# Checking to see if 3 points are on the same line

I want to know a piece of a code which can actually tell me if 3 points in a 2D space are on the same line or not. A pseudo-code is also sufficient but Python is better.

• How is your line defined? Function on a 2d plane? Commented Sep 28, 2010 at 14:22
• What exactly are you given? Three points? or three points and a line? Commented Sep 28, 2010 at 14:32

You can check if the area of the ABC triangle is 0:

``````[ Ax * (By - Cy) + Bx * (Cy - Ay) + Cx * (Ay - By) ] / 2
``````

Of course, you don't actually need to divide by 2.

• This is much better because there is no risk of dividing by 0. Commented Sep 28, 2010 at 14:31
• Just to point something out... This is mathematically equivalent to @dcp's answer above (if you ignore the `/2`), but checking if the area is 0 makes it easier to add a tolerance... (i.e. `stuff < err_tolerance` instead of `stuff1 == stuff2` as @dcp does above) Commented Sep 28, 2010 at 14:43
• +1 mathematically is the same but the concept is more simple/visual/straighforward (i like it). Commented Sep 28, 2010 at 15:08
• @Hossein: Are you asking about the absolute value, or about the sign? With your points and my formula I'm getting -510. The sign means that you chose a certain order of the points. You could swap A with C or B and you'll get a positive area, even thought it's the same triangle. Commented Oct 4, 2010 at 4:30
• @Joe Kington: (1) You need to do -tolerance < stuff < tolerance. (2) @florin's formula requires 3 multiplications and 5 additions/subtractions to give a "should be zero" result. @dcp's formula, adjusted by changing `==` to `-`, requires 2 mults and 5 subtractions to give a "should be zero" result. I'd give @dcp the tick, not @florin. Commented Oct 6, 2010 at 2:53

This is C++, but you can adapt it to python:

``````bool collinear(int x1, int y1, int x2, int y2, int x3, int y3) {
return (y1 - y2) * (x1 - x3) == (y1 - y3) * (x1 - x2);
}
``````

Basically, we are checking that the slopes between point 1 and point 2 and point 1 and point 3 match. Slope is change in y divided by change in x, so we have:

``````y1 - y2     y1 - y3
-------  =  --------
x1 - x2     x1 - x3
``````

Cross multiplying gives `(y1 - y2) * (x1 - x3) == (y1 - y3) * (x1 - x2)`;

Note, if you are using doubles, you can check against an epsilon:

``````bool collinear(double x1, double y1, double x2, double y2, double x3, double y3) {
return fabs((y1 - y2) * (x1 - x3) - (y1 - y3) * (x1 - x2)) <= 1e-9;
}
``````
• @dtb - I added an explanation, let me know if you still have questions.
– dcp
Commented Sep 28, 2010 at 14:30
• nice trick. However, checking floating point numbers for equality isn't safe. You might test the absolute difference against a pre-defined threshold that is dependent on the resolution (sensitivity) you want to achieve Commented Sep 28, 2010 at 14:34
• Couldn't one slope be positive and one negative? I think you ought to compare their absolute value. Commented Sep 28, 2010 at 14:37
• @dtb - x1==x2 works ok, consider these cases: collinear(-2,0,-2,1,-1,1) returns false, and collinear(-2,0,-2,1,-2,2) returns true. I think the corner cases are covered, let me know if you disagree.
– dcp
Commented Sep 28, 2010 at 14:42
• This requires less computation than @florin's answer even if it's equivalent (so I vote for it). Commented Sep 29, 2010 at 0:13

`y - y0 = a(x-x0)` (1) while `a = (y1 - y0)/(x1 - x0)` and `A(x0, y0)` `B(x1, y1)` `C(x2, y2)`. See whether `C` statisfies (1). You just replace the appropriate values.

Details

Read this, and use it to find the equation of a line through the first two points. Follow the instructions to find `m` and `b`. Then for your third point, calculate `mx + b - y`. If the result is zero, the third point is on the same line as the first two.

Rule 1: In any linear 2d space, two points are always on the same line.

Take 2 points and build an equation that represents a line through them. Then check if the third point is also on that line.

Good luck.