The maximum velocity of a simple harmonic motion represented by `y = 3 sin (100t + (pi)/(6))` is given by

The maximum velocity of a simple harmonic motion represented by y="sin"(100t+(pi)/(6)) is given by

What is the phase difference between two simple harmonic motions represented by x_(1)=A"sin"(omegat+(pi)/(6)) and x_(2)=A "cos"omegat ?

Two simple harmonic motion are represented by equations y_(1) = 4 sin (10 t + phi) rArr y_(2) = 5 cos 10t What is the phase difference between their velocities ?

The equation of a simple harmonic motion is given by x =6 sin 10 t + 8 cos 10 t , where x is in cm, and t is in seconds. Find the resultant amplitude.

The diplacement , velocity and acceleration in a simple harmonic motion are related as the

The amplitude of given simple harmonic motion is y=(3sinomegat+4cosomegat)m

The maximum velocity of a particle executing simple harmonic motion is v. If the amplitude is doubled and the time period of oscillation decreased to 1/3 of its original value the maximum velocity becomes

The displacement of a particle executing simple harmonic motion is given by y = 4 sin(2t + phi) . The period of oscillation is

The equation of a simple harmonic progressive wave is given by y = A sin (100 pi t - 3x) . Find the distance between 2 particles having a phase difference of (pi)/(3) .

The displacement of a particle executing simple harmonic motion is given by x=3sin(2pit+(pi)/(4)) where x is in metres and t is in seconds. The amplitude and maximum speed of the particle is