In a stationary wave represented by `y=4sin(omega t) cos(kx)` cm, the amplitude of the component progressive wave is

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

In a stationary wave respresented by y=2acos(kx)sin(omegat) the intensity at a certain point is maximum when

The equation of a stationary a stationary wave is represented by y=4sin((pi)/(6)x)(cos20pit) when x and y are in cm and t is in second. Wavelength of the component waves is

In the stationary wave equation which part represents the variation in the amplitude.

y_(1)=Asin(omegat-kx)&y_(2)=Asin(omegat-kx+delta) : these two equations are representing two waves. Then the amplitude of the resulting wave is

Consider a wave rpresented by y= a cos^(2) (omega t-kx) where symbols have their usual meanings. This wave has

The displacement of a progressive wave is represented by y = A sin (omegat - kx), where x is distance and t is time. Write the dimensional formula of (i) omega and (ii) k.

The displacement of two interfering light waves are y_(1)=4 sin omega t" and "y_(2)= 3 cos (omega t) . The amplitude of the resultant waves is (y_(1)" and "y_(2) are in CGS system)

Two waves represented by y=asin(omegat-kx) and y=acos(omegat-kx) are superposed. The resultant wave will have an amplitude.

The equation of a stationary wave is represented by y=2sin((2pix)/(3))sin(3pit) Where y and x are in metre and t is in second. Calculate amplitude, frequency, wavelength and velocity of the component waves whose superposition has produced these vibrations.