With the help of a diagram, explain the working of Michelson interferometer. Explain how Michelson interferometer can be used for determining the refractive index of a thin plate.
Answer:-
"\\bigstar" Monochromatic fringes are used and plates ranging in thickness from a few micrometres to several millimetres may be measured.
Let us Consider the plate in one arm of the Michelson interferometer. Let the ray which is normal to the mirror M make an angle of incidence "\\phi_i" with the plate. The change in phase of the ray as it passes through the plate may be determined from considering below figure
The phase change in the ray in going from P to Q is
"\\dfrac{2\\pi n\\overline {PQ}}{\\lambda}=\\dfrac{2\\pi nd}{\\lambda cos\\phi_r}"
where,
"\\lambda:" is the wavelength of the monochromatic light
"n:" is the refractive index
"d:" is the thickness
"\\phi_r:" is the angle of refraction
The equivalent ray in the other arm of the interferometer will pass through a corresponding air thickness "\\overline{PS}" and suffer a phase change
"\\dfrac{2\\pi\\overline{PS}}{\\lambda}=\\dfrac{2\\pi d\\space cos(\\phi_i-\\phi_r)}{\\lambda\\space cos\\phi_r}"
Thus the phase difference between the two rays introduced by the plate is
"\\Delta=\\dfrac{2\\pi nd}{\\lambda\\space cos\\phi_r}-\\dfrac{2\\pi d\\space cos(\\phi_i-\\phi_r)}{\\lambda\\space cos\\phi_r}"
The factor 2 is required because the ray passes through the plate twice
When the plate is normal to the ray, "(\\phi_i=\\phi_r=0)"
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