92

Let's say I have x1, y1 and also x2, y2.

How can I find the distance between them? It's a simple math function, but is there a snippet of this online?

8
  • 2
    @Greg: His track record says no. @TIMEX: Searching didn't work? Seriously: google.com/search?q=python+distance+points Mar 8, 2011 at 4:48
  • 5
    -1 for "is there a snippet of this online?" Seriously, @TIMEX, if searching the web for a code snippet is too hard, now is the time for a change of career.
    – johnsyweb
    Mar 8, 2011 at 8:03
  • 13
    I'm surprised this question is closed. It was in my search results for 'python pythagoras' and was how I discovered the existence of math.hypot.
    – Rob Fisher
    Mar 18, 2013 at 7:51
  • 4
    Okay, I just want to add a note that this is on the first page of google. It always frustrates me to see "just google it" as the first answer. Quite obviously there was some need that this question filled.
    – Dan
    Dec 19, 2013 at 18:47
  • 4
    @GlennMaynard I came here by searching "python distance point", what do I do now?
    – melvinmt
    Apr 5, 2015 at 16:47

3 Answers 3

150
dist = sqrt( (x2 - x1)**2 + (y2 - y1)**2 )

As others have pointed out, you can also use the equivalent built-in math.hypot():

dist = math.hypot(x2 - x1, y2 - y1)
6
  • This is, by the way, the distance formula Mar 8, 2011 at 4:37
  • 2
    did you mean en.wikipedia.org/wiki/Euclidean_distance ? Mar 8, 2011 at 4:38
  • This isn't how to do the "power" in python? Isn't it **?
    – TIMEX
    Mar 8, 2011 at 4:40
  • 1
    @TIMEX: Yes it is. The change is now reflected on @MitchWheat's post Mar 8, 2011 at 4:43
  • 6
    @RobFisher - explicitly writing this expression may actually be faster than calling math.hypot since it replaces a function call with inline bytecodes.
    – PaulMcG
    Jul 16, 2013 at 19:58
72

Let's not forget math.hypot:

dist = math.hypot(x2-x1, y2-y1)

Here's hypot as part of a snippet to compute the length of a path defined by a list of (x, y) tuples:

from math import hypot

pts = [
    (10,10),
    (10,11),
    (20,11),
    (20,10),
    (10,10),
    ]

# Py2 syntax - no longer allowed in Py3
# ptdiff = lambda (p1,p2): (p1[0]-p2[0], p1[1]-p2[1])
ptdiff = lambda p1, p2: (p1[0]-p2[0], p1[1]-p2[1])

diffs = (ptdiff(p1, p2) for p1, p2 in zip (pts, pts[1:]))
path = sum(hypot(*d) for d in  diffs)
print(path)
1
  • 1
    Python3 no longer allows tuples as lambda parameter so the function become this: ptdiff = lambda p: (p[0][0]-p[1][0], p[0][1]-p[1][1]) diffs = map (ptdiff , zip(pts[:-1],pts[1:])) path = sum(math.hypot(d1,d2) for d1,d2 in diffs) Mar 9, 2018 at 7:59
18

enter image description here It is an implementation of Pythagorean theorem. Link: http://en.wikipedia.org/wiki/Pythagorean_theorem

0

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