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I have some scattered 3D points (2d solution is sufficient). I want find different straight lines passing through (at least three points makes line) which are laying nearby (say for example 10 units). A single point could be part of different lines.

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"I want [to] find different straight lines passing through (at least three points makes line) which are laying nearby (say for example 10 units)." is not a sentence, so it's hard to tell what you want to do. –  Mechanical snail Aug 23 '11 at 5:58
if a line is passing through only 2 points ignore this line –  Razack Aug 23 '11 at 6:02
Call your set of points S. Am I right that you want to find all subsets s ⊆ S of cardinality at least 3, such that the points in s are "nearly" collinear? –  Mechanical snail Aug 23 '11 at 6:05
I read your question like this (correct me, if I'm wrong): 1. I have a cloud of scattered points on a 2D plane. 2. I want to determine, if three of them line up in a way. 3. Since they most certainly will not lie up 100% perfect I want to allow a distance of 10 units from the third point to the line. If this is the case, you might calculate the perpendicular distance from the third point c to the line a-b and compare this to 10. –  0x6d64 Aug 23 '11 at 6:10
I do not want to determine if three of them line up. Rather I want to make all possible lines where a line has at least three points or more –  Razack Aug 23 '11 at 6:32

1 Answer 1

up vote 2 down vote accepted

To determine whether 3 points (a,b,c) are in a line, use cross-products (2D or 3D):

V = (Vx, Vy, Vz)
Vab = b - a
Vac = c - a 
CrossProd (V,W) = (VyWz - VzWy, VzWx - WzVx, VxWy - WxVy)

If CrossProd(Vab, Vac) is zero, then the points (a, b, c) are colinear. Actually the cross product is proportional to the area of the triangle (a, b ,c), so you can set a small non-zero tolerance if needed.

Re. tolerance.

The distance from b to the line Vac is given by:

d = length(CrossProd(Vab, Vac))/ length(Vac)

You can probably compare this with an absolute tolerance given your problem description. Alternatively you might use:

sin(theta) = length(CrossProd(Vab, Vac))/ length(Vac)/ length(Vab)

Then theta is the angle between the two vectors and can be compared with a fixed tolerance.

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Thanks. Do you think a constant non-Zero tolerance or a tolerance which depends on the distance between the points to be worked out –  Razack Aug 23 '11 at 6:12

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