2. label \ref \figref \fgref graphicx \usepackage{graphicx [tb] [h] here [tb] \begin{figure*~\end{figure* \ref{fig:figure1 1: \begin{figure[

Size: px
Start display at page:

Download "2. label \ref \figref \fgref graphicx \usepackage{graphicx [tb] [h] here [tb] \begin{figure*~\end{figure* \ref{fig:figure1 1: \begin{figure["

Transcription

1 L A TEX \begin{itemize \end{itemize \begin{enumerate \end{enumerate \begin{description \item[ 1] \item[ 2] \item[ 3] \end{description

2 2. label \ref \figref \fgref graphicx \usepackage{graphicx [tb] [h] here [tb] \begin{figure*~\end{figure* \ref{fig:figure1 1: \begin{figure[tb] \includegraphics[width=47mm,clip]{a.eps \caption{ %\ecaption{english caption \label{fig:figure1 \end{figure 2.2 2: 3: \begin{figure[tb] \begin{minipage{0.5\hsize \includegraphics[width=47mm, clip]{a.eps \caption{ \label{fig:figure2 \end{minipage \begin{minipage{0.5\hsize \includegraphics[width=47mm, clip]{b.eps \caption{ \label{fig:figure3 \end{minipage \end{figure 2

3 3. \ref \tabref \tbref tabularx \usepackage{tabularx \usepackage{multirow \usepackage{multicol \usepackage{hhline [tb] \begin{table*~\end{table* \ref{table:table1 \begin{table[tb] \caption{ %\ecaption{english caption 1 1: \label{table:table1 \begin{tabular{l l \hline \hline 1 2 \multirow{2{*{ 1 3 & 2 \\ \hhline{~- 4 & 3 \\ \hline \multicolumn{2{c{ 4 \\ \hline \end{tabular \end{table 3.2 2: : \begin{table[tb] \begin{tabular{cc \begin{minipage{0.5\hsize \caption{ \begin{tabular{l l \hline \hline 1 & 2 \\ \hline 3 & 4 \\ \hline \end{tabular \end{minipage \begin{minipage{0.3\hsize \caption{ \begin{tabular{l l \hline \hline 1 & 2 \\ \hline 3 & 4 \\ \hline \end{tabular \end{minipage \end{tabular \end{table 3

4 [1] \cite{bib01 [1],, [2],, % {9 9 % 1~9=>9,10~99=>99 \begin{thebibliography{9 \bibitem{bib01,, \bibitem{bib02,, \end{thebibliography 4.2 jbibtex L A TEX thebibliography BibTeX BibTeX jbibtex 1. tex bib bib sample.bib \bibliography{sample,sampl2 \bibliographystyle{tipsj \bibliography{sample % bib L A TEX jplain jipsj tipsj tieice 4

5 2. bib author = " ", yomi = "Ryota Ayaki", title = " ", publisher = " ", year = author = "Ryota Ayaki", title = "A Brief History of Ayaki: From the Birth to the Marriage", publisher = "Ayaki Press", year = "2010", address = author = " ", yomi = "Ayaki, Ryota", title = " ", journal = " ", volume = "999", number = "9", pages = " ", year = author = "Ryota Ayaki", title = "The Alphabet Song", journal = "Trans. IPS Japan", year = "2050", volume = "999", number = "9", month = "feb", pages = "99-101" 3. dvi WinShell dvi dvi dvi platex xxx.tex jbibtex xxx.aux platex xxx.tex platex xxx.tex // aux // bbl // // 5

6 4. [1] [2] [3] [4] \cite{jbook \cite{ebook \cite{jarticle \cite{earticle [1], (2010). [2] Ayaki, R.: A Brief History of Ayaki: From the Birth to the Marriage, Ayaki Press, Kyoto (2010). [3],, Vol. 999, No. 9, pp (2050). [4] Ayaki, R.: The Alphabet Song, Trans. IPS Japan, Vol. 999, No. 9, pp (2050). bib

7 5. A α A $\alpha$ N ν N $\nu$ B β B $\beta$ Ξ ξ $\Xi$ $\xi$ Γ γ $\Gamma$ $\gamma$ O o O o δ $\Delta$ $\delta$ Π π $\Pi$ $\pi$ E ɛ E $\epsilon$ P ρ P $\rho$ Z ζ Z $\zeta$ Σ σ $\Sigma$ $\sigma$ H η H $\eta$ T τ T $\tau$ Θ θ $\Theta$ $\theta$ Υ υ $\Upsilon$ $\upsilon$ I ι I $\iota$ υ Υ $\Upsilon$ $\upsilon$ K κ K $\kappa$ X χ X $\chi$ Λ λ $\Lambda$ $\lambda$ Ψ ψ $\Psi$ $\psi$ M µ M $\mu$ Ω ω $\Omega$ $\omega$ I I II I\hspace{-.1emI III I\hspace{-.1emI\hspace{-.1emI IV I\hspace{-.1emV V V VI V\hspace{-.1emI VII V\hspace{-.1emI\hspace{-.1emI VIII V\hspace{-.1emI\hspace{-.1emI\hspace{-.1emI IX I\hspace{-.1emX X X $\times$ $\div$ $\equiv$ $\neq$ ± $\pm$ $\circ$ $\bullet$ $\sim$ $\gg$ $\ll$ 2 $\sqrt{2$ $\int$ $\sum$ $\infty$ $\in$ $\ni$ $\subset$ $\supset$ $\subseteq$ $\supseteq$ $\cap$ $\cup$ $\propto$ { \{ \ $\lfloor$ $\rfloor$ $\lceil$ $\rceil$ $\langle$ $\rangle$ # \# $ \$ % \% & \& \_ ^ \tt\symbol{94 ~ \tt\symbol{126 $\cdot$... $\ldots$ $\cdots$. $\vdots$... $\ddots$ 7

8 6. 1. Roman {\rm Roman 2. Italic {\it Italic 3. Bold {\bf Bold 4. SmallCaps {\sc SmallCaps 5. Empatic {\em Empatic 6. Slanted {\sl Slanted 7. Typewriter {\tt Typewriter 8. SansSerif {\sf SansSerif 8

9 7. 1. {\tiny 2. {\scriptsize 3. {\footnotesize 4. {\small 5. {\normalsize 6. {\large 7. {\Large 8. {\LARGE 9. {\huge 10. {\Huge 9

10 [\begin{eqnarray \end{eqnarray] 1. G 1 (x, y) = x n 1 + x n (1) G_{-1(x,y)=x^{n-1+x^n 2. 90^\circ 90 (2) 3. y = 1 + x 1 x y=\frac{1+x{1-x (3) \overrightarrow{\rm AB AB (4) nc k n P k n Π k (5) {_n C _k {_n P _k {_n \Pi _k \lim_{x \to \infty f(x) lim f(x) (6) x w 0,0 w 0,n 1 w =..... (7) w n 1,0 w n 1,n 1 w=\left[ \begin{array{ccc w_{0,0 & \cdots & w_{0,n-1 \\ \vdots & \ddots & \vdots \\ w_{n-1,0 & \cdots & w_{n-1,n-1 \\ \end{array \right] F (x, y) = h i= 1 F(x,y)=\sum^h_{i=-1A_i(x,y)B_i(x,y) A i (x, y)b i (x, y) (8) π [ a sin kt dt] (9) 0 [\int_0^{\pi a \sin kt \cdot dt] 10

