| Time Limit: 1000MS | Memory Limit: 65536K | |
| Total Submissions: 13920 | Accepted: 6965 |
Description
Given n, a positive integer, how many positive integers less than n are relatively prime to n? Two integers a and b are relatively prime if there are no integers x > 1, y > 0, z > 0 such that a = xy and b = xz.
Input
There are several test cases. For each test case, standard input contains a line with n <= 1,000,000,000. A line containing 0 follows the last case.
Output
For each test case there should be single line of output answering the question posed above.
Sample Input
7 12 0
Sample Output
6 4
Source
1 #include<cstdio> 2 int euler_phi(int p){ 3 int phi=p; 4 for(int i=2;i*i<=p;i++){ 5 if(!(p%i)){ 6 phi=phi-phi/i; 7 while(!(p%i)) 8 p/=i; 9 } 10 } 11 if(p>1) 12 phi=phi-phi/p; 13 return phi; 14 } 15 int main(){ 16 int p; 17 while(scanf("%d",&p),p) 18 printf("%d ",euler_phi(p)); 19 return 0; 20 }
裸的欧拉函数