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@ -806,53 +806,7 @@ $\frac{1}{1} = 1 $ & $\frac{1}{0} = \infty $ & $\frac{0}{1} = 0 $ & $\frac{1}{17
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\begin{sectionbox}
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-
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\subsection{Winkelfunktionen}
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\begin{minipage}{0.48\textwidth}
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\begin{tablebox}{|l|l|}
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\hline
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Funktion & Ableitung \\ \hline
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$ \sin{x} $ & $ \cos{x} $ \\ \hline
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$ \cos{x} $ & $ - \sin{x} $ \\ \hline
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$ \tan{x} $ & $ \frac{ 1 }{ \cos^{2}{x} }$ \\ \hline
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$ \cot{x} $ & $ - \frac{ 1 }{ \sin^{2}{x} }$ \\ \hline
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\end{tablebox}
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\end{minipage}
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\begin{minipage}{0.49\textwidth}
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\begin{tablebox}{|l|l|}
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\hline
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Funktion & Ableitung \\ \hline
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$ \arcsin{x} $ & $ \frac{ 1 }{ \sqrt{ 1-x^2 } }$ \\ \hline
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$ \arccos{x} $ & $ \frac{ 1 }{ \sqrt{ 1 - x^2 } }$ \\ \hline
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$ \arctan{x} $ & $ \frac{ 1 }{ 1 + x^2 }$ \\ \hline
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$ \arccot{x} $ & $ - \frac{ 1 } { 1 + x^2 } $ \\ \hline
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\end{tablebox}
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\end{minipage}
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\begin{minipage}{0.48\textwidth}
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\begin{tablebox}{|l|l|}
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\hline
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Funktion & Ableitung \\ \hline
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$ \sinh{x} $ & $ \cosh{x} $ \\ \hline
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$ \cosh{x} $ & $ \sinh{x} $ \\ \hline
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$ \tanh{x} $ & $ \frac{ 1 }{ \cosh^{2}{x} }$ \\ \hline
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$ \coth{x} $ & $ - \frac{ 1 }{ \sinh^{2}{x} }$ \\ \hline
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\end{tablebox}
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\end{minipage}
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\begin{minipage}{0.49\textwidth}
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\begin{tablebox}{|l|l|}
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\hline
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Funktion & Ableitung \\ \hline
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$ \arcsinh{x} $ & $ \frac{ 1 }{ \sqrt{ 1 + x^2 } }$ \\ \hline
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$ \arccosh{x} $ & $ \frac{ 1 }{ \sqrt{ x^2 - 1 } }$ \\ \hline
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$ \arctanh{x} $ & $ \frac{ 1 }{ 1 - x^2 }$ \\ \hline
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$ \arccoth{x} $ & $ - \frac{ 1 } { 1 - x^2 } $ \\ \hline
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\end{tablebox}
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\end{minipage}
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\end{sectionbox}
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