Update cheatshhet.fr.md

28a982aa · Claude Meny · d2ca4976 · 28a982aa
Commit 28a982aa authored Aug 24, 2022 by Claude Meny
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cheatshhet.fr.md ...ive-vector-fields-properties/20.overview/cheatshhet.fr.md +11 -6

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--- a/12.temporary_ins/08.conservative-vector-fields/20.conservative-vector-fields-properties/20.overview/cheatshhet.fr.md
+++ b/12.temporary_ins/08.conservative-vector-fields/20.conservative-vector-fields-properties/20.overview/cheatshhet.fr.md
@@ -33,6 +33,7 @@ lessons:

 ### Définitions et propriétés<br>**Gradient**<br>**Champs vectoriels conservatifs**

+<br>

 GRADIENT  D'UN  CHAMP SCALAIRE
 : ---
@@ -49,12 +50,16 @@ GRADIENT  D'UN  CHAMP SCALAIRE
 
 *Expressions du gradient*
 
- * Coordonnées cartésiennes :   
-   $`\overrightarrow{grad}\,V=\dfrac{\partial V}{\partial x}\,\overrightarrow{e_x}+\dfrac{\partial V}{\partial y}\,\overrightarrow{e_y}+\dfrac{\partial V}{\partial z}\,\overrightarrow{e_z}`$
- * Coordonnées cylindriques :   
-   $`\overrightarrow{grad}\,V=\dfrac{\partial V}{\partial \rho}\,\overrightarrow{e_{\rho}}+\dfrac{1}{/rho}\dfrac{\partial V}{\partial \varphi}\,\overrightarrow{e_{\varphi}}+\dfrac{\partial V}{\partial z}\,\overrightarrow{e_z}`$
- * Coordonnées sphériques :   
-   $`\overrightarrow{grad}\,V=\dfrac{\partial V}{\partial \rho}\,\overrightarrow{e_{\rho}}+\dfrac{1}{/rho}\,\dfrac{\partial V}{\partial \theta}\,\overrightarrow{e_{\theta}}+\dfrac{1}{/rho\,sin\,\theta}\,\dfrac{\partial V}{\partial \varphi}\,\overrightarrow{e_5\varphi}`$
+Coordonnées cartésiennes :   
+   $`\begin{align}
+   \overrightarrow{grad}\,V &=\dfrac{\partial V}{\partial x}\,\overrightarrow{e_x}+\dfrac{\partial V}{\partial y}\,\overrightarrow{e_y}+\dfrac{\partial V}{\partial z}\,\overrightarrow{e_z}`$ \\
+    &=\nabla\,V\\
+    end{align}`$
+&nbsp;&nbsp;avec opérateur nabla $`\nabla=\dfrac{\partial}{\partial x}\,\overrightarrow{e_x}+\dfrac{\partial}{\partial y}\,\overrightarrow{e_y}+\dfrac{\partial}{\partial z}\,\overrightarrow{e_z}`$
+Coordonnées cylindriques :   
+   $`\overrightarrow{grad}\,V=\dfrac{\partial V}{\partial \rho}\,\overrightarrow{e_{\rho}}+\dfrac{1}{\rho}\,\dfrac{\partial V}{\partial \varphi}\,\overrightarrow{e_{\varphi}}+\dfrac{\partial V}{\partial z}\,\overrightarrow{e_z}`$
+Coordonnées sphériques :   
+   $`\overrightarrow{grad}\,V=\dfrac{\partial V}{\partial \rho}\,\overrightarrow{e_{\rho}}+\dfrac{1}{\rho}\,\dfrac{\partial V}{\partial \theta}\,\overrightarrow{e_{\theta}}+\dfrac{1}{\rho\,sin\,\theta}\,\dfrac{\partial V}{\partial \varphi}\,\overrightarrow{e_5\varphi}`$