

A280445


Consider a number k and all the possible concatenations of the form k = concat(a,b), with a>0. Take the sum of the products of all the pairs a and b, j = Sum{a*b}. Sequence lists the numbers for which j/k is an integer and produce a new record.


2




OFFSET

1,1


COMMENTS

The ratios for a(1)a(5) are 1, 2, 3, 4, and 7, respectively. a(6) > 10^13.  Giovanni Resta, Jan 05 2017


LINKS

Table of n, a(n) for n=1..5.


EXAMPLE

655 = concat(6,55) = concat(65,5) and (6*55 + 65*5)/655 = 1;
5848 = concat(5,848) = concat(58,48) = concat(584,8) and (5*848 + 58*48 + 584*8)/5848 = 2; etc.


MAPLE

P:=proc(q) local a, j, k, n; j:=0; for n from 1 to q do a:=0;
for k from 1 to ilog10(n) do a:=a+(n mod 10^k)*trunc(n/10^k); od;
if type(a/n, integer) then if a/n>j then j:=a/n; print(n); fi; fi; od; end: P(10^9);


CROSSREFS

Cf. A280446, A280447.
Sequence in context: A250158 A265737 A065759 * A220057 A194653 A252671
Adjacent sequences: A280442 A280443 A280444 * A280446 A280447 A280448


KEYWORD

nonn,base,more


AUTHOR

Paolo P. Lava, Jan 03 2017


EXTENSIONS

a(5) from Giovanni Resta, Jan 05 2017


STATUS

approved



