输入p n 求杨辉三角的第n+1行不能被p整除的数有多少个
Lucas定理:
A、B是非负整数,p是质数。AB写成p进制:A=a[n]a[n-1]...a[0],B=b[n]b[n-1]...b[0]。则组合数C(A,B)与C(a[n],b[n])*C(a[n-1],b[n-1])*...*C(a[0],b[0]) mod p同余
即:Lucas(n,m,p)=c(n%p,m%p)*Lucas(n/p,m/p,p),在存在i。b[i]>a[i]时,mod值为0,所以必然整除。当对于全部i,b[i]<=a[i]时。a[i]!%p!=0,所以必然不能整除
#include <cstdio>
#include <cmath>
#include <cstring>
using namespace std;
int main()
{
int p, n;
int cas = 1;
while(scanf("%d %d", &p, &n) != EOF)
{
if(p ==0 && n ==0)
break;
int sum = 1;
while(n)
{
sum *= n%p+1;
n /= p;
}
printf("Case %d: %04d
", cas++, sum%10000);
}
}