Update cheatsheet.fr.md

a707d949 · Claude Meny · 1a70b564 · a707d949
Commit a707d949 authored Mar 25, 2023 by Claude Meny
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cheatsheet.fr.md 12.temporary_ins/69.waves/30.n3/20.overview/cheatsheet.fr.md +4 -2

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--- a/12.temporary_ins/69.waves/30.n3/20.overview/cheatsheet.fr.md
+++ b/12.temporary_ins/69.waves/30.n3/20.overview/cheatsheet.fr.md
@@ -57,11 +57,13 @@ $`\newcommand{\ddpt}[1]{\overset{\large\bullet\bullet}{#1}}`$
 * Son amplitude est :   
  $`\begin{align} A_{onde&nbsp;résult.} &= \left| \,2\,A\cdot cos\Big(\dfrac{\varphi_1 - \varphi_2}{2} \Big) \,\right|\\
  &\\
-  &=\sqrt{2\,A\cdot \underbrace{cos\Big(\dfrac{\varphi_1 - \varphi_2}{2}\Big)\,cos\Big(\dfrac{\varphi_1 - \varphi_2}{2}\Big)}
+  &=\sqrt{2\,A\cdot \underbrace{cos\Big(\dfrac{\varphi_1 - \varphi_2}{2}\Big)\,cos\Big(\dfrac{\varphi_1 - \varphi_2}{2}\Big)}{toto}\end{align}`$
+
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      {\left.\begin{align} cos(a+b)=cos(a)cos(b)-sin(a)sin(b)\\
                     cos(a-b)=cos(a)cos(b)+-sin(a)sin(b)\end{align}\right\}\Rightarrow\\
        cos(a)cos(a)=cos^2(a)=\frac{1}{2}[cos(a+a)+cos(a-a)]frac{1}{2}[1 + cos(2a)]}
-  \end{align}`$
+

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