本蒟蒻现在才知带扩展欧拉定理。
对于任意的(bgeqvarphi(p))有
(a^bequiv a^{b mod varphi(p)+varphi(p)}(mod p))
当(b<varphi(p))有
(a^bequiv a^{b mod varphi(p)}(mod p))
(b)和(p)可以不互质
然后这题就简单了。。。
#include<iostream>
#include<cstring>
#include<cstdio>
#include<cmath>
#include<algorithm>
using namespace std;
const int N=1e7+100;
#define int long long
int phi[N],prime[N],num,p,t;
bool book[N];
int read(){
int sum=0,f=1;char ch=getchar();
while(ch<'0'||ch>'9'){if(ch=='-')f=-1;ch=getchar();}
while(ch>='0'&&ch<='9'){sum=sum*10+ch-'0';ch=getchar();}
return sum*f;
}
void prework(int n){
phi[1]=1;
for(int i=2;i<=n;i++){
if(book[i]==0){
phi[i]=i-1;
prime[++num]=i;
}
for(int j=1;i*prime[j]<=n&&j<=num;j++){
book[i*prime[j]]=1;
if(i%prime[j]==0){
phi[i*prime[j]]=phi[i]*prime[j];
break;
}
else phi[i*prime[j]]=phi[i]*(prime[j]-1);
}
}
}
int ksm(int x,int b,int mod){
int tmp=1;
while(b){
if(b&1)tmp=tmp*x%mod;
b>>=1;
x=x*x%mod;
}
return tmp;
}
int dfs(int x){
if(x==2)return 0;
return ksm(2,dfs(phi[x])+phi[x],x);
}
signed main(){
prework(1e7);
t=read();
while(t--){
p=read();
printf("%lld
",dfs(p));
}
return 0;
}