11 9. Tips 9.1 \begin{flushleft \end{flushleft \begin{flushright \end{flushright 9.2 \vspace{ \hspace{ \begin{itemize \end{itemize \begin{itemize \vspace{-3mm \vspace{-3mm \vspace{-3mm \end{itemize 9.3 \baselinestretch \documentclass \begin{document \renewcommand{\baselinestretch{ \begin{spacing{ \end{spacing 9.4 \footnote 1 a 2 b a 1 b 2 1\footnote{ 1 2\footnote{ 2 11

12 9.5 URL URL url \usepackage{url \url{ 9.6 verbatim public class HelloWorldApp { public static void main(string[] args) { System.out.println("Hello World"); \begin{verbatim public class HelloWorldApp { public static void main(string[] args) { System.out.println("Hello World"); \end{verbatim 9.7 \topmargin \textwidth Web TeX tony/tex/faq/layout.htm 12

L A TEX ver L A TEX LATEX 1.1 L A TEX L A TEX tex 1.1 1) latex mkdir latex 2) latex sample1 sample2 mkdir latex/sample1 mkdir latex/sampl

L A TEX ver L A TEX LATEX 1.1 L A TEX L A TEX tex 1.1 1) latex mkdir latex 2) latex sample1 sample2 mkdir latex/sample1 mkdir latex/sampl L A TEX ver.2004.11.18 1 L A TEX LATEX 1.1 L A TEX L A TEX tex 1.1 1) latex mkdir latex 2) latex sample1 sample2 mkdir latex/sample1 mkdir latex/sample2 3) /staff/kaede work/www/math/takase sample1.tex

More information

1.2 L A TEX 2ε Unicode L A TEX 2ε L A TEX 2ε Windows, Linux, Macintosh L A TEX 2ε 1.3 L A TEX 2ε L A TEX 2ε 1. L A TEX 2ε 2. L A TEX 2ε L A TEX 2ε WYS

1.2 L A TEX 2ε Unicode L A TEX 2ε L A TEX 2ε Windows, Linux, Macintosh L A TEX 2ε 1.3 L A TEX 2ε L A TEX 2ε 1. L A TEX 2ε 2. L A TEX 2ε L A TEX 2ε WYS L A TEX 2ε 16 10 7 1 L A TEX 2ε L A TEX 2ε TEX Stanford Donald E. Knuth 1.1 1.1.1 Windows, Linux, Macintosh OS Adobe Acrobat Reader Adobe Acrobat Reader PDF 1.1.2 1 1.2 L A TEX 2ε Unicode L A TEX 2ε L

More information

基礎数学I

基礎数学I I & II ii ii........... 22................. 25 12............... 28.................. 28.................... 31............. 32.................. 34 3 1 9.................... 1....................... 1............

More information

L A TEX Copyright c KAKEHI Katsuhiko All Rights Reserved 1 L A TEX \documentstyle[< >]{jarticle} \title{< >} \author{< >} \date{< >} < > \be

L A TEX Copyright c KAKEHI Katsuhiko All Rights Reserved 1 L A TEX \documentstyle[< >]{jarticle} \title{< >} \author{< >} \date{< >} < > \be L A TEX Copyright c KAKEHI Katsuhiko 1996-1998 All Rights Reserved 1 L A TEX \documentstyle[< >]{jarticle} \title{} \author{< >} \date{} \begin{document} \end{document} article jarticle report jreport

More information

医系の統計入門第 2 版 サンプルページ この本の定価 判型などは, 以下の URL からご覧いただけます. このサンプルページの内容は, 第 2 版 1 刷発行時のものです.

医系の統計入門第 2 版 サンプルページ この本の定価 判型などは, 以下の URL からご覧いただけます.   このサンプルページの内容は, 第 2 版 1 刷発行時のものです. 医系の統計入門第 2 版 サンプルページ この本の定価 判型などは, 以下の URL からご覧いただけます. http://www.morikita.co.jp/books/mid/009192 このサンプルページの内容は, 第 2 版 1 刷発行時のものです. i 2 t 1. 2. 3 2 3. 6 4. 7 5. n 2 ν 6. 2 7. 2003 ii 2 2013 10 iii 1987

More information

web04.dvi

web04.dvi 4 MATLAB 1 visualization MATLAB 2 Octave gnuplot Octave copyright c 2004 Tatsuya Kitamura / All rights reserved. 35 4 4.1 1 1 y =2x x 5 5 x y plot 4.1 Figure No. 1 figure window >> x=-5:5;ψ >> y=2*x;ψ

More information

基礎から学ぶトラヒック理論 サンプルページ この本の定価 判型などは, 以下の URL からご覧いただけます. このサンプルページの内容は, 初版 1 刷発行時のものです.

基礎から学ぶトラヒック理論 サンプルページ この本の定価 判型などは, 以下の URL からご覧いただけます.   このサンプルページの内容は, 初版 1 刷発行時のものです. 基礎から学ぶトラヒック理論 サンプルページ この本の定価 判型などは, 以下の URL からご覧いただけます. http://www.morikita.co.jp/books/mid/085221 このサンプルページの内容は, 初版 1 刷発行時のものです. i +α 3 1 2 4 5 1 2 ii 3 4 5 6 7 8 9 9.3 2014 6 iii 1 1 2 5 2.1 5 2.2 7

More information

1 L A TEX L A TEX L A TEX 2 L A TEX 2 L A TEX L A TEX L A TEX Word L A TEX L A TEX L A TEX L A TEX 2.1 L A TEX 1 L A TEX 2

1 L A TEX L A TEX L A TEX 2 L A TEX 2 L A TEX L A TEX L A TEX Word L A TEX L A TEX L A TEX L A TEX 2.1 L A TEX 1 L A TEX 2 L A TEX dareka@dokoka.org 2005 9 2 1 2 2 L A TEX 2 2.1................................. 2 2.2 L A TEX..................................... 4 3 L A TEX 4 3.1............................. 4 3.2......................

More information

微分積分 サンプルページ この本の定価 判型などは, 以下の URL からご覧いただけます. このサンプルページの内容は, 初版 1 刷発行時のものです.

