There are an equation.
∑0≤k1,k2,⋯km≤n∏1⩽j<m(kj+1kj)%1000000007=?
We define that (kj+1kj)=kj+1!kj!(kj+1−kj)! . And (kj+1kj)=0 while kj+1<kj.
You have to get the answer for each n and m that given to you.
For example,if n=1,m=3,
When k1=0,k2=0,k3=0,(k2k1)(k3k2)=1;
Whenk1=0,k2=1,k3=0,(k2k1)(k3k2)=0;
Whenk1=1,k2=0,k3=0,(k2k1)(k3k2)=0;
Whenk1=1,k2=1,k3=0,(k2k1)(k3k2)=0;
Whenk1=0,k2=0,k3=1,(k2k1)(k3k2)=1;
Whenk1=0,k2=1,k3=1,(k2k1)(k3k2)=1;
Whenk1=1,k2=0,k3=1,(k2k1)(k3k2)=0;
Whenk1=1,k2=1,k3=1,(k2k1)(k3k2)=1.
So the answer is 4.

The first line of the input contains the only integer T,(1≤T≤10000)
Then T lines follow,the i-th line contains two integers n,m,(0≤n≤109,2≤m≤109)

For each n and m,output the answer in a single line.

Author

UESTC

Source

Recommend

wange2014

//#include <iostream>

#include<bits/stdc++.h>

using namespace std;

const long long mod=;

long long ans,n,m;

int T;

long long poww(long long a,long long b)

{

    long long ans=;

    while(b)

    {

        if (b%==) ans=(ans*a)%mod;

        a=(a*a)%mod;

        b/=;

    }

    return ans;

}

int main()

{

   scanf("%d",&T);

   for(;T>;T--)

   {

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

       long long ans=poww(m,n+);

       ans=(ans+mod-)%mod;

       ans=(ans*poww(m-,mod-))%mod;

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

   }

   return ;

}