A particle is moving in a circle:

A particle is moving on a circle of radius A .At an instant its speed and tangential acceleration are B and C respectively.Total acceleration of the particle at that instant is

A particle is moving on a circle of radius R such that at every instant the tangential and radial accelerations are equal in magnitude. If the velocity of the particle be v_(0) at t=0 , the time for the completion of the half of the first revolution will be

Assertion: A charged particle is moving in a circle with constant speed in uniform magnetic field. If we increase the speed of particle to twice, its acceleration will become four times. Reason: In circular path of radius R with constant speed v , acceleration is given by v^2/R

A particle P is moving in a circle of radius 'a' with a uniform speed v. C is the centre of the circle and AB is a diameter. When passing through B the angular velocity of P about A and C are in the ratio

Under the influence of a unifrom magnetic field a charged particle is moving on a circle of radius R with Constnant speed v . The time period of the motion

A particle P is moving on a circle under the action of only one force acting always fixed point O on the circumference . Find ratio of (d^(2)phi)/(dt^(2)) and ((d phi)/dt)

A particle is moving along a circle of radius 20cm , with a linear velocity of 2m//s. Calculate the angular velocity of the particle.

A particle is moving along a circle of radius 20cm , with a linear velocity of 2m//s. Calculate the angular velocity of the particle.

A particle is moving along a circle such that it completes one revolution in 40 seconds. In 2 minuts 20 seconds, the ratio ("|displacement|")/("distance") is distance

A particle is moving along a circle of radius R with a uniform speed v . At t = 0 , the particle is moving along the east. Find the average acceleration (magnitude and direction) in 1//4 th revolution.