A particle moves so that its acceleration a is give by a=bn where x is displacement from equilibrium position and b is non negative real constant the time period of oscillation of the particle is

A particle moves such that its acceleration ‘a’ is given by a = – zx where x is the displacement from equilibrium position and z is constant. The period of oscillation is

A particle moves such that its acceleration a is given by a = -bx , where x is the displacement from equilibrium positionand is a constant. The period of oscillation is

A particle moves in such a way that its acceleration a= - bx, where x is its displacement from the mean position and b is a constant. The period of its oscillation is

A particle moves such that acceleration is given by a= -4x . The period of oscillation is

A particle moves such that its acceleration is given by a = -Beta(x-2) Here, Beta is a positive constnt and x the x-coordinate with respect to the origin. Time period of oscillation is

The equation of motion of a particle executing S.H.M. is a = - bx , where a is the acceleration of the particle, x is the displacement from the mean position and b is a constant. What is the time period of the particle ?

A particle moves such that its acceleration is given by a =- beta (x-2) Here beta is positive constant and x is the position form origin. Time period of oscillation is

The acceleration versus displacement graph of a particle performing SHM is shown in figure. The time period of oscillation of particle in second is

A particle is attached to a vertical spring and is pulled down a distance 0.04m below its equilibrium position and is released from rest. The initial upward acceleration of the particle is 0.30 ms^(-2) . The period of the oscillation is

A particle of mass 2 kg moves in simple harmonic motion and its potential energy U varies with position x as shown. The period of oscillation of the particle is