\documentclass[11pt]{article} \usepackage{amsfonts} \usepackage{amsmath,amsthm,amssymb} \usepackage{fullpage} \usepackage{array} \usepackage{supertabular} \renewcommand{\rmdefault}{\sfdefault} \newcounter{lecturectr} \newcommand{\lecture} {\addtocounter{lecturectr}{1} % Day \arabic{lecturectr}} \newcommand{\ds}{\displaystyle} \newcommand{\R}{{\mathbb R}} \title{Mathematics 11 -- Term Syllabus\vskip -.2in} \author{Fall 2004 --- Based on Stewart 5$^e$} %\date{\today} \begin{document} \maketitle \vskip -.2in %\thispagestyle{empty} \newcommand{\PreserveBackslash}[1]{\let\temp=\\#1\let\\=\temp} \let\PBS=\PreserveBackslash \renewcommand{\arraystretch}{2} %\setlength{\extrarowheight}{2pt} \setlength{\tabcolsep}{8pt} \tabletail{\hline} \hskip-.3in \begin{supertabular} {|l |>{\PBS\raggedright\hspace{0pt}}p{.28\textwidth} |>{\PBS\raggedright\hspace{0pt}\parskip=5pt}p{.55\textwidth}|} \hline \textbf{Lecture} &\textbf{Sections} &\textbf{Topic} \\ \hline \lecture &13.1, 13.2 &Coordinates and vectors in $\R^2$ and $\R^3$ \\ \hline \lecture &13.3, 13.4 &Dot product and cross product \\ \hline \lecture &13.5 &Lines and planes in $\R^3$ \\ \hline \lecture &14.1, 14.2 &Vector functions, space curves, derivatives and integrals \\ \hline \lecture &14.3, 14.4 &Arclength, velocity, acceleration \\ \hline \lecture &15.1, 15.2 &Functions of several variables, limits, continuity \\ \hline \lecture &15.3 &Partial Derivatives \\ \hline \lecture &15.4 &Tangent Planes and Approximation \\ \hline \lecture &15.5 &Chain Rule \\ \hline \lecture &15.6 &Directional Derivatives and the gradient \\ \hline \lecture &15.7 &Maxima and Minima \\ \hline \lecture &15.7 &Maxima and Minima \\ \hline \lecture &16.1 &Double Integrals over rectangles \\ \hline \lecture &16.2 &Iterated Integrals \\ \hline \lecture &16.3 &Double Integrals over General Regions \\ \hline \lecture &16.4 &Double Integrals in polar coordinates \\ \hline \lecture &16.6 &Surface Area \\ \hline \lecture &16.7 &Triple Integrals \\ \hline \lecture &13.7, 16.8 &Cylindrical and spherical coordinates; Integrals \\ \hline \lecture &17.1, 17.2 &Vector Fields, Line Integrals \\ \hline \lecture &17.3 &Fundamental Theorem for line integrals \\ \hline \lecture &17.3 &Fundamental Theorem for line integrals \\ \hline \lecture &17.4 &Green's Theorem \\ \hline \lecture &17.5 &Curl and Divergence \\ \hline \lecture &17.6 &Parametric Surfaces and their Areas \\ \hline \lecture &17.7 &Surface Integrals \\ \hline \lecture &17.8, 17.9 &Stokes' and Gauss' Theorem \\ \hline \lecture &17.8, 17.9 &Stokes' and Gauss' theorem \\ \hline \lecture & &Wrap up \\ \hline \end{supertabular} \end{document}