# How to determine +/- sign when calculating diagonal intersections between two points in 2D space?

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.

-
Division by 2 is just a bitshift, aren't those incredibly cheap? How did you profile this? – djechlin Aug 7 '12 at 20:48
Hey Raheel, could you provide me some feedback? Thanks! – Andre Calil Aug 7 '12 at 21:59
@AndreCalil: I have responded and also added the code I ended up using that requires only one division by 2. – Raheel Khan Aug 8 '12 at 19:58

You can't simply use the hypoteneuse (`delta`). You must discover the triangle altitude. And, as you'll see, to get the altitude you must calculate the legs (using Pythagorean theorem).

However, to achieve this using `BigInteger` will need some extra help, because there will be a square root. I used the solution provided here (Newton Raphson method).

Let's get those values:

``````    // leg = sqrt(hypoteneuse²)/2)
triangleLeg = SqRtN(System.Numerics.BigInteger.Divide(System.Numerics.BigInteger.Pow(delta, 2), 2));
// altitude = leg²/hypoteneuse
triangleAltitude = System.Numerics.BigInteger.Divide(System.Numerics.BigInteger.Pow(triangleLeg, 2), delta);
``````

Now, to the points, we are going to use `deltaHalf` (for Y) and `triangleAltitude` (for X).

I've done this way:

``````        // INTRODUCE CONDITIONS HERE TO DETERMINE +/- COMBINATION.
new Cell()
{
X = c1.X < c2.X? c1.X - triangleAltitude : c1.X + triangleAltitude,
Y = c1.Y < c2.Y ? c1.Y - deltaHalf : c1.Y + deltaHalf
}
);

new Cell()
{
X = c2.X < c1.X ? c2.X - triangleAltitude : c2.X + triangleAltitude,
Y = c2.Y < c1.Y ? c2.Y - deltaHalf : c2.Y + deltaHalf
}
);
``````

Any feedback will be appreciated.

-
Thanks. After some hair pulling I figured out a simple geometric solution that only required one division by 2. I am posting it as an answer for those looking for something similar. – Raheel Khan Aug 8 '12 at 19:51

I knew the answer was somewhere in simple comparisons instead of having to calculate hypotenuse.

``````public List<Cell> GetCellIntersections (Cell cell1, Cell cell2)
{
Cell c1 = null;
Cell c2 = null;
List<Cell> cells = null;
System.Numerics.BigInteger delta = 0;
System.Numerics.BigInteger deltaHalf = 0;
System.Numerics.BigInteger width = 0;
System.Numerics.BigInteger height = 0;

cells = new List<Cell>();

// Sorting on y reduces conditions from 8 to 4.
if (cell1.Y < cell2.Y)
{
c1 = cell1;
c2 = cell2;
}
else
{
c1 = cell2;
c2 = cell1;
}

if ((c1.X != c2.X) && (c1.Y != c2.Y))
{
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);

if ((c1.X < c2.X) && (c1.Y < c2.Y))
{
if (width < height)
{
cells.Add(new Cell(this, c1.X - deltaHalf, c1.Y + deltaHalf));
cells.Add(new Cell(this, c2.X + deltaHalf, c2.Y - deltaHalf));
}
else
{
cells.Add(new Cell(this, c1.X + deltaHalf, c1.Y - deltaHalf));
cells.Add(new Cell(this, c2.X - deltaHalf, c2.Y + deltaHalf));
}
}
else
{
if (width < height)
{
cells.Add(new Cell(this, c1.X + deltaHalf, c1.Y + deltaHalf));
cells.Add(new Cell(this, c2.X - deltaHalf, c2.Y - deltaHalf));
}
else
{
cells.Add(new Cell(this, c1.X - deltaHalf, c1.Y - deltaHalf));
cells.Add(new Cell(this, c2.X + deltaHalf, c2.Y + deltaHalf));
}
}
}

return (cells);
}
``````
-
This is so strange. How are you able to get the correct triangle measures without the hypoteneuse and the altitude. How are you testing the results? I mean test for correctness, not for performance (yet) – Andre Calil Aug 8 '12 at 20:04
I verify the results by generating images with marked points and intersections. It became very simple to understand once I started drawing rectangles on paper for two given points. The answer is a combination of the slope, comparison of x1, x2, y1, y2, width, height and eight combinations are possible. Try it and you'll see what I mean. – Raheel Khan Aug 8 '12 at 20:07
What is this `cells = new XQuick.Library.Cells(this);`? – Andre Calil Aug 8 '12 at 20:36
Never mind that. Edited the answer. A cell is a simple class with BigInteger coordinates of x and y like a Point structure. – Raheel Khan Aug 8 '12 at 20:45
I'm running some tests with our solution to measure the performance and the correctness. So far, we are even in everything =) – Andre Calil Aug 9 '12 at 1:11