A cross-country skier leaves her home at noon. She skis for an hour with the wind at her back, and then decides to turn around and take the same route home. Now that she is headed into the wind, her speed is 3 miles per hour slower going home than it was in the first hour. She arrives home at 3:30. She wondered how far away she was when she decided to turn back. Which of these systems of equations can you use to solve this problem?

Question

Mathematics

Alissa

21 July, 13:30

A cross-country skier leaves her home at noon. She skis for an hour with the wind at her back, and then decides to turn around and take the same route home. Now that she is headed into the wind, her speed is 3 miles per hour slower going home than it was in the first hour. She arrives home at 3:30. She wondered how far away she was when she decided to turn back. Which of these systems of equations can you use to solve this problem?

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Answers (1)

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Ariana · Answer 1

Hello,

Let's assume d distance for going (the same for returning)

Going: time 1hour, speed: v

Return: time t hours, speed v-3 (miles/h)

d=v*1

d = (v-3) * t

1+t=3.5 = = >t=2.5 (hours)

==>1*v = (v-3) * 2.5

==>2.5v-7.5=v

==>1.5v=7.5

==>v=5 (miles/hour) (going)

v-3=2 (miles/hour) (return)

d=v*1=5 (miles)

I hope you have understood my poor English.