\documentstyle[11pt]{article} \oddsidemargin -0.1in \evensidemargin -0.1in \topmargin 0.0cm %\topmargin -1.1cm \headheight 0.5cm \headsep 0.3cm \textheight 24.5cm %\textheight 24.5cm \textwidth 16.5cm \begin{document} \center{\bf{FIRST YEAR CALCULUS: TOPICS TO BE COVERED}} \center{Julia Yeomans} \begin{itemize} \item[{\bf{A.}}] \begin{center}{\bf{DIFFERENTIATION}}\end{center} \item[{\bf{A1.}}] Standard Forms \item[{\bf{A2.}}] Derviatives from first principles \item[{\bf{A3.}}] Useful rules \item[{\bf{A4.}}] Chain rule \item[{\bf{A5.}}] Changing variables in differential equations \item[{\bf{A6.}}] Implicit differentiation \item[{\bf{A7.}}] Powers and inverse functions \item[{\bf{A8.}}] Parametric differentiation \item[{\bf{A9.}}] Leibnitz theorem \begin{center}\item[{\bf{B.}}] {\bf{INTEGRATION}}\end{center} \item[{\bf{B1.}}] Standard forms \item[{\bf{B2.}}] Integration by inspection \item[{\bf{B3.}}] Integration by change of variable \item[{\bf{B4.}}] Integration by partial fractions \item[{\bf{B5.}}] Integration by parts \item[{\bf{B6.}}] Integration by reduction forumulae \item[{\bf{B7.}}] Interpretation of an integral \item[{\bf{B8.}}] Properties of definite integrals \item[{\bf{B9.}}] Applications of integration \item[{\bf{B10.}}] Line integrals \begin{center}\item[{\bf{C.}}] {\bf{SERIES AND LIMITS}}\end{center} \item[{\bf{C1.}}] {{Introduction and Notation}} \item[{\bf{C2.}}] {{Taylor and Maclaurin Series}} \item[(a)] Taylor series %notation 1 %\item[(b)] Taylor series notation 2 %\item [(c)] Proof \item [(b)] Maclaurin series %\item [(e)] eg 1: expand $\sin x$ about $x = 0$ %\item [(f)] eg 2: expand $\sqrt{x}$ about $x = 1$ \item [(c)] Common series expansions \item [(d)] Manipulation of Series %eg 3: (manipulation of series) % expand $ \mbox{tanh}\; x$ about $x = 0$ \item[{\bf{C3.}}] {{Limits}} \item[(a)] definition of a limit \item [(b)] continuous, discontinuous and differentiable functions \item[(c)] finding limits \begin{center}\item[D.]{\bf{CALCULUS OF FUNCTIONS OF MORE THAN ONE VARIABLE}}\\ \end{center} \item[{\bf{D1.}}] Co-ordinate systems \item[{\bf{D2.}}] Graphical representation \item[{\bf{D3.}}] Partial derivatives: introduction and notation \\ \item[(a)] definition and notation %\item[(b)] an e.g. from first principles %\item[(c)] another e.g. \item[(b)] higher order derivatives $\partial_{xy} f = \partial_{yx} f$ \item[(c)] geometrical interpretation \item[(d)] Taylor expansion \\ \item[{\bf{D4.}}] Total derivatives \item[(a)] total differential \item[(b)] small changes \item[(c)] chain rule %\item[(c)] $u = u(x,y);\;\; x = x(t),\;\; y=y(t);\;\; \frac{du}{dt}$? %\item[(d)] $u = u(x,y);\;\; y = y(x),\;\; \frac{du}{dx}$? %\item[(e)] $u = u(x,y);\;\; x = x(s,t),\;\; y = y(s,t);\;\; (\frac{du}{ds})_{t}$? (chain rule) %\item[(f)] $u = u(x,y);\;\; y = y(x,z);\;\; (\frac{du}{dz})_{x}?\;\; (\frac{du}{dx})_{z}?$ \item[(d)] implicit differentiation \\ \item[{\bf{D5.}}] Changing variables \item[{\bf{D6.}}] Exact derivatives \item[{\bf{D7.}}] Maxima, minima and saddle points \end{itemize} \end{document}