A point performs simple harmonic oscilla...

A point performs simple harmonic oscillation of period T and the equation of motion is given by `x = a sin (omega t + (pi)/(6))`. After the elapse of what fraction of the time period, the velocity of the point will be equal to half of its maximum velocity ?

`T/3`

`T/(12)`

`T/8`

`T/6`

Text Solution

Verified by Experts

The correct Answer is:

Similar Questions

Explore conceptually related problems

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

The equation of a simple harmonic motion is given by , x=8sin(8pit)+6cos(8pit) . The initial phase angle is

The displacement of a simple harmonic oscillator is x = 5 sin (pi t /3) m . Then its velocity at t =1 s , is

A simple harmonic wave having an amplitude a and time period T is represented by the equation y = 5"sin"pi(t + 4)m . Then the value of amplitude (a) in (m) and time period (T) in second are

The equation of a standing wave is given by y = 0.02 cos (pi)(x) sin (100 (pi) t )m . Find the amplitude of either wave interfering , wavelength , time period, frequency and wave velocity of interfering waves.

The equation of motion of a body performing S.H.M. is , x = 7 sin [ 3 (pi)t + pi/6] cm. Find its acceleration.

A simple harmonic motion is represented by the equation, y = 5 sin pi(t+4) . Then the values of amplitude A and initial phase prop are respectively.

The equation of motion of a body performing S.H.M. is , x = 7 sin [ 3 (pi)t + pi/6] cm. Find its phase at t = 2 second .

A point performs simple harmonic oscillation of period T and the equation of motion is given by `x = a sin (omega t + (pi)/(6))`. After the elapse of what fraction of the time period, the velocity of the point will be equal to half of its maximum velocity ?

Text Solution

Similar Questions

Recommended Questions