A student used a metre stick to investigate the laws of equilibrium for a set of co-planar forces - Leaving Cert Physics - Question 1 - 2022

It was necessary to determine the centre of gravity to know where the weight acts on the metre stick. This is crucial for calculating the moment about any point, ensuring proper equilibrium. Understanding the centre of gravity aids in predicting how forces will affect the stick when it is subjected to vertical forces.

In the labelled diagram, the vertical forces were applied at specified positions along the metre stick:

• 22.5 cm: 2.85 N upwards
• 32.1 cm: 2.00 N downwards
• 72.2 cm: 3.00 N downwards
• 81.3 cm: 3.40 N upwards

The net effect of these forces maintained the stick's horizontal position.

The metre stick was ensured to be in equilibrium by checking that the net force acting on it was zero, meaning upward forces balanced downward forces. Additionally, by confirming the net moment about any pivot point was zero, it maintained a stable horizontal position without rotation.

The principal advantage of ensuring the metre stick was horizontal was that it simplified the analysis of forces and moments. In a horizontal position, the stick experiences no torque, making it easier to assess equilibrium and to determine whether the forces balance effectively.

To calculate the net moment about the O position, use the formula: $ext{Net moment} = ext{Force} imes ext{Distance from pivot}$

Calculating each:

• For 22.5 cm: ( 2.85 ext{ N} imes 0.506 ext{ m} = 1.44591 ext{ Nm} )
• For 32.1 cm: ( 2.00 ext{ N} \times 0.321 ext{ m} = 0.64200 ext{ Nm} )
• For 72.2 cm: ( 3.00 ext{ N} \times 0.722 ext{ m} = 2.16600 ext{ Nm} )
• For 81.3 cm: ( 3.40 ext{ N} \times 0.813 ext{ m} = 2.77140 ext{ Nm} )

Calculating total moments: (1.44591 + 0.64200 - 2.16600 - 2.77140 = -3.88549 \text{ Nm})

Thus, the net moment about the O position is (-3.88549\text{ Nm}).

To find the net vertical force, sum the upwards and downwards forces:

• Upwards forces: 2.85 N + 3.40 N = 6.25 N
• Downwards forces: 2.00 N + 3.00 N = 5.00 N

Net vertical force = Upwards - Downwards (6.25 ext{ N} - 5.00 ext{ N} = 1.25 ext{ N upwards}).

The results verify the laws of equilibrium as they show:

• The net force acting on the metre stick is zero, confirming that all forces are balanced.
• The moments calculated confirm that the net moment about a point is also zero, confirming rotational equilibrium. These conditions are essential for any body to remain in a state of rest or uniform motion.