From mboxrd@z Thu Jan 1 00:00:00 1970 X-Msuck: nntp://news.gmane.io/gmane.comp.tex.context/51184 Path: news.gmane.org!not-for-mail From: Xan Newsgroups: gmane.comp.tex.context Subject: startcombination alignment problem Date: Wed, 10 Jun 2009 18:26:16 +0200 Message-ID: <4A2FDEA8.9060901@telefonica.net> Reply-To: mailing list for ConTeXt users NNTP-Posting-Host: lo.gmane.org Mime-Version: 1.0 Content-Type: text/plain; charset="iso-8859-15"; Format="flowed" Content-Transfer-Encoding: quoted-printable X-Trace: ger.gmane.org 1244651256 14621 80.91.229.12 (10 Jun 2009 16:27:36 GMT) X-Complaints-To: usenet@ger.gmane.org NNTP-Posting-Date: Wed, 10 Jun 2009 16:27:36 +0000 (UTC) Cc: Xan To: mailing list for ConTeXt users Original-X-From: ntg-context-bounces@ntg.nl Wed Jun 10 18:27:31 2009 Return-path: Envelope-to: gctc-ntg-context-518@m.gmane.org Original-Received: from ronja.vet.uu.nl ([131.211.172.88] helo=ronja.ntg.nl) by lo.gmane.org with esmtp (Exim 4.50) id 1MEQe7-0000r0-Qo for gctc-ntg-context-518@m.gmane.org; Wed, 10 Jun 2009 18:27:27 +0200 Original-Received: from localhost (localhost [127.0.0.1]) by ronja.ntg.nl (Postfix) with ESMTP id D2D3B1FB3C; Wed, 10 Jun 2009 18:27:25 +0200 (CEST) Original-Received: from ronja.ntg.nl ([127.0.0.1]) by localhost (smtp.ntg.nl [127.0.0.1]) (amavisd-new, port 10024) with LMTP id 15354-07; Wed, 10 Jun 2009 18:26:48 +0200 (CEST) Original-Received: from ronja.vet.uu.nl (localhost [127.0.0.1]) by ronja.ntg.nl (Postfix) with ESMTP id F41411FA4C; Wed, 10 Jun 2009 18:26:47 +0200 (CEST) Original-Received: from localhost (localhost [127.0.0.1]) by ronja.ntg.nl (Postfix) with ESMTP id 720A51FA4C for ; Wed, 10 Jun 2009 18:26:46 +0200 (CEST) Original-Received: from ronja.ntg.nl ([127.0.0.1]) by localhost (smtp.ntg.nl [127.0.0.1]) (amavisd-new, port 10024) with LMTP id 16406-04 for ; Wed, 10 Jun 2009 18:26:26 +0200 (CEST) Original-Received: from filter2-nij.mf.surf.net (filter2-nij.mf.surf.net [195.169.124.153]) by ronja.ntg.nl (Postfix) with ESMTP id 8A5041FA41 for ; Wed, 10 Jun 2009 18:26:26 +0200 (CEST) Original-Received: from ctsmtpout2.frontal.correo (outmailhost.telefonica.net [213.4.149.242]) by filter2-nij.mf.surf.net (8.13.8/8.13.8/Debian-3) with ESMTP id n5AGQPUw011940 for ; Wed, 10 Jun 2009 18:26:25 +0200 Original-Received: from [172.26.0.4] (83.58.163.247) by ctsmtpout2.frontal.correo (7.2.056.6) (authenticated as dxpublica) id 4A1E4E5F002D1129; Wed, 10 Jun 2009 18:26:16 +0200 User-Agent: Thunderbird 2.0.0.21 (X11/20090318) X-Bayes-Prob: 0.0001 (Score 0, tokens from: @@RPTN) X-CanIt-Geo: ip=213.4.149.242; country=ES; region=29; city=Madrid; latitude=40.4000; longitude=-3.6833; http://maps.google.com/maps?q=40.4000,-3.6833&z=6 X-CanItPRO-Stream: uu:ntg-context@ntg.nl (inherits from uu:default, base:default) X-Canit-Stats-ID: 240921144 - c01018436fe7 - 20090610 X-Scanned-By: CanIt (www . roaringpenguin . com) on 195.169.124.153 X-Virus-Scanned: amavisd-new at ntg.nl X-BeenThere: ntg-context@ntg.nl X-Mailman-Version: 2.1.11 Precedence: list List-Id: mailing list for ConTeXt users List-Unsubscribe: , List-Archive: List-Post: List-Help: List-Subscribe: , Original-Sender: ntg-context-bounces@ntg.nl Errors-To: ntg-context-bounces@ntg.nl X-Virus-Scanned: amavisd-new at ntg.nl Xref: news.gmane.org gmane.comp.tex.context:51184 Archived-At: Hi, I want to put three graphics by this way: [graphic 1] [graphic 2] [graphic 3] where graphic 3 is centered. I use combination, but graphic 3 puts me in left [graphic 1] [graphic 2] [graphic 3] How can I solve that? Thanks in advance, Xan. PS: Please, CCme. I put the code: \placefigure [here] [figura-area] {Camins sobre $w$} {\startcombination[2*1] { \starttikzpicture[scale=3D1] % Els punts \filldraw (0,-4) circle (2pt); \filldraw (0.4216,3.9603) circle (2pt); % primer punt: avaluo ({3*sin(\t = r)},{4*cos(\t r)}); a t =3D 0.141 \filldraw (-0.4216,3.9603) circle (2pt); % primer punt: avaluo = ({3*sin(\t r)},{4*cos(\t r)}); a t =3D -0.141 % Les l=EDnies entre els punts \draw (-0.4216,3.9603) -- (0.4216,3.9603); \draw plot[domain=3D-3.141:-0.141,smooth,variable=3D\t] ({3*sin(\t = r)},{4*cos(\t r)}); \draw plot[domain=3D0.141:3.141,smooth,variable=3D\t] ({3*sin(\t = r)},{4*cos(\t r)}); \filldraw (0,-4) circle (2pt); % perqu=E8 me quedi el punt damunt. % Els combings % Dibuixo: % amb y la l=EDnia recta que uneix els dos punts, directament % per x faig un funci=F3 del sinus (sin nx + ax =3D k) \draw plot[domain=3D0:0.4216,smooth,variable=3D\t] ({-0.857727*\t -sin = (7.31228*\t r) },{18.8812*\t -4 }); \draw plot[domain=3D0:0.4216,smooth,variable=3D\t] ({+0.857727*\t +sin = (7.31228*\t r) },{18.8812*\t -4 }); % el sentit d'omega \draw[decorate,decoration=3D{markings,mark=3Dat position .9 with = {\arrow[blue,line width=3D1mm]{<}}}] = plot[domain=3D-3.141:3.141,smooth,variable=3D\t] ({3*sin(\t r)},{4*cos(\t r= )}); % Els punts de les cel=B7les % Calcul els combings per a y=3D 0 i y=3D1 \filldraw (-1.181475, 0) circle (2pt); \filldraw (1.181475, 0) circle (2pt); %\filldraw (1.161048, 1) circle (2pt); %\filldraw (-1.161048, 1) circle (2pt); % Els noms \draw (0, -4.3) node {$1 \in G$}; \draw (2.5, -3) node {$w$}; \draw (-1.8, -0.3) node {$\sigma_{i+1}(j)$}; \draw (1.65, -0.3) node {$\sigma_i(j)$}; % Els noms dels camins %\draw (1, 0.3) node {$a$}; %\draw (3, 0.3) node {$b$}; %\draw (3.7, 1) node {$c$}; %\draw (3, 1.7) node {$d$}; %\draw (1, 1.7) node {$e$}; %\draw (0.3, 1) node {$f$}; %\draw (2.3, 1) node {$g$}; % PROVES %\draw[out=3D45,in=3D-45] (0,0) to (0.5,8); %\draw[color=3Dblue,->] (0,0) .. controls (0.1,2) .. (0.2,3) .. controls = (0.3,4) and (0.4,6) .. (0.5,8); %\draw (0,0) arc (-90:90:3 and 4); %\draw (0,0) arc (270:90:3 and 4); %\draw[color=3Dgreen] plot[domain=3D-3.141:3.141,smooth,variable=3D\t] = ({4*sin(\t + (.1 * rand) r)},{4*cos(\t r)}); %\draw (0,0) arc (-90:81.82:2 and 4); %\draw[decorate,decoration=3D{random steps,segment length=3D2mm, = amplitude=3D2pt}] (0,0) arc (-90:97.18:3.5 and 4); % \draw[very thin,color=3Dgray] (-5.1,-5.1) grid [step=3D1] (5.9,5.9); % \draw[->] (-5.2,0) -- (6.2,0) node[right] {$x$}; % \draw[->] (0,-5.2) -- (0,5.2) node[above] {$y$}; % r =3D \frac{-1}{3} x + 3 %\filldraw (3,2) circle (2pt); %\filldraw (-3,4) circle (2pt); %\draw (-6,5) -- (6,1); %\draw (1, 3.5) node {$r$}; \stoptikzpicture} {Les seccions de $\pi(w(i))$.} { \starttikzpicture[scale=3D1] % Els punts \filldraw (0,-4) circle (2pt); \filldraw (0.4216,3.9603) circle (2pt); % primer punt: avaluo ({3*sin(\t = r)},{4*cos(\t r)}); a t =3D 0.141 \filldraw (-0.4216,3.9603) circle (2pt); % primer punt: avaluo = ({3*sin(\t r)},{4*cos(\t r)}); a t =3D -0.141 % Les l=EDnies entre els punts \draw (-0.4216,3.9603) -- (0.4216,3.9603); \draw plot[domain=3D-3.141:-0.141,smooth,variable=3D\t] ({3*sin(\t = r)},{4*cos(\t r)}); \draw plot[domain=3D0.141:3.141,smooth,variable=3D\t] ({3*sin(\t = r)},{4*cos(\t r)}); \filldraw (0,-4) circle (2pt); % perqu=E8 me quedi el punt damunt. % Els combings % Dibuixo: % amb y la l=EDnia recta que uneix els dos punts, directament % per x faig un funci=F3 del sinus (sin nx + ax =3D k) \draw plot[domain=3D0:0.4216,smooth,variable=3D\t] ({-0.857727*\t -sin = (7.31228*\t r) },{18.8812*\t -4 }); \draw plot[domain=3D0:0.4216,smooth,variable=3D\t] ({+0.857727*\t +sin = (7.31228*\t r) },{18.8812*\t -4 }); % el sentit d'omega \draw[decorate,decoration=3D{markings,mark=3Dat position .9 with = {\arrow[blue,line width=3D1mm]{<}}}] = plot[domain=3D-3.141:3.141,smooth,variable=3D\t] ({3*sin(\t r)},{4*cos(\t r= )}); % Els punts de les cel=B7les % Calcul els combings per a y=3D 0 i y=3D1 \filldraw (-1.181475, 0) circle (2pt); \filldraw (1.181475, 0) circle (2pt); %\filldraw (1.161048, 1) circle (2pt); %\filldraw (-1.161048, 1) circle (2pt); % Els noms \draw (0, -4.3) node {$1 \in G$}; \draw (2.5, -3) node {$w$}; \draw (-1.8, -0.3) node {$\sigma_{i+1}(j)$}; \draw (1.65, -0.3) node {$\sigma_i(j)$}; % Els noms dels camins %\draw (1, 0.3) node {$a$}; %\draw (3, 0.3) node {$b$}; %\draw (3.7, 1) node {$c$}; %\draw (3, 1.7) node {$d$}; %\draw (1, 1.7) node {$e$}; %\draw (0.3, 1) node {$f$}; %\draw (2.3, 1) node {$g$}; \stoptikzpicture} {El cam=ED $\theta_{i,j}$.