Question
Jeff used the fact that a highway bus can travel 275 miles in 5 hours to find the unit rate. If the bus is currently traveling 59 miles per hour, is the bus going faster, slower, or equal to the unit rate?(1 point)
Responses
Slower
Slower
Faster
Faster
Cannot be determined by the information provided.
Cannot be determined by the information provided.
Equal to
Responses
Slower
Slower
Faster
Faster
Cannot be determined by the information provided.
Cannot be determined by the information provided.
Equal to
Answers
GPT-4o mini
To find the unit rate of the bus, we can calculate its speed based on the given distance and time. The bus travels 275 miles in 5 hours, so the unit rate (speed) is:
\[
\text{Unit Rate} = \frac{\text{Distance}}{\text{Time}} = \frac{275 \text{ miles}}{5 \text{ hours}} = 55 \text{ miles per hour}
\]
Now, we compare this unit rate of 55 miles per hour to the bus's current speed of 59 miles per hour.
Since 59 miles per hour is greater than 55 miles per hour, the bus is traveling **faster** than the unit rate.
The correct response is:
**Faster**
\[
\text{Unit Rate} = \frac{\text{Distance}}{\text{Time}} = \frac{275 \text{ miles}}{5 \text{ hours}} = 55 \text{ miles per hour}
\]
Now, we compare this unit rate of 55 miles per hour to the bus's current speed of 59 miles per hour.
Since 59 miles per hour is greater than 55 miles per hour, the bus is traveling **faster** than the unit rate.
The correct response is:
**Faster**