KTUGFaq
KTUG FAQ
FrontPage › MultiEnumPackage
[ÆíÁý]
multienum ÆÐÅ°Áö ¶
¿¬½À¹®Á¦ ÇØ´ä µîÀ» ÀÛ¼ºÇϱ⿡ ÁÁÀº Åø·Î multienum ÆÐÅ°Áö°¡ ÀÖ½À´Ï´Ù. (CTAN¿¡¼ ã¾Æº¸¼¼¿ä)
´ÙÀ½ ¼Ò½º¸¦ ÄÄÆÄÀÏÇغ¸½Ã°í¿ä.
%This is a 2-page sample illustrating how to use the %multienum package \documentclass{article} \setlength{\textwidth}{6in} \setlength{\textheight}{8.5in} \setlength{\topmargin}{-0.5in} \setlength{\oddsidemargin}{0.25in} \usepackage{multicol,multienum} \begin{document} \begin{center} {\Large\bf Sample formating using {\tt multienumerate}} \end{center} \bigskip Sometimes we want to typeset the solutions to exercises. This is easy to do using the {\tt multienumerate} environment. \subsection*{Answers to All Exercises} \begin{multienumerate} \mitemxxxx{Not}{Linear}{Not}{Quadratic} \mitemxxxo{Not}{Linear}{No; if $x=3$, then $y=-2$.} \mitemxx{$(x_1,x_2)=(2+\frac{1}{3}t,t)$ or $(s,3s-6)$}{$(x_1,x_2,x_3)=(2+\frac{5}{2}s-3t,s,t)$} \mitemx{$(x_1,x_2,x_3,x_4)= (\frac{1}{4}+\frac{5}{4}s+\frac{3}{4}t- u,s,t,u)$ or $(s,t,u,\frac{1}{4}-s+\frac{5}{4}t+\frac{3}{4}u)$} \mitemxxxx{$(2,-1,3)$}{None}{$(2,1,0,1)$}{$(0,0,0,0)$} \end{multienumerate} \bigskip \hrule \bigskip We can also enumerate the items using an even-only or odd only counter. \subsection*{Answers to Even-Numbered Exercises} \begin{multienumerate}[evenlist] \mitemxxxx{Not}{Linear}{Not}{Quadratic} \mitemxxxo{Not}{Linear}{No; if $x=3$, then $y=-2$.} \mitemxx{$(x_1,x_2)=(2+\frac{1}{3}t,t)$ or $(s,3s-6)$}{$(x_1,x_2,x_3)=(2+\frac{5}{2}s-3t,s,t)$} \mitemx{$(x_1,x_2,x_3,x_4)= (\frac{1}{4}+\frac{5}{4}s+\frac{3}{4}t- u,s,t,u)$ or $(s,t,u,\frac{1}{4}-s+\frac{5}{4}t+\frac{3}{4}u)$} \mitemxxxx{$(2,-1,3)$}{None}{$(2,1,0,1)$}{$(0,0,0,0)$} \end{multienumerate} \hrule \subsection*{Answers to Odd-Numbered Exercises} \begin{multienumerate}[oddlist] \mitemxxxx{Not}{Linear}{Not}{Quadratic} \mitemxxxo{Not}{Linear}{No; if $x=3$, then $y=-2$.} \mitemxx{$(x_1,x_2)=(2+\frac{1}{3}t,t)$ or $(s,3s-6)$}{$(x_1,x_2,x_3)=(2+\frac{5}{2}s-3t,s,t)$} \mitemx{$(x_1,x_2,x_3,x_4)= (\frac{1}{4}+\frac{5}{4}s+\frac{3}{4}t- u,s,t,u)$ or $(s,t,u,\frac{1}{4}-s+\frac{5}{4}t+\frac{3}{4}u)$} \mitemxxxx{$(2,-1,3)$}{None}{$(2,1,0,1)$}{$(0,0,0,0)$} \end{multienumerate} \bigskip \hrule \bigskip Sometimes we want to create sublists which are enumerated using an alpha counter. \begin{multienumerate} \mitemx{Which of the following numbers is the solution of the equation $x+3=7$:} \begin{multienumerate} \mitemxxxx{1}{2}{3}{4} \end{multienumerate} \mitemx{The value of $\log_28$ is:} \begin{multienumerate} \mitemxxxx{1}{$-1$}{3}{$-3$} \end{multienumerate} \end{multienumerate} \pagebreak \begin{multicols}{2} \subsection*{Answers to All