NVAEasyJEE 2025Prisms & Total Internal Reflection

JEE Physics 2025 Question with Solution

A ray of light suffers minimum deviation when incident on a prism having angle of the prism equal to 6060^\circ. The refractive index of the prism material is 2\sqrt{2}. The angle of incidence (in degrees) is _____.

Answer

Correct answer:45

Step-by-step solution

Standard Method

Given: Prism angle A=60A = 60^\circ and refractive index μ=2\mu = \sqrt{2} under minimum deviation.

Find: The angle of incidence ii.

For minimum deviation, the angle of incidence is equal to the angle of emergence, so i=ei = e.

Triangular prism with apex angle 60 degrees, incident ray labeled i1 entering left face, internal angles r1 and r2 shown, and emergent ray from right face.

Use the relation

μ=sin(A+δm2)sin(A2)\mu = \frac{\sin \left( \frac{A + \delta_m}{2} \right)}{\sin \left( \frac{A}{2} \right)}

Since A=60A = 60^\circ,

δm=30\therefore \delta_m = 30^\circ

Also,

δm=2iA[as i=e]\delta_m = 2i - A \quad [\text{as} \ i = e]

Therefore,

30=2i6030^\circ = 2i - 60^\circ 2i=902i = 90^\circ i=45i = 45^\circ

Therefore, the angle of incidence is 4545^\circ.

Using minimum deviation condition

Given: A=60A = 60^\circ, μ=2\mu = \sqrt{2}.

Find: ii when deviation is minimum.

At minimum deviation for a prism,

r1=r2=A2=30r_1 = r_2 = \frac{A}{2} = 30^\circ

and

i=ei = e

Using Snell's law in prism form,

μ=sinisinr\mu = \frac{\sin i}{\sin r}

So,

2=sinisin30\sqrt{2} = \frac{\sin i}{\sin 30^\circ} 2=sini12\sqrt{2} = \frac{\sin i}{\frac{1}{2}} sini=22\sin i = \frac{\sqrt{2}}{2}

Hence,

i=45i = 45^\circ

Therefore, the required angle of incidence is 4545^\circ.

Common mistakes

  • Using the general prism relation without applying the minimum deviation condition. At minimum deviation, i=ei = e and r1=r2r_1 = r_2. Always use the symmetric path condition first.

  • Taking r=60r = 60^\circ instead of r=A2=30r = \frac{A}{2} = 30^\circ. The prism angle is split equally inside the prism only at minimum deviation.

  • Substituting incorrectly in μ=sinisinr\mu = \frac{\sin i}{\sin r} by forgetting that sin30=12\sin 30^\circ = \frac{1}{2}. This leads to a wrong value of ii. Evaluate the trigonometric value carefully before solving.

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