A movie theater charges $11 for each full-price ticket and $8.25 for each reduced-price ticket. For one movie showing, the theater sold a total of 214 full-price and reduced-price tickets for $2,145. Which of the following systems of equations could be used to determine the number of full-price tickets, $f$, and the number of reduced-price tickets, $r$, sold?<br/><br/>\begin{tabular}{l l} $f+r=2,145$ \\ $11f+8.25r=214$ \\ $f+r=214$ \\ $8.25f+11r=2,145$ \\ $f+r=2,145$ \\ $8.25f+11r=214$ \\ \end{tabular}
MM
Mashaal Masha
Apr 12, 2024
A movie theater charges $\$11$ for each full-price ticket and $\$8.25$ for each reduced-price ticket. For one movie showing, the theater sold a total of 214 full-price and reduced-price tickets for $\$2,145$. Which of the following systems of equations could be used to determine the number of full-price tickets, $f$, and the number of reduced-price tickets, $r$, sold?