Question

How do you integrate `(x^3)((x^2 + 4)^(1/2)) dx`?

Answer 1

`=(1/15)(x^2+4)^(3/2)(3x^2+7)+C`

Explanation:

Use the substitution x^2+4=t^2#,

Then 2x dx =2t dt. So, `dx=(t/x)dt=t/sqrt((t^2-4)) dt`

Now, `int x^3sqrt(x^2+4) dx =int (t^2-4)^(3/2)t^2/sqrt(t^2-4)dt`

`=int(t^2-4)t^2dt=int(t^4-4t^2)dt`

`=t^5/5-t^3/3+ C`

`=t^3/15(3t^2-5)+C`

`=(1/15)(x^2+4)^(3/2)(3(x^2+4)-5)+C`

`=(1/15)(x^2+4)^(3/2)(3x^2+7)+C`