Mr. Frog’s Game(模拟连连看)

天涯浪子 提交于 2020-05-06 07:09:16

Description

One day, Mr. Frog is playing Link Game (Lian Lian Kan in Chinese). 



In this game, if you can draw at most three horizontal or vertical head-and-tail-connected lines over the empty grids(the lines can be out of the whole board) to connect two non-empty grids with the same symbol or the two non-empty grids with the same symbol are adjacent, then you can change these two grids into empty and get several more seconds to continue the game. 

Now, Mr. Frog starts a new game (that means there is no empty grid in the board). If there are no pair of grids that can be removed together,Mr. Frog will say ”I’m angry” and criticize you. 

Mr. Frog is battle-scarred and has seen many things, so he can check the board in a very short time, maybe one second. As a Hong Kong Journalist, what you should do is to check the board more quickly than him, and then you can get out of the room before Mr. Frog being angry. 
 

Input

The first line contains only one integer T ($T \leq 500$), which indicates the number of test cases. 

For each test case, the first line contains two integers n and m ($1 \leq n,m \leq 30$). 

In the next n lines, each line contains m integers,  j-th number in the i-th line means the symbol on the grid(the same number means the same symbol on the grid). 
 

Output

For each test case, there should be one line in the output. 

You should output “Case #x: y”,where x is the case number(starting from 1), and y is a string representing the answer of the question. If there are at least one pair of grids that can be removed together, the y is “Yes”(without quote), else y is “No”.
 

Sample Input

2
3 3
1 2 1
2 1 2
1 2 1
3 3
1 2 3
2 1 2
3 2 1
 

Sample Output

Case #1: Yes
Case #2: No

 

Hint

first sample can be explained as below.
 

 

 题目意思:这是一个连连看游戏,只要矩阵内部有两个相同图案相邻或者外围(四条最外边)上只少有两个相同的图案,就可以进行一次消去,问能否进行一次消去。

 解题思路:大致分为两种情况:1矩阵内部有相邻的图案,2矩阵外围上至少有两个相同的图案。直接暴力遍历这个矩阵即可。

 

 1 #include<stdio.h>
 2 #include<string.h>
 3 int main()
 4 {
 5     int t,i,j,n,m,flag,count=1;
 6     int a[32][32];
 7     scanf("%d",&t);
 8     while(t--)
 9     {
10         flag=0;
11 
12         memset(a,0,sizeof(a));
13         scanf("%d%d",&n,&m);
14         for(i=1; i<=n; i++)
15         {
16             for(j=1; j<=m; j++)
17             {
18                 scanf("%d",&a[i][j]);
19             }
20         }
21         for(i=1; i<m; i++)
22         {
23             for(j=i+1; j<=m; j++)
24             {
25                 if(a[1][i]==a[1][j]||a[n][i]==a[n][j])
26                 {
27                     flag=1;
28                 }
29             }
30             if(flag==1)
31             {
32                 break;
33             }
34         }
35         for(i=1; i<n; i++)
36         {
37             for(j=i+1; j<=n; j++)
38             {
39                 if(a[i][1]==a[j][1]||a[i][m]==a[j][m])
40                 {
41                     flag=1;
42                 }
43             }
44             if(flag==1)
45             {
46                 break;
47             }
48         }
49         for(i=1; i<=n; i++)
50         {
51             for(j=1; j<=m; j++)
52             {
53                 if(i!=n&&a[i][j]==a[i+1][j])
54                 {
55                     flag=1;
56                 }
57                 if(j!=m&&a[i][j]==a[i][j+1])
58                 {
59                     flag=1;
60                 }
61             }
62             if(flag==1)
63             {
64                 break;
65             }
66         }
67         if(flag==1)
68         {
69             printf("Case #%d: Yes\n",count);
70             count++;
71         }
72         else
73         {
74             printf("Case #%d: No\n",count);
75             count++;
76         }
77     }
78     return 0;
79 }

 

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