A trolley of mass 1,5 kg is held stationary at point A at the top of a frictionless track - NSC Physical Sciences - Question 4 - 2018 - Paper 1

In an isolated system, the total linear momentum is conserved.

Using the conservation of linear momentum, we have: $m_{1}v_{1i} + m_{2}v_{2i} = (m_{1} + m_{2})v_{f}$

Where:

• $m_{1} = 1.5 ext{ kg}$ (mass of trolley 1)
• $v_{1i} = 6.26 ext{ m/s}$ (initial speed of trolley 1)
• $m_{2} = 2 ext{ kg}$ (mass of trolley 2)
• $v_{2i} = 0 ext{ m/s}$ (initial speed of trolley 2)

Substituting in: $(1.5)(6.26) + (2)(0) = (1.5 + 2)v_{f}$ $(9.39) = (3.5)v_{f}$

Solving for $v_{f}$: $v_{f} = \frac{9.39}{3.5} = 2.68 ext{ m/s}$ Thus, the speed of the combined trolleys immediately after the collision is 2.68 m/s.

To calculate the distance travelled by the combined trolleys in 3 seconds, we can use the formula: $\Delta x = v_{avg} \cdot t$

Where:

• $v_{avg}$ is the average speed. Since the trolleys move with a constant speed after the collision: $v_{avg} = \frac{(2.68 + 2.68)}{2} = 2.68 ext{ m/s}$
• $t = 3 ext{ s}$

Substituting in: $\Delta x = (2.68)(3) = 8.04 ext{ m}$ Therefore, the distance travelled by the combined trolleys in 3 seconds after the collision is 8.04 m.