I agree with the answer/solution from Chip Uni. I will just comment the sorting part and provide some further explanations:

You do not need any sorting algorithm. The algorithm is similar to quicksort, with the difference that only one partition is solved (left or right). We just need to find an optimal pivot so that left and right parts are as equal as possible, which would mean N/2 + N/4 + N/8 ... = 2N iterations, and thus the time complexity of O(N). The above algorithms, called median of medians, computes the median of medians of 5, which turns out to yield linear time complexity of the algorithm.

However, sorting algorithm is used when the range being searched for nth smallest/greatest element (which I suppose you are implementing with this algorithm) in order to speed up the algorithm. Insertion sort is particularly fast on small arrays up to 7 to 10 elements.

Implementation note:

```
M = select({x[i]}, n/10)
```

actually means taking the median of all those medians of 5-element groups. You can accomplish that by creating another array of size `(n - 1)/5 + 1`

and call the same algorithm recursively to find the n/10-th element (which is median of the newly created array).