- 追加された行はこの色です。
- 削除された行はこの色です。
#rst2hooktail_source
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LaTeX表現集・初歩
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数式掲示板では,高校生から社会人までの広い範囲の方々が,物理や数学の問題について論議しています.この場合,通常のテキスト型やHTML型のの数式表現では,分数や上下の添え字が見にくいので,意思の疎通が悪くなうことが多々あります.「数式」掲示板では,簡易LaTeXeを使うと教科書レベルの高い表現力により自分の問題を示すことが出来ます.
しかし,一番式を使うと効果的であると思われる高校生の皆さんは,知り合いにLaTeX使いが少ない為に,どうしても敬遠勝ちです.そこで,「数式」掲示板のなかで「LaTeX」や「数学的表現」についてのTIPS集を作りましたが,1つのページが15kBytes近くになると動作が不安定になることから,物理かぎプロジェクトの「記事」のフォーマットに変換してみました.
初めてのフォーマットの為に,
- 表のタイトルとヘッダが動かない.
- 目次からクリックして,該当の部分にジャンプしない.
- リストのインデントが巧く出来ない.
等の問題がクリア出来ていません.
しかし,内容的には,一応の初心者さんが,数式を書こうとした場合,必要となる項目は収集したと思われます.
これによって,高校生さんが,自分の問題を気持ちよく論議し,指と目を数式と仲良しにすることで,過酷な受験勉強の一助になれたら嬉しいと思います.
もし,内容に問題があったり,追加項目を感じたりされた場合は,数式掲示板の【手に馴染むLaTeXe #01】[*]_ にご連絡ください.
.. [*] http://hooktail.maxwell.jp/cgi-bin/yybbs/yybbs.cgi?room=room1&mode=res&no=11396&mode2=preview_pc
目次
====
- 基本表現
- 記号(Symblos)
- 矢印と括弧
- 賢いドットと省略型ドット
- ギリシャ文字(小文字,大文字・立体,大文字・斜体)
- 数の種類記号
- ローカル・ルール
基本表現
---------
.. csv-table:: 基本表現
:header: "表示項目", "See", "Type"
"分数 式番号","$y=a/x=\frac{a}{x} \tag{88}.$","y=a/x=\\frac{a}{x} \\tag{88}."
"上付添え字","$x^2+y^2=r^{2},$","x^2+y^2=r^2"
"下付添え字 ","$_{\it n}\mathrm{C}_{\it r} = \frac{n!}{(n-r)!r!},$ ","_{\\it n}\\mathrm{C}_{\\it r} = \\frac{n!}{(n-r)!r!},"
"1次微分","$ \dot x = x^{\prime} = d x/d t=\frac{d x(t)}{d t}=\frac{d}{d t}\left(x(t)\right), $","\\dot x^{\\prime} = dx/dt
=\\frac{d x(t)}{d t}
=\\frac{d}{d t}\\left(x(t)\\right),"
"2次微分","$ \ddot x = x^{\prime \prime} = d^{2} x/d t^{2}=\frac{d^{2} x(t)}{d t^{2}}=\frac{d^{2}}{d t^{2}}\left(x(t)\right),$","\\ddot x^{\\prime \\prime} = d^{2}x/dt^{2}
=\\frac{d^{2} x(t)}{d t^{2}}
=\\frac{d}{d t^{2}}\\left(x(t)\\right),"
"積分 ","$\int f(x)dx, \ g(x)=\int^{x} f(x')dx', \ \int_{\alpha}^{\beta} f(x)dx. $","\\int f(x)dx, \\ g(x)=\\int^{x} f(x')dx', \\ \\int_{\\alpha}^{\\beta} f(x)dx."
"面積分,線積分 \\rm≡\\mathrm","$ \int\mspace{-11mu}\int_{S} f(x,y) \mspace{2mu}{\rm d} x \mspace{2mu}{\rm d}y, \quad \oint_{C} f(z){\rm d}z. $","\\int\\mspace{-11mu}\\int_{S} f(x,y)\\mspace{2mu}{\\rm d}x \\mspace{2mu}\\rm d}y, \\quad \\oint_{C} f(z){\\rm d}z."
