A beam AB has mass m and length 2a. The beam rests in equilibrium with A on rough horizontal ground and with B against a smooth vertical wall. The beam is inclined to the horizontal at an angle θ, as shown in Figure 2. The coefficient of friction between the beam and the ground is μ. The beam is modelled as a uniform rod resting in a vertical plane that is perpendicular to the wall. Using the model, (a) show that μ > $ \frac{1}{2} \cot \theta $ A horizontal force of magnitude kmg, where k is a constant, is now applied to the beam at A. This force acts in a direction that is perpendicular to the wall and towards the wall. Given that $ \tan \theta = \frac{5}{4} $, $ \mu = \frac{1}{2} $ and the beam is now in limiting equilibrium, (b) use the model to find the value of k.

A-Level Edexcel Maths Mechanics Further Forces & Newtons Laws: A beam AB has mass m and length

A beam AB has mass m and length 2a - Edexcel - A-Level Maths Mechanics - Question 3 - 2021 - Paper 1

Question 3

A beam AB has mass m and length 2a. The beam rests in equilibrium with A on rough horizontal ground and with B against a smooth vertical wall. The beam is inclined... show full transcript

Worked Solution & Example Answer:A beam AB has mass m and length 2a - Edexcel - A-Level Maths Mechanics - Question 3 - 2021 - Paper 1

Step 1

show that μ > $ \frac{1}{2} \cot \theta $

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Answer

Identify Forces:
- The weight of the beam acts vertically downwards at its center of mass.
- Normal force (N) acts perpendicular to the surface at point A.
- Frictional force (F) acts horizontally opposite to any applied force (at point B).
Apply Moments about A:
- The sum of moments about point A must be zero for equilibrium:
$mga \cos \theta - F \cdot 2a \sin \theta = 0$

Rearranging gives:

$F = \frac{mga \cos \theta}{2a \sin \theta} = \frac{mg \cos \theta}{2 \sin \theta}$
Frictional Force Relation:
- The frictional force can also be expressed as:
$F = \mu N$

where N = mg (since the vertical forces also must balance).
Combine the Equations:
- Substituting from the equation for F gives:
$\mu mg = \frac{mg \cos \theta}{2 \sin \theta}$
Rearranging gives the inequality:
- Dividing both sides by mg and rearranging gives:
$\mu > \frac{1}{2} \cot \theta$

Thus, we have shown that ( \mu > \frac{1}{2} \cot \theta ).

Step 2

use the model to find the value of k

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Answer

Identify the Forces:
- The weight is now applied via the external force kmg.
- Using equilibrium, the force components must balance out.
Sum of Forces in Vertical Direction:
- Based on vertical equilibrium, we have:
$N = mg - F$
Sum of Moments about A:
- The moment about point A must also be considered:
$mga \cos \theta + \frac{1}{2} mg \sin \theta = kmg a \sin \theta$
Substituting the known values:
- Rearranging gives:
$\frac{1}{2} mg \sin \theta + mg \cos \theta = kmg \sin \theta$
Solve for k:
- Canceling mg and solving yields:
$1 + \frac{1}{2} = k \implies k = 0.9$

Thus, the value of k is 0.9.

A beam AB has mass m and length 2a - Edexcel - A-Level Maths Mechanics - Question 3 - 2021 - Paper 1

Worked Solution & Example Answer:A beam AB has mass m and length 2a - Edexcel - A-Level Maths Mechanics - Question 3 - 2021 - Paper 1

show that μ > \( \frac{1}{2} \cot \theta \)

use the model to find the value of k

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