CodeObject/storage/zeta/_static/8891.html

<!DOCTYPE html>
<html lang="ko">
<head>
    <meta charset="UTF-8" />
    <meta name="viewport" content="width=device-width, initial-scale=1.0" />
    <title>BOJ 8891 - Offline</title>
    <style>
        :root {
            --bg: #fafaf8;
            --paper: #ffffff;
            --ink: #1e1f24;
            --muted: #6a6d75;
            --line: #d8dce3;
            --accent: #0d6e6e;
            --code-bg: #f4f6fb;
        }
        * { box-sizing: border-box; }
        body {
            margin: 0;
            background:
                radial-gradient(circle at 15% 0%, #f0efe9 0%, transparent 42%),
                radial-gradient(circle at 85% 20%, #e7f1f2 0%, transparent 38%),
                var(--bg);
            color: var(--ink);
            font-family: "Noto Sans KR", "Pretendard", "Apple SD Gothic Neo", sans-serif;
            line-height: 1.65;
        }
        main {
            max-width: 980px;
            margin: 0 auto;
            padding: 24px 16px 56px;
        }
        .header {
            background: var(--paper);
            border: 1px solid var(--line);
            border-radius: 14px;
            padding: 18px 20px;
            margin-bottom: 18px;
        }
        .header h1 { margin: 0 0 6px; font-size: 1.5rem; }
        .header p { margin: 0; color: var(--muted); font-size: 0.95rem; }
        .header a { color: var(--accent); text-decoration: none; }
        .section {
            background: var(--paper);
            border: 1px solid var(--line);
            border-radius: 14px;
            padding: 16px 18px;
            margin-bottom: 14px;
            overflow-x: auto;
        }
        h2 {
            margin: 0 0 10px;
            font-size: 1.05rem;
            color: var(--accent);
            border-bottom: 1px solid var(--line);
            padding-bottom: 8px;
        }
        pre, code {
            font-family: "JetBrains Mono", "Fira Code", monospace;
            background: var(--code-bg);
        }
        pre {
            padding: 12px;
            border-radius: 10px;
            border: 1px solid #e7ebf2;
            overflow: auto;
        }
        blockquote {
            margin: 14px 0;
            padding: 16px 16px 14px 22px;
            border-left: 4px solid var(--accent);
            border-radius: 10px;
            background: linear-gradient(90deg, #eef8f8 0%, #f9fdfd 100%);
            color: #24313a;
            font-weight: 600;
            position: relative;
        }
        blockquote::before {
            content: "“";
            position: absolute;
            left: 8px;
            top: 2px;
            font-size: 1.35rem;
            line-height: 1;
            color: #0b5f5f;
            opacity: 0.7;
        }
        blockquote > :first-child { margin-top: 0; }
        blockquote > :last-child { margin-bottom: 0; }
        q {
            color: #114f50;
            font-weight: 700;
            background: #edf8f8;
            border-radius: 6px;
            padding: 0 4px;
        }
        .math-inline math {
            font-size: 1em;
            vertical-align: middle;
        }
        .math-block {
            margin: 10px 0;
            padding: 8px 10px;
            overflow-x: auto;
            background: #f8fbff;
            border: 1px solid #e2ecf8;
            border-radius: 8px;
        }
        .math-block math {
            font-size: 1.04em;
            display: block;
        }
        table { border-collapse: collapse; width: 100%; }
        th, td { border: 1px solid var(--line); padding: 6px 8px; }
        img { max-width: 100%; height: auto; }
    </style>
</head>
<body>
    <main>
        <header class="header">
            <h1>점 숫자</h1>
        </header>
        <article class="section">
<h2>문제</h2>
<p><img alt="" 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" style="float:right; height:233px; width:239px" />2차원 평면의 제 1사분면에 점이 무한개 찍혀있다. 점의 x, y좌표는 모두 양의 정수이다. 오른쪽 그림과 같이 대각선 순서로 점에 자연수를 할당할 수 있다.</p>

<p>각 점에 할당된 숫자는 점 숫자라고 부른다. (x,y)의 점 숫자는 #(x,y)로 나타낸다. 예를 들어, #(1,1) = 1, #(2,1) = 3, #(2,2) = 5, #(4,4) = 25 이다.</p>

<p>두 점을 더하면, 각 좌표를 더한 값이 좌표인 점이된다. 즉, (a,b) + (c,d) = (a+c,b+d)이다. 모든 점 숫자는 점을 유일하게 결정하기 때문에, 두 점 숫자의 덧셈으로도 점 덧셈을 나타낼 수 있다. 예를 들어, (1,1)과 (2,2)를 더하는 것은 1+5로 나타낼 수 있다. (#(1,1)=1, #(2,2) = 5) 또, 그 결과는 13 (#(3,3) = 13)이&nbsp;된다.</p>

<p>점 숫자로 나타낸 두 점이 입력으로 주어졌을 때, 두 점을 더해, 결과를 점 숫자로 출력하는 프로그램을 작성하시오.</p>
</article>
<article class="section">
<h2>입력</h2>
<p>첫째 줄에 테스트 케이스의 개수 T가 주어진다. 각 테스트 케이스는&nbsp;한 줄로 이루어져 있고, 두 점 숫자가 주어진다. 점 숫자는 0보다 크고, 10,000보다 작다.</p>
</article>
<article class="section">
<h2>출력</h2>
<p>각 테스트 케이스마다 입력으로 주어진 두 점 숫자의 합을 출력한다. 결과는 10,000보다 클 수도 있다.&nbsp;</p>
</article>
<article class="section">
<h2>예제 입력 1 복사</h2>
<pre class="sampledata" id="sample-input-1">2
1 5
3 9
</pre>
</article>
<article class="section">
<h2>예제 출력 1 복사</h2>
<pre class="sampledata" id="sample-output-1">13
26
</pre>
</article>
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