"偏微分 ","$ \frac{\partial f(x,y)}{\partial x} =\partial_{x}f(x,y)=f_{x}(x,y),$","\\frac{\\partial f(x,y)}{\\partial x} =\\partial_{x}f(x,y)=f_{x}(x,y),"
"列ヴェクタと行列の表示","$\left( \begin{array}{cc} A^{1}\\ A^{2}\\ \end{array} \right) =\left(\begin{array}{cc} g^{11} & g^{12} \\ g^{21} & g^{22} \\ \end{array} \right) \left( \begin{array}{cc} A_{1}\\ A_{2}\\ \end{array} \right).$", "\left( \begin{array}{cc} A^{1}\\ A^{2}\\ \end{array} \right) =\left(\begin{array}{cc} g^{11} & g^{12} \\ g^{21} & g^{22} \\ \end{array} \right) \left( \begin{array}{cc} A_{1}\\ A_{2}\\ \end{array} \right)."
"2点間のヴェクタ(上の長い矢) ","$ \cos\left(\angle \mathrm{AOB}\right) =\frac{\overrightarrow{\mathrm{OA}}\cdot\overrightarrow{\mathrm{OB}}} {|\overrightarrow{\mathrm{OA}}|\cdot|\overrightarrow{\mathrm{OB}}|}.$","\\cos\\left(\\angle \\mathrm{AOB}\\right)= \\frac{\\overrightarrow{\\mathrm{OA}}\\cdot \\overrightarrow{\\mathrm{OB}}} {| \\overrightarrow{\\mathrm{OA}}| \\cdot|\\overrightarrow{\\mathrm{OB}}|}. "
"ヴェクタ(上→,太斜体) \\bm≡\boldmath","$ \vec A &= A_x\vec e_x +A_y\vec e_y+A_z\vec e_z, \\ \bm{A} &=A_x\bm{i}+A_{y}\mspace{3mu}\bm{j}+A_z\bm{k}.$","\\vec A &= A_x\\vec e_x +A_y\\vec e_y +A_z\\vec e_z, \\\\ \\bm{A} &=A_x\\bm{i} +A_{y}\\mspace{3mu}\\bm{j} +A_z\\bm{k},"
"ヴェクタ内積 dot-product","$\vec A\cdot\vec B &\equiv A_xB_x +A_yB_y +A_zB_z. \\ &\text{(inner product or dot product)} $","\\vec A\\cdot\\vec B \\equiv A_xB_x +A_yB_y +A_zB_z."
"ヴェクタ外積 cross-product","$\vec A \times \vec B &\equiv \begin{vmatrix}\vec e_{x} & \vec e_{y} & \vec e_{z} \\ A_x & A_y & A_z \\ B_x & B_y & B_z \end{vmatrix}. \\ &\text{(outer product or cross product)} $","\\vec A \\times \\vec B &\\equiv \\begin{vmatrix}\\vec e_{x} & \\vec e_{y} & \\vec e_{z} \\\\ A_x & A_y & A_z \\\ B_x & B_y & B_z \\end{vmatrix}."
"nabla演算子 ","$ \overrightarrow{\bigtriangledown} &\equiv \frac{\partial}{\partial x}\vec e_{x} +\frac{\partial}{\partial y}\vec e_{y} +\frac{\partial }{\partial z}\vec e_{z}, \\ \nabla &\equiv \frac{\partial}{\partial x}\bm{e}_{x} +\frac{\partial}{\partial y}\bm{e}_{y} +\frac{\partial }{\partial z}\bm{e}_{z}. $","\\overrightarrow{\\bigtriangledown} \\equiv \\frac{\\partial}{\\partial x}\\vec e_{x} +\\frac{\\partial}{\\partial y}\\vec e_{y} +\\frac{\\partial }{\\partial z}\\vec e_{z}, \\\\ \\nabla \\equiv \\frac{\\partial}{\\partial x}\\bm{e}_{x} +\\frac{\partial}{\\partial y}\\bm{e}_{y} +\\frac{\\partial }{\\partial z}\\bm{e}_{z}. "
"gradient:勾配","$ \mathrm{grad}\ f(\vec r) &=\overrightarrow{\bigtriangledown} f(\vec r)\\ &=\frac{\partial f(\vec r)}{\partial x}\vec e_{x} +\frac{\partial f(\vec r)}{\partial y}\vec e_{y} +\frac{\partial f(\vec r)}{\partial z}\vec e_{z}, $","\\mathrm{grad}\\ f(\vec r) &=\\overrightarrow{\\bigtriangledown} f(\\vec r)\\\\ &=\\frac{\\partial f(\\vec r)}{\\partial x}\\vec e_{x} +\\frac{\\partial f(\\vec r)}{\\partial y}\\vec e_{y} +\\frac{\partial f(\\vec r)}{\\partial z}\\vec e_{z},"
"divergence:発散","$\mathrm{div}\ \vec E(\vec r,t) &= \overrightarrow{\bigtriangledown} \cdot \vec E(\vec r,t),\\ &=\frac{\partial E_{x}(\vec r,t)}{\partial x} +\frac{\partial E_{y}(\vec r,t)}{\partial y} +\frac{\partial E_{z}(\vec r,t)}{\partial z}.$ ","\\mathrm{div}\\ \\vec E(\\vec r,t)&= \\overrightarrow{\\bigtriangledown} \\cdot \\vec E(\\vec r,t),\\\\ &=\\frac{\\partial E_{x}(\\vec r,t)}{\\partial x} +\\frac{\\partial E_{y}(\\vec r,t)}{\\partial y} +\\frac{\\partial E_{z}(\\vec r,t)}{\\partial z}."
