sdutoj 2152 Balloons
http://acm.sdut.edu.cn/sdutoj/problem.php?action=showproblem&problemid=2152
Balloons
Time Limit: 1000ms Memory limit: 65536K 有疑问?点这里^_^
题目描述
Both Saya and Kudo like balloons. One day, they heard that in the central park, there will be thousands of people fly balloons to pattern a big image.
They were very interested about this event, and also curious about the image.
Since there are too many balloons, it is very hard for them to compute anything they need. Can you help them?
You can assume that the image is an N*N matrix, while each element can be either balloons or blank.
Suppose element A and element B are both balloons. They are connected if:
i) They are adjacent;
ii) There is a list of element C1, C2, … , Cn, while A and C1 are connected, C1 and C2 are connected …Cn and B are connected.
And a connected block means that every pair of elements in the block is connected, while any element in the block is not connected with any element out of the block.
To Saya, element A(xa,ya)and B(xb,yb) is adjacent if |xa-xb| + |ya-yb| ≤ 1
But to Kudo, element A(xa,ya) and element B (xb,yb) is adjacent if |xa-xb|≤1 and |ya-yb|≤1
They want to know that there’s how many connected blocks with there own definition of adjacent?
输入
The first line of input in each test case contains one integer N (0<N≤100), which represents the size of the matrix.
Each of the next N lines contains a string whose length is N, represents the elements of the matrix. The string only consists of 0 and 1, while 0 represents a block and 1represents balloons.
The last case is followed by a line containing one zero.
输出
示例输入
5 11001 00100 11111 11010 10010 0
示例输出
Case 1: 3 2
提示
来源
示例程序
分析:
题意:(1)求图中四连块(有公共边的方块)的个数;
(2)求图中八连块(有公共顶点的方块)的个数。
这道题和nyist 上的水池数目 类似。直接dfs。
AC代码:
1 #include<stdio.h> 2 #include<string.h> 3 const int N = 1010; 4 int vis1[N][N],map[N][N],vis[N][N]; 5 void dfs1(int x,int y)//搜索四个方向 6 { 7 if (!map[x][y]||vis1[x][y]) 8 return ; 9 vis1[x][y] = 1; 10 dfs1(x-1,y); 11 dfs1(x+1,y); 12 dfs1(x,y-1); 13 dfs1(x,y+1); 14 } 15 void dfs(int x,int y)//搜索八个方向 16 { 17 if(!map[x][y]||vis[x][y]) 18 return ; 19 vis[x][y] =1; 20 dfs(x-1,y-1);dfs(x-1,y);dfs(x-1,y+1); 21 dfs(x,y-1); dfs(x,y+1); 22 dfs(x+1,y-1);dfs(x+1,y);dfs(x+1,y+1); 23 24 } 25 int main() 26 { 27 int n,i,j,o = 0; 28 char s[N]; 29 while(~scanf("%d",&n)&&n) 30 { 31 ++o; 32 int cnt1 = 0; 33 int cnt2 = 0; 34 memset(vis1,0,sizeof(vis)); 35 memset(vis,0,sizeof(vis)); 36 memset(map,0,sizeof(map)); 37 for (i = 0; i < n; i ++) 38 { 39 scanf("%s",s); 40 for (j = 0; j < n; j ++) 41 { 42 map[i+1][j+1] = s[j]-'0';//在图周围加一圈空格,防止判断时越界 43 } 44 } 45 for (i = 1; i <= n; i ++) 46 { 47 for (j = 1; j <= n; j ++) 48 { 49 if (map[i][j]&&!vis1[i][j]) 50 { 51 cnt1++; 52 dfs1(i,j); 53 54 } 55 if (map[i][j]&&!vis[i][j]) 56 { 57 cnt2++; 58 dfs(i,j); 59 } 60 61 } 62 } 63 printf("Case %d: %d %d\n\n",o,cnt1,cnt2); 64 } 65 return 0; 66 }