Congruence speed of tetration bases ending with 0

Abstract

For every non-negative integer a and positive integer b, the congruence speed of the tetration ba is the difference between the number of the rightmost digits of ba that are the same as those of b+1a and the number of the rightmost digits of b-1a that are the same as those of ba. In the decimal numeral system, if the given base a is not a multiple of 10, as b:=b(a) becomes sufficiently large, we know that the value of the congruence speed does not depend on b anymore, otherwise the number of the new rightmost zeros of ba drastically increases for any unit increment of b and, for this reason, we have not previously described the congruence speed of a when it is a multiple of 10. This short note fills the gap by giving the formula for the congruence speed of the mentioned values of a at any given height of the hyperexponent.