((8*I)/3)*Sqrt[Pi/5]*x^(3/2)*\[Nu]* (\[Delta] + x*((-17*\[Delta])/28 + (5*\[Delta]*\[Nu])/7) + (3*Sqrt[x]*\[Sigma])/2 + x^(3/2)*((-1/2*I)*\[Delta] + Pi*\[Delta] - (43*s*\[Delta])/7 - (79*\[Sigma])/14 + (139*\[Nu]*\[Sigma])/14 - (2*I)*\[Delta]*Log[2]) + x^2*((-43*\[Delta])/126 + 6*s^2*\[Delta] + (79*\[Delta]*\[Nu]^2)/168 - ((3*I)/4)*\[Sigma] + (3*Pi*\[Sigma])/2 + 4*s*\[Sigma] + \[Delta]*\[Sigma]^2 + \[Nu]*((-509*\[Delta])/126 - 24*s*\[Sigma] - 6*\[Delta]*\[Sigma]^2) - (3*I)*\[Sigma]*Log[2]) + x^(5/2)*(((17*I)/56)*\[Delta] - (17*Pi*\[Delta])/28 - (331*s*\[Delta])/252 + (293*\[Sigma])/252 + 3*s^2*\[Sigma] - (1723*\[Nu]^2*\[Sigma])/126 + 3*s*\[Delta]*\[Sigma]^2 + (3*\[Sigma]^3)/4 + ((17*I)/14)*\[Delta]*Log[2] + \[Nu]*(((-353*I)/28)*\[Delta] + (3*Pi*\[Delta])/14 + (386*s*\[Delta])/63 - (2615*\[Sigma])/504 - 3*\[Sigma]^3 - ((3*I)/7)*\[Delta]*Log[2])) + x^3*((15223771*\[Delta])/1455300 - (214*EulerGamma*\[Delta])/105 + ((109*I)/210)*Pi*\[Delta] + (Pi^2*\[Delta])/6 + ((181*I)/70)*s*\[Delta] - (43*Pi*s*\[Delta])/7 + (211*s^2*\[Delta])/56 + (2263*\[Delta]*\[Nu]^3)/8316 + ((79*I)/28)*\[Sigma] - (79*Pi*\[Sigma])/14 - (173*s*\[Sigma])/28 - (201*\[Delta]*\[Sigma]^2)/ 56 + \[Nu]^2*((-4211*\[Delta])/8316 + (24*s*\[Sigma])/7 + (6*\[Delta]*\[Sigma]^2)/7) - (319*\[Delta]*Log[2])/105 - (2*I)*Pi*\[Delta]*Log[2] + ((86*I)/7)*s*\[Delta]*Log[2] + ((79*I)/7)*\[Sigma]*Log[2] - 2*\[Delta]*Log[2]^2 + \[Nu]*((-102119*\[Delta])/2376 + (205*Pi^2*\[Delta])/128 - (6*s^2*\[Delta])/7 - ((5853*I)/280)*\[Sigma] + (257*Pi*\[Sigma])/28 + (317*s*\[Sigma])/12 + (46*\[Delta]*\[Sigma]^2)/3 - ((257*I)/14)*\[Sigma]*Log[2]) - (107*\[Delta]*Log[x])/105))
