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

A particle moves such that its acceleration a is given by a = (-b)x, Then, the period of oscillation is

A particle moves as such acceleration is given by a = 3 sin 4t, then :

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 such that its acceleration a is given by a = - bx, where x is displacement from equilibrium position and b is a constant. The period of oscillation 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 accleration a is given by a = -bx , where x is the displacement from equilibrium position and b is a constant. 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

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

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