The equation `vec(phi)(x,t)=vec(j)sin ((2pi)/(lambda)vt)cos ((2 pi)/(lambda)x)` represents

The equation of the stationary wave is y = 2 A sin (( 2 pi c t)/( lambda)) cos (( 2 pi x)/( lambda)) Which of the following statements is wrong?

If a wave is represented by the following equation y=A cos (2pix)/(lambda) sin (2pivt)/(lambda) then it is a :

The equation y=A cos^(2) (2pi nt -2 pi (x)/(lambda)) represents a wave with

A simple harmonic wave is represent by the relation y(x,t)=a_(0) sin 2pi(vt-(x)/(lambda)) if the maximum particle velocity is three times the wave velocity, the wavelength lambda of the wave is

Two sound waves (expressed in CGS units) given by y_(1)=0.3 sin (2 pi)/(lambda)(vt-x) and y_(2)=0.4 sin (2 pi)/(lambda)(vt-x+ theta) interfere. The resultant amplitude at a place where phase difference is pi //2 will be

A traverse wave is repersented by the equation y=y_(0)sin(2pi)/(lambda)(vt-x) For what value of lambda the maximumn particle velocity equal to two times the wave velocity

Show that the equation y=a sin (2pi nt-(2pi)/lambda x) respresents a progressive wave of velocity C given by C=n lambda .

Two waves are passing through a region in the same direction at the same time . If the equation of these waves are y_(1) = a sin ( 2pi)/(lambda)( v t - x) and y_(2) = b sin ( 2pi)/( lambda) [( vt - x) + x_(0) ] then the amplitude of the resulting wave for x_(0) = (lambda//2) is