**Q1 -** At the following double-nested loop what will be the final value in `m`

if loop does for `n`

.
Of course it is not desired to do loop and see what the `m`

is! Since `n`

can be very large!

m = 0 for i = 1 to n-2 for j = i+1,n-1 for k = j+1,n m += 1

**Q2 -** How did you find the answer? I mean what was the algorithm/technique that you used to solve the problem?

**Q3 -** What are your recommendation to solve similar problems?

Here is the answer that I was looking for:

**Answer:**

def ntn(n,k): """returns the number of iterations for k nested dependent loops(n)""" return long(np.prod(n-np.arange(k,dtype=float)) / np.prod(np.arange(k,dtype=float)+1))

**example:**

>>> ntn(1000,4) 41417124750L >>> ntn(1e20,3) 166666666666666650797607483335462097315368077619447843520512L

`sum(1 ≤ i ≤ n-2) sum(i+1 ≤ j ≤ n-1) sum(j+1 ≤ k ≤ n) 1`

. Next step is to consult your favorite discrete mathematics textbook. First recommendation for solving similar problems is to show up for your professor's office hours. – Raymond Chen Oct 31 '11 at 2:49