The displacement x (in metre ) of a particle in, simple harmonic motion is related to time t ( in second ) as
` x= 0.01 cos (pi t + pi /4)`
the frequency of the motion will be

The displacement x(in metres) of a particle performing simple harmonic motion is related to time t(in seconds) as x=0.05cos(4pit+(pi)/4) .the frequency of the motion will be

The phase (at a time t) of a particle in simple harmonic motion tells

The displacement of a particle in simple harmonic motion in one time period is

The phase of a particle executing simple harmonic motion is pi/2 when it has

The displacement x is in centimeter of an oscillating particle varies with time t in seconds as x = 2 cos [0.05pi t+(pi//3)] . Then the magnitude of the maximum acceleration of the particle will be

A simple harmonic motion is represented by : y = 5(sin 3pi t + sqrt(3) cos 3pi t)cm The amplitude and time period of the motion are :

A particle executes simple harmonic motion and is located at x = a , b and c at times t_(0),2t_(0) and3t_(0) respectively. The frequency of the oscillation is :

A simple harmonic motion is represented by x(t) = sin^(2)omega t - 2 cos^(2) omega t . The angular frequency of oscillation is given by

A simple harmonic motion is represented as x = 20 sin (2pi)t + 0.5]m find amplitude, angular frequency time period and initial phase.