Happy Matt Friends
Time Limit: 6000/6000 MS (Java/Others) Memory Limit: 510000/510000 K (Java/Others)
Total Submission(s): 700 Accepted Submission(s): 270
Problem Description
Matt has N friends. They are playing a game together.
Each of Matt’s friends has a magic number. In the game, Matt selects some (could be zero) of his friends. If the xor (exclusive-or) sum of the selected friends’magic numbers is no less than M , Matt wins.
Matt wants to know the number of ways to win.
Input
The first line contains only one integer T , which indicates the number of test cases.
For each test case, the first line contains two integers N, M (1 ≤ N ≤ 40, 0 ≤ M ≤ 106).
In the second line, there are N integers ki (0 ≤ ki ≤ 106), indicating the i-th friend’s magic number.
Output
For each test case, output a single line “Case #x: y”, where x is the case number (starting from 1) and y indicates the number of ways where Matt can win.
Sample Input
2 3 2 1 2 3 3 3 1 2 3
Sample Output
Case #1: 4 Case #2: 2
Hint
In the first sample, Matt can win by selecting: friend with number 1 and friend with number 2. The xor sum is 3. friend with number 1 and friend with number 3. The xor sum is 2. friend with number 2. The xor sum is 2. friend with number 3. The xor sum is 3. Hence, the answer is 4.
题意
给你N个人,然后让你选一些人,然后问你,选的这些人,异或值大于m的方法数有多少个
题解
大概就是类似背包的思想,每个人有选择和不选择两种选择,然后我们就可以根据这个写出转移方程,dp[i][j]表示选择前i个人中,得到答案为j的方法数有多少,由于j^a[i]^a[i]=j,所以
dp[i][j]=dp[i-1][j]+dp[i-1][j^a[i]]
代码
#define RD(n) scanf("%d",&n)
#define REP(i, n) for (int i=0;i<n;++i)
#define REP_1(i, n) for (int i=1;i<=n;++i)
int dp[50][maxn+1];
int a[50];
int main()
{
int t;
RD(t);
REP_1(ti,t)
{
int n,m;
RD(n),RD(m);
REP_1(i,n)
{
RD(a[i]);
}
dp[0][0]=1;
REP_1(i,n)
{
REP(j,maxn)
{
dp[i][j]=dp[i-1][j]+dp[i-1][j^a[i]];
}
}
LL ans=0;
FOR_1(j,m,maxn)
ans+=dp[n][j];
printf("Case #%d: %lld\n",ti,ans);
}
}