A particle moving about its equilibrium position with eqaution `y=-ax-bt.` Interpret the condition

A charged particle oscillates about its mean equilibrium position with a frerquency of 10^9 H_z . The electromagnetic waves produced.

A charged particle oscillates about its mean equilibrium position with a frerquency of 10^9 H_z . The electromagnetic waves produced.

A charged particle oscillates about its mean equilibrium position with a frerquency of 10^9 H_z . The electromagnetic waves produced.

A charged particle oscillates about its mean equilibrium position with a frequency of 10^(9) Hz. The frequency of electromagnetic waves produced by the oscillator is

The particles of a medium oscillate about their equilibrium position, whenever a wave travels through that medium. The phase difference between the oscillations of two such practices varies

A pendulum is displaced to an angle theta from its equilibrium position, then it will pass through its mean position with a velocity v equal to

A partical of mass m is moving along the x-axis under the potential V (x) =(kx^2)/2+lamda Where k and x are positive constants of appropriate dimensions . The particle is slightly displaced from its equilibrium position . The particle oscillates with the the angular frequency (omega) given by

A particle of mass 2 kg is moving of a straight line under the action of force F = (8 - 2x)N . It is released at rest from x = 6m . a. Is the particle moving simple harmonically. b. Find the equilibrium position of the particle. c. Write the equation of motion of the particle. d. Find the time period of SHM.

Two particles A and B are performing SHM along x and y-axis respectively with equal amplitude and frequency of 2 cm and 1 Hz respectively. Equilibrium positions of the particles A and B are at the coordinates [3 cm, 0] and (0, 4 cm) respectively. At t = 0 ,B is at its equilibrium position and moving towards the origin, while A is nearest to the origin and moving away from the origin- Equation of motion of particle B can be written as-

A particle is moving along the x-axis and its position-time graph is shown. Determine the sign of acceleration.