A schematic of a Michelson interferometer, used for the measurement of refractive index of gas, is shown in the figure. The transparent chamber is filled with a gas of refractive index $n_g$, where $n_g \neq 1$, at atmospheric pressure. If a 532 nm laser beam produces 30 interference fringes on the screen, then the number of fringes produced by a 632.8 nm laser beam will be ________ (rounded off to one decimal place).Note: Assume that the effect of beamsplitter width is negligible. The setup is placed in air medium with refractive index equal to 1.
Show Hint
The number of interference fringes produced in a Michelson interferometer is directly proportional to the optical path difference and inversely proportional to the wavelength of the light source.
Step 1: Determine the change in optical path difference ($\Delta L$).
The change in optical path length due to the gas in the 2 cm chamber (traversed twice) is $\Delta L = 2 \times 2 \times (n_g - 1) = 4(n_g - 1)$ cm. Step 2: Relate the number of fringes to the change in optical path difference and wavelength for the first laser.
$\Delta N_1 = \frac{\Delta L}{\lambda_1} \implies 30 = \frac{4(n_g - 1)}{532 \times 10^{-9} \, \text{m}}$
$\Delta L = 30 \times 532 \times 10^{-9} \, \text{m} = 15960 \times 10^{-9} \, \text{m}$ Step 3: Calculate the number of fringes for the second laser.
$\Delta N_2 = \frac{\Delta L}{\lambda_2} = \frac{15960 \times 10^{-9} \, \text{m}}{632.8 \times 10^{-9} \, \text{m}} = \frac{15960}{632.8} \approx 25.22124$ Step 4: Round off the result to one decimal place.
$\Delta N_2 \approx 25.2$
