# quick sort using partitioning technique

I implemented quick sort using partitioning technique. The one issue I am facing is based on the pivot I need to change my code. Below is my implementation of qsort.

``````#include<iostream>
using namespace std;
void qsort1(int arr[], int p, int q)
{
if(p<q)
{
int ppos = p;
int pivot = arr[ppos];
int r = p;
for(int i=p;i<=q;i++)
{
if(arr[i] < pivot)
{
r++;
swap(arr[i],arr[r]);
}
}
swap(arr[r],arr[ppos]);
qsort1(arr,p,r-1);
qsort1(arr,r+1,q);
}
}
int main()
{
int arr[]= {9,7,4,1,2,3};
qsort1(arr,0,5);
for(int i =0;i<6;i++)
cout<<arr[i]<<endl;
return 0;
}
``````

To change the pivot from first to last element I need to change my r to exclude the last element. can someone please suggest me a better implementation using same partitioning technique . By the way its not a homework question.

-
If it's not homework question, please use `std::sort`... –  kennytm Mar 27 '12 at 20:44
I've you're including `<iostream>`, then this is not a C program. I've edited your tags. –  Greg Hewgill Mar 27 '12 at 20:44
@KennyTM Im preparing for interviews –  mousey Mar 27 '12 at 20:44
@KennyTM There are about 1000 reasons I can think of not to use STL in every case. With that said, most people lack basic understanding of how algorithms work, and if mousey is doing "self homework" then I think he should be praised –  std''OrgnlDave Mar 27 '12 at 20:47
@mousey generally speaking, you should use a randomly chosen initial qsort pivot. For instance if your array is already sorted using this pivot selection method it will cause O(n * n) behavior. Choosing a random elements helps to amortize the worst-case cost of O(n*n) to roughly O(n log n). Failing a random element, choosing the middle pivot or even the median (if you have access to that) works too. –  std''OrgnlDave Mar 27 '12 at 20:50