CodeObject/storage/zeta/_static/30928.html

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            <h1>Yokohama Phenomena</h1>
        </header>
        <article class="section">
<h2>문제</h2>
<p>Do you know about Yokohama Phenomena? The phenomenon takes place when three programmers, sitting around a table, hold a single pen together above a board. A grid of squares is drawn on the board, with each square marked with a single letter. Although none of the participants purposely moves the pen, its nib, as if it has a will, goes down to one of the squares marked with <code>Y</code>, and then starts moving on the board. The squares passed are marked with <code>O</code>, <code>K</code>, <code>O</code>, <code>H</code>, <code>A</code>, and <code>M</code> in this order, and then the nib stops on the square marked with <code>A</code>.</p>

<p>Let us call the series of squares along such a trajectory of the nib a <em>YOKOHAMA trace</em>. A YOKOHAMA trace is defined as follows.</p>

<ul>
	<li>It is a series of eight squares in the given grid of squares.</li>
	<li>Every square in the series, except for the first one, shares an edge with (is edge-adjacent to) its directly preceding square in the series.</li>
	<li>The letters marked in the eight squares of the series are <code>Y</code>, <code>O</code>, <code>K</code>, <code>O</code>, <code>H</code>, <code>A</code>, <code>M</code>, and <code>A</code>, in this order.</li>
</ul>

<p>Note that the same square may appear more than once in the series.</p>

<p>Figure A.1 (a) is an illustration of the board corresponding to Sample Input 1. Figures A.1 (b) and (c) show trajectories on two of the YOKOHAMA traces. Both traces start at the leftmost square in the upper row. The same square marked with <code>O</code> appears twice in the trace illustrated in Figure A.1 (c).</p>

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" style="width: 523px; height: 150px;" /></p>

<p style="text-align: center;">Figure A.1. A board and trajectories on two of the YOKOHAMA traces</p>

<p>You are given a grid of squares, each marked with one of six letters, <code>A</code>, <code>H</code>, <code>K</code>, <code>M</code>, <code>O</code>, or <code>Y</code>. Your task is to count how many distinct YOKOHAMA traces are possible on it.</p>
</article>
<article class="section">
<h2>입력</h2>
<p>The input consists of a single test case of the following format.</p>

<blockquote>
<p><span class="math-inline"><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><mrow><mi>n</mi></mrow></math></span> <span class="math-inline"><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><mrow><mi>m</mi></mrow></math></span></p>

<p><span class="math-inline"><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><mrow><msub><mi>x</mi><mrow><mn>1</mn><mo>&#x0002C;</mo><mn>1</mn></mrow></msub></mrow></math></span> <span class="math-inline"><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><mrow><mo>&#x022EF;</mo></mrow></math></span> <span class="math-inline"><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><mrow><msub><mi>x</mi><mrow><mn>1</mn><mo>&#x0002C;</mo><mi>m</mi></mrow></msub></mrow></math></span></p>

<p><span class="math-inline"><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><mrow><mo>&#x022EE;</mo></mrow></math></span></p>

<p><span class="math-inline"><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><mrow><msub><mi>x</mi><mrow><mi>n</mi><mo>&#x0002C;</mo><mn>1</mn></mrow></msub></mrow></math></span> <span class="math-inline"><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><mrow><mo>&#x022EF;</mo></mrow></math></span> <span class="math-inline"><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><mrow><msub><mi>x</mi><mrow><mi>n</mi><mo>&#x0002C;</mo><mi>m</mi></mrow></msub></mrow></math></span></p>
</blockquote>

<p>The first two integers <span class="math-inline"><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><mrow><mi>n</mi></mrow></math></span> and <span class="math-inline"><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><mrow><mi>m</mi></mrow></math></span> (<span class="math-inline"><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><mrow><mn>1</mn><mi>≤</mi><mi>n</mi><mi>≤</mi><mn>10</mn></mrow></math></span>, <span class="math-inline"><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><mrow><mn>1</mn><mi>≤</mi><mi>m</mi><mi>≤</mi><mn>10</mn></mrow></math></span>) describe the size of the grid. The grid has squares arranged in an <span class="math-inline"><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><mrow><mi>n</mi><mo>&#x000D7;</mo><mi>m</mi></mrow></math></span> matrix. The following <span class="math-inline"><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><mrow><mi>n</mi></mrow></math></span> lines describe the letters marked in the squares. The square at the <span class="math-inline"><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><mrow><mi>i</mi></mrow></math></span>-th row and the <span class="math-inline"><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><mrow><mi>j</mi></mrow></math></span>-th column in the grid (<span class="math-inline"><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><mrow><mn>1</mn><mi>≤</mi><mi>i</mi><mi>≤</mi><mi>n</mi></mrow></math></span>, <span class="math-inline"><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><mrow><mn>1</mn><mi>≤</mi><mi>j</mi><mi>≤</mi><mi>m</mi></mrow></math></span>) has letter <span class="math-inline"><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><mrow><msub><mi>x</mi><mrow><mi>i</mi><mo>&#x0002C;</mo><mi>j</mi></mrow></msub></mrow></math></span> marked in it. Each <span class="math-inline"><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><mrow><msub><mi>x</mi><mrow><mi>i</mi><mo>&#x0002C;</mo><mi>j</mi></mrow></msub></mrow></math></span> is one of the six letters, <code>A</code>, <code>H</code>, <code>K</code>, <code>M</code>, <code>O</code>, or <code>Y</code>.</p>
</article>
<article class="section">
<h2>출력</h2>
<p>Output a line containing the number of distinct YOKOHAMA traces.</p>
</article>
<article class="section">
<h2>예제 입력 1 복사</h2>
<pre class="sampledata" id="sample-input-1">2 4
YOHA
OKAM
</pre>
</article>
<article class="section">
<h2>예제 입력 2 복사</h2>
<pre class="sampledata" id="sample-input-2">3 4
YOKH
OKHA
KHAM
</pre>
</article>
<article class="section">
<h2>예제 입력 3 복사</h2>
<pre class="sampledata" id="sample-input-3">3 6
MAYOHA
AHOKAM
MAYOHA
</pre>
</article>
<article class="section">
<h2>예제 출력 1 복사</h2>
<pre class="sampledata" id="sample-output-1">8
</pre>
</article>
<article class="section">
<h2>예제 출력 2 복사</h2>
<pre class="sampledata" id="sample-output-2">0
</pre>
</article>
<article class="section">
<h2>예제 출력 3 복사</h2>
<pre class="sampledata" id="sample-output-3">80
</pre>
</article>
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