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<h2>sTeX mode</h2>
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\begin{module}[id=bbt-size]
\importmodule[balanced-binary-trees]{balanced-binary-trees}
\importmodule[\KWARCslides{dmath/en/cardinality}]{cardinality}

\begin{frame}
  \frametitle{Size Lemma for Balanced Trees}
  \begin{itemize}
  \item
    \begin{assertion}[id=size-lemma,type=lemma] 
    Let $G=\tup{V,E}$ be a \termref[cd=binary-trees]{balanced binary tree} 
    of \termref[cd=graph-depth,name=vertex-depth]{depth}$n>i$, then the set
     $\defeq{\livar{V}i}{\setst{\inset{v}{V}}{\gdepth{v} = i}}$ of
    \termref[cd=graphs-intro,name=node]{nodes} at 
    \termref[cd=graph-depth,name=vertex-depth]{depth} $i$ has
    \termref[cd=cardinality,name=cardinality]{cardinality} $\power2i$.
   \end{assertion}
  \item
    \begin{sproof}[id=size-lemma-pf,proofend=,for=size-lemma]{via induction over the depth $i$.}
      \begin{spfcases}{We have to consider two cases}
        \begin{spfcase}{$i=0$}
          \begin{spfstep}[display=flow]
            then $\livar{V}i=\set{\livar{v}r}$, where $\livar{v}r$ is the root, so
            $\eq{\card{\livar{V}0},\card{\set{\livar{v}r}},1,\power20}$.
          \end{spfstep}
        \end{spfcase}
        \begin{spfcase}{$i>0$}
          \begin{spfstep}[display=flow]
           then $\livar{V}{i-1}$ contains $\power2{i-1}$ vertexes 
           \begin{justification}[method=byIH](IH)\end{justification}
          \end{spfstep}
          \begin{spfstep}
           By the \begin{justification}[method=byDef]definition of a binary
              tree\end{justification}, each $\inset{v}{\livar{V}{i-1}}$ is a leaf or has
            two children that are at depth $i$.
          \end{spfstep}
          \begin{spfstep}
           As $G$ is \termref[cd=balanced-binary-trees,name=balanced-binary-tree]{balanced} and $\gdepth{G}=n>i$, $\livar{V}{i-1}$ cannot contain
            leaves.
          \end{spfstep}
          \begin{spfstep}[type=conclusion]
           Thus $\eq{\card{\livar{V}i},{\atimes[cdot]{2,\card{\livar{V}{i-1}}}},{\atimes[cdot]{2,\power2{i-1}}},\power2i}$.
          \end{spfstep}
        \end{spfcase}
      \end{spfcases}
    \end{sproof}
  \item 
    \begin{assertion}[id=fbbt,type=corollary]	
      A fully balanced tree of depth $d$ has $\power2{d+1}-1$ nodes.
    \end{assertion}
  \item
      \begin{sproof}[for=fbbt,id=fbbt-pf]{}
        \begin{spfstep}
          Let $\defeq{G}{\tup{V,E}}$ be a fully balanced tree
        \end{spfstep}
        \begin{spfstep}
          Then $\card{V}=\Sumfromto{i}1d{\power2i}= \power2{d+1}-1$.
        \end{spfstep}
      \end{sproof}
    \end{itemize}
  \end{frame}
\begin{note}
  \begin{omtext}[type=conclusion,for=binary-tree]
    This shows that balanced binary trees grow in breadth very quickly, a consequence of
    this is that they are very shallow (and this compute very fast), which is the essence of
    the next result.
  \end{omtext}
\end{note}
\end{module}

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%%% TeX-master: "all"
%%% End: \end{document}
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  </article>
First commit, version 0.2.7 2015-05-04 07:53:29 +00:00			`<!doctype html>`

			`<title>CodeMirror: sTeX mode</title>`
			`<meta charset="utf-8"/>`
			`<link rel=stylesheet href="../../doc/docs.css">`

			`<link rel="stylesheet" href="../../lib/codemirror.css">`
			`<script src="../../lib/codemirror.js"></script>`
			`<script src="stex.js"></script>`
			`<style>.CodeMirror {background: #f8f8f8;}</style>`
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			`<a href="http://codemirror.net"><h1>CodeMirror</h1><img id=logo src="../../doc/logo.png"></a>`

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			`<ul>`
			`<li><a href="../index.html">Language modes</a>`
			`<li><a class=active href="#">sTeX</a>`
			`</ul>`
			`</div>`

