Answer to Question #181396 in Optics for Sneha

Young's Double Slit Experiment (YDSE)

"\\bull" For an interference pattern to be observable,

• The waves must be of the same type and must meet at a point.
• The waves are coherent, i.e. the waves from each source maintain a constant phase difference.
• The waves must have the same wavelength and roughly the same amplitude.
• The waves must be both either unpolarised or have the same plane of polarisation.

"\\bull" Two sources are said to be coherent

if waves from the sources have a constant phase difference between them.

"\\bull" Young’s Double Slit Experiment A simple experiment of the interference of light was demonstrated by Thomas Young in 1801.

"\\bull" It provides solid evidence that light is a wave.

Interference fringes consisting of alternately bright and dark fringes (or bands) which are equally spaced are observed. These fringes are actually images of the slit.

At O, a point directly opposite the mid-point between S1 and S2, the path difference between waves"S_2O \u2013 S_1O" is zero.

Thus constructive interference occurs and the central fringe or maxima is bright.

Suppose P is the position of the nth order bright fringe (or maxima). The path difference between the two sources S1 and S2 must differ by a whole number of wavelengths.

"S_2 P \u2013S_1 P = n\u03bb"

As the distance D is very much larger than a, the path difference "S_2 P \u2013 S_1 P" can be approximated by dropping a perpendicular line S1 N from S1 to S2 P such that "S_1 P \u2248 NP"

and

the path difference"\\boxed{ S_2 P \u2013S_1 P \u2248 S_2N = n\u03bb}"

From geometry, S2N = a sin θ where a is the distance between the centres of the two slits.

Equating, a sin θ = nλ and re-arranging,

"\\boxed {sin \u03b8 = {n\u03bb\\over a}}"

But from geometry,

"\\boxed{tan \u03b8 = {x_n \\over D}}"

where x_n = distance of nth order fringe from the central axis Since θ is usually very small,

tan θ ≈ sin θ

i.e. "\\boxed{{ x_n \\over D} ={ n\u03bb\\over a }}" or "\\boxed{x_n= {n\u03bbD\\over a}}"

Thus the separation between adjacent fringes (i.e. fringe separation) is,

"\\boxed{\u0394x = x_{n+1} \u2013 x_n ={ (n+1) \u03bb D\\over a }\u2013 {n\u03bb D\\over a} ={ \u03bbD\\over a}}"

Thus,

Fringe separation "\\boxed {\u0394x ={ \u03bb D\\over a}}"

Clearly Δx is a constant if λ, D and a are kept constant. If all factors are kept constant, the fringes are evenly spaced near the central axis.

various diagrams