C is a cube with no repeat digits.
F, a pandigital fifth power, is a scramble of the concatenation of the digits of S and C.
F does have repeat digits, but there are no digits which appear in F more than twice.
None of S, C, or F can end in zero.
F is the smallest pandigital fifth power that meets these conditions.
There are several (S,C) pairs that work with this F.
Find F and list all of the (S,C) pairs (there are less than 10)
