[UVA] 10167

Problem G. Birthday Cake

Background

Lucy and Lily are twins. Today is their birthday. Mother buys a birthday cake for them.Now we put the cake onto a Descartes coordinate. Its center is at (0,0), and the cake's length of radius is 100.

There are 2N (N is a integer, 1<=N<=50) cherries on the cake. Mother wants to cut the cake into two halves with a knife (of course a beeline). The twins would like to be treated fairly, that means, the shape of the two halves must be the same (that means the beeline must go through the center of the cake) , and each half must have N cherrie(s). Can you help her?

Note: the coordinate of a cherry (x , y) are two integers. You must give the line as form two integers A,B(stands for Ax+By=0), each number in the range [-500,500]. Cherries are not allowed lying on the beeline. For each dataset there is at least one solution.

Input

The input file contains several scenarios. Each of them consists of 2 parts: The first part consists of a line with a number N, the second part consists of 2N lines, each line has two number, meaning (x,y) .There is only one space between two border numbers. The input file is ended with N=0.

Output

For each scenario, print a line containing two numbers A and B. There should be a space between them. If there are many solutions, you can only print one of them.

Sample Input

Sample Output

0 1

题解：暴力枚举+线性规划。A、B都是整数且范围为[-500,500]，1<=N<=50，所以暴力枚举即可。统计一下直线一侧点的数目是否为N。注意有点在直线上的情况是不合法的。

代码：

 1 #include<stdio.h>
 2 #include<string.h>
 3 #include<stdbool.h>
 4 
 5 int i,j,n,m,sum,
 6     a[110],b[110];
 7 
 8 int 
 9 init()
10 {
11     int i;
12     m=2*n;
13     for(i=1;i<=m;i++)
14     scanf("%d%d",&a[i],&b[i]);
15     
16     return 0;
17 }
18 
19 int 
20 main()
21 {
22     int i,j,k,f;
23     while(true)
24     {
25         scanf("%d",&n);
26         if(n==0) break;
27         init();
28         f=0;
29         for(i=-500;i<=500;i++)
30         {
31             for(j=-500;j<=500;j++)
32             {
33                  sum=0;
34                 for(k=1;k<=m;k++)
35                 {
36                     if((i*a[k]+j*b[k])<0) sum++;
37                     if((i*a[k]+j*b[k])==0) break;
38                 }
39                 if(sum==n)
40                 {
41                      f=1;
42                      printf("%d %d
",i,j);
43                      break;
44                  }
45              }
46              if(f==1) break;
47          }
48     }
49     
50     return 0;
51 }
52