A car moves from rest - Edexcel - GCSE Maths - Question 15 - 2019 - Paper 2

The gradient of the graph at t = 15 seconds represents the acceleration of the car at that point in time. Since the gradient is 0, it indicates that the car is moving at a constant speed at that moment, meaning there is no acceleration.

To estimate the distance traveled in the first 20 seconds, we can use the trapezoidal rule or approximate the area under the speed-time graph by dividing it into segments.

We will split the first 20 seconds into 4 equal strips, each of width 5 seconds.

The speed at the following times (estimate from the graph):

• At t = 0 seconds: 0 m/s
• At t = 5 seconds: approximately 10 m/s
• At t = 10 seconds: approximately 20 m/s
• At t = 15 seconds: approximately 20 m/s
• At t = 20 seconds: approximately 15 m/s

Now we can calculate the areas of the trapezoids formed:

1. Area from 0 to 5 seconds: ( \frac{1}{2} \times (0 + 10) \times 5 = 25 ) m
2. Area from 5 to 10 seconds: ( \frac{1}{2} \times (10 + 20) \times 5 = 75 ) m
3. Area from 10 to 15 seconds: ( \frac{1}{2} \times (20 + 20) \times 5 = 100 ) m
4. Area from 15 to 20 seconds: ( \frac{1}{2} \times (20 + 15) \times 5 = 87.5 ) m

Adding these areas together:

Total distance = 25 + 75 + 100 + 87.5 = 287.5 m.

Therefore, the estimated distance the car travels in the first 20 seconds is approximately 287.5 m.