Captain Marmot wants to prepare a huge and important battle against his enemy, Captain Snake. For this battle he has n regiments, each consisting of 4 moles.
Initially, each mole i (1 ≤ i ≤ 4n) is placed at some position (xi, yi) in the Cartesian plane. Captain Marmot wants to move some moles to make the regiments compact, if it's possible.
Each mole i has a home placed at the position (ai, bi). Moving this mole one time means rotating his position point (xi, yi) 90 degrees counter-clockwise around it's home point (ai, bi).
A regiment is compact only if the position points of the 4 moles form a square with non-zero area.
Help Captain Marmot to find out for each regiment the minimal number of moves required to make that regiment compact, if it's possible.
The first line contains one integer n (1 ≤ n ≤ 100), the number of regiments.
The next 4n lines contain 4 integers xi, yi, ai, bi ( - 104 ≤ xi, yi, ai, bi ≤ 104).
Print n lines to the standard output. If the regiment i can be made compact, the i-th line should contain one integer, the minimal number of required moves. Otherwise, on the i-th line print "-1" (without quotes).
4 1 1 0 0 -1 1 0 0 -1 1 0 0 1 -1 0 0 1 1 0 0 -2 1 0 0 -1 1 0 0 1 -1 0 0 1 1 0 0 -1 1 0 0 -1 1 0 0 -1 1 0 0 2 2 0 1 -1 0 0 -2 3 0 0 -2 -1 1 -2 0
1 -1 3 3
In the first regiment we can move once the second or the third mole.
We can't make the second regiment compact.
In the third regiment, from the last 3 moles we can move once one and twice another one.
In the fourth regiment, we can move twice the first mole and once the third mole.
题解:这一题就是给你8*n个点,每4个一组,每一个点能够绕某点逆时针旋转,问最后是否能组成一个正方形。
直接暴力出全部可能情况。然后推断是否为正方形即可了。
(推断正方形的时候參考了下别人的代码= =)
#include <iostream>
#include <cstdio>
#include <cstring>
#include <algorithm>
#include <cstdlib>
using namespace std;
struct dir
{
int x,y;
};
struct dir d[4][4],h[4];
long long dis[10];
long long dist(long long x1,long long y1,long long x2,long long y2)
{
return (x2-x1)*(x2-x1)+(y2-y1)*(y2-y1);
}
int n,ans;
int main()
{
scanf("%d",&n);
while (n--)
{
memset(d,0,sizeof(d));
memset(h,0,sizeof(h));
for (int i=0;i<4;i++) scanf("%d%d%d%d",&d[i][0].x,&d[i][0].y,&h[i].x,&h[i].y);
for (int i=0;i<4;i++)
for (int j=1;j<4;j++)
{
d[i][j].x=h[i].x+h[i].y-d[i][j-1].y;
d[i][j].y=d[i][j-1].x-h[i].x+h[i].y;
}
ans=16;
for (int i=0;i<4;i++)
{
for (int j=0;j<4;j++)
for (int k=0;k<4;k++)
for (int z=0;z<4;z++)
{
memset(dis,0,sizeof(dis));
dis[0]=dist(d[0][i].x,d[0][i].y,d[1][j].x,d[1][j].y);
dis[1]=dist(d[1][j].x,d[1][j].y,d[2][k].x,d[2][k].y);
dis[2]=dist(d[2][k].x,d[2][k].y,d[3][z].x,d[3][z].y);
dis[3]=dist(d[3][z].x,d[3][z].y,d[0][i].x,d[0][i].y);
dis[4]=dist(d[0][i].x,d[0][i].y,d[2][k].x,d[2][k].y);
dis[5]=dist(d[1][j].x,d[1][j].y,d[3][z].x,d[3][z].y);
sort(dis,dis+6);
if (dis[0]==dis[1] && dis[1]==dis[2] && dis[2]==dis[3] && dis[3]==dis[0] && 2*dis[0]==dis[5] && dis[5]==dis[4] && dis[0])
ans=min(ans,i+j+k+z);
}
}
if (ans==16) printf("-1
");
else printf("%d
",ans);
}
return 0;
}