Question

A particle 'P is moving in a circle of radius 'T'
with uniform speed v. AB is the diameter of
circle and 'C' is the centre. The angular
velocity of P about A and C are in the ratio.


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Answer 1

The angular velocity of a particle about any point is given by:

ω=v/r ,

where, v= speed of particle

r= distance of particle from point

Here, given speed of particle is constant.

Angular speed about point A, ω = v/AB= v/2a ( because AB=2a)

Angular speed about centre C, ωA =v/BC=v/a ( because BC=a)

Therefore, Wa/Wc = 1/2

Answer 2

Answer:

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