A body of mass 120g placed at the 10cm mark on a uniform metre rule makes the rule settle horizontally on a fulcrum places at 35cm mark. Calculate the mass of the rule
60g
80g
120g
200g
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25 is gotten from 35-10 while 15 is gotten from 50-35 the weight of the metre rule acts at its centre of gravity
To solve this problem, we can use the principle of moments. Let's denote the mass of the rule as M.
Given Information
1. Mass of the body (m) = 120 g = 0.12 kg (converting to kg for consistency)
2. Position of the body = 10 cm mark
3. Fulcrum position = 35 cm mark
Calculating the Mass of the Rule
Since the rule is uniform, its center of gravity is at the 50 cm mark (midpoint of a 1-meter rule).
Let's denote the distance from the fulcrum to the center of gravity of the rule as d₁ and the distance from the fulcrum to the body as d₂.
d₁ = 50 cm - 35 cm = 15 cm = 0.15 m
d₂ = 35 cm - 10 cm = 25 cm = 0.25 m
Using the principle of moments:
M × g × d₁ = m × g × d₂
where g is the acceleration due to gravity (approximately 9.8 m/s²). Since g is present on both sides, it cancels out:
M × 0.15 = 0.12 × 0.25
M = (0.12 × 0.25) / 0.15
M = 0.2 kg or 200 g
The mass of the rule is 200 g.
