Question

The function f is defined by fx=5/(1-3x) for x>1 Find an expression for f^-1 and state domain and range of f^-1?

Answer 1

See the explanation below

Explanation:

Let `y=5/(1-3x)`, `AA x>1`

Therefore,

`y(1-3x)=5`

`y-3xy=5`

`3xy=y-5`

`x=(y-5)/(3y)`

So,

`f^-1(x)=(x-5)/(3x)`

The domain of `f^-1(x)` is `RR-{0}`

and the range is `RR-{1/3}`

If `x>1`, then the domain is `(1,+oo)`

and

the range is

`((5/(1-3)), 0)`, `=>`, `(-2.5,0)`

See the curve

graph{5/(1-3x) [-10, 10, -5, 5]}