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Given 3 numbers, I need to find which number lies between the two others.

ie,given 3,5,2 I need 3 to be returned.

I tried to implement this by going thru all three and using if else conditions to check if each is between the other two.But this seems a naive way to do this.Is there a better way?

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Is it really always three? – alan Apr 2 '12 at 15:57
Which result do you expect for [1,1,2]? – Tim Pietzcker Apr 2 '12 at 15:58
sorted([3,5,2])[1] – tMC Apr 2 '12 at 16:01
for [1,1,2] , 1 should be taken as middle number – damon Apr 2 '12 at 16:08

7 Answers 7

up vote 9 down vote accepted

Put them in a list, sort them, pick the middle one.

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+1 for not giving the code :-) – Simon Apr 2 '12 at 15:58
my bad! should've thought that! thanks a lot – damon Apr 2 '12 at 16:09
I knew this would happen... – jamylak Apr 2 '12 at 16:11
Sven, beside being a generic answer, it is bad for the case of 3 numbers. If this kind of subroutine appears in heavy-calculations-related task, creating a list of three elements and sorting it is not the right thing even for Python. Imagine the guy next time working i.e. in c++ and creating a vector of three numbers and sorting it... – BasicWolf Apr 2 '12 at 16:51
@BasicWolf: Have you benchmarked it? The difference is not that large – Niklas B. Apr 2 '12 at 16:53

The fastest obvious way for three numbers

def mean3(a, b, c):
    if a <= b <= c or c <= b <= a:
        return b
    elif b <= a <= c or c <= a <= b:
        return a
        return c
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mean3(3,5,2) will give 2 instead of 3 ? – damon Apr 2 '12 at 19:31
@damon thank you for noticing. Fixed. – BasicWolf Apr 2 '12 at 20:00
+1 for the contiguous relational operation -- rarely seen :) – Barun May 14 '14 at 14:40
>>> x = [1,3,2]
>>> sorted(x)[len(x) // 2]
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You could do

numbers = [3, 5, 2]
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Even though this would be completely fine, id just hate to have a hard coded 1 – jamylak Nov 17 at 22:55

This is a O(n) implementation of the median using cumulative distributions. It's faster than sorting, because sorting is O(ln(n)*n).

def median(data):
    frequency_distribution = {i:0 for i in data}
    for x in data:
        frequency_distribution[x] =+ 1
    cumulative_sum = 0
    for i in data:
        cumulative_sum += frequency_distribution[i]
        if (cumulative_sum > int(len(data)*0.5)):
            return i
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smart solution to a different question though, because here we only have 3 items... – jamylak Jun 3 at 13:04

What you want is the median. You can use this code below for any number of numbers:

import numpy
numbers = [3,5,2]
median = numpy.median(numbers)

for a custom solution you can visit this page.

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In the case of the OP I don't think he is ready to be using something like numpy. – jamylak Apr 2 '12 at 16:10
Not quite. The OP wants the middle number in a list. Of course, this is somewhat ambiguous for a list with even number of elements. numpy.median([3,5,2]) = 3.0 (float!). numpy.median([3,5,2,1]) = 2.5, not at all what the OP has in mind! – user90855 Jan 15 '14 at 21:54

Check this (Suppose list already sorted):

def median(list):
    ceil_half_len = math.ceil((len(list)-1)/2)   # get the ceil middle element's index
    floor_half_len = math.floor((len(list)-1)/2) # get the floor middle element 's index'
    return (list[ceil_half_len] + list[floor_half_len]) / 2
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This returns TypeError: list indices must be integers, not float. You need to wrap math.ceil and math.floor with int() – portforwardpodcast Nov 17 at 6:56

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