This is an offshoot of another question and has to do with Keith Randall's answer to the problem. Please do have a quick look at the image there to see what the function below is trying to do.

In short, any two points on a 2D grid would have two diagonal intersections if `x2 != x1`

and `y2 != y1`

. I implemented the following function but cannot figure out how to determine which cell to subtract delta from and which to add to. As a result, for some pair of coordinates, the results are accurate while for others they are reversed.

```
// This class is the same as [Point] except
// it uses BigInteger instead of Int32 types.
public class Cell
{
System.Numerics.BigInteger X = 0;
System.Numerics.BigInteger Y = 0;
}
public List<Cell> GetIntersections (Cell c1, Cell c2)
{
List<Cell> cells = new List<Cell>();
System.Numerics.BigInteger delta = 0;
System.Numerics.BigInteger deltaHalf = 0;
System.Numerics.BigInteger width = 0;
System.Numerics.BigInteger height = 0;
width = System.Numerics.BigInteger.Abs(c2.X - c1.X);
height = System.Numerics.BigInteger.Abs(c2.Y - c1.Y);
delta = System.Numerics.BigInteger.Abs(height - width);
deltaHalf = System.Numerics.BigInteger.Divide(delta, 2);
// INTRODUCE CONDITIONS HERE TO DETERMINE +/- COMBINATION.
cells.Add(new Cell(c1.X - deltaHalf, c1.Y + deltaHalf));
cells.Add(new Cell(c2.X + deltaHalf, c2.Y - deltaHalf));
return (cells);
}
```

At first I thought this was a simple gradient/slope issue but I cannot seem to find a consistent correlation between `slope`

and `+/- deltaHalf`

combinations.

**IMPORTANT:** Please note that acceptable answers should only do x1, y1, x2, y2 comparisons. Actually calculating the slope of the line is not an option due to performance penalties. We are already doing a division by 2 and cannot afford another.