"rotation:回転","$\mathrm{rot}\ \vec H(\vec r,t) &=\overrightarrow{\bigtriangledown} \times \vec H(\vec r,t),\\ &=\begin{vmatrix}\vec e_{x} & \vec e_{y} & \vec e_{z}\\ \dfrac{\partial}{\partial x} & \dfrac{\partial}{\partial y} & \dfrac{\partial}{\partial z} \\ H_{x}(\vec r,t) & H_{y}(\vec r,t) & H_{z}(\vec r,t) \end{vmatrix}.$","\\mathrm{rot}\\ \\vec H(\\vec r,t) &=\\overrightarrow{\bigtriangledown} \\times \\vec H(\\vec r,t),\\\\ &=\\begin{vmatrix}\\vec e_{x} & \\vec e_{y} & \\vec e_{z}\\\ \\dfrac{\\partial}{\\partial x} & \\dfrac{\\partial}{\\partial y} & \\dfrac{\partial}{\\partial z} \\\ H_{x}(\\vec r,t) & H_{y}(\\vec r,t) & H_{z}(\\vec r,t) \\end{vmatrix}."
"Laplacian(ラプラシアン:ラプラスの演算子)","$\bigtriangleup &\equiv \left( \frac{\partial^2}{\partial x^2} +\frac{\partial^2}{\partial y^2} +\frac{\partial^2}{\partial z^2}\right)\\ &= \overrightarrow{\bigtriangledown}^{2} \\ &= \mathrm{div}\cdot\mathrm{grad}.$","\\bigtriangleup &\\equiv \\left( \\frac{\\partial^2}{\\partial x^2} +\\frac{\\partial^2}{\\partial y^2} +\\frac{\\partial^2}{\\partial z^2}\\right) \\\\ &= \\overrightarrow{\\bigtriangledown}^2 \\\\ &= \\mathrm{div}\\cdot\\mathrm{grad}."
"ラプラスの方程式 $\text{ }$ ポアッソンの方程式","$\bigtriangleup \Psi(\vec r) &=0 \qquad \text{solution:}\Psi(\vec r) \ \text{ harmonic function} \\ &\hookrightarrow \text{Laplace equation} \\ \bigtriangleup \Phi(\vec r) &=q(\vec r) \\ &\hookrightarrow \text{Poisson's equation}$","\\bigtriangleup \\Psi(\vec r) &=0 & \\Psi(\vec r): \quad \\text{harmonic function} \\\\ &\\hookrightarrow \text{Laplace eq.}\\ \\bigtriangleup \\Phi(\vec r) & = q(\vec r) && \hookrightarrow \\text{Poisson's equation}"
"複素数 成分により表示","$z=x+\mathrm{i}y=r\mathrm{e}^{+\mathrm{i}\theta} =r\left(\cos(\theta)+\mathrm{i}\sin(\theta)\right), \\ \bar z=x-\mathrm{i}y=r\mathrm{e}^{-\mathrm{i}\theta} = r\left(\cos(\theta)-\mathrm{i}\sin(\theta)\right),$","z=x+\\mathrm{i}y =r\\mathrm{e}^{+\\mathrm{i}\\theta} =r\\left(\\cos(\\theta)+\\mathrm{i}\\sin(\\theta)\\right), \\\\ \\bar z =x-\\mathrm{i}y=r\\mathrm{e}^{-\\mathrm{i}\\theta} =r\\left(\\cos(\\theta)-\\mathrm{i}\\sin(\\theta)\\right)."
