Question

How do you express `10 / [(x-1)(x^2 + 9)]` in partial fractions?

Answer 1

`10/((x-1)(x^2+9))=1/(x-1)-(x+1)/(x^2+9)`

Explanation:

Let `10/((x-1)(x^2+9))hArrA/(x-1)+(Bx+C)/(x^2+9)`.

Therefore `10/((x-1)(x^2+9))hArr(A(x^2+9)+(Bx+C)(x-1))/((x-1)(x^2+9))`

`hArr(Ax^2+9A+Bx^2-Bx+Cx-C)/((x-1)(x^2+9))` or

`10/((x-1)(x^2+9))hArr((A+B)x^2-(B-C)x+9A-C)/((x-1)(x^2+9))`

Hence `A+B=0`, `B-C=0` and `9A-C=10`

or `A=-B=-C` and so `9xx(-C)-C=10` i.e. `-10C=10` i.e.

`C=-1`, `A=1` and `B=-1`

Hence `10/((x-1)(x^2+9))=1/(x-1)-(x+1)/(x^2+9)`