MediaWiki for Kisorigaku
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1 MediaWiki for Kisorigaku
2 1 Kisorigaku MediaWiki PNG
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15 3.1.,... 1 \alpha α \eta η \nu ν \tau τ \beta β \theta θ \xi ξ \upsilon υ \gamma γ \iota ι o o \phi ϕ \delta δ \kappa κ \pi π \chi χ \epsilon ϵ \lambda λ \rho ρ \psi ψ \zeta ζ \mu µ \sigma σ \omega ω \., \varepsilon ε. o,. \hat{a} â \grave{a} à \dot{a} ȧ \check{a} ǎ \tilde{a} ã \ddot{a} ä \breve{a} ă \bar{a} ā \vec{a} a \acute{a} á {}}{ \overline{x+y} x + y \overbrace{x+y}ˆ{ } x + y \underline{x+y} x + y \underbrace{x+y} { } x + y }{{} \widehat{x+y} x + y \overrightarrow{x+y} \widetilde{x+y} x + y \overleftarrow{x+y} \ldots... \cdots \vdots \ddots.... x + y x + y
16 3 \le \in \sqsupseteq \neq. \prec \notin / \dashv \doteq = \preceq \ge \ni \propto \ll \succ \equiv \models = \subset \succeq \sim \perp \subseteq \gg \simeq \mid \sqsubset \supset \asymp \parallel \sqsubseteq \supseteq \approx \bowtie \vdash \sqsupset \cong = \Join \smile \frown \pm ± \cap \diamond \oplus \mp \cup \bigtriangleup \ominus \times \uplus \bigtriangledown \otimes \div \sqcap \triangleleft \oslash \ast \sqcup \triangleright \odot \star \vee \lhd \bigcirc \circ \wedge \rhd \dagger \bullet \setminus \ \unlhd \ddagger \cdot \wr \unrhd \amalg \pm ± \cap \diamond \oplus \mp \cup \bigtriangleup \ominus \times \uplus \bigtriangledown \otimes \div \sqcap \triangleleft \oslash \ast \sqcup \triangleright \odot \star \vee \lhd \bigcirc \circ \wedge \rhd \dagger \bullet \setminus \ \unlhd \ddagger \cdot \wr \unrhd \amalg 16
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18 3 ( 1 2) \left(\frac{1}{2} \right). MediaWiki.., \left \right. <math>... </math>. \mbox{... } <math>xˆ{2}</math>, <math>a {n}</math> <math>\frac{ }{ }</math> <math>\sqrt[n]{x}</math> <math>\sin kx</math> <math>\lim {n\to\infty}x {n}=a</math> <math>\int {0}ˆ{1}\sum {i=1}ˆ{\infty}f {i}(x) dx </math> x 2, a n n x sin kx lim x n = a n f i (x)dx 1 0 i= \mathbb{abcdef} ABCDEF \mathbf{abcdef} ABCDEF \mathit{abcdef} ABCDEF \mathrm{abcdef} ABCDEF \mathfrak{abcdef} ABCDEF \mathcal{abcdef} ABCDEF Coffee Break MediaWiki, L A T E X def.\stackrel, \stackrel{\mathrm{def}{\longleftrightarrow}}. 18
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20 ,. <math> f(x)= \begin{cases} 0 & x<0 \\ 1 & x\ge 0 \end{cases} </math> f(x) = { 0 x < 0 1 x 0 <math> \begin{align} f(x) & = (a+b)ˆ{2} \\ & = aˆ{2} +2ab + bˆ{2} \\ \end{align} </math> f(x) = (a + b) 2 = a 2 + 2ab + b PNG <math></math> \ MediaWiki PNG, <math>a,b</math> HTML.,, PNG. PNG \. HTML, PNG.., x x. 20
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