A263623 - OEIS

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A263623

a(1)=1; thereafter, a(n) = smallest k such that the decimal concatenation [a(n-2)+1 a(n-2)+2, ... a(n-1)] divides the decimal concatenation [a(n-1)+1 a(n-1)+2 ... k].

1, 2, 4, 8, 36

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OFFSET

1,2

COMMENTS

a(6), if it exists, is > 10^6. - Lars Blomberg, Dec 01 2016

LINKS

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

EXAMPLE

n=3: a(3) = 4 because k=4 is the smallest number such that 2 divides the concatenation 345...k.

n=4: a(4) = 8 because k=8 is the smallest number such that 34 divides the concatenation 567...k. See A002782 for the relevant concatenations.

CROSSREFS

Cf. A002782.

Sequence in context: A094334 A138744 A243547 * A070897 A180154 A320025

Adjacent sequences: A263620 A263621 A263622 * A263624 A263625 A263626

KEYWORD

nonn,base,more

AUTHOR

N. J. A. Sloane, Oct 23 2015

STATUS

approved