# How to determine if a point approximates an extension to the line between two other points?

I have a three points (A,B,C) that denote objects moving in 2D space. For each node I know its position and its velocity vector. All three objects are moving in the same direction.

I would like to know whether a point C (x3, y3) approximates a "positive" extension to the line formed by points A(x1, y1) and B(x2, y2). That is, I would like to know whether point C is "ahead" of point B (i.e "A->B->C" and not "C->A->B").

I know that checking if points A, B, C are collinear will give me an indication of all three points are lying on the same line, however, i cannot figure out whether point C approximates a positive extension to the line.

Any suggestion would be highly appreciated.

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I miss the programming aspect of this question –  rene Dec 30 '11 at 13:20
Try asking here: math.stackexchange.com –  asawyer Dec 30 '11 at 13:21
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## 1 Answer

You can calculate the scalar product of the difference vectors AB and BC. If that is positive, then C is what you call 'in front of B. It may be way off to the left or right, though.

The scalar product would be calculated as

``````(b1-a1)x(c1-b1) + (b2-a2)x(c2-b2).
``````

when A=(a1, a2), B=(b1, b2), C= (c1,c2) - it is the cos of the angle between the two vectors times the lengths of the vectors, and cos is positive for angles less than 90 degree.

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okay, I should have read more carefully. I withdraw my comment. –  andand Dec 31 '11 at 17:08
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