微分積分 サンプルページ この本の定価 判型などは, 以下の URL からご覧いただけます.   このサンプルページの内容は, 初版 1 刷発行時のものです. 微分積分 サンプルページ この本の定価 判型などは, 以下の URL からご覧いただけます. ttp://www.morikita.co.jp/books/mid/00571 このサンプルページの内容は, 初版 1 刷発行時のものです. i ii 014 10 iii [note] 1 3 iv 4 5 3 6 4 x 0 sin x x 1 5 6 z = f(x, y) 1 y = f(x)

More information

: , 2.0, 3.0, 2.0, (%) ( 2.

: , 2.0, 3.0, 2.0, (%) ( 2. 2017 1 2 1.1...................................... 2 1.2......................................... 4 1.3........................................... 10 1.4................................. 14 1.5..........................................

More information

Chapter 1 latex latex divout for windouws,texmaker,beamer latex 2012/2/2 2

Chapter 1 latex latex divout for windouws,texmaker,beamer latex 2012/2/2 2 Contents 1 2 2 latex 3 2.1 latex..................... 3 3 divout 4 3.1 divout for windouws.................... 4 3.2 divout for windows pdf................ 4 4 Texmaker 5 4.1 texmaker.............................

More information

2012 24 L A TEX 2013 1 2012 24 L A TEX @kurokobo L A TEX UTF-8 Makefile \begin{jabstract} \end{jabstract} \begin{eabstract} \end{eabstract} main.tex L A TEX i Abstract Of Master s Thesis Academic Year

More information

L A L A TEX UTF-8 Makefile \begin{jabstract} \end{jabstract} \begin{eabstract} \end{eabstract} main.tex L A TEX i

L A L A TEX UTF-8 Makefile \begin{jabstract} \end{jabstract} \begin{eabstract} \end{eabstract} main.tex L A TEX i 2012 24 L A TEX 2013 1 2012 24 L A TEX @kurokobo L A TEX UTF-8 Makefile \begin{jabstract} \end{jabstract} \begin{eabstract} \end{eabstract} main.tex L A TEX i Abstract Of Master s Thesis Academic Year

More information

semi4.dvi

semi4.dvi 1 2 1.1................................................. 2 1.2................................................ 3 1.3...................................................... 3 1.3.1.............................................

More information

b3e2003.dvi

b3e2003.dvi 15 II 5 5.1 (1) p, q p = (x + 2y, xy, 1), q = (x 2 + 3y 2, xyz, ) (i) p rotq (ii) p gradq D (2) a, b rot(a b) div [11, p.75] (3) (i) f f grad f = 1 2 grad( f 2) (ii) f f gradf 1 2 grad ( f 2) rotf 5.2

More information

確率論と統計学の資料

確率論と統計学の資料 5 June 015 ii........................ 1 1 1.1...................... 1 1........................... 3 1.3... 4 6.1........................... 6................... 7 ii ii.3.................. 8.4..........................

More information

tex03final1.dvi

tex03final1.dvi 2002 3 L A TEX 2002 4 20 : TEX dvi PDF mikilab 1 L A TEX 1.1 Table 1.1 Table 1 1 1400 1 1700 Fig. 1 \begin{tabular}{ ()}. Fig. 2 tabular Table 2 tabular l c r \begin{center} \begin{tabular}{lcr} & & \\

More information

L A TEX? Word Word Word Word WYSIWYG T E X by Donald Knuth L A T E X by Leslie Lamport L A T E X 2ε L A T E X 2ε, pt E X, pl A T E X LATEX p.2/27

L A TEX? Word Word Word Word WYSIWYG T E X by Donald Knuth L A T E X by Leslie Lamport L A T E X 2ε L A T E X 2ε, pt E X, pl A T E X LATEX p.2/27 L A TEX 2007 2007 10 5 ( ) 338 8570 255 Tel: 048 858 3577, Fax : 048 858 3716 Email: tohru@mail.saitama-u.ac.jp URL: http://www.nls.ics.saitama-u.ac.jp/ tohru/ LATEX p.1/27 L A TEX? Word Word Word Word

More information

24.15章.微分方程式

24.15章.微分方程式 m d y dt = F m d y = mg dt V y = dy dt d y dt = d dy dt dt = dv y dt dv y dt = g dv y dt = g dt dt dv y = g dt V y ( t) = gt + C V y ( ) = V y ( ) = C = V y t ( ) = gt V y ( t) = dy dt = gt dy = g t dt

More information

PowerPoint プレゼンテーション

PowerPoint プレゼンテーション 秋学期情報スキル応用 田中基彦教授, 樫村京一郎講師 ( 工学部 共通教育科 ) DTP の基礎 (2) 1. 日本語の入力法 2. 数式, グラフィック, テーブル - 数式 のみは理数系 3. 相互参照, 目次, 文献参照 - あの項目はどこにある? * 提出問題 5 DTP について 提出問題 5 LaTeX 言語を用いる DTP (DeskTop Publishing) について, つぎの各問に答えなさい

More information

TOP URL 1

TOP URL   1 TOP URL http://amonphys.web.fc.com/ 3.............................. 3.............................. 4.3 4................... 5.4........................ 6.5........................ 8.6...........................7

More information

TEX 6.2. EQUATIONS Y=[ Y=] equation y = ax + b y = ax + b (6.1) Y=[ Y=] Y=nonumber eqnarray 3 2 eqnarray equation Y=Y= eqnarray y = ax + b (6.2) y = x

TEX 6.2. EQUATIONS Y=[ Y=] equation y = ax + b y = ax + b (6.1) Y=[ Y=] Y=nonumber eqnarray 3 2 eqnarray equation Y=Y= eqnarray y = ax + b (6.2) y = x 6 ArkOak TEX L A TEX2e 2015 11 4 6.1 making title 6.2 Equations 6.2.1 y = ax + b $ $ x x $ 6.2.2 Y=[ Y=] equation 1 TEX 6.2. EQUATIONS Y=[ Y=] equation y = ax + b y = ax + b (6.1) Y=[ Y=] Y=nonumber eqnarray

More information

Ver.2.2 20.07.2 3 200 6 2 4 ) 2) 3) 4) 5) (S45 9 ) ( 4) III 6) 7) 8) 9) ) 2) 3) 4) BASIC 5) 6) 7) 8) 9) ..2 3.2. 3.2.2 4.2.3 5.2.4 6.3 8.3. 8.3.2 8.3.3 9.4 2.5 3.6 5 2.6. 5.6.2 6.6.3 9.6.4 20.6.5 2.6.6

More information

(iii) 0 V, x V, x + 0 = x. 0. (iv) x V, y V, x + y = 0., y x, y = x. (v) 1x = x. (vii) (α + β)x = αx + βx. (viii) (αβ)x = α(βx)., V, C.,,., (1)

(iii) 0 V, x V, x + 0 = x. 0. (iv) x V, y V, x + y = 0., y x, y = x. (v) 1x = x. (vii) (α + β)x = αx + βx. (viii) (αβ)x = α(βx)., V, C.,,., (1) 1. 1.1...,. 1.1.1 V, V x, y, x y x + y x + y V,, V x α, αx αx V,, (i) (viii) : x, y, z V, α, β C, (i) x + y = y + x. (ii) (x + y) + z = x + (y + z). 1 (iii) 0 V, x V, x + 0 = x. 0. (iv) x V, y V, x + y

