A parking garage wants to collect $3,207 in parking fees. If the garage charges $3 for each car, how many cars will it take for the garage to meet the goal?
Understand the Problem
The question is asking for the number of cars needed to collect a total of $3,207 in parking fees at a rate of $3 per car. To solve it, we will divide the total amount of money needed by the price charged per car.
Answer
1,069
Answer for screen readers
The number of cars needed to collect a total of $3,207 in parking fees at a rate of $3 per car is 1,069.
Steps to Solve
- Identify the total amount and fee per car
We know the total amount of parking fees needed is $3,207, and the fee charged per car is $3.
- Set up the equation
To find the number of cars needed, we will divide the total amount by the fee charged per car. The formula to use is:
$$ \text{Number of cars} = \frac{\text{Total amount}}{\text{Fee per car}} $$
- Substitute the values into the equation
Substituting the known values into the equation gives:
$$ \text{Number of cars} = \frac{3207}{3} $$
- Perform the calculation
Now we calculate the division:
$$ \text{Number of cars} = 1069 $$
The number of cars needed to collect a total of $3,207 in parking fees at a rate of $3 per car is 1,069.
More Information
It takes 1,069 cars each paying $3 to reach a total of $3,207. This can also be interpreted as needing a steady flow of cars to consistently generate the required fees.
Tips
- Rounding errors: Make sure to divide the total amount exactly, rather than rounding too early in the calculation.
- Confusing the terms: Ensure understanding that "per car" means how much each individual car contributes.
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