In a wave motion `y = sin (kx - omega t),y` can represent :-

In a wave motion y = a sin (kx - omegat) , y can represent

In a wave motion y= a sin(kx-omegat) , y can represent: (a) electric field , (b) magnetic field , (c) displacement , (d) pressure

If light wave is represented by the equation y = A sin (kx - omega t) . Here y may represent

Equation y=y_(0) sin (Kx+omega t) represents a wave :-

In a wave equation, given by y = A sin (omega t - Kx), y cannot represent

The equation y=A sin^2 (kx-omega t) represents a wave with

A wave is represented by the equation y = a sin(kx - omega t) is superimposed with another wave to form a stationary wave such that the point x = 0 is a node. Then the equation of other wave is :-

A transverse wave travelling along the positive x-axis, given by y=A sin (kx - omega t) is superposed with another wave travelling along the negative x-axis given by y=A sin (kx + omega t) . The point x=0 is

Let the two waves y_(1) = A sin ( kx - omega t) and y_(2) = A sin ( kx + omega t) from a standing wave on a string . Now if an additional phase difference of phi is created between two waves , then

Statement-1 : The superposition of the waves y_(1) = A sin(kx - omega t) and y_(2) = 3A sin (kx + omega t) is a pure standing wave plus a travelling wave moving in the negative direction along X-axis Statement-2 : The resultant of y_(1) & y_(2) is y=y_(1) + y_(2) = 2A sin kx cos omega t + 2A sin (kx + omega t) .