A theater ticket for adults is a dollars and the price of a child's ticket is C dollars. If 29 adults and 45 children attend the theater one night, how much money did the theater make?
Cx45 is this the answer?
29a + 45c = ?
29 C + C a right?
Miguel is selling tickets to a barbecue. Adult tickets cost $6.00 and children's tickets cost $3.00. He sells six more children's tickets than adult tickets. The total amount of money he collects is $153.00. How many adult tickets and how many children's tickets did he sell?
To find out how much money the theater made, we need to calculate the total cost of the tickets for both adults and children.
The price of an adult ticket is given as "a" dollars and the price of a child's ticket is given as "C" dollars.
We know that 29 adults attended the theater, so the total cost of the adult tickets would be 29 times the price of an adult ticket (29a dollars).
Similarly, we are given that 45 children attended the theater, so the total cost of the children's tickets would be 45 times the price of a child's ticket (45C dollars).
To find the total amount of money the theater made, we need to add the cost of adult tickets and the cost of children's tickets:
Total revenue = 29a + 45C dollars
Since we don't have the specific values of "a" and "C," we cannot calculate the exact total revenue. Therefore, "29a + 45C" is the correct expression for the total revenue of the theater.