A particle executing simple harmonic motion has amplitude of 10 centimeter and time period 4 second. At t = 0. x = 5 going towards positive x direction. Then the equation for the displacement x at time t

A particle doing simple harmonic motion amplitude = 4 cm time period = 12sec The ratio between time taken by it in going from its mean position to 2cm and from 2cm to extreme position 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 is executing simple harmonic motion with a time period T . At time t=0, it is at its position of equilibium. The kinetice energy -time graph of the particle will look like

A particle executes linear simple harmonic motion with an amplitude of 2 cm . When the particle is at 1 cm from the mean position the magnitude of its velocity is equal to that of its acceleration. Then its time period in seconds is

A particle executes linear simple harmonic motion with an amplitude of 3 cm . When the particle is at 2 cm from the mean position, the magnitude of its velocity is equal to that of its acceleration. Then, its time period in seconds is

A particle executes simple harmonic motion with an amplitude of 4 cm . At the mean position the velocity of the particle is 10 cm/ s . The distance of the particle from the mean position when its speed becomes 5 cm/s is

A particle is executing simple harmonic motion with an amplitude of 2 m. The difference in the magnitude of its maximum acceleration and maximum velocity is 4. The time period of its oscillation and its velocity when it is l m away from the mean position are respectively

A particle is executing simple harmonic motion with a period of T seconds and amplitude a metre . The shortest time it takes to reach a point a/sqrt2 from its mean position in seconds is

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

The total energy of a particle executing simple harmonic motion is (x- displacement)