(-3*I)*Sqrt[(6*Pi)/7]*x^(3/2)*\[Nu]* (\[Delta] + x*(-4*\[Delta] + 2*\[Delta]*\[Nu]) + x^2*((123*\[Delta])/110 + 6*s^2*\[Delta] + (887*\[Delta]*\[Nu]^2)/330 + 6*s*\[Sigma] + (3*\[Delta]*\[Sigma]^2)/2 + \[Nu]*((-1838*\[Delta])/165 - 24*s*\[Sigma] - 6*\[Delta]*\[Sigma]^2)) + x^(3/2)*(((-21*I)/5)*\[Delta] + 3*Pi*\[Delta] - (7*s*\[Delta])/2 - (3*\[Sigma])/2 + (9*\[Nu]*\[Sigma])/2 - (6*I)*\[Delta]*Log[2] + (6*I)*\[Delta]*Log[3]) + x^(5/2)*(((84*I)/5)*\[Delta] - 12*Pi*\[Delta] + (139*s*\[Delta])/30 + (43*\[Sigma])/10 - (5*\[Nu]^2*\[Sigma])/2 + (24*I)*\[Delta]*Log[2] - (24*I)*\[Delta]*Log[3] + \[Nu]*(((-48103*I)/1215)*\[Delta] + (9*Pi*\[Delta])/2 - (83*s*\[Delta])/30 - 12*\[Sigma] - (9*I)*\[Delta]*Log[2] + (9*I)*\[Delta]*Log[3])) + x^3*((19388147*\[Delta])/280280 - (78*EulerGamma*\[Delta])/7 - ((246*I)/35)*Pi*\[Delta] + (3*Pi^2*\[Delta])/2 + ((213*I)/20)*s*\[Delta] - (21*Pi*s*\[Delta])/2 - 19*s^2*\[Delta] + (8237*\[Delta]*\[Nu]^3)/2860 + ((63*I)/10)*\[Sigma] - (9*Pi*\[Sigma])/2 - 24*s*\[Sigma] - 7*\[Delta]*\[Sigma]^2 + \[Nu]^2*((-318841*\[Delta])/17160 - 48*s*\[Sigma] - 12*\[Delta]*\[Sigma]^2) - (1272*\[Delta]*Log[2])/35 - (18*I)*Pi*\[Delta]*Log[2] + (21*I)*s*\[Delta]*Log[2] + (9*I)*\[Sigma]*Log[2] - 18*\[Delta]*Log[2]^2 + (492*\[Delta]*Log[3])/35 + (18*I)*Pi*\[Delta]*Log[3] - (21*I)*s*\[Delta]*Log[3] - (9*I)*\[Sigma]*Log[3] + 36*\[Delta]*Log[2]*Log[3] - 18*\[Delta]*Log[3]^2 + \[Nu]*((-7055*\[Delta])/3432 + (41*Pi^2*\[Delta])/64 + 12*s^2*\[Delta] - ((8797*I)/540)*\[Sigma] + (27*Pi*\[Sigma])/2 + 116*s*\[Sigma] + (69*\[Delta]*\[Sigma]^2)/2 - (27*I)*\[Sigma]*Log[2] + (27*I)*\[Sigma]*Log[3]) - (39*\[Delta]*Log[x])/7))
