# calculate euclidean distance with numpy

I have two points in 3D:

``````(xa,ya,za)
(xb,yb,zb)
``````

And I want to calculate the distance:

``````dist = sqrt((xa-xb)^2 + (ya-yb)^2 + (za-zb)^2)
``````

What's the best way to do this with Numpy, or with Python in general? I have:

``````a = numpy.array((xa,ya,za))
b = numpy.array((xb,yb,zb))
``````
-

``````dist = numpy.linalg.norm(a-b)
``````
-
I knew there was a reason for me not to accept my own answer :-). Just for the record, I managed to see Mark Lavin's answer before he deleted it. I liked it better for the link to Python's docs and the explanation. Can you add some details? –  Nathan Fellman Sep 9 '09 at 20:21
The linalg.norm docs can be found here: docs.scipy.org/doc/numpy/reference/generated/… My only real comment was sort of pointing out the connection between a norm (in this case the Frobenius norm/2-norm which is the default for norm function) and a metric (in this case Euclidean distance). –  Mark Lavin Sep 9 '09 at 20:27

Another instance of this problem solving method. As soon as I submitted the question I got it:

``````def dist(x,y):
return numpy.sqrt(numpy.sum((x-y)**2))

a = numpy.array((xa,ya,za))
b = numpy.array((xb,yb,zb))
dist_a_b = dist(a,b)
``````
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can you use numpy's sqrt and/or sum implementations? That should make it faster (?). –  u0b34a0f6ae Sep 9 '09 at 20:03
Thanks! I'll update the answer –  Nathan Fellman Sep 9 '09 at 20:06
I found this on the other side of the interwebs `norm = lambda x: N.sqrt(N.square(x).sum())` ; `norm(x-y)` –  u0b34a0f6ae Sep 9 '09 at 20:09
scratch that. it had to be somewhere. here it is: `numpy.linalg.norm(x-y)` –  u0b34a0f6ae Sep 9 '09 at 20:11
``````dist = numpy.linalg.norm(a-b)
``````

Is a nice one line answer. However, if speed is a concern I would recommend experimenting on your machine. I found that using the `math` library's `sqrt` with the `**` operator for the square is much faster on my machine than the one line, numpy solution.

I ran my tests using this simple program:

``````#!/usr/bin/python
import math
import numpy
from random import uniform

def fastest_calc_dist(p1,p2):
return math.sqrt((p2[0] - p1[0]) ** 2 +
(p2[1] - p1[1]) ** 2 +
(p2[2] - p1[2]) ** 2)

def math_calc_dist(p1,p2):
return math.sqrt(math.pow((p2[0] - p1[0]), 2) +
math.pow((p2[1] - p1[1]), 2) +
math.pow((p2[2] - p1[2]), 2))

def numpy_calc_dist(p1,p2):
return numpy.linalg.norm(numpy.array(p1)-numpy.array(p2))

TOTAL_LOCATIONS = 1000

p1 = dict()
p2 = dict()
for i in range(0, TOTAL_LOCATIONS):
p1[i] = (uniform(0,1000),uniform(0,1000),uniform(0,1000))
p2[i] = (uniform(0,1000),uniform(0,1000),uniform(0,1000))

total_dist = 0
for i in range(0, TOTAL_LOCATIONS):
for j in range(0, TOTAL_LOCATIONS):
dist = fastest_calc_dist(p1[i], p2[j]) #change this line for testing
total_dist += dist

print total_dist
``````

On my machine, `math_calc_dist` runs much faster than `numpy_calc_dist`: 1.5 seconds versus 23.5 seconds.

To get a measurable difference between `fastest_calc_dist` and `math_calc_dist` I had to up `TOTAL_LOCATIONS` to 6000. Then `fastest_calc_dist` takes ~50 seconds while `math_calc_dist` takes ~60 seconds.

You can also experiment with `numpy.sqrt` and `numpy.square` though both were slower than the `math` alternatives on my machine.

My tests were run with Python 2.6.6.

-
You're badly misunderstanding how to use numpy... Don't use loops or list comprehensions. If you're iterating through, and applying the function to each item, then, yeah, the numpy functions will be slower. The whole point is to vectorize things. –  Joe Kington Nov 13 '10 at 3:36
If I move the numpy.array call into the loop where I am creating the points I do get better results with numpy_calc_dist, but it is still 10x slower than fastest_calc_dist. If I have that many points and I need to find the distance between each pair I'm not sure what else I can do to advantage numpy. –  user118662 Nov 13 '10 at 16:41
I realize this thread is old, but I just want to reinforce what Joe said. You are not using numpy correctly. What you are calculating is the sum of the distance from every point in p1 to every point in p2. The solution with numpy/scipy is over 70 times quicker on my machine. Make p1 and p2 into an array (even using a loop if you have them defined as dicts). Then you can get the total sum in one step, `scipy.spatial.distance.cdist(p1, p2).sum()`. That is it. –  Scott B May 14 '11 at 0:14
Or use `numpy.linalg.norm(p1-p2).sum()` to get the sum between each point in p1 and the corresponding point in p2 (i.e. not every point in p1 to every point in p2). And if you do want every point in p1 to every point in p2 and don't want to use scipy as in my previous comment, then you can use np.apply_along_axis along with numpy.linalg.norm to still do it much, much quicker then your "fastest" solution. –  Scott B May 14 '11 at 0:16
Previous versions of NumPy had very slow norm implementations. In current versions, there's no need for all this. –  larsmans Oct 20 '13 at 10:04

Can be done like this, don't know how fast it is but its no numpy.

``````from math import sqrt
a = (1,2,3) #data point 1
b = (4,5,6) #data point 2
print sqrt(sum( (a - b)**2 for a, b in zip(a, b)))
``````
-

I find a 'dist' function in matplotlib.mlab, but i don't think it's handy enough. I'm posting it here just for reference.

``````import numpy as np
import matplotlib as plt
a = np.array([1,2,3])
b = np.array([2,3,4])
# distance between a and b
dis = plt.mlab.dist(a,b)
``````
-

There's a function for that in SciPy, it's called Euclidean

example:

``````from scipy.spatial import distance
a = (1,2,3)
b = (4,5,6)
dst = distance.euclidean(a,b)
``````
-

You can just substract the vectors and then innerproduct.

``````a = numpy.array((xa,ya,za))