log[8]-2 Log[-1+Sqrt[5]])))/(600 (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-((-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (72291297415+414085302605 (-1)^(1/3)+341810686375 (-1)^(2/3)+32329651070 Sqrt[5]+185184576694 (-1)^(1/3) Sqrt[5]+152862385526 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]+I (Log[8]-2 Log[-1+Sqrt[5]])))/(50 (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-((111765150265+631352172215 (-1)^(1/3)+523554139465 (-1)^(2/3)+49982882467 Sqrt[5]+282349284077 (-1)^(1/3) Sqrt[5]+234140511283 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]+I (Log[8]-2 Log[-1+Sqrt[5]])))/(150 (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-((-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-560628376878850-443035926769850 (-1)^(1/3)+117961040719790 (-1)^(2/3)-250720632163277 Sqrt[5]-198131689746415 (-1)^(1/3) Sqrt[5]+52753781149243 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]+I (Log[8]-2 Log[-1+Sqrt[5]])))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(6 (37499620392006345+38180926368577415 (-1)^(1/3)+680746680212825 (-1)^(2/3)+16770340065395103 Sqrt[5]+17075029360808785 (-1)^(1/3) Sqrt[5]+304439170483951 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]+I (Log[8]-2 Log[-1+Sqrt[5]])))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(6 (81822695698392045+83186619111451315 (-1)^(1/3)+1545036731754925 (-1)^(2/3)+36592221936771828 Sqrt[5]+37202187030311980 (-1)^(1/3) Sqrt[5]+690961432004596 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]+I (Log[8]-2 Log[-1+Sqrt[5]])))/(25 (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(4 (434629424346491595+442520974044559565 (-1)^(1/3)+7892420889341075 (-1)^(2/3)+194372187572072313 Sqrt[5]+197901395886610415 (-1)^(1/3) Sqrt[5]+3529597923121601 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]+I (Log[8]-2 Log[-1+Sqrt[5]])))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(3 (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-13965517808785175+4108857361064295 (-1)^(1/3)+18101487615121865 (-1)^(2/3)-6245569432285857 Sqrt[5]+1837536873837873 (-1)^(1/3) Sqrt[5]+8095231360256991 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]+I (Log[8]-2 Log[-1+Sqrt[5]])))/(50 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(6 (-16304282974702338195+307515295037167955 (-1)^(1/3)+16890720971856147245 (-1)^(2/3)-7291497011165381299 Sqrt[5]+137525020764806387 (-1)^(1/3) Sqrt[5]+7553760056410322445 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]+I (Log[8]-2 Log[-1+Sqrt[5]])))/(25 (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(12 (319597503121545446425+7127995150991588470055 (-1)^(1/3)+6821247218481441490585 (-1)^(2/3)+142928348483795372603 Sqrt[5]+3187736340181213836805 (-1)^(1/3) Sqrt[5]+3050554494371172605243 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]+I (Log[8]-2 Log[-1+Sqrt[5]])))/(25 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(16 (-62661628894722366087405-12847352274316377541395 (-1)^(1/3)+49815492676804221678675 (-1)^(2/3)-28023132357892844601961 Sqrt[5]-5745510603251589421847 (-1)^(1/3) Sqrt[5]+22278165591595440381527 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]+I (Log[8]-2 Log[-1+Sqrt[5]])))/(25 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(48 (-76448575110228823250515-15673732682248849072685 (-1)^(1/3)+60775525289535712422125 (-1)^(2/3)-34188842145894024904023 Sqrt[5]-7009506347733708065961 (-1)^(1/3) Sqrt[5]+27179641183131888708201 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]+I (Log[8]-2 Log[-1+Sqrt[5]])))/(25 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-((111765150265+631352172215 (-1)^(1/3)+523554139465 (-1)^(2/3)+49982882467 Sqrt[5]+282349284077 (-1)^(1/3) Sqrt[5]+234140511283 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]-3 I Log[2]+2 I Log[-1+Sqrt[5]]))/(150 (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(6 (81822695698392045+83186619111451315 (-1)^(1/3)+1545036731754925 (-1)^(2/3)+36592221936771828 Sqrt[5]+37202187030311980 (-1)^(1/3) Sqrt[5]+690961432004596 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]-3 I Log[2]+2 I Log[-1+Sqrt[5]]))/(25 (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(6 (-16304282974702338195+307515295037167955 (-1)^(1/3)+16890720971856147245 (-1)^(2/3)-7291497011165381299 Sqrt[5]+137525020764806387 (-1)^(1/3) Sqrt[5]+7553760056410322445 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]-3 I Log[2]+2 I Log[-1+Sqrt[5]]))/(25 (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(12 (319597503121545446425+7127995150991588470055 (-1)^(1/3)+6821247218481441490585 (-1)^(2/3)+142928348483795372603 Sqrt[5]+3187736340181213836805 (-1)^(1/3) Sqrt[5]+3050554494371172605243 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]-3 I Log[2]+2 I Log[-1+Sqrt[5]]))/(25 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(16 (-62661628894722366087405-12847352274316377541395 (-1)^(1/3)+49815492676804221678675 (-1)^(2/3)-28023132357892844601961 Sqrt[5]-5745510603251589421847 (-1)^(1/3) Sqrt[5]+22278165591595440381527 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]-3 I Log[2]+2 I Log[-1+Sqrt[5]]))/(25 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(48 (-76448575110228823250515-15673732682248849072685 (-1)^(1/3)+60775525289535712422125 (-1)^(2/3)-34188842145894024904023 Sqrt[5]-7009506347733708065961 (-1)^(1/3) Sqrt[5]+27179641183131888708201 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]-3 I Log[2]+2 I Log[-1+Sqrt[5]]))/(25 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-((-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-4078903877-2251053691 (-1)^(1/3)+1394657623 (-1)^(2/3)-1824141273 Sqrt[5]-1006701807 (-1)^(1/3) Sqrt[5]+623709867 (-1)^(2/3) Sqrt[5]) (-(-I+Sqrt[3]) \[Pi]+3 (-1+Sqrt[5]) Log[-1+Sqrt[5]]))/(5 (-1+Sqrt[5]) (I Sqrt[3]+Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+((-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (-(-I+Sqrt[3]) \[Pi]+3 (-1+Sqrt[5]) Log[-1+Sqrt[5]]))/(60 (-1+Sqrt[5]) (I Sqrt[3]+Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-((-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (-(-I+Sqrt[3]) \[Pi]+3 (-1+Sqrt[5]) Log[-1+Sqrt[5]]))/(20 (-1+Sqrt[5]) (I