A simple harmonic oscillation is represented by `y=0.40sin(440t+0.61)` in SI units. Find initial phase.

A displacement wave is represented by y = 0.25 xx 10^-3 sin ( 500 t - 0.025 x) . Deduce period

A displacement wave is represented by y = 0.25 xx 10^-3 sin ( 500 t - 0.025 x) . Deduce amplitude

The equation of a simple harmonic wave is given by y=3 sin pi/2 (50 t-x) where x and y are in mtres and t is in seconds.The ratio of maximum particle velocity to the wave velocity is :

A displacement wave is represented by y = 0.25 xx 10^-3 sin ( 500 t - 0.025 x) . Deduce wavelength

A displacement wave is represented by y = 0.25 xx 10^-3 sin ( 500 t - 0.025 x) . Deduce angular frequency

The motion of a particle executing simple harmonic motion is described by the displacement function, x(t) = A cos (omegat + phi) . If the initial (t = 0) position of the particle is 1 cm and its initial velocity is omega cm//s , what are its amplitude and initial phase angle ? The angular frequency of the particle is pi s^-1 s If instead of the cosine function, we choose the sine function to describe the SHM : x= B sin (omegat+alpha) , what are the amplitude and initial phase of the particle with the above initial conditions.