(1/(240 Sqrt[5]))(20 (35 + 12 Sqrt[5]) Pi^2 + 120 I Sqrt[5] Pi Log[2] - 120 Sqrt[5] Log[2]^2 + 4 Log[2] (-60 I Sqrt[5] Pi + Sqrt[5] Log[1152921504606846976] - 3 (200 Sqrt[5] + 10 Sqrt[5] Log[5 - 2 Sqrt[5]] + 20 Sqrt[5] Log[5 + 2 Sqrt[5]] + 20 Sqrt[5] Log[1 + Sqrt[5] - I Sqrt[10 - 2 Sqrt[5]]] + 60 Log[5 + Sqrt[5] - I Sqrt[10 - 2 Sqrt[5]]] - 20 Sqrt[5] Log[5 + Sqrt[5] - I Sqrt[10 - 2 Sqrt[5]]] - 15 I Sqrt[2 (5 + Sqrt[5])] Log[5 + Sqrt[5] - I Sqrt[10 - 2 Sqrt[5]]] + 9 I Sqrt[10 (5 + Sqrt[5])] Log[5 + Sqrt[5] - I Sqrt[10 - 2 Sqrt[5]]] + 20 Sqrt[5] Log[1 + Sqrt[5] + I Sqrt[10 - 2 Sqrt[5]]] + 60 Log[5 + Sqrt[5] + I Sqrt[10 - 2 Sqrt[5]]] - 20 Sqrt[5] Log[5 + Sqrt[5] + I Sqrt[10 - 2 Sqrt[5]]] + 15 I Sqrt[2 (5 + Sqrt[5])] Log[5 + Sqrt[5] + I Sqrt[10 - 2 Sqrt[5]]] - 9 I Sqrt[10 (5 + Sqrt[5])] Log[5 + Sqrt[5] + I Sqrt[10 - 2 Sqrt[5]]] + 20 Sqrt[5] Log[1 - Sqrt[5] - I Sqrt[2 (5 + Sqrt[5])]] - 60 Log[5 - Sqrt[5] - I Sqrt[2 (5 + Sqrt[5])]] - 20 Sqrt[5] Log[5 - Sqrt[5] - I Sqrt[2 (5 + Sqrt[5])]] - 9 I Sqrt[50 - 10 Sqrt[5]] Log[5 - Sqrt[5] - I Sqrt[2 (5 + Sqrt[5])]] - 15 I Sqrt[10 - 2 Sqrt[5]] Log[5 - Sqrt[5] - I Sqrt[2 (5 + Sqrt[5])]] + 20 Sqrt[5] Log[(-5 + Sqrt[5] - I Sqrt[2 (5 + Sqrt[5])])/( 3 + Sqrt[5] - I Sqrt[2 (5 + Sqrt[5])])] + 20 Sqrt[5] Log[1 - Sqrt[5] + I Sqrt[2 (5 + Sqrt[5])]] - 60 Log[5 - Sqrt[5] + I Sqrt[2 (5 + Sqrt[5])]] - 20 Sqrt[5] Log[5 - Sqrt[5] + I Sqrt[2 (5 + Sqrt[5])]] + 9 I Sqrt[50 - 10 Sqrt[5]] Log[5 - Sqrt[5] + I Sqrt[2 (5 + Sqrt[5])]] + 15 I Sqrt[10 - 2 Sqrt[5]] Log[5 - Sqrt[5] + I Sqrt[2 (5 + Sqrt[5])]])) + 3 (200 Sqrt[5] Log[16] + 350 Log[-1 + I Sqrt[5 - 2 Sqrt[5]]]^2 + 130 Sqrt[5] Log[-1 + I Sqrt[5 - 2 Sqrt[5]]]^2 - 61 I Sqrt[50 - 10 Sqrt[5]] Log[-1 + I Sqrt[5 - 2 Sqrt[5]]]^2 - 145 I Sqrt[10 - 2 Sqrt[5]] Log[-1 + I Sqrt[5 - 2 