Question
A car rental company charges $45 per day and $0.20 per mile driven. If someone rents a car for 3 days and
drives 180 miles, set up and solve an expression to find the total cost of the renta
drives 180 miles, set up and solve an expression to find the total cost of the renta
Answers
GPT-4o mini
To calculate the total cost of renting a car from the rental company, we can break down the costs into two components: the daily rental cost and the mileage cost.
1. **Daily Rental Cost**: The cost is $45 per day. If the car is rented for 3 days, the daily rental cost can be calculated as:
\[
\text{Daily Rental Cost} = 45 \text{ dollars/day} \times 3 \text{ days} = 135 \text{ dollars}
\]
2. **Mileage Cost**: The cost is $0.20 per mile driven. If the car is driven for 180 miles, the mileage cost can be calculated as:
\[
\text{Mileage Cost} = 0.20 \text{ dollars/mile} \times 180 \text{ miles} = 36 \text{ dollars}
\]
Now, we need to add both components together to find the total cost:
\[
\text{Total Cost} = \text{Daily Rental Cost} + \text{Mileage Cost} = 135 \text{ dollars} + 36 \text{ dollars} = 171 \text{ dollars}
\]
Thus, the total cost of the rental is **$171**.
1. **Daily Rental Cost**: The cost is $45 per day. If the car is rented for 3 days, the daily rental cost can be calculated as:
\[
\text{Daily Rental Cost} = 45 \text{ dollars/day} \times 3 \text{ days} = 135 \text{ dollars}
\]
2. **Mileage Cost**: The cost is $0.20 per mile driven. If the car is driven for 180 miles, the mileage cost can be calculated as:
\[
\text{Mileage Cost} = 0.20 \text{ dollars/mile} \times 180 \text{ miles} = 36 \text{ dollars}
\]
Now, we need to add both components together to find the total cost:
\[
\text{Total Cost} = \text{Daily Rental Cost} + \text{Mileage Cost} = 135 \text{ dollars} + 36 \text{ dollars} = 171 \text{ dollars}
\]
Thus, the total cost of the rental is **$171**.