Two particles A and B are located at distances `r_(A)` and `r_(B)` from the centre of a rotating disc such that `r_(A) gt r_(B)` . In this case
(Angular velocity `(omega)` of rotation is constant)

A coin is placed at a distance 9 cm from centre on a rotating from table starts slip. If the angular velocity of the turn table is tripled , then the distance of the coin from the centre will be

A coin kept on a horizontal rotating disc has its centre at a distance of 0.25 m from the axis of rotation of the disc. If mu is 0.2, then the angular velocity of the disc at which the coin willslip off, is

The acceleration due to gravity is g at a point distant r from the centre of earth of radius R . If r lt R , then

Two particles A and B are moving in uniform circular motion in concentric circles of radii r_A and r_B with speed V_A and V_B respectively. Their time period of rotation is the same. The ratio of angular speed of A to that of B will be:

A coin placed on a rotating table just slips when it is placed at a distance 4 r from the centre, on doubling the angular velocity of the table, the coin will just slip now the coin is at a distance from centre is

A coin is placed on a rotating platform at distance V from its axis of rotation.To avoid the skidding of coin from rotating platform, the maximum angular velocity omega is

A particle of mass m is subjected to an attractive central force of magnitude k//r^(2) , k being a constant. If at the instant when the particle is at an extreme position in its closed orbit, at a distance a from the centre of force, its speed is sqrt(k//2ma) , if the distance of other extreme position is b. Find a//b .

Magnitude of gravitational potential due to a point mass M at a distance r(>R) from the centre of earth is given by,

Two particles A and B, move with constant velocities vec(v_(1))" and "vec(v_(2)) . At the initial moment their position vectors are vec(r_(1))" and "vec(r_(2)) respectively. The condition for particle A and B for their collision is

A particle is moving along a circular path of radius 'r' with uniform angular velocity omega . Its angular acceleration is