Sqrt[5]]]^2 + 350 Log[-(8/(3 + Sqrt[5] - I Sqrt[2 (5 + Sqrt[5])]))]^2 + 130 Sqrt[5] Log[-(8/(3 + Sqrt[5] - I Sqrt[2 (5 + Sqrt[5])]))]^2 + 61 I Sqrt[50 - 10 Sqrt[5]] Log[-(8/(3 + Sqrt[5] - I Sqrt[2 (5 + Sqrt[5])]))]^2 + 145 I Sqrt[10 - 2 Sqrt[5]] Log[-(8/(3 + Sqrt[5] - I Sqrt[2 (5 + Sqrt[5])]))]^2 + 2 Log[64] (20 Log[5 + Sqrt[5] - I Sqrt[10 - 2 Sqrt[5]]] - 5 I Sqrt[2 (5 + Sqrt[5])] Log[5 + Sqrt[5] - I Sqrt[10 - 2 Sqrt[5]]] + 3 I Sqrt[10 (5 + Sqrt[5])] Log[5 + Sqrt[5] - I Sqrt[10 - 2 Sqrt[5]]] + 20 Log[5 + Sqrt[5] + I Sqrt[10 - 2 Sqrt[5]]] + 5 I Sqrt[2 (5 + Sqrt[5])] Log[5 + Sqrt[5] + I Sqrt[10 - 2 Sqrt[5]]] - 3 I Sqrt[10 (5 + Sqrt[5])] Log[5 + Sqrt[5] + I Sqrt[10 - 2 Sqrt[5]]] - I (-20 I + 3 Sqrt[50 - 10 Sqrt[5]] + 5 Sqrt[10 - 2 Sqrt[5]]) Log[ 5 - Sqrt[5] - I Sqrt[2 (5 + Sqrt[5])]] + I (20 I + 3 Sqrt[50 - 10 Sqrt[5]] + 5 Sqrt[10 - 2 Sqrt[5]]) Log[ 5 - Sqrt[5] + I Sqrt[2 (5 + Sqrt[5])]]) - 350 Log[-1 - I Sqrt[5 + 2 Sqrt[5]]]^2 + 130 Sqrt[5] Log[-1 - I Sqrt[5 + 2 Sqrt[5]]]^2 + 145 I Sqrt[2 (5 + Sqrt[5])] Log[-1 - I Sqrt[5 + 2 Sqrt[5]]]^2 - 61 I Sqrt[10 (5 + Sqrt[5])] Log[-1 - I Sqrt[5 + 2 Sqrt[5]]]^2 - 350 Log[-1 + I Sqrt[5 + 2 Sqrt[5]]]^2 + 130 Sqrt[5] Log[-1 + I Sqrt[5 + 2 Sqrt[5]]]^2 - 145 I Sqrt[2 (5 + Sqrt[5])] Log[-1 + I Sqrt[5 + 2 Sqrt[5]]]^2 + 61 I Sqrt[10 (5 + Sqrt[5])] Log[-1 + I Sqrt[5 + 2 Sqrt[5]]]^2 + 350 Log[-(1/2) I (-I + Sqrt[5 + 2 Sqrt[5]])]^2 - 130 Sqrt[5] Log[-(1/2) I (-I + Sqrt[5 + 2 Sqrt[5]])]^2 - 2 I Sqrt[54850 - 24410 Sqrt[5]] Log[-(1/2) I (-I + Sqrt[5 + 2 Sqrt[5]])]^2 + 350 Log[1/2 I (I + Sqrt[5 + 2 Sqrt[5]])]^2 - 130 Sqrt[5] Log[1/2 I (I + Sqrt[5 + 2 Sqrt[5]])]^2 + 2 I Sqrt[54850 - 24410 Sqrt[5]] Log[1/2 I (I + Sqrt[5 + 2 Sqrt[5]])]^2 + 80 Sqrt[5] PolyLog[2, 1/2 (1 - I Sqrt[5 - 2 Sqrt[5]])] + 122 I Sqrt[50 - 10 Sqrt[5]] PolyLog[2, 