Stack Overflow is a community of 4.7 million programmers, just like you, helping each other.

Join them; it only takes a minute:

Sign up
Join the Stack Overflow community to:
  1. Ask programming questions
  2. Answer and help your peers
  3. Get recognized for your expertise

I have a class describing a Point (has 2 coordinates x and y) and a class describing a Polygon which has a list of Points which correspond to corners (self.corners) I need to check if a Point is in a Polygon

Here is the function that is supposed to check if the Point in in the Polygon. I am using the Ray Casting Method

def in_me(self, point):
        result = False
        n = len(self.corners)
        p1x = int(self.corners[0].x)
        p1y = int(self.corners[0].y)
        for i in range(n+1):
            p2x = int(self.corners[i % n].x)
            p2y = int(self.corners[i % n].y)
            if point.y > min(p1y,p2y):
                if point.x <= max(p1x,p2x):
                    if p1y != p2y:
                        xinters = (point.y-p1y)*(p2x-p1x)/(p2y-p1y)+p1x
                        print xinters
                    if p1x == p2x or point.x <= xinters:
                        result = not result
            p1x,p1y = p2x,p2y
         return result

I run a test with following shape and point:

PG1 = (0,0), (0,2), (2,2), (2,0)
point = (1,1)

The script happily returns False even though the point it within the line. I am unable to find the mistake

share|improve this question
Might be because you're using "/" on integers, which returns an integer (rounded down). You should do all computations with floats instead. Also, if p1y == p2y, xinters might not be defined but still used just afterwards. – Armin Rigo May 18 '13 at 15:04
Better yet: don't divide at all. Instead of computing xinters, check if (point.x - p1x)*(p2y-p1y) <= (point.y-p1y)*(p2x-p1x). However, casting the vertex coordinates to integers could introduce errors if they aren't already integers to start with. – chepner May 18 '13 at 16:19
...or use Python 3, which doesn't truncate to integers on division. – Ulrich Eckhardt May 18 '13 at 16:56
how would using (point.x - p1x)*(p2y-p1y) <= (point.y-p1y)*(p2x-p1x) make the actual code look like? Since it is a homework assignment, then we have to use Python 2.7 :( – helena.lissenko May 18 '13 at 17:41
@Ulrich & helena: Python 3 division can be enabled in Python 2 using from __future__ import division. Another alternative is to just float() either the numerator or denominator (or a term in one of them in this case). – martineau Jul 14 '14 at 13:22

This works:

def point_in_poly(x,y,poly):

    n = len(poly)
    inside = False

    p1x,p1y = poly[0]
    for i in range(n+1):
        p2x,p2y = poly[i % n]
        if y > min(p1y,p2y):
            if y <= max(p1y,p2y):
                if x <= max(p1x,p2x):
                    if p1y != p2y:
                        xints = (y-p1y)*(p2x-p1x)/(p2y-p1y)+p1x
                    if p1x == p2x or x <= xints:
                        inside = not inside
        p1x,p1y = p2x,p2y

    return inside

x = 1
y = 1

poly = [(0,0), (2,0), (2,2), (0,2)]

share|improve this answer
Python allows you to write if min(p1y,p2y) < y <= max(p1y,p2y):. – martineau Jul 14 '14 at 13:09
Unless you are Patrick Jordan, you should probably cite the website from which you copypasted this. – Brionius Jul 21 '15 at 15:28
@martineau: Nice, I did not know that. – Tom Bombadil Oct 2 '15 at 9:16
I see what Brionius means, which references this C code. – martineau Oct 2 '15 at 11:17
Agree with @Brionius It'd be nice to add the original reference in the answer when it's not written from scratch. I found another nearly identical solution but Patrick Jordan's code was 6 years earlier (posted in 2005). – Shoof Jan 26 at 22:26

I'd like to suggest some other changes there:

def contains(self, point):
    if not self.corners:
        return False

    def lines():
        p0 = self.corners[-1]
        for p1 in self.corners:
            yield p0, p1
            p0 = p1

    for p1, p2 in lines():
        ... # perform actual checks here


  • A polygon with 5 corners also has 5 bounding lines, not 6, your loop is one off.
  • Using a separate generator expression makes clear that you are checking each line in turn.
  • Checking for an empty number of lines was added. However, how to treat zero-length lines and polygons with a single corner is still open.
  • I'd also consider making the lines() function a normal member instead of a nested utility.
  • Instead of the many nested if structures, you could also check for the inverse and then continue or use and.
share|improve this answer

I would suggest using the Path class from matplotlib

import matplotlib.path as mplPath
poly = [190, 50, 500, 310]
bbPath = mplPath.Path(np.array([[poly[0], poly[1]],
                     [poly[1], poly[2]],
                     [poly[2], poly[3]],
                     [poly[3], poly[0]]]))

bbPath.contains_point((200, 100))

(There is also a contains_points function if you want to test for multiple points)

share|improve this answer
For this to work, you must first import numpy as np – Martin Burch Mar 6 '15 at 16:54

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.