The equation of the displacement of a wave is `y` (in cm)= `10(sqrt3 sin 2pit + cos 2pit)`. The amplitude of the wave is:

The displacement of a particle varies according to the relation x=4 (cos pit+ sinpit) . The amplitude of the particle is.

The equation of displacement of two waves are given as y_(1) = 10 sin( 3 pi t + (pi)/(3)) , y_(2) = 5 [ sin 3 pi t + sqrt(3) cos 3 pi t] Then what is the ratio of their amplitudes

The equation of displacement of two waves are given as y_(1) = 10 sin( 3 pi t + (pi)/(3)) , y_(2) = 5 [ sin 3 pi t + sqrt(3) cos 3 pi t] Then what is the ratio of their amplitudes

The equation of displacement of two waves are given as y_(1) = 10 sin( 3 pi t + (pi)/(3)) , y_(2) = 5 [ sin 3 pi t + sqrt(3) cos 3 pi t] Then what is the ratio of their amplitudes

A string fixed at both ends, oscillate in 4th harmonic. The displacement of particular wave is given as Y=2Asin(5piX)cos(100pit) . Then find the length of the string?

The equation of an alternating vottage is V = 100sqrt(2) sin 100pit volt. The RMS value of vollage and frequeny, will be respectively

The equation of a progressive wave can be given by Y = 15 sin ( 660pit- 0.02pix ) cm. The frequency of the wave is

Two simple harmonic motions are represented by the equations y_(1) = 10 sin(3pit + pi//4) and y_(2) = 5(sin 3pit + sqrt(3)cos 3pit) their amplitude are in the ratio of ………… .

Two SHW are represented by the equations x_1 = 20 sin [5pit +pi/4] and x_2 = 10 (sin5pit+sqrt(3) cos 5 pit] . The ratio of the amplitudes of the two motions is

The displacement of two interfering light waves are y_(1)=4 sin omega t" and "y_(2)= 3 cos (omega t) . The amplitude of the resultant waves is (y_(1)" and "y_(2) are in CGS system)