% % integrale.tex -- Definition der Fresnel Integrale % % (c) 2021 Prof Dr Andreas Müller, OST Ostschweizer Fachhochschule % \bgroup \input{../slides/fresnel/eulerpath.tex} \definecolor{darkgreen}{rgb}{0,0.6,0} \begin{frame}[t] \setlength{\abovedisplayskip}{5pt} \setlength{\belowdisplayskip}{5pt} \frametitle{Fresnel-Integrale} \vspace{-20pt} \begin{columns}[t,onlytextwidth] \begin{column}{0.48\textwidth} \begin{block}{Definition} Fresnel-Integrale: \begin{align*} \color{red}S(t) &= \int_0^t \sin\biggl(\frac{\pi\tau^2}2\biggr)\,d\tau \\ \color{blue}C(t) &= \int_0^t \cos\biggl(\frac{\pi\tau^2}2\biggr)\,d\tau \end{align*} \uncover<3->{% Können nicht in geschlossener Form ausgewertet werden. } \end{block} \uncover<4->{% \begin{block}{Euler-Spirale} \[ \gamma_a(t) = \begin{pmatrix} C_a(t)\\S_a(t) \end{pmatrix} = \begin{pmatrix} \displaystyle \int_0^t \cos (a\tau^2)\,d\tau\\[8pt] \displaystyle \int_0^t \sin (a\tau^2)\,d\tau \end{pmatrix} \] \end{block}} \end{column} \begin{column}{0.48\textwidth} \ifthenelse{\boolean{presentation}}{ \only<2-4>{% \begin{center} \begin{tikzpicture}[>=latex,thick,scale=1] \def\dx{0.6} \def\dy{1.5} \begin{scope} \draw[color=gray!50] (0,{0.5*\dy}) -- (3,{0.5*\dy}); \draw[color=gray!50] (0,{-0.5*\dy}) -- (-3,{-0.5*\dy}); \draw[->] (-3,0) -- (3.3,0) coordinate[label={$t$}]; \draw[->] (0,-1.5) -- (0,1.5) coordinate[label={left:$S(t)$}]; \draw (-0.1,{0.5*\dy}) -- (0.1,{0.5*\dy}); \node at (-0.1,{0.5*\dy}) [left] {$\frac12$}; \draw (-0.1,{-0.5*\dy}) -- (0.1,{-0.5*\dy}); \node at (0.1,{-0.5*\dy}) [right] {$-\frac12$}; \draw[color=red,line width=1.4pt] \Splotright; \draw[color=red,line width=1.4pt] \Splotleft; \end{scope} \begin{scope}[yshift=-3.4cm] \draw[color=gray!50] (0,{0.5*\dy}) -- (3,{0.5*\dy}); \draw[color=gray!50] (0,{-0.5*\dy}) -- (-3,{-0.5*\dy}); \draw[->] (-3,0) -- (3.3,0) coordinate[label={$t$}]; \draw[->] (0,-1.5) -- (0,1.5) coordinate[label={left:$C(t)$}]; \draw (-0.1,{0.5*\dy}) -- (0.1,{0.5*\dy}); \node at (-0.1,{0.5*\dy}) [left] {$\frac12$}; \draw (-0.1,{-0.5*\dy}) -- (0.1,{-0.5*\dy}); \node at (0.1,{-0.5*\dy}) [right] {$-\frac12$}; \draw[color=blue,line width=1.4pt] \Cplotright; \draw[color=blue,line width=1.4pt] \Cplotleft; \end{scope} \end{tikzpicture} \end{center} }}{} \uncover<5->{% \begin{center} \begin{tikzpicture}[>=latex,thick,scale=3.5] \draw[color=gray!50] (-0.5,-0.5) rectangle (0.5,0.5); \draw[->] (-0.8,0) -- (0.9,0) coordinate[label={$\color{blue}C(t)$}]; \draw[->] (0,-0.8) -- (0,0.9) coordinate[label={right:$\color{red}S(t)$}]; \draw[color=darkgreen,line width=1.0pt] \fresnela; \draw[color=darkgreen,line width=1.0pt] \fresnelb; \fill[color=orange] (0.5,0.5) circle[radius=0.02]; \fill[color=orange] (-0.5,-0.5) circle[radius=0.02]; \draw (0.5,-0.02) -- (0.5,0.02); \node at (0.5,-0.02) [below right] {$\frac12$}; \draw (-0.5,-0.02) -- (-0.5,0.02); \node at (-0.5,0.02) [above left] {$-\frac12$}; \draw (-0.01,0.5) -- (0.02,0.5); \node at (-0.02,0.5) [above left] {$\frac12$}; \draw (-0.02,-0.5) -- (0.02,-0.5); \node at (0.02,-0.5) [below right] {$-\frac12$}; \end{tikzpicture} \end{center} } \end{column} \end{columns} \end{frame} \egroup