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The Fresnel equations, deduced by . The reflection of light that the equations predict is known as '''Fresnel reflection'''.

When Light moves from a medium of a given Refractive Index ''n''1 into a second medium with refractive index ''n''2, both Reflection and Refraction of the light may occur.

In the diagram on the right, an incident light ray PO strikes at point '''O''' the interface between two media of refractive indexes ''n''1 and ''n''2. Part of the ray is reflected as ray '''OQ''' and part refracted as ray '''OS'''. The angles that the incident, reflected and refracted rays make to the Normal of the interface are given as θi, θr and θt, respectively.
The relationship between these angles is given by the Law Of Reflection and Snell's Law .

The fraction of the Intensity of incident light that is reflected from the interface is given by the '' Reflection Coefficient '' ''R'', and the fraction refracted by the '' Transmission Coefficient '' ''T''. The Fresnel equations, which are based on the assumption that the two materials are both ''non-magnetic'', may be used to calculate ''R'' and ''T'' in a given situation. The following fields are continuous: tangential E and H, normal B and D.

The calculations of ''R'' and ''T'' depend on Polarisation of the incident ray. If the light is polarised with the Electric Field of the light perpendicular to the plane of the diagram above (''s''-polarised), the reflection coefficient is given by:

  • your--- book, and yet may be correct
    >

    • : R_s = \left[ rac{\sin ( heta_t - heta_i)}{\sin ( heta_t + heta_i)} ight]^2=\left[ rac{n_1\cos( heta_i)-n_2\cos( heta_t)}{n_1\cos( heta_i)+n_2\cos( heta_t)} ight]^2


where θt can be derived from θi by Snell's law.

If the incident light is polarised in the plane of the diagram (''p''-polarised), the ''R'' is given by:

  • your--- book, and yet may be correct
    >

    • : R_p = \left[ rac{ an ( heta_t - heta_i)}{ an ( heta_t + heta_i)} ight]^2=\left[ rac{n_1\cos( heta_t)-n_2\cos( heta_i)}{n_1\cos( heta_t)+n_2\cos( heta_i)} ight]^2


The transmission coefficient in each case is given by ''T''s = 1 − ''R''s and ''T''p = 1 − ''R''p.

If the incident light is unpolarised (containing an equal mix of ''s''- and ''p''-polarisations), the reflection coefficient is ''R'' =  (''R''s + ''R''p)/2.

The reflection and transmission coefficients correspond to the ratio of the Intensity of the incident ray to that of the reflected and transmitted rays. Equations for coefficients corresponding to ratios of the Electric Field Amplitude s of the waves can also be derived, and these are also called "Fresnel equations".

At one particular angle for a given ''n''1 and ''n''2, the value of ''R''p goes to zero and a ''p''-polarised incident ray is purely refracted. This angle is known as Brewster's Angle , and is around 56° for a glass medium in air or vacuum. Note that this statement is only true when the refractive indexes of both materials are Real Number s, as is the case for materials like air and glass. For materials which absorb light, like Metal s and Semiconductor s, ''n'' is Complex , and ''R''p does not generally go to zero.

When moving from a more dense medium into a less dense one (i.e. ''n''1 > ''n''2), above an incidence angle known as the ''critical angle'', all light is reflected and ''R''s = ''R''p = 1. This phenomenon is known as Total Internal Reflection . The critical angle is approximately 41° for glass in air.

When the light is at near-normal incidence to the interface (θi ≈ θt ≈ 0), the reflection and transmission coefficient are given by:

: R = R_s = R_p = \left( rac{n_1 - n_2}{n_1 + n_2} ight)^2
: T = T_s = T_p = 1-R = rac{4 n_1 n_2}{\left(n_1 + n_2 ight)^2}

For common glass, the reflection coefficient is about 4%. Note that reflection by a window is from the front side as well as the back side, and that some of the light bounces back and forth a number of times between the two sides. The combined reflection coefficient for this case is 2''R''/(1 + ''R''), when Interference can be neglected.

In reality, when light makes multiple reflections between two parallel surfaces, the multiple beams of light generally interfere with one another, and the surfaces act as a Fabry-Perot Interferometer . This effect is responsible for the colours seen in oil films on water, and it is used in optics to make Optical Coating s that can Greatly Lower The Reflectivity or can be used as an Optical Filter .

It should be noted that the discussion given here assumes that the Permeability μ is equal to the vacuum permeability μ0 in both media. This is approximately true for most Dielectric materials, but not for some other types of material. The completely general Fresnel equations are more complicated.


SEE ALSO



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