Add first part of theory for exercise two

2026-02-12 23:50:32 +01:00
parent e39ae190f3
commit 948523c1b5
1 changed files with 106 additions and 2 deletions
--- a/src/2026-02-13/presentation.tex
+++ b/src/2026-02-13/presentation.tex
@@ -886,7 +886,112 @@
 %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
 \subsection{Theorie Wiederholung}
-% TODO: Add slides
+\begin{frame}
    \frametitle{Empirische Kenngrößen I}
    \vspace*{-10mm}
    \begin{itemize}
        \item Empirischer Erwartungswert
    \end{itemize}
    \begin{minipage}{0.47\textwidth}
        \centering
        \begin{align*}
            \overline{x} = \frac{1}{N} \nsum_{i=1}^{N} x_i
        \end{align*}
    \end{minipage}%
    \begin{minipage}{0.53\textwidth}
        \centering
        \begin{lightgrayhighlightbox}
            \vspace*{-3mm}
            Erinnerung: Erwartungswert (diskret)
            \begin{align*}
                E(X) = \nsum_{n=1}^{\infty} x_n P(X=x_n)
            \end{align*}
            \vspace*{-10mm}
        \end{lightgrayhighlightbox}
    \end{minipage}%
    \vspace*{10mm}
    \pause
    \begin{itemize}
        \item Empirische Varianz
    \end{itemize}
    \begin{minipage}{0.47\textwidth}
        \centering
        \begin{align*}
            s^2 = \frac{1}{N-1} \nsum_{i=1}^{N} (x_i - \overline{x})^2
        \end{align*}
    \end{minipage}%
    \begin{minipage}{0.53\textwidth}
        \centering
        \begin{lightgrayhighlightbox}
            \vspace*{-3mm}
            Erinnerung: Varianz (diskret)
            \begin{align*}
                V(X) = E\left( \left( X - E(X) \right)^2
                \right) = \nsum_{n=1}^{\infty} \left( x_n -
                E(X) \right)^2 P(X=x_n)
            \end{align*}
            \vspace*{-10mm}
        \end{lightgrayhighlightbox}
    \end{minipage}
 \end{frame}
 \begin{frame}
    \frametitle{Empirische Kenngrößen II}
    \vspace*{-10mm}
    \begin{itemize}
        \item Geordnete Stichprobe
            \begin{align*}
                \begin{pmatrix}
                    x_1 & \cdots & x_N
                \end{pmatrix}
                \hspace{10mm} \rightarrow \hspace{10mm}
                \begin{pmatrix}
                    x_{(1)} & \cdots & x_{(N)}
                \end{pmatrix}, \hspace{5mm} x_{(1)} \le \cdots \le x_{(N)}
            \end{align*}
            \pause
        \item Empirischer Median
            \begin{align*}
                x_{1/2} =
                \begin{cases}
                    x_{\left( \frac{N+1}{2} \right)}, & N \text{
                    ungerade} \\[3mm]
                    \frac{1}{2} \left( x_{\left( \frac{N}{2} \right)}
                    + x_{\left( \frac{N}{2} +1 \right)} \right), & N
                    \text{ gerade}
                \end{cases}
            \end{align*}
            \pause
        \item $p$-Quantil
            \begin{align*}
                x_{p} =
                \begin{cases}
                    x_{\left( \lfloor Np + 1 \rfloor \right)}, & Np
                    \notin \mathbb{N} \\[3mm]
                    \frac{1}{2} \left( x_{\left( Np \right)}
                    + x_{\left( Np + 1 \right)} \right), & Np \in \mathbb{N}
                \end{cases}
            \end{align*}
        \item Quartilsabstand
            \begin{align*}
                x_{3/4} - x_{1/4}
            \end{align*}
    \end{itemize}
 \end{frame}
 \begin{frame}
    \frametitle{Boxplots}
    % TODO: Create slide
 \end{frame}
 %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
 \subsection{Aufgabe}
@@ -959,7 +1064,6 @@
            Ergebnisse einen Vorteil des Quartilsabstands gegenüber
            der Varianz als Maß für die Streuung.
    \end{enumerate}
 \end{frame}
 % TODO: Boxplot erklären