Yuto and Riko went for a bike ride on the same path. When Riko left their house, Yuto was 5.25 miles along the path. If Yuto's average speed was 0.25 miles per minute and Riko's average speed was 0.35 miles per minute, then Riko will be behind Yuto when 0 ≤ t < 52.5, where t is time in minutes. Explain what this solution means and why t cannot be less than zero.

Question

Mathematics

Hogan

25 September, 15:55

Yuto and Riko went for a bike ride on the same path. When Riko left their house, Yuto was 5.25 miles along the path. If Yuto's average speed was 0.25 miles per minute and Riko's average speed was 0.35 miles per minute, then Riko will be behind Yuto when 0 ≤ t < 52.5, where t is time in minutes. Explain what this solution means and why t cannot be less than zero.

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Answers (1)

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Rodney Sherman · Answer 1

To understand the meaning of that expression, I prefer to derive it myself.

Call R the position of Riko and Y the position of Yuto.

R = 0.35*t

Y = 5.25 + 0.25*t

Riko is behind Yuto while R < Y

=> 0.35t < 5.25 + 0.25t

=> 0.35t - 0.25t < 5.25

=> 0.10t < 5.25

=> t < 5.25 / 0.10

=> t < 52.5

Given that the time starts to count since both Riko left and Yuto was 5.25 miles away, the time is always zero or positive.

Then, 0 ≤ t < 52.5 is the range of time for which Riko has not reached Yuto, and is behind him.