A particle of mass 10 gm is placed in a potential field given by `V = (50 x^(2) + 100)J//kg`. The frequency of oscillation in cycle//sec is :

A particle of mass 10gm is placed in a potential field given by V = (50x^(2) + 100)J//kg . The frequency of oscilltion in cycle//sec is

A particle of mass 4 gm. Lies in a potential field given by V = 200x^(2) + 150 ergs/gm. Deduce the frequency of vibration.

A particle of mass 100 gm moves in a potential well given by U = 8 x^(2) - 4x + 400 joule. Find its acceleration at a distance of 25 cm from equilibrium in the positive direction

The potential energy of a particle of mass 1 kg in motin along the x-axis is given by U = 4(1-cos2x)J Here, x is in meter. The period of small osciallationis (in second) is

A particle of mass 5 kg moving in the x-y plane has its potential energy given by U=(-7x+24y)J where x and y are in meter. The particle is initially at origin and has a velocity vec(i)=(14 hat(i) + 4.2 hat (j))m//s

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

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

The potential energy of a particle under a conservative force is given by U ( x) = ( x^(2) -3x) J. The equilibrium position of the particle is at

A dipole consisting of +10 nC and -10 nC separated by a distance of 2cm oscillates in an electric field of strength 60,000 Vm^(-1) . The frequency of its oscillation is (M.I. about the axis of oscillations is 3 xx 10^(-10)kg m^(2) )

A particle of mass = 2kg moves in simple harmonic motion and its potential energy U varies with position x as shown. The period of oscillation of the particle is (npi)/5 second. Find value of n.