I am using python and I have defined the latitudes and longitudes (in degrees) of a polygon on the map. My goal is to check if a generic point P of coordinates x,y falls within such polygon. I would like therefore to have a function that allows me to check such condition and return True or False if the point is inside or outside the polygon.

enter image description here

In this example the point is outside so the result would be False

Question: Is there a library/package that allows to reach my goal? if yes which one do you recommend? would you be able to give a small example on how to use it?

Here is the code I have written so far:

import numpy as np

# Define vertices of polygon (lat/lon)
v0 = [7.5, -2.5] 
v1 = [2, 3.5]
v2 = [-2, 4]
v3 = [-5.5, -4]
v4 = [0, -10]
lats_vect = np.array([v0[0],v1[0],v2[0],v3[0],v4[0]])
lons_vect = np.array([v0[1],v1[1],v2[1],v3[1],v4[1]])

# Point of interest P
x, y = -6, 5 # x = Lat, y = Lon

# Check if point of interest falls within polygon boundaries
# If yes, return True
# If no, return False

In order to plot the polygon and the point of interest I used cartopy and I wrote the following lines of code:

import cartopy.crs as ccrs
import matplotlib.pyplot as plt
ax = plt.axes(projection=ccrs.PlateCarree())

# Append first vertex to end of vector to close polygon when plotting
lats_vect = np.append(lats_vect, lats_vect[0])
lons_vect = np.append(lons_vect, lons_vect[0])
plt.plot([lons_vect[0:-1], lons_vect[1:]], [lats_vect[0:-1], lats_vect[1:]],
         color='black', linewidth=1, 

plt.plot(y, x, 
        '*',          # marker shape
        color='blue',  # marker colour
        markersize=8  # marker size



  • points are connected to each other by Great Circles!
  • I have researched in the internt and I ended up finding some similar questions like this one but I had no success since they all use of .shp files which I do not have.
  • Try converting this algorithm to Python wrf.ecse.rpi.edu//Research/Short_Notes/pnpoly.html#The C Code – arboreal84 May 10 '17 at 12:37
  • python does not have packages that do anything. it has a small number of pre built modules. packages are usually supplied by community. – Uriel May 10 '17 at 12:47
  • 1
    Is the polygon always convex? – Sembei Norimaki May 10 '17 at 13:02
  • In general no, it could also be concave – Federico Gentile May 10 '17 at 13:04
  • 1
    Just in case: you can always cast a ray from your point to a middle point of any of the polygon's sides. If your ray crosses polygon's sides an even number of times, the point is on the outside. Works with convex and concave polygons; works on a sphere surface (and likely any 1-connected surface) using a geodesic for the ray. Has an edge case when a ray passes exactly through a vertex: you need to check whether the edges incident to the vertex are on the same side of the ray. – 9000 May 10 '17 at 16:04

Here is a possible solution to my problem.

  1. Geographical coordinates must be stored properly. Example np.array([[Lon_A, Lat_A], [Lon_B, Lat_B], [Lon_C, Lat_C]])
  2. Create the polygon
  3. Create the point to be tested
  4. Use polygon.contains(point) to test if point is inside (True) or outside (False) the polygon.

Here is the missing part of the code:

from shapely.geometry import Point
from shapely.geometry.polygon import Polygon

lons_lats_vect = np.column_stack((lons_vect, lats_vect)) # Reshape coordinates
polygon = Polygon(lons_lats_vect) # create polygon
point = Point(y,x) # create point
print(polygon.contains(point)) # check if polygon contains point
print(point.within(polygon)) # check if a point is in the polygon 

Note: the polygon does not take into account great circles, therefore it is necessary to split the edges into many segments thus increasing the number of vertices.

Special case: If point lies on borders of Polygon

E.g. print(Polygon([(0, 0), (1, 0), (1, 1)]).contains(Point(0, 0))) will fail

So one can use

print(polygon.touches(point)) # check if point lies on border of polygon 
  • 1
    It is better to write the first latitude followed by longitude. Nothing wrong with the logic here, but to be safe than sorry. – Zahran Aug 20 '17 at 1:19
  • @FedericoGentile - Shapely does not use great circle distances. It uses Euclidean – gansub Sep 7 '18 at 13:06
  • Does this work for a region bounded by smooth curves as well? Not just a polygon. – ap21 May 13 '19 at 23:07
  • 1
    Thanks! The answer is compact but answer all the questions I need! Cool! – ptee Jun 25 '20 at 9:58
  • Shapely also fails when the polygon intersects with the dateline – Alexander Bauer Aug 2 '20 at 19:29

There is also an emerging python library turfpy. which is used for geospatial analysis.




from turfpy.measurement import boolean_point_in_polygon
from geojson import Point, Polygon, Feature

point = Feature(geometry=Point((-46.6318, -23.5523)))
polygon = Polygon(
            (-46.653, -23.543),
            (-46.634, -23.5346),
            (-46.613, -23.543),
            (-46.614, -23.559),
            (-46.631, -23.567),
            (-46.653, -23.560),
            (-46.653, -23.543),
boolean_point_in_polygon(point, polygon)
  • Thanks for the contribuition! – Federico Gentile Jul 27 '20 at 11:57
  • Was wondering if this can be done in R? – Jorge Jan 16 at 21:18
  • 1
    I've been having a lot of trouble installing shapely. This is a much cleaner solution - thank you! – mustang Feb 16 at 2:17

Another way to do it is by using the even-odd algorithm explained in this link https://wrf.ecse.rpi.edu//Research/Short_Notes/pnpoly.html The python code is given in wikipedia https://en.wikipedia.org/wiki/Even–odd_rule

Folks, just remember that the ORDER OF POINTS that make the polygon MATTER! I mean, different order results in different polygons.

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