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title: 'The 4 laws of geometrical optics' |
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* **Fermat's principle** *$\Longrightarrow$ the 4 laws of geometrical optics* : |
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#### Law of reversibility of the path of light. |
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Optical path and property of stationarity : concept of orientation not used <br> |
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*$\Longrightarrow$ stationarity property does not depend on the orientation* of the path. |
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**$\Longrightarrow$** the **trajectory** *followed by the light* is **indépendant of the direction of propagation along the trajectory**. |
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#### Law of the rectilinear light trajectory in homogeneous and isotrope media. |
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Euclidian space : *straight line = shortest path between 2 points* |
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**$\Longrightarrow$** in an **optically homogeneous and isotrope medium**, the *light travels rectilinearly* : the **light rays are straight lines**. |
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#### The 2 laws of reflection and refraction |
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! <details markdown=1> |
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! <summary> |
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! IF NECESSARY : reminder if the definitions of the angles and refractive indexes used below. |
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! </summary> |
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! $n_{incid}$ : refractive index of the incident light medium.<br> |
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! $n_{émerg}$ : refractive index of the emergent light medium (so after crossing the surface).<br> |
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! $i_{incid}$ : incident ray - normal to the surface at the point of impact angle.<br> |
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! $i_{émerg}$ : emergent ray - normal to the surface at the point of impact angle.<br> |
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! </details> |
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For any incident ray impacting a surface : |
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* The **surface at the point of impact** is *locally a plane*. |
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* **Plan of incidence** : plane that *contains the incident ray and normal to the surface at the point of impact*. |
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* **Refracted and reflected rays** are *in the plane of incidence*, on the *side opposite to the incident ray in relation to the normal* at the surface at the impact point. |
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*Reflection law* : **$i_{réflec} = i_{incid}$** |
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*Refraction law (Snell-Descartes)* : for any $i_{incid}$ : |
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* if $\dfrac{n_{incid}}{n_{émerg}}\cdot\sin(i_{incid})\leqslant1$ then **refraction phenomenon** :<br><br> |
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**$n_{émerg}\cdot sin(i_{émerg})=n_{incid}\cdot sin(i_{incid})$**<br> |
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* if $\dfrac{n_{incid}}{n_{emerg}}\cdot\sin(i_{incid})>1$ then **total reflection phenomenon** :<br> |
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*reflected ray* on the interface that follows the reflection law **$i_{réflec} = i_{incid}$**<br> |
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* **Critical angle** (of inidence) **for total reflection : $i_{incid_limit}=\arcsin\left (\dfrac{n_{émerg}}{n_{incid}}\right)$** *$\Longrightarrow i_{émerg}=\pi/2\:rad = 90 °$* |
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_Phenomena of reflection and refraction on a refracting surface._ |
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 |
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!! <details markdown=1> |
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!! <summary> |
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!! TO GO FURTHER : intensity distribution between reflected and transmitted beam at a refracting surface. |
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!! </summary> |
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!! Geometrical optics: does not quantify the reflected $R$ and transmitted $T$ parts of the incident beam intensity at a plane refracting surface. This distribution varies according to the incidence angle, the polarization of the incident light, the wavelength. This is described by electromagnetism. |
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!! However a simple result is useful and to know : |
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!! *The light intensity is either reflected or transmitted* : $R+T=1$. |
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!! |
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!! For a light beam of wavelength $\lambda$ of normal incidence upon a refracting surface : |
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!! - ratio reflected power versus incident power : $R=\left(\dfrac{n_{incid}-n_{émerg}}{n_{incid}+n_{émerg}}\right)^2$ |
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!! - ratio transmitted power versus incident power : $T=1-R$ |
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!!</details> |
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_Total reflection phenomenon_ |
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