I know that the total number of permutations for a given base is the factorial... so the total number of permutations of "abc" is `3!`

or `3x2x1`

or `6`

.

Obviously I'm not sure of the terminology to properly phrase my question, but I would like to find the highest numbered permutation before the "length" of it's representation increases to X characters.

For example, Using a Base 62 'alphabet', I can represent integers up to 238327 before the representation uses 4 characters instead of 3. I'd like to know the math behind finding this out, given arbitrary values for Base and Length of representation.

Essentially, "using Base-X, how high can I count using Y characters?".