문제 1608
원의 겹침 여부 판별하기 1
문제 설명
서로 다른 두 개의 원이 2차원 평면 위에 있다.
첫 번째 원은 중심 좌표가 (x1, y1)이고 반지름이 d1이다.
두 번째 원은 중심 좌표가 (x2, y2)이고 반지름이 d2이다.
두 원이 겹치는지, 겹치지 않는지 판별하시오.
아래의 경우는 모두 겹치는 경우이다.
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” alt=”” />
첫 번째 원은 중심 좌표가 (x1, y1)이고 반지름이 d1이다.
두 번째 원은 중심 좌표가 (x2, y2)이고 반지름이 d2이다.
두 원이 겹치는지, 겹치지 않는지 판별하시오.
아래의 경우는 모두 겹치는 경우이다.
<img 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” alt=”” />
입력 설명
첫 번째 줄에 정수 x1, y1, d1이 입력된다. (-1000<=x1,y1<=1000, 1<=d1<=500)
두 번째 줄에 정수 x2, y2, d2가 입력된다. (-1000<=x2,y2<=1000, 1<=d2<=500)
두 번째 줄에 정수 x2, y2, d2가 입력된다. (-1000<=x2,y2<=1000, 1<=d2<=500)
출력 설명
두 원의 두 점이 겹치면, "overlapped"를 출력하고, 겹치지 않으면, "not overlapped"를 출력한다.
입력 예시
1 1 1 3 3 2
출력 예시
overlapped
출처
조건문