The Principle of Moments (Edexcel GCSE Physics)

A parent and child are at opposite ends of a playground see-saw. The parent weighs 690 N and the child weighs 140 N. The adult sits 0.3 m from the pivot. Calculate the distance the child must sit from the pivot for the see-saw to be balanced.

Answer:

Step 1: List the know quantities

• Clockwise force (child), F_child = 140 N

• Anticlockwise force (adult), F_adult = 690 N

• Distance of adult from the pivot, d_adult = 0.3 m

Step 2: Write down the relevant equation

Moment = force × distance from pivot

• For the see-saw to balance, the principle of moments states that

Total clockwise moments = Total anticlockwise moments

Step 3: Calculate the total clockwise moments

• The clockwise moment is from the child

Moment_child = F_child × d_child = 140 × d_child

Step 4: Calculate the total anticlockwise moments

• The anticlockwise moment is from the adult

Moment_adult = F_adult × d_adult = 690 × 0.3 = 207 Nm

Step 5: Substitute into the principle of moments equation

140 × d_child = 207

Step 6: Rearrange for the distance of the child from the pivot

d_child = 207 ÷ 140 = 1.48 m

Make sure that all the distances are in the same units and you’re considering the correct forces as clockwise or anticlockwise, as seen in the diagram below

Clockwise is defined as the direction the hands of a clock move (and anticlockwise as the opposite)