1,9

a(n) mod 2 = 1 - A014578(n). [From Reinhard Zumkeller (reinhard.zumkeller(AT)gmail.com), Oct 04 2008]

K. Atanassov, On the 61-st, 62-nd and the 63-rd Smarandache Problems, Notes on Number Theory and Discrete Mathematics, Sophia, Bulgaria, Vol. 4 (1998), No. 4, 175-182.

K. Atanassov, On Some of Smarandache's Problems, American Research Press, 1999, 16-21.

F. Q. Gouvea, p-Adic Numbers, Springer-Verlag, 1993; see p. 23.

F. Smarandache, Only Problems, not Solutions!, Xiquan Publ., Phoenix-Chicago, 1993.

M. Vassilev-Missana and K. Atanassov, Some Representations related to n!, Notes on Number Theory and Discrete Mathematics, Vol. 4 (1998), No. 4, 148-153.

T. D. Noe, Table of n, a(n) for n=1..1000

K. Atanassov, On Some of Smarandache's Problems

M. L. Perez et al., eds., Smarandache Notions Journal

F. Smarandache, Only Problems, Not Solutions!.

a(n) = if n > 0 modulo 3 then 0 else 1 + a(n/3). - Reinhard Zumkeller (reinhard.zumkeller(AT)gmail.com), Aug 12 2001

a(n)=A051064(n)-1. G.f.: Sum(k>=1, x^3^k/(1-x^3^k)))). - Ralf Stephan (ralf(AT)ark.in-berlin.de), Apr 12 2002

Fixed point of the morphism : 0 -> 001; 1 -> 002; 2 -> 003; 3 -> 004; 4 -> 005; etc...; starting from a(1) = 0. - DELEHAM Philippe (kolotoko(AT)wanadoo.fr), Mar 29 2004

Totally additive with a(p) = 1 if p = 3, 0 otherwise.

A007949 := proc(n) option remember; if n mod 3 > 0 then 0 else A007949(n/3)+1; fi; end;

p=3; Array[ If[ Mod[ #, p ]==0, Select[ FactorInteger[ # ], Function[ q, q[ [ 1 ] ]==p ], 1 ][ [ 1, 2 ] ], 0 ]&, 81 ]

Nest[ Function[ l, {Flatten[(l /. {0 -> {0, 0, 1}, 1 -> {0, 0, 2}, 2 -> {0, 0, 3}, 3 -> {0, 0, 4}}) ]}], {0}, 5] (from Robert G. Wilson v Mar 03 2005)

(PARI) a(n)=valuation(n, 3)

Partial sums give A054861. Cf. A080278, A001511.

Cf. A122841, A007814, A112765.

Sequence in context: A016380 A015692 A016232 this_sequence A078595 A078128 A112607

Adjacent sequences: A007946 A007947 A007948 this_sequence A007950 A007951 A007952

nonn,easy

R. Muller