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A thin circular ring of mass $\mathrm{m}$ and radius $\mathrm{R}$ is rotating about its axis with a constant angular velocity $\omega$. Two objects each of mass $M$ are attached gently to the opposite ends of a diameter of the ring. The ring now rotates with an angular velocity $\omega^{\prime}=$
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The correct answer is:
$\frac{\omega \mathrm{m}}{(\mathrm{m}+2 \mathrm{M})}$
$\frac{\omega \mathrm{m}}{(\mathrm{m}+2 \mathrm{M})}$
$L_i=L_f$
$m R R^2 \omega=\left(m R^2+2 M R^2\right) \omega^{\prime}$
$\omega^{\prime}=\left(\frac{m \omega}{m+2 M}\right)$
$m R R^2 \omega=\left(m R^2+2 M R^2\right) \omega^{\prime}$
$\omega^{\prime}=\left(\frac{m \omega}{m+2 M}\right)$
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