The acceleration of a point on the rim of a flywheel of diameter 1.2 m, if it makes 900 revolutions per minute, will be

The diameter of a flywheel is 1.2 m and it makes 900 revolutions per minute. Calculate the acceleration at a point on its rim

The angular speed of a fly-wheel making 120 revolution per minute is

Some how, an ant is stuck to the rim of a bicycle wheel of diameter 1 m. While the bicycle is on a central stand, the wheel is set into rotation and it attains the frequency of 2 rev/s in 10 seconds, with uniform angular acceleration. Calculate Time taken by it for first complete revolution and the last complete revolution.

Some how, an ant is stuck to the rim of a bicycle wheel of diameter 1 m. While the bicycle is on a central stand, the wheel is set into rotation and it attains the frequency of 2 rev/s in 10 seconds, with uniform angular acceleration. Calculate Number of revolutions completed by the ant in these 10 seconds.

If a space man is rotated at the end of a long beam of length 5 m and the acceleration of 9 g, then the number of revolution performed will be

A particle moves along a circle if radius (20 //pi) m with constant tangential acceleration. If the velocity of the particle is 80 m//s at the end of the second revolution after motion has begun the tangential acceleration is .

A fan is making 600 revolutions per minute. If after some time it makes 1200 revolutions per minute, then the increase in its angular velocity is

Somehow, an ant is stuck to the rim of a bicycle wheel of diameter 1m . While the bicycle is on a central stand. The wheel is set into rotation and attains the frequency of 2 frac(rev)(s) in 10 seconds, with uniform angular acceleration. Calculate number of revolutions completed by the ant in these 10 seconds.

Tangential acceleration of a particle moving on a circle of radius 1 m varies with time t as shown in the graph (initial velocity of particle is zer). Time after which total acceleration of particle makes an angle of 30^@ with radial acceleration is,

A body of mass 1 kg is tied to a string and revolved in a horizontal circle of radius 1 m. Calculate the maximum number of revolutions per minute, so that the string does not break, Breaking tension of the string is 9.86 N.