explain refraction of light through a prism what is prism what is prism equation
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Answers
The angles of incidence and refraction at the first face AB are i and r1, while the angle of incidence (from glass to air) at the second face AC is r2 and the angle of refraction or emergence e. The angle between the emergent ray RS and the direction of the incident ray PQ is called the angle of deviation, δ.
In the quadrilateral AQNR, two of the angles (at the vertices Q and R) are right angles. Therefore, the sum of the other angles of the quadrilateral is 180º.
From the triangle QNR,
r1 + r2 + ∠QNR = 180º
Comparing these two equations, we get r1 + r2 = A -------- (1)
The total deviation δ is the sum of deviations at the two faces,
δ = (i – r1) + (e – r2) that is, δ = i + e – A ---------- (2)
Thus, the angle of deviation depends on the angle of incidence. A plot between the angle of deviation and angle of incidence is shown in Fig. We can see that, in general, any given value of δ, except for i = e, corresponds to two values i and hence of e. This, in fact, is expected from the symmetry of i and e in Eq. (2), i.e., δ remains the same if i and e are interchanged. Physically, this is related to the fact that the path of ray in Fig. (1) can be traced back, resulting in the same angle of deviation. At the minimum deviation Dm, the refracted ray inside the prism becomes parallel to its base. We have
δ = Dm, i = e which implies r1 = r2.
Equation (1) gives, 2r = A or r = A/2 -------- (3)
In the same way equation (2) gives Dm = 2i - A or i = (A + Dm)/2 ------- (4)
The refractive index of the prism is
n21 = n2/n1 sin[A+Dm]/2//sin[A/2]---------(5)
The angles A and Dm can be measured experimentally. Equation (5) thus provides a method of determining refractive index of the material of the prism. For a small angle prism, i.e., a thin prism, Dm is also very small, and we get,
n21 = n2/n1 sin[A+Dm]/2//sin[A/2]
= (A+Dm)/2//A/2
It implies that, thin prisms do not deviate light much.
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