Question

Given `5/(x^2+6x+8) = A/(x+2)+B/(x+4)`, what is `A+B` ?

Answer 1

`A+B=0`

Explanation:

Given:

`5/(x^2+6x+8) = A/(x+2)+B/(x+4)`

`color(white)(5/(x^2+6x+8)) = (A(x+4)+B(x+2))/((x+2)(x+4))`

`color(white)(5/(x^2+6x+8)) = (A(x+4)+B(x+2))/(x^2+6x+8)`

`color(white)(5/(x^2+6x+8)) = ((A+B)x+(4A+2B))/(x^2+6x+8)`

Equating coefficients:

`{ (A+B = 0), (4A+2B=5) :}`

So:

`A+B=0`

Answer 2

`A+B=0`

Explanation:

You are on the right track!

`A(x+4)+B(x+2)=5`

Now, let's set `x=-4` and solve for B:

`-2B=5`
`B=-5/2`

Now, let's set `x=-2` and solve for A:

`2A=5`
`A=5/2`

So, `A+B=0`