"オイラの公式","$\left\{ \begin{array}{l c} \mathrm{e}^{\mathrm{i}\theta} & =\cos(\theta)+\mathrm{i}\sin(\theta), \\ \mathrm{e}^{-\mathrm{i}\theta} & =\cos(\theta)-\mathrm{i}\sin(\theta).\end{array} \right.$","\\left\\{ \\begin{array}{l c} \\mathrm{e}^{\\mathrm{i}\\theta} & =\\cos(\\theta)+\\mathrm{i}\\sin(\\theta), \\\\ \\mathrm{e}^{-\\mathrm{i}\\theta} & =\cos(\\theta)-\\mathrm{i}\\sin(\\theta).\\end{array} \\right."
"オイラの逆公式","$\left\{ \begin{array}{l c} \cos(\theta) &=\dfrac{\mathrm{e}^{\mathrm{i}\theta} +\mathrm{e}^{-\mathrm{i}\theta}}{2},\\ \sin(\theta) &=\dfrac{\mathrm{e}^{\mathrm{i}\theta} -\mathrm{e}^{-\mathrm{i}\theta}}{2\mathrm{i}}, \end{array} \right.$","\\left\\{ \\begin{array}{l c} \\cos(\theta) &=\\dfrac{\\mathrm{e}^{\\mathrm{i}\\theta} +\\mathrm{e}^{-\\mathrm{i}\\theta}}{2},\\\\ \\sin(\theta) &=\\dfrac{\\mathrm{e}^{\\mathrm{i}\\theta} -\\mathrm{e}^{-\\mathrm{i}\\theta}}{2\\mathrm{i}}, \\end{array} \\right."
"指数関数 ← 双曲線関数","$\left\{ \begin{array}{lcc} \mathrm{e}^{x} &=\cosh(x)+\sinh(x), & \\ \mathrm{e}^{-x} &=\cosh(x)-\sinh(x), & \end{array} \right.$","\\left\\{ \\begin{array}{l c c} \\mathrm{e}^{x} &=\\cosh(x)+\\sinh(x), & \\\\ \\mathrm{e}^{-x} &=\\cosh(x)-\\sinh(x), & \\end{array} \\right."
"双曲線関数 ← 指数関数","$\left\{ \begin{array}{lcc} \cosh(x) &=\dfrac{\mathrm{e}^{x}+\mathrm{e}^{-x}}{2}, & \\ \sinh(x) &= \dfrac{\mathrm{e}^{x}-\mathrm{e}^{-x}}{2}, & \\ \tanh(x) &= \dfrac{\sinh(x)}{\cosh(x)} &= \dfrac{\mathrm{e}^{x}-\mathrm{e}^{-x}} {\mathrm{e}^{x}+\mathrm{e}^{-x}}. \end{array} \right.$","\\left\\{ \\begin{array}{lcc} \\left\\{ \\begin{array}{lcc} \\cosh(x) &=\\dfrac{\\mathrm{e}^{x}+\\mathrm{e}^{-x}}{2}, & \\\\ \\sinh(x) &= \\dfrac{\\mathrm{e}^{x}-\\mathrm{e}^{-x}}{2}, & \\\\ \\tanh(x) &= \\dfrac{\\sinh(x)}{\\cosh(x)} &= \dfrac{\\mathrm{e}^{x}-\\mathrm{e}^{-x}} {\\mathrm{e}^{x}+\\mathrm{e}^{-x}}. \\end{array} \\right."
"式の横並び:簡易法 &&仕切り","$u(x,0) =0, && u(0,t) =U, && u(\infty ,t) =0.$", "u(x,0) =0, && u(0,t) =U, && u(\\infty ,t) =0."
