Question

How do you integrate `int x^3/(x^2 -1)` using partial fractions?

Answer 1

`= x^2/2 + 1/2 ln (x^2 -1) +C`

Explanation:

I'm not sure you can do that

from some simple long division, turns out that `x^3/(x^2 -1) = x + x/(x^2 -1)`

so the integration is

`int \ x + x/(x^2 -1) \ dx` which is straightaway do-able

`int \ x + color{red}{x/(x^2 -1)} \ dx`
`= x^2/2 + 1/2 ln (x^2 -1) +C`

note the pattern in the red term of integrand, it is in form

`(\alpha f'(x))/(f(x))` and here `alpha = 1/2`, so you can "just do it"