1/2 (1 - I Sqrt[5 - 2 Sqrt[5]])] + 290 I Sqrt[10 - 2 Sqrt[5]] PolyLog[2, 1/2 (1 - I Sqrt[5 - 2 Sqrt[5]])] - 4 I Sqrt[54850 + 24410 Sqrt[5]] PolyLog[2, 1/2 (1 - I Sqrt[5 - 2 Sqrt[5]])] + 700 PolyLog[2, 1 - I Sqrt[5 - 2 Sqrt[5]]] + 180 Sqrt[5] PolyLog[2, 1 - I Sqrt[5 - 2 Sqrt[5]]] - 122 I Sqrt[50 - 10 Sqrt[5]] PolyLog[2, 1 - I Sqrt[5 - 2 Sqrt[5]]] - 290 I Sqrt[10 - 2 Sqrt[5]] PolyLog[2, 1 - I Sqrt[5 - 2 Sqrt[5]]] + 80 Sqrt[5] PolyLog[2, 1/2 (1 + I Sqrt[5 - 2 Sqrt[5]])] - 122 I Sqrt[50 - 10 Sqrt[5]] PolyLog[2, 1/2 (1 + I Sqrt[5 - 2 Sqrt[5]])] - 290 I Sqrt[10 - 2 Sqrt[5]] PolyLog[2, 1/2 (1 + I Sqrt[5 - 2 Sqrt[5]])] + 4 I Sqrt[54850 + 24410 Sqrt[5]] PolyLog[2, 1/2 (1 + I Sqrt[5 - 2 Sqrt[5]])] - 700 PolyLog[2, 1/8 (3 - Sqrt[5] - I Sqrt[10 - 2 Sqrt[5]])] + 260 Sqrt[5] PolyLog[2, 1/8 (3 - Sqrt[5] - I Sqrt[10 - 2 Sqrt[5]])] + 290 I Sqrt[2 (5 + Sqrt[5])] PolyLog[2, 1/8 (3 - Sqrt[5] - I Sqrt[10 - 2 Sqrt[5]])] - 122 I Sqrt[10 (5 + Sqrt[5])] PolyLog[2, 1/8 (3 - Sqrt[5] - I Sqrt[10 - 2 Sqrt[5]])] - 700 PolyLog[2, 1/8 (3 - Sqrt[5] + I Sqrt[10 - 2 Sqrt[5]])] + 260 Sqrt[5] PolyLog[2, 1/8 (3 - Sqrt[5] + I Sqrt[10 - 2 Sqrt[5]])] - 290 I Sqrt[2 (5 + Sqrt[5])] PolyLog[2, 1/8 (3 - Sqrt[5] + I Sqrt[10 - 2 Sqrt[5]])] + 122 I Sqrt[10 (5 + Sqrt[5])] PolyLog[2, 1/8 (3 - Sqrt[5] + I Sqrt[10 - 2 Sqrt[5]])] + 700 PolyLog[2, 8/(3 + Sqrt[5] - I Sqrt[2 (5 + Sqrt[5])])] + 180 Sqrt[5] PolyLog[2, 8/(3 + Sqrt[5] - I Sqrt[2 (5 + Sqrt[5])])] + 122 I Sqrt[50 - 10 Sqrt[5]] PolyLog[2, 8/(3 + Sqrt[5] - I Sqrt[2 (5 + Sqrt[5])])] + 290 I Sqrt[10 - 2 Sqrt[5]] PolyLog[2, 8/(3 + Sqrt[5] - I Sqrt[2 (5 + Sqrt[5])])] + 700 PolyLog[2, 1/8 (3 + Sqrt[5] - I Sqrt[2 (5 + Sqrt[5])])] + 260 Sqrt[5] PolyLog[2, 1/8 (3 + Sqrt[5] - I Sqrt[2 (5 + Sqrt[5])])] + 122 I Sqrt[50 - 10 Sqrt[5]] PolyLog[2, 1/8 (3 + Sqrt[5] - I Sqrt[2 (5 + Sqrt[5])])] + 290 I Sqrt[10 - 2 Sqrt[5]] PolyLog[2, 1/8 (3 + Sqrt[5] - I Sqrt[2 (5 + Sqrt[5])])] + 700 PolyLog[2, 1/8 (3 + Sqrt[5] + I Sqrt[2 (5 + Sqrt[5])])] + 260 Sqrt[5] PolyLog[2, 1/8 (3 + Sqrt[5] + I Sqrt[2 (5 + Sqrt[5])])] - 122 I Sqrt[50 - 10 Sqrt[5]] PolyLog[2, 1/8 (3 + Sqrt[5] + I Sqrt[2 (5 + Sqrt[5])])] - 290 I Sqrt[10 - 2 Sqrt[5]] PolyLog[2, 1/8 (3 + Sqrt[5] + I Sqrt[2 (5 + Sqrt[5])])] + 700 PolyLog[2, 1/2 (1 - I Sqrt[5 + 2 Sqrt[5]])] - 180 Sqrt[5] PolyLog[2, 1/2 (1 - I Sqrt[5 + 2 Sqrt[5]])] + 290 I Sqrt[2 (5 + Sqrt[5])] PolyLog[2, 1/2 (1 - I Sqrt[5 + 2 Sqrt[5]])] - 122 I Sqrt[10 (5 + Sqrt[5])] PolyLog[2, 1/2 (1 - I Sqrt[5 + 2 Sqrt[5]])] - 700 PolyLog[2, 1 - I Sqrt[5 + 2 Sqrt[5]]] + 180 Sqrt[5] PolyLog[2, 1 - I Sqrt[5 + 2 Sqrt[5]]] - 290 I Sqrt[2 (5 + Sqrt[5])] PolyLog[2, 1 - I Sqrt[5 + 2 Sqrt[5]]] + 122 I Sqrt[10 (5 + Sqrt[5])] PolyLog[2, 1 - I Sqrt[5 + 2 Sqrt[5]]] + 700 PolyLog[2, 2/(1 + I Sqrt[5 + 2 Sqrt[5]])] - 260 Sqrt[5] PolyLog[2, 2/(1 + I Sqrt[5 + 2 Sqrt[5]])] - 4 I Sqrt[54850 - 24410 Sqrt[5]] PolyLog[2, 2/(1 + I Sqrt[5 + 2 Sqrt[5]])] + 700 PolyLog[2, 1/2 (1 + I Sqrt[5 + 2 Sqrt[5]])] - 180 Sqrt[5] PolyLog[2, 1/2 (1 + I Sqrt[5 + 2 Sqrt[5]])] - 290 I Sqrt[2 (5 + Sqrt[5])] PolyLog[2, 1/2 (1 + I Sqrt[5 + 2 Sqrt[5]])] + 122 I Sqrt[10 (5 + Sqrt[5])] PolyLog[2, 1/2 (1 + I Sqrt[5 + 2 Sqrt[5]])] - 700 PolyLog[2, 1 + I Sqrt[5 + 2 Sqrt[5]]] + 180 Sqrt[5] PolyLog[2, 1 + I Sqrt[5 + 2 Sqrt[5]]] + 290 I Sqrt[2 (5 + Sqrt[5])] PolyLog[2, 1 + I Sqrt[5 + 2 Sqrt[5]]] - 122 I Sqrt[10 (5 + Sqrt[5])] PolyLog[2, 1 + I Sqrt[5 + 2 Sqrt[5]]] + 700 PolyLog[2, (2 I)/(I + Sqrt[5 + 2 Sqrt[5]])] - 260 Sqrt[5] PolyLog[2, (2 I)/(I + Sqrt[5 + 2 Sqrt[5]])] + 4 I Sqrt[54850 - 24410 Sqrt[5]] PolyLog[2, (2 I)/(I + Sqrt[5 + 2 Sqrt[5]])]))