[" The equation of a plane wave travelling along positive direction of "x" -axis is "y=asin(2 pi)/(lambda)(11-x)" When "],[" this wave is reflected at a rigid surface and its amplitude becomes "80%" ,then find the equation of the "],[" reflected wave."]

The equation of a plane wave travelling along positive direction of x- axis is y = asin"(2pi)/(lambda)(vt-x) When the wave is reflected at a rigid surface and its amplitude becomes 80% , then find the equation of the reflected wave.

The equation of a plane wave travelling along positive direction of x- axis is y = asin"(2pi)/(lambda)(vt-x) When the wave is reflected at a rigid surface and its amplitude becomes 80% , then find the equation of the reflected wave.

The equation of a wave is y=A sin (2pint) When it is reflected at a free end its amplitude becomes 90% The equation of the reflected wave is

The equation of a wave is y=A sin (2pint) When it is reflected at a free end its amplitude becomes 90% The equation of the reflected wave is

The equation of a progressive wave is y = 0.8 sin 4pi [t - (x)/(5)] When it is reflected at a rigid support its amplitude becomes ((3)/(4)) of its previous value. The equation of the reflected wave is

The equation of a plane progressive wave travelling along positive direction of x- axis is y=r sin [(2pit)/(T)-(2pix)/(lambda)] where y= displacement of particle at (x,t),r= amplitude of vibratio of particle, T= time period of wave motion, lambda= wavelength of wave , x= starting distance of wave from the origin. Velocity of wave, upsilon=vlambda=(lambda)/(T)= constant. Acceleration of wave, a=0 . Velocity of particle at time t=(dy)/(dt) Acceleration of particle at time t=(d^(2)y)/(dt^(2)) A harmonic wave travelling along positive direction of x axis is represented by y=0.25xx10^(-3)sin (500t-0.025x) where x and y are in metre and t is in second The amplitude of vibration of particle is

The equation of a plane progressive wave travelling along positive direction of x- axis is y=r sin [(2pit)/(T)-(2pix)/(lambda)] where y= displacement of particle at (x,t),r= amplitude of vibratio of particle, T= time period of wave motion, lambda= wavelength of wave , x= starting distance of wave from the origin. Velocity of wave, upsilon=vlambda=(lambda)/(T)= constant. Acceleration of wave, a=0 . Velocity of particle at time t=(dy)/(dt) Acceleration of particle at time t=(d^(2)y)/(dt^(2)) Amplitude of particle velocity is

The equation of a plane progressive wave travelling along positive direction of x- axis is y=r sin [(2pit)/(T)-(2pix)/(lambda)] where y= displacement of particle at (x,t),r= amplitude of vibratio of particle, T= time period of wave motion, lambda= wavelength of wave , x= starting distance of wave from the origin. Velocity of wave, upsilon=vlambda=(lambda)/(T)= constant. Acceleration of wave, a=0 . Velocity of particle at time t=(dy)/(dt) Acceleration of particle at time t=(d^(2)y)/(dt^(2)) Velocity of wave is

The equation of a plane progressive wave travelling along positive direction of x- axis is y=r sin [(2pit)/(T)-(2pix)/(lambda)] where y= displacement of particle at (x,t),r= amplitude of vibratio of particle, T= time period of wave motion, lambda= wavelength of wave , x= starting distance of wave from the origin. Velocity of wave, upsilon=vlambda=(lambda)/(T)= constant. Acceleration of wave, a=0 . Velocity of particle at time t=(dy)/(dt) Acceleration of particle at time t=(d^(2)y)/(dt^(2)) Time period of wave motion is