if refractive index of core and cladding are 1.48 and 1.45 then critical angle is
Answers
Explanation:
The critical angle of a fiber of core (for example, Flint glass) of refractive index 1,62 and cladding of index 1,49 should be 66,89°.
Considering the fact that on the interface between the two media the incoming ray (inside the core) must be refracted parallel to the interface we can use Snell's Law to calculate the angle at which this phenomenon occurs.
The angle of incidence (q1) inside the core will be the critical one and the angle of refraction (q2, inside the cladding) will be at least 90°.
From Snell's Law:
n1 sen (q1) = n2 sem (q2)
But
sen(q2)=sen(90°)=1
and
q1=arcsen(n2/n1)=arcsen(1,49/1,62)=66,89°
Using the same idea (and considering some geometry of triangles) you can now evaluate the angle of acceptance of the fiber, i.e., the angle of incidence of the light ray with the front surface of the glass core (so that the ray enters the core at the right inclination to produce internally this critical angle).
Answer:
n1 = 1.48
n2 = 1.45
by snell law
sin i / sin r = n2/n1
for critical angle i = c and r = 90°
sin c / sin 90° = 1.45/1.48
sin c / 1 = 0.9797
sin c = 0.9797
c = arcsin(0.9797)
c = 78.4°
critical angle c = 78.4°