For a particle moving in a circle,

The speed of a particle moving in a circle is increasing. The dot product of its acceleration and velocity is

Find the magnitude of the linear acceleration of a particle moving in a circle of radius 10 cm with uniform speed completing the circle in 4s.

Consider a particle , moving in a circle with constant speed . P is a point outside the circle , in the same plane . Then , the angular momentum of the particle about the point P is

The magnitude of displacement of a particle moving in a circle of radius a with constant angular speed omega varries with time t is

The speed (v) of a particle moving in a circle of radius R varies with distance s as v=ks where k is a positive constant.Calculate the total acceleration of the particle

The speed of a particle moving in a circle slows down at a rate of 3 m//sec^(2) . At some instant the magnitude of the total acceleration is 5 m/sec^(2) and the particle's speed is 12 m/sec. The radius of circle will be :

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

The angular velocity of a particle moving in a circle of radius 50 cm is increased in 5 min from 100 revolutions per minute to 400 revolutions per minute. Find the tangential acceleration of the particle.