Question 34
Monochromatic light of
wavelength λ is incident on two narrow slits S1 and S2, a
small distance apart. A series of bright and dark fringes are observed on a
screen a long distance away from the slits.
The n th dark fringe
from the central bright fringe is observed at point P on the screen.
Which equation is
correct for all positive values of n?
A S2P – S1P =
nλ / 2
B S2P – S1P =
nλ
C S2P – S1P =
(n – ½)λ
D S2P – S1P =
(n + ½)λ
Reference: Past Exam Paper – June 2017 Paper 13 Q28
Solution:
Answer:
C.
Dark fringes are formed
when destructive interference occurs.
For destructive interference,
the path difference should be 0.5λ, 1.5λ, 2.5λ, 3.5λ … [B is incorrect]
Consider option A.
Path difference = nλ /2
When n = 1, path
difference = ½ λ
When n = 2, path
difference = 2 λ / 2 = λ [A is
incorrect]
Consider option D.
When n = 1, path
difference = (1 + ½) λ = 3λ
/ 2
This equation suggest that
the first dark fringe occurs at 3λ / 2. [D is incorrect]
Consider option C.
When n = 1, path
difference = (1 – ½) λ = λ
/ 2
This equation suggest that the path difference
for the first dark fringe is equal to λ / 2 (= 0.5λ), which is correct.
Why is D wrong?, 1.5lambda is destructive interference
ReplyDeleteas stated in the question, n is always positive.
DeleteConsidering option D,
when n = 1, the path diff = 1.5 lambda
while option C,
when n = 1, the path diff = 0.5 lambda
so, option D does not account for the first destructive interference of 0.5 lambda