Statement I: In calculating the disturba...

Statement I: In calculating the disturbance produced by a pair of superimposed incoherent wave trians, you can add their intensities.
Statement II: `I_(1) + I_(2) + 2 sqrt(I_(1) I_(2)) cos delta`. The average value of `cos delta = 0` for incoherent waves.

Statement-1 is true Statemetnt-2 is True,Statement -2 is a correct explanation for statement -1.

Statement-1 is true Statemetnt-2 is True,Statement -2 is NOT a correct explanation for statement -1.

Statement -1 is true,statement -2 is false

Statement -1 is False ,statement -2 is True.

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The correct Answer is:

Average value of `(cos delta=underset(t)overset(t=T)intcos(phi_1-phi_2)dt)/T=0` Here `phi_1` and `phi_2` are constantly randomly, fluctuating phases of the two wave trains and integral is taken over a long time (relative to periods of the individual waves).

Statement I: In calculating the disturbance produced by a pair of superimposed incoherent wave trians, you can add their intensities.
Statement II: `I_(1) + I_(2) + 2 sqrt(I_(1) I_(2)) cos delta`. The average value of `cos delta = 0` for incoherent waves.

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Statement I: In calculating the disturbance produced by a pair of superimposed incoherent wave trians, you can add their intensities. Statement II: `I_(1) + I_(2) + 2 sqrt(I_(1) I_(2)) cos delta`. The average value of `cos delta = 0` for incoherent waves.

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Statement I: In calculating the disturbance produced by a pair of superimposed incoherent wave trians, you can add their intensities.
Statement II: `I_(1) + I_(2) + 2 sqrt(I_(1) I_(2)) cos delta`. The average value of `cos delta = 0` for incoherent waves.