Home
Class 12
PHYSICS
A travelling wave represented by y=Asi...

A travelling wave represented by
`y=Asin (omegat-kx)`
is superimposed on another wave represented by
`y=Asin(omegat+kx).` The resultant is

A

A wave travelling along `+ x` direction

B

A wave travelling along `- x` direction

C

A standing wave having nodes at `x = (nlambda)/(2), n = 0, 1, 2 …..`

D

A standing wave having nodes at `x = (n + (1)/(2))(lambda)/(2), n = 0, 1, 2 …..`

Text Solution

Verified by Experts

The correct Answer is:
4
`Y = A sin (omegat - kx) + A sin(omegat + kx)`
`Y = 2A sinomegat coskx` standing wave
For nodes `coskx = 0`
`(2pi)/(lambda).x = (2n + 1)(pi)/(2)`
`:. x = ((2n + 1)lambda)/(4), n = 0,1,2,3,….`
Promotional Banner

Topper's Solved these Questions

  • WAVE ON STRING

    RESONANCE|Exercise Exercise- 3 PART I|19 Videos

  • WAVE ON STRING

    RESONANCE|Exercise Exercise- 2 PART IV|9 Videos

  • TRAVELLING WAVES

    RESONANCE|Exercise Exercise- 3 PART II|7 Videos

  • WAVE OPTICS

    RESONANCE|Exercise Advanced Level Problems|8 Videos

Similar Questions

Explore conceptually related problems

If light wave is represented by the equation y = A sin (kx - omega t) . Here y may represent

A wave is represented by the equation y = a sin(kx - omega t) is superimposed with another wave to form a stationary wave such that the point x = 0 is a node. Then the equation of other wave is :-

A wave is represente by y = Asin^2 (kx - omegat + phi) . The amplitude and wavelength of wave is given by

The two waves represented by y_1=a sin (omegat) and y_2=b cos (omegat) have a phase difference of

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

A wave represented by the equation y=acos(kx-omegat) is superposed with another wave to form stationary wave such that the point x=0 is a node. The equation for the other wave is:

A wave representing by the equation y = a cos(kx - omegat) is superposed with another wave to form a stationary wave such that x = 0 is a node. The equation for the other wave is