# How to represent Big O(n!) Time complexity from for loop?

For Example

O(n)

``````for (int i=0;i<n;i++)
``````

After Edit : My Final Answer is

``````for(int i =(n - 1); i > 1; i--)
{
factorial = factorial * i;
}
for (int j=n-2;j<factorial;j++)
{

}
``````
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## 4 Answers

The simplest answer is for (int i = 0; i < Factorial(n); i++) {...

In practice, usually O(n!) algorithms are those that work by trying all the different permutations of a list, that is, all the different ways you can reorder a list. One example is finding the shortest line that passes through all points in a map called the travelling salesman problem. You need to try all the different ways to go through all the points and that would be O(n!).

``````IEnumerable<List<int>> nextPermutation(List<int> nodesLeft)
{
if (nodesLeft.Count == 0)
{
yield return new List<int>();
}
else
{
for (int i = 0; i < nodesLeft.Count; i++)
{
List<int> newNodesLeft = new List<int>(nodesLeft);
newNodesLeft.removeAt(i);

foreach (List<int> subPermutation in nextPermutation(newNodesLeft)
{
subPermutation.add(nodesLeft[i]);
yield return subPermutation;
}
}
}
}

void main()
{
foreach (List<int> permutation in nextPermutation(new List<int>(new int[]{1,2,3,4,5}))) {
//every permutation of [1,2,3,4,5] will be generated here
//this will take O(n!) to complete, where n is the number of nodes given (5 in this case)
}
}
``````
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Thanks !! My code changed based on your advise !! – Mani Kandan Feb 5 '12 at 8:48
No problem. Don't forget to click the very good sign on the side if you haven't already. – mtanti Feb 5 '12 at 10:12

If recursion is allowed then:

``````void loop(int n)
{
if(n == 1)
return; // the program gets here exactly n! times

for(int i=0; i<n; i++)
loop(n-1);
}
``````
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If we're on the same page here... I think that would look like..
`Tau(fetch) + Tau(store) + (2Tau(fetch) + Tau(<) )*(N + 1) + (2Tau(fetch) + Tau(+) + Tau(store)) * N`

-
``````fact = 1;
for( c = 1 ; c <= n ; c++ )
{
fact = fact*c;
}
``````

like this?

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Without any statements inside for loop....just using nested for loop.. – Mani Kandan Feb 5 '12 at 6:32