The number of beats produced per second by two vibrations: `x_(1) = x_(0) sin 646 pi t` and `x_(2) = x_(0) sin 652 pi t` is

Find the number of beats produced per sec by the vibrations x_1=A sin (320 pi t) and x_2=A sin(326 pi t) .

Find the number of beats produced per sec by the vibrations x_1=A sin (320 pi t) and x_2=A sin(326 pi t) .

Two vibrating tuning forks produce waves whose equation is given by y_(1) = 5 sin (240 pi t) and y_(2) = 4 sin (244 pi t) . Compute the number of beats per second .

Two vibrating tuning forks produce progressive waves given by y, y _(1) = 4 sin 500 pi t and y _(2) = 2 sin 506 pi t. Number of beats produced per minute is ......

Beats are produced by two waves y_(1) = a sin 2000 pi t and y_(2) = a sin 2008 pi t The number of beats heard per second is

Two vibrating tuning forks produce progressive waves given be y_(1) = 4 sin 500 pi t and y_(2) = 2 sin 506 pi t where t is in seconds number of beats produced per minute is ………..

Find the amplitude of the harmonic motion obtained by combining the motions x_(1) = (2.0 cm) sin omega t and x_(2) = (2.0 cm) sin (omega t + pi//3) .

A particle is subjected to two simple harmonic motions given by x_(1) = 2.0sin (100 pi t) and x_(2) = 2.0sin (120pi t + pi //3) where, x is in cm and t in second. Find the displacement of the particle at (a) t = 0.0125 , (b) t = 0.025 .