MCQEasyJEE 2023Diffraction & Polarisation

JEE Physics 2023 Question with Solution

nn’ polarizing sheets are arranged such that each makes an angle 4545^\circ with the preceding sheet. An unpolarized light of intensity II is incident into this arrangement. The output intensity is found to be I64\frac{I}{64}. The value of nn will be:

  • A

    33

  • B

    66

  • C

    55

  • D

    44

Answer

Correct answer:A

Step-by-step solution

Standard Method

Given: Unpolarized light of intensity II is incident on nn polarizing sheets, and each successive sheet makes an angle 4545^\circ with the preceding sheet.

Find: The value of nn when the final intensity is I64\frac{I}{64}.

After passing through the first sheet,

I1=I2I_1 = \frac{I}{2}

After passing through the second sheet,

I2=I1cos2(45)=I4I_2 = I_1 \cos^2(45^\circ) = \frac{I}{4}

After passing through nnth sheet,

In=I2n=I64I_n = \frac{I}{2^n} = \frac{I}{64}

So,

2n=64=262^n = 64 = 2^6

Hence,

n=6n = 6

Therefore, the computed value is 66. The solution states the correct option is A, but this conflicts with the listed options; among the given options, 66 corresponds to option B.

Step-by-step Working

Given: Each polarizer is inclined by 4545^\circ relative to the previous one.

Find: Number of sheets required so that output intensity becomes I64\frac{I}{64}.

For unpolarized light, the first polarizer transmits half the intensity:

I1=I2I_1 = \frac{I}{2}

For every next sheet at angle 4545^\circ,

cos245=12\cos^2 45^\circ = \frac{1}{2}

So each additional sheet again multiplies intensity by 12\frac{1}{2}. Therefore after nn sheets,

In=I2nI_n = \frac{I}{2^n}

Given,

I2n=I64\frac{I}{2^n} = \frac{I}{64}

Cancelling II,

2n=642^n = 64

Now,

64=2664 = 2^6

Thus,

n=6n = 6

Therefore, the correct option from the given options is B.

Common mistakes

  • Taking the first polarizer to transmit intensity II instead of I2\frac{I}{2}. This is wrong because unpolarized light loses half its intensity at the first polarizer. Start with I1=I2I_1 = \frac{I}{2}.

  • Applying Malus' law with the wrong angle. The angle is between successive transmission axes, not between the light direction and the sheet. Use cos245=12\cos^2 45^\circ = \frac{1}{2} for each successive sheet.

  • Assuming only the second sheet reduces the intensity by 12\frac{1}{2} and not extending the same factor to all later sheets. Since every adjacent pair is at 4545^\circ, each additional sheet contributes the same multiplicative factor.

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