Question
Edwin and Percy each bought a number of video games. Edwin's purchases can be modeled with the equation C = 25.25g, where g represents the number of games bought, and C represents the cost in dollars. Percy's purchases are shown in the table below.
Percy
Number of Games Total Cost ($)
2 53.00
3 79.50
4 106.00
Select the options that correctly complete the sentence.
found a better deal because his games cost
Percy
Number of Games Total Cost ($)
2 53.00
3 79.50
4 106.00
Select the options that correctly complete the sentence.
found a better deal because his games cost
Answers
GPT-4o mini
To determine who found the better deal, we need to find the cost per game for both Edwin and Percy.
**Edwin's Cost per Game:**
Given the equation \( C = 25.25g \):
- Cost per game for Edwin = 25.25 dollars per game.
**Percy's Cost per Game:**
Now, let's calculate the cost per game for Percy using the provided table:
1. For 2 games at $53.00:
\[
\text{Cost per game} = \frac{53.00}{2} = 26.50 \text{ dollars per game}
\]
2. For 3 games at $79.50:
\[
\text{Cost per game} = \frac{79.50}{3} = 26.50 \text{ dollars per game}
\]
3. For 4 games at $106.00:
\[
\text{Cost per game} = \frac{106.00}{4} = 26.50 \text{ dollars per game}
\]
**Comparison:**
- Edwin: 25.25 dollars per game
- Percy: 26.50 dollars per game
Since 25.25 dollars per game (Edwin's cost) is less than 26.50 dollars per game (Percy's cost), we can conclude:
**Edwin found a better deal because his games cost less per game.**
**Edwin's Cost per Game:**
Given the equation \( C = 25.25g \):
- Cost per game for Edwin = 25.25 dollars per game.
**Percy's Cost per Game:**
Now, let's calculate the cost per game for Percy using the provided table:
1. For 2 games at $53.00:
\[
\text{Cost per game} = \frac{53.00}{2} = 26.50 \text{ dollars per game}
\]
2. For 3 games at $79.50:
\[
\text{Cost per game} = \frac{79.50}{3} = 26.50 \text{ dollars per game}
\]
3. For 4 games at $106.00:
\[
\text{Cost per game} = \frac{106.00}{4} = 26.50 \text{ dollars per game}
\]
**Comparison:**
- Edwin: 25.25 dollars per game
- Percy: 26.50 dollars per game
Since 25.25 dollars per game (Edwin's cost) is less than 26.50 dollars per game (Percy's cost), we can conclude:
**Edwin found a better deal because his games cost less per game.**