When the refractive index of water is 1.3 and glass is 1.5 What is the refractive index of glass with respect to water?

If a beam of light enters water from air at 30 degrees from the normal. It then enters a glass block and exit into air. At what angle does it exit from glass to air ? My friend says it exist again at 30 degrees to normal. The refractive index of water is 1.3 and glass is 1.5.

Your friend's forgotten Snell's Law: [tex]n_1 \sin{\theta _1}=n_2 \sin{\theta _2}[/tex]
Where the index 1 refers to the material the light's coming from, and the index 2 refers to the material the light's entering.

Last edited: Jan 14, 2010

To elaborate upon what RoyalCat says, assume you have just a block of glass (width does not matter--the pendant in me says as long as it's sufficiently thin so that not all the light is absorbed). Now assume that you have a beam of light striking at angle [itex]\theta_i[/itex]. What angle (in terms of [itex]\theta_i[/itex]) will the beam of light travel at within the glass? At what angle (again, in terms of [itex]\theta_i[/itex]) will the beam of light exit at?

For air/water/glass/water/air combination, then incoming and outgoing angle is same? This is not same for air/water/glass/air ?

its 35.23 degrees according to Mr Snell and his law :P

For air/water surface its 30 degrees. Definetly for air/glass surface is NOT 30 degrees. Do you agree?

Last edited: Jan 15, 2010

The problem lies with the water/glass boundary. How can Mr. Snell help there? The refractive index of glass with respect to water? How to resolve that?

Sorry, my previous answer was wrong, i didnt read the question correctly. Step one: n1sin1 = n2sin2 (refractive index of air = 1) (1)(sin30) = (1.3)(sinx) -> x = 22.6 degrees Step 2 n1sin1 = n2sin2 (1.3)(sin22.6) = (1.5)(siny) -> y=19.47degrees Step 3 n1sin1=n2sin2 (1.5)sin19.47 = (1)(sinz) -> z = 30 degrees.

The calculations is correct. But how to explain the physics of it?

Anyone care to explain the physics of it?

In a parallel sided glass slab light is laterally shifted i.e. incident and refracted rays in the same medium are parallel to each other, whatever may be the number of different media in between medium. So the angle of incidence is equal to the angle of emergence.

Imagine a shopping trolly: if u push it from a smooth medium (eg marble) at an angle onto a rough concrete medium (more friction), one wheel reaches the rough medium first and thus slows down first. this causes a change of direction in which the trolley is travelling.

"light is laterally shifted"

One explanation is the analogy with mechanics. Photons have energy and momentum. Their energy is E=h*f, the magnitude of the momentum is p=h/lambda, and its direction points in the direction of propagation of the light ray. You know that that momentum changes when same force acts on the particle, the change of the momentum is equal to the impulse, and is parallel to the force applied. A plane surface can act only along its normal (there is no friction). The parallel component of the momentum does not change when the photon crosses the interface between two media (or reflects from it). This parallel component is h/ lambda*sin(alfa) which is constant everywhere in a plane-parallel arrangement of layers. But lambda =v/f (f a frequency, v is the speed of light in the medium.) The refractive index of the medium is n=c/v. So the constancy of the parallel component of momentum involves the constancy of [tex] sin(\alpha) / \lambda = sin(\alpha) f*n/c[/tex]. As the frequency of the photon does not change we arrived at Snell's law [itex]\sin(\alpha)*n=const [/itex]. The normal component of the momentum will change, but we know that the magnitude of the momentum is h/lambda=hf/c *n. Thus the normal component of the photon momentum is [tex]p_n= hf/c*\sqrt{n^2-(n_0\sin{alpha_0})^2}[/tex]