Question

How do you find the inverse of `f(x)=ln(2+ln(x))`?

Answer 1

`x = e^{e^y-2}`

Explanation:

Calling

`y = log_e(2+log_e(x))`

we have also

`e^y = 2+log_e(x)`

and `log_e(x e^2) = e^y` then

`xe^2=e^{e^y}` and finally

`x = e^{e^y-2}`

So with this procedure we obtained a function `g` such that

`x = g(y)`.

Now we can operate

`y = f(x)=f(g(y))=f@g(y)` such that

`f@g equiv 1`. Here `g` is called inverse function regarding `f`

Answer 2

Inverse function of `f(x)=y=ln(2+lnx)` is
`f(x)=e^(e^x-2)`

Explanation:

Let `f(x)=y=ln(2+lnx)`.

Hence, `2+lnx=e^y` or

`lnx=e^y-2` and

`x=e^(e^y-2)`

Hence inverse function of `f(x)=ln(2+lnx)` is
`f(x)=e^(e^x-2)`