Equation for two waves is given as `y_(1)=asin(omegat+phi_(1)), y_(2)=asin(omegat+phi_(2))`.
If ampitude and time period of resultant wave does not change, then calculate `(phi_(1)-phi_(2))`.

Equations of two progressive wave are given by y_(1) = asin (omega t + phi_(1)) and y_(2) = a sin (omegat + phi_(2)) . IF amplitude and time period of resultant wave is same as that of both the waves, then (phi_(1)-phi_(2)) is

Equations of two progressive waves at a certain point in a medium are given by, y_1 =a_1 sin ( omega t+phi _1) and y_ 1 =a_2 sin (omegat+ phi _2) If amplitude and time period of resultant wave formed by the superposition of these two waves is same as that of both the waves,then phi _ 1-phi _2 is

Equations of two progressive waves at a certain point in a medium are given by, y_1 =a_1 sin ( omega t+phi _1) and y_ 1 =a_2 sin (omegat+ phi _2) If amplitude and time period of resultant wave formed by the superposition of these two waves is same as that of both the waves,then phi _ 1-phi _2 is

y(xt)=asin(kx-omegat+phi) represents a

y(xt)=asin(kx-omegat+phi) represents a

Two waves are given by y_(1)=asin(omegat-kx) and y_(2)=a cos(omegat-kx) . The phase difference between the two waves is -

Two waves are given by y_(1)=asin(omegat-kx) and y_(2)=a cos(omegat-kx) . The phase difference between the two waves is -

Two waves are given by y_(1)=asin(omegat-kx) and y_(2)=a cos(omegat-kx) . The phase difference between the two waves is -

x_(1)=A sin (omegat-0.1x) and x_(2)=A sin (omegat-0.1 x-(phi)/2) Resultant amplitude of combined wave is

Equation of motion in the same direction is given by y_1=Asin(omegat-kx) , y_2=Asin(omegat-kx-theta) . The amplitude of the medium particle will be