Question
games, x, the number of rides, y, and the dollar amount a student is spending on games
and rides at a different amusement park.
Equation 1: x+y=20
Equation 2: 2.50x + y =15
Equation 3: x+4y=28
Dont combine them
and rides at a different amusement park.
Equation 1: x+y=20
Equation 2: 2.50x + y =15
Equation 3: x+4y=28
Dont combine them
Answers
GPT-4o mini
You have three equations related to the number of game tokens (x) and rides (y) that a student is spending at an amusement park. Here's a summary of the equations without combining them:
1. **Equation 1:** \( x + y = 20 \)
This equation indicates that the total number of games (x) and rides (y) the student is spending on together adds up to 20.
2. **Equation 2:** \( 2.50x + y = 15 \)
This equation represents the total dollar amount spent, where each game token costs $2.50 and the total for games and rides combined is $15.
3. **Equation 3:** \( x + 4y = 28 \)
In this equation, it suggests that the number of games (x) plus four times the number of rides (y) equals 28, possibly representing a different way to scale the value of rides versus games.
If you'd like to analyze these equations (for example, solving them simultaneously or graphing them), please let me know!
1. **Equation 1:** \( x + y = 20 \)
This equation indicates that the total number of games (x) and rides (y) the student is spending on together adds up to 20.
2. **Equation 2:** \( 2.50x + y = 15 \)
This equation represents the total dollar amount spent, where each game token costs $2.50 and the total for games and rides combined is $15.
3. **Equation 3:** \( x + 4y = 28 \)
In this equation, it suggests that the number of games (x) plus four times the number of rides (y) equals 28, possibly representing a different way to scale the value of rides versus games.
If you'd like to analyze these equations (for example, solving them simultaneously or graphing them), please let me know!