Which two of the given transverse waves ...

Which two of the given transverse waves will give stationary waves then get superimposed?
`z_1=acos(kx-omegat)` .(A)
`z_2=acos(kx-omegat)` .(B)
`z_3=acos(ky-omegat)` .(C )

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Which two of the given transverse waves will give stationary wave when get superimposed? z_(1) = a cos (kx-omegat) " "(A) z_(2) = a cos (kx +omegat) " "(B) z_(3) = a cos (ky - omegat) " "(C )

Which two of the given transverse waves will give stationary waves when get superimposed z_(1) =a cos (kx- omega t) " " .....(A) z_(2) =a cos (kx+ omega t) " " .....(B) z_(3) =a cos (kx- omega t) " " .....(C)

Which of the following equations can form stationary waves? (i) y= A sin (omegat - kx) (ii) y= A cos (omegat - kx) (iii) y= A sin (omegat + kx) (iv) y= A cos (omegat - kx) .

The following equations represent progressive transverse waves z_(1) = A cos ( omega t - kx) z_(2) = A cos ( omega t + kx) z_(3) = A cos ( omega t + ky) z_(4) = A cos (2 omega t - 2 ky) A stationary wave will be formed by superposing

The following equations represent transverse waves : z_(1) = A cos(kx - omegat) , z_(2) = A cos (kx + omegat) , z_(3) = A cos (ky - omegat) Identify the combination (s) of the waves which will produce (i) standing wave(s), (ii) a wave travelling in the direction making an angle of 45^(@) with the positive x and positive y axes. In each case, find the positions at which the resultant intensity is always zero.

Which two of the given transverse waves will give stationary waves then get superimposed? `z_1=acos(kx-omegat)` .(A) `z_2=acos(kx-omegat)` .(B) `z_3=acos(ky-omegat)` .(C )

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Which two of the given transverse waves will give stationary waves then get superimposed?
`z_1=acos(kx-omegat)` .(A)
`z_2=acos(kx-omegat)` .(B)
`z_3=acos(ky-omegat)` .(C )