(32*c^2*m*x^(7/2)*\[Nu]^2/5)*(1 + x*(-1247/336 - (35*\[Nu])/12) + x^(3/2)*(4*Pi - 4*s - (5*\[Delta]*\[Sigma])/4) + x^(5/2)*((-8191*Pi)/672 - (9*s)/2 - (13*\[Delta]*\[Sigma])/16 + \[Nu]*((-583*Pi)/24 + (272*s)/9 + (43*\[Delta]*\[Sigma])/4)) + x^2*(-44711/9072 + 8*s^2 + (65*\[Nu]^2)/18 + 8*s*\[Delta]*\[Sigma] + (33*\[Sigma]^2)/16 + \[Nu]*(9271/504 - 8*\[Sigma]^2)) + x^(7/2)*((-16285*Pi)/504 + (476645*s)/6804 + 32*Pi*s^2 - (16*s^3)/3 + (9535*\[Delta]*\[Sigma])/336 + 32*Pi*s*\[Delta]*\[Sigma] + (2*s^2*\[Delta]*\[Sigma])/3 + (65*Pi*\[Sigma]^2)/8 + (9*s*\[Sigma]^2)/2 + (35*\[Delta]*\[Sigma]^3)/24 + \[Nu]^2*((193385*Pi)/3024 - (2810*s)/27 - (1501*\[Delta]*\[Sigma])/36) + \[Nu]*((214745*Pi)/1728 + (6172*s)/189 + (1849*\[Delta]*\[Sigma])/126 - 32*Pi*\[Sigma]^2 - (56*s*\[Sigma]^2)/3 - 6*\[Delta]*\[Sigma]^3)) + x^3*(6643739519/69854400 - (1712*EulerGamma)/105 + (16*Pi^2)/3 - 16*Pi*s - (3839*s^2)/252 - (775*\[Nu]^3)/324 - (31*Pi*\[Delta]*\[Sigma])/6 - (1375*s*\[Delta]*\[Sigma])/56 - (227*\[Sigma]^2)/28 + \[Nu]*(-134543/7776 + (41*Pi^2)/48 - 43*s^2 - 43*s*\[Delta]*\[Sigma] + (3481*\[Sigma]^2)/168) + \[Nu]^2*(-94403/3024 + 43*\[Sigma]^2) - (3424*Log[2])/105 - (856*Log[x])/105))
