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2026-04-23T17:09:25Z
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Marc Brown: Created page with ";TeX Samples ;TeX 샘플 == nowiki Test== <source lang='html5'> <math>E=mc^2</math> </source> <math>E=mc^2</math> <source lang='html5'> <nowiki><math>E=mc^2</math></nowiki>..."
2018-07-12T04:02:01Z
<p>Created page with ";TeX Samples ;TeX 샘플 == nowiki Test== <source lang='html5'> <math>E=mc^2</math> </source> <math>E=mc^2</math> <source lang='html5'> <nowiki><math>E=mc^2</math></nowiki>..."</p>
<p><b>New page</b></p><div>;TeX Samples<br />
;TeX 샘플<br />
<br />
== nowiki Test==<br />
<source lang='html5'><br />
<math>E=mc^2</math><br />
</source><br />
<math>E=mc^2</math><br />
<br />
<source lang='html5'><br />
<nowiki><math>E=mc^2</math></nowiki><br />
</source><br />
<nowiki><math>E=mc^2</math></nowiki><br />
<br />
== Inequality Sign Test ==<br />
<source lang='html5'><br />
<math>1<2</math><br />
</source><br />
<math>1<2</math><br />
<br />
<source lang='html5'><br />
<math>2>1</math><br />
</source><br />
<math>2>1</math><br />
<br />
<source lang='html5'><br />
<math>1\lt 2</math><br />
</source><br />
<math>1\lt 2</math><br />
<br />
<source lang='html5'><br />
<math>2\gt 1</math><br />
</source><br />
<math>2\gt 1</math><br />
<br />
== Inequality Sign Test 2 ==<br />
<source lang='html5'><br />
<math>a<b</math><br />
</source><br />
<math>a<b</math><br />
<br />
<source lang='html5'><br />
<math>a < b</math><br />
</source><br />
<math>a < b</math><br />
<br />
<source lang='html5'><br />
<math>a>b</math><br />
</source><br />
<math>a>b</math><br />
<br />
<source lang='html5'><br />
<math>a > b</math><br />
</source><br />
<math>a > b</math><br />
<br />
== UTF-8 Test ==<br />
<source lang='html5'><br />
<math>전압 = 전류 \times 저항</math><br />
</source><br />
<math>전압 = 전류 \times 저항</math><br />
<br />
<source lang='html5'><br />
<math>저항 = \frac{전압}{전류}</math><br />
</source><br />
<math>저항 = \frac{전압}{전류}</math><br />
<br />
<source lang='html5'><br />
<math>償還までの合計利回り =\left(1+\frac{期間利率}{100}\right)^{期間}</math><br />
</source><br />
<math>償還までの合計利回り =\left(1+\frac{期間利率}{100}\right)^{期間}</math><br />
<br />
<source lang='html5'><br />
<math>n</math>개의 동전을 던져 앞면 <math>k</math>가 나올 확률 <math>P(E)</math>는?<br />
</source><br />
<math>n</math>개의 동전을 던져 앞면 <math>k</math>가 나올 확률 <math>P(E)</math>는?<br />
<br />
== The Lorenz Equations ==<br />
<source lang='html5'><br />
<math>\begin{align}<br />
\dot{x} & = \sigma(y-x) \\<br />
\dot{y} & = \rho x - y - xz \\<br />
\dot{z} & = -\beta z + xy<br />
\end{align}</math><br />
</source><br />
<br />
<math>\begin{align}<br />
\dot{x} & = \sigma(y-x) \\<br />
\dot{y} & = \rho x - y - xz \\<br />
\dot{z} & = -\beta z + xy<br />
\end{align}</math><br />
<br />
== The Cauchy-Schwarz Inequality ==<br />
<source lang='html5'><br />
<math>\left( \sum_{k=1}^n a_k b_k \right)^2 \leq \left( \sum_{k=1}^n a_k^2 \right) \left( \sum_{k=1}^n b_k^2 \right)</math><br />
</source><br />
