If we truly have a one to one function then only one value for x matches one value for y, so then y has only one value for x.
We can denote an inverse of a function with
inverse function notation
Hold on how do we find the inverse of a set, it's easy all you have to do is switch all the values of x for y and all the values of y for x. Sound familiar? it comes right of the definition.
Now that we understand the inverse of a set we can understand how to find the inverse of a function.
Step 1: Interchange f(x) with yInterchange
Step 2: Interchange x and yInterchange
Step 3: solve for y (explicit form) and covert to inverse function notationexplicit form
Step 4: Confirm that the function is one to one with the followingcheck
What about functions with domain restrictions? Good question, remember if the graph is always increasing or decreasing then it's a one to one function and the domain restrictions can make that happen.
Example
Inverse of a domain restricted function
i hope it helps...
