@raj Check out the documentation. This may either solve your problem chriswarrick.com/blog/2014/09/15/… or give you the search terms you need to find the solution
Ah, ok. I'm glad it has if end**2 == n: result -= 1; I was wondering how it handled perfect squares. :)
A better algorithm for large n is to find the prime factorization of n and calculate the number of divisors from that. I'll illustrate the method for a number with 3 different prime factors. If n = p**a * q**b * r**c, where (p,q,r) are prime, then there are (a+1)*(b+1)*(c+1) numbers that divide n.
to comment that some time ago the room appeared to have become less relaxed and less tolerant, so I stopped coming by. Any RO wishing to engage about this can contact me as steve@holdenweb.com, but it's not really a big deal.