The displacement of a particle of mass 0.1 kg from . its mean position is given by, y = 0.05 sin `4pi(t+0.4)` (where all the quantities are in S.I. unit). Period of motion is 0.1 s. The total energy of the particle is

The displacement of a particle moving in S.H.M. at any instant is given by y = a sin omega . The acceleration after time t=T/4 so

Equation of a simple harmonic progressive wave is y= 0.03 sin 8pi ( (t)/( 0.016)- (x)/( 1.6) ) ,where all the quantities are in S.I.units The velocity of wave is

A particle of mass m executing S.H.M. about its mean position. The total energy of the particle at given instant is

The displacement of a particle executing S.H.M. is given by, y = 0.20 sin (100 t) cm. The maximum speed of the particle is

The potential energt of a particle of mass 0.1 kg, moving along the x-axis, is given by U=5x(x-4)J , where x is in meter. It can be concluded that

A wave is represented by the equation y = 0.06 sin (200 (pi) t - 20 (pi) x) quantities are in S.I. units . Calculate wave length of the wave

The equator of simple harmonic progressive wave is given by Y = 0.05 sin (pi) [ 20 t - x /6] where all quantities are in S.I.units . Calculate the displacement of a particle at 5 cm from origin and at the instant 0.1 second.

A wave is represented by the equation y = 0.06 sin (200 (pi) t - 20 (pi) x) quantities are in S.I. units . Calculate frequency

A wave is represented by the equation y = 0.06 sin (200 (pi) t - 20 (pi) x) quantities are in S.I. units . Calculate amplitude

The displacement of a particle linear S.H.M. is given by x = 6 sin [3(pi)t + 5(pi) /6] meter. Find amplitude, frequency and the phase constant of the motion .