Exercises} \begin{multienumerate} \mitemxx{Not}{Linear} \mitemxx{Not}{Quadratic} \mitemxx{Not}{Linear} \mitemx{$(x_1,x_2)=(2+\frac{1}{3}t,t)$ or $(s,3s-6)$} \mitemx{$(x_1,x_2,x_3)=(2+\frac{5}{2}s-3t,s,t)$} \mitemx{$(x_1,x_2,x_3,x_4)= (\frac{1}{4}+\frac{5}{4}s+\frac{3}{4}t- u,s,t,u)$ or $(s,t,u,\frac{1}{4}-s+\frac{5}{4}t+\frac{3}{4}u)$} \mitemxx{$(2,-1,3)$}{None} \mitemxx{$(2,1,0,1)$}{$(0,0,0,0)$} \mitemxx{Not}{Linear} \mitemxx{Not}{Quadratic} \mitemxx{Not}{Linear} \mitemx{$(x_1,x_2)=(2+\frac{1}{3}t,t)$ or $(s,3s-6)$} \mitemx{$(x_1,x_2,x_3)=(2+\frac{5}{2}s-3t,s,t)$} \mitemx{$(x_1,x_2,x_3,x_4)= (\frac{1}{4}+\frac{5}{4}s+\frac{3}{4}t- u,s,t,u)$ or $(s,t,u,\frac{1}{4}-s+\frac{5}{4}t+\frac{3}{4}u)$} \mitemxx{$(2,-1,3)$}{None} \mitemxx{$(2,1,0,1)$}{$(0,0,0,0)$} \mitemxx{Not}{Linear} \mitemxx{Not}{Quadratic} \mitemxx{Not}{Linear} \mitemx{$(x_1,x_2)=(2+\frac{1}{3}t,t)$ or $(s,3s-6)$} \mitemx{$(x_1,x_2,x_3)=(2+\frac{5}{2}s-3t,s,t)$} \mitemx{$(x_1,x_2,x_3,x_4)= (\frac{1}{4}+\frac{5}{4}s+\frac{3}{4}t- u,s,t,u)$ or $(s,t,u,\frac{1}{4}-s+\frac{5}{4}t+\frac{3}{4}u)$} \mitemxx{$(2,-1,3)$}{None} \mitemxx{$(2,1,0,1)$}{$(0,0,0,0)$} \end{multienumerate} \subsection*{Multiple Choice} \begin{multienumerate} \mitemx{Which of the following numbers is the solution of the equation $x+3=7$:} \begin{multienumerate} \mitemxxxx{1}{2}{3}{4} \end{multienumerate} \mitemx{The value of $\log_28$ is:} \begin{multienumerate} \mitemxxxx{1}{$-1$}{3}{$-3$} \end{multienumerate} \mitemx{Which of the following numbers is the solution of the equation $x+3=7$:} \begin{multienumerate} \mitemxxxx{1}{2}{3}{4} \end{multienumerate} \mitemx{The value of $\log_28$ is:} \begin{multienumerate} \mitemxxxx{1}{$-1$}{3}{$-3$} \end{multienumerate} \mitemx{Which of the following numbers is the solution of the equation $x+3=7$:} \begin{multienumerate} \mitemxxxx{1}{2}{3}{4} \end{multienumerate} \mitemx{The value of $\log_28$ is:} \begin{multienumerate} \mitemxxxx{1}{$-1$}{3}{$-3$} \end{multienumerate} \end{multienumerate} \end{multicols} \end{document}
gay cocks gay incest gay sex stories gay men gay sex pics free gay videos free gay movies gay teen gay naked men gay boy gay anime gay fuck twinks gay rights nude gay gay sex nude gay free gay pictures free gay pic gay bondage gay universe gay pics gay men having sex gay hentai gay naked men free gay clips gay boy gay xxx free gay video gay people gay videos gay bondage gay anal free gay mpegs gay guys gay cum gay porn gay rights gay spanking gay sex free gay stories free gay stories gay black gay movies studs gay pictures gay bondage gay boys free gay clips gay cock gay sex pics gay teens free gay videos free gay sex pics gay teen gay dick free gay mpegs