UVa 10497 - Sweet Child Makes Trouble

Summary
This is a derangement problem. Standard combinatorics problem - hard part is finding the recurrence.

Explanation
Given n arrangements, we can look at it in the following way: 1 2 3 4 5 ... n all in their original permutation. So how many ways are there to solve it?

There are two cases, looking at any one particular element:
 * 1) Swap this element with another element $$n - 1$$ ways to do that, and take care of two elements.
 * 2) Put another element in this location.  There are $$n - 1$$ elements for that.

In the first scenario, and since there are $$n - 1$$ ways, and it takes care of two elements, $$f( n ) = ( n - 1 ) f( n - 2 )$$. In the second scenario, only that element is taken care of, so $$f( n ) = ( n - 1 ) f( n - 1 )$$. Now sum the two scenarios, and you have $$f( n ) = ( n - 1 ) ( f( n - 1 ) + f( n - 2 ) )$$.

Gotchas

 * Use BigNum. For $$N = 800$$ the answer is huge.

Input
2 3 4 5 20 -1

Output
1 2 9 44 895014631192902121