PAT甲级——A1128 N Queens Puzzle【20】

The "eight queens puzzle" is the problem of placing eight chess queens on an $8 chessboard so that no two queens threaten each other. Thus, a solution requires that no two queens share the same row, column, or diagonal. The eight queens puzzle is an example of the more general$

Here you are NOT asked to solve the puzzles. Instead, you are supposed to judge whether or not a given configuration of the chessboard is a solution. To simplify the representation of a chessboard, let us assume that no two queens will be placed in the same column. Then a configuration can be represented by a simple integer sequence $(, where$


Figure 1		Figure 2

Input Specification:

Each input file contains several test cases. The first line gives an integer

Output Specification:

For each configuration, if it is a solution to the

Sample Input:

4
8 4 6 8 2 7 1 3 5
9 4 6 7 2 8 1 9 5 3
6 1 5 2 6 4 3
5 1 3 5 2 4

Sample Output:

YES
NO
NO
YES

 1 #include <iostream>
 2 #include <vector>
 3 using namespace std;
 4 int queen[1005];
 5 int main()
 6 {
 7     int k, n, a;
 8     cin >> k;
 9     while (k--)
10     {
11         fill(queen, queen + 1005, 0);
12         cin >> n;
13         bool res = true;
14         for (int i = 1; i <= n; ++i)
15         {
16             cin >> queen[i];//新一列存入queen
17             for (int t = 1; t < i; ++t)//判断前i-1列的queen是不是在同一行
18             {
19                 if (queen[i] == queen[t] || abs(queen[i] - queen[t]) == abs(i - t))//是否存在相同行，和第t列的斜线位置
20                 {
21                     res = false;
22                     break;
23                 }
24             }
25         }
26         cout << (res == true ? "YES" : "NO") << endl;
27     }
28     return 0;
29 }