Robert and Elaine ran around the high school track during gym class. robert ran 1/2 of the way around the track in 5/6 minute. Later in the day, elaina ran 3/4 of the way around the track in 9/10 minute. When they meet after school, Robert claims that he can run father in a minute than elaina. Is he correct or incorrect? Explain your reasoning.

Unpack the problem:

Make a plan:

Solution:

Look back and explain:

Question

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Mathematics

4 August, 07:49

Robert and Elaine ran around the high school track during gym class. robert ran 1/2 of the way around the track in 5/6 minute. Later in the day, elaina ran 3/4 of the way around the track in 9/10 minute. When they meet after school, Robert claims that he can run father in a minute than elaina. Is he correct or incorrect? Explain your reasoning.

Unpack the problem:

Make a plan:

Solution:

Look back and explain:

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Answers (1)

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Mateo Clark · Answer 1

Answer

Incorrect

Explanation

Unpack the problem:

Let the distance round the track to be X.

Speed is the ratio of distance to time.

Robert run a distance of (1/2) x

Elaine run a distance of (3/4) x

Make a plan:

Finding the speed of each.

Compare their speeds to determine who ran faster than who.

Solution:

Robert's speed = (1/2) x / (5/6)

=1/2*6/5x

= (3/5) x

= 0.6x

Elaine's speed = (3/4) x / (9/10)

= (3/4) * (10/9) x

= (5/6) x

= 0.83333x

Elaine ran faster than Robert.

Look back and explain:

0.83333x > 0.6x

Elaine's speed is higher than Robert's speed.

This shows that Elaine ran faster than Robert.