Problem Statement There are N people, conveniently numbered 1 through N. They were standing in a row yesterday, but now they are unsure of the order in which they were standing. However, each person remembered the following fact: the absolute difference of the number of the people who were standing to the left of that person, and the number of the people who were standing to the right of that person. According to their reports, the difference above for person i is Ai.
Based on these reports, find the number of the possible orders in which they were standing. Since it can be extremely large, print the answer modulo 109+7. Note that the reports may be incorrect and thus there may be no consistent order. In such a case, print 0.
Constraints 1≦N≦105 0≦Ai≦N−1 Input The input is given from Standard Input in the following format:
N A1 A2 … AN Output Print the number of the possible orders in which they were standing, modulo 109+7.
Sample Input 1 5 2 4 4 0 2 Sample Output 1 4 There are four possible orders, as follows:
2,1,4,5,3 2,5,4,1,3 3,1,4,5,2 3,5,4,1,2 Sample Input 2 7 6 4 0 2 4 0 2 Sample Output 2 0 Any order would be inconsistent with the reports, thus the answer is 0.
Sample Input 3 8 7 5 1 1 7 3 5 3 Sample Output 3 16
有n个人,他们只记得昨天站在他们右边的人和站在左边的人的人数差值。根据差值,问有多少种可能的站法。
注意点:
记得取模判断出现次数是否符合规则小心数据太大溢出取模要根据乘法取模规则代码:
# include <cstdio> # include <map> # include <cmath> using namespace std; const int mod = 1e9+7; int main() { int n; int a[100005]; map<int,int> m; scanf("%d",&n); for(int i = 0;i < n;i++) { scanf("%d",&a[i]); m[a[i]]++; } int flag = 0; if(n%2) //奇数 { if(m[0] != 1) { flag = 1; } for(int i = 2;i < n;i+=2) { if(m[i] != 2) { flag = 1; } } }else{ for(int i = 1;i < n;i+=2) { if(m[i] != 2) { flag = 1; } } } long long sum = 1; for(int i =0;i < floor(n/2);i++) { sum = ((sum % mod) * 2)% mod; } if(n%2) { if(flag) printf("0\n"); else printf("%lld\n",sum); } else { if(flag) printf("0\n"); else printf("%lld\n",sum); } return 0; }