A small stone A of mass 3m is attached to one end of a string - Edexcel - A-Level Maths Mechanics - Question 2 - 2021 - Paper 1

From the equation of motion derived in part (a), we can express it as: 3mg imes rac{3}{5} - rac{1}{6}(3mg imes rac{4}{5}) = 3ma + T Now, when B is also considered, the tension T can be expressed as: $T = mg$ Substituting this back into the equation leads to: 3mg imes rac{3}{5} - rac{1}{6}(3mg imes rac{4}{5}) - mg = 3ma After simplifying and solving for a, we get: a = rac{1}{10}g

To sketch the velocity-time graph for stone B, start by noting that:

1. When A is released, B begins to accelerate upwards. Initially, the velocity is zero.
2. Stone B’s acceleration is constant at rac{1}{10}g due to the pulley's smooth nature.
3. The graph will be a straight line starting from the origin (0,0) with a slope reflecting the constant acceleration.
4. At the moment B reaches the pulley, the velocity will just have increased linearly according to the relationship: $v = at$.

Thus, the graph will extend from the origin upward with a consistent slope until the point where A reaches the pulley.

If B is not light, the tension would differ due to its mass. In part (b), the calculated acceleration assumes that the mass of B does not significantly affect the overall system. If B has considerable mass, the tension T would not equal mg, and thus the derived acceleration for A would not hold true. Consequently, part (b) would actually produce a different acceleration that accounts for the mass of B.