In `y=A"sin"omegat + A"sin"(omegat=(2pi)/(3))`, match the following.

In y= A sin omega t + A sin ( omega t+(2 pi )/3) match the following table.

In the equation y=Asin(omegat+pi/4) match the following for x= A/2 .

Two waves represented by y=a" "sin(omegat-kx) and y=a" " sin(omegat-kx+(2pi)/(3)) are superposed. What will be the amplitude of the resultant wave?

A particle is subjected to two mutually perpendicular simple harmonic motions such that its X and y coordinates are given by X=2 sin omegat , y=2 sin (omega+(pi)/(4)) The path of the particle will be:

If two waves represented by y_(1)=4sinomegat and y_(2)=3sin(omegat+(pi)/(3)) interfere at a point find out the amplitude of the resulting wave

Two SHMs directed along x-axis and y-axis are superimposed on a particle of mass m. If x=A_1sinomegat and y= A_2 sin(omegat+pi),then path of the particle will be.

Find the displacement equation of the simple harmonic motion obtained by conbining the motions. x_(1)=2 "sin "omegat,x_(2)=4 "sin "(omegat+(pi)/(6)) and x_(3)=6 "sin" (omegat+(pi)/(3))

A x and y co-ordinates of a particle are x=A sin (omega t) and y = A sin(omegat + pi//2) . Then, the motion of the particle is

Two waves represented by y=a" "sin(omegat-kx) and y=a" " sin(omega-kx+(2pi)/(3)) are superposed. What will be the amplitude of the resultant wave?

Two sinusoidal waves are superposed. Their equations are y_(1)=Asin(kx-omegat+(pi)/(6))and y_(2)=Asin(kx-omegat-(pi)/(6)) the equation of their resultant is