More information

第86回日本感染症学会総会学術集会後抄録(II)

第86回日本感染症学会総会学術集会後抄録(II) χ μ μ μ μ β β μ μ μ μ β μ μ μ β β β α β β β λ Ι β μ μ β Δ Δ Δ Δ Δ μ μ α φ φ φ α γ φ φ γ φ φ γ γδ φ γδ γ φ φ φ φ φ φ φ φ φ φ φ φ φ α γ γ γ α α α α α γ γ γ γ γ γ γ α γ α γ γ μ μ κ κ α α α β α

More information

r6.dvi

r6.dvi 13 1 WYSIWYG/ 2013.5.21 1 WYSIWYG/ (LaTeX HTML+CSS ) 2 Web 3 ( GUI) 4 Web (1) 5 Web (2) 1 1.1 ( ) ( ) 1 1: / ( 1) ( ) ( ) 1 1 ( 2) / (text editor) Emacs Windows Mac OS X Unix ( ) (script) 2: 1.2??? 1 (

More information

1 (Berry,1975) 2-6 p (S πr 2 )p πr 2 p 2πRγ p p = 2γ R (2.5).1-1 : : : : ( ).2 α, β α, β () X S = X X α X β (.1) 1 2

1 (Berry,1975) 2-6 p (S πr 2 )p πr 2 p 2πRγ p p = 2γ R (2.5).1-1 : : : : ( ).2 α, β α, β () X S = X X α X β (.1) 1 2 2005 9/8-11 2 2.2 ( 2-5) γ ( ) γ cos θ 2πr πρhr 2 g h = 2γ cos θ ρgr (2.1) γ = ρgrh (2.2) 2 cos θ θ cos θ = 1 (2.2) γ = 1 ρgrh (2.) 2 2. p p ρgh p ( ) p p = p ρgh (2.) h p p = 2γ r 1 1 (Berry,1975) 2-6

More information

エクセルカバー入稿用.indd

エクセルカバー入稿用.indd i 1 1 2 3 5 5 6 7 7 8 9 9 10 11 11 11 12 2 13 13 14 15 15 16 17 17 ii CONTENTS 18 18 21 22 22 24 25 26 27 27 28 29 30 31 32 36 37 40 40 42 43 44 44 46 47 48 iii 48 50 51 52 54 55 59 61 62 64 65 66 67 68

More information

01_.g.r..

01_.g.r.. I II III IV V VI VII VIII IX X XI I II III IV V I I I II II II I I YS-1 I YS-2 I YS-3 I YS-4 I YS-5 I YS-6 I YS-7 II II YS-1 II YS-2 II YS-3 II YS-4 II YS-5 II YS-6 II YS-7 III III YS-1 III YS-2

More information

201711grade1ouyou.pdf

201711grade1ouyou.pdf 2017 11 26 1 2 52 3 12 13 22 23 32 33 42 3 5 3 4 90 5 6 A 1 2 Web Web 3 4 1 2... 5 6 7 7 44 8 9 1 2 3 1 p p >2 2 A 1 2 0.6 0.4 0.52... (a) 0.6 0.4...... B 1 2 0.8-0.2 0.52..... (b) 0.6 0.52.... 1 A B 2

More information

Note.tex 2008/09/19( )

Note.tex 2008/09/19( ) 1 20 9 19 2 1 5 1.1........................ 5 1.2............................. 8 2 9 2.1............................. 9 2.2.............................. 10 3 13 3.1.............................. 13 3.2..................................

More information

SC-85X2取説

SC-85X2取説 I II III IV V VI .................. VII VIII IX X 1-1 1-2 1-3 1-4 ( ) 1-5 1-6 2-1 2-2 3-1 3-2 3-3 8 3-4 3-5 3-6 3-7 ) ) - - 3-8 3-9 4-1 4-2 4-3 4-4 4-5 4-6 5-1 5-2 5-3 5-4 5-5 5-6 5-7 5-8 5-9 5-10 5-11

More information

<4D6963726F736F667420506F776572506F696E74202D208376838C835B83938365815B835683878393312E707074205B8CDD8AB78382815B83685D>

<4D6963726F736F667420506F776572506F696E74202D208376838C835B83938365815B835683878393312E707074205B8CDD8AB78382815B83685D> i i vi ii iii iv v vi vii viii ix 2 3 4 5 6 7 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60

More information

( ) 2002 1 1 1 1.1....................................... 1 1.1.1................................. 1 1.1.2................................. 1 1.1.3................... 3 1.1.4......................................

More information

A 2008 10 (2010 4 ) 1 1 1.1................................. 1 1.2..................................... 1 1.3............................ 3 1.3.1............................. 3 1.3.2..................................

More information

readme.dvi

readme.dvi Vol. 34, No. 1 (2005), 1 15 L A TEX jjas.cls pl A TEX2ε jjas.cls http://www.applstat.gr.jp/ L A TEX L A TEX 1. 2 3 4 2. template.tex 2.1. \documentclass[mentuke]{jjas} \usepackage{graphicx} \usepackage[varg]{txfonts}

More information

L \ L annotation / / / ; / ; / ;.../ ;../ ; / ;dash/ ;hyphen/ ; / ; / ; / ; / ; / ; ;degree/ ;minute/ ;second/ ;cent/ ;pond/ ;ss/ ;paragraph/ ;dagger/

L \ L annotation / / / ; / ; / ;.../ ;../ ; / ;dash/ ;hyphen/ ; / ; / ; / ; / ; / ; ;degree/ ;minute/ ;second/ ;cent/ ;pond/ ;ss/ ;paragraph/ ;dagger/ L \ L annotation / / / ; /; /;.../;../ ; /;dash/ ;hyphen/ ; / ; / ; / ; / ; / ; ;degree/ ;minute/ ;second/ ;cent/;pond/ ;ss/ ;paragraph/ ;dagger/ ;ddagger/ ;angstrom/;permil/ ; cyrillic/ ;sharp/ ;flat/

More information

3 5 18 3 5000 1 2 7 8 120 1 9 1954 29 18 12 30 700 4km 1.5 100 50 6 13 5 99 93 34 17 2 2002 04 14 16 6000 12 57 60 1986 55 3 3 3 500 350 4 5 250 18 19 1590 1591 250 100 500 20 800 20 55 3 3 3 18 19 1590

More information

困ったときのQ&A

困ったときのQ&A ii iii iv NEC Corporation 1997 v P A R T 1 vi vii P A R T 2 viii P A R T 3 ix x xi 1P A R T 2 1 3 4 1 5 6 1 7 8 1 9 1 2 3 4 10 1 11 12 1 13 14 1 1 2 15 16 1 2 1 1 2 3 4 5 17 18 1 2 3 1 19 20 1 21 22 1

