Function Basics for Pre-Calculus

Pre-Calculus All-in-One For Dummies

A function is a special type of rule or relationship. The difference between a function and a relation is that a function has exactly one output value (from the range) for every input value (from the domain).

Functions are very useful when you’re describing trends in business, heights of objects shot from a cannon, times required to complete a task, and so on. Functions have some special properties and operations that allow for investigation into what happens when you change the rule.

In pre-calculus, you’ll work with functions and function operations in the following ways:

Writing and using function notation
Determining the domain and range of different types of functions
Recognizing even and odd functions
Checking on whether a function is one-to-one
Finding inverses of one-to-one functions
Performing the basic operations on functions and function rules
Working with the composition of functions and the difference quotient

Don’t let common mistakes trip you up; keep in mind that when working with functions, your challenges will include

Following the order of operations when evaluating functions
Determining which values need to be excluded from a function’s domain
Working with negative signs correctly when checking for even and odd functions
Being sure a function is one-to-one before trying to determine an inverse
Correctly applying function rules when performing function composition
Raising binomials to higher powers and including all the terms

Practice problems

Find the domain and range for the function.

Credit: Illustration by Thomson Digital

Answer: domain: –5 x; range:

or y
The domain is the set of x values, and the range is the set of y values for which the function is defined. In this case, x is defined for all real numbers greater than −5. You don’t include −5 because there’s an open dot on −5 in the graph. If

then the range is

If x > 1, then the range is all real numbers less than −1. So the range is

or y
Find the inverse of the function:

Answer:

Change f(x) to y:

Interchange x and y:

Now solve for y:

Rename y as f^–1(x):

About This Article

About the book author:

Mary Jane Sterling (Peoria, Illinois) is the author of Algebra I For Dummies, Algebra Workbook For Dummies, Algebra II For Dummies, Algebra II Workbook For Dummies, and many other For Dummies books. She taught at Bradley University in Peoria, Illinois for more than 30 years, teaching algebra, business calculus, geometry, and finite mathematics.