Question

The partial fraction decomposition of `(5x+1)/((x-1)(x+1)(x+2))` is given by `A/(x-1)+B/(x+1)+C/(x+2)` . What are the constants of A, B, and C?

Answer 1

`A=1`

`B=2`

`C=-3`

Explanation:

.

`(5x+1)/((x-1)(x+1)(x+2))=A/(x-1)+B/(x+1)+C/(x+2)`

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

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

`((A+B+C)x^2+(3A+B)x+(2A-2B-C))/((x-1)(x+1)(x+2))`

This means:

`(A+B+C)x^2+(3A+B)x+(2A-2B-C)=5x+1`

Comparing coefficients, we get:

`A+B+C=0` because there is no `x^2` term on the right side.

`3A+B=5`

`2A-2B-C=1`

We have three equations and three unknowns.

Let's multiply the first equation by `2`:

`2A+2B+2C=0`

Let's add it to the third equation:

`4A+C=1`

`C=1-4A`

From the second equation:

`B=5-3A`

Let's plug these into the first equation:

`A+5-3A+1-4A=0`

`-6A=-6`

`A=1`

`B=2`

`C=-3`

Answer 2

While the answer in https://socratic.org/s/aQEPEWkD is perfect and the method works in general, there is a shortcut that works rather well in examples like this one - in which all the factors of the denominator are monomials.

Explanation:

Starting with

`(5x+1)/((x-1)(x+1)(x+2)) = A/(x-1)+B/(x+1)+C/(x+2)`

multiply both sides by `(x-1)(x+1)(x+2)` we get

`5x+1 = A(x+1)(x+2)+B(x-1)(x+2)+C(x-1)(x+1)`

Since this is an identity, it should be valid for all values of `x`.

• substituting `x=1`, gives

`5times 1+1 = Atimes 2 times 3 implies color(red)(A = 1)`

• substituting `x=-1`, gives

`5times (-1)1+1 = Btimes (-2) times 1 implies color(red)(B = 2)`

• substituting `x=-2`, gives

`5times (-2)+1 = Ctimes (-3) times (-1) implies color(red)(C = -3)`