CodeObject/storage/zeta/_static/10432.html

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    <title>BOJ 10432 - Offline</title>
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        <header class="header">
            <h1>데이터 스트림의 섬</h1>
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        <article class="section">
<h2>문제</h2>
<p>n개의 정수 수열 a1, a2, a3, ..., an에 대해, 섬이란 다음 조건을 만족하는 연속된 부분수열을 말한다.</p>

<ul>
	<li>섬의 모든 수는 부분수열이 시작하기 직전 수보다 크다.</li>
	<li>섬의 모든 수는 부분수열이 끝난 직후의 수보다 크다.</li>
</ul>

<p>아래의 예시에는 각각의 예제 수열에 대한 모든 섬이 표시되어 있다.</p>

<p><img 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" /></p>

<p>이 문제에서 수열은 항상 12개의 음이 아닌 정수로 이루어져 있다.</p>

<p>이때, 총 섬의 개수를 출력하라.</p>
</article>
<article class="section">
<h2>입력</h2>
<p>첫 줄에 테스트 케이스의 수 P가 주어진다. (1 &le; P &le; 1000)</p>

<p>각 테스트 케이스는 테스트 케이스의 번호 T와 12개의 음이 아닌 정수로 이루어져 있다. 또한, 12개의 정수 중 첫 수와 마지막 수는 항상 0이다.</p>
</article>
<article class="section">
<h2>출력</h2>
<p>각 테스트 케이스마다 테스트 케이스의 번호와 섬의 수를 공백으로 구분하여 출력한다.</p>
</article>
<article class="section">
<h2>예제 입력 1 복사</h2>
<pre class="sampledata" id="sample-input-1">4
1 0 0 1 1 2 2 1 1 0 1 2 0
2 0 1 2 4 3 1 3 4 5 2 1 0
3 0 1 2 4 4 1 0 2 4 1 0 0
4 0 1 2 3 4 5 6 7 8 9 10 0
</pre>
</article>
<article class="section">
<h2>예제 출력 1 복사</h2>
<pre class="sampledata" id="sample-output-1">1 4
2 8
3 6
4 10
</pre>
</article>
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