Question

How do you solve for x: `12/(x+1) - 10/(x-3)=-3`?

Answer 1

`x = 5 or x= -11/3`

Explanation:

In an equation, we can get rid of the denominators by multiplying every term by the LCM of the denominators.

The LCM is this case is `color(red)((x+1)(x-3))`

`(12xxcolor(red)(cancel((x+1))(x-3)))/cancel((x+1)) -(10xx color(red)((x+1)cancel((x-3))))/cancel((x-3))= -3color(red)((x+1)(x-3))`

`12(x-3) - 10(x+1) = -3(x+1)(x-3))`

`12x-36 -10x-10 = -3(x^2-2x-3)`

`2x-46 = -3x^2+6x+9`

`3x^2-4x-55=0 " now factorise"`

`(3x+11)(x-5)=0`

If `3x+11= 0, rArr x= -11/3`

If `x-5 = rArr x = 5`