```
Algorithm(a-array, n-length):
for(i=2;i<=n;i++)
if(a[1]<a[i]) Swap(a,1,i);
for(i=n-1;i>=2;i--)
if(a[n]<a[i]) Swap(a,n,i);
```

I'm interested in determining how many times `Swap`

is called in the code above in the worst case, so I have some questions.

What's the worst case there?

- If I had only the first for loop, it could be said that the worst case for this algorithm is that the array
**a**is already sorted in ascending order, and Swap would be called n-1 times. - If I had only the second loop, the worst case would also be that
**a**is already sorted, but this time, the order would be descending. That means that if we consider the first worst case, the`Swap`

wouldn't be called in the second loop, and vice versa, i.e. it can't be called in both loops in each iteration.

What should I do now? How to combine those two worst cases that are opposite to each other? Worst case means that I want to have as many Swap calls as possible. : )

P.S. I see that the complexity is O(n), but I need to estimate as precisely as possible how many times is the Swap executed.

EDIT 1: `Swap(a,i,j)`

swaps the elements `a[i]`

and `a[j]`

.