Description
Fermat's theorem states that for any prime number p and for any integer a > 1, ap = a (mod p). That is, if we raise a to the pth power and divide by p, the remainder is a. Some (but not very many) non-prime values of p, known as base-a pseudoprimes, have this property for some a. (And some, known as Carmichael Numbers, are base-a pseudoprimes for all a.)
Given 2 < p ≤ 1000000000 and 1 < a < p, determine whether or not p is a base-a pseudoprime.
Input
Input contains several test cases followed by a line containing "0 0". Each test case consists of a line containing p and a.
Output
For each test case, output "yes" if p is a base-a pseudoprime; otherwise output "no".
Sample Input
3 2 10 3 341 2 341 3 1105 2 1105 3 0 0
Sample Output
no no yes no yes yes
很基础的一道快速幂取模的题目....
只需要判断a^p%p与a%p两个结果是否相等和判断p是否为素数即可...
代码如下:
#include <cstdio>
#include <cstring>
#include <algorithm>
#include <iostream>
#include <math.h>
using namespace std;
typedef long long ll;
ll p,a;
ll Fast (ll a,ll b)
{
ll sum=1,mod=b;
while (b>0)
{
if(b&1)
{
sum=sum*a%mod;
}
b>>=1;
a=a*a%mod;
}
return sum;
}
bool Is_pri (ll x)
{
if(x==1)
return false;
for (int i=2;i<=sqrt(x);i++)
if(x%i==0)
return false;
return true;
}
int main()
{
while (scanf("%lld%lld",&p,&a)!=EOF&&(p||a))
{
ll mod1=a%p;
ll mod2=Fast(a,p);
if(mod2==mod1)
{
if(Is_pri(p))
printf("no\n");
else
printf("yes\n");
}
else
printf("no\n");
}
return 0;
}