More information

sarutex.dvi

sarutex.dvi LATEX L A TEX which monkeys cannot use. LATEX Ver2.0 SaRuTEX LATEX LATEX L A TEX L A TEX LATEX LATEX L A TEX LATEX L A TEX PAW PAW ROOT ROOT LATEX L A TEX LATEX LATEX 2001 3 S a RuTEX ( 1 ) i LATEX Ver1.1

More information

DVIOUT-マスタ-

DVIOUT-マスタ- L A TEX T.T TEX TEX 1 TEX TEX Donald E. Knuth tex 2 L A TEX TEX LATEX( DEC Leslie Lamport TEX TEX 3 L A TEX 3.1 L A TEX documentclass[]{} begin{document} end{document} LATEX 3.1.1 documentclass[a4paper,twocolumn,11pt]{jarticle}

More information

( ) ± = 2018

( ) ± = 2018 30 ( 3 ) ( ) 2018 ( ) ± = 2018 (PDF ), PDF PDF. PDF, ( ), ( ),,,,., PDF,,. , 7., 14 (SSH).,,,.,,,.,., 1.. 2.,,. 3.,,. 4...,, 14 16, 17 21, 22 26, 27( ), 28 32 SSH,,,, ( 7 9 ), ( 14 16 SSH ), ( 17 21, 22

More information

r6.dvi

r6.dvi 14 1 WYSIWYG/ 2014.5.27 1 WYSIWYG/ (LaTeX HTML+CSS ) 2 Web 3 ( GUI) 4 Web (1) 5 Web (2) 1 1.1 ( ) ( ) 1 1: / ( 1) ( ) ( ) 1 1 ( 2) / (text editor) Emacs Windows Mac OS X Unix ( ) (script) 2: 1.2??? 1 (

More information

II A A441 : October 02, 2014 Version : Kawahira, Tomoki TA (Kondo, Hirotaka )

II A A441 : October 02, 2014 Version : Kawahira, Tomoki TA (Kondo, Hirotaka ) II 214-1 : October 2, 214 Version : 1.1 Kawahira, Tomoki TA (Kondo, Hirotaka ) http://www.math.nagoya-u.ac.jp/~kawahira/courses/14w-biseki.html pdf 1 2 1 9 1 16 1 23 1 3 11 6 11 13 11 2 11 27 12 4 12 11

More information

コンピュータ基礎 5. マークアップによるレポート作成

コンピュータ基礎 5. マークアップによるレポート作成 5. Chris Plaintail December 13, 2016 1 / 70 1 L A TEX L A TEX 2 L A TEX 3 4 L A TEXbeamer 2 / 70 L A TEX 3 / 70 PDF 4 / 70 HTML(Hyper Text Markup Language) XML(eXtensible Markup Language) XHTML, SVG, SMIL,

More information

1 1.1 1.2 1.3 (a) WYSIWYG (What you see is what you get.) (b) (c) Hyper Text Markup Language: SGML (Standard Generalized Markup Language) HTML (d) TEX

1 1.1 1.2 1.3 (a) WYSIWYG (What you see is what you get.) (b) (c) Hyper Text Markup Language: SGML (Standard Generalized Markup Language) HTML (d) TEX L A TEX HTML 2000 7 2 ([-30]5051.49) 1 2 1.1.............................................. 2 1.2.............................................. 2 1.3................................................ 2 1.4.............................................

More information

III

III III 1 1 2 1 2 3 1 3 4 1 3 1 4 1 3 2 4 1 3 3 6 1 4 6 1 4 1 6 1 4 2 8 1 4 3 9 1 5 10 1 5 1 10 1 5 2 12 1 5 3 12 1 5 4 13 1 6 15 2 1 18 2 1 1 18 2 1 2 19 2 2 20 2 3 22 2 3 1 22 2 3 2 24 2 4 25 2 4 1 25 2

More information

iii iv v vi vii viii ix 1 1-1 1-2 1-3 2 2-1 3 3-1 3-2 3-3 3-4 4 4-1 4-2 5 5-1 5-2 5-3 5-4 5-5 5-6 5-7 6 6-1 6-2 6-3 6-4 6-5 6 6-1 6-2 6-3 6-4 6-5 7 7-1 7-2 7-3 7-4 7-5 7-6 7-7 7-8 7-9 7-10 7-11 8 8-1

More information

i

i i ii iii iv v vi vii viii ix x xi ( ) 854.3 700.9 10 200 3,126.9 162.3 100.6 18.3 26.5 5.6/s ( ) ( ) 1949 8 12 () () ア イ ウ ) ) () () () () BC () () (

More information

I A A441 : April 15, 2013 Version : 1.1 I Kawahira, Tomoki TA (Shigehiro, Yoshida )

I A A441 : April 15, 2013 Version : 1.1 I   Kawahira, Tomoki TA (Shigehiro, Yoshida ) I013 00-1 : April 15, 013 Version : 1.1 I Kawahira, Tomoki TA (Shigehiro, Yoshida) http://www.math.nagoya-u.ac.jp/~kawahira/courses/13s-tenbou.html pdf * 4 15 4 5 13 e πi = 1 5 0 5 7 3 4 6 3 6 10 6 17

More information

これわかWord2010_第1部_100710.indd

これわかWord2010_第1部_100710.indd i 1 1 2 3 6 6 7 8 10 10 11 12 12 12 13 2 15 15 16 17 17 18 19 20 20 21 ii CONTENTS 25 26 26 28 28 29 30 30 31 32 35 35 35 36 37 40 42 44 44 45 46 49 50 50 51 iii 52 52 52 53 55 56 56 57 58 58 60 60 iv

More information

パワポカバー入稿用.indd

パワポカバー入稿用.indd i 1 1 2 2 3 3 4 4 4 5 7 8 8 9 9 10 11 13 14 15 16 17 19 ii CONTENTS 2 21 21 22 25 26 32 37 38 39 39 41 41 43 43 43 44 45 46 47 47 49 52 54 56 56 iii 57 59 62 64 64 66 67 68 71 72 72 73 74 74 77 79 81 84

More information

これでわかるAccess2010

これでわかるAccess2010 i 1 1 1 2 2 2 3 4 4 5 6 7 7 9 10 11 12 13 14 15 17 ii CONTENTS 2 19 19 20 23 24 25 25 26 29 29 31 31 33 35 36 36 39 39 41 44 45 46 48 iii 50 50 52 54 55 57 57 59 61 63 64 66 66 67 70 70 73 74 74 77 77

More information

TOP URL 1

TOP URL   1 TOP URL http://amonphys.web.fc2.com/ 1 30 3 30.1.............. 3 30.2........................... 4 30.3...................... 5 30.4........................ 6 30.5.................................. 8 30.6...............................

