Question

How do you find the inverse of `f(x)=(2x-3)/(x+1)`?

Answer 1

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

Explanation:

Write as: `y=(2x-3)/(x+1)`

Switch `x` and `y` and then solve for `y`.

`x=(2y-3)/(y+1)`

`x(y+1)=2y-3`

`xy+x=2y-3`

`xy-2y=-x-3`

`y(x-2)=-(x+3)`

`y=-(x+3)/(x-2)`

The `y` can be replaced by `f^-1(x)`, which simply denotes an inverse function:

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