A student sets up an experiment to investigate collisions between two trolleys on a long, horizontal track - Scottish Highers Physics - Question 2 - 2015

Impulse can be calculated as the area under the force-time graph. Given the graph, we need to find the area of the trapezium formed by the force over time.

Area = $\frac{1}{2} \times (b_1 + b_2) \times h$,

where:

• $b_1$ = initial force (0 N)
• $b_2$ = final force (maximum value from the graph)
• $h$ = time duration in seconds.

Calculating from the graph, we have:

• The interval of time is 200 ms (0.2 s).
• The height of the trapezium can be derived from the graph value, let's assume maximum force = 2 N.

Plugging in the numbers:

$\text{Impulse} = \frac{1}{2} \times (0 + 2) \times 0.2$ $= \frac{1}{2} \times 2 \times 0.2 = 0.20 ext{ N s}$

Calculating the result results in an impulse of 0.20 N s.

The change in momentum for trolley X can be calculated using the formula:

$\Delta p = m(v - u)$

Where:

• m = mass of trolley X (0.25 kg)
• v = final velocity of trolley X (-0.80 m s⁻¹)
• u = initial velocity of trolley X (1.2 m s⁻¹)

Substituting:

$\Delta p = 0.25 \times (-0.80 - 1.2)$ $= 0.25 \times (-2.0) = -0.5 ext{ kg m s}^{-1}$

Thus, the magnitude of the change in momentum is 0.5 kg m s⁻¹.

The velocity-time graph should show the following key points:

1. For the first segment from time 0s to 0.5s before the collision, trolley X's velocity gradually decreases from 1.2 m/s to 0 m/s. This should be a straight line moving downward.
2. At the time of collision (let's say 0.5s), there will be a sudden change in direction to -0.80 m/s.
3. From 0.5s to 1.25s, the velocity remains constant at -0.80 m/s, represented as a horizontal line across the graph.

Make sure that the graph is labeled with velocity on the y-axis and time on the x-axis, with clear indications of values, including the maximum and minimum points.