More information

untitled

untitled i ii iii iv v 43 43 vi 43 vii T+1 T+2 1 viii 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 a) ( ) b) ( ) 51

More information

2

2 1 2 3 4 5 6 7 8 9 10 I II III 11 IV 12 V 13 VI VII 14 VIII. 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 _ 33 _ 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 VII 51 52 53 54 55 56 57 58 59

More information

Year 2010 Graduation Thesis A LATEX Template for Graduation Thesis Keio University Faculty of Environment and Information Studies Fusuke Hogeyama Advi

Year 2010 Graduation Thesis A LATEX Template for Graduation Thesis Keio University Faculty of Environment and Information Studies Fusuke Hogeyama Advi 22 L A TEX Year 2010 Graduation Thesis A LATEX Template for Graduation Thesis Keio University Faculty of Environment and Information Studies Fusuke Hogeyama Advisor: Professor Hogeta Bahnaka 2010 22 L

More information

電気通信大学 コンピュータリテラシー 文書整形 --- LaTeX ---

電気通信大学 コンピュータリテラシー 文書整形 --- LaTeX --- 1 L A TEX B5 1. LaTeX ( ) : 1 3 2. LaTeX ( ) : 4 7 3. LaTeX (,, EPS ) : 8 10 4. LaTeX ( ) : 11 textlatex.pdf : tiny.tex, tiny.pdf : 1 small.tex, small.pdf : 2 normal.tex, normal.pdf : f1.eps : normal.tex

More information

平成18年版 男女共同参画白書

平成18年版 男女共同参画白書 i ii iii iv v vi vii viii ix 3 4 5 6 7 8 9 Column 10 11 12 13 14 15 Column 16 17 18 19 20 21 22 23 24 25 26 Column 27 28 29 30 Column 31 32 33 34 35 36 Column 37 Column 38 39 40 Column 41 42 43 44 45

More information

( ( 3 ( ( 6 (

( ( 3 ( ( 6 ( ( ( ( 43037 3 0 (Nicolas Bourbaki (Éléments d'histoire des athématiques : 984 b b b n ( b n/b n b ( 0 ( p.3 3500 ( 3500 300 4 500 600 300 (Euclid (Eukleides : EÎkleÐdhc : 300 (StoiqeÐwsic 7 ( 3 p.49 (

More information

パソコン機能ガイド

パソコン機能ガイド PART12 ii iii iv v 1 2 3 4 5 vi vii viii ix P A R T 1 x P A R T 2 xi P A R T 3 xii xiii P A R T 1 2 3 1 4 5 1 6 1 1 2 7 1 2 8 1 9 10 1 11 12 1 13 1 2 3 4 14 1 15 1 2 3 16 4 1 1 2 3 17 18 1 19 20 1 1

More information

パソコン機能ガイド

パソコン機能ガイド PART2 iii ii iv v 1 2 3 4 5 vi vii viii ix P A R T 1 x P A R T 2 xi P A R T 3 xii xiii P A R T 1 2 1 3 4 1 5 6 1 2 1 1 2 7 8 9 1 10 1 11 12 1 13 1 2 3 14 4 1 1 2 3 15 16 1 17 1 18 1 1 2 19 20 1 21 1 22

More information

1.5,. ( A, 7, * ) Emacs,., <Return>., <Delete>. <Delete>, Delete. <Delete>,. 1.6,.,, Emacs.,. ( ), ( ),,. C-x,., Emacs.,. C-x C-f ( )... C-x C-s. Emac

1.5,. ( A, 7, * ) Emacs,., <Return>., <Delete>. <Delete>, Delete. <Delete>,. 1.6,.,, Emacs.,. ( ), ( ),,. C-x,., Emacs.,. C-x C-f ( )... C-x C-s. Emac L A TEX 1 1.1 Emacs Emacs, (, CTRL, CTL ) (, )., CONTROL META,. C-< >, < >., C-f, f. ESC < >, < >. < >,. Emacs, C-x C-c.,. C-v. ESC v. 1.2., (previous) (next) (forward) (backward)., C-p, C-n, C-f, C-b,.

More information

A = A x x + A y y + A, B = B x x + B y y + B, C = C x x + C y y + C..6 x y A B C = A x x + A y y + A B x B y B C x C y C { B = A x x + A y y + A y B B

A = A x x + A y y + A, B = B x x + B y y + B, C = C x x + C y y + C..6 x y A B C = A x x + A y y + A B x B y B C x C y C { B = A x x + A y y + A y B B 9 7 A = A x x + A y y + A, B = B x x + B y y + B, C = C x x + C y y + C..6 x y A B C = A x x + A y y + A B x B y B C x C y C { B = A x x + A y y + A y B B x x B } B C y C y + x B y C x C C x C y B = A

More information

7 π L int = gψ(x)ψ(x)φ(x) + (7.4) [ ] p ψ N = n (7.5) π (π +,π 0,π ) ψ (σ, σ, σ )ψ ( A) σ τ ( L int = gψψφ g N τ ) N π * ) (7.6) π π = (π, π, π ) π ±

7 π L int = gψ(x)ψ(x)φ(x) + (7.4) [ ] p ψ N = n (7.5) π (π +,π 0,π ) ψ (σ, σ, σ )ψ ( A) σ τ ( L int = gψψφ g N τ ) N π * ) (7.6) π π = (π, π, π ) π ± 7 7. ( ) SU() SU() 9 ( MeV) p 98.8 π + π 0 n 99.57 9.57 97.4 497.70 δm m 0.4%.% 0.% 0.8% π 9.57 4.96 Σ + Σ 0 Σ 89.6 9.46 K + K 0 49.67 (7.) p p = αp + βn, n n = γp + δn (7.a) [ ] p ψ ψ = Uψ, U = n [ α

More information

総研大恒星進化概要.dvi

総研大恒星進化概要.dvi The Structure and Evolution of Stars I. Basic Equations. M r r =4πr2 ρ () P r = GM rρ. r 2 (2) r: M r : P and ρ: G: M r Lagrange r = M r 4πr 2 rho ( ) P = GM r M r 4πr. 4 (2 ) s(ρ, P ) s(ρ, P ) r L r T

More information

1... 1 2... 1 1... 1 2... 2 3... 2 4... 4 5... 4 6... 4 7... 22 8... 22 3... 22 1... 22 2... 23 3... 23 4... 24 5... 24 6... 25 7... 31 8... 32 9... 3

1... 1 2... 1 1... 1 2... 2 3... 2 4... 4 5... 4 6... 4 7... 22 8... 22 3... 22 1... 22 2... 23 3... 23 4... 24 5... 24 6... 25 7... 31 8... 32 9... 3 3 2620149 3 6 3 2 198812 21/ 198812 21 1 3 4 5 JISJIS X 0208 : 1997 JIS 4 JIS X 0213:2004 http://www.pref.hiroshima.lg.jp/site/monjokan/ 1... 1 2... 1 1... 1 2... 2 3... 2 4... 4 5... 4 6... 4 7... 22

