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Assume a 2D grid with the top left cell as (0, 0). Pick any two points/coordinates and draw a diagonal and anti-diagonal on each. They may intersect inside or outside the grid.

In the picture attached, the red lines are diagonals to the two points (300, 200) and (700, 800).

How can I find out the coordinates for the diagonal intersections? Also, how would the formula differ if the slope of the line were negative?

I will use this in an algorithm that needs to be highly optimized so the right answer would be the fastest possible way to compute. I'm not sure if this can be done without trignometry.

NOTE: Please keep in mind that the red lines are a true diagonal/anti-diagonal pair. In other words they are at 45 degree angles to the rectangle. This may or may not help select a more optimized formula than vector calculation.

enter image description here

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1  
Smells like homework? :) –  Eric Herlitz Jul 30 '12 at 18:15
    
@Trikks: This isn't homework. It's putting in effort into the question. This is for a production application. –  Raheel Khan Jul 30 '12 at 18:38

2 Answers 2

up vote 3 down vote accepted

Let D be the difference between the two side lengths. In your figure, D=200. This is the length of the hypotenuse of the two white triangles (the ones between your exterior intersection points and the rectangle). So the side lengths of those triangles are D/sqrt(2), and so the coordinates of the exterior intersections differ from the rectangle corners by D/2.

Then for your diagram,

(x1,y1) = 300-D/2, 200+D/2 = 200,300
(x2,y2) = 700+D/2, 800-D/2 = 800,700

You'll have to handle all the possible orientations (x1<x2, x1>x2, ...) but they are all symmetric to this one.

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+1. Drawing small 200x200 squares around each intersection may make it even more obvious. –  Alexei Levenkov Jul 30 '12 at 18:23
    
Thanks. My geometry is rusty. I did not know the relationship between the hypotenuse and Abs(Width-Height). Does this principal have a name? –  Raheel Khan Jul 30 '12 at 18:42
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@RaheelKhan: no, it is just that the upper-right and lower-left gray triangles are 90-45-45, so their two shorter edges are the same length. So the remaining rectangle boundary segments must be the difference of the longer and shorter sides. –  Keith Randall Jul 30 '12 at 18:44
    
Overlooked that, thanks! How do you calculate orientations (x1<x2, x1>xy, y1<y2, y1>y2) to determine addition or subtraction for each intersection? –  Raheel Khan Jul 30 '12 at 20:41
    
Here is a link (stackoverflow.com/questions/11852284/…) to the solution for those who may benefit from it. –  Raheel Khan Aug 8 '12 at 20:53

It's just math. You have 2 lines with equations

y1 = k1 * x1 + b1
y2 = k2 * x2 + b2
If they intersect then y1 == y2 and x1 = x2 so
k1 * x1 + b1 = k2 * x1 + b2
x1 = (b2 - b1) / (k1 - k2)

The only problem now is how to find k1, k2, b1, b2? Simple! You have 2 points for each line(from graphics.DrawLine(x1, y1, x2, y2)). Use them here. For the first line:

y1 = k * x1 + b
y2 = k * x2 + b
b = y1 - k * x1
y2 = k * x2 + y1 - k * x1 = k * (x2-x1) + y1
so
k = (y2 - y1) / (x2 - x1)

Substitute that k into b = y1-k*x1 and you will get all values you need to calculate exact points of collision.

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