对于很大的组合数不能用C(n, m) = C(n - 1, m) + C(n-1, m -1)来求,这里就用到Lucas定理。
模板题: hdu3037:模板如下:
#include <cstdio> using namespace std; const int maxn = 100010; typedef long long ll; ll F[maxn]; //求1-p所有的阶乘模上p void init(ll p) { F[0] = 1; for (int i = 1; i <= p; i++) F[i] = F[i - 1] * i % p; } //求逆元 ll inv(ll a, ll m) { if (a == 1) return 1; return inv(m % a, m) * (m - m / a) % m; } //求C n m %p之后的值 ll Lucas(ll n, ll m, ll p) { ll ans = 1; while (n && m) { ll a = n % p; ll b = m % p; if (a < b) return 0; ans = ans * F[a] % p * inv(F[b] * F[a - b] % p, p) % p; n /= p; m /= p; } return ans; } int main() { int T, n, m, p; scanf("%d", &T); while (T--) { scanf("%d %d %d", &n, &m, &p); init(p); printf("%d ", (int)Lucas(n + m, m, p)); } return 0; }