# Find a line passing the maximum number of points [closed]

I found a Google Interview question on CareerCup

Given a 2D plane, suppose that there are around 6000 points on it. Find a line which passes the most number of points.

Many answers there say this question is hard and involving some kind of special algorithms.

But my view is different and maybe I am wrong.

Here is my thinking:

First I will give a axis system to the 2D plane. Hence, every point will have its unique x and y, i.e., `{x, y}`. For simplicity, we can put the axis system's `{0, 0}` as the left bottom of the whole plane and therefore every x and y are bigger than 0.

Then I have a theory:

If several points are on the same line, then it must be in one of the following 3 cases:

1. their `x` values are the same
2. their `y` values are the same
3. their `x/y` or `y/x` values are the same. But `x/y` case is the same as `y/x` case, so let's just focus on `x/y`.

Then I will have 3 hashtables.

1. The first one (`hashtable-x`) is with key of `x`, the value is the list of points which have the same `x`;

2. the second one (`hashtable-y`) is with the key of `y` and the value is the list of points which have the same `y`;

3. the last one (`hashtable-x-y`) is with the key of `x/y` and the value is the list of points which have the same `x/y`;

Then I scan the whole 6000 points, for each point, I will get its `x` from `hashtable-x`, and put the point into the value (a list) of that slot; then I will do similar things to `hashtable-y` and `hashtable-x-y`.

Finally, i will scan all lists in the 3 hashtables and find the longest list will contains the points of the desired line.

How do you think of my algorithm?

Ok, here is the duplicate, sorry that I didn't find that question before.

What is the most efficient algorithm to find a straight line that goes through most points?

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Considering the `x/y` ratio will only consider lines that originate in `{0, 0}`. Imagine all points are on the line where `y = x + 1` they will all have another `x`, another `y` and another `x/y`. –  Nobody Jun 7 '12 at 13:40
@Nobody Yeah, you are right. I need to think about that more deeply. –  Jackson Tale Jun 7 '12 at 13:42

## closed as not constructive by casperOne♦Jun 7 '12 at 15:24

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Your algorithm won't work as stated. Consider many points fall on the line y=2x + 1, meaning that you get (1,3),(2,5), (3,7), (4,9), and (5,11).

I don't think you're expected to solve this unless you have a graduate level course in computational geometry. The deal is to convert all the points to lines in the dual space, using point-line duality and find the point at which most lines intersect. Naively you can do this in O(n^2) by going through every pair of lines and evaluating where they intersect in analytic form. I also think you can do O(n log n) by using plane sweep style algorithms but I'm not sure of the details.

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thanks. What do you mean by `convert all the points to lines in the dual space`? How to do it exactly? –  Jackson Tale Jun 7 '12 at 15:05
For every point (x,y) and you say y = ax + b. And solve b = -xa + y, and that is a line in dual A-B space. You do that for every point and intersect lines. –  carlosdc Jun 7 '12 at 15:12
do you mean that a line is in the form of `y = ax+b` provided `a` and `b` are known? How about @tskuzzy's answer? –  Jackson Tale Jun 7 '12 at 15:45
No, b = -xa + y where x and y are known, this is a line in the a-b axis. His solution is a O(n^3) solution, impractical for 6000 points. –  carlosdc Jun 7 '12 at 15:52
@carlosdc: nowadays I don't think an O(N^3) solution should be considered in principle impractical for 6000 elements. Looping 2e11 times may just take a couple of minutes. –  salva Jun 7 '12 at 16:49

I'm going to assume that the number of points is greater than or equal to 2 here in my answer (zero and one point are trivial cases).

First notice that any such line must pass through at least two of the points. So we can construct a solution as follows:

``````for each pair of points p1,p2
find equation of the line l passing through p1,p2

for each point p3 not p1 or p2
if p3 lies on l
counter[l]++

return argmax(counter)
``````
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This is a O(N^3) approach, right? –  Jackson Tale Jun 7 '12 at 15:47