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Commit aa9d3c43 authored by Claude Meny's avatar Claude Meny
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Update cheatsheet.fr.md

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    12.temporary_ins/70.wave-optics/10.interferences/cheatsheet.fr.md
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    ...@@ -655,21 +655,16 @@ $`=\phi_{géo}`$ ...@@ -655,21 +655,16 @@ $`=\phi_{géo}`$
    *Calcul de l'amplitude totale* *Calcul de l'amplitude totale*
    * **Interférences en réflexion** : rappel, on se limite aux *deux premiers faisceaux*.<br> * **Interférences en réflexion** : rappel, on se limite aux *deux premiers faisceaux*.<br>
    <br> <br>$`\underline{A}_{\,tot}=A\cdot r_{12} + A \cdot r_{21} \cdot t_{12} \cdot t_{21} \cdot e^{\displaystyle\,i\,\phi_{géo}}`$<br>
    $`\underline{A}_{\,tot}=A\cdot r_{12} + A \cdot r_{21} \cdot t_{12} \cdot t_{21} \cdot e^{\displaystyle\,i\,\phi_{géo}}`$<br> <br>Comme $`r_{21}=-1\cdot r_{12}=e^{\,i\,\pi}\cdot r_{12}`$<br>
    <br> <br>$`\underline{A}_{\,tot}=A\cdot r_{12}\cdot`$
    Comme $`r_{21}=-1\cdot r_{12}=e^{\,i\,\pi}\cdot r_{12}`$<br>
    <br>
    $`\underline{A}_{\,tot}=A\cdot r_{12}\cdot`$
    $`\;\left( 1 + e^{\,i\,\pi}\cdot t_{12} \cdot t_{21} \cdot e^{\displaystyle\,i\,(\phi_{géo}+\phi_{ref})}\right)`$ $`\;\left( 1 + e^{\,i\,\pi}\cdot t_{12} \cdot t_{21} \cdot e^{\displaystyle\,i\,(\phi_{géo}+\phi_{ref})}\right)`$
    $`\;=A\cdot r_{12}\cdot \left( 1 + \cdot t_{12} \cdot t_{21} \cdot e^{\displaystyle\,i\,(\phi_{géo}+\pi)}\right)`$ $`\;=A\cdot r_{12}\cdot \left( 1 + \cdot t_{12} \cdot t_{21} \cdot e^{\displaystyle\,i\,(\phi_{géo}+\pi)}\right)`$
    $`\;=A\cdot r_{12}\cdot \left( 1 + \cdot t_{12} \cdot t_{21} \cdot e^{\displaystyle\,i\,(\phi_{géo}+\phi_{ref})}\right)`$ $`\;=A\cdot r_{12}\cdot \left( 1 + \cdot t_{12} \cdot t_{21} \cdot e^{\displaystyle\,i\,(\phi_{géo}+\phi_{ref})}\right)`$
    <br> <br>
    <br> nous voyons bien qu'*au final* le déphasage des deux ondes est *$`\phi=\phi_{géo}+\phi_{ref}`$*.<br> <br> nous voyons bien qu'*au final* le déphasage des deux ondes est *$`\phi=\phi_{géo}+\phi_{ref}`$*.<br>
    <br> <br>Comme $`T=t_{12}\cdot t_{12}\simeq 1`$, nous faisons l'**approximation $`T=t_{12}=t_{12}=1`$**.<br>
    Comme $`T=t_{12}\cdot t_{12}\simeq 1`$, nous faisons l'**approximation $`T=t_{12}=t_{12}=1`$**.<br> <br>**$`\underline{A}_{\,tot}=A\cdot r_{12}\cdot \left( 1 +e^{\displaystyle\,i(\phi_{géo}+\phi_{ref})}\right)`$**
    <br>
    **$`\underline{A}_{\,tot}=A\cdot r_{12}\cdot \left( 1 +e^{\displaystyle\,i(\phi_{géo}+\phi_{ref})}\right)`$**
    $`=\,A\cdot r_{12}\cdot \left( 1 +e^{\displaystyle\,i \left( \dfrac{\,4\,\pi\,n_2\,e\cdot cos\,\theta_2}{\lambda}+\pi \right)} \right)`$ $`=\,A\cdot r_{12}\cdot \left( 1 +e^{\displaystyle\,i \left( \dfrac{\,4\,\pi\,n_2\,e\cdot cos\,\theta_2}{\lambda}+\pi \right)} \right)`$
    !!!! *Attention :* !!!! *Attention :*
    ......
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