10^40 has 41*41 integers that can divide it, because the integers can be 2^(0 to 40)*5^(0 to 40).  Similarly, 20^30 has 61*31 integers that can divide it.

To get rid of the ones counted twice, I find the GFC of the two, which is 2^40*5^30.  The number of integers that divide this is 41*31.

So the total number of integers that divide at least one is 41*41+61*31-41*31=1681+620=2301