我感覺我無法以正確的方式使用列。我經常有一張幻燈片,兩張桌子相鄰,看起來像這樣:
框架的程式碼是這樣的:
\begin{frame}{Nyttige regler for sett}
\begin{columns}
\begin{column}{0.25\textwidth}
\begin{tabular}{l|c}
Ekvivalens & Navn \\ \hline
$A \cap U = A$ & Identity\\
$A \cup \emptyset = A$ \\ \hline
$A \cup U = U$ & Domination\\
$A \cap \emptyset = \emptyset$\\ \hline
$A \cup A = A$ & Idempotent\\
$A \cap A = A$ \\ \hline
$A = (A^C)^C$ & Negation\\ \hline
$A \cup B = B \cup A$ & Commutative\\
$A \cap B = B \cap A$ \\
\end{tabular}
\end{column}
\begin{column}{0.58\textwidth}
\begin{tabular}{l|c}
Ekvivalens & Navn \\ \hline
$(A \cup B) \cup C = A \cup (B \cup C)$ & Associative\\
$(A \cap B) \cap C = A \cap (B \cap C)$ \\ \hline
$A \cup (B \cap C) = (A \cup B) \cap (A \cup C)$ & Distributive\\
$A \cap (B \cup C) = (A \cap B) \cup (A \cap C)$ \\ \hline
$(A \cap B)^C = A^C \cup B^C$ & De Morgan \\
$(A \cup B)^C = A^C \cap B^C$ \\ \hline
$A \cup (A \cap B) = A$ & Absorption \\
$A \cap (A \cup B) = A$ \\ \hline
$A \cup A^C = U$ & Negation \\
$A \cap A^C = \emptyset$ \\
\end{tabular}
\end{column}
\end{columns}
\end{frame}
與我如何調整寬度參數無關,它看起來不太好。他們要么互相成長,要么走向正確的邊緣。
有辦法解決這個問題嗎?我可以在列中左對齊表格嗎?
答案1
我認為使用column環境可能會妨礙找到適合tabular環境的大小。當然,一旦我擺脫了column開銷,就需要嘗試相對字體大小,直到找到\footnotesize所需的內容,並將參數減少\tabcolsep到 3pt(預設值:6pt)。
\documentclass{beamer}
\usepackage[norsk]{babel}
\usepackage{array}
\begin{document}
\begin{frame}[c]{Nyttige regler for sett}
\setlength{\tabcolsep}{3pt} % default value: 6pt
\footnotesize
\begin{tabular}[t]{@{}l|c@{}}
Ekvivalens & Navn \\ \hline
$A \cap U = A$ & Identity\\
$A \cup \emptyset = A$ \\ \hline
$A \cup U = U$ & Domination\\
$A \cap \emptyset = \emptyset$\\ \hline
$A \cup A = A$ & Idempotent\\
$A \cap A = A$ \\ \hline
$A = (A^C)^C$ & Negation\\ \hline
$A \cup B = B \cup A$ & Commutative\\
$A \cap B = B \cap A$ \\
\end{tabular}%
\hspace{\fill}
\begin{tabular}[t]{@{}l|c@{}}
Ekvivalens & Navn \\ \hline
$(A \cup B) \cup C = A \cup (B \cup C)$ & Associative\\
$(A \cap B) \cap C = A \cap (B \cap C)$ \\ \hline
$A \cup (B \cap C) = (A \cup B) \cap (A \cup C)$ & Distributive\\
$A \cap (B \cup C) = (A \cap B) \cup (A \cap C)$ \\ \hline
$(A \cap B)^C = A^C \cup B^C$ & De Morgan \\
$(A \cup B)^C = A^C \cap B^C$ \\ \hline
$A \cup (A \cap B) = A$ & Absorption \\
$A \cap (A \cup B) = A$ \\ \hline
$A \cup A^C = U$ & Negation \\
$A \cap A^C = \emptyset$ \\
\end{tabular}
\end{frame}
\end{document}