A non-uniform plank AB has length 6 m and mass 30 kg - Edexcel - A-Level Maths Mechanics - Question 6 - 2016 - Paper 1

To find the value of d, we need to apply the principle of moments about point S when the block of mass M is placed at point A.

1. Setting up the equation: When the block is at A, the moments about point S must balance. The counterclockwise moment from the block is: $M imes 0.5$ The moment from the weight of the plank (30 kg) about point S, with its center of mass at a distance of d from A, is: $30g imes (d - 0.5)$ Setting up the moment equilibrium gives: $M imes 0.5 = 30g imes (d - 0.5)$ Substitute W for 30g, we can rearrange it to find d.

2. Using a second moment equation for the configuration at T: When the block is moved to B, we need to consider the moment about point T: The moment due to the block now becomes: $M imes 2$ The weight of the plank is still the same: $30g imes (6 - d)$ Setting the moments around T gives: $M imes 2 = 30g imes (6 - d)$

3. Equating equations: Now we can solve these two equations simultaneously to find d. After simplification, we will find that: $d = 1.2 ext{ m}$