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Question
In a Young’s double-slit experiment, two waves each of intensity I superpose each other and produce an interference pattern. Prove that the resultant intensities at maxima and minima are 4 I and zero respectively.
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Solution
Given: I1 = I2 = I
Interference occurs due to the superposition of wave amplitudes. The resultant intensity at a point depends on the phase difference between the interfering waves.
Resultant intensity (IR) = `I_1 + I_2 + 2 sqrt(I_1 I_2) cos phi`
= 2I + 2I cos Φ
= 2I(1 + cos Φ)
= `2I(2 cos^2 (theta/2))` ...[1 + cos Φ = 2 cos2(Φ/2)]
= `4I cos^2 (theta/2)` ...(i)
For Maxima (Constructive Interference), Phase difference (Φ) = 2nπ.
∴ `cos(theta/2)` = ±1
Putting these values in equation (i), we get:
Imax = 4I(1)2 = 4I
For Minima (Destructive Interference), Phase difference (Φ) = (2n + 1)π.
∴ `cos(theta/2)` = 0
Putting these values in equation (i), we get:
Imin = 4I(0)2 = 0
∴ The intensity at maxima is 4I and at minima is 0, as required.
