Read the program below carefully then answer the question. 
#pragma comment(linker, "/STACK:1024000000,1024000000") 
#include <cstdio> 
#include<iostream> 
#include <cstring> 
#include <cmath> 
#include <algorithm> 
#include<vector> 

const int MAX=100000*2; 
const int INF=1e9; 

int main() 

  int n,m,ans,i; 
  while(scanf("%d%d",&n,&m)!=EOF) 
  { 
    ans=0; 
    for(i=1;i<=n;i++) 
    { 
      if(i&1)ans=(ans*2+1)%m; 
      else ans=ans*2%m; 
    } 
    printf("%d\n",ans); 
  } 
  return 0; 
}

InputMulti test cases,each line will contain two integers n and m. Process to end of file. 
[Technical Specification] 
1<=n, m <= 1000000000OutputFor each case,output an integer,represents the output of above program.Sample Input

1 10
3 100

Sample Output

1
5

直接利用源程序暴力打出 1,2,5,10,21,42 找出规律 fn = fn-1 + 2*fn-2+1

数据比较大,直接求矩阵快速幂。

推出 转化矩阵为:

1 2 1
1 0 0
0 0 1

 初始矩阵为

1 2 1

 直接上代码:

//Asimple
#include <iostream>
#include <algorithm>
#include <cstdio>
#include <cstdlib>
#include <queue>
#include <vector>
#include <string>
#include <cstring>
#include <stack>
#include <set>
#include <map>
#include <cmath>
#define swap(a,b,t) t = a, a = b, b = t
#define CLS(a, v) memset(a, v, sizeof(a))
#define test() cout<<"============"<<endl
#define debug(a)  cout << #a << " = "  << a <<endl
#define dobug(a, b)  cout << #a << " = "  << a << " " << #b << " = " << b << endl
using namespace std;
typedef long long ll;
const int N=3;  
//const ll MOD=10000007; 
const int INF = ( 1<<20 );
const double PI=atan(1.0)*4;
const int maxn = 10+5;
const ll mod = 10005;
int n, m, len, ans, sum, v, w, T, num;
int MOD;

struct Matrix {
    long long grid[N][N];  
    int row,col;  
    Matrix():row(N),col(N) {  
        memset(grid, 0, sizeof grid);  
    }  
    Matrix(int row, int col):row(row),col(col) {  
        memset(grid, 0, sizeof grid);  
    }
    
    //矩阵乘法
    Matrix operator *(const Matrix &b) {  
        Matrix res(row, b.col);  
        for(int i = 0; i<res.row; i++)  
            for(int j = 0; j<res.col; j++)  
                for(int k = 0;k<col; k++)  
                    res[i][j] = (res[i][j] + grid[i][k] * b.grid[k][j] + MOD) % MOD;  
        return res;  
    }
    
    //矩阵快速幂
    Matrix operator ^(long long exp) {  
        Matrix res(row, col);
        for(int i = 0; i < row; i++)
            res[i][i] = 1;
        Matrix temp = *this;
        for(; exp > 0; exp >>= 1, temp = temp * temp)
            if(exp & 1) res = temp * res;
        return res;
    }
    
    long long* operator[](int index) {
        return grid[index];
    }
    
    void print() {
    
        for(int i = 0; i <row; i++) {
            for(int j = 0; j < col-1; j++)  
                printf("%d ",grid[i][j]);  
            printf("%d\n",grid[i][col-1]);  
        }  
    }  
};

void input(){
    ios_base::sync_with_stdio(false);
    while( cin >> n >> MOD ) {
        Matrix A;
        A[0][0] = A[0][2] = 1;
        A[0][1] = 2;
        A[1][0] = A[2][2] = 1;
        A = A^n;
        Matrix B;
        B[0][0] = B[0][2] = 1;
        B[0][1] = 2;
        A = A*B;
        if( n%2 ) cout << A[0][0] << endl;
        else cout << A[1][1] << endl;
    }
}

int main(){
    input();
    return 0;
}