GCD

描述

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 Carp is considering a little more difficult problem:

Given integers N and M,please answer sum of X satisfies 1<=X<=N and (X,N)>=M.

输入

The first line of input is an integer T(T<=100) representing the number of test cases. The following T lines each contains two numbers N and M (1<=N<=10^9, 1<=M<=10^9), representing a test case.

输出

Output the answer mod 1000000007

样例输入

3

1 1

10 2

10000 72

样例输出

1

35

1305000

#include<map>

#include<set>

#include<queue>

#include<stack>

#include<vector>

#include<math.h>

#include<cstdio>

#include<sstream>

#include<numeric>//STL数值算法头文件

#include<stdlib.h>

#include <ctype.h>

#include<string.h>

#include<iostream>

#include<algorithm>

#include<functional>//模板类头文件

using namespace std;

typedef long long ll;

const int maxn=1001;

const int INF=0x3f3f3f3f;

const int mod=1000000007;

ll Euler(ll n)//欧拉函数 求φ(n)

{

    ll c=n,i;

    for(i=2; i*i<=n; i++)

    {

        if(n%i==0)

        {

            while(n%i==0) n/=i;

            c=c/i*(i-1);//φ(x)=x(1-1/p1)(1-1/p2)(1-1/p3)(1-1/p4)…..(1-1/pn);

        }

    }

    if(n!=1)

        c=c/n*(n-1);

    return c;

}

//计算满足条件 gcd(x,n)>=m的所有 x 的和

ll Euler_sum(ll k)

{

    if(k==1||k==2)

        return 1;

    else return k*Euler(k)/2;

}

int main()

{

    int cnt;

    ll t,n,m;

    scanf("%lld",&t);

    while(t--)

    {

        ll i,sum=0;

        scanf("%lld %lld",&n,&m);

        for(i=1; i<=sqrt(n); i++)

        {

            if(n%i==0)

            {

                if(i>=m)//计算满足条件 >=m 的 i( i 一定是n的因子)

                {

                    sum=(sum+i*Euler_sum(n/i))%mod;

                }

                //为了防止一种特殊情况才有 i*i!=n, 比如 16 4 这一组,如果没有判断条件就会在i=4的时候计算两次

                if(i*i!=n&&n/i>=m)//计算满足条件 >=m 的 n/i ( n/i 也一定是n的因子)

                {

                    //按步骤走这里有两种情况:(1)i和n/i都满足>=m的条件(2)i不满足>=m但是n/i满足

                    //不管哪种情况如果n/i满足>=m就往下走

                    sum=(sum+n/i*Euler_sum(i))%mod;

                }

            }

        }

        printf("%lld\n",sum);

    }

    return 0;

}