From 61b5ce20f25c5785e41574998a12c6d06eb05a5e Mon Sep 17 00:00:00 2001
From: Thomas Albers <thomas@thomaslabs.org>
Date: Wed, 8 Mar 2023 23:43:00 +0100
Subject: Restructure build system and directory structures

---
 math/derivatives.org | 31 -------------------------------
 1 file changed, 31 deletions(-)
 delete mode 100644 math/derivatives.org

(limited to 'math/derivatives.org')

diff --git a/math/derivatives.org b/math/derivatives.org
deleted file mode 100644
index 4d5d4be..0000000
--- a/math/derivatives.org
+++ /dev/null
@@ -1,31 +0,0 @@
-#+TITLE:Table of Derivatives
-#+SETUPFILE: ../math_options.org
-#+LATEX_HEADER: \usepackage{bm}
-#+LATEX_HEADER: \usepackage{mathtools}
-#+LATEX_HEADER: \newcommand{\dcoff}[1]{\frac{\text{d}}{\text{d}x} #1}
-#+LATEX_HEADER: \newcommand{\sdcoff}[1]{\frac{\text{d}#1}{\text{d}x}}
-#+LATEX_HEADER: \newcommand{\deriv}[2]{\frac{\text{d}}{\text{d}x} #1 &= #2}
-
-* Disclaimer
-This site as of now just a technology demonstration and its claims
-should not be taken as true (even though I myself am pretty confident
-they are)
-
-* General Properties of the Derivative
-Let $f$ and $g$ be real valued functions and $c$ some real constant:
-\begin{align*}
-\dcoff{(cf)} &= c\sdcoff{f}\\
-\dcoff{(f \pm g)} &= \sdcoff{f} \pm \sdcoff{g}\\
-\dcoff{(fg)} &= \sdcoff{f}g + f\sdcoff{g}\\
-\dcoff{\left(\frac{f}{g}\right)} &= \frac{\sdcoff{f}g - f\sdcoff{g}}{g^2}
-\end{align*}
-
-* Trigonometric Funtions
-\begin{align*}
-\deriv{\sin(x)}{\cos(x)}\\
-\deriv{\cos(x)}{-\sin(x)}\\
-\deriv{\tan(x)}{\sec^2(x)}\\
-\deriv{\sec(x)}{\sec(x)\tan(x)}\\
-\deriv{\csc(x)}{\csc(x)\cot(x)}\\
-\deriv{\csc(x)}{-\csc^2(x)}
-\end{align*}
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