College

We appreciate your visit to EASY POINTS Two runners are training for their next competitions Each runner is able to run a certain distance in proportion to the time The. This page offers clear insights and highlights the essential aspects of the topic. Our goal is to provide a helpful and engaging learning experience. Explore the content and find the answers you need!

EASY POINTS!


Two runners are training for their next competitions. Each runner is able to run a certain

distance in proportion to the time. The table on the left displays the distance Runner A

can run in relation to the time. Meanwhile, the graph on the right displays the distance

Runner B can run in relation to time.


What are the unit rates for the two runners? Which runner can run faster?

EASY POINTS Two runners are training for their next competitions Each runner is able to run a certain distance in proportion to the time The

Answer :

Answer:

12 / 1 and runner B

Step-by-step explanation:

at 13 seconds runner a had only run 156 ft, however runner b had run 200 ft.

Thanks for taking the time to read EASY POINTS Two runners are training for their next competitions Each runner is able to run a certain distance in proportion to the time The. We hope the insights shared have been valuable and enhanced your understanding of the topic. Don�t hesitate to browse our website for more informative and engaging content!

Rewritten by : Barada

Both Runner A and Runner B have the same unit rate of 2.56 m/s, as they cover 64 meters in 25 seconds. Therefore, neither runner is faster than the other, and both will be 115.2 meters away from the starting point at 45 seconds.

To determine the unit rates for the two runners and decide which runner can run faster, we need to calculate each runner's speed in meters per second (m/s). The speed or unit rate is given by the formula:

According to the information provided, both Runner A and Runner B reach a distance of 64 meters at the same time of 25 seconds. Therefore, their speeds can be calculated as follows
Since both runners have the same speed of 2.56 m/s, neither runner is faster than the other. To predict how far each runner will be from the starting point at time t = 45 s, we simply multiply their speed by the desired time: Therefore, both Runner A and Runner B will be 115.2 meters away from the starting point at 45 seconds.