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

alreadysolved it.. – Jane D. Jan 1 '16 at 11:28`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