Answer:
The critical angle is [tex]\theta_c = \ 63.68^o[/tex]
Explanation:
From the question we are told that
The refractive index of the core is [tex]n_c = 1.35[/tex]
The refractive index of the cladding is [tex]n_s = 1.21[/tex]
Generally according to Snell's law
[tex]\frac{sin i }{sin r } = \frac{n_s}{n_c }[/tex]
Here for total internal reflection the refractive angle is [tex]r = 90^o[/tex] and the critical angle is equal to the critical angle so [tex]i = \theta_c[/tex]
[tex]\frac{sin \theta_c }{sin (90) } = \frac{n_s}{n_c }[/tex]
substituting values
[tex]\frac{sin \theta_c }{sin (90) } = \frac{1.21}{1.35 }[/tex]
[tex]\theta_c = sin^{-1} [\frac{1.21}{1.35} ][/tex]
[tex]\theta_c = \ 63.68^o[/tex]
