Question

How do you evaluate the integral of `int x/[(x^2)+1]dx`?

Answer 1

Note that the derivative of the denominator is almost the numerator. Use substitution.

Explanation:

`int x/[(x^2)+1]dx`

Let `u=x^2+1`, so that `du = 2xdx`.

The integral is

`int x/[(x^2)+1]dx = int 1/(x^2+1) xdx`

`= 1/2 int underbrace(1/(x^2+1))_(1/u) underbrace(2xdx)_(du)`

`= 1/2 int 1/u du`

`= 1/2 ln abs u +C`

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

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