Question

How do you express `2/(x^3-x^2)` in partial fractions?

Answer 1

`2/(x^3-x^2) = 2/(x-1)-2/x-2/x^2`

Explanation:

The denominator splits into factors as: `x^3-x^2 = x^2(x-1)`

So we solve for a partial fraction decomposition of the form:

`2/(x^3-x^2)`

`= A/(x-1)+B/x+C/x^2`

`=(Ax^2+Bx(x-1)+C(x-1))/(x^3-x^2)`

`=((A+B)x^2+(C-B)x-C)/(x^3-x^2)`

Equating coefficients, we get:

`{ (A+B = 0), (C-B = 0), (-C=2) :}`

Hence we find:

`{ (C = -2), (B = -2), (A = 2) :}`

So:

`2/(x^3-x^2) = 2/(x-1)-2/x-2/x^2`