Search: id:A006577 Results 1-1 of 1 results found. %I A006577 M4323 %S A006577 0,1,7,2,5,8,16,3,19,6,14,9,9,17,17,4,12,20,20,7,7,15,15,10,23,10,111, %T A006577 18,18,18,106,5,26,13,13,21,21,21,34,8,109,8,29,16,16,16,104,11,24,24, %U A006577 24,11,11,112,112,19,32,19,32,19,19,107,107,6,27,27,27,14,14,14,102,22 %N A006577 Number of halving and tripling steps to reach 1 in `3x+1' problem. %C A006577 The 3x+1 or Collatz problem is as follows: start with any number n. If n is even, divide it by 2, otherwise multiply it by 3 and add 1. Do we always reach 1? This is a famous unsolved problem. It is conjectured that the answer is yes. %C A006577 a(n) = A112695(n) + 2 for n > 2. - Reinhard Zumkeller (reinhard.zumkeller(AT)gmail.com), Apr 18 2008 %D A006577 R. K. Guy, Unsolved Problems in Number Theory, E16. %D A006577 J. L. Simons, On the nonexistence of 2-cycles for the 3x+1 problem, Math. Comp. 75 (2005), 1565-1572. %D A006577 N. J. A. Sloane and Simon Plouffe, The Encyclopedia of Integer Sequences, Academic Press, 1995 (includes this sequence). %H A006577 N. J. A. Sloane, Table of n, a(n) for n = 1..10000 %H A006577 Geometry.net, Links on Collatz Problem %H A006577 Jason Holt, Log-log plot of first billion terms %H A006577 Jason Holt, Plot of 1 billion values of the number of steps to drop below n (A060445), log scale on x axis %H A006577 Jason Holt, Plot of 10 billion values of the number of steps to drop below n (A060445), log scale on x axis %H A006577 A. Krowne, PlanetMath.org, Collatz problem %H A006577 J. C. Lagarias, The 3x+1 problem and its generalizations, Amer. Math. Monthly, 92 (1985), 3-23. %H A006577 J. C. Lagarias, How random are 3x+1 function iterates?, in The Mathemagician and the Pied Puzzler - A Collection in Tribute to Martin Gardner, Ed. E. R. Berlekamp and T. Rogers, A. K. Peters, 1999, pp. 253-266. %H A006577 Mathematical BBS, Biblography on Collatz Sequence %H A006577 P. Picart, Algorithme de Collatz et conjecture de Syracuse %H A006577 E. Roosendaal, On the 3x+1 problem %H A006577 G. Villemin's Almanach of Numbers, Cycle of Syracuse %H A006577 Eric Weisstein's World of Mathematics, Collatz Problem %H A006577 Wikipedia, Collatz Conjecture %H A006577 Index entries for sequences related to 3x+1 (or Collatz) problem %F A006577 a(n) = A006666(n) + A006667(n) %e A006577 a(5)=5 because the trajectory of 5 is (5,16,8,4,2,1). %o A006577 (PARI) a(n)=if(n<0,0,s=n; c=0; while(s>1,s=if(s%2,3*s+1,s/2); c++); c) %Y A006577 See A070165 for triangle giving trajectories of n = 1, 2, 3, .... %Y A006577 Cf. A125731, A127885, A127886, A008908, A112695. %Y A006577 A008884, A161021 ,A161022, A161023. [From Reinhard Zumkeller (reinhard.zumkeller(AT)gmail.com), Jun 03 2009] %Y A006577 Sequence in context: A074457 A072761 A127885 this_sequence A073652 A117029 A128475 %Y A006577 Adjacent sequences: A006574 A006575 A006576 this_sequence A006578 A006579 A006580 %K A006577 nonn,nice,easy %O A006577 1,3 %A A006577 N. J. A. Sloane (njas(AT)research.att.com), R. W. Gosper %E A006577 More terms from Larry Reeves (larryr(AT)acm.org), Apr 27 2001 Search completed in 0.002 seconds