More information

Dirac 38 5 Dirac 4 4 γ µ p µ p µ + m 2 = ( p µ γ µ + m)(p ν γ ν + m) (5.1) γ = p µ p ν γ µ γ ν p µ γ µ m + mp ν γ ν + m 2 = 1 2 p µp ν {γ µ, γ ν } + m

Dirac 38 5 Dirac 4 4 γ µ p µ p µ + m 2 = ( p µ γ µ + m)(p ν γ ν + m) (5.1) γ = p µ p ν γ µ γ ν p µ γ µ m + mp ν γ ν + m 2 = 1 2 p µp ν {γ µ, γ ν } + m Dirac 38 5 Dirac 4 4 γ µ p µ p µ + m 2 p µ γ µ + mp ν γ ν + m 5.1 γ p µ p ν γ µ γ ν p µ γ µ m + mp ν γ ν + m 2 1 2 p µp ν {γ µ, γ ν } + m 2 5.2 p m p p µ γ µ {, } 10 γ {γ µ, γ ν } 2η µν 5.3 p µ γ µ + mp

More information

II (No.2) 2 4,.. (1) (cm) (2) (cm) , (

II (No.2) 2 4,.. (1) (cm) (2) (cm) , ( II (No.1) 1 x 1, x 2,..., x µ = 1 V = 1 k=1 x k (x k µ) 2 k=1 σ = V. V = σ 2 = 1 x 2 k µ 2 k=1 1 µ, V σ. (1) 4, 7, 3, 1, 9, 6 (2) 14, 17, 13, 11, 19, 16 (3) 12, 21, 9, 3, 27, 18 (4) 27.2, 29.3, 29.1, 26.0,

More information

visit.dvi

visit.dvi L A TEX 1 L A TEX 1.1 L A TEX,. L A TEX,. ( Emacs). \documentclass{jarticle} \begin{document} Hello!!, \LaTeX Hello!!, L A TEX L A TEX2ε. \LaTeXe. \end{document},. \, L A TEX. L A TEX. \LaTeX L A TEX..

More information

tex02.dvi

tex02.dvi 2002 2 L A TEX 2002 4 15 : L A TEX EPS EPS 1 L A TEX L A TEX L A TEX L A TEX 1.1 L A TEX 1.1.1 L A TEX TEX.tex.tex.tex 1.1.2 TEX 1. TEX L A TEX Y TEX L A TEX Y (@ ) TEX L A TEX 2. 1 YTeX YTeX ( ) 3. 2

More information

量子力学 問題

量子力学 問題 3 : 203 : 0. H = 0 0 2 6 0 () = 6, 2 = 2, 3 = 3 3 H 6 2 3 ϵ,2,3 (2) ψ = (, 2, 3 ) ψ Hψ H (3) P i = i i P P 2 = P 2 P 3 = P 3 P = O, P 2 i = P i (4) P + P 2 + P 3 = E 3 (5) i ϵ ip i H 0 0 (6) R = 0 0 [H,

More information

I A A441 : April 21, 2014 Version : Kawahira, Tomoki TA (Kondo, Hirotaka ) Google

I A A441 : April 21, 2014 Version : Kawahira, Tomoki TA (Kondo, Hirotaka ) Google I4 - : April, 4 Version :. Kwhir, Tomoki TA (Kondo, Hirotk) Google http://www.mth.ngoy-u.c.jp/~kwhir/courses/4s-biseki.html pdf 4 4 4 4 8 e 5 5 9 etc. 5 6 6 6 9 n etc. 6 6 6 3 6 3 7 7 etc 7 4 7 7 8 5 59

More information

4.4... 17 4.5... 18 4.6... 18 4.7 sin log lim... 18 5 19 6 20 6.1... 20 6.2... 21 7 22 7.1... 22 7.2... 23 8 Deutsch 24 9 24 1 Hello, TEX World! 1.1 T

4.4... 17 4.5... 18 4.6... 18 4.7 sin log lim... 18 5 19 6 20 6.1... 20 6.2... 21 7 22 7.1... 22 7.2... 23 8 Deutsch 24 9 24 1 Hello, TEX World! 1.1 T -platex2 by MiYaGG 1 Hello, TEX World! 2 1.1 TEX... 2 1.2 pl A TEX2... 3 1.3 TEX... 4 1.4 TEX... 4 1.5 To err is human......... 6 1.6 UNIX... 6 2 7 2.1... 7 2.2... 8 2.3... 8 2.4... 9 2.5... 10 2.6...

More information

0.,,., m Euclid m m. 2.., M., M R 2 ψ. ψ,, R 2 M.,, (x 1 (),, x m ()) R m. 2 M, R f. M (x 1,, x m ), f (x 1,, x m ) f(x 1,, x m ). f ( ). x i : M R.,,

0.,,., m Euclid m m. 2.., M., M R 2 ψ. ψ,, R 2 M.,, (x 1 (),, x m ()) R m. 2 M, R f. M (x 1,, x m ), f (x 1,, x m ) f(x 1,, x m ). f ( ). x i : M R.,, 2012 10 13 1,,,.,,.,.,,. 2?.,,. 1,, 1. (θ, φ), θ, φ (0, π),, (0, 2π). 1 0.,,., m Euclid m m. 2.., M., M R 2 ψ. ψ,, R 2 M.,, (x 1 (),, x m ()) R m. 2 M, R f. M (x 1,, x m ), f (x 1,, x m ) f(x 1,, x m ).

More information

1... 1 1... 1 2... 1 3... 1 4... 4 5... 7 6... 7 7... 12 8... 12 9... 13 10... 13 11... 13 12... 14 2... 14 1... 14 2... 16 3... 18 4... 19 5... 19 6.

1... 1 1... 1 2... 1 3... 1 4... 4 5... 7 6... 7 7... 12 8... 12 9... 13 10... 13 11... 13 12... 14 2... 14 1... 14 2... 16 3... 18 4... 19 5... 19 6. 3 2620149 1 3 8 3 2 198809 1/1 198809 1 1 3 4 5 JISJIS X 0208 : 1997 JIS 4 JIS X 0213:2004 http://www.pref.hiroshima.lg.jp/site/monjokan/ 1... 1 1... 1 2... 1 3... 1 4... 4 5... 7 6... 7 7... 12 8... 12

More information

,. Black-Scholes u t t, x c u 0 t, x x u t t, x c u t, x x u t t, x + σ x u t, x + rx ut, x rux, t 0 x x,,.,. Step 3, 7,,, Step 6., Step 4,. Step 5,,.

