How do you determine that: 2^100 x 3^100 is divisible by 5,159,780,352? Thanks for help.
5,159,780,352 factors as 2^18 * 3^9
So
[ 2 ^100 * 3^100] / [ 2^18 * 3^9] = 2^[100 - 18] * 3^[ 100 - 9] = 2^82 * 3^91 which is a [large] integer