162 lines
35 KiB
HTML
162 lines
35 KiB
HTML
<!DOCTYPE html>
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<html lang="ko">
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<head>
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<meta charset="UTF-8" />
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<meta name="viewport" content="width=device-width, initial-scale=1.0" />
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<title>BOJ 1945 - Offline</title>
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<style>
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:root {
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--bg: #fafaf8;
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--paper: #ffffff;
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--ink: #1e1f24;
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--muted: #6a6d75;
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--line: #d8dce3;
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--accent: #0d6e6e;
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--code-bg: #f4f6fb;
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}
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* { box-sizing: border-box; }
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body {
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margin: 0;
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background:
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radial-gradient(circle at 15% 0%, #f0efe9 0%, transparent 42%),
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radial-gradient(circle at 85% 20%, #e7f1f2 0%, transparent 38%),
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var(--bg);
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color: var(--ink);
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font-family: "Noto Sans KR", "Pretendard", "Apple SD Gothic Neo", sans-serif;
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line-height: 1.65;
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}
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main {
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max-width: 980px;
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margin: 0 auto;
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padding: 24px 16px 56px;
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}
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.header {
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background: var(--paper);
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border: 1px solid var(--line);
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border-radius: 14px;
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padding: 18px 20px;
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margin-bottom: 18px;
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}
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.header h1 { margin: 0 0 6px; font-size: 1.5rem; }
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.header p { margin: 0; color: var(--muted); font-size: 0.95rem; }
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.header a { color: var(--accent); text-decoration: none; }
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.section {
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background: var(--paper);
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border: 1px solid var(--line);
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border-radius: 14px;
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padding: 16px 18px;
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margin-bottom: 14px;
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overflow-x: auto;
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}
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h2 {
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margin: 0 0 10px;
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font-size: 1.05rem;
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color: var(--accent);
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border-bottom: 1px solid var(--line);
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padding-bottom: 8px;
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}
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pre, code {
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font-family: "JetBrains Mono", "Fira Code", monospace;
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background: var(--code-bg);
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}
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pre {
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padding: 12px;
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border-radius: 10px;
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border: 1px solid #e7ebf2;
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overflow: auto;
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}
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blockquote {
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margin: 14px 0;
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padding: 16px 16px 14px 22px;
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border-left: 4px solid var(--accent);
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border-radius: 10px;
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background: linear-gradient(90deg, #eef8f8 0%, #f9fdfd 100%);
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color: #24313a;
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font-weight: 600;
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position: relative;
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}
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blockquote::before {
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content: "“";
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position: absolute;
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left: 8px;
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top: 2px;
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font-size: 1.35rem;
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line-height: 1;
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color: #0b5f5f;
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opacity: 0.7;
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}
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blockquote > :first-child { margin-top: 0; }
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blockquote > :last-child { margin-bottom: 0; }
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q {
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color: #114f50;
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font-weight: 700;
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background: #edf8f8;
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border-radius: 6px;
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padding: 0 4px;
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}
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.math-inline math {
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font-size: 1em;
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vertical-align: middle;
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}
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.math-block {
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margin: 10px 0;
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padding: 8px 10px;
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overflow-x: auto;
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background: #f8fbff;
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border: 1px solid #e2ecf8;
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border-radius: 8px;
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}
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.math-block math {
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font-size: 1.04em;
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display: block;
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}
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table { border-collapse: collapse; width: 100%; }
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th, td { border: 1px solid var(--line); padding: 6px 8px; }
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img { max-width: 100%; height: auto; }
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</style>
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</head>
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<body>
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<main>
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<header class="header">
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<h1>직사각형</h1>
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</header>
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<article class="section">
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<h2>문제</h2>
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<p>2차원 평면상에 N개의 직사각형이 있다. 직사각형의 각 변은 각 좌표축과 평행하다. 이들 직사각형은 다른 직사각형와 겹쳐지거나 일치할 수 있으며, 다른 것의 내부에 그려질 수도 있다. 직사각형의 각 꼭짓점은 자연수 좌표를 가진다.</p>
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<p style="text-align: center;"><img alt="" height="234" 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" width="363" /></p>
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<p>위의 그림의 경우는 8개의 직사각형이 그려진 경우이다. 이제 이 2차원 평면에 원점 (0,0)을 지나는 직선을 하나 그릴 수 있다. 이 직선은 직사각형들과 교차할 수 있는데, 위의 그림의 경우 2, 5, 6, 7, 8번 직사각형들과 교차하게 된다. (단지 직사각형의 꼭짓점만을 스쳐 지나가더라도 교차하는 것으로 간주한다.)</p>
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<p>가장 많은 직사각형과 교차하도록 원점을 지나는 직선을 그린다고 할 때, 최대 몇 개의 직사각형과 교차할 수 있는지를 구하는 프로그램을 작성하시오. 위의 그림의 경우 직선을 어떻게 그린다고 해도 6개 이상의 직사각형과는 교차하지 않으므로, 5개가 최대가 된다.</p>
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</article>
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<article class="section">
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<h2>입력</h2>
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<p>첫째 줄에 직사각형의 개수 N(1 ≤ N ≤ 10,000)이 주어진다. 둘째 줄부터 N개의 줄에는 직사각형의 왼쪽 아래 꼭짓점의 좌표 xbl, ybl과 오른쪽 위 꼭짓점의 좌표 xtr, ytr이 순서대로 빈칸 하나를 사이에 두고 주어진다. 입력되는 좌표는 1,000,000,000 이하의 자연수이고, xbl < xtr, ybl < ytr 을 만족한다.</p>
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</article>
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<article class="section">
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<h2>출력</h2>
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<p>첫째 줄에 최대로 교차할 수 있는 직사각형의 개수를 출력한다.</p>
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</article>
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<article class="section">
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<h2>예제 입력 1 복사</h2>
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<pre class="sampledata" id="sample-input-1">8
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1 8 7 11
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18 10 20 12
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17 1 19 7
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12 2 16 3
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16 7 19 9
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8 4 12 11
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7 4 9 6
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10 5 11 6
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</pre>
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</article>
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<article class="section">
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<h2>예제 출력 1 복사</h2>
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<pre class="sampledata" id="sample-output-1">5
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</pre>
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</article>
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</main>
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</body>
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</html>
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