The equation of simple harmonic motion of a source is `(d^2x)/(dt^2)+px=0`, find the time period.

Write down the equation of a simple harmonic motion whose amplitude is 5 cm, epoch is 0^(@) and the number of vibrations per minute is 150.

Equation of a simple harmonic motion is y=2sin(4t+pi/6) . Find out its period and initial phase.

The equation of motion of a particle executing SHM is 3(d^(2)x)/(dt^(2))=27x=0 , what will be the angular frequency of the SHM?

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.

The equation of a simple harmonic motion is x=10sin(pi/3t-pi/12)cm . Calculate its (i) amplitude, (ii) time period, (iii) maximum speed, (iv) maximum acceleration, (v) epoch and (vi) speed after 1 s of initiation of motion.

Show that the equation x=Acos(omegat-alpha) is a mathematical representation of simple harmonic motion. Find the time period and the maximum speed of the motion.

The displacement equation of a simple harmonic motion is x=Asin(omegat+phi) . Show that the relation between velocity v and acceleration a of the motion is omega^(2)v^(2)+a^(2)=omega^(4)A^(2) .

If the equation x=asinomegat represents a simple harmonic motion of a particle, then its initial position is

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.

Show that the equation x=Asin(omegat-alpha) is the mathematical representation of a simple harmonic motion. Find the time period and the maximum acceleration of the motion.