((-9*I)/5)*Sqrt[(2*Pi)/7]*x^(5/2)*\[Nu]*(\[Delta] - 2*\[Delta]*\[Nu] + x*((-39*\[Delta])/11 + (1267*\[Delta]*\[Nu])/132 - (131*\[Delta]*\[Nu]^2)/33) + Sqrt[x]*((5*s*\[Delta])/2 + (5*\[Sigma])/2 - (15*\[Nu]*\[Sigma])/2) + x^(3/2)*(((-32*I)/5)*\[Delta] + 3*Pi*\[Delta] - (1303*s*\[Delta])/66 - (361*\[Sigma])/22 - (815*\[Nu]^2*\[Sigma])/22 - (6*I)*\[Delta]*Log[2] + (6*I)*\[Delta]*Log[3] + \[Nu]*(((16301*I)/810)*\[Delta] - 6*Pi*\[Delta] + (1451*s*\[Delta])/66 + (710*\[Sigma])/11 + (12*I)*\[Delta]*Log[2] - (12*I)*\[Delta]*Log[3])) + x^2*((7206*\[Delta])/5005 - ((53*I)/4)*s*\[Delta] + (15*Pi*s*\[Delta])/2 - (15*s^2*\[Delta])/2 - (3*s^2*\[Kappa]m)/2 + 4*s^2*\[Delta]*\[Kappa]p - (2987*\[Delta]*\[Nu]^3)/572 - (16*I)*\[Sigma] + (15*Pi*\[Sigma])/2 - 15*s*\[Sigma] - (11*s*\[Delta]*\[Kappa]m*\[Sigma])/2 + (11*s*\[Kappa]p*\[Sigma])/2 - (15*\[Delta]*\[Sigma]^2)/2 - (11*\[Kappa]m*\[Sigma]^2)/4 + (11*\[Delta]*\[Kappa]p*\[Sigma]^2)/4 + \[Nu]^2*((104839*\[Delta])/3432 + 40*s*\[Sigma] + 20*s*\[Kappa]p*\[Sigma] + 10*\[Delta]*\[Sigma]^2 - 13*\[Kappa]m*\[Sigma]^2 + 5*\[Delta]*\[Kappa]p*\[Sigma]^2) - (15*I)*s*\[Delta]*Log[2] - (15*I)*\[Sigma]*Log[2] + (15*I)*s*\[Delta]*Log[3] + (15*I)*\[Sigma]*Log[3] + \[Nu]*((-82869*\[Delta])/5720 - 10*s^2*\[Delta] + 3*s^2*\[Kappa]m - 5*s^2*\[Delta]*\[Kappa]p + ((6007*I)/108)*\[Sigma] - (45*Pi*\[Sigma])/2 + 30*s*\[Sigma] + 8*s*\[Delta]*\[Kappa]m*\[Sigma] - 24*s*\[Kappa]p*\[Sigma] + 10*\[Delta]*\[Sigma]^2 + (27*\[Kappa]m*\[Sigma]^2)/2 - 8*\[Delta]*\[Kappa]p*\[Sigma]^2 + (45*I)*\[Sigma]*Log[2] - (45*I)*\[Sigma]*Log[3])))
