Question

How do you use partial fraction decomposition to decompose the fraction to integrate `(2x+1)/((x+1)^2(x^2+4)^2)`?

Answer 1

If the denominator of your rational expression has repeated unfactorable polynomials, then you use linear-factor numerators.

Explanation:

`(2x+1)/((x+1)^2(x^2+4)^2)` = `A/(x+1)`+`B/(x+1)^2`+`(Cx+D)/(x^2+4)`+`(Ex+F)/(x^2+4)^2`

Next, multiply both sides of the equation by `(x+1)^2(x^2+4)^2`

`2x+1` = `A(x+1)(x^2+4)^2`+`B(x^2+4)^2`+`(Cx+D)(x+1)^2(x^2+4)`+`(Ex+F)(x+1)^2`

Next, expand each expression on the right and match up to the values on left side of the equation. Solve for the unknown constants A - F.

You should get the following solutions:

`(13-8 x)/(25 (x^2+4)^2)+(11-6 x)/(125 (x^2+4))+6/(125 (x+1))-1/(25 (x+1)^2)`

Hope that helped