CodeObject/storage/zeta/_static/24392.html

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            <h1>영재의 징검다리</h1>
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<h2>문제</h2>
<p>푸앙이 게임에 참가한 영재는 유리 징검다리 게임을 통과해야 한다.</p>

<p>유리 징검다리 게임의 규칙은 간단하다. 총 <em>N</em>번의 걸음을 통해 건널 수 있고, 각 걸음마다 <em>M</em>개의 칸이 있다. 영재는 시작점(<em>N</em> - 1 번째 줄)의 한 칸에서 건너기 시작해 이후 앞의 인접한 최대 3개의 유리 중 하나를 선택해 건너갈 수 있다. 밟은 칸이 강화유리라면 안전하게 건널 수 있지만, 일반 유리는 밟을 수 없다.</p>

<p>다음은 <em>N</em> = 3, <em>M</em> = 5인 어느 순간에 영재가 가능한 이동을 나타낸 그림이다.</p>

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" /></p>

<p>다리의 정보가 주어지면, 영재가 다리를 무사히 건널 수 있는 경우의 수를 알아내보자.</p>
</article>
<article class="section">
<h2>입력</h2>
<p>첫 줄에 <em>N</em>과 <em>M</em>(1 &le; <em>N</em>, <em>M</em> &le; 1,000)이 공백으로 구분되어 주어지고, 그 뒤에는 <em>N</em>줄에 걸쳐 다리의 정보가 주어진다.</p>

<p>강화유리의 경우 <code>1</code>, 일반 유리의 경우 <code>0</code>으로 주어진다.</p>
</article>
<article class="section">
<h2>출력</h2>
<p>영재가 무사히 다리를 건널 수 있는 경우의 수를 1,000,000,007로 나눈 나머지를 출력한다.</p>
</article>
<article class="section">
<h2>예제 입력 1 복사</h2>
<pre class="sampledata" id="sample-input-1">3 2
0 1
1 0
0 1
</pre>
</article>
<article class="section">
<h2>예제 입력 2 복사</h2>
<pre class="sampledata" id="sample-input-2">5 5
1 0 1 0 1
0 0 1 1 1
1 0 1 0 0
0 1 1 0 1
1 0 1 0 1
</pre>
</article>
<article class="section">
<h2>예제 입력 3 복사</h2>
<pre class="sampledata" id="sample-input-3">4 4
1 1 1 1
1 0 0 1
1 0 0 1
1 1 1 1
</pre>
</article>
<article class="section">
<h2>예제 출력 1 복사</h2>
<pre class="sampledata" id="sample-output-1">1
</pre>
</article>
<article class="section">
<h2>예제 출력 2 복사</h2>
<pre class="sampledata" id="sample-output-2">9
</pre>
</article>
<article class="section">
<h2>예제 출력 3 복사</h2>
<pre class="sampledata" id="sample-output-3">8
</pre>
</article>
    </main>
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