Question

How do you integrate `int x/sqrt(3x^2-6x+10) dx` using trigonometric substitution?

Answer 1

`int x/sqrt(3x^2-6x+10) dx=1/12sqrt(3x^2-6x+10)+6/sqrt7ln|(1/7(3x^2-6x+10))+sqrt(3/7)(x-1)|`

Explanation:

`int x/sqrt(3x^2-6x+10) dx`

= `1/6int(6x-6)/sqrt(3x^2-6x+10)dx+6/sqrt3int(dx)/sqrt(x^2-2x+10/3)`

For the first part let `u=3x^2-6x+10` ten `du=(6x-6)dx`

and integral becomes `1/6int(du)/(sqrtu)=1/6*1/2*u^(1/2)`

= `1/12sqrt(3x^2-6x+10)`

Second part can be written as

`2sqrt3int1/sqrt((x-1)^2+7/3)dx=`

Now let `sqrt(3/7)(x-1)=tant` then `sqrt(3/7)dx=sec^2tdt` and our integral becomes

`2sqrt3sqrt(3/7)intsec^2t/sectdt=6/sqrt7ln|sect+tant|`

= `6/sqrt7ln|sqrt(3/7(x-1)^2+1)+sqrt(3/7)(x-1)|`

= `6/sqrt7ln|(1/7(3x^2-6x+10))+sqrt(3/7)(x-1)|`

and hence `int x/sqrt(3x^2-6x+10) dx`

= `1/12sqrt(3x^2-6x+10)+6/sqrt7ln|(1/7(3x^2-6x+10))+sqrt(3/7)(x-1)|`