記号(Symblos)
-----------------
.. csv-table:: 記号
:header: "See/Type", "See/Type", "See/Type", "See/Type"
"$\pm$ \\pm", "$\circ$ \\circ", "$\bullet$ \\bullet", "$\cdot$ \\cdot"
"$\aleph$ \\aleph", "$\hbar$ \\hbar", "$\Re$ \\Re", "$\Im$ \\Im"
"$\infty$ \\infty", "$\emptyset$ \\emptyset", "$\forall$ \\forall", "$\exists$ \\exists"
"$\cap$ \\cap", "$\cup$ \\cup", "$\vee$ \\vee", "$\wedge$ \\wedge"
"$\subset$ \\subset", "$\supset$ \\supset", "$\sqsubset$ \\sqsubset", "$\sqsupset$ \\sqsupset"
"$\subseteq$ \\subseteq", "$\supseteq$ \\supseteq", "$\vdash$ \\vdash", "$\dashv$ \\dashv"
"$\in$ \\in", "$\notin$ \\notin", "$\ni$ \\ni", "$\not\ni$ \\not\\ni"
"$\parallel$ \\parallel", "$\perp$ \\perp", "$\sim$ \\sim", "$\simeq$ \\simeq"
"$\equiv$ \\equiv", "$\approx$ \\approx", "$\propto$ \\propto", "$\neq$ \\neq"
"$\le$ \\le", "$\ll$ \\ll", "$\ge$ \\ge", "$\gg$ \\gg"
矢印と括弧
-------------
.. csv-table:: 矢印と括弧
:header: "See \\Type", "See \\Type"
"$\gets$ \\gets", "$\longleftarrow$ \\longleftarrow"
"$\Leftarrow$ \\Leftarrow", "$\Longleftarrow$ \\Longleftarrow"
"$\to$ \\to", "$\longrightarrow$ \\longrightarrow"
"$\Rightarrow$ \\Rightarrow", "$\Longrightarrow$ \\Longrightarrow"
"$\leftrightarrow$ \\leftrightarrow", "$\longleftrightarrow$ \\longleftrightarrow"
"$\Leftrightarrow$ \\Leftrightarrow", "$\Longleftrightarrow$ \\Longleftrightarrow"
"$\mapsto$ \\mapsto", "$\longmapsto$ \\longmapsto"
"$\hookleftarrow$ \\hookleftarrow", "$\hookrightarrow$ \\hookrightarrow"
"$\rightleftharpoons$ \\rightleftharpoons", "$\upharpoonleft\hspace{-.24em}\downharpoonright$ \\upharpoonleft\\hspace{-.24em}\\downharpoonright"
"$\uparrow$ \\uparrow", "$\downarrow$ \\downarrow"
"$\Uparrow$ \\Uparrow", "$\Downarrow$ \\Downarrow"
"$\updownarrow$ \\updownarrow", "$\Updownarrow$ \\Updownarrow"
"$\upharpoonleft$ \upharpoonleft\", "$\downharpoonright$ \downharpoonright\"
"$|$ |", "$\|$ \\|"
"$\{ x\}$ \\{ x\\}", "$\lceil x \rceil$ \\lceil x \\rceil"
"$\langle x \rangle$ \\langle x \\rangle", "$\lfloor x \rfloor$ \\lfloor x \\rfloor"
賢いドットと省略型ドット
----------------------------
.. csv-table:: 賢いdots と 省略型dotsX
:header: "用法", "See", "Type"
"賢いdots(カンマ区切り)", "$a_1,a_2,\dots,a_n.$", "a_1,a_2,\\dots,a_n."
"賢いdots(二項演算子)", "$a_1 + a_2 + \dots + a_n$", "a_1 + a_2 + \\dots + a_n"
"賢いdots(多項並べ)", "$a_1 a_2 \dots a_n$", "a_1 a_2 \\dots a_n"
"賢いdots(多重積分)", "$\int \dots \int $", "\\int \\dots \\int"
"dotsc (commas)", "$a_1,\dotsc$", "a_1,\\dotsc"
"dotsb (binary op. or relations)", "$a_1 + \dotsb$", "a_1 + \dotsb"
"dotsm (multiplications)", "$a_1 \dotsm$", "a_1 \\dotsm"
"dotsi (integrals)", "$\int \dotsi$", "\int \dotsi"
ギリシャ文字(小文字,大文字・立体,大文字・斜体)
---------------------------------------------------
.. csv-table:: Greek letters
:header: "See/Type", "See/Type", "See/Type", "See/Type"
