Question

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

Answer 1

`int frac{1}{x(x+1)^2} dx = ln|x| - ln|x+1| + 1/(x+1) + "Constant"`

Explanation:

As stated by the question, we must first express `frac{1}{x(x+1)^2}` in partial fractions, before we perform the integration.

`frac{1}{x(x+1)^2} -= A/x + B/(x+1) + C/(x+1)^2`,

where `A`, `B` and `C` are constants to be determined, such that the equality holds true for all possible values of `x`.

Which means,

`1 -= A(x+1)^2 + Bx(x+1) + Cx`.

Simplifying gives

`(A+B)*x^2 + (2A + B + C)*x + A -= 1`

We compare the coefficients (to zero) to get 3 simultaneous linear equations,

`A+B=0`
`2A+B+C=0`
`A=1`

The system of equations is solved easily to yield

`A=1`
`B=-1`
`C=-1`

Therefore,

`frac{1}{x(x+1)^2} -= 1/x - 1/(x+1) - 1/(x+1)^2`.

Now, to integrate.

`int frac{1}{x(x+1)^2} dx = int (1/x - 1/(x+1) - 1/(x+1)^2) dx`

`= ln|x| - ln|x+1| + 1/(x+1) + "Constant"`