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

A particle executes simple harmonic motion and is located at x = a, b and c at times t_(0), 2t_(0) and 3t_(0) respectively. The frequency of the oscillation is :

A particle executes simple harmonic motion about the point x=0 . At time t=0 , it has displacement x=2cm and zero velocity. If the frequency of motion is 0.25 s^(-1) , find (a) the period, (b) angular frequency, ( c) the amplitude, (d) maximum speed, (e) the displacement from the mean position at t=3 s and (f) the velocity at t=3 s .

A particle executes simple harmotic motion about the point x=0 . At time t=0 , it has displacement x=2cm and zero velocity. If the frequency of motion is 0.25 s^(-1) , find (a) the period, (b) angular frequency, ( c) the amplitude, (d) maximum speed, (e) the displacement from the mean position at t=1 s and (f) the velocity at t=1 s .

The position and velocity of a particle executing simple harmonic motion at t = 0 are given by 3 cm and 8 cm s^(-1) respectively . If the angular frequency of the particle is 2 "rad s" ^(-1) , then the amplitude of oscillation (in cm) is

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 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 of a particle executing simple harmonic motion is given by y=A_(0)+A sin omegat+B cos omegat . Then the amplitude of its oscillation is given by

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

A particle executing simple harmonic motion has amplitude of 1 m and time period 2 s . At t = 0 , net force on the particle is zero. Find the equation of displacement of the particle.

A particle executes simple harmonic motion with a period of 16s . At time t=2s , the particle crosses the mean position while at t=4s , its velocity is 4ms^-1 amplitude of motion in metre is