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Question

A person is pulling a mass m from ground on a rough hemispherical fixed surface up to the top of the hemisphere with the help of a light inextensible string as shown in the figure. The radius of the hemisphere is R. Find the work done by the tension in the string. Assume that the mass is moved with a negligible constant velocity, u. (The coefficient of friction is μ)


A

(R1)Mgμ

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B

(1+R)Mgμ

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C

mgR(1μ)

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D

MgR(1+μ)

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Solution

The correct option is D

MgR(1+μ)


The net force acting on the sphere along the tangent (t) is given as

Tfkmg sin θ=maTμNmg sin θ=ma

Since the sphere moves slowly v is negligible and a = 0

T=μN+mg sin θ .......(i)

Where Nmg cos θ=0 since the sphere does not move radially(along the normal n).

And as u is negligible, and can assume there is no centripetal acceleration

N=mg cos θ

Using (i) and (ii), we obtain T=mg(sinθ+μ cosθ)

Now the work done dW shifting the ball through an infinitesimal distance ds=dW=T.ds.cosθ(θ=0 at

every point during motion)

(The total work done in pulling the sphere through a distance x=πR2)=W

= 0πR2T.dsW=mgπR20(sinθ+μcosθ)ds; putting ds=Rdθ

We obtain w=mgRπ200(sinθ+μcosθ)dθ=mgR(Cosθ+μSinθ)π2W=mgR(1+μ).


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