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I am having some trouble determining if two line segments are collinear because of floating point precision. How can I determine if the line segments are collinear with some tolerance?

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1 Answer 1

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EDITED:

Line segments are colinear if they contain two of the same points. They are near-colinear if they share one point and are near-parallel.

Vectors are effectively parallel if the angle between them is less than a threshold you state. Maybe less than .000027 degrees, which is the decimal equivalent of one tenth of a degree-second (which is in latitudinal distance, and equivalently of longitudinal distance at the equator, a difference of approximately ten feet; that's about the accuracy of civilian GPS).

You didn't tell us what language or library you're using; in .NET's System.Windows.Media.3D library there is a Vector3D struct which has an AngleBetween() method, making this check a one-liner.

The "basic" math (it's actually vector trig, not a "basic" concept by most definitions) is that θ=cos-1( A*B / |A||B| ); that is, the arc-cosine of the quantity of the scalar product of the two vectors divided by the product of their magnitudes.

The dot product of vector A and vector B, both containing components X, Y, and Z, is XAXB + YAYB + ZAZB. The magnitude of a vector A is sqrt(XA2 + YA2 + ZA2).

So, in pseudo-C-ish:

//Vector is a simple immutable class or struct containing integer X, Y and Z components
public bool CloseEnough(Vector a, Vector b, decimal threshold = 0.000027m)
{
   int dotProduct = a.X*b.X + a.Y*b.Y + a.Z*b.Z;
   decimal magA = sqrt(a.X*a.X + a.Y*a.Y + a.Z*a.Z); //sub your own sqrt
   decimal magB = sqrt(b.X*b.X + b.Y*b.Y + b.Z*b.Z); //sub your own sqrt

   decimal angle = acos(dotProduct/(magA*magB)); //sub your own arc-cosine

   if(angle <= threshold
}
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I made an edit, so I'm not sure if your answer still solves my problem. I need to know if two line segments are near collinear. I think your answer tells me if two vectors are near parallel. –  Josh C. Apr 10 '12 at 22:23
    
Well, two line segments are near co-linear if they share at least one point and are near-parallel. So this is half the equation. By definition if two line segments share at least two points they are colinear. But, if they only share one point, that point effectively must be an endpoint of both lines in order for the lines to appear to be continuations of each other. I'm not sure how much overlap you need to be able to take into account. –  KeithS Apr 10 '12 at 23:37
    
I disagree, KeithS: Two line segments may be co-linear even when they are not contiguous. –  Jackalope Jul 29 at 0:42

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