# Counting possible coordinate moves with recursion

I'm trying to write a method that does the following:

``````public class GridCounting {
/** Returns the total number of possible routes (paths) from
* (x,y) to (tx,ty).
* There are only three valid kinds of moves:
*  Increment x by one.
*  Increment x by two.
*  Increment y by one.
*
*  Hint: You'll need to two base cases.
*/
public static int count(int x,int y, int tx, int ty) {
if (x==tx && y==ty)
return 1;
if (x>tx || y>ty)
return 0;
if (x<tx)
return 1 + count(x+1, y, tx, ty);
if (x<tx) //if x is still less, then we can do another move
return 1 + count(x+2, y, tx, ty);
if (y<ty){
return 1 + count(x, y+1, tx, ty);
}
return 0;
}
}
``````

The trouble that I'm having is that I'm always off by +1. It expects 4 but I give it 5. The confusing part is that if I feed the function count(10,15,10,15), then that still counts as 1 move. I dont know how to account for this.

Also y++ then x++ counts as 1 move, and x++ then y++ counts as another move. Edit: Fixed code:

``````public static int count(int x,int y, int tx, int ty) {
if (x==tx && y==ty)
return 1;
if (x>tx || y>ty)
return 0;
if (x<tx)
return count(x+1, y, tx, ty) + count(x+2, y, tx, ty) + count(x,y+1,tx,ty);
if (y<ty) {
return count(x, y+1, tx, ty); // what does this do?
}
return 0;
}
``````
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so I guess I have to count that as 1 move That's not one move, that's one path of zero length (having no moves, like empty set has no elements) –  Nikita Rybak Nov 12 '10 at 0:15
This function will have terrible performance for even moderately small values (like a 0,0,12,12 path). A lookup table should be used to store computed values, so that they don't have to be repeatedly calculated. –  Axn Nov 12 '10 at 16:53

The trouble that I'm having is that I'm always off by +1. It expects 4 but I give it 5.
In position `(x, y)` we, generally speaking, have three choices (`x+=1`, `x+=2`, `y+=1`). Each of them produces separate paths and we need to find how many paths there're in total.
So, this part is wrong

``````        if (x<tx)
return 1+ count(x+1, y, tx, ty);
if (x<tx)
return 1+ count(x+2, y, tx, ty);
if (y<ty){
return 1+ count(x, y+1, tx, ty);
}
return 0;
``````

That was a hint, let me know if you need more.

Also y++ then x++ counts as 1 move, and x++ then y++ counts as another move.
Well, that sounds like two different paths to me.

edit
Ok, `return count(x + 1, y, tx, ty) + count(x + 2, y, tx, ty) + count(x, y + 1, tx, ty);` is all you need.
If there're 3 paths starting with first move `x + 1`, 2 paths starting with first move `x + 2` and 2 paths starting with first move `y + 1`, then, obviously, there're `3 + 2 + 2` paths total.

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Im having a hard time thinking of how to account for two different moves that x can make..what can I do about that? –  moby Nov 12 '10 at 0:10
@fprime Are you saying that increasing x by two and increasing x by 1 twice should produce same route? I was under impression that's different routes. –  Nikita Rybak Nov 12 '10 at 0:12
You know Im not really sure..see edit I posted the test cases. –  moby Nov 12 '10 at 0:14
Yes I think youre right: x+2 x+1 is one path, x+1(3) is another route, and x++ x+2 is another path –  moby Nov 12 '10 at 0:17
@fprime: Keep a running total. Instead of returning 1 + the recursive count, add the count to the total for each case. (Don't add 1 to that count; the recursion will take care of that.) Return the total at the end. –  cHao Nov 12 '10 at 0:42

You sure this line is right?

``````if (x==tx && y==ty)
return 1;
``````

It seems like it should return zero.

On a phone so I can't test it.

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Well ya the weird part is there is a test case that says `assertEquals(1,GridCounting.count(10,15,10,15));` so I guess I have to count that as 1 move –  moby Nov 12 '10 at 0:06
On a phone - that's some hard core stack overflowing. :) –  JOTN Nov 12 '10 at 0:08

`if (x==tx && y==ty) return 1;` doesn't sound correct. If you're already at the destination, there are no more routes.

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Well ya the weird part is there is a test case that says assertEquals(1,GridCounting.count(10,15,10,15)); so I guess I have to count that as 1 move –  moby Nov 12 '10 at 0:07
@fprime: Well that test case doesn't make any sense! Do you have a test case for e.g. `(10, 15, 11, 15)`, i.e. one cell away? –  Oli Charlesworth Nov 12 '10 at 0:09
Yes, that should equal 1. Thats why its not making any sense to me.. –  moby Nov 12 '10 at 0:10
there's exactly one path from point (10, 15) to point (10, 15): path of length zero. That's how I see it. –  Nikita Rybak Nov 12 '10 at 0:13
From a square to the one "next door", the only possible path is a single step, incrementing the appropriate coordinate by 1. Iff a path can consist of 0 steps, a path from a square to itself would be an empty path, and the only possible path. Hence how both counts can be 1. –  cHao Nov 12 '10 at 0:20