# is that possible to caculate the number of count inversions using quicksort?

i have already solved the problem using mergesort,now i am thinking is that possible to caculate the number using quicksort?i also coded the quicksort,but i dont know how to caculate here is my code：

``````def Merge_and_Count(AL, AR):
count=0
i = 0
j = 0
A = []
for index in range(0, len(AL) + len(AR)):
if i<len(AL) and j<len(AR):
if AL[i] > AR[j]:
A.append(AR[j])
j = j + 1
count = count+len(AL) - i
else:
A.append(AL[i])
i = i + 1
elif i<len(AL):
A.append(AL[i])
i=i+1
elif j<len(AR):
A.append(AR[j])
j=j+1
return(count,A)
def Sort_and_Count(Arrays):
if len(Arrays)==1:
return (0,Arrays)
list1=Arrays[:len(Arrays) // 2]
list2=Arrays[len(Arrays) // 2:]
(LN,list1) = Sort_and_Count(list1)
(RN,list2) = Sort_and_Count(list2)
(M,Arrays)= Merge_and_Count(list1,list2)
return (LN + RN + M,Arrays)
``````
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Well, Quicksort is `O(n log n)` on average to begin with, `O(n^2)` worst case. So yes, adding a `Theta(n^2)` operation to each partition step is going to make the complexity worse than just forgetting about the sort and naively counting inversions by checking every pair of elements in the input. –  Steve Jessop Oct 29 '13 at 23:13