Carmichael Numbers(快速幂和素数筛选)

最新推荐文章于 2023-01-09 12:33:32 发布

Chibi_Maruko

最新推荐文章于 2023-01-09 12:33:32 发布

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本文链接：https://blog.youkuaiyun.com/j2013210855/article/details/38407819

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An important topic nowadays in computer science is cryptography. Some people even think that cryptography is the only important field in computer science, and that life would not matter at all without cryptography. Alvaro is one of such persons, and is designing a set of cryptographic procedures for cooking paella. Some of the cryptographic algorithms he is implementing make use of big prime numbers. However, checking if a big number is prime is not so easy. An exhaustive approach can require the division of the number by all the prime numbers smaller or equal than its square root. For big numbers, the amount of time and storage needed for such operations would certainly ruin the paella.

However, some probabilistic tests exist that offer high confidence at low cost. One of them is the Fermat test.

Let a be a random number between 2 and n - 1 (being n the number whose primality we are testing). Then, n is probably prime if the following equation holds:

$\begin{displaymath}a^n \bmod n = a \end{displaymath}$

If a number passes the Fermat test several times then it is prime with a high probability.

Unfortunately, there are bad news. Some numbers that are not prime still pass the Fermat test with every number smaller than themselves. These numbers are called Carmichael numbers.

In this problem you are asked to write a program to test if a given number is a Carmichael number. Hopefully, the teams that fulfill the task will one day be able to taste a delicious portion of encrypted paella. As a side note, we need to mention that, according to Alvaro, the main advantage of encrypted paella over conventional paella is that nobody but you knows what you are eating.

Sample Output

The number 1729 is a Carmichael number.
17 is normal.
The number 561 is a Carmichael number.
1109 is normal.
431 is normal.

题意大致是：如果一个数不是素数，且对于任意的2< a <n满足方程 ，则称n是Carmichael数；否则n就不是Carmichael数

#include<stdio.h>
#include<iostream>
#include<memory.h>
#include<algorithm>
#include<math.h>
using namespace std;
int prime[65010];
typedef long long ll;
ll pow_mod(ll x,ll n,ll mod)
{
    ll res=1;
    while(n)
    {
        if(n&1) res=res*x%mod;
        x=x*x%mod;
        n>>=1;
    }
    return res;
}
void pri()
{
    int i,j;
    memset(prime,0,sizeof(prime));
    int m=(int)sqrt(65010+0.5);
    for(i=2;i<=m;i++)
    {
        if(prime[i]==0)
        {
            for(j=i*i;j<=65010;j+=i)
                prime[j]=1;
        }
    }

}

int main()
{
      pri();
      ll n,ans;
    while(scanf("%lld",&n),n)
    {

        if(!prime[n])
        {
            printf("%lld is normal.\n",n);
            continue;
        }
        int tag=1;
        for(ll i=2;i<=n-1;i++)
        {
            if(pow_mod(i,n,n)!=i)
            {
                tag=0;
                break;
            }
        }

        if(tag) printf("The number %lld is a Carmichael number.\n",n);//这里在输出时少了a，结果wa了4次
        else printf("%lld is normal.\n",n);
    }
    return 0;
}