# Fastest way to calculate euclidian distance in 2D space

What is the fastes way of determening which point q out of n points in 2D space is the closest (smallest euclidian distance) to point p, see attached imgage.

My current method of doing this in Python is storing all the distances in a list and then running

``````numpy.argmin(list_of_distances)
``````

This is however a bit slow when calculating this for m number of points p. Or is it?

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This falls under closest point query -problems.

How many points are expected? Are your points static or do they change? One naive but powerful approach for static points would be to pre-compute every known distance, which would result in O(1) lookup.

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Ah. Thank you. n is normaly only around 10 but m can range in the thousands. However, the distrubution of q i liklely to change with every iteration. "Precompute every known distance", does this apply to floating point numbers? –  Theodor Sep 28 '10 at 11:10

Instead of calculating the distances, you could calculate the squared distances. That way you don't need to perform n * m square roots.

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Good point, you still keep the relative order of distances. –  Theodor Sep 28 '10 at 10:54
Old games programmer's cheat :) –  Jackson Pope Sep 28 '10 at 10:56
``````import numpy as np