Question

How do you integrate `int (6x+5) / (x+2) ^4` using partial fractions?

Answer 1

`int(6x+5)/(x+2)^4 dx = int (6/(x+2)^3-7/(x+2)^4)dx = -2/(x+2)^2+7/(3(x+2)^3) + C`

Explanation:

`(6x+5)/(x+2)^4 = A/((x+2)) + B/(x+2)^2 +C/(x+2)^3 +D/(x+2)^4`

`A(x+2)^3 + B(x+2)^2 +C(x+2) + D = 6x+5`

`Ax^3 = 0x^3 rArr A=0`

`Bx^2 = 0x^2 rArr B=0`

`Cx = 6x rArr C=6`

`2C+D=5 and C=6 rArr D=-7`

Now evaluate `int(6(x+2)^-3 - 7(x+2)^-4) dx` to get

`-2/(x+2)^2+7/(3(x+2)^3) + C`