A wave `y = a sin (omega t - kx)` being superposed with another wave produces a node at x = 0. The equation of the second wave should be

A wave represented by the equation y = A cos (ks - omega t) superposes on another wave to produce a stationary wave with a node at s = 0 . What is the equation of this second wave ?

The equation of a progressive wave is y = A cos (kx - omega t) . This wave superposes with another wave and produces a stationary wave try creating a node at x = 0 . Which of the following equations is correct for the other wave ?

y = A sin(omega t- kx) Cm this equation find out the dimension of omega ?

The resultant displacement due to superposition of two identical progressive waves is y = 5 cos ( 0 . 2 pi x) sin (64 pi t ) , where x , y are in cm and t is in sec . Find the equations of the two superposing waves .

The equation of vibration of a 60 cm long string string stretched at both ends is given by y = 4 "sin" (pi x)/(15) "cos" 96 pi t . Here x and y are expressed in cm and t in s . What are the equations of the two superposed waves ?

Two waves represented as y_(1) = A_(1) sin omega t and y_(2) = A_(2) cos omega t superpose at a point in space. Find out the amplitude of the resultant wave at that point .

Two travelling waves superpose to form a stationary wave whose equation is y (x,t) = 5 sin (0. 1 pi x) cos 50 pi t where x, y are in cm and t is in x . Find the equations of the two superposing travelling waves .

When the waves y_(1) = A sin omega t and y_(2) = A cos omega t are superposed, then resultant amplitude will be

The equation of a stationary wave is y = 2 A sin k x cos omega t . Find the amplitudes, velocities and wavelengths of the two progressive waves, which on superposition produce this stationary wave .

The equation of the progressive wave is y = 5 sinpi//2(100t-x) cm. The frequeny of the wave is---