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Question

A uniform rod of length 2.0 m, specific gravity 0.5 and mass 2 kg is hinged at one end to the bottom of a tank of water (specific gravity = 1.0) filled upto a height of 1.0 m as shown in the figure. Taking the case θ0, the force exerted by the hinge on the rod is (g=10 m/s2)


A
10.2 N upwards
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B
4.2 N downwards
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C
8.3 N downwards
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D
6.2 N upwards
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Solution

The correct option is C 8.3 N downwards
Let L be the height upto which water is filled and l be the total length of the rod.
Length of rod inside the water is given by (l)=Lsecθ(1)
Upthrust (F)=λlσg
where, σ specific gravity
λ linear mass density of the rod.

From the data given in the question,

F=1×Lsecθ×100.5=20Lsecθ (2)

Weight of the rod (W)=mg=2×10=20 N (3)

For rotational equilibrium of rod, net torque about O should be zero.
Fl2sin θ=Wl2sinθ

Using (2) in the above equation,
20×Lsecθ×lsinθ2=Wl2sinθ

Using (1) and (3) in the above equation

10L2sec2 θ=20

Given,
Height upto which water is filled is L=1 m
sec2θ=2θ=45

Substituting this in equation (2) we get,

F=20sec 45=202 N

For vertical equilibrium of rod,
W+Fhinge=F
or 20+Fhinge=202
i.e Force exerted by the hinge on the rod will be (20220) N or 8.3 N downwards.

Thus, option (c) is the correct answer.

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