317,605 views
14 votes
14 votes
1277 concert tickets were sold for a total of $16,267. If students paid $11 and nonstudents paid $17, how manystudent tickets were sold?

User Joshua Swink
by
2.7k points

1 Answer

23 votes
23 votes

Hello there. To solve this question, we'll have to remember some properties about system of equations.

Given that 1277 concert tickets were sold, for a total of $16,267, knowing that students paid $11 and non-students paid $17, we have to determine how many students tickets were sold.

Let's start labeling the variables we have. Say x is the number of tickets sold for students, while y is the number of tickets sold for non-students.

The total number of tickets sold can be found by adding how many students and non-students tickets were sold, i.e.


x+y=1277

To find the total amount collected, we have to multiply the number of each ticket sold by its respective fee, adding everything as follows:


11\cdot x+17\cdot y=16267

With this, we have the following system of equations:


\begin{cases}x+y=1277 \\ 11x+17y=16267\end{cases}

We can solve it using the elimination method. It consists in multiplying any of the equations by a factor (usually the easier equation) that when added to the other equation, one of the variables are cancelled out.

In this case, multiply the first equation by a factor of (-11)


\begin{cases}-11x-11y=-14047 \\ 11x+17y=16267\end{cases}

Add the two equations


\begin{gathered} -11x-11y+11x+17y=-14047+16267 \\ 6y=2220 \end{gathered}

Divide both sides by a factor of 6


y=370

Now we plug it back into the first equation in order to solve for x (i. e the number of tickets sold for students)


\begin{gathered} x+y=1277 \\ x+370=1277 \\ x=1277-370 \\ x=907 \end{gathered}

This is how many tickets were sold to students.

User Lester Peabody
by
2.7k points
Welcome to QAmmunity.org, where you can ask questions and receive answers from other members of our community.