MacBookPro.lan 2026-4-16:15:55:33

2026-04-16 15:55:33 +02:00
parent fac8887c32
commit 654decd27f
3 changed files with 157 additions and 1 deletions
--- a/.obsidian/plugins/obsidian-excalidraw-plugin/data.json
+++ b/.obsidian/plugins/obsidian-excalidraw-plugin/data.json
@@ -113,7 +113,7 @@
  "library2": {
    "type": "excalidrawlib",
    "version": 2,
-    "source": "https://github.com/zsviczian/obsidian-excalidraw-plugin/releases/tag/2.21.2",
+    "source": "https://github.com/zsviczian/obsidian-excalidraw-plugin/releases/tag/2.22.0",
    "libraryItems": []
  },
  "imageElementNotice": true,
--- a/2026-04-16.excalidraw.md
+++ b/2026-04-16.excalidraw.md
@@ -0,0 +1,154 @@
+---
+
+excalidraw-plugin: parsed
+tags: [excalidraw]
+
+---
+==⚠  Switch to EXCALIDRAW VIEW in the MORE OPTIONS menu of this document. ⚠== You can decompress Drawing data with the command palette: 'Decompress current Excalidraw file'. For more info check in plugin settings under 'Saving'
+
+
+# Excalidraw Data
+
+## Text Elements
+le tableau de variations est évident étant donné le problème considéré.
+On pourra toujours montrer que cet unique extrémum est bien un maximum à partir du fait que 𝑎 ∈ [0; π/2] ^OnHRRJcd
+
+## Embedded Files
+8923efd922b888d467179262d7b788641d043cc7: $$l$$
+
+b3d5701da7f512bb6c2cfeefa687ef9448961a27: $$L$$
+
+a745f1dc9892805697eb7dc6df5134ce60d3e778: $$\alpha$$
+
+b76ee720d7e0bdf63f408ee39db94f3d31ca9f0e: $$r$$
+
+13099823a77cd5a2252736e0f029c959c6ee8e2c: $$=\begin{pmatrix}l\\L\end{pmatrix}$$
+
+e8b51e7e123fde3009046ff7524c05292519716e: $$=\begin{pmatrix}r \cos \alpha\\ r \sin \alpha\end{pmatrix}$$
+
+2eb73fd7a8bd07b84080b3bb149f4819930587be: $$= \begin{pmatrix}l + r \cos \alpha\\ L + r \sin \alpha\end{pmatrix}$$
+
+4dd7657e8aff3434304e0c34035d8f6e3e9c7c5d: $$\text{donc :}$$
+
+ce7a3ec53f89ae18583ec0042233662e411ba23b: $$\begin{align} \left\| \begin{pmatrix}l+r\cos \alpha\\L+r \sin \alpha\end{pmatrix} \right\| &= l^{2}+2lr\cos\alpha + r^{2}\cos ^{2}\alpha + L^{2} + 2Lr\sin\alpha + r^{2}\sin ^{2}\alpha \\&= (l^{2}+L^{2}+r^{2}) + 2r(l\cos\alpha+L\sin\alpha)\end{align}$$
+
+16647f064fb7a498cb3e96cfa483672e387b3557: $$\text{on veut donc maximiser } f: f(\alpha) = l\cos\alpha+L\sin\alpha$$
+
+c07e13d38824e5b0021dd5fdfadb2c55ad79c69a: $$f'(\alpha) = -l\sin\alpha + L\cos\alpha$$
+
+fafa660ca9b7e22e4de89da24218f9436103d840: $$\begin{align} f'(\alpha) = 0 &\iff L \cos \alpha = l \sin \alpha \\&\iff \frac{L}{l} \frac{\cos \alpha}{\sin\alpha} = 1 \\&\iff \tan \alpha = \frac{l}{L} \\&\iff \boxed {\alpha = \arctan \frac{l}{L}} \end{align}$$
+
+%%
+## Drawing
+```compressed-json
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+%%
--- a/2026-04-16.excalidraw.svg
+++ b/2026-04-16.excalidraw.svg