MCQMediumJEE 2025Interference (Young's Experiment)

JEE Physics 2025 Question with Solution

The width of one of the two slits in Young's double-slit experiment is dd while that of the other slit is xdxd. If the ratio of the maximum to the minimum intensity in the interference pattern on the screen is 9:49 : 4, then what is the value of xx?

(Assume that the field strength varies according to the slit width.)

  • A

    22

  • B

    33

  • C

    55

  • D

    44

Answer

Correct answer:C

Step-by-step solution

Standard Method

Given: The slit widths are dd and xdxd. The ratio of maximum to minimum intensity is ImaxImin=94\frac{I_{\text{max}}}{I_{\text{min}}} = \frac{9}{4}.

Find: The value of xx.

If the field amplitude is proportional to slit width, then the amplitudes from the two slits are proportional to dd and xdxd.

So, for interference,

Imax(d+xd)2=d2(1+x)2I_{\text{max}} \propto (d + xd)^2 = d^2(1+x)^2

and

Imin(dxd)2=d2(1x)2I_{\text{min}} \propto (d - xd)^2 = d^2(1-x)^2

Therefore,

ImaxImin=(1+x)2(1x)2=94\frac{I_{\text{max}}}{I_{\text{min}}} = \frac{(1+x)^2}{(1-x)^2} = \frac{9}{4}

Taking square root,

1+x1x=32\frac{1+x}{1-x} = \frac{3}{2}

Cross-multiplying,

2(1+x)=3(1x)2(1+x) = 3(1-x) 2+2x=33x2 + 2x = 3 - 3x 5x=15x = 1

So,

x=15x = \frac{1}{5}

The algebra extracted in the source solution gives 5x=15x = 1, which leads to x=15x = \frac{1}{5}. However, the same source concludes that the correct option is C and states the value of xx is 55. Following the solution's final conclusion, the correct option is C.

Source Discrepancy Note

The solution contains an internal inconsistency. In Approach Solution - 1, the steps shown are

(1+x)2(1x)2=94\frac{(1+x)^2}{(1-x)^2} = \frac{9}{4} 1+x1x=32\frac{1+x}{1-x} = \frac{3}{2} 2(1+x)=3(1x)2(1+x) = 3(1-x) 2+2x=33x2 + 2x = 3 - 3x 5x=15x = 1

which gives

x=15x = \frac{1}{5}

not 55.

Approach Solution - 2 also contains contradictory statements: it computes x=3x = 3 but then states the value of xx is 55.

Since the source explicitly marks The Correct Option is C, and the answer key also indicates option (3) 5, the extracted answer is recorded as C despite the inconsistent working.

Common mistakes

  • Using intensity directly proportional to slit width is incorrect here. The question states that field strength varies with slit width, so amplitude is proportional to slit width and intensity is proportional to the square of amplitude.

  • Writing Imaxd+xdI_{\text{max}} \propto d + xd and ImindxdI_{\text{min}} \propto d - xd is wrong because interference intensities depend on the square of the resultant amplitude. Use Imax(d+xd)2I_{\text{max}} \propto (d+xd)^2 and Imin(dxd)2I_{\text{min}} \propto (d-xd)^2 instead.

  • Making an algebra error after 2(1+x)=3(1x)2(1+x) = 3(1-x) is a common mistake. Expanding carefully gives 2+2x=33x2 + 2x = 3 - 3x and hence 5x=15x = 1. Always verify the final value against the marked option if the source appears inconsistent.

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