What is an example (in code) of a O(n!) function? It should take appropriate number of operations to run in reference to n; that is, I'm asking about time complexity.

There you go. This is probably the most trivial example of a function that runs in



One classic example is the traveling salesman problem through bruteforce search. If there are 


See the Orders of common functions section of the Big O Wikipedia article. According to the article, solving the traveling salesman problem via bruteforce search and finding the determinant with expansion by minors are both O(n!). 


Finding the determinant with expansion by minors. Very good explanation here.
Code from here. You will also find the necessary 


I think I'm a bit late, but I find snailsort to be the best example of O(n!) deterministic algorithm. It basically finds the next permutation of an array until it sorts it. It looks like this:



There are problems, that are Some



the simplest example :) pseudocode:
there you go :) As a real example  what about generating all the permutations of a set of items? 


In Wikipedia Solving the traveling salesman problem via bruteforce search; finding the determinant with expansion by minors. http://en.wikipedia.org/wiki/Big_O_notation#Orders_of_common_functions 


Any algorithm that calculates all permutation of a given array is O(N!). 


Yes, this is O(n!). If you think it is not, I suggest you read the definition of BigOh. I only added this answer because of the annoying habit people have to always use BigOh irrespective of what they actually mean. For instance, I am pretty sure the question intended to ask Theta(n!), at least cn! steps and no more than Cn! steps for some constants c, C > 0, but chose to use O(n!) instead. Another instance: 


In C# Wouldn't this be O(N!) in space complexity? because, string in C# is immutable.



Bogosort is the only "official" one I've encountered that ventures into the O(n!) area. But it's not a guaranteed O(n!) as it's random in nature. 


The recursive method you probably learned for taking the determinant of a matrix (if you took linear algebra) takes O(n!) time. Though I dont particularly feel like coding that all up. 

