What is the refractive index of a medium when the light strikes the medium after traveling through air at an angle of 23.3° and the refracted angle is 14.6°?
1.33
1.36
1.44
1.57
1.91

Refractive index is the relationship between the velocity of light in a medium and its velocity in a specified medium. It is determined by sin θ (air) / sin θ (medium)

Refractive index = sin θ (air) / sin θ (medium)

= sin 23.3 / sin 14.6

= 1.57

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Muscardinus Muscardinus · Answer 2 · 2019-08-16T13:23:33+02:00

Answer:

The refractive index of the medium is 1.57

Explanation:

It is given that,

Angle at which the light strikes the medium after travelling through air, i = 23.3°

Angle at which the light ray is refracted, r = 14.6°

Snell's law gives the relation between the angle of incidence, angle of refraction and refractive index. Mathematically, it is given by ;

[tex]n=\dfrac{sin\ i}{sin\ r}[/tex]

[tex]n=\dfrac{sin(23.3)}{sin(14.6)}[/tex]

n = 1.569

or

n = 1.57

So, the refractive index of the medium is 1.57. Hence, this is the required solution.

What is the refractive index of a medium when the light strikes the medium after traveling through air at an angle of 23.3° and the refracted angle is 14.6°? 1.33 1.36 1.44 1.57 1.91

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What is the refractive index of a medium when the light strikes the medium after traveling through air at an angle of 23.3° and the refracted angle is 14.6°?
1.33
1.36
1.44
1.57
1.91