Description
Nim is a 2-player game featuring several piles of stones. Players alternate turns, and on his/her turn, a player’s move consists of removing one or more stones from any single pile. Play ends when all the stones have been removed, at which point the last player to have moved is declared the winner.Given a position in Nim, your task is to determine how many winning moves there are in that position.A position in Nim is called “losing” if the first player to move from that position would lose if both sides played perfectly. A “winning move,” then, is a move that leaves the game in a losing position. There is a famous theorem that classifies all losing positions. Suppose a Nim position contains n piles having k1, k2, …, kn stones respectively; in such a position, there are k1 + k2 + … + kn possible moves. We write each ki in binary (base 2). Then, the Nim position is losing if and only if, among all the ki’s, there are an even number of 1’s in each digit position. In other words, the Nim position is losing if and only if the xor of the ki’s is 0.Consider the position with there piles given by k1 = 7, k2 = 11, and k3 = 13. In binary, these values are as follows:
111
1011
1101There are an odd number of 1’s among the rightmost digits, so this position is not losing. However, suppose k3 were changed to be 12. Then, there would be exactly two 1’s in each digit position, and thus, the Nim position would become losing. Since a winning move is any move that leaves the game in a losing position, it follows that removing one stone from the third pile is a winning move when k1 = 7, k2 = 11, and k3 = 13. In fact, there are exactly three winning moves from this position: namely removing one stone from any of the three piles.
题目大意:给你n堆石子,每次可以从任意一堆石子中取走任意多个,但至少取一个。问第一次取有多少种方法使得先手必胜
Input
The input test file will contain multiple test cases, each of which begins with a line indicating the number of piles, 1 ≤ n ≤ 1000.
On the next line, there are n positive integers, 1 ≤ ki ≤ 1,000,000,000, indicating the number of stones in each pile.
The end-of-file is marked by a test case with n = 0 and should not be processed.
多组数据,做到0结束Output
For each test case, write a single line with an integer indicating the number of winning moves from the given Nim position.Sample Input
3
7 11 13
2
1000000000 1000000000
0Sample Output
3
0
Nim游戏的神奇之处在于它的SG值和异或扯上了关系,Nim游戏中先手必败当且仅当x1^x2^...^xn=0,那么,这个为什么是成立的?
- 交换律:x^y=y^x
- 结合律:x^(y^z)=(x^y)^z
- 拥有单位元:0^x=x
- 相同两数运算为0:x^x=0
- 消除律:x^y=x^z⇒y=z
因此,我们得到,对于Nim游戏而言,必败状态当且仅当x1^x2^...^xn=0,对于其他情况,先手必能使当前局面变成必败状态。
#include <algorithm>
#include <iostream>
#include <cstring>
#include <cstdio>
using namespace std;
#define ll long long
#define re register
#define gc getchar()
inline int read()
{
re int x(0),f(1);re char ch(gc);
while(ch<'0'||ch>'9') {if(ch=='-')f=-1; ch=gc;}
while(ch>='0'&&ch<='9') x=(x*10)+(ch^48),ch=gc;
return x*f;
}
const int N=1e3;
int val[N+10],n;
int main()
{
while(n=read(),n)
{
int T=0,ans=0;
for(int i=1;i<=n;++i)
val[i]=read(),T^=val[i];
if(!T) {cout<<0<<endl;break;}
for(int i=1;i<=n;++i)
if(val[i]>=(val[i]^T))
ans++;
cout<<ans<<endl;
}
return 0;
}