<math>\left( \sum_{k=1}^n a_k b_k \right)^2 \leq \left( \sum_{k=1}^n a_k^2 \right) \left( \sum_{k=1}^n b_k^2 \right)</math><br />
<br />
== A Cross Product Formula ==<br />
<source lang='html5'><br />
<math>\mathbf{V}_1 \times \mathbf{V}_2 = \begin{vmatrix}<br />
\mathbf{i} & \mathbf{j} & \mathbf{k} \\<br />
\frac{\partial X}{\partial u} & \frac{\partial Y}{\partial u} & 0 \\<br />
\frac{\partial X}{\partial v} & \frac{\partial Y}{\partial v} & 0<br />
\end{vmatrix}</math><br />
</source><br />
<br />
<math>\mathbf{V}_1 \times \mathbf{V}_2 = \begin{vmatrix}<br />
\mathbf{i} & \mathbf{j} & \mathbf{k} \\<br />
\frac{\partial X}{\partial u} & \frac{\partial Y}{\partial u} & 0 \\<br />
\frac{\partial X}{\partial v} & \frac{\partial Y}{\partial v} & 0<br />
\end{vmatrix}</math><br />
<br />
== The probability of getting k heads when flipping n coins is ==<br />
<source lang='html5'><br />
<math>P(E) = {n \choose k} p^k (1-p)^{ n-k}</math><br />
</source><br />
<br />
<math>P(E) = {n \choose k} p^k (1-p)^{ n-k}</math><br />
<br />
== An Identity of Ramanujan ==<br />
<source lang='html5'><br />
<math>\frac{1}{\Bigl(\sqrt{\phi \sqrt{5}}-\phi\Bigr) e^{\frac25 \pi}} =<br />
1+\frac{e^{-2\pi}} {1+\frac{e^{-4\pi}} {1+\frac{e^{-6\pi}}<br />
{1+\frac{e^{-8\pi}} {1+\ldots} } } }</math><br />
</source><br />
<br />
<math>\frac{1}{\Bigl(\sqrt{\phi \sqrt{5}}-\phi\Bigr) e^{\frac25 \pi}} =<br />
1+\frac{e^{-2\pi}} {1+\frac{e^{-4\pi}} {1+\frac{e^{-6\pi}}<br />
{1+\frac{e^{-8\pi}} {1+\ldots} } } }</math><br />
<br />
== A Rogers-Ramanujan Identity ==<br />
<source lang='html5'><br />
<math>1 + \frac{q^2}{(1-q)} + \frac{q^6}{(1-q)(1-q^2)} + \cdots<br />
= \prod_{j=0}^{\infty}\frac{1}{(1-q^{5j+2})(1-q^{5j+3})},<br />
\quad\quad for\,|q|<1.</math><br />
</source><br />
<br />
<math>1 + \frac{q^2}{(1-q)} + \frac{q^6}{(1-q)(1-q^2)} + \cdots<br />
= \prod_{j=0}^{\infty}\frac{1}{(1-q^{5j+2})(1-q^{5j+3})},<br />
\quad\quad for\,|q|<1.</math><br />
<br />
== Maxwell’s Equations ==<br />
<source lang='html5'><br />
<math>\begin{align}<br />
\nabla \times \vec{\mathbf{B}} -\, \frac1c\, \frac{\partial\vec{\mathbf{E}}}{\partial t} & = \frac{4\pi}{c}\vec{\mathbf{j}} \\ \nabla \cdot \vec{\mathbf{E}} & = 4 \pi \rho \\<br />
\nabla \times \vec{\mathbf{E}}\, +\, \frac1c\, \frac{\partial\vec{\mathbf{B}}}{\partial t} & = \vec{\mathbf{0}} \\<br />
\nabla \cdot \vec{\mathbf{B}} & = 0<br />
\end{align}</math><br />
</source><br />
<br />
<math>\begin{align}<br />
\nabla \times \vec{\mathbf{B}} -\, \frac1c\, \frac{\partial\vec{\mathbf{E}}}{\partial t} & = \frac{4\pi}{c}\vec{\mathbf{j}} \\ \nabla \cdot \vec{\mathbf{E}} & = 4 \pi \rho \\<br />
\nabla \times \vec{\mathbf{E}}\, +\, \frac1c\, \frac{\partial\vec{\mathbf{B}}}{\partial t} & = \vec{\mathbf{0}} \\<br />
\nabla \cdot \vec{\mathbf{B}} & = 0<br />
\end{align}</math><br />
<br />
==같이 보기==<br />
*[[TeX]]<br />
<br />
==참고 자료==<br />
*https://www.mediawiki.org/wiki/Extension:SimpleMathJax<br />
*http://www.mathjax.org/demos/tex-samples/</div>
Marc Brown