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hdu 2056 — Rectangles (矩形重合)

2013年10月14日 ⁄ 综合 ⁄ 共 2756字 ⁄ 字号 评论关闭

 

2056 -- Rectangles (矩形重合)

Rectangles
Time Limit: 1000/1000 MS (Java/Others) Memory Limit: 32768/32768 K (Java/Others)
Total Submission(s): 5731 Accepted Submission(s): 1802

Problem Description
Given two rectangles and the coordinates of two points on the diagonals of each rectangle,you have to calculate the area of the intersected part of two rectangles. its sides are parallel to OX and OY .

Input
Input The first line of input is 8 positive numbers which indicate the coordinates of four points that must be on each diagonal.The 8 numbers are x1,y1,x2,y2,x3,y3,x4,y4.That means the two points on the first rectangle are(x1,y1),(x2,y2);the other two points on the second rectangle are (x3,y3),(x4,y4).

Output
Output For each case output the area of their intersected part in a single line.accurate up to 2 decimal places.

Sample Input
1.00 1.00 3.00 3.00 2.00 2.00 4.00 4.00
5.00 5.00 13.00 13.00 4.00 4.00 12.50 12.50

Sample Output
1.00

56.25

 

 

题意: 给出2个矩形各其中一条对角线,求这2个矩形的重合面积

分析:由于不确定输入,所以先分清矩形的左下点和右上点,即对角线都是↗的;


接着分析矩形是否有碰撞

假设2个矩形的左下和右上 分别为 (x1,y1),(x2,y2) 和 (x3,y3),(x4,y4)

则且仅当

 

(x4>x1&&y4>y1&&x3<x2&&y3<y2)

即: 矩形B的右上点>矩形A的左下点&&矩形B的左下点<矩形A的右上点

成立,2个矩形碰撞

现在分析不碰撞的情况

把求面积转化为求宽高

不难得到 宽(l)=MIN(x2,x4)-MAX(x1,x3);
             高(h)=MINy2,y4)-MAX(y1,y3);

即得解!

 

 

 

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