# Determine if a set of lines lie in one side of a point and another set of lines lie in the other side

Given two set A and B of lines with n lines in total and a point p. How do u determine if A lines lie in one side of p and B lines lie in the other side?

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Not enough information here. Is this 2-space? 3-space? Are the lines sorted in any sense? Also, I'm really not sure if there is any real meaning to the idea of "on a particular side of a point" –  bdares Apr 12 '11 at 1:34
It could be generalized to N dimensions, I would think. Given a point, you can always divide N-space into two sections with an (N-1)-dimensional object. (A point divides a line; a line divides a plane; a plane divides 3-space; etc.) –  John Feminella Apr 12 '11 at 1:37
How can you be on "one side of a point"? That doesn't make sense. Plane, maybe? –  EboMike Apr 12 '11 at 1:48

## 2 Answers

Unless all of the lines are mutually parallel, they'll always cross both sides of `p`, since they go on forever. Otherwise, draw a line parallel to one of the other lines that passes through `p`, and this line will divide the two sets.

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Assuming the following:
1. This is not homework.
2. "Cross P" means that, for a given x,y range they don't cross. If we're talking about the entire axis, then the lines in A and B must be parallel with respect to their set and this question becomes trivial.

Then the simple (albeit naive) approach (O(n)) is to simply compare each x value of the lines to the x value of the point (for your given y-value of p). If, for the given y, all the x-coordinates of the set A (or B) are to the left of the given point and for the given x all the y values are NOT above this point, then that set is on one side. Run the same test for the other set and if all the lines are on the other side. Et viola. :)

Hope this helps.

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Can I try to modify the problem a bit? If I assume the that the lines are points and the point is a line. Then how do I determine whether A points in one side of the line p and B points in the other side? –  Student Apr 12 '11 at 3:14
Then you'll have to run the same algorithm, except compare the x value of the points against the x value of the lines for the given y. –  Ben Stott Apr 12 '11 at 3:16