The stationary wave`y = 2a sin kx cos omega t` in a closed organ pipe is the result of the superposition of `y = a sin (omega t - kx)`

The stationary wave y = 2a sinkx cos omega t in a stretched string is the result of superposition of y_(1)=a sin(kx-omegat) and

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

A stationary wave is set up in a string fixed at both ends.Which of the following cannot represent stationary wave equation (a) "y=A sin kx cos omega t , (b) y=A cos kx cos omega t , (c) y=A sin kx sin omega t , (d) y=A cos kx sin omega t .

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

In the equation y= a sin (omega t+ kx) t and x stand for time and distance respectively. What are the dimensions of omega//k ?

Which of the following travelling wave will produce standing wave , with nodes at x = 0 , when superimosed on y = A sin ( omega t - kx)

Which of the following equations can form stationary waves? (i) y= A sin (omegat - kx) (ii) y= A cos (omegat - kx) (iii) y= A sin (omegat + kx) (iv) y= A cos (omegat - kx) .

In a stationary wave represented by y = a sin omegat cos kx , amplitude of the component progerssive wave is

In a stationary wave represented by y = a sin omegat cos kx , amplitude of the component progerssive wave is