Two particles of mass 'm' each are attached to a light rod of length 'd', one at its centre and the other at a free end. The rod is fixed at the other end and is rotated in a plane at an angular speed $ω$ . Calculate the angular momentum of the particle at the end with respect to the particle at the centre.

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Solution

The correct option is B

The situation is shown in figure. The velocity of the particle A with respect to the fixed end O is $v_{A} = ω (\frac{d}{2})$ and that of B with respect to O is $v_{B} = ω d$ . Hence the velocity of B with respect to A is $v_{B} - v_{A} = ω (\frac{d}{2})$ .The angular momentum of B with respect to A is, therefore,

$L = m v r = m ω (\frac{d}{2}) \frac{d}{2} = \frac{1}{4} m ω d^{2}$

Along the direction perpendicular to the plane of rotation i.e. j

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Two particles of mass m each are attached to a light rod of length d, one at its centre and the other at a free end. The rod is fixed at the other end and is rotated in a plane at an angular speed $ω$ . Calculate the angular momentum of the particle at the end with respect to the particle at the centre (i.e. angular momentum of B with respect to A).