A car moves along a horizontal straight road, passing two points A and B. At A the speed of the car is 15 m s⁻¹. When the driver passes A, he sees a warning sign W ahead of him, 120 m away. He immediately applies the brakes and the car decelerates with uniform deceleration, reaching W with speed 5 m s⁻¹. At W, the driver sees that the road is clear. He then immediately accelerates the car with uniform acceleration for 16 s to reach a speed of V m s⁻¹ (V > 15). He then maintains the car at a constant speed of V m s⁻¹. Moving at this constant speed, the car passes B after a further 22 s. (a) Sketch, in the space below, a speed-time graph to illustrate the motion of the car as it moves from A to B. (b) Find the time taken for the car to move from A to B. (c) The distance from A to B is 1 km. (d) Find the value of V.

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A car moves along a horizontal straight road, passing two points A and B - Edexcel - A-Level Maths Mechanics - Question 3 - 2008 - Paper 1

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A car moves along a horizontal straight road, passing two points A and B. At A the speed of the car is 15 m s⁻¹. When the driver passes A, he sees a warning sign W a... show full transcript

Worked Solution & Example Answer:A car moves along a horizontal straight road, passing two points A and B - Edexcel - A-Level Maths Mechanics - Question 3 - 2008 - Paper 1

Step 1

Sketch the speed-time graph

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Answer

To construct the speed-time graph, we start by plotting key points based on the problem statement.

At point A, the initial speed is 15 m/s.
From A to W, the car decelerates uniformly to 5 m/s. This portion of the graph will be a sloping line descending from 15 m/s down to 5 m/s.
At point W, the speed remains constant at 5 m/s for a duration of 16 seconds.
After 16 seconds, the car accelerates back to a speed of V m/s.
After reaching V, the car moves at this constant speed for 22 seconds until it reaches point B.

Ensure the graph accurately reflects these changes in speed over time.

Step 2

Find the time taken for the car to move from A to B

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Answer

To find the total time taken for the car to move from A to B, we need to calculate the time during each segment of the journey.

From A to W: Using the formula for uniform acceleration, we need to find the time taken to decelerate from 15 m/s to 5 m/s. Assuming uniform deceleration, we can use the average speed:
- Average speed = $rac{15 + 5}{2} = 10 ext{ m/s}$ .
- Distance from A to W = 120 m.
- Time $t = rac{ ext{Distance}}{ ext{Average Speed}} = rac{120}{10} = 12$ seconds.
From W to the final speed V: This segment lasts for 16 seconds (as specified in the problem).
From V to B: The car travels the remainder of the distance at speed V for 22 seconds.

Total time = Time from A to W + Time from W to V + Time from V to B = 12 + 16 + 22 = 50 seconds.

Step 3

The distance from A to B is 1 km

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We convert the distance from kilometers to meters for calculation:

Distance = 1 km = 1000 m.

Using the average speed during each segment:

From A to W: Time = 12 seconds, Average speed = 10 m/s, Distance = $10 imes 12 = 120 ext{ m}$ .
From W to V: Remaining distance after reaching W to B can be calculated. The distance covered during acceleration should equal the distance from W to the point where speed becomes V.

If we denote the total distance from W to B as $D$ , we calculate:

So we have 120 (A to W) + D = 1000.
D must cover the distance traveled at speed V for 22 seconds.
From the previous time calculations, $D = 22V$ .

Thus the equation becomes: $120 + 22V = 1000$ .

After rearranging: $22V = 1000 - 120 = 880$ . Solving for V gives $V = rac{880}{22} = 40 ext{ m/s}$ .

Step 4

Find the value of V

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Answer

Given the analysis above, we already determined that the speed V can be derived from the distance relationship we established from W to B.

Substituting and solving the previous equation directly leads to: $ext{Using: } 120 + 22V = 1000$ Solving gives:

ightarrow V = rac{880}{22} = 40 ext{ m/s} $$. Thus, the value of V is 28 m/s.

A car moves along a horizontal straight road, passing two points A and B - Edexcel - A-Level Maths Mechanics - Question 3 - 2008 - Paper 1

Worked Solution & Example Answer:A car moves along a horizontal straight road, passing two points A and B - Edexcel - A-Level Maths Mechanics - Question 3 - 2008 - Paper 1

Sketch the speed-time graph

Find the time taken for the car to move from A to B

The distance from A to B is 1 km

Find the value of V

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