\[Psi]0 - 1/(32*x^(5/2)*\[Nu])*(1 + x*(3715/1008 + (55*\[Nu])/12) + x^(3/2)*(-10*Pi + (235*s)/6 + (125*\[Delta]*\[Sigma])/8) + x^2*(15293365/1016064 - 100*s^2 + (3085*\[Nu]^2)/144 - 100*s*\[Delta]*\[Sigma] - (405*\[Sigma]^2)/16 + \[Nu]*(27145/1008 + 100*\[Sigma]^2)) + x^(7/2)*((-9018232555*s)/6096384 + (125925*s^3)/224 - (170978035*\[Delta]*\[Sigma])/387072 + (379805*s^2*\[Delta]*\[Sigma])/ 448 + (182755*s*\[Sigma]^2)/448 + (1315*\[Delta]*\[Sigma]^3)/21 + Pi*(77096675/2032128 - 200*s^2 - 200*s*\[Delta]*\[Sigma] - (815*\[Sigma]^2)/16) + \[Nu]^2*((-74045*Pi)/6048 + (835*s)/288 + (7015*\[Delta]*\[Sigma])/1152 + (285*s*\[Sigma]^2)/8 + (95*\[Delta]*\[Sigma]^3)/16) + \[Nu]*((3329545*s)/3024 - (95*s^3)/8 + (2909765*\[Delta]*\[Sigma])/5376 - (285*s^2*\[Delta]*\[Sigma])/16 - (385825*s*\[Sigma]^2)/224 - (130615*\[Delta]*\[Sigma]^3)/448 + Pi*(378515/12096 + 200*\[Sigma]^2))) + x^3*(12348611926451/18776862720 - (1712*EulerGamma)/21 - (160*Pi^2)/3 + (7915*s^2)/63 - (127825*\[Nu]^3)/5184 + (2645*s*\[Delta]*\[Sigma])/56 - (1645*\[Sigma]^2)/128 + Pi*((940*s)/3 + (745*\[Delta]*\[Sigma])/6) + \[Nu]^2*(76055/6912 - 120*\[Sigma]^2) + \[Nu]*(-15737765635/12192768 + (2255*Pi^2)/48 + 120*s^2 + 120*s*\[Delta]*\[Sigma] + (5875*\[Sigma]^2)/112) - (3424*Log[2])/21 - (856*Log[x])/21) + x^(5/2)*((38645*Pi)/1344 - (555605*s)/2016 - (15*s^3)/4 - (41745*\[Delta]*\[Sigma])/448 - (45*s^2*\[Delta]*\[Sigma])/ 8 - (45*s*\[Sigma]^2)/8 - (15*\[Delta]*\[Sigma]^3)/8 + \[Nu]*((-65*Pi)/16 - (45*s)/8 + (5*\[Delta]*\[Sigma])/2 + (45*s*\[Sigma]^2)/4 + (15*\[Delta]*\[Sigma]^3)/8))*Log[x])