Question

How do you integrate `int (sqrtx-1)^2/sqrtx` using substitution?

Answer 1

The answer is `=(2(sqrtx-1)^3)/3+C`

Explanation:

Use the substitution

`sqrtx=u` , `=>`, `x=u^2`

`dx=2udu=2sqrtxdu`

`int((sqrtx-1)^2dx)/sqrtx`

`=int(u-1)^2*(2cancelsqrtxdu)/cancelsqrtx`

`=2int(u-1)^2du`

`=(2(u-1)^3)/3`

`=(2(sqrtx-1)^3)/3+C`