This is a front-end for the Online Encyclopedia of Integer Sequences, made by Christian Perfect. The idea is to provide OEIS entries in non-ancient HTML, and then to think about how they're presented visually. The source code is on GitHub.
%I A321138 #21 Jan 01 2019 07:33:12 %S A321138 397912927,5449646691,7987762047,8408836868,8416865813,14311910772, %T A321138 95358760419,95359835871,119207613951,119319977811,178002991683, %U A321138 181182645587,268593608191,780359955604,781941158165,802715724229,985373000485,986970420491,1068017311927,1068025296336 %N A321138 Reduced numbers with multiplicative persistence 10 in base 14. %C A321138 Let p_14(n) be the product of the digits of n in base 14. We can define an equivalence relation DP_14 on n by n DP_14 m if and only if p_14(n) = p_14(m); the naming DP_b for the equivalence relation stands for "digits product for representation in base b". A number n is called the class representative number of class n/DP_14 if and only if p_14(n) = p_14(m), m >= n; i.e., the smallest number of that class; it is also called the reduced number. %C A321138 For any multiplicative persistence, except the multiplicative persistence 2, the set of class representative numbers with that multiplicative persistence is supposed to be finite. Each class representative number represents an infinite set of numbers with the same multiplicative persistence. %C A321138 If there exists more reduced numbers with multiplicative persistence 10, it will be larger than 14^100. %C A321138 a(1) = A321135(10). %e A321138 The number 397912927 represented in base 14, with A..D for 10..13 is 3ABBDDDD. Other numbers with the same reduced number are for instance 325BBDDDD or 13ABBDDDD; or any number obtained by permutation of the digits of those numbers. %Y A321138 Cf. A321135, A321136, A321137. %K A321138 nonn,base %O A321138 1,1 %A A321138 _A.H.M. Smeets_, Oct 28 2018