Let T(x,y) be the number of tours over a X × Y grid such that:

- the tour starts in the top left square
- the tour consists of moves that are up, down, left, or right one square
- the tour visits each square exactly once, and
- the tour ends in the bottom left square.

It’s easy to see, for example, that T(2,2) = 1, T(3,3) = 2, T(4,3) = 0, and T(3,4) = 4. Write a program to calculate T(10,4).

I have been working on this for hours ... I need a program that takes the dimensions of the grid as input and returns the number of possible tours?

I have been working on this for hours ... I need a program that takes the dimensions of the grid as input and returns the number of possible tours?

I wrote this code to solve the problem ... I cant seem to figure out how to check all directions.

```
#include <iostream>
int grid[3][3];
int c = 0;
int main(){
solve (0, 0, 9);
}
int solve (int posx, int posy, steps_left){
if (grid[posx][posy] = 1){
return 0;
}
if (steps_left = 1 && posx = 0 && posy = 2){
c = c+1;
return 0;
}
grid[posx][posy] = 1;
// for all possible directions
{
solve (posx_next, posy_next, steps_left-1)
}
grid[posx][posy] = 0;
}
```

Algorithm by @KarolyHorvath You need some data structure to represent the state of the cells on the grid (visited/not visited).

Your algorithm:

```
step(posx, posy, steps_left)
if it is not a valid position, or already visited
return
if it's the last step and you are at the target cell
you've found a solution, increment counter
return
mark cell as visited
for each possible direction:
step(posx_next, posy_next, steps_left-1)
mark cell as not visited
```

and run with step(0, 0, sizex*sizey)