Question

How do you solve `y/(y-3) +6/(y+3)= 1`?

Answer 1

The solution is `y=1`.

Explanation:

First of all, turn the left member to a single fraction:

`y/(y-3) + 6/(y+3) = (y(y+3) + 6(y-3))/((y+3)(y-3))`

Simplify the numerator, and use the `(a+b)(a-b)=a^2-b^2` formula for the denominator:

• Numerator:

`y(y+3) + 6(y-3) = y^2+3y+6y-18 = y^2 + 9y - 18`

• Denominator:

`(y+3)(y-3)=y^2-9`

So, the left member (and the whole equation) become

`(y^2 + 9y - 18)/(y^2-9)=1`

Multiply both members for the denominator:

`cancel(y^2) + 9y - 18 = cancel(y^2)-9`

Isolate `y` terms and constants on the two sides:

`9y=9`

Solve for `y`: `y=9/9=1`.