I have a `n*n`

matrix, where each element represents an integer. Starting in `[0,0]`

I have to find the path of exactly `m`

elements down to the last row, returning the maximum cost. The path can end in any column on the last row and `n ≤ m ≤ n^2`

I thought of finding all paths of length `m`

from `[0,0]`

to `[n-1, 0], [n-1, 1] ... [n-1, n-1]`

. But it does not feel optimal...

Which algorithm would be the most efficient way of doing this? BFS or DFS?

**EDIT**

Possible directions are down/right/left, but only visit each element at most once.

**EDIT 2**

So for example, if this matrix is given (n=4):

```
[ 1 4 1 20 ]
[ 5 0 2 8 ]
[ 6 8 3 8 ]
[ 3 2 9 5 ]
```

And m=7, the path could be

```
[ → → → ↓ ]
[ 5 0 2 ↓ ]
[ 6 8 3 ↓ ]
[ 3 2 9 x ] = Path cost = 47
```

or

```
[ ↓ 4 1 20 ]
[ ↓ 0 2 8 ]
[ → → ↓ 8 ]
[ 3 2 → x ] = Path cost = 32
```

or if `m = n^2`

```
[ → → → ↓ ]
[ ↓ ← ← ← ]
[ → → → ↓ ]
[ x ← ← ← ]
```

**EDIT 3 / SOLUTION**

Thanks to Wanderley Guimarães,

http://ideone.com/0iLS2