\documentclass[12pt]{classPres} \usepackage{tkz-fct} \author{} \title{} \date{} \begin{document} \begin{frame}{Questions flashs} \begin{center} \vfill Terminale Maths complémentaires \vfill 30 secondes par calcul \vfill \tiny \jobname \end{center} \end{frame} \begin{frame}{Calcul 1} Résoudre l'inéquation suivante \[ e^{2-3x} \leq e^{5} \] \end{frame} \begin{frame}{Calcul 2} Calculer $P(E\cap F)$ \begin{center} \begin{tikzpicture}[xscale=2, grow=right] \node {.} child {node {$F$} child {node {$E$} edge from parent node[below] {0.8} } child {node {$\overline{E}$} edge from parent node[above] {0.2} } edge from parent node[below] {0.3} } child[missing] {} child { node {$\overline{F}$} child {node {$E$} edge from parent node[below] {0.9} } child {node {$\overline{E}$} edge from parent node[above] {0.1} } edge from parent node[above] {0.7} } ; \end{tikzpicture} \end{center} \end{frame} \begin{frame}{Calcul 3} Vérifier que \[ F(x) = (x+1)e^{-x^2} + \frac{2}{3} \] est une primitive de \[ f(x) = (-2x^2 -2x + 1)e^{-x^2} \] \end{frame} \begin{frame}[fragile]{Calcul 4} Déterminer la quantité suivante \[ \lim_{\substack{x \rightarrow 0 \\ >}} \frac{1}{x}= \] \begin{center} \begin{tikzpicture}[xscale=0.8, yscale=0.5] \tkzInit[xmin=-5,xmax=5,xstep=1, ymin=-5,ymax=5,ystep=1] \tkzGrid \tkzAxeXY \tkzFct[domain=-5:-0.1,color=red,very thick]% {1/ \x}; \tkzFct[domain=0.1:5,color=red,very thick]% {1/ \x}; \end{tikzpicture} \end{center} \end{frame} \begin{frame}{Fin} \begin{center} On retourne son papier. \end{center} \end{frame} \end{document}