Sqrt[3]+Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+((-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (42571862+106201516 (-1)^(1/3)+69601346 (-1)^(2/3)+19038717 Sqrt[5]+47494765 (-1)^(1/3) Sqrt[5]+31126669 (-1)^(2/3) Sqrt[5]) (-(-I+Sqrt[3]) \[Pi]+3 (-1+Sqrt[5]) Log[-1+Sqrt[5]]))/(5 (-1+Sqrt[5]) (I Sqrt[3]+Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(4 (93013297527+532883415597 (-1)^(1/3)+439845976983 (-1)^(2/3)+41596811243 Sqrt[5]+238312708249 (-1)^(1/3) Sqrt[5]+196705100867 (-1)^(2/3) Sqrt[5]) (-(-I+Sqrt[3]) \[Pi]+3 (-1+Sqrt[5]) Log[-1+Sqrt[5]]))/(5 (-1+Sqrt[5]) (I Sqrt[3]+Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(4 (150498676871+862223478421 (-1)^(1/3)+711685740659 (-1)^(2/3)+67305054385 Sqrt[5]+385598061923 (-1)^(1/3) Sqrt[5]+318275538925 (-1)^(2/3) Sqrt[5]) (-(-I+Sqrt[3]) \[Pi]+3 (-1+Sqrt[5]) Log[-1+Sqrt[5]]))/(15 (-1+Sqrt[5]) (I Sqrt[3]+Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(2 (6411039652+36703046732 (-1)^(1/3)+30302160988 (-1)^(2/3)+2867103185 Sqrt[5]+16414102159 (-1)^(1/3) Sqrt[5]+13551537017 (-1)^(2/3) Sqrt[5]) (2 (-I+Sqrt[3]) \[Pi]+3 (-1+Sqrt[5]) Log[-1+Sqrt[5]]))/(15 (-1+Sqrt[5]) (I Sqrt[3]+Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(12 (4895331666179856+4980614035496080 (-1)^(1/3)+90646537182352 (-1)^(2/3)+2189258875594647 Sqrt[5]+2227398310610953 (-1)^(1/3) Sqrt[5]+40538363817175 (-1)^(2/3) Sqrt[5]) (2 (-I+Sqrt[3]) \[Pi]+3 (-1+Sqrt[5]) Log[-1+Sqrt[5]]))/(5 (-1+Sqrt[5]) (I Sqrt[3]+Sqrt[5]) (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(12 (-31060596091104498593+755884430638178529 (-1)^(1/3)+31824921990605394335 (-1)^(2/3)-13890720856274782009 Sqrt[5]+338041794008139001 (-1)^(1/3) Sqrt[5]+14232537789924315911 (-1)^(2/3) Sqrt[5]) (2 (-I+Sqrt[3]) \[Pi]+3 (-1+Sqrt[5]) Log[-1+Sqrt[5]]))/(5 (-1+Sqrt[5]) (I Sqrt[3]+Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(48 (20771892582970966237+471643565997268728515 (-1)^(1/3)+450644064008580060157 (-1)^(2/3)+9289472767369353632 Sqrt[5]+210925414944060255040 (-1)^(1/3) Sqrt[5]+201534152155990276160 (-1)^(2/3) Sqrt[5]) (2 (-I+Sqrt[3]) \[Pi]+3 (-1+Sqrt[5]) Log[-1+Sqrt[5]]))/(5 (-1+Sqrt[5]) (I Sqrt[3]+Sqrt[5]) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(32 (-1905273940247462271947-390631332491445165109 (-1)^(1/3)+1514674421927617547509 (-1)^(2/3)-852064409230439566119 Sqrt[5]-174695642718438735705 (-1)^(1/3) Sqrt[5]+677382994242070195737 (-1)^(2/3) Sqrt[5]) (2 (-I+Sqrt[3]) \[Pi]+3 (-1+Sqrt[5]) Log[-1+Sqrt[5]]))/(5 (-1+Sqrt[5]) (I Sqrt[3]+Sqrt[5]) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(96 (-3082808906934681163351-632043859306968309737 (-1)^(1/3)+2450783782834133151017 (-1)^(2/3)-1378674055509553930573 Sqrt[5]-282658606834338938867 (-1)^(1/3) Sqrt[5]+1096023827314240860083 (-1)^(2/3) Sqrt[5]) (2 (-I+Sqrt[3]) \[Pi]+3 (-1+Sqrt[5]) Log[-1+Sqrt[5]]))/(5 (-1+Sqrt[5]) (I Sqrt[3]+Sqrt[5]) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(2 I (6411039652+36703046732 (-1)^(1/3)+30302160988 (-1)^(2/3)+2867103185 Sqrt[5]+16414102159 (-1)^(1/3) Sqrt[5]+13551537017 (-1)^(2/3) Sqrt[5]) (2 (I+Sqrt[3]) \[Pi]+3 (-1+Sqrt[5]) Log[-1+Sqrt[5]]))/(15 (Sqrt[3]+I Sqrt[5]) (-1+Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(12 I (4895331666179856+4980614035496080 (-1)^(1/3)+90646537182352 (-1)^(2/3)+2189258875594647 Sqrt[5]+2227398310610953 (-1)^(1/3) Sqrt[5]+40538363817175 (-1)^(2/3) Sqrt[5]) (2 (I+Sqrt[3]) \[Pi]+3 (-1+Sqrt[5]) Log[-1+Sqrt[5]]))/(5 (Sqrt[3]+I Sqrt[5]) (-1+Sqrt[5]) (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(12 I (-31060596091104498593+755884430638178529 (-1)^(1/3)+31824921990605394335 (-1)^(2/3)-13890720856274782009 Sqrt[5]+338041794008139001 (-1)^(1/3) Sqrt[5]+14232537789924315911 (-1)^(2/3) Sqrt[5]) (2 (I+Sqrt[3]) \[Pi]+3 (-1+Sqrt[5]) Log[-1+Sqrt[5]]))/(5 (Sqrt[3]+I Sqrt[5]) (-1+Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(48 I (20771892582970966237+471643565997268728515 (-1)^(1/3)+450644064008580060157 (-1)^(2/3)+9289472767369353632 Sqrt[5]+210925414944060255040 (-1)^(1/3) Sqrt[5]+201534152155990276160 (-1)^(2/3) Sqrt[5]) (2 (I+Sqrt[3]) \[Pi]+3 (-1+Sqrt[5]) Log[-1+Sqrt[5]]))/(5 (Sqrt[3]+I Sqrt[5]) (-1+Sqrt[5]) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(32 I (-1905273940247462271947-390631332491445165109 (-1)^(1/3)+1514674421927617547509 (-1)^(2/3)-852064409230439566119 Sqrt[5]-174695642718438735705 (-1)^(1/3) Sqrt[5]+677382994242070195737 (-1)^(2/3) Sqrt[5]) (2 (I+Sqrt[3]) \[Pi]+3 (-1+Sqrt[5]) Log[-1+Sqrt[5]]))/(5 (Sqrt[3]+I Sqrt[5]) (-1+Sqrt[5]) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(96 I (-3082808906934681163351-632043859306968309737 (-1)^(1/3)+2450783782834133151017 (-1)^(2/3)-1378674055509553930573 Sqrt[5]-282658606834338938867 (-1)^(1/3) Sqrt[5]+1096023827314240860083 (-1)^(2/3) Sqrt[5]) (2 (I+Sqrt[3]) \[Pi]+3 (-1+Sqrt[5]) Log[-1+Sqrt[5]]))/(5 (Sqrt[3]+I Sqrt[5]) (-1+Sqrt[5]) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(I (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-4078903877-2251053691 (-1)^(1/3)+1394657623 (-1)^(2/3)-1824141273 Sqrt[5]-1006701807 (-1)^(1/3) Sqrt[5]+623709867 (-1)^(2/3) Sqrt[5]) (-(4 I+Sqrt[3]-3 I Sqrt[5]) \[Pi]+3 (-1+Sqrt[5]) Log[-1+Sqrt[5]]))/(5 (Sqrt[3]+I Sqrt[5]) (-1+Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(I (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (-(4 I+Sqrt[3]-3 I Sqrt[5]) \[Pi]+3 (-1+Sqrt[5]) Log[-1+Sqrt[5]]))/(60 (Sqrt[3]+I Sqrt[5]) (-1+Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(I (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (-(4 I+Sqrt[3]-3 I Sqrt[5]) \[Pi]+3 (-1+Sqrt[5]) Log[-1+Sqrt[5]]))/(20 (Sqrt[3]+I Sqrt[5]) (-1+Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(I (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (42571862+106201516 (-1)^(1/3)+69601346 (-1)^(2/3)+19038717 Sqrt[5]+47494765 (-1)^(1/3) Sqrt[5]+31126669 (-1)^(2/3) Sqrt[5]) (-(4 I+Sqrt[3]-3 I Sqrt[5]) \[Pi]+3 (-1+Sqrt[5]) Log[-1+Sqrt[5]]))/(5 (Sqrt[3]+I Sqrt[5]) (-1+Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(4 I (93013297527+532883415597 (-1)^(1/3)+439845976983 (-1)^(2/3)+41596811243 Sqrt[5]+238312708249 (-1)^(1/3) Sqrt[5]+196705100867 (-1)^(2/3) Sqrt[5]) (-(4 I+Sqrt[3]-3 I Sqrt[5]) \[Pi]+3 (-1+Sqrt[5]) Log[-1+Sqrt[5]]))/(5 (Sqrt[3]+I Sqrt[5]) (-1+Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(4 I (150498676871+862223478421 (-1)^(1/3)+711685740659 (-1)^(2/3)+67305054385 Sqrt[5]+385598061923 (-1)^(1/3) Sqrt[5]+318275538925 (-1)^(2/3) Sqrt[5]) (-(4 I+Sqrt[3]-3 I Sqrt[5]) \[Pi]+3 (-1+Sqrt[5]) Log[-1+Sqrt[5]]))/(15 (Sqrt[3]+I Sqrt[5]) (-1+Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-((-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-965145+500095 (-1)^(1/3)+1483645 (-1)^(2/3)-431636 Sqrt[5]+223734 (-1)^(1/3) Sqrt[5]+663482 (-1)^(2/3) Sqrt[5]) (1/3 \[Pi] ArcTan[Sqrt[3/5]]-1/2 I \[Pi] Log[2]+1/3 I \[Pi] Log[-1+Sqrt[5]]))/(100 (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(3 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (72291297415+414085302605 (-1)^(1/3)+341810686375 (-1)^(2/3)+32329651070 Sqrt[5]+185184576694 (-1)^(1/3) Sqrt[5]+152862385526 (-1)^(2/3) Sqrt[5]) (1/3 \[Pi] ArcTan[Sqrt[3/5]]-1/2 I \[Pi] Log[2]+1/3 I \[Pi] Log[-1+Sqrt[5]]))/(25 (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(6 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-560628376878850-443035926769850 (-1)^(1/3)+117961040719790 (-1)^(2/3)-250720632163277 Sqrt[5]-198131689746415 (-1)^(1/3) Sqrt[5]+52753781149243 (-1)^(2/3) Sqrt[5]) (1/3 \[Pi] ArcTan[Sqrt[3/5]]-1/2 I \[Pi] Log[2]+1/3 I \[Pi] Log[-1+Sqrt[5]]))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(36 (37499620392006345+38180926368577415 (-1)^(1/3)+680746680212825 (-1)^(2/3)+16770340065395103 Sqrt[5]+17075029360808785 (-1)^(1/3) Sqrt[5]+304439170483951 (-1)^(2/3) Sqrt[5]) (1/3 \[Pi] ArcTan[Sqrt[3/5]]-1/2 I \[Pi] Log[2]+1/3 I \[Pi] Log[-1+Sqrt[5]]))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(24 (434629424346491595+442520974044559565 (-1)^(1/3)+7892420889341075 (-1)^(2/3)+194372187572072313 Sqrt[5]+197901395886610415 (-1)^(1/3) Sqrt[5]+3529597923121601 (-1)^(2/3) Sqrt[5]) (1/3 \[Pi] ArcTan[Sqrt[3/5]]-1/2 I \[Pi] Log[2]+1/3 I \[Pi] Log[-1+Sqrt[5]]))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(9 (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-13965517808785175+4108857361064295 (-1)^(1/3)+18101487615121865 (-1)^(2/3)-6245569432285857 Sqrt[5]+1837536873837873 (-1)^(1/3) Sqrt[5]+8095231360256991 (-1)^(2/3) Sqrt[5]) (1/3 \[Pi] ArcTan[Sqrt[3/5]]-1/2 I \[Pi] Log[2]+1/3 I \[Pi] Log[-1+Sqrt[5]]))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+((-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-965145+500095 (-1)^(1/3)+1483645 (-1)^(2/3)-431636 Sqrt[5]+223734 (-1)^(1/3) Sqrt[5]+663482 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]+I (Log[8]-2 Log[1+Sqrt[5]])))/(300 (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+((-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (72291297415+414085302605 (-1)^(1/3)+341810686375 (-1)^(2/3)+32329651070 Sqrt[5]+185184576694 (-1)^(1/3) Sqrt[5]+152862385526 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]+I (Log[8]-2 Log[1+Sqrt[5]])))/(25 (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+((111765150265+631352172215 (-1)^(1/3)+523554139465 (-1)^(2/3)+49982882467 Sqrt[5]+282349284077 (-1)^(1/3) Sqrt[5]+234140511283 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]+I (Log[8]-2 Log[1+Sqrt[5]])))/(300 (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(2 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-560628376878850-443035926769850 (-1)^(1/3)+117961040719790 (-1)^(2/3)-250720632163277 Sqrt[5]-198131689746415 (-1)^(1/3) Sqrt[5]+52753781149243 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]+I (Log[8]-2 Log[1+Sqrt[5]])))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(12 (37499620392006345+38180926368577415 (-1)^(1/3)+680746680212825 (-1)^(2/3)+16770340065395103 Sqrt[5]+17075029360808785 (-1)^(1/3) Sqrt[5]+304439170483951 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]+I (Log[8]-2 Log[1+Sqrt[5]])))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(3 (81822695698392045+83186619111451315 (-1)^(1/3)+1545036731754925 (-1)^(2/3)+36592221936771828 Sqrt[5]+37202187030311980 (-1)^(1/3) Sqrt[5]+690961432004596 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]+I (Log[8]-2 Log[1+Sqrt[5]])))/(25 (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(8 (434629424346491595+442520974044559565 (-1)^(1/3)+7892420889341075 (-1)^(2/3)+194372187572072313 Sqrt[5]+197901395886610415 (-1)^(1/3) Sqrt[5]+3529597923121601 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]+I (Log[8]-2 Log[1+Sqrt[5]])))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(3 (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-13965517808785175+4108857361064295 (-1)^(1/3)+18101487615121865 (-1)^(2/3)-6245569432285857 Sqrt[5]+1837536873837873 (-1)^(1/3) Sqrt[5]+8095231360256991 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]+I (Log[8]-2 Log[1+Sqrt[5]])))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(3 (-16304282974702338195+307515295037167955 (-1)^(1/3)+16890720971856147245 (-1)^(2/3)-7291497011165381299 Sqrt[5]+137525020764806387 (-1)^(1/3) Sqrt[5]+7553760056410322445 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]+I (Log[8]-2 Log[1+Sqrt[5]])))/(25 (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(6 (319597503121545446425+7127995150991588470055 (-1)^(1/3)+6821247218481441490585 (-1)^(2/3)+142928348483795372603 Sqrt[5]+3187736340181213836805 (-1)^(1/3) Sqrt[5]+3050554494371172605243 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]+I (Log[8]-2 Log[1+Sqrt[5]])))/(25 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(8 (-62661628894722366087405-12847352274316377541395 (-1)^(1/3)+49815492676804221678675 (-1)^(2/3)-28023132357892844601961 Sqrt[5]-5745510603251589421847 (-1)^(1/3) Sqrt[5]+22278165591595440381527 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]+I (Log[8]-2 Log[1+Sqrt[5]])))/(25 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(24 (-76448575110228823250515-15673732682248849072685 (-1)^(1/3)+60775525289535712422125 (-1)^(2/3)-34188842145894024904023 Sqrt[5]-7009506347733708065961 (-1)^(1/3) Sqrt[5]+27179641183131888708201 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]+I (Log[8]-2 Log[1+Sqrt[5]])))/(25 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+((111765150265+631352172215 (-1)^(1/3)+523554139465 (-1)^(2/3)+49982882467 Sqrt[5]+282349284077 (-1)^(1/3) Sqrt[5]+234140511283 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]-3 