"$\alpha$ \\alpha", "$\eta$ \\eta", "$\nu$ \\nu", "$\tau$ \\tau"
"$\beta$ \\beta", "$\theta$ \\theta", "$\xi$ \\xi", "$\upsilon$ \\upsilon"
"$\gamma$ \\gamma", "$\iota$ \\iota", "omicron", "$\phi$ \\phi"
"$\delta$ \\delta", "$\kappa$ \\kappa", "$\pi$ \\pi", "$\chi$ \\chi"
"$\epsilon$ \\epsilon", "$\lambda$ \\lambda", "$\rho$ \\rho", "$\psi$ \\psi"
"$\zeta$ \\zeta", "$\mu$ \\mu", "$\sigma$ \\sigma", "$\omega$ \\omega"
"$\Gamma$ \\Gamma", "$\Theta$ \\Theta", "$\Xi$ \\Xi", "$\Upsilon$ \\Upsilon"
"$\Delta$ \\Delta", "$\Lambda$ \\Lambda", "$\Pi$ \\Pi", "$\Phi$ \\Phi"
" ", " ", "$\Sigma$ \\Sigma", "$\Psi$ \\Psi"
" ", " ", " ", "$\Omega$ \\Omega"
"$\varGamma$ \\varGamma", "$\varTheta$ \\varTheta", "$\varXi$ \\varXi", "$\varUpsilon$ \\varUpsilon"
"$\varDelta$ \\varDelta", "$\varLambda$ \\varLambda", "$\varPi$ \\varPi", "$\varPhi$ \\varPhi"
" ", " ", "$\varSigma$ \\varSigma", "$\varPsi$ \\varPsi"
" ", " ", " ", "$\varOmega$ \\varOmega"
数の種類記号
-------------
.. csv-table:: 数学記号
:header: "See", "Type", "意味", "例"
"$\mathbb{N}$", "\\mathbb{N}", "自然数の全体", "$1,2,\dots$"
"$\mathbb{Z}$","\\mathbb{Z}", "整数全体", "$0,\pm1,\pm2,\dots$"
"$\mathbb{Q}$","\\mathbb{Q}", "有理数全体", "$\pm 2/3$"
"$\mathbb{R}$","\\mathbb{R}", "実数全体", "$\sqrt{2}, \pi, e=\mathrm{e}^{1}$"
"$\mathbb{C}$","\\mathbb{C}", "複素数全体", "$\sqrt{-1}=\mathrm{e}^{\mathrm{i}\pi / 2}$"
ローカル・ルール
-------------------
.. csv-table:: ローカル・ルール
:header: "See", "Type", "意味", "使用例"
"$\unit{Nm}\unit{s^{-1}}$", "\\unit{Nm}\\unit{s^{-1}}", "単位間に細いギャップで立体", "単位表示"
"$\bm{A}$", "\\bm{A}", "太いシンボル文字", "ヴェクトル"
"$\mathrm{e}$", "\\rme", "指数関数のe", "未実装"
"$\mathrm{i}$", "\\rmi", "純虚数のi", "未実装"
"$\mathrm{d}$", "\\rmd", "微積分のd", "未実装"
"$\overrightarrow{\bigtriangledown}$", "\\Nab", "→付きの細いナブラ", "未実装"
"$\bigtriangleup$", "\\Lap", "細いラプラシアン", "未実装"
準備中
-------
<tex>
\kern1pt{\scriptstyle \cup\kern-5pt\raisebox{1.4pt} {\hbox{\small $\shortmid$}}}
</tex>
関連資料
==========
1. 【「数学用語の使い方」と「TeXでの表し方」】 ← 数学掲示版
- http://hooktail.maxwell.jp/cgi-bin/yybbs/yybbs.cgi?room=room1&mode=res&no=11108&mode2=preview_pc
- 物理関連のTeX表記について,上記のスレッドの中のNo.11360以降の「MXKさん,toorisugari no Hiroさん,Chappyさん」との論議.MXKさん紹介によれば「IoP(Institute of Physics)のスタイルファイルでも見たほうが早いですね。」
- ftp://ftp.iop.org/pub/journals/latex2e/IOPLaTeXGuidelines.pdf ← No.11386にtoorisugari no Hiroさんの訳(主要部)
2. 【LaTeX初級テンプレート】 LaTeX友の会 ← 数学掲示版
- http://hooktail.maxwell.jp/cgi-bin/yybbs/yybbs.cgi?room=room1&mode=res&no=11307&mode2=preview_pc
3. 【手に馴染むLaTeXe #01】← 数学掲示版
- http://hooktail.maxwell.jp/cgi-bin/yybbs/yybbs.cgi?room=room1&mode=res&no=11396&mode2=preview_pc
- by LaTeX友の会・事務局 since 2006-08-06
@@author:mNeji as LaTeX友の会・収集係@@
@@accept: 執筆中 from 2006-08-28@@
@@category: TeXのTIPS@@
@@id: latexTemplate@@
記事ソース/れいてふ・てんぷれーと のバックアップの現在との差分(No.118)
