How can I find the antiderivative of this complicated Bessel function?

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oh20elyf
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I am struggling to find the antiderivative of the following function:
[tex] f(x)=\frac{J_{0}(ax)J_{1}(bx) }{x+x^{4} }<br /> \\<br /> J_{0},{~}J_{1} : Bessel{~}functions{~}of{~}the{~}first{~}kind\\<br /> a, b: constants<br /> \\<br /> F(x)=\int_{}^{} \! f(x) \, dx =?[/tex]
Who can help?
 
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I think you should use some principles from complex analysis.
##J_0(0) = 0##, ##J_1(0) = 1##, So This function should be continuous around zero with a point discontinuity.
I would recommend using the residue formula for the roots of (1+ x^3) in the denominator.