# middle number without using median function, Python

I have been looking for how to find the middle number in the list so that I do not use the median function, but cannot find the information how to do that.

I need to write a code which takes middle(L) function (have to define it), makes a list L as its argument, and returns the item in the middle position of L. (In order that the middle is well-defined, i should assume that L has odd length.)

It is all i have right now and actually have no idea how to do that.

``````def middle (L):
i= len((L)[0:-1])/2
return i
print (middle)
``````
• Why would you not want to use the median function? Commented Oct 13, 2014 at 18:57
• @RyneEverett Sounds like a school assignment, and that was one of the requirements. Not that uncommon. They often have students re-implement features just to have a better understanding of how they work (e.g. various sorts, trees, hashing, etc). Commented Oct 13, 2014 at 18:59

To find the median, just sort the list and return the number in the middle position or (if the list has even number of elements), return the average of the 2 elements in middle:

``````def middle(L):
L = sorted(L)
n = len(L)
m = n - 1
return (L[n/2] + L[m/2]) / 2.0
``````

Example:

``````>>> print middle([1, 2, 3, 4, 5])
3.0
>>> print middle([1, 2, 3, 4, 5, 6])
3.5
``````

As NPE's answer suggests you just have to get the middle element of a sorted list when the list has an uneven number of elements, if it has an even number of elements you take the average of the middle two elements:

``````def median(l):
srt = sorted(l)
mid = len(l)//2
if len(l) % 2: # f list length mod 2 has a remainder the list is an odd lenght
return srt[mid]
else:
med = (srt[mid] + srt[mid-1]) / 2  # in a list [1,2,3,4] srt[mid]-> 2, srt[mid-1] -> 3
return med
``````
• This isn't necessary; as the question says, "In order that the middle is well-defined, i should assume that L has odd length." It might still be useful for other people with different assignments, but for this one, he'd probably get dinged for not reading the instructions. Commented Oct 13, 2014 at 19:25
• @abarnert, I am aware of that but I still think adding how to to get the median of a list of values when the list is even is useful Commented Oct 13, 2014 at 19:27
• That's why I said "It might still be useful for other people with different assignments". Commented Oct 13, 2014 at 19:36
• @abarnert, well I guess we agree it is useful then Commented Oct 13, 2014 at 19:40

For optimization, we should use binary search to detect the median, rather than to sort all numbers. For details, please check: https://www.quora.com/Given-a-list-of-unsorted-numbers-how-would-you-find-the-median-without-sorting-the-original-array

For the code, please check: https://medium.com/@nxtchg/calculating-median-without-sorting-eaa639cedb9f

There are two well-known ways to calculate median:

1. naive way (sort, pick the middle)

2. using quickselect (or similar algorithm for weighted median)

Hope it helps.