A particle undergoing SHM has the equation `x=A"sin"(2omegat+phi)` , where x represents the displacement of the particle. The kinetic energy oscillates with time period

A particle is executing shm. What fraction of its energy is kinetic when the displacement is half the amplitude ?

A particle executing simple harmonic motion with time period T. the time period with which its kinetic energy oscillates is

A particle moves on the X-axis according to the equation x=5sin^2omegat . The motion simple harmonic

A particle moves in a straight line with acceleration proportional to x^2 , ( Where x is displacement). The gain of kinetic energy for any displacement is proportional to

A particle moves on the X-axis according to the equation x=x_0 sin^2omegat . The motion simple harmonic

When a particle executes SHM oscillates with a frequency v, then the kinetic energy of the particle

Draw the graph between displacement and kinetic energy for a particle executing SHM.

A particle is executing SHM given by x = A sin (pit + phi) . The initial displacement of particle is 1 cm and its initial velocity is pi cm//sec . Find the amplitude of motion and initial phase of the particle.

For a particle executing SHM, the displacement x is given by x = A cos omegat . Identify the graph which represents the variation of potential energy (PE) as a function of time t and displacement x . (a) I, III (b) II, IV (c ) II, III (d) I, IV

The motion of a particle in S.H.M. is described by the displacement function, x=Acos(omegat+phi) , If the initial (t=0) position of the particle is 1cm and its initial velocity is omega cm s^(-1) , what are its amplitude and initial phase angle ? The angular frequency of the particle is pis^(-1) . If instead of the cosine function, we choose the sine function to describe the SHM : x=B sin(omegat+alpha) , what are the amplitude and initial phase of the particle with the above initial conditions ?