			`<article>`
			`<h2>sTeX mode</h2>`
			`<form><textarea id="code" name="code">`
			`\begin{module}[id=bbt-size]`
			`\importmodule[balanced-binary-trees]{balanced-binary-trees}`
			`\importmodule[\KWARCslides{dmath/en/cardinality}]{cardinality}`

			`\begin{frame}`
			`\frametitle{Size Lemma for Balanced Trees}`
			`\begin{itemize}`
			`\item`
			`\begin{assertion}[id=size-lemma,type=lemma]`
			`Let $G=\tup{V,E}$ be a \termref[cd=binary-trees]{balanced binary tree}`
			`of \termref[cd=graph-depth,name=vertex-depth]{depth}$n>i$, then the set`
			`$\defeq{\livar{V}i}{\setst{\inset{v}{V}}{\gdepth{v} = i}}$ of`
			`\termref[cd=graphs-intro,name=node]{nodes} at`
			`\termref[cd=graph-depth,name=vertex-depth]{depth} $i$ has`
			`\termref[cd=cardinality,name=cardinality]{cardinality} $\power2i$.`
			`\end{assertion}`
			`\item`
			`\begin{sproof}[id=size-lemma-pf,proofend=,for=size-lemma]{via induction over the depth $i$.}`
			`\begin{spfcases}{We have to consider two cases}`
			`\begin{spfcase}{$i=0$}`
			`\begin{spfstep}[display=flow]`
			`then $\livar{V}i=\set{\livar{v}r}$, where $\livar{v}r$ is the root, so`
			`$\eq{\card{\livar{V}0},\card{\set{\livar{v}r}},1,\power20}$.`
			`\end{spfstep}`
			`\end{spfcase}`
			`\begin{spfcase}{$i>0$}`
			`\begin{spfstep}[display=flow]`
			`then $\livar{V}{i-1}$ contains $\power2{i-1}$ vertexes`
			`\begin{justification}[method=byIH](IH)\end{justification}`
			`\end{spfstep}`
			`\begin{spfstep}`
			`By the \begin{justification}[method=byDef]definition of a binary`
			`tree\end{justification}, each $\inset{v}{\livar{V}{i-1}}$ is a leaf or has`
			`two children that are at depth $i$.`
			`\end{spfstep}`
			`\begin{spfstep}`
			`As $G$ is \termref[cd=balanced-binary-trees,name=balanced-binary-tree]{balanced} and $\gdepth{G}=n>i$, $\livar{V}{i-1}$ cannot contain`
			`leaves.`
			`\end{spfstep}`
			`\begin{spfstep}[type=conclusion]`
			`Thus $\eq{\card{\livar{V}i},{\atimes[cdot]{2,\card{\livar{V}{i-1}}}},{\atimes[cdot]{2,\power2{i-1}}},\power2i}$.`
			`\end{spfstep}`
			`\end{spfcase}`
			`\end{spfcases}`
			`\end{sproof}`
			`\item`
			`\begin{assertion}[id=fbbt,type=corollary]`
			`A fully balanced tree of depth $d$ has $\power2{d+1}-1$ nodes.`
			`\end{assertion}`
			`\item`
			`\begin{sproof}[for=fbbt,id=fbbt-pf]{}`
			`\begin{spfstep}`
			`Let $\defeq{G}{\tup{V,E}}$ be a fully balanced tree`
			`\end{spfstep}`
			`\begin{spfstep}`
			`Then $\card{V}=\Sumfromto{i}1d{\power2i}= \power2{d+1}-1$.`
			`\end{spfstep}`
			`\end{sproof}`
			`\end{itemize}`
			`\end{frame}`
			`\begin{note}`
			`\begin{omtext}[type=conclusion,for=binary-tree]`
			`This shows that balanced binary trees grow in breadth very quickly, a consequence of`
			`this is that they are very shallow (and this compute very fast), which is the essence of`
			`the next result.`
			`\end{omtext}`
			`\end{note}`
			`\end{module}`

			`%%% Local Variables:`
			`%%% mode: LaTeX`
			`%%% TeX-master: "all"`
			`%%% End: \end{document}`
			`</textarea></form>`
			`<script>`
			`var editor = CodeMirror.fromTextArea(document.getElementById("code"), {});`
			`</script>`

			`<p><strong>MIME types defined:</strong> <code>text/x-stex</code>.</p>`

			`<p><strong>Parsing/Highlighting Tests:</strong> <a href="../../test/index.html#stex_">normal</a>, <a href="../../test/index.html#verbose,stex_">verbose</a>.</p>`

			`</article>`