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Question

A block of mass M has a circular cut with a frictionless surface as shown. The block rests on the horizontal frictionless surface of a fixed table. Initially the right edge of the block is at x=0, in a co-ordinate system fixed to the table. A point mass m is released from rest at the topmost point of the path as shown and it slides down. When the mass loses contact with the block, its position is x and the velocity is v. At that instant, which of the following options is/are correct?

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A
The velocity of the block M is: V=mM2gR
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B
The x component of displacement of the center of mass of the block M is: mRM+m
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C
The position of the point mass is: x=2mRM+m
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D
The velocity of the point mass m is: v=2gR1+mM
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Solution

The correct options are
B The x component of displacement of the center of mass of the block M is: mRM+m
D The velocity of the point mass m is: v=2gR1+mM
Using conservation of momentum
mu=MV ....(I)
Using conservation of energy
MgR=12mu2+12MV2 .....(I)
Solving eqn. (I) and (II) we get
v= 2gR1+mM and V=mM 2gR1+mM
The position of centre of mass
as centre of mass of system is zero
O=m(Rx)+Mx
x=mRm+M
x displacement of centre of mass.

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