Question
Rodrigo traveled at an average speed of 55 miles per hour for 5 hours to get from one national park to the next on his vacation. What is the distance between the national parks?
Use the formula d = rt, where d represents the distance, r represents the rate, and t represents the time.
11 miles
50 miles
60 miles
275 miles
Use the formula d = rt, where d represents the distance, r represents the rate, and t represents the time.
11 miles
50 miles
60 miles
275 miles
Answers
GPT-4o mini
To find the distance between the national parks, we can use the formula \( d = rt \), where:
- \( d \) is the distance,
- \( r \) is the rate (speed),
- \( t \) is the time.
In this case, Rodrigo's average speed \( r \) is 55 miles per hour, and the time \( t \) he traveled is 5 hours.
Now, we can calculate the distance:
\[
d = 55 \, \text{miles/hour} \times 5 \, \text{hours}
\]
\[
d = 275 \, \text{miles}
\]
Therefore, the distance between the national parks is **275 miles**.
- \( d \) is the distance,
- \( r \) is the rate (speed),
- \( t \) is the time.
In this case, Rodrigo's average speed \( r \) is 55 miles per hour, and the time \( t \) he traveled is 5 hours.
Now, we can calculate the distance:
\[
d = 55 \, \text{miles/hour} \times 5 \, \text{hours}
\]
\[
d = 275 \, \text{miles}
\]
Therefore, the distance between the national parks is **275 miles**.