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Question

A block of mass m is placed on an inclined plane of angle θ. The coefficient of friction between the block and the plane is μ and tanθ>μ. The block is held stationary by applying a force P parallel to the inclined plane. The direction of force pointing up the plane is taken to be positive. As force P is varied from P1=mg(sinθμcosθ) to P2=mg(sinθ+μcosθ), then the graph of frictional force f versus P graph will look like:

A
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B
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C
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D
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Solution

The correct option is A
As tanθ>μ, the block has a tendency to move down the incline. Therefore a force P is applied upwards along the incline.
Here, at equilibrium P+f=mg sinθf=mg sinθP


Now as P increases the value of f decreases linearly with resepct to P.

When P=mg sinθ,f=0

When P is increased further, the block will have a tendency to move upwards along the inclined plane.
Therefore the frictional force acts downwards along the incline in this case.

Here, at equilibrium P=f+mg sinθ
f=Pmg sinθ
Now as P increases, f increases linearly w.r.t P.

If you consider upward friction as positive and downward negative, this is represented by graph (a)

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