# Find nth smallest element in numpy array [duplicate]

I need to find just the the smallest nth element in a 1D `numpy.array`.

For example:

``````a = np.array([90,10,30,40,80,70,20,50,60,0])
``````

I want to get 5th smallest element, so my desired output is `40`.

My current solution is this:

``````result = np.max(np.partition(a, 5)[:5])
``````

However, finding 5 smallest elements and then taking the largest one them seems little clumsy to me. Is there a better way to do it? Am I missing a single function that would achieve my goal?

There are questions with similar titles to this one, but I did not see anything that answered my question.

Edit:

I should've mentioned it originally, but performance is very important for me; therefore, `heapq` solution though nice would not work for me.

``````import numpy as np
import heapq

def find_nth_smallest_old_way(a, n):
return np.max(np.partition(a, n)[:n])

# Solution suggested by Jaime and HYRY
def find_nth_smallest_proper_way(a, n):
return np.partition(a, n-1)[n-1]

def find_nth_smallest_heapq(a, n):
return heapq.nsmallest(n, a)[-1]
#
n_iterations = 10000

a = np.arange(1000)
np.random.shuffle(a)

t1 = timeit('find_nth_smallest_old_way(a, 100)', 'from __main__ import find_nth_smallest_old_way, a', number = n_iterations)
print 'time taken using partition old_way: {}'.format(t1)
t2 = timeit('find_nth_smallest_proper_way(a, 100)', 'from __main__ import find_nth_smallest_proper_way, a', number = n_iterations)
print 'time taken using partition proper way: {}'.format(t2)
t3 = timeit('find_nth_smallest_heapq(a, 100)', 'from __main__ import find_nth_smallest_heapq, a', number = n_iterations)
print 'time taken using heapq : {}'.format(t3)
``````

Result:

``````time taken using partition old_way: 0.255564928055
time taken using partition proper way: 0.129678010941
time taken using heapq : 7.81094002724
``````
• Also, might be beneficial to check out docs.python.org/2/library/heapq.html
– C.B.
Mar 20 '14 at 22:12
• @C.B. the above question is significantly different from mine; it asks for both min and max, and it is for 2D matrix Mar 20 '14 at 22:16
• How is this a duplicate? The title sounds similar, but the question itself is very different. Sometimes different questions lead to same answers, but here the answers are also very different. And there is no way an answer in that question is an answer to my question. Mar 21 '14 at 3:37

Unless I am missing something, what you want to do is:

``````>>> a = np.array([90,10,30,40,80,70,20,50,60,0])
>>> np.partition(a, 4)
40
``````

`np.partition(a, k)` will place the `k`-th smallest element of `a` at `a[k]`, smaller values in `a[:k]` and larger values in `a[k+1:]`. The only thing to be aware of is that, because of the 0 indexing, the fifth element is at index 4.

• Yeah, that's it. I was thinking about it wrong. I knew there was a better solution! Mar 20 '14 at 22:53
• It should be np.partition(a, 4) Jan 13 '16 at 2:30
• ok, the 5th element. Feb 9 '16 at 11:26
• Found out that k must be greater than or equal to the number in bracket []. Otherwise the wrong answer will pop out (which I expected it to be an error). I leave this comment to prevent the case someone misuse it to get wrong answer May 27 at 2:58

You can use `heapq.nsmallest`:

``````>>> import numpy as np
>>> import heapq
>>>
>>> a = np.array([90,10,30,40,80,70,20,50,60,0])
>>> heapq.nsmallest(5, a)[-1]
40
``````
• Check your performance, though. I recently had a situation in which `heapq.nsmallest` looked perfect, but slicing `sorted` turned out to be about 25% faster. I believe the heap approach is faster for some data, but not for all. I don't know if there's anything special about numpy arrays that would affect that one way or the other. Mar 20 '14 at 22:20
• @PeterDeGlopper Well the sorting approach might be faster for smaller data sets, but for larger ones the heap method should be faster. How large was the data you're referring to? Mar 20 '14 at 22:22
• Not large - lists of about 100 3-tuples of integers. So probably well below the level at which the heap method wins. Mar 20 '14 at 22:32
• The solution that I have in my original post is O(n), since both `np.partition` and `np.max` are O(n). Mar 20 '14 at 22:36
• I've seen some instances where actual `heapify` plus n `heappop` operations is way faster than using `nsmallest` or slicing `sorted`. Just to throw that out there. Mar 20 '14 at 22:39

you don't need call `numpy.max()`:

``````def nsmall(a, n):
return np.partition(a, n)[n]
``````
• It should be np.partition(a, n)[n-1] Jan 13 '16 at 2:30