Can anyone think of a single integration problem that requires a combination of partial fraction decomposition, substitution, and integration by parts to be able to solve it?

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Can anyone think of a single integration problem that requires a combination of partial fraction decomposition, substitution, and integration by parts to be able to solve it?

Mathematics
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think of one? no, but im sure they are lurking out there someplace :)
lets try this one: integral(sec^3(x) + sin^2(x))dx you have substitution: u=2x; & sec^3 - int by parts... add some fraction & you'll have what you need

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