this is a standard problem named **inversion count**

This can be solved using mergesort in O(n*lg(n)). Here is my code for counting the inversions

```
int a[200001];
long long int count;
void Merge(int p,int q,int r)
{
int n1,n2,i,j,k,li,ri;
n1=q-p+1;
n2=r-q;
int l[n1+1],rt[n2+1];
for(i=0;i<n1;i++)
l[i]=a[p+i];
for(i=0;i<n2;i++)
rt[i]=a[q+1+i];
l[n1]=LONG_MAX;
rt[n2]=LONG_MAX;
li=0;ri=0;
for(i=p;i<=r;i++)
{
if(l[li]<=rt[ri])
a[i]=l[li++];
else
{
a[i]=rt[ri++];
count+=n1-li;
}
}
}
void mergesort(int p,int r)
{
if(p<r)
{
int q=(p+r)/2;
mergesort(p,q);
mergesort(q+1,r);
Merge(p,q,r);
}
}
int main()
{
scanf("%d",&n);
for(i=0;i<n;i++)
scanf("%d",&a[i]);
count=0;
mergesort(0,n-1);
printf("%lld\n",count);
}
```

Basically the problem of inversion count is to find the no. of pairs i and j where j>i such that a[i]>a[j]

To know the idea behind this you should know the basic merge sort algorithm

http://en.wikipedia.org/wiki/Merge_sort

Idea:

Use divide and conquer

divide: size of sequence n to two lists of size n/2
conquer: count recursively two lists
combine: this is a trick part (to do it in linear time)

combine use merge-and-count. Suppose the two lists are A, B. They are already sorted. Produce an output list L from A, B while also counting the number of inversions, (a,b) where a is-in A, b is-in B and a>b.

The idea is similar to "merge" in merge-sort. Merge two sorted lists into one output list, but we also count the inversion.

Everytime a_i is appended to the output, no new inversions are encountered, since a_i is smaller than everything left in list B. If b_j is appended to the output, then it is smaller than all the remaining items in A, we increase the number of count of inversions by the number of elements remaining in A.