1.3.3 Inverse Functions

Inverse functions

• An inverse function is the opposite to the original function
• It is denoted by f^-1(x)
• An inverse only exists for one-to-one functions

Graphs of inverse functions

• The graphs of a function and its inverse are reflections in the line y = x

Domain and range of inverse functions

• The range of a function will be the domain of its inverse function
• The domain of a function will be the range of its inverse function

How do I work out an inverse function?

• Set y = f(x) and make x the subject
• Then rewrite in function notation
• Domain is needed to fully define a function
• The range of f is the domain of f^-1 (and vice versa)

... and finally …

• A function (f) followed by its inverse (f^-1) will return the input (x)
• ff^-1(x) = f^-1f(x) = x (for all values of x)