Introduction to Young’s Double Slit Experiment
Experimental arrangement
Thomas Young first demonstrated interference in light waves from two sources in 1801.
The resulting pattern on the screen shows where constructive interference occurs (maxima, labeled B) and where destructive interference occurs (minima, labeled D). We have constructive interference if paths differ by any number of full wavelengths and destructive interference if the difference is half of a wavelength.
Analysis
Let the wave length of light = λ
The distance between slits A and B = d
The distance between slits and screen = L
Consider a point 'P' on the screen where the light waves coming from slits A and B interfere such that PC=y. The wave coming from A covers a distance AP=r1 and the wave coming from B covers a distance BP=r2 such that PB is greater than PA.
Path difference = BP-AP = BD
S = r2-r1 = BD
In right angled DBAD
Sinθ = BD/AB
Or
sinθ = s/d
Or
S = dsinθ -------(1)
Since the value of 'd' is very small compared to L, q will also be very small. In this circumstance, we can assume that :
Sinθ = tanθ
From (1)
S = dtanθ ---(2)
In right angled DPEC
Tanθ= PC/EC = y/L
Putting the value of tanq in eq. (2), w get
S = dy/L
Or
y = SL/d -----(3)
For bright fringe S = mλ -----(3)
Therefore, the position of the bright fringe is:
y = mλL/d
For destructive interference, the path difference between the two waves is (m+1/2)l ----(3)
Therefore, the position of the dark fringe is:
y = (m+1/2)λL/d
There are two possible results of this experiment
Fringe Spacing
The distance between any two consecutive bright fringes or two consecutive dark fringes is called fringe spacing.
Fringe spacing, or the thickness of a dark fringe or a bright fringe, is equal and is denoted by Δx.
Consider a bright fringe.
y = mλL/d
For a bright fringe m=1
y1 = (1)λL/d
for the next order, the bright fringe m=2
y2 = (2) λL/d
fringe spacing = y2 - y1
or
Δx = (2)λL/d - (1)λL/d
Δx =λL/d (2-1)
Δx = λL/d
A similar result can be obtained for a dark fringe.
Particle interpretation:
If light exists as particles, then the intensity of both slits will be the sum of the intensity from the individual slits.
Wave interpretation:
If light exists as waves, then the light waves will have interference under the principle of superposition, and create bands of light (constructive interference) and dark (destructive interference).
***
Want to know more about Young’s double slit experiment? Click here to schedule a live session with an eAge eTutor!
About eAge Tutoring:
eAgeTutor.com is the premium online tutoring provider. Using materials developed by highly qualified educators and leading content developers, a team of top-notch software experts, and a group of passionate educators, eAgeTutor works to ensure the success and satisfaction of all of its students.
Contact us today to learn more about our guaranteed results and discuss how we can help make the dreams of the student in your life come true!