Search: id:A001599 Results 1-1 of 1 results found. %I A001599 M4185 N1743 %S A001599 1,6,28,140,270,496,672,1638,2970,6200,8128,8190,18600,18620,27846,30240, %T A001599 32760,55860,105664,117800,167400,173600,237510,242060,332640,360360, %U A001599 539400,695520,726180,753480,950976,1089270,1421280,1539720 %N A001599 Harmonic or Ore numbers: numbers n such that harmonic mean of divisors of n is an integer. %C A001599 Note that the harmonic mean of the divisors of n = n*tau(n)/sigma(n). %C A001599 Equivalently, n*tau(n)/sigma(n) is an integer, where tau(n) (A000005) is the number of divisors of n and sigma(n) is the sum of the divisors of n (A000203). %C A001599 Equivalently, the average of the divisors of n divides n. %C A001599 Ore showed that every perfect number (A000396) is harmonic. The converse does not hold: 140 is harmonic but not perfect. Ore conjectured that 1 is the only odd harmonic number. %C A001599 Other example of power mean numbers n such that power mean of divisors of n is an integer are RMS numbers A140480. [From Ctibor O.Zizka (c.zizka(AT)email.cz), Sep 20 2008] %D A001599 N. J. A. Sloane and Simon Plouffe, The Encyclopedia of Integer Sequences, Academic Press, 1995 (includes this sequence). %D A001599 N. J. A. Sloane, A Handbook of Integer Sequences, Academic Press, 1973 (includes this sequence). %D A001599 G. L. Cohen and Deng Moujie, On a generalization of Ore's harmonic numbers, Nieuw Arch. Wisk. (4), 16 (1998) 161-172. %D A001599 G. L. Cohen and R. M. Sorli, Harmonic seeds, Fibonacci Quart., 36 (1998) 386-390; errata, 39 (2001) 4. %D A001599 M. Garcia, On numbers with integral harmonic mean. Amer. Math. Monthly 61, (1954). 89-96. %D A001599 T. Goto and S. Shibata, All numbers whose positive divisors have integral harmonic mean up to 300, Math. Comput. 73 (2004), 475-491. %D A001599 R. K. Guy, Unsolved Problems in Number Theory, B2. %D A001599 H.-J. Kanold, Uber das harmonische Mittel der Teiler einer natuerlichen Zahl, Math. Ann., 133 (1957) 371-374. %D A001599 W. H. Mills, On a conjecture of Ore, Proc. Number Theory Conf., Boulder CO, 1972, 142-146. %D A001599 O. Ore, On the averages of the divisors of a number, Amer. Math. Monthly, 55 (1948), 615-619. %D A001599 Carl Pomerance, On a problem of Ore: Harmonic numbers (unpublished typescript); see Abstract *709-A5, Notices Amer