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Challenge 2 - Tortoise and Hare

Challenge 2 is all about working out the distance, speed and time of two runners.

Maths teacher Chris Smith and pupils from Grange Academy are here to explain.

The Maths Week Scotland Daily Challenges have been set by the Scottish Mathematical Council.

So here's the challenge:

Ellie and Priya are training at their local athletics club.

On the 400 metre track, Ellie starts running at the start/finish line.

Priya is exactly halfway round the track when she starts running at exactly the same time.

Ellie runs at 6 metres per second and Priya runs at 4.4 metres per second.

After how long does Ellie catch up with Priya?

Where on the track does this happen?

2 runners are at opposite corners of a running track. One has 4.4 metres per second next to them and the other has their speed of 6 metres per second written next to them, with the length of the track shown as 400m

Need a hint?

  • How far in front of Ellie is Priya at the start? How can you use that?
  • What can the difference in their speeds tell us?
  • It might be easier to work out the time first, then the distance.

Solution

Worked out the answer? Here's how you can do it.

The distance between the two runners on the track is highlighted as 200m

Step 1

Since Priya starts halfway round the 400 metre track, she is 200m ahead of Ellie when they start running.

We need to work out how long it takes Ellie to run this extra two hundred metres.

The distance between the two runners on the track is highlighted as 200m
The difference in their speeds is shown as the sum 6 - 4 = 1.6 metres per second

Step 2

Ellie runs at 6 metres per second and Priya at 4.4 metres per second.

6 - 4.4 = 1.6

So Ellie catches up by 1.6 metres every second.

The difference in their speeds is shown as the sum 6 - 4 = 1.6 metres per second
The pair of runners are together on the track with a stopwatch showing the time as 125 seconds.

Step 3

To find the time it takes her to catch up, we divide 200 metres by 1.6 metres.

200 梅 1.6 = 125

Ellie catches up with Priya after 125 seconds.

The pair of runners are together on the track with a stopwatch showing the time as 125 seconds.
A stopwatch shows the sum of 125 seconds multiplied by 6 metres per second

Step 4

To find out where on the track this happens, we have to multiply Ellie's time by her speed.

Ellie catches up with Priya after she has run for 125 seconds at 6 m/s.

125 X 6 = 750

Ellie catches up with Priya after running 750m.

A stopwatch shows the sum of 125 seconds multiplied by 6 metres per second
The runners are together on the track with 350m on screen and the track highlighted to show they are 50m from the finish line

Step 5

Since the distance of one lap is 400m, Ellie has run one full lap and then another 350 metres when she catches up with Priya.

So Ellie catches up with Priya 50 metres before the finish line after 125 seconds.

The runners are together on the track with 350m on screen and the track highlighted to show they are 50m from the finish line

Maths Week Scotland 2023. list

Try out all the daily challenges from Maths Week Scotland 2023.

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Maths Week Scotland 2022. list

Try out all the daily challenges from Maths Week Scotland 2022.

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Maths Week Scotland 2021. list

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Maths Week Scotland 2021