Final answer:
Using a system of linear equations, we determined that 76 general admission tickets and 108 student tickets were sold, based on the total number of tickets sold (184) and total money collected ($1624).
Step-by-step explanation:
To solve the problem regarding the number of general admission and student tickets sold, we can set up a system of linear equations. We’ll define our variables as follows for one version of the system:
- x = number of general admission tickets
- y = number of student tickets
We have two pieces of information that will help us set up our equations:
- The total number of tickets sold was 184.
- The total amount of money collected was $1624.
Using the given information, we can construct the following equations:
- x + y = 184 (The total number of tickets)
- $10x + $8y = $1624 (The total amount of money collected)
Let's solve the system by substitution. First, we can express x from the first equation:
x = 184 - y
Now, we substitute x in the second equation:
$10(184 - y) + $8y = $1624
Simplify and solve for y:
$1840 - $10y + $8y = $1624
$1840 - $2y = $1624
$2y = $1840 - $1624
$2y = $216
y = $216 / $2
y = 108
Now, we can find x:
x = 184 - y
x = 184 - 108
x = 76
Therefore, 76 general admission and 108 student tickets were sold.