,. Black-Scholes u t t, x c u 0 t, x x u t t, x c u t, x x u t t, x + σ x u t, x + rx ut, x rux, t 0 x x,,.,. Step 3, 7,,, Step 6., Step 4,. Step 5,,. 9 α ν β Ξ ξ Γ γ o δ Π π ε ρ ζ Σ σ η τ Θ θ Υ υ ι Φ φ κ χ Λ λ Ψ ψ µ Ω ω Def, Prop, Th, Lem, Note, Remark, Ex,, Proof, R, N, Q, C [a, b {x R : a x b} : a, b {x R : a < x < b} : [a, b {x R : a x < b} : a,

More information

PowerPoint プレゼンテーション

PowerPoint プレゼンテーション LaTeX Cheat Sheet 2015 ver. 2015/10/16 Matsuoka Ryo このスライドについて 1. このスライドは 北 大 理 学 部 を 中 心 とした 有 志 で 行 われている TeX 勉 強 会 で 使 われていた 資 料 です 2. このスライドの 不 正 確 な 記 述 によって 生 じた いかなる 損 害 に 関 しても 作 者 は 責 任 を 負 いかねます

More information

.2 ρ dv dt = ρk grad p + 3 η grad (divv) + η 2 v.3 divh = 0, rote + c H t = 0 dive = ρ, H = 0, E = ρ, roth c E t = c ρv E + H c t = 0 H c E t = c ρv T

.2 ρ dv dt = ρk grad p + 3 η grad (divv) + η 2 v.3 divh = 0, rote + c H t = 0 dive = ρ, H = 0, E = ρ, roth c E t = c ρv E + H c t = 0 H c E t = c ρv T NHK 204 2 0 203 2 24 ( ) 7 00 7 50 203 2 25 ( ) 7 00 7 50 203 2 26 ( ) 7 00 7 50 203 2 27 ( ) 7 00 7 50 I. ( ν R n 2 ) m 2 n m, R = e 2 8πε 0 hca B =.09737 0 7 m ( ν = ) λ a B = 4πε 0ħ 2 m e e 2 = 5.2977

More information

H 0 H = H 0 + V (t), V (t) = gµ B S α qb e e iωt i t Ψ(t) = [H 0 + V (t)]ψ(t) Φ(t) Ψ(t) = e ih0t Φ(t) H 0 e ih0t Φ(t) + ie ih0t t Φ(t) = [

H 0 H = H 0 + V (t), V (t) = gµ B S α qb e e iωt i t Ψ(t) = [H 0 + V (t)]ψ(t) Φ(t) Ψ(t) = e ih0t Φ(t) H 0 e ih0t Φ(t) + ie ih0t t Φ(t) = [ 3 3. 3.. H H = H + V (t), V (t) = gµ B α B e e iωt i t Ψ(t) = [H + V (t)]ψ(t) Φ(t) Ψ(t) = e iht Φ(t) H e iht Φ(t) + ie iht t Φ(t) = [H + V (t)]e iht Φ(t) Φ(t) i t Φ(t) = V H(t)Φ(t), V H (t) = e iht V (t)e

More information

2 (2) WinShell 2 (3) WinShell L A TEX ( ) ( ) 2 1 L A TEX.tex L A TEX WinShell (4) WinShell 2 L A TEX L A TEX DVI DeVice Independent (5) WinShell 2 DV

2 (2) WinShell 2 (3) WinShell L A TEX ( ) ( ) 2 1 L A TEX.tex L A TEX WinShell (4) WinShell 2 L A TEX L A TEX DVI DeVice Independent (5) WinShell 2 DV 1 L A TEX 2014 1 L A TEX [ 1 ] 1 : L A TEX 1.1 L A TEX L A TEX ( ) L A TEX L A TEX ( ) ( ) L A TEX \ \ Windows Y= \ Windows Y= 1.2 L A TEX WinShell Windows L A TEX WinShell Windows L A TEX WinShell L A

More information

64 3 g=9.85 m/s 2 g=9.791 m/s 2 36, km ( ) 1 () 2 () m/s : : a) b) kg/m kg/m k

64 3 g=9.85 m/s 2 g=9.791 m/s 2 36, km ( ) 1 () 2 () m/s : : a) b) kg/m kg/m k 63 3 Section 3.1 g 3.1 3.1: : 64 3 g=9.85 m/s 2 g=9.791 m/s 2 36, km ( ) 1 () 2 () 3 9.8 m/s 2 3.2 3.2: : a) b) 5 15 4 1 1. 1 3 14. 1 3 kg/m 3 2 3.3 1 3 5.8 1 3 kg/m 3 3 2.65 1 3 kg/m 3 4 6 m 3.1. 65 5

More information

™…

™… i 1 1 1 2 3 5 5 6 7 9 10 11 13 13 14 15 15 16 17 18 20 20 20 21 22 ii CONTENTS 23 24 26 27 2 31 31 32 32 33 34 37 37 38 39 39 40 42 42 43 44 45 48 50 51 51 iii 54 57 58 60 60 62 64 64 67 69 70 iv 70 71

More information

チュートリアル:ノンパラメトリックベイズ

チュートリアル:ノンパラメトリックベイズ { x,x, L, xn} 2 p( θ, θ, θ, θ, θ, } { 2 3 4 5 θ6 p( p( { x,x, L, N} 2 x { θ, θ2, θ3, θ4, θ5, θ6} K n p( θ θ n N n θ x N + { x,x, L, N} 2 x { θ, θ2, θ3, θ4, θ5, θ6} log p( 6 n logθ F 6 log p( + λ θ F θ

More information

ii th-note

ii th-note 4 I alpha α nu N ν beta B β i Ξ ξ gamma Γ γ omicron o delta δ pi Π π, ϖ epsilon E ϵ, ε rho P ρ, ϱ zeta Z ζ sigma Σ σ, ς eta H η tau T τ theta Θ θ, ϑ upsilon Υ υ iota I ι phi Φ ϕ, φ kappa K κ chi X χ lambda

More information

ii iii iv CON T E N T S iii iv v Chapter1 Chapter2 Chapter 1 002 1.1 004 1.2 004 1.2.1 007 1.2.2 009 1.3 009 1.3.1 010 1.3.2 012 1.4 012 1.4.1 014 1.4.2 015 1.5 Chapter3 Chapter4 Chapter5 Chapter6 Chapter7

More information

No δs δs = r + δr r = δr (3) δs δs = r r = δr + u(r + δr, t) u(r, t) (4) δr = (δx, δy, δz) u i (r + δr, t) u i (r, t) = u i x j δx j (5) δs 2

No δs δs = r + δr r = δr (3) δs δs = r r = δr + u(r + δr, t) u(r, t) (4) δr = (δx, δy, δz) u i (r + δr, t) u i (r, t) = u i x j δx j (5) δs 2 No.2 1 2 2 δs δs = r + δr r = δr (3) δs δs = r r = δr + u(r + δr, t) u(r, t) (4) δr = (δx, δy, δz) u i (r + δr, t) u i (r, t) = u i δx j (5) δs 2 = δx i δx i + 2 u i δx i δx j = δs 2 + 2s ij δx i δx j

More information