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(D) The system consists of the disc and the child. Since there are no external torques acting on the system about the axis of rotation,the angular mom

Vedclass · Accepted Answer

$\frac{{(I + {m}{R^2})\omega  - {mv}R}}{I}$

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(D) The system consists of the disc and the child. Since there are no external torques acting on the system about the axis of rotation,the angular momentum of the system is conserved.The initial angular momentum of the system is $L_i = (I + mR^2)\omega$.When the child jumps off with tangential velocity $v$ with respect to the ground,the angular momentum of the child about the center of the disc is $L_{child} = mvR$.Let the new angular velocity of the disc be $\omega'$. The final angular momentum of the disc is $L_f = I\omega'$.By the principle of conservation of angular momentum:$L_i = L_{child} + L_f$$(I + mR^2)\omega = mvR + I\omega'$Solving for $\omega'$:$I\omega' = (I + mR^2)\omega - mvR$$\omega' = \frac{(I + mR^2)\omega - mvR}{I}$

$A$ child with mass $m$ is standing at the edge of a disc with moment of inertia $I$,radius $R$,and initial angular velocity $\omega$. See the figure given below. The child jumps off the edge of the disc with tangential velocity $v$ with respect to the ground. The new angular velocity of the disc is

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