Home
Class 12
PHYSICS
Consider the three waves z(1), z(2) "and...

Consider the three waves `z_(1), z_(2) "and" z_(3)` as
`z_(1) = A "sin"(kx - omega t)`
`z_(2) = A "sin"(kx + omega t)`
`z_(3) = A "sin"(ky - omega t)`
Which of the following represents a standing wave?

A

`z_(1)+z_(2)`

B

`z_(2)+z_(3)`

C

`z_(3)+z_(1)`

D

`z_(1)+z_(2)`

Text Solution

Verified by Experts

The correct Answer is:
A
Promotional Banner

Similar Questions

Explore conceptually related problems

Which two of the following waves are in the same phase? y= A sin (kx -omega t ) y=A sin (kx -omega t+pi ) y= A sin (kx -omegat+ pi //2) y=A sin (kx -omega t +2pi )

For z=2+3i, verify the following: bar bar z = z

Two waves are represented by y_(1)= a sin (omega t + ( pi)/(6)) and y_(2) = a cos omega t . What will be their resultant amplitude

when two displacements represented by y_(1) = a sin(omega t) and y_(2) = b cos (omega t) are superimposed the motion is

Two waves y_(1) =A_(1) sin (omega t - beta _(1)), y_(2)=A_(2) sin (omega t - beta_(2) Superimpose to form a resultant wave whose amplitude is

For z=2+3i, verify the following: (z+ bar z ) is real

For z=2+3i, verify the following: z bar z = abs(z)^2

The displacement of the interfaring light waves are y_1 =4 sin omega t and y_2=3sin (omegat +(pi)/( 2)) What is the amplitude of the resultant wave?

The stationary wave y = 2a sin kx cos omega t in a closed organ pipe is the result of the superposition of y = a sin (omega t - kx)