Derive a differential equation for a damped harmonic oscillation.

Arrive the differential equation of SHM.

Write the differential equation representing Simple Harmonic Motion.

Derive the ideal gas equation.

What are damped oscillations?

Represent graphically the variations of potential energy, kinetic energy and total energy as a function of position 'y' for a simple harmonic oscillator. Explain the graph.

In simple harmonic motion, force is directly proportional to the displacement for the mean position. Derive equations for the Kinetic and potential energies of a harmonic oscillator.

In simple harmonic motion, force is directly proportional to the displacement for the mean position. Give an example of harmonic oscillator.

In simple harmonic motion, force is directly proportional to the displacement for the mean position. Show graphically the variation of kinetic energy and potential energy of a harmonic oscillator.

The general solution of a differential equation contains 3 arbitrary constants. Then what is the order of the differential equation?A)2 B)3 C)0 D)1