(I/3)*Sqrt[(2*Pi)/35]*x^(3/2)*\[Nu]* (\[Delta] + x*((-8*\[Delta])/3 - (2*\[Delta]*\[Nu])/3) + x^2*((607*\[Delta])/198 + 6*s^2*\[Delta] - (247*\[Delta]*\[Nu]^2)/198 + 14*s*\[Sigma] + (11*\[Delta]*\[Sigma]^2)/2 + \[Nu]*((-136*\[Delta])/99 - 24*s*\[Sigma] - 6*\[Delta]*\[Sigma]^2)) + x^(3/2)*(((-7*I)/5)*\[Delta] + Pi*\[Delta] + (s*\[Delta])/2 + (5*\[Sigma])/2 - (15*\[Nu]*\[Sigma])/2 - (2*I)*\[Delta]*Log[2]) + x^(5/2)*(((56*I)/15)*\[Delta] - (8*Pi*\[Delta])/3 - (79*s*\[Delta])/18 - (149*\[Sigma])/18 - (841*\[Nu]^2*\[Sigma])/18 + ((16*I)/3)*\[Delta]*Log[2] + \[Nu]*((-1/15*I)*\[Delta] - (7*Pi*\[Delta])/6 + (443*s*\[Delta])/18 + (350*\[Sigma])/9 + ((7*I)/3)*\[Delta]*Log[2])) + x^3*((10753397*\[Delta])/1513512 - (26*EulerGamma*\[Delta])/21 - ((82*I)/105)*Pi*\[Delta] + (Pi^2*\[Delta])/6 + ((47*I)/20)*s*\[Delta] + (Pi*s*\[Delta])/2 - (101*s^2*\[Delta])/3 - (17525*\[Delta]*\[Nu]^3)/ 15444 - ((7*I)/2)*\[Sigma] + (5*Pi*\[Sigma])/2 - (200*s*\[Sigma])/3 - (83*\[Delta]*\[Sigma]^2)/3 + \[Nu]^2*((327059*\[Delta])/30888 + (176*s*\[Sigma])/3 + (44*\[Delta]*\[Sigma]^2)/3) - (424*\[Delta]*Log[2])/105 - (2*I)*Pi*\[Delta]*Log[2] - I*s*\[Delta]*Log[2] - (5*I)*\[Sigma]*Log[2] - 2*\[Delta]*Log[2]^2 + \[Nu]*((-1738843*\[Delta])/154440 + (41*Pi^2*\[Delta])/64 - (44*s^2*\[Delta])/3 + ((11*I)/20)*\[Sigma] - (15*Pi*\[Sigma])/2 + (476*s*\[Sigma])/3 + (263*\[Delta]*\[Sigma]^2)/6 + (15*I)*\[Sigma]*Log[2]) - (13*\[Delta]*Log[x])/21))
