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@ -43,14 +43,13 @@
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\item
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\item
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$\mathbb{N}$ = natürliche Zahlen = \{1, 2, 3, \ldots{}\}
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$\mathbb{N}$ = natürliche Zahlen = \{1, 2, 3, \ldots{}\}
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\item
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\item
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Z = ganze Zahlen = \{\ldots{}, -1, 0, 1, 2, \ldots{}\}
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$\mathbb{Z}$ = ganze Zahlen = \{\ldots{}, -1, 0, 1, 2, \ldots{}\}
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\item
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\item
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Q = rationale Zahlen, z.b. \(\frac{p}{q}\) (p, q \(\in\) Z)
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$\mathbb{Q}$ = rationale Zahlen, z.b. \(\frac{p}{q}\) (p, q \(\in \mathbb{Z}\), q \(\neq\) 0)
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\item
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\item
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R = reelle Zahlen, „alle Zahlen``, z.b. \(\pi\)
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$\mathbb{R}$ = reelle Zahlen, „alle Zahlen``, z.b. \(\pi\)
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\item
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\item
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C = komplexe Zahlen = \{a + ib \textbar{} i = \(\sqrt{- 1}\), a,b
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$\mathbb{C}$ = komplexe Zahlen = \{a + ib \textbar{} i = \(\sqrt{- 1}\), a,b \(\in \mathbb{R}\) \}
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\(\in\) R\}
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\end{itemize}
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\end{itemize}
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\subsection{Binomische Formeln}\label{binomische-formeln}
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\subsection{Binomische Formeln}\label{binomische-formeln}
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@ -449,7 +448,7 @@ $a = 0, b = 0 $ & $\varphi = 0^\circ $ & $\varphi = 0 $ \\
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\end{align*}
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\end{align*}
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\begin{align*}
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\begin{align*}
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{ z }_{ 1 }\cdot { z }_{ 2 } & =\left| { z }_{ 1 } \right| \left( \cos { \left( { \varphi }_{ 1 } \right) } +\sin { \left( { \varphi }_{ 1 } \right) } i \right) \cdot \left| { z }_{ 2 } \right| \left( \cos { \left( { \varphi }_{ 2 } \right) } \cdot \sin { \left( { \varphi }_{ 2 } \right) } i \right) \\
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{ z }_{ 1 }\cdot { z }_{ 2 } & =\left| { z }_{ 1 } \right| \left( \cos { \left( { \varphi }_{ 1 } \right) } +\sin { \left( { \varphi }_{ 1 } \right) } i \right) \cdot \left| { z }_{ 2 } \right| \left( \cos { \left( { \varphi }_{ 2 } \right) } \cdot \sin { \left( { \varphi }_{ 2 } \right) } i \right) \\
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& =\left| { z }_{ 1 } \right| \cdot \left| { z }_{ 2 } \right| \left( \cos { \left( { \varphi }_{ 1 } \right) \cdot \cos { \left( { \varphi }_{ 2 } \right) } } +\sin { \left( { \varphi }_{ 1 } \right) } \cdot \sin { \left( { \varphi }_{ 2 } \right) } i \right)
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& =\left| { z }_{ 1 } \right| \cdot \left| { z }_{ 2 } \right| \left( \cos { \left( { \varphi }_{ 1 } + { \varphi }_{ 2 } \right) } +\sin { \left( { \varphi }_{ 1 } + { \varphi }_{ 2 } \right) } i \right)
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\end{align*}
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\end{align*}
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\textbf{Division}
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\textbf{Division}
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Gogs