%% please leave the formatting untouched and modify just the %% version name and the statements. %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% % headers and macros section \documentclass[12pt,a4paper]{article} %\usepackage[latin1]{inputenc} %\usepackage[T1]{fontenc} %\usepackage[frenchb]{babel} \font\fonttit=cmr12 scaled \magstep 3 \font\fontimo=cmr12 scaled \magstep 1 \font\fontversion=cmr12 scaled \magstep 1 \def\problem#1{\vskip 0.7 true cm\noindent{\bf #1.\ }} \def\version#1{\rightline{Version: \fontversion#1}} \oddsidemargin=0pt \textwidth=21cm \addtolength{\textwidth}{-2in} \setlength{\textheight}{297mm} \addtolength{\textheight}{-1.5in} \topmargin= -.5in \headheight=0pt \headsep=0pt %\addtolength{\textheight}{1in} %\addtolength{\textheight}{1in} \pagestyle{empty} \begin{document} %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% % please put the name of your language in english here: \version{French} %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% \vskip %1.5 0.4 true cm {\fonttit{\centerline{Premier Jour}}} \vskip .5 true cm {\fontimo{\centerline{Olympiades d'Iran - 5 mai 1999}}} \vskip 0.3 true cm %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% % those are the problems: \problem{1}% Existe-t-il un entier qui soit une puissance de $2$ et tel que l'on puisse obtenir une autre puissance de $2$ par une permutation de ses chiffres d\'ecimaux ? %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% \problem{2}% Soit $ABC$ un triangle dont les angles $\hat{B}$ et $\hat{C}$ mesurent plus de $45$ degr\'es. On construit les triangles isoc\`ele-rectangles $CAM$ et $BAN$ à l'ext\'erieur du triangle $ABC$ de telle sorte que les angles droits sont $\widehat{CAM}$ et $\widehat{BAN}$. On construit \'egalement le triangle isoc\`ele-rectangle $BPC$ à l'int\'erieur de $ABC$ de telle sorte que son angle droit est $\widehat{BPC}$. Montrer que le triangle $MNP$ est \'egalement isoc\`ele-rectangle. %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% \problem{3}% On a un r\'eseau $100\times 100$ avec un arbre plant\'e sur chacun des $10000$ points. Combien peut-on couper d'arbres au maximum de telle mani\`ere que de chaque endroit o\`u un arbre a \'et\'e coup\'e, on ne puisse constater la coupe d'aucun autre arbre. (En d'autres termes, toute ligne joignant deux sites o\`u les arbres ont \'et\'e coup\'es doit contenir au moins un arbre.) %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% \vskip .5 true cm \hrule width 4 true cm \vskip .3 true cm %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% % change here please, this is almost the end: \noindent %Chaque probl\`eme vaut 7 points. \par \noindent Temps accord\'e: 4 heures. % please put the name of your language in english here: \version{French} %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% \vskip %1.5 0.4 true cm { \fonttit {\centerline{Deuxi\`eme Jour}}} \vskip .5 true cm {\fontimo{\centerline{Olympiades d'Iran - 6 mai 1999}}} \vskip .3 true cm %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% % those are the problems: \problem{4}% Trouver tous les entiers naturels $m$ pouvant s'\'ecrire: $$m=\frac1{a_1}+\frac2{a_2}+\dots+\frac{1378}{a_{1378}}$$ o\`u $a_1,\dots a_{1378}$ sont des entiers naturels. %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% \problem{5}% Soit un triangle $ABC$; $P,Q,R$ trois points situ\'es respectivement sur les c\^ot\'es $AB,AC$ et $BC$. $A',B',C'$ trois points situ\'es respectivement sur les droites $(PQ),(PR)$ et $(QR)$ de telle sorte que $(AB)\parallel (A'B')$, $(AC)\parallel (A'C')$ et $(BC)\parallel (B'C')$. Montrer que $$\frac{AB}{A'B'}=\frac{\textbf{aire}(ABC)}{\textbf{aire}(PQR)}.$$ %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% \problem{6}% $A_1,A_2,\dots A_n$ sont $n$ points distincts du plan. On colorie en rouge le milieu de chaque segment $A_i A_j$, $i\ne j$. Trouver le nombre minimum de points rouges. %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% \vskip 2 true cm \hrule width 4 true cm \vskip .3 true cm %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% % change here please, this is almost the end: \noindent %Chaque probl\`eme vaut 7 points. \par \noindent Temps accord\'e: 4 heures. %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% % final stuff \end{document}