Geometrical Optics:
Geometrical Optics & Physics Optics.
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Huygens Principle:

Wavefronts.
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Reflection:

The first law of Geometrical Optics.
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Refraction:

The second law of Geometrical Optics: Snell's law.
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Critical angle:

Internal total reflection.
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images formed by reflection

Spherical concave mirrors. Mirror equation.
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images formed by refraction

Spherical convex mirrors ..
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Fermat's principle:

Fermat's principle for reflection and refraction..
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lenses:

Thin lenses and Lens-makers' equation ..
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prism:

Prism, colors minimum deviation ..
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Human eye:

near point, far point, nearsightedness, farsightedness..
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Microscope:

Microscope: simple, compound, and magnification..
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Telescope:

Telescope: magnification..
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Resolution:

optical microscope, electron microscope ..
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dispersion:

dispersion, more about the refractive index, and colors of a prism ..
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parallel sheet:

deviation by a parallel sheet ..
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thin films :

thin films and Newton's rings..
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Newton's rings:

thin films and Newton's rings..
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Descartes rainbow:

Primary and secondary rainbows ..
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Some applications

More fun with Optics ..
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Optics calculator:

Optics calculator: all the related calculations ..
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home

The fundamental, and just this ..
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scientificSentence

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Geometrical Optics
Optics -     Geometrical Optics..





1. Deviation for a prism:


We have the five following relationships:
i + r1 = A
θ = a + r1
sin θ = n sin r1
n sin i = sin r2
δ = a + r2 - i

Then:
δ = θ - r1 + arcsin[n sin i] - i = θ + arcsin[n sin i] - A

arcsin[n sin i] = arcsin[n sin (A - r1)] = arcsin[n sin (A - arcsin (sin θ)/n)] =
Therefore:
δ = θ - A + arcsin[n sin (A - arcsin (sin θ)/n)]     (1)

The minimum deviation δm is determined as follows:
dδ/d θ = 0
We know that d[arcsin x ]/dx = 1/(1 - x2)1/2
If f(x) = arcsin (x) then sin f(x) = x; and by a derivative : f'(x) cos f(x) = dx/dx = 1, therefore: f'(x) = 1/[1 - sin2f(x)]1/2 = 1/[1 - x2]1/2
Then:
dδ/d θ = 1 + 1/[1 - (arcsin[n sin (A - arcsin (sin θ)/n)] )2]1/2 x n cos(A - arcsin (sin θ)/n) x {- 1/sqrt[1 - (sin θ)/n]2)1/2} x (cosθ)/n) =

dδ/d θ = 0 leads to:
1 = 1/[1 - (arcsin[n sin (A - arcsin (sin θ)/n)] )2]1/2 x cos(A - arcsin (sin θ)/n) x {1/sqrt[1 - (sin θ)/n]2)1/2} x cosθ)

This equation is satisfied by the relationship:
sin θ = n sin (A/2)     (2)



2. Minimal deviation for a prism:

We have then the expression of the minimum angle of deviation : δm = 2 θ - A     (3)

The equation (2) becomes:
sin[(δm + A)/2] = n sin (A/2)     (4)

The first five relationships along with the ralationship (2) give: sin θ = n sin r1
→ r1= A/2, and i = A/2. Then i = r1
n sin i = sin r2 → n sin (A/2) = sin r2 → r2 = θ

The angle: π/2 - θ + a = π/2 - r1 = π/2 - A/2. It forms then with the bisect of angle A a right angle. Therefore, the refracted ray within the medium n is perpendicular to the bisect of angle A (then horizontal).



 

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