Inverse of $$$y = e^{x}$$$

The calculator will try to find the inverse of the function $$$y = e^{x}$$$, with steps shown.

Find the inverse of the function $$$y = e^{x}$$$.

To find the inverse function, swap $$$x$$$ and $$$y$$$, and solve the resulting equation for $$$y$$$.

This means that the inverse is the reflection of the function over the line $$$y = x$$$.

If the initial function is not one-to-one, then there will be more than one inverse.

So, swap the variables: $$$y = e^{x}$$$ becomes $$$x = e^{y}$$$.

Now, solve the equation $$$x = e^{y}$$$ for $$$y$$$.

$$$y = \ln\left(x\right)$$$

$$$y = \ln\left(x\right)$$$A

Graph: see the graphing calculator.