HDU 1787 GCD Again(欧拉函数,水题)

GCD Again

Time Limit: 1000/1000 MS (Java/Others)    Memory Limit: 32768/32768 K (Java/Others)
Total Submission(s): 1997    Accepted Submission(s): 772


Problem Description
Do you have spent some time to think and try to solve those unsolved problem after one ACM contest?
No? Oh, you must do this when you want to become a "Big Cattle".
Now you will find that this problem is so familiar:
The greatest common divisor GCD (a, b) of two positive integers a and b, sometimes written (a, b), is the largest divisor common to a and b. For example, (1, 2) =1, (12, 18) =6. (a, b) can be easily found by the Euclidean algorithm. Now I am considering a little more difficult problem: 
Given an integer N, please count the number of the integers M (0<M<N) which satisfies (N,M)>1.
This is a simple version of problem “GCD” which you have done in a contest recently,so I name this problem “GCD Again”.If you cannot solve it still,please take a good think about your method of study.
Good Luck!
 

 

Input
Input contains multiple test cases. Each test case contains an integers N (1<N<100000000). A test case containing 0 terminates the input and this test case is not to be processed.
 

 

Output
For each integers N you should output the number of integers M in one line, and with one line of output for each line in input. 
 

 

Sample Input
2 4 0
 

 

Sample Output
0 1
 

 

Author
lcy
 

 

Source
 

 

Recommend
lcy

 

 

 

用来试验下模板。

求欧拉函数就可以了

#include <stdio.h>
#include <string.h>
#include <iostream>
#include <algorithm>
using namespace std;

long long eular(long long n)
{
    long long ans = n;
    for(int i = 2;i*i <= n;i++)
    {
        if(n % i == 0)
        {
            ans -= ans/i;
            while(n % i == 0)
                n /= i;
        }
    }
    if(n > 1)ans -= ans/n;
    return ans;
}

int main()
{
    int n;
    while(scanf("%d",&n) == 1 && n)
    {
        int ret = eular(n);
        printf("%d\n",n-ret-1);
    }
    return 0;
}

 

 

 

posted on 2013-07-22 17:10  kuangbin  阅读(814)  评论(0编辑  收藏  举报

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