A particle moves with simple harmonic motion in a straight line. In first `taus`, after starting form rest it travels a destance a, and in next `tau s` it travels 2a, in same direction, then:

A particle is moving in a striaght line according as S=15t+6t^2-t^3 , then the time it will come to rest is

A particle performs simple harmonic mition with amplitude A. Its speed is trebled at the instant that it is at a destance (2A)/3 from equilibrium position. The new amplitude of the motion is:

A simple harmonic motion is given by the equation x=10cos 10 pit . The phase of S.H.M. after time 2 s is

A particle of mass 0.2 kg moves with simple harmonic motion of amplitude 2 cm. If the total energy of the particle is 4 xx10^(-5) J, then the time period of the motion is

A particle is moving in a straight line with S.H.M. of amplitude r. At a distance s from the mean position of motion, the particle receives a blow in the direction of motion which instantaneously doubles the velocity . Find the new amplitude.

A car accelerate from rest with 2 m/s^2 on a straight line path and then comes to rest after applying brakes. Total distance travelled by the car is 100 m in 20 seconds. Then the maximum velocity attained by the car is

A particle executing simple harmonic motion has an amplitude of 6 cm . Its acceleration at a distance of 2 cm from the mean position is 8 cm/s^(2) The maximum speed of the particle is

A particle executes simple harmonic motion with an angular velocity and maximum acceleration of 3.5rad//sec and 7.5 m//s^(2) respectively. The amplitude of oscillation

Plot the corresponding reference circle for each of the following simple harmonic motions. Indicate the initial (t = 0) position of the particle, the radius of the circle, and the angular speed of the rotating particle .For simplicity , the sense of rotation may be fixed to be anticlockwise in everycase : (x is in cm and t is in s) x = -2 sin [ 3t + (pi)/3]