# Python Optimization For calculation of eucledian distance

This function is being run more than 2 million times in my program. Can anyone suggest to optimize this? x and y are tuples.

``````def distance(x,y):

return sqrt((x[0]-y[0])*(x[0]-y[0])+(x[1]-y[1])*(x[1]-y[1])+(x[2]-y[2])*(x[2]-y[2]))
``````

My try: I tried using math.sqrt, pow and x**.5 but there is not much performance gain.

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What are you doing with the final `distance`? If you're only using it for comparison, drop the `sqrt` and square the thing you're comparing against. –  Mark Ransom Feb 21 '13 at 4:05
If you know C, I would use that language. Python is known to be an inefficient mathematician. –  xxmbabanexx Feb 21 '13 at 4:06
if the value x[i]-y[i] repeats often you can try caching `(x[i]-y[i])*(x[i]-y[i])` –  Octipi Feb 21 '13 at 4:08
You might be interested in the tools provided by scipy.spatial.distance. –  BrenBarn Feb 21 '13 at 4:09
@MarkRansom- Good point but removing sqrt is also not helping much. More than 2 million computations are taking around 34 seconds but for the same algorithm author of paper has done it in 1 sec using Java with similar hardware configuration(his RAM: 4GB, mine 3GB else is same). Could it be a problem of language as I am using python? –  Vikas Bansal Feb 21 '13 at 4:30

you can shave off some cycles by not accessing same x[i] element and binding it locally.

``````def distance(x,y):
x0, x1, x2 = x
y0, y1, y2 = y
return sqrt((x0-y0)*(x0-y0)+(x1-y1)*(x1-y1)+(x2-y2)*(x2-y2))
``````

example, compare:

``````>>> import timeit
>>> timer = timeit.Timer(setup='''
... from math import sqrt
... def distance(x,y):
...    return sqrt((x[0]-y[0])*(x[0]-y[0])+(x[1]-y[1])*(x[1]-y[1])+(x[2]-y[2])*(x[2]-y[2]))
... ''', stmt='distance((0,0,0), (1,2,3))')
>>> timer.timeit(1000000)
1.2761809825897217
``````

with:

``````>>> import timeit
>>> timer = timeit.Timer(setup='''
... from math import sqrt
... def distance(x,y):
...    x0, x1, x2 = x
...    y0, y1, y2 = y
...    return sqrt((x0-y0)*(x0-y0)+(x1-y1)*(x1-y1)+(x2-y2)*(x2-y2))
... ''', stmt='distance((0,0,0), (1,2,3))')
>>> timer.timeit(1000000)
0.8375771045684814
``````

There are more performance tips on the python wiki.

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Original:

``````>>> timeit.timeit('distance2((0,1,2),(3,4,5))', '''
... from math import sqrt
... def distance2(x,y):
...     return sqrt((x[0]-y[0])*(x[0]-y[0])+(x[1]-y[1])*(x[1]-y[1])+(x[2]-y[2])*(x[2]-y[2]))
... ''')
1.1989610195159912
``````

Common Subexpression Elimination:

``````>>> timeit.timeit('distance((0,1,2),(3,4,5))', '''
... def distance(x,y):
...     d1 = x[0] - y[0]
...     d2 = x[1] - y[1]
...     d3 = x[2] - y[2]
...     return (d1 * d1 + d2 * d2 + d3 * d3) ** .5''')
0.93855404853820801
``````

Optimized Unpacking:

``````>>> timeit.timeit('distance((0,1,2),(3,4,5))', '''
... def distance(x,y):
...     x1, x2, x3 = x
...     y1, y2, y3 = y
...     d1 = x1 - y1
...     d2 = x2 - y2
...     d3 = x3 - y3
...     return (d1 * d1 + d2 * d2 + d3 * d3) ** .5''')
0.90851116180419922
``````

Library Functions:

``````>>> timeit.timeit('distance((0,1,2),(3,4,5))', '''
... import math
... def distance(x,y):
...     x1, x2, x3 = x
...     y1, y2, y3 = y
...     d1 = x1 - y1
...     d2 = x2 - y2
...     d3 = x3 - y3
...     return math.sqrt(d1 * d1 + d2 * d2 + d3 * d3)
... ''')
0.78318595886230469
``````

Dotted:

``````>>> timeit.timeit('distance((0,1,2),(3,4,5))', '''
... from math import sqrt
... def distance(x,y):
...     x1, x2, x3 = x
...     y1, y2, y3 = y
...     d1 = x1 - y1
...     d2 = x2 - y2
...     d3 = x3 - y3
...     return sqrt(d1 * d1 + d2 * d2 + d3 * d3)
... ''')
0.75629591941833496
``````
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you want to avoid the dotted notation and have `from math import sqrt` rather than calling `math.sqrt` and incur penalty for each call. –  dnozay Feb 21 '13 at 5:10
ah, right, forgot that one –  rmmh Feb 21 '13 at 5:25

scipy has a euclidian distance function. You probably won't get any faster than that.

http://docs.scipy.org/doc/scipy/reference/generated/scipy.spatial.distance.euclidean.html#scipy.spatial.distance.euclidean

``````from scipy.spatial.distance import euclidean
import numpy as np

# x and y are 1 x 3 vectors
x = np.random.rand(1,3)
y = np.random.rand(1,3)
euclidean(x,y)
``````

EDIT: Actually, running this through timeit against OP's pure-python distance() function, this is actually turning out to be way slower on python floats. I think the scipy version wastes some time casting the floats to numpy dtypes. I'm quite surprised to say the least.

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