The waves, whose equations are
`y_(1)=4xx10^(-3)sin(308pix-(x)/(50)) and y_(2)=1xx10^(-3)sin(302pit-(x)/(50))`
ar superposed in a medium. Now,

Two waves, whose equations are y_(1)=4sin(20t-(x)/(3))m and y_(2)=3sin(20t-(x)/(3)) m, are superposed in a medium. Now,

The two waves are represented by y_(1) 10^(-6) sin(100t (x)/(50) 0.5)m Y_(2) 10^(-2) cos(100t (x)/(50))m where x is ihn metres and t in seconds. The phase difference between the waves is approximately:

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

y_(t)=2sin3pit y_(2)=2sin(3pit-(pi)/(8)) The wave velocity is

The phase difference between two waves represented by y_(1)=10 ^(-6) sin [100 t+(x//50)+0.5]m, y_(2)=10^(-6) cos[100t+(x//50)]m where x is expressed in metres and t is expressed in seconds, is approximately

Two waves are represented by: y_(1)=4sin404 pit and y_(2)=3sin400 pit . Then :

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 ………… .

The simple harmonic motions are represented by the equations: y_(1)=10sin((pi)/(4))(12t+1), y_(2)=5(sin3pit+sqrt(3)))

Stationary waves are set up by the superposition of two waves given by y_(1)=0.05sin(5pit-x) and y_(2)=0.05sin(5pit+x) where x and y are in metres and t is second. Find the displacement of a particle situated at a distance x=1m.