Two waves represented by `y_(i)=3sin(200x-150t) and y_(2)=3cos(200x-150t)` are superposed where x and y are in metre and t is in second. Calculate the amplitude of resultant wave

The equation of progressive wave is given by y=10sin[300pi(t-(x)/(480))] where x and y are in metre and t is in second. Calculate the amplitude frequency time period and wavelength of the wave.

The equation of progressive wave is given by y=10sin[300pi(t-(x)/(480))] where x and y are in metre and t is in second. Calculate the amplitude frequency time period and wavelength of the wave.

A wave is represented by the equation, y = 0.1 sin (60 t + 2x) , where x and y are in metres and t is in seconds. This represents a wave

Two waves are described by y_1 =0.30 sin [pi(5x-200t)] and y_2=0.30 sin [pi(5x-200t)+pi//3] where y_1,y_2 and x are in meters and t is in seconds. When these two waves are combined, a traveling wave is produced. What are the (a) amplitude, (b) wave speed, and (c) wave length of that traveling wave ?

A standing wave is represented by, y=Asin(100t)cos(0.01x) , where x,y and A are in millimeter and t in second. The velocity of the wave is

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 .

A tavelling harmonic wave is represented by the equation y(x,t)=10^(-3) sin (50t+2x), where x and Y are in meter and t is in seconds . Which of the following is a correct statement about the wave?

A tavelling harmonic wave is represented by the equation y(x,t)=10^(-3) sin (50t+2x), where x and Y are in meter and t is in seconds . Which of the following is a correct statement about the wave?

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: