A solid cylinder of mass m and radius R rolls down an inclined plane of height h without slipping. The speed of its centre of mass when it reaches the bottom is
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The cylinder has potential energy at the top of the inclined plane and both translational and rotational kinetic energy at the bottom. Show more…
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A solid cylinder of mass $m$ and radius $R$ rolls down inclined plane without slipping. The speed of its CM when it reaches the bottom is: (a) $\sqrt{2 g h}$ (b) $\sqrt{4 \mathrm{gh} / 3}$ (c) $\sqrt{3 / 4 g h}$ (d) $\sqrt{4 g h}$
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A solid cylinder of mass $M$ and radius $R$ rolls without slipping down an inclined plane of length $L$ and height $h$. What is the speed of its centre of mass when the cylinder reaches its bottom (a) $\sqrt{\frac{3}{4} g h}$ (b) $\sqrt{\frac{4}{3} g h}$ (c) $\sqrt{4 g h}$ (d) $\sqrt{2 g h}$
A cylinder of mass m and radius R has a moment of inertia of mr^2. The cylinder is released from rest at a height h on an inclined plane and rolls down the plane without slipping. What is the velocity of the cylinder when it reaches the bottom of the incline?
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