A particle is executing a simple harmonic motion. Its maximum acceleration is `alpha` and maximum velocity is `beta`. Then its time period of vibration will be:

Four different expressions for displacement of a particle executing simple harmonic motion are printed on a book: Here a = maximum displacement of the particle , v =its velocity and T = its time period. Check from dimensional analysis which of these expressions involve (s) some printing mistake.

Total energy of a particle executing simple harmonic motion is 400 erg and the maximum force acting on the particle is 100 dyn. If the time period is 2 s and the initial phase is 30^(@) , then write down the equation of motion. What is the mass of the particle?

A particle vibrating simple harmonically has an acceleration of 16cm*s^(-2) when it is at a distance of 4 cm from the mean position. Its time period is

A particle is executing simple harmonic motion with a time period T. At time t = 0, it is at its position of equilibrium. The kinetic energy-time graph of the particle will look like

A simple harmonic motion is described by a = -16x where a is acceleration and x is the displacement in meter. What is the time period?

A particle of mass 0.01 kg is executing simple harmonic motion along a straight line. Its time period is 2 s and amplitude is 0.1 m. Determine its kinetic energy (i) at a distance 0.02 m and (ii) at a distance 0.05 m from the position of equilibrium.

The maximum acceleration of a particle executing simple harmonic motion is 0.296m*s^(-2) , its time period is 2s and the displacement from the equilibrium position at the beginning of its motion is 0.015m. Determine the equation of motion of the particle.

Write the equation of motion of a particle executing simple harmonic motion, whose displacement is maximum at t = 0.