NVAEasyJEE 2026Interference (Young's Experiment)

JEE Physics 2026 Question with Solution

In two separate Young's double-slit experimental set-ups and two monochromatic light sources of different wavelengths are used to get fringes of equal width. The ratios of the slits separations and that of the wavelengths of light used are 2:12:1 and 1:21:2 respectively. The corresponding ratio of the distances between the slits and the respective screens (D1/D2D_1/D_2) is _____.

Answer

Correct answer:4

Step-by-step solution

Standard Method

Given: Fringe widths in the two YDSE set-ups are equal. Also, d1/d2=2/1d_1/d_2 = 2/1 and λ1/λ2=1/2\lambda_1/\lambda_2 = 1/2.

Find: The ratio D1/D2D_1/D_2.

Using the fringe width relation:

β=λDd\beta = \frac{\lambda D}{d}

Since the fringe widths are equal,

λ1D1d1=λ2D2d2\frac{\lambda_1 D_1}{d_1} = \frac{\lambda_2 D_2}{d_2}

Rearranging,

D1D2=(λ2λ1)(d1d2)\frac{D_1}{D_2} = \left(\frac{\lambda_2}{\lambda_1}\right) \left(\frac{d_1}{d_2}\right)

Now,

λ2λ1=21,d1d2=21\frac{\lambda_2}{\lambda_1} = \frac{2}{1}, \qquad \frac{d_1}{d_2} = \frac{2}{1}

Therefore,

D1D2=2×2=4\frac{D_1}{D_2} = 2 \times 2 = 4

Hence, the required ratio is 44.

Common mistakes

  • Using the fringe width formula incorrectly as βd\beta \propto d instead of β1/d\beta \propto 1/d. This reverses the effect of slit separation. Always use β=λDd\beta = \frac{\lambda D}{d}.

  • Substituting λ1/λ2=1/2\lambda_1/\lambda_2 = 1/2 directly in place of λ2/λ1\lambda_2/\lambda_1 after rearrangement. Once the equation is solved for D1/D2D_1/D_2, take the reciprocal carefully before substituting.

  • Forgetting that equal fringe width means β1=β2\beta_1 = \beta_2 and not comparing only wavelengths or only slit separations. Use the complete relation involving λ\lambda, DD, and dd together.

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