# Pseudocode and complexity for ith smallest element in an array

I have to write an efficient pseudocode to find the i-th smallest element in an unsorted array with n elements,where n ,i and A[n] are input data.

In my opinion this means that I have to write the pseudocode for sorting an array in increasing order.I was about to do it with selection sort but I read the question again and it said efficient so lets do it with merge sort!

My pseudocode is :

``````    {

n<---length[A]
if (n<2)
return

mid <--- n/2
left<---array of size(mid)
right<---array of size(n- mid)
for i<---0  to mid-1
left[i]<--- A[i]
for i<---mid  to n-1
right [i-mid]<---A[i]
Mergesort(left)
Mergesort(right)
Merge(left,right,A)
}
``````

The complexity in all the cases (worst average best) is O(nlogn).Which means that this algorithm is very fast !

Is my solution correct

Edit: My question is very specific,it asks for an efficient algorithm.Which means we need a fast one.The ones you keep trying to add as duplicate arent efficient they have O(n) complexity

• Please dont do this to me man,dont downvote the question...there is not a possible answer for me in that thread I have already solved it.. – Jane D. Jan 1 '16 at 11:28
• Isn't O(n) more efficient than O(nlogn)? – Yu Hao Jan 1 '16 at 11:32
• – Jane D. Jan 1 '16 at 11:47
• @JaneD.: It should be clear that `O(n log n)` is asymptotically worse than `O(n)`, since `log n` increases without bounds. That is, for any constant `c`, there is an `n` such that `log n > c`, and consequently `n log n > cn`. I think you are confusing `O(log n)` (fast) with `O(n log n)` (reasonable, but not as fast as `O(n)`) – rici Jan 1 '16 at 17:24

1 Your algorithm is not very fast.

With almost any known good standard sort, you can get O(n log n) to sort the entire array. Then take the ith (immediate in an array for example)

2 Your pseudocode is not finished. what does it return ?

Some considerations:

If i is rather little, just iterate and keep i minimum datas (insert every new data in a binary tree of the i most little datas, if it is less than the max of these datas). It will take < O(n) . log i

If i becomes big, just sort everything => O (n.log n)