A beam AB has mass 12 kg and length 5 m - Edexcel - A-Level Maths Mechanics - Question 5 - 2008 - Paper 1

Next, to calculate the tension at point A, we can use the equilibrium of forces. The total upward forces must equal the total downward forces:

$S + T = 12g$

Where S is the tension at A. Substituting in T:

$S + 73.5 = 12 imes 9.8$

Calculating this gives:

$S + 73.5 = 117.6$

Thus,

$S = 117.6 - 73.5 = 44.1 ext{ N}$

When a load of mass 16 kg is added at a distance y from A, the additional weight (W_load) is given by:

$W_{load} = 16 ext{ kg} imes 9.8 ext{ m/s}^2 = 156.8 ext{ N}$

The total moment about point A becomes:

$T imes 4 = (117.6 + 156.8) imes y$

So, we can write:

$T = \frac{(117.6 + 156.8) imes y}{4} = \frac{274.4y}{4} = 68.6y$

The rope at C will break if:

$T > 98 ext{ N}$

Setting our expression for T gives:

$68.6y > 98$

Therefore,

$y > \frac{98}{68.6} \\ y > 1.43 ext{ m}$

Since y must be no more than 5 m from A, the load must be placed more than 1.43 m but less than or equal to 5 m,

The range of possible positions:

$1.43 < y \leq 5 ext{ m}$