beamer도 만만치 않네요.. 혹시 그림과 글씨가 다 같이 보이게 하는 방법 있으면 다시 한번 부탁 드릴께요~
글씨가 들어있는곳의 첫장입니다..윗부분 내용은 본문에 있어서 이부분만 붙입니다.
\section{Preliminaries} \begin{frame}[squeeze]\frametitle{Graphs and Digraphs}
\begin{definition}[Graphs] A \textit{graph} $G=(V,E)$ is a pair of sets, where $V$ is a set of vertices and $E$ is a set of unordered pairs of vertices of $V$. We say that $v_{i}$ and $ v_{j}$ are adjacent and write $v_i\sim v_j$ if an edge $\{v_{i},v_{j}\}$ belongs to E. \end{definition} \begin{definition}[Digraphs] A {\it directed graph} (or {\it digraph}) $\vec{G}=(V,E)$ is a pair of sets, where $V$ is a set of vertices and $E$ is a set of ordered pairs of vertices. We say that $v_i$ and $v_j$ are adjacent from $v_i$ to $v_j$ and write $v_i\rightarrow v_j$ if an arc $(v_i, v_j)$ belongs to E. \end{definition} \begin{itemize} \item In general, we consider a graph as an undirected graph and a graph $G$ will be identified with a symmetric digraph $\vec{G}$ in a natural manner. \end{itemize} \end{frame}
음..그림은 나오는데 다른 문제가 발생하였네요.
\documentclass{beamer}로 바꾸었더니 그림은 나오는데
글씨들이 모두 사라져버립니다.
%\usepackage{amsmath,amsthm,amssymb,amsfonts}
%\usepackage{mathrsfs}
이것들을 막아놔서 그런걸까요?
tex처음 배울때도 산넘어 산인것 같았는데
beamer도 만만치 않네요.. 혹시 그림과 글씨가 다 같이 보이게 하는 방법 있으면 다시 한번 부탁 드릴께요~
글씨가 들어있는곳의 첫장입니다..윗부분 내용은 본문에 있어서 이부분만 붙입니다.
\section{Preliminaries}
\begin{frame}[squeeze]\frametitle{Graphs and Digraphs}
\begin{definition}[Graphs]
A \textit{graph} $G=(V,E)$ is a pair of sets, where $V$ is a set of vertices and $E$ is a set of unordered pairs of vertices of $V$. We say that $v_{i}$ and $ v_{j}$ are adjacent and write $v_i\sim v_j$ if an edge $\{v_{i},v_{j}\}$ belongs to E.
\end{definition}
\begin{definition}[Digraphs]
A {\it directed graph} (or {\it digraph}) $\vec{G}=(V,E)$ is a pair of sets, where $V$ is a set of vertices and $E$ is a set of ordered pairs of vertices. We say that $v_i$ and $v_j$ are adjacent from $v_i$ to $v_j$ and write $v_i\rightarrow v_j$ if an arc $(v_i, v_j)$ belongs to E.
\end{definition}
\begin{itemize}
\item In general, we consider a graph as an undirected graph and a graph $G$ will be identified with a symmetric digraph $\vec{G}$ in a natural manner.
\end{itemize}
\end{frame}