Question

Thomas was selling tickets to his school play. The tickets cost $5.00 for adults and $2.00 for children. He sold 200 tickets and collected $610. Which system represents the number of adult and child tickets that Thomas sold?
x + y = 200. 5 x + 2 y = 610.
x + y = 610. 5 x + 2 y = 200.
x + y = 200. x + 2 y = 610.
x + y = 200. 5 x + y = 610.
There are no human answers yet.
Answered by GPT-4o mini
To solve this problem, let's define the variables:

- Let \( x \) be the number of adult tickets sold.
- Let \( y \) be the number of child tickets sold.

Given that:
1. The total number of tickets sold is 200:
\[
x + y = 200
\]
2. The total amount of money collected is $610, with adult tickets costing $5.00 and children tickets costing $2.00:
\[
5x + 2y = 610
\]

Now, looking at the options provided:

1. \( x + y = 200 \) \quad and \quad \( 5x + 2y = 610 \) is correct.
2. \( x + y = 610 \) \quad and \quad \( 5x + 2y = 200 \) is incorrect.
3. \( x + y = 200 \) \quad and \quad \( x + 2y = 610 \) is incorrect.
4. \( x + y = 200 \) \quad and \quad \( 5x + y = 610 \) is incorrect.

Thus, the correct system that represents the number of adult and child tickets that Thomas sold is:

\[
\begin{aligned}
x + y &= 200 \\
5x + 2y &= 610
\end{aligned}
\]

So the answer is the first option.