When two progressive waves y_1=4 sin (2 x-6 t | vedclass

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(A) The given equations of the two progressive waves are $y_1 = 4 \sin(2x - 6t)$ and $y_2 = 3 \sin(2x - 6t - \pi/2)$.Comparing these with the standard

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$5$

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(A) The given equations of the two progressive waves are $y_1 = 4 \sin(2x - 6t)$ and $y_2 = 3 \sin(2x - 6t - \pi/2)$.Comparing these with the standard form $y = A \sin(\omega t - kx + \phi)$,we get amplitudes $A_1 = 4$ and $A_2 = 3$.The phase difference between the two waves is $\Delta\phi = \pi/2$.The resultant amplitude $A$ of two superimposed waves is given by the formula $A = \sqrt{A_1^2 + A_2^2 + 2A_1A_2 \cos(\Delta\phi)}$.Substituting the values,$A = \sqrt{4^2 + 3^2 + 2(4)(3) \cos(\pi/2)}$.Since $\cos(\pi/2) = 0$,we have $A = \sqrt{16 + 9 + 0} = \sqrt{25} = 5$.

When two progressive waves $y_1=4 \sin (2 x-6 t)$ and $y_2=3 \sin \left(2 x-6 t-\frac{\pi}{2}\right)$ are superimposed,the amplitude of the resultant wave is

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