} \stopcombination \startcombination[1*1] { \starttikzpicture[scale=3D1] % Els punts \filldraw (0,-4) circle (2pt); \filldraw (0.4216,3.9603) circle (2pt); % primer punt: avaluo ({3*sin(\t = r)},{4*cos(\t r)}); a t =3D 0.141 \filldraw (-0.4216,3.9603) circle (2pt); % primer punt: avaluo = ({3*sin(\t r)},{4*cos(\t r)}); a t =3D -0.141 % Les l=EDnies entre els punts \draw (-0.4216,3.9603) -- (0.4216,3.9603); \draw plot[domain=3D-3.141:-0.141,smooth,variable=3D\t] ({3*sin(\t = r)},{4*cos(\t r)}); \draw plot[domain=3D0.141:3.141,smooth,variable=3D\t] ({3*sin(\t = r)},{4*cos(\t r)}); \filldraw (0,-4) circle (2pt); % perqu=E8 me quedi el punt damunt. % Els combings % Dibuixo: % amb y la l=EDnia recta que uneix els dos punts, directament % per x faig un funci=F3 del sinus (sin nx + ax =3D k) \draw plot[domain=3D0:0.4216,smooth,variable=3D\t] ({-0.857727*\t -sin = (7.31228*\t r) },{18.8812*\t -4 }); \draw plot[domain=3D0:0.4216,smooth,variable=3D\t] ({+0.857727*\t +sin = (7.31228*\t r) },{18.8812*\t -4 }); % el sentit d'omega \draw[decorate,decoration=3D{markings,mark=3Dat position .9 with = {\arrow[blue,line width=3D1mm]{<}}}] = plot[domain=3D-3.141:3.141,smooth,variable=3D\t] ({3*sin(\t r)},{4*cos(\t r= )}); % el sentit de \tau_i \draw[decorate,decoration=3D{markings,mark=3Dat position .4 with = {\arrow[green,line width=3D1mm]{<}}}] = plot[domain=3D0:0.4216,smooth,variable=3D\t] ({-0.857727*\t -sin (7.31228*\= t = r) },{18.8812*\t -4 }); \draw[decorate,decoration=3D{markings,mark=3Dat position .6 with = {\arrow[green,line width=3D1mm]{>}}}] = plot[domain=3D0:0.4216,smooth,variable=3D\t] ({+0.857727*\t +sin (7.31228*\= t = r) },{18.8812*\t -4 }); % Els punts de les cel=B7les % Calcul els combings per a y=3D 0 i y=3D1 %\filldraw (-1.181475, 0) circle (2pt); %\filldraw (1.181475, 0) circle (2pt); %\filldraw (1.161048, 1) circle (2pt); %\filldraw (-1.161048, 1) circle (2pt); %\filldraw [top color=3Dyellow] plot[domain=3D0:0.4216,smooth,variable=3D\t= ] = ({+0.857727*\t +sin (7.31228*\t r) },{18.8812*\t -4 }); % Els noms \draw (0, -4.3) node {$1 \in G$}; \draw (2.5, -3) node {$w$}; \draw (1.5,0) node {$\tau_i$}; \draw (-0.8,4.5) node {$\sigma_{i+1}(\frac{\lvert w \rvert}{2})$}; \draw (0.8,4.5) node {$\sigma_i(\frac{\lvert w \rvert}{2})$}; %\draw (-1.8, -0.3) node {$\sigma_{i+1}(j)$}; %\draw (1.65, -0.3) node {$\sigma_i(j)$}; % Els noms dels camins %\draw (1, 0.3) node {$a$}; %\draw (3, 0.3) node {$b$}; %\draw (3.7, 1) node {$c$}; %\draw (3, 1.7) node {$d$}; %\draw (1, 1.7) node {$e$}; %\draw (0.3, 1) node {$f$}; %\draw (2.3, 1) node {$g$}; \stoptikzpicture} {El cam=ED $\tau_i$} \stopcombination } ___________________________________________________________________________= ________ If your question is of interest to others as well, please add an entry to t= he Wiki! maillist : ntg-context@ntg.nl / http://www.ntg.nl/mailman/listinfo/ntg-cont= ext webpage : http://www.pragma-ade.nl / http://tex.aanhet.net archive : https://foundry.supelec.fr/projects/contextrev/ wiki : http://contextgarden.net ___________________________________________________________________________= ________