# Python: checking if point is inside a polygon

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

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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)]

--output:--
True
``````
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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
``````

Notes:

• 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`.
-

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)

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