MCQEasyJEE 2025Interference (Young's Experiment)

JEE Physics 2025 Question with Solution

Young's double slit interference apparatus is immersed in a liquid of refractive index 1.441.44. It has slit separation of 1.5mm1.5 \, \text{mm}. The slits are illuminated by a parallel beam of light whose wavelength in air is 690nm690 \, \text{nm}. The fringe-width on a screen placed behind the plane of slits at a distance of 0.72m0.72 \, \text{m}, will be:

  • A

    0.33mm0.33 \, \text{mm}

  • B

    0.23mm0.23 \, \text{mm}

  • C

    0.46mm0.46 \, \text{mm}

  • D

    0.63mm0.63 \, \text{mm}

Answer

Correct answer:A

Step-by-step solution

Standard Method

Given:

  • Refractive index of liquid = 1.441.44
  • Slit separation = d=1.5mmd = 1.5 \, \text{mm}
  • Wavelength in air = λ=690nm\lambda = 690 \, \text{nm}
  • Distance of screen from slits = D=0.72mD = 0.72 \, \text{m}

Find: The fringe width β\beta.

In a Young's double slit experiment, the fringe width is given by

β=λDd\beta = \frac{\lambda D}{d}

where λ\lambda is the wavelength in the medium.

The wavelength in the liquid is

λ=λn\lambda' = \frac{\lambda}{n}

Substituting n=1.44n = 1.44,

λ=690×1091.44=479.17nm\lambda' = \frac{690 \times 10^{-9}}{1.44} = 479.17 \, \text{nm}

Now,

β=479.17×109×0.721.5×103=0.33mm\beta = \frac{479.17 \times 10^{-9} \times 0.72}{1.5 \times 10^{-3}} = 0.33 \, \text{mm}

Therefore, the fringe width is 0.33mm0.33 \, \text{mm} and the correct option is A.

Step-by-Step Calculation

Given: A Young's double slit interference apparatus is immersed in a liquid of refractive index 1.441.44. The slit separation is d=1.5mmd = 1.5 \, \text{mm}, the wavelength in air is λair=690nm\lambda_{\text{air}} = 690 \, \text{nm}, and the screen is at L=0.72mL = 0.72 \, \text{m}.

Find: The fringe width on the screen.

Step 1: Determine the effective wavelength in the liquid.

λmedium=λairn\lambda_{\text{medium}} = \frac{\lambda_{\text{air}}}{n}

So,

λliquid=690nm1.44=479.17nm\lambda_{\text{liquid}} = \frac{690 \, \text{nm}}{1.44} = 479.17 \, \text{nm}

Step 2: Use the formula for fringe width.

β=λliquidLd\beta = \frac{\lambda_{\text{liquid}} L}{d}

Substituting the values,

β=479.17×109m×0.72m1.5×103m=0.33mm\beta = \frac{479.17 \times 10^{-9} \, \text{m} \times 0.72 \, \text{m}}{1.5 \times 10^{-3} \, \text{m}} = 0.33 \, \text{mm}

Therefore, the fringe width is 0.33mm0.33 \, \text{mm}. Hence, the correct option is A.

Common mistakes

  • Using the wavelength in air directly in the fringe-width formula is incorrect because the apparatus is immersed in a liquid. First convert the wavelength using λ=λn\lambda' = \frac{\lambda}{n}.

  • Mixing units of mm, nm, and m without proper conversion leads to wrong numerical values. Keep all quantities in consistent units before substitution.

  • Confusing slit separation dd with screen distance DD gives an incorrect ratio in β=λDd\beta = \frac{\lambda D}{d}. Use screen distance in the numerator and slit separation in the denominator.

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