Question

For the function `g(x) = 32/(x+3)`, what is `(g^-1 cdot g)(5)`?

Answer 1

`(g^-1 * g)(5) = 68/5`

Explanation:

Let's start by finding an equation for the inverse.

`y = 32/(x+ 3)`

Switch the x and the y.

`x = 32/(y + 3)`

`x(y + 3) = 32`

`xy + 3x = 32`

`xy = 32 - 3x`

`y = (32 - 3x)/x`

Now let's complete the required operation.

`(g^-1 * g)(5) = (32 - 3x)/x * 32/(x + 3)`

`(g^-1 * g)(5) = (32 - 15)/5 * 32/(5 + 3)`

`(g^-1 * g)(5) = 17/5 * 4`

`(g^-1 * g)(5) = 68/5`

Hopefully this helps!

Answer 2

`(g^(-1)*g)(5) = 5`

Explanation:

It should be obvious that irrespective of the definition of the function `g` then the composition:

`(g^(-1)*g)(x) -= x`

That is, in words, if we apply any function to a variable `x`, then apply the inverse function the we end up with what we started with, i.e. `x`

If you are not convinced, then we can easily demonstrate this by determining an expression for the inverse function `g^(-1)(x)`:

`g(x)=32/(x+3) => g=32/(x+3)`
`:. x+3=32/g`
`:. x=32/g-3`

So for the function `g(x)=32/(x+3)`, the inverse function `g^(-1)(x)` is defined by:

`g^(-1)(x)=32/x-3`

Now let us find `g(5)`

`g(5)=32/(5+3) = 32/8`

Now let us find the composition `(g^(-1)*g)(5)`

`(g^(-1)*g)(5) = g^(-1)(g(5))`
`" " = g^(-1)(32/8)`
`" " = 32/(32/8)-3`
`" " = 8-3`
`" " = 5`