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Question

Calculate the buoyant force (in N) acting on a 250 g rubik's cube of side length 8 cm, if only half of it is submerged in kerosene. The rubik's cube is hanging by a thread. Density of kerosene is 0.8 g cm3. Take g=10 m s2.
  1. 2.048

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Solution

The correct option is A 2.048
Given:
Density of kerosene, ρk=0.8 g cm3=800 kg m3
Cube's side length, l=8 cm=0.08 m
Cube's mass, m=250 g=0.25 kg

Volume of cube is:
V=l3

Half of the cube is submerged. Volume submerged is equal to the volume of kerosene displaced. So, volume of kerosene displaced is:
Vk=V2
Vk=l32

Using definition of density, mass of kerosene displaced is:
mk=ρk Vk
mk=ρk l32

Using definition of weight, weight of kerosene displaced is:
Wk=mk g
Wk=ρk l32g

According to Archimedes principle, the weight of the kerosene displaced is equal to the buoyant force.
Fb=Wk
Fb=ρk l32g
Fb=800×0.0832×10
Fb=2.048 N

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