solution 1:
费马小定理
若p为素数,a为正整数,且a、p互质,则有a^(p - 1)≡ 1(mod p)
那么a的逆元就是a^(p - 2)
用一个快速幂即可
//t两个点
#include<cstdio> using namespace std; #define int long long int p; int quickpow(int n,int k) { int ans = 1; while(k) { if(k & 1) ans = ans * n % p; n = n * n % p; k >>= 1; } return ans % p; } main() { int n; scanf("%lld%lld",&n,&p); for(int i = 1; i <= n; i++) printf("%lld ",quickpow(i,p - 2)); return 0; }
solution 2:
exgcd
a * x = 1(mod p)
则 a * x + p * y = 1
//t一个点
#include<cstdio> using namespace std; int x,y; void exgcd(int a,int b) { if(b == 0) { x = 1; y = 0; return ; } exgcd(b,a % b); int tmp = x; x = y; y = tmp - a / b * y; } int main() { int n,p; scanf("%d%d",&n,&p); for(int i = 1; i <= n; i++) { exgcd(i,p); printf("%d ",(x % p + p)% p); } return 0; }
solution 3:
线性递推
根据费马小定理的公式进行推导得出
#include<cstdio> using namespace std; #define maxn 3000010 #define ll long long ll inv[maxn]; int main() { int n,p; scanf("%d%d",&n,&p); inv[1] = 1; printf("1 "); for(int i = 2; i <= n; i++) { inv[i] = (ll)(p - p / i) * inv[p % i] % p; printf("%lld ",inv[i]); } return 0; }