Lesson 16
Finding and Interpreting Inverse Functions
Let’s find the inverse of linear functions.
Problem 1
Tickets to a family concert cost \$10 for adults and \$3 for children. The concert organizers collected a total of \$900 from ticket sales.
 In this situation, what is the meaning of each variable in the equation \(10A + 3C = 900\)?
 If 42 adults were at the concert, how many children attended?
 If 140 children were at the concert , how many adults attended?
 Write an equation to represent \(C\) as a function of \(A\). Explain what this function tells us about the situation.
 Write an equation to represent \(A\) as a function of \(C\). Explain what this function tell us about the situation.
Problem 2
A school group has \$600 to spend on Tshirts. The group is buying from a store that gives them a \$5 discount off the regular price per shirt.
\(n=\dfrac{600}{p5}\) gives the number of shirts, \(n\), that can be purchased at a regular price, \(p\).
\(p=\dfrac{600}{n}+5\) gives the regular price, \(p\), of a shirt when \(n\) shirts are bought.
 What is \(n\) when \(p\) is 20?
 What is \(p\) when \(n\) is 40?
 Is one function an inverse of the other? Explain how you know.
Problem 3
Functions \(f\) and \(g\) are inverses, and \(f(\text2)=3\). Is the point \((3,\text2)\) on the graph of \(f\), on the graph of \(g\), or neither?
Problem 4
Here are two equations that relate two quantities, \(p\) and \(Q\):
\(Q=7p + 1,\!999\)
\(p=\dfrac{Q1,999}{7}\)
Select all statements that are true about \(p\) and \(Q\).
\(Q=7p + 1,\!999\) could represent a function, but \(p=\dfrac{Q1,999}{7}\) could not.
Each equation could represent a function.
\(p=\dfrac{Q1,999}{7}\) could represent a function, but \(Q=7p + 1,\!999\) could not.
The two equations represent two functions that are inverses of one another.
If \(Q=7p + 1,\!999\) represents a function, then the inverse function can be defined by \(p=7Q1,\!999\).
Problem 5
Elena plays the piano for 30 minutes each practice day. The total number of minutes \(p\) that Elena practiced last week is a function of \(n\), the number of practice days.
Find the domain and range for this function.
Problem 6
The graph shows the attendance at a sports game as a function of time in minutes.

Describe how attendance changed over time.
 Describe the domain.
 Describe the range.
Problem 7
Two children set up a lemonade stand in their front yard. They charge \$1 for every cup. They sell a total of 15 cups of lemonade. The amount of money the children earned, \(R\) dollars, is a function of the number of cups of lemonade they sold, \(n\).
 Is 20 part of the domain of this function? Explain your reasoning.
 What does the range of this function represent?
 Describe the set of values in the range of \(R\).
 Is the graph of this function discrete or continuous? Explain your reasoning.
Problem 8
Here is the graph of function \(f\), which represents Andre's distance from his bicycle as he walked in a park.
 Estimate \(f(5)\).
 Estimate \(f(17)\).
 For what values of \(t\) does \(f(t)=8\)?
 For what values of \(t\) does \(f(t)=6.5\)?
 For what values of \(t\) does \(f(t)=10\)?