A gramophone record of mass M and radius R is rotating at an angular velocity ω. A coin of mass m is gently placed on the record at a distance r=R/2 from its centre. The new angular velocity of the system is
A
2ωM(2M+m)
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B
2ωM(M+2m)
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C
ω
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D
ωMM
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Solution
The correct option is A2ωM(2M+m) The initial angular momentum of the rotating record is L=Iω
Where I=12MR2
Let ω′ be the angular velocity of the record when the coin of mass m is placed on it at a distance r from its centre. The angular momentum of the system becomes L′=(I+mr2)ω′
Since no external torque acts on the system, the angular momentum is conserved. i.e. L′=L or (I+mr2)ω′=Iω
or ω′=IωI+mr2=12MR2ω12MR2+mr2
or ω′=ω(1+2mr2MR2)
Putting r=R/2, we find that the correct choice is (a).