There is an interesting game named one person game. It is played on a `m*n`

grid. There is an non-negative integer in each grid cell. You start with a score of 0. You cannot enter a cell with an integer 0 in it. You can start and end the game at any cell you want (of course the number in the cell cannot be 0). At each step you can go up, down, left and right to the adjacent grid cell. The score you can get at last is the sum of the numbers on your path. But you can enter each cell at most once.

The aim of the game is to get your score as high as possible.

Input:

The first line of input is an integer `T`

the number of test cases. The first line of each test case is a single line containing 2 integers `m`

and `n`

which is the number of rows and columns in the grid. Each of next the `m`

lines contains `n`

space-separated integers `D`

indicating the number in the corresponding cell

Output:

For each test case output an integer in a single line which is maximum score you can get at last.

Constraints:

`T`

is less than 7.

`D`

is less than 60001.

`m`

and `n`

are less than 8.

Sample Input:

```
4
1 1
5911
1 2
10832 0
1 1
0
4 1
0
8955
0
11493
```

Sample Output:

```
5911
10832
0
11493
```

I tried it but my approach is working very slow for a 7x7 grid.I am trying to access every possible path of the grid recursively and comparing the sum of every path.Below is my code

```
#include<iostream>
#include <algorithm>
#include <stdio.h>
using namespace std;
int max(int a,int b,int c, int d)
{
int max = a;
if(b>max)
max = b;
if(c>max)
max = c;
if(d>max)
max = d;
return max;
}
int Visit_Component( int (*A)[8], int Visit[8][8], int m,int n , int row, int col)
{
if ( ( row >= m ) || (col >= n ) || (col < 0) || (row < 0) || A[row][col] == 0 || Visit[row][col] == 1 )
{
return 0;
}
else
{
Visit[row][col] = 1;
int a= 0,b=0,c=0,d=0,result =0;
a = Visit_Component( A, Visit,m,n, row+1, col);
b = Visit_Component( A, Visit,m,n, row, col +1);
c = Visit_Component( A, Visit,m,n, row, col -1);
d = Visit_Component( A, Visit,m,n, row-1, col );
Visit[row][col] = 0;
result = A[row][col] + max(a,b,c,d);
return result;
}
}
int main(){
int T;
scanf("%d",&T);
for(int k =0; k<T;k++)
{
int N ;
int M;
int count = 0;
int maxcount = 0;
scanf("%d %d",&M,&N);
int C[8][8];
int visit[8][8];
for(int i = 0; i < M; i++)
for(int j = 0; j < N; j++)
{
scanf("%d",&C[i][j]);
visit[i][j] = 0;
}
for( int i= 0 ; i< M ; i++ )
{
for( int j =0; j< N ; j++ )
{
count = Visit_Component( C, visit,M,N, i, j);
if(count > maxcount)
{
maxcount = count;
}
}
}
printf("%d\n",maxcount);
}
return 0;
}
```

Please suggest me how to optimize this approach or a better algorithm.