I Log[2]+2 I Log[1+Sqrt[5]]))/(300 (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(3 (81822695698392045+83186619111451315 (-1)^(1/3)+1545036731754925 (-1)^(2/3)+36592221936771828 Sqrt[5]+37202187030311980 (-1)^(1/3) Sqrt[5]+690961432004596 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]-3 I Log[2]+2 I Log[1+Sqrt[5]]))/(25 (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(3 (-16304282974702338195+307515295037167955 (-1)^(1/3)+16890720971856147245 (-1)^(2/3)-7291497011165381299 Sqrt[5]+137525020764806387 (-1)^(1/3) Sqrt[5]+7553760056410322445 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]-3 I Log[2]+2 I Log[1+Sqrt[5]]))/(25 (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(6 (319597503121545446425+7127995150991588470055 (-1)^(1/3)+6821247218481441490585 (-1)^(2/3)+142928348483795372603 Sqrt[5]+3187736340181213836805 (-1)^(1/3) Sqrt[5]+3050554494371172605243 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]-3 I Log[2]+2 I Log[1+Sqrt[5]]))/(25 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(8 (-62661628894722366087405-12847352274316377541395 (-1)^(1/3)+49815492676804221678675 (-1)^(2/3)-28023132357892844601961 Sqrt[5]-5745510603251589421847 (-1)^(1/3) Sqrt[5]+22278165591595440381527 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]-3 I Log[2]+2 I Log[1+Sqrt[5]]))/(25 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(24 (-76448575110228823250515-15673732682248849072685 (-1)^(1/3)+60775525289535712422125 (-1)^(2/3)-34188842145894024904023 Sqrt[5]-7009506347733708065961 (-1)^(1/3) Sqrt[5]+27179641183131888708201 (-1)^(2/3) Sqrt[5]) \[Pi] (2 ArcTan[Sqrt[3/5]]-3 I Log[2]+2 I Log[1+Sqrt[5]]))/(25 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(2 I (6411039652+36703046732 (-1)^(1/3)+30302160988 (-1)^(2/3)+2867103185 Sqrt[5]+16414102159 (-1)^(1/3) Sqrt[5]+13551537017 (-1)^(2/3) Sqrt[5]) ((-I+Sqrt[3]) \[Pi]+3 (1+Sqrt[5]) Log[1+Sqrt[5]]))/(15 (Sqrt[3]+I Sqrt[5]) (1+Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(12 I (4895331666179856+4980614035496080 (-1)^(1/3)+90646537182352 (-1)^(2/3)+2189258875594647 Sqrt[5]+2227398310610953 (-1)^(1/3) Sqrt[5]+40538363817175 (-1)^(2/3) Sqrt[5]) ((-I+Sqrt[3]) \[Pi]+3 (1+Sqrt[5]) Log[1+Sqrt[5]]))/(5 (Sqrt[3]+I Sqrt[5]) (1+Sqrt[5]) (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(12 I (-31060596091104498593+755884430638178529 (-1)^(1/3)+31824921990605394335 (-1)^(2/3)-13890720856274782009 Sqrt[5]+338041794008139001 (-1)^(1/3) Sqrt[5]+14232537789924315911 (-1)^(2/3) Sqrt[5]) ((-I+Sqrt[3]) \[Pi]+3 (1+Sqrt[5]) Log[1+Sqrt[5]]))/(5 (Sqrt[3]+I Sqrt[5]) (1+Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(48 I (20771892582970966237+471643565997268728515 (-1)^(1/3)+450644064008580060157 (-1)^(2/3)+9289472767369353632 Sqrt[5]+210925414944060255040 (-1)^(1/3) Sqrt[5]+201534152155990276160 (-1)^(2/3) Sqrt[5]) ((-I+Sqrt[3]) \[Pi]+3 (1+Sqrt[5]) Log[1+Sqrt[5]]))/(5 (Sqrt[3]+I Sqrt[5]) (1+Sqrt[5]) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(32 I (-1905273940247462271947-390631332491445165109 (-1)^(1/3)+1514674421927617547509 (-1)^(2/3)-852064409230439566119 Sqrt[5]-174695642718438735705 (-1)^(1/3) Sqrt[5]+677382994242070195737 (-1)^(2/3) Sqrt[5]) ((-I+Sqrt[3]) \[Pi]+3 (1+Sqrt[5]) Log[1+Sqrt[5]]))/(5 (Sqrt[3]+I Sqrt[5]) (1+Sqrt[5]) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(96 I (-3082808906934681163351-632043859306968309737 (-1)^(1/3)+2450783782834133151017 (-1)^(2/3)-1378674055509553930573 Sqrt[5]-282658606834338938867 (-1)^(1/3) Sqrt[5]+1096023827314240860083 (-1)^(2/3) Sqrt[5]) ((-I+Sqrt[3]) \[Pi]+3 (1+Sqrt[5]) Log[1+Sqrt[5]]))/(5 (Sqrt[3]+I Sqrt[5]) (1+Sqrt[5]) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+((-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-4078903877-2251053691 (-1)^(1/3)+1394657623 (-1)^(2/3)-1824141273 Sqrt[5]-1006701807 (-1)^(1/3) Sqrt[5]+623709867 (-1)^(2/3) Sqrt[5]) (-2 (I+Sqrt[3]) \[Pi]+3 (1+Sqrt[5]) Log[1+Sqrt[5]]))/(5 (1+Sqrt[5]) (I Sqrt[3]+Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-((-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (-2 (I+Sqrt[3]) \[Pi]+3 (1+Sqrt[5]) Log[1+Sqrt[5]]))/(60 (1+Sqrt[5]) (I Sqrt[3]+Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+((-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (-2 (I+Sqrt[3]) \[Pi]+3 (1+Sqrt[5]) Log[1+Sqrt[5]]))/(20 (1+Sqrt[5]) (I Sqrt[3]+Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-((-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (42571862+106201516 (-1)^(1/3)+69601346 (-1)^(2/3)+19038717 Sqrt[5]+47494765 (-1)^(1/3) Sqrt[5]+31126669 (-1)^(2/3) Sqrt[5]) (-2 (I+Sqrt[3]) \[Pi]+3 (1+Sqrt[5]) Log[1+Sqrt[5]]))/(5 (1+Sqrt[5]) (I Sqrt[3]+Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(4 (93013297527+532883415597 (-1)^(1/3)+439845976983 (-1)^(2/3)+41596811243 Sqrt[5]+238312708249 (-1)^(1/3) Sqrt[5]+196705100867 (-1)^(2/3) Sqrt[5]) (-2 (I+Sqrt[3]) \[Pi]+3 (1+Sqrt[5]) Log[1+Sqrt[5]]))/(5 (1+Sqrt[5]) (I Sqrt[3]+Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(4 (150498676871+862223478421 (-1)^(1/3)+711685740659 (-1)^(2/3)+67305054385 Sqrt[5]+385598061923 (-1)^(1/3) Sqrt[5]+318275538925 (-1)^(2/3) Sqrt[5]) (-2 (I+Sqrt[3]) \[Pi]+3 (1+Sqrt[5]) Log[1+Sqrt[5]]))/(15 (1+Sqrt[5]) (I Sqrt[3]+Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(2 (6411039652+36703046732 (-1)^(1/3)+30302160988 (-1)^(2/3)+2867103185 Sqrt[5]+16414102159 (-1)^(1/3) Sqrt[5]+13551537017 (-1)^(2/3) Sqrt[5]) ((I+Sqrt[3]) \[Pi]+3 (1+Sqrt[5]) Log[1+Sqrt[5]]))/(15 (1+Sqrt[5]) (I Sqrt[3]+Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(12 (4895331666179856+4980614035496080 (-1)^(1/3)+90646537182352 (-1)^(2/3)+2189258875594647 Sqrt[5]+2227398310610953 (-1)^(1/3) Sqrt[5]+40538363817175 (-1)^(2/3) Sqrt[5]) ((I+Sqrt[3]) \[Pi]+3 (1+Sqrt[5]) Log[1+Sqrt[5]]))/(5 (1+Sqrt[5]) (I Sqrt[3]+Sqrt[5]) (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(12 (-31060596091104498593+755884430638178529 (-1)^(1/3)+31824921990605394335 (-1)^(2/3)-13890720856274782009 Sqrt[5]+338041794008139001 (-1)^(1/3) Sqrt[5]+14232537789924315911 (-1)^(2/3) Sqrt[5]) ((I+Sqrt[3]) \[Pi]+3 (1+Sqrt[5]) Log[1+Sqrt[5]]))/(5 (1+Sqrt[5]) (I Sqrt[3]+Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(48 (20771892582970966237+471643565997268728515 (-1)^(1/3)+450644064008580060157 (-1)^(2/3)+9289472767369353632 Sqrt[5]+210925414944060255040 (-1)^(1/3) Sqrt[5]+201534152155990276160 (-1)^(2/3) Sqrt[5]) ((I+Sqrt[3]) \[Pi]+3 (1+Sqrt[5]) Log[1+Sqrt[5]]))/(5 (1+Sqrt[5]) (I Sqrt[3]+Sqrt[5]) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(32 (-1905273940247462271947-390631332491445165109 (-1)^(1/3)+1514674421927617547509 (-1)^(2/3)-852064409230439566119 Sqrt[5]-174695642718438735705 (-1)^(1/3) Sqrt[5]+677382994242070195737 (-1)^(2/3) Sqrt[5]) ((I+Sqrt[3]) \[Pi]+3 (1+Sqrt[5]) Log[1+Sqrt[5]]))/(5 (1+Sqrt[5]) (I Sqrt[3]+Sqrt[5]) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(96 (-3082808906934681163351-632043859306968309737 (-1)^(1/3)+2450783782834133151017 (-1)^(2/3)-1378674055509553930573 Sqrt[5]-282658606834338938867 (-1)^(1/3) Sqrt[5]+1096023827314240860083 (-1)^(2/3) Sqrt[5]) ((I+Sqrt[3]) \[Pi]+3 (1+Sqrt[5]) Log[1+Sqrt[5]]))/(5 (1+Sqrt[5]) (I Sqrt[3]+Sqrt[5]) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(I (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-4078903877-2251053691 (-1)^(1/3)+1394657623 (-1)^(2/3)-1824141273 Sqrt[5]-1006701807 (-1)^(1/3) Sqrt[5]+623709867 (-1)^(2/3) Sqrt[5]) ((5 I-2 Sqrt[3]+3 I Sqrt[5]) \[Pi]+3 (1+Sqrt[5]) Log[1+Sqrt[5]]))/(5 (Sqrt[3]+I Sqrt[5]) (1+Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(I (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) ((5 I-2 Sqrt[3]+3 I Sqrt[5]) \[Pi]+3 (1+Sqrt[5]) Log[1+Sqrt[5]]))/(60 (Sqrt[3]+I Sqrt[5]) (1+Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(I (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) ((5 I-2 Sqrt[3]+3 I Sqrt[5]) \[Pi]+3 (1+Sqrt[5]) Log[1+Sqrt[5]]))/(20 (Sqrt[3]+I Sqrt[5]) (1+Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(I (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (42571862+106201516 (-1)^(1/3)+69601346 (-1)^(2/3)+19038717 Sqrt[5]+47494765 (-1)^(1/3) Sqrt[5]+31126669 (-1)^(2/3) Sqrt[5]) ((5 I-2 Sqrt[3]+3 I Sqrt[5]) \[Pi]+3 (1+Sqrt[5]) Log[1+Sqrt[5]]))/(5 (Sqrt[3]+I Sqrt[5]) (1+Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(4 I (93013297527+532883415597 (-1)^(1/3)+439845976983 (-1)^(2/3)+41596811243 Sqrt[5]+238312708249 (-1)^(1/3) Sqrt[5]+196705100867 (-1)^(2/3) Sqrt[5]) ((5 I-2 Sqrt[3]+3 I Sqrt[5]) \[Pi]+3 (1+Sqrt[5]) Log[1+Sqrt[5]]))/(5 (Sqrt[3]+I Sqrt[5]) (1+Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(4 I (150498676871+862223478421 (-1)^(1/3)+711685740659 (-1)^(2/3)+67305054385 Sqrt[5]+385598061923 (-1)^(1/3) Sqrt[5]+318275538925 (-1)^(2/3) Sqrt[5]) ((5 I-2 Sqrt[3]+3 I Sqrt[5]) \[Pi]+3 (1+Sqrt[5]) Log[1+Sqrt[5]]))/(15 (Sqrt[3]+I Sqrt[5]) (1+Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+((-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-965145+500095 (-1)^(1/3)+1483645 (-1)^(2/3)-431636 Sqrt[5]+223734 (-1)^(1/3) Sqrt[5]+663482 (-1)^(2/3) Sqrt[5]) (2/3 \[Pi] ArcTan[Sqrt[3/5]]-I \[Pi] Log[2]+2/3 I \[Pi] Log[1+Sqrt[5]]))/(100 (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(3 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (72291297415+414085302605 (-1)^(1/3)+341810686375 (-1)^(2/3)+32329651070 Sqrt[5]+185184576694 (-1)^(1/3) Sqrt[5]+152862385526 (-1)^(2/3) Sqrt[5]) (2/3 \[Pi] ArcTan[Sqrt[3/5]]-I \[Pi] Log[2]+2/3 I \[Pi] Log[1+Sqrt[5]]))/(25 (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(6 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-560628376878850-443035926769850 (-1)^(1/3)+117961040719790 (-1)^(2/3)-250720632163277 Sqrt[5]-198131689746415 (-1)^(1/3) Sqrt[5]+52753781149243 (-1)^(2/3) Sqrt[5]) (2/3 \[Pi] ArcTan[Sqrt[3/5]]-I \[Pi] Log[2]+2/3 I \[Pi] Log[1+Sqrt[5]]))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(36 (37499620392006345+38180926368577415 (-1)^(1/3)+680746680212825 (-1)^(2/3)+16770340065395103 Sqrt[5]+17075029360808785 (-1)^(1/3) Sqrt[5]+304439170483951 (-1)^(2/3) Sqrt[5]) (2/3 \[Pi] ArcTan[Sqrt[3/5]]-I \[Pi] Log[2]+2/3 I \[Pi] Log[1+Sqrt[5]]))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(24 (434629424346491595+442520974044559565 (-1)^(1/3)+7892420889341075 (-1)^(2/3)+194372187572072313 Sqrt[5]+197901395886610415 (-1)^(1/3) Sqrt[5]+3529597923121601 (-1)^(2/3) Sqrt[5]) (2/3 \[Pi] ArcTan[Sqrt[3/5]]-I \[Pi] Log[2]+2/3 I \[Pi] Log[1+Sqrt[5]]))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(9 (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-13965517808785175+4108857361064295 (-1)^(1/3)+18101487615121865 (-1)^(2/3)-6245569432285857 Sqrt[5]+1837536873837873 (-1)^(1/3) Sqrt[5]+8095231360256991 (-1)^(2/3) Sqrt[5]) (2/3 \[Pi] ArcTan[Sqrt[3/5]]-I \[Pi] Log[2]+2/3 I \[Pi] Log[1+Sqrt[5]]))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+((40+358 Log[2]-107 Log[4]-26 Log[64]+2 Log[1024]) (-(1/2) Log[5-Sqrt[5]]+1/2 Log[5+Sqrt[5]]))/(20 Sqrt[5])+(((-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (28050512449+41057809823 (-1)^(1/3)+13007434993 (-1)^(2/3)+12544570479 Sqrt[5]+18361610961 (-1)^(1/3) Sqrt[5]+5817101439 (-1)^(2/3) Sqrt[5]))/(24 (1+(-1)^(1/3)) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(3 (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (11491597573125525+11810572106608427 (-1)^(1/3)+318969426037973 (-1)^(2/3)+5139198668716581 Sqrt[5]+5281848416709403 (-1)^(1/3) Sqrt[5]+142647463873381 (-1)^(2/3) Sqrt[5]))/(4 (1+(-1)^(1/3)) (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(3 (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-937483145409870329+9900516102083973369 (-1)^(1/3)+10837983977275414343 (-1)^(2/3)-419255208179358151 Sqrt[5]+4427645403318202183 (-1)^(1/3) Sqrt[5]+4846893782448272633 (-1)^(2/3) Sqrt[5]))/(2 (1+(-1)^(1/3)) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(3 (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-296859419226011637513-150347326917195645111 (-1)^(1/3)+146511036368198437815 (-1)^(2/3)-132759568230094005883 Sqrt[5]-67237368644446672325 (-1)^(1/3) Sqrt[5]+65521727354647123013 (-1)^(2/3) Sqrt[5]))/((1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(12 (-7630125601824648972497-7292801725705858250863 (-1)^(1/3)+337323883862289718063 (-1)^(2/3)-3412295904508281684309 Sqrt[5]-3261440081021214915051 (-1)^(1/3) Sqrt[5]+150855826950064832811 (-1)^(2/3) Sqrt[5]))/((1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(4 (1930813782360423260641+10614711065970004612703 (-1)^(1/3)+8683897295435317761889 (-1)^(2/3)+863486173850278157979 Sqrt[5]+4747043101005636982437 (-1)^(1/3) Sqrt[5]+3883556932443988953243 (-1)^(2/3) Sqrt[5]))/((1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))) PolyLog[2,1/(1+(-1)^(1/3))]-(-((-148122271233+676250245521 (-1)^(1/3)+824372598735 (-1)^(2/3)-66242317841 Sqrt[5]+302428328129 (-1)^(1/3) Sqrt[5]+368670610303 (-1)^(2/3) Sqrt[5])/(6 (1+(-1)^(1/3)) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5])))+(6 (-134772432606987830-103058721012820970 (-1)^(1/3)+31713711614886858 (-1)^(2/3)-60272064160432433 Sqrt[5]-46089261171784175 (-1)^(1/3) Sqrt[5]+14182802997953295 (-1)^(2/3) Sqrt[5]))/((1+(-1)^(1/3)) (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(6 (-247947784556034393263-160663828066456862737 (-1)^(1/3)+87283956365421184081 (-1)^(2/3)-110885620227553076175 Sqrt[5]-71851048216387235057 (-1)^(1/3) Sqrt[5]+39034571955641454769 (-1)^(2/3) Sqrt[5]))/((1+(-1)^(1/3)) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(12 (-5901706151894161326439-1256166018718081237913 (-1)^(1/3)+4645540141761530745689 (-1)^(2/3)-2639323227772808811627 Sqrt[5]-561774521775780557589 (-1)^(1/3) Sqrt[5]+2077548709836558451413 (-1)^(2/3) Sqrt[5]))/((1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(16 (156067831776072955567539+232313203033480706748045 (-1)^(1/3)+76245371257311604684083 (-1)^(2/3)+69795656190460171793903 Sqrt[5]+103893622810714643683153 (-1)^(1/3) Sqrt[5]+34097966620211470239215 (-1)^(2/3) Sqrt[5]))/((1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(96 (-17523511381847467849479+67948848470342919455079 (-1)^(1/3)+85472359852221864575481 (-1)^(2/3)-7836752530860441744508 Sqrt[5]+30387648834503873419228 (-1)^(1/3) Sqrt[5]+38224401365378394417092 (-1)^(2/3) Sqrt[5]))/((1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))) PolyLog[2,1/(1+(-1)^(1/3))]-(((-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (28050512449+41057809823 (-1)^(1/3)+13007434993 (-1)^(2/3)+12544570479 Sqrt[5]+18361610961 (-1)^(1/3) Sqrt[5]+5817101439 (-1)^(2/3) Sqrt[5]))/(24 (1+(-1)^(1/3)) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(3 (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (11491597573125525+11810572106608427 (-1)^(1/3)+318969426037973 (-1)^(2/3)+5139198668716581 Sqrt[5]+5281848416709403 (-1)^(1/3) Sqrt[5]+142647463873381 (-1)^(2/3) Sqrt[5]))/(4 (1+(-1)^(1/3)) (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(3 (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-937483145409870329+9900516102083973369 (-1)^(1/3)+10837983977275414343 (-1)^(2/3)-419255208179358151 Sqrt[5]+4427645403318202183 (-1)^(1/3) Sqrt[5]+4846893782448272633 (-1)^(2/3) Sqrt[5]))/(2 (1+(-1)^(1/3)) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(3 (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-296859419226011637513-150347326917195645111 (-1)^(1/3)+146511036368198437815 (-1)^(2/3)-132759568230094005883 Sqrt[5]-67237368644446672325 (-1)^(1/3) Sqrt[5]+65521727354647123013 (-1)^(2/3) Sqrt[5]))/((1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(12 (-7630125601824648972497-7292801725705858250863 (-1)^(1/3)+337323883862289718063 (-1)^(2/3)-3412295904508281684309 Sqrt[5]-3261440081021214915051 (-1)^(1/3) Sqrt[5]+150855826950064832811 (-1)^(2/3) Sqrt[5]))/((1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(4 (1930813782360423260641+10614711065970004612703 (-1)^(1/3)+8683897295435317761889 (-1)^(2/3)+863486173850278157979 Sqrt[5]+4747043101005636982437 (-1)^(1/3) Sqrt[5]+3883556932443988953243 (-1)^(2/3) Sqrt[5]))/((1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))) PolyLog[2,(-1)^(1/3)/(1+(-1)^(1/3))]+(-((-148122271233+676250245521 (-1)^(1/3)+824372598735 (-1)^(2/3)-66242317841 Sqrt[5]+302428328129 (-1)^(1/3) Sqrt[5]+368670610303 (-1)^(2/3) Sqrt[5])/(6 (1+(-1)^(1/3)) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5])))+(6 (-134772432606987830-103058721012820970 (-1)^(1/3)+31713711614886858 (-1)^(2/3)-60272064160432433 Sqrt[5]-46089261171784175 (-1)^(1/3) Sqrt[5]+14182802997953295 (-1)^(2/3) Sqrt[5]))/((1+(-1)^(1/3)) (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(6 (-247947784556034393263-160663828066456862737 (-1)^(1/3)+87283956365421184081 (-1)^(2/3)-110885620227553076175 Sqrt[5]-71851048216387235057 (-1)^(1/3) Sqrt[5]+39034571955641454769 (-1)^(2/3) Sqrt[5]))/((1+(-1)^(1/3)) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(12 (-5901706151894161326439-1256166018718081237913 (-1)^(1/3)+4645540141761530745689 (-1)^(2/3)-2639323227772808811627 Sqrt[5]-561774521775780557589 (-1)^(1/3) Sqrt[5]+2077548709836558451413 (-1)^(2/3) Sqrt[5]))/((1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(16 (156067831776072955567539+232313203033480706748045 (-1)^(1/3)+76245371257311604684083 (-1)^(2/3)+69795656190460171793903 Sqrt[5]+103893622810714643683153 (-1)^(1/3) Sqrt[5]+34097966620211470239215 (-1)^(2/3) Sqrt[5]))/((1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(96 (-17523511381847467849479+67948848470342919455079 (-1)^(1/3)+85472359852221864575481 (-1)^(2/3)-7836752530860441744508 Sqrt[5]+30387648834503873419228 (-1)^(1/3) Sqrt[5]+38224401365378394417092 (-1)^(2/3) Sqrt[5]))/((1+(-1)^(1/3)) (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))) PolyLog[2,(1+(-1)^(2/3))/(1+(-1)^(1/3))]-(((47-49 (-1)^(1/3)+21 Sqrt[5]-21 (-1)^(1/3) Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-965145+500095 (-1)^(1/3)+1483645 (-1)^(2/3)-431636 Sqrt[5]+223734 (-1)^(1/3) Sqrt[5]+663482 (-1)^(2/3) Sqrt[5]))/(100 (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(3 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (72291297415+414085302605 (-1)^(1/3)+341810686375 (-1)^(2/3)+32329651070 Sqrt[5]+185184576694 (-1)^(1/3) Sqrt[5]+152862385526 (-1)^(2/3) Sqrt[5]))/(25 (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(6 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-560628376878850-443035926769850 (-1)^(1/3)+117961040719790 (-1)^(2/3)-250720632163277 Sqrt[5]-198131689746415 (-1)^(1/3) Sqrt[5]+52753781149243 (-1)^(2/3) Sqrt[5]))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(36 (37499620392006345+38180926368577415 (-1)^(1/3)+680746680212825 (-1)^(2/3)+16770340065395103 Sqrt[5]+17075029360808785 (-1)^(1/3) Sqrt[5]+304439170483951 (-1)^(2/3) Sqrt[5]))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(24 (434629424346491595+442520974044559565 (-1)^(1/3)+7892420889341075 (-1)^(2/3)+194372187572072313 Sqrt[5]+197901395886610415 (-1)^(1/3) Sqrt[5]+3529597923121601 (-1)^(2/3) Sqrt[5]))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(9 (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-13965517808785175+4108857361064295 (-1)^(1/3)+18101487615121865 (-1)^(2/3)-6245569432285857 Sqrt[5]+1837536873837873 (-1)^(1/3) Sqrt[5]+8095231360256991 (-1)^(2/3) Sqrt[5]))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))) PolyLog[2,(2 (-1)^(1/6))/(Sqrt[3]-I Sqrt[5])]-(-((111765150265+631352172215 (-1)^(1/3)+523554139465 (-1)^(2/3)+49982882467 Sqrt[5]+282349284077 (-1)^(1/3) Sqrt[5]+234140511283 (-1)^(2/3) Sqrt[5])/(50 (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5])))+(18 (81822695698392045+83186619111451315 (-1)^(1/3)+1545036731754925 (-1)^(2/3)+36592221936771828 Sqrt[5]+37202187030311980 (-1)^(1/3) Sqrt[5]+690961432004596 (-1)^(2/3) Sqrt[5]))/(25 (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(18 (-16304282974702338195+307515295037167955 (-1)^(1/3)+16890720971856147245 (-1)^(2/3)-7291497011165381299 Sqrt[5]+137525020764806387 (-1)^(1/3) Sqrt[5]+7553760056410322445 (-1)^(2/3) Sqrt[5]))/(25 (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(36 (319597503121545446425+7127995150991588470055 (-1)^(1/3)+6821247218481441490585 (-1)^(2/3)+142928348483795372603 Sqrt[5]+3187736340181213836805 (-1)^(1/3) Sqrt[5]+3050554494371172605243 (-1)^(2/3) Sqrt[5]))/(25 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(48 (-62661628894722366087405-12847352274316377541395 (-1)^(1/3)+49815492676804221678675 (-1)^(2/3)-28023132357892844601961 Sqrt[5]-5745510603251589421847 (-1)^(1/3) Sqrt[5]+22278165591595440381527 (-1)^(2/3) Sqrt[5]))/(25 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(144 (-76448575110228823250515-15673732682248849072685 (-1)^(1/3)+60775525289535712422125 (-1)^(2/3)-34188842145894024904023 Sqrt[5]-7009506347733708065961 (-1)^(1/3) Sqrt[5]+27179641183131888708201 (-1)^(2/3) Sqrt[5]))/(25 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))) PolyLog[2,-((2 (-1)^(5/6))/(Sqrt[3]-I Sqrt[5]))]+(((47-49 (-1)^(1/3)+21 Sqrt[5]-21 (-1)^(1/3) Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-965145+500095 (-1)^(1/3)+1483645 (-1)^(2/3)-431636 Sqrt[5]+223734 (-1)^(1/3) Sqrt[5]+663482 (-1)^(2/3) Sqrt[5]))/(100 (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(3 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (72291297415+414085302605 (-1)^(1/3)+341810686375 (-1)^(2/3)+32329651070 Sqrt[5]+185184576694 (-1)^(1/3) Sqrt[5]+152862385526 (-1)^(2/3) Sqrt[5]))/(25 (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(6 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-560628376878850-443035926769850 (-1)^(1/3)+117961040719790 (-1)^(2/3)-250720632163277 Sqrt[5]-198131689746415 (-1)^(1/3) Sqrt[5]+52753781149243 (-1)^(2/3) Sqrt[5]))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(36 (37499620392006345+38180926368577415 (-1)^(1/3)+680746680212825 (-1)^(2/3)+16770340065395103 Sqrt[5]+17075029360808785 (-1)^(1/3) Sqrt[5]+304439170483951 (-1)^(2/3) Sqrt[5]))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(24 (434629424346491595+442520974044559565 (-1)^(1/3)+7892420889341075 (-1)^(2/3)+194372187572072313 Sqrt[5]+197901395886610415 (-1)^(1/3) Sqrt[5]+3529597923121601 (-1)^(2/3) Sqrt[5]))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(9 (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-13965517808785175+4108857361064295 (-1)^(1/3)+18101487615121865 (-1)^(2/3)-6245569432285857 Sqrt[5]+1837536873837873 (-1)^(1/3) Sqrt[5]+8095231360256991 (-1)^(2/3) Sqrt[5]))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))) PolyLog[2,-((2 I (1+(-1)^(2/3)))/(Sqrt[3]-I Sqrt[5]))]+(-((111765150265+631352172215 (-1)^(1/3)+523554139465 (-1)^(2/3)+49982882467 Sqrt[5]+282349284077 (-1)^(1/3) Sqrt[5]+234140511283 (-1)^(2/3) Sqrt[5])/(50 (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5])))+(18 (81822695698392045+83186619111451315 (-1)^(1/3)+1545036731754925 (-1)^(2/3)+36592221936771828 Sqrt[5]+37202187030311980 (-1)^(1/3) Sqrt[5]+690961432004596 (-1)^(2/3) Sqrt[5]))/(25 (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(18 (-16304282974702338195+307515295037167955 (-1)^(1/3)+16890720971856147245 (-1)^(2/3)-7291497011165381299 Sqrt[5]+137525020764806387 (-1)^(1/3) Sqrt[5]+7553760056410322445 (-1)^(2/3) Sqrt[5]))/(25 (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(36 (319597503121545446425+7127995150991588470055 (-1)^(1/3)+6821247218481441490585 (-1)^(2/3)+142928348483795372603 Sqrt[5]+3187736340181213836805 (-1)^(1/3) Sqrt[5]+3050554494371172605243 (-1)^(2/3) Sqrt[5]))/(25 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(48 (-62661628894722366087405-12847352274316377541395 (-1)^(1/3)+49815492676804221678675 (-1)^(2/3)-28023132357892844601961 Sqrt[5]-5745510603251589421847 (-1)^(1/3) Sqrt[5]+22278165591595440381527 (-1)^(2/3) Sqrt[5]))/(25 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(144 (-76448575110228823250515-15673732682248849072685 (-1)^(1/3)+60775525289535712422125 (-1)^(2/3)-34188842145894024904023 Sqrt[5]-7009506347733708065961 (-1)^(1/3) Sqrt[5]+27179641183131888708201 (-1)^(2/3) Sqrt[5]))/(25 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))) PolyLog[2,(I+Sqrt[3])/(Sqrt[3]-I Sqrt[5])]-(((47-49 (-1)^(1/3)+21 Sqrt[5]-21 (-1)^(1/3) Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-965145+500095 (-1)^(1/3)+1483645 (-1)^(2/3)-431636 Sqrt[5]+223734 (-1)^(1/3) Sqrt[5]+663482 (-1)^(2/3) Sqrt[5]))/(100 (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(3 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (72291297415+414085302605 (-1)^(1/3)+341810686375 (-1)^(2/3)+32329651070 Sqrt[5]+185184576694 (-1)^(1/3) Sqrt[5]+152862385526 (-1)^(2/3) Sqrt[5]))/(25 (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(6 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-560628376878850-443035926769850 (-1)^(1/3)+117961040719790 (-1)^(2/3)-250720632163277 Sqrt[5]-198131689746415 (-1)^(1/3) Sqrt[5]+52753781149243 (-1)^(2/3) Sqrt[5]))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(36 (37499620392006345+38180926368577415 (-1)^(1/3)+680746680212825 (-1)^(2/3)+16770340065395103 Sqrt[5]+17075029360808785 (-1)^(1/3) Sqrt[5]+304439170483951 (-1)^(2/3) Sqrt[5]))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(24 (434629424346491595+442520974044559565 (-1)^(1/3)+7892420889341075 (-1)^(2/3)+194372187572072313 Sqrt[5]+197901395886610415 (-1)^(1/3) Sqrt[5]+3529597923121601 (-1)^(2/3) Sqrt[5]))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(9 (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-13965517808785175+4108857361064295 (-1)^(1/3)+18101487615121865 (-1)^(2/3)-6245569432285857 Sqrt[5]+1837536873837873 (-1)^(1/3) Sqrt[5]+8095231360256991 (-1)^(2/3) Sqrt[5]))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))) PolyLog[2,-((2 (-1)^(5/6))/(Sqrt[3]+I Sqrt[5]))]+(-((111765150265+631352172215 (-1)^(1/3)+523554139465 (-1)^(2/3)+49982882467 Sqrt[5]+282349284077 (-1)^(1/3) Sqrt[5]+234140511283 (-1)^(2/3) Sqrt[5])/(50 (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5])))+(18 (81822695698392045+83186619111451315 (-1)^(1/3)+1545036731754925 (-1)^(2/3)+36592221936771828 Sqrt[5]+37202187030311980 (-1)^(1/3) Sqrt[5]+690961432004596 (-1)^(2/3) Sqrt[5]))/(25 (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(18 (-16304282974702338195+307515295037167955 (-1)^(1/3)+16890720971856147245 (-1)^(2/3)-7291497011165381299 Sqrt[5]+137525020764806387 (-1)^(1/3) Sqrt[5]+7553760056410322445 (-1)^(2/3) Sqrt[5]))/(25 (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(36 (319597503121545446425+7127995150991588470055 (-1)^(1/3)+6821247218481441490585 (-1)^(2/3)+142928348483795372603 Sqrt[5]+3187736340181213836805 (-1)^(1/3) Sqrt[5]+3050554494371172605243 (-1)^(2/3) Sqrt[5]))/(25 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(48 (-62661628894722366087405-12847352274316377541395 (-1)^(1/3)+49815492676804221678675 (-1)^(2/3)-28023132357892844601961 Sqrt[5]-5745510603251589421847 (-1)^(1/3) Sqrt[5]+22278165591595440381527 (-1)^(2/3) Sqrt[5]))/(25 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(144 (-76448575110228823250515-15673732682248849072685 (-1)^(1/3)+60775525289535712422125 (-1)^(2/3)-34188842145894024904023 Sqrt[5]-7009506347733708065961 (-1)^(1/3) Sqrt[5]+27179641183131888708201 (-1)^(2/3) Sqrt[5]))/(25 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))) PolyLog[2,(-I+Sqrt[3])/(Sqrt[3]+I Sqrt[5])]+(((47-49 (-1)^(1/3)+21 Sqrt[5]-21 (-1)^(1/3) Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-965145+500095 (-1)^(1/3)+1483645 (-1)^(2/3)-431636 Sqrt[5]+223734 (-1)^(1/3) Sqrt[5]+663482 (-1)^(2/3) Sqrt[5]))/(100 (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(3 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (72291297415+414085302605 (-1)^(1/3)+341810686375 (-1)^(2/3)+32329651070 Sqrt[5]+185184576694 (-1)^(1/3) Sqrt[5]+152862385526 (-1)^(2/3) Sqrt[5]))/(25 (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(6 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-560628376878850-443035926769850 (-1)^(1/3)+117961040719790 (-1)^(2/3)-250720632163277 Sqrt[5]-198131689746415 (-1)^(1/3) Sqrt[5]+52753781149243 (-1)^(2/3) Sqrt[5]))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))-(36 (37499620392006345+38180926368577415 (-1)^(1/3)+680746680212825 (-1)^(2/3)+16770340065395103 Sqrt[5]+17075029360808785 (-1)^(1/3) Sqrt[5]+304439170483951 (-1)^(2/3) Sqrt[5]))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(24 (434629424346491595+442520974044559565 (-1)^(1/3)+7892420889341075 (-1)^(2/3)+194372187572072313 Sqrt[5]+197901395886610415 (-1)^(1/3) Sqrt[5]+3529597923121601 (-1)^(2/3) Sqrt[5]))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))-(9 (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-13965517808785175+4108857361064295 (-1)^(1/3)+18101487615121865 (-1)^(2/3)-6245569432285857 Sqrt[5]+1837536873837873 (-1)^(1/3) Sqrt[5]+8095231360256991 (-1)^(2/3) Sqrt[5]))/(25 (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))) PolyLog[2,(I+Sqrt[3])/(Sqrt[3]+I Sqrt[5])]-(-((111765150265+631352172215 (-1)^(1/3)+523554139465 (-1)^(2/3)+49982882467 Sqrt[5]+282349284077 (-1)^(1/3) Sqrt[5]+234140511283 (-1)^(2/3) Sqrt[5])/(50 (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5])))+(18 (81822695698392045+83186619111451315 (-1)^(1/3)+1545036731754925 (-1)^(2/3)+36592221936771828 Sqrt[5]+37202187030311980 (-1)^(1/3) Sqrt[5]+690961432004596 (-1)^(2/3) Sqrt[5]))/(25 (-300091+154359 (-1)^(1/3)+467317 (-1)^(2/3)-134199 Sqrt[5]+69043 (-1)^(1/3) Sqrt[5]+208993 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(18 (-16304282974702338195+307515295037167955 (-1)^(1/3)+16890720971856147245 (-1)^(2/3)-7291497011165381299 Sqrt[5]+137525020764806387 (-1)^(1/3) Sqrt[5]+7553760056410322445 (-1)^(2/3) Sqrt[5]))/(25 (-735+767 (-1)^(1/3)-329 Sqrt[5]+343 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (54231370155+311037028821 (-1)^(1/3)+256640193819 (-1)^(2/3)+24253006009 Sqrt[5]+139099988135 (-1)^(1/3) Sqrt[5]+114772984009 (-1)^(2/3) Sqrt[5]))+(36 (319597503121545446425+7127995150991588470055 (-1)^(1/3)+6821247218481441490585 (-1)^(2/3)+142928348483795372603 Sqrt[5]+3187736340181213836805 (-1)^(1/3) Sqrt[5]+3050554494371172605243 (-1)^(2/3) Sqrt[5]))/(25 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(48 (-62661628894722366087405-12847352274316377541395 (-1)^(1/3)+49815492676804221678675 (-1)^(2/3)-28023132357892844601961 Sqrt[5]-5745510603251589421847 (-1)^(1/3) Sqrt[5]+22278165591595440381527 (-1)^(2/3) Sqrt[5]))/(25 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))+(144 (-76448575110228823250515-15673732682248849072685 (-1)^(1/3)+60775525289535712422125 (-1)^(2/3)-34188842145894024904023 Sqrt[5]-7009506347733708065961 (-1)^(1/3) Sqrt[5]+27179641183131888708201 (-1)^(2/3) Sqrt[5]))/(25 (-47+49 (-1)^(1/3)-21 Sqrt[5]+21 (-1)^(1/3) Sqrt[5]) (-455+474 (-1)^(1/3)-203 Sqrt[5]+212 (-1)^(1/3) Sqrt[5]) (-3+2 (-1)^(1/3)-2 (-1)^(2/3)+Sqrt[5]+2 (-1)^(2/3) Sqrt[5]) (-12+7 (-1)^(1/3)+(-1)^(2/3)-3 (-1)^(1/3) Sqrt[5]+5 (-1)^(2/3) Sqrt[5]) (-485543+249787 (-1)^(1/3)+756141 (-1)^(2/3)-217145 Sqrt[5]+111701 (-1)^(1/3) Sqrt[5]+338155 (-1)^(2/3) Sqrt[5]) (33516829945+192231455927 (-1)^(1/3)+158612363113 (-1)^(2/3)+14989182073 Sqrt[5]+85968520343 (-1)^(1/3) Sqrt[5]+70933604905 (-1)^(2/3) Sqrt[5]))) PolyLog[2,(I+Sqrt[3])/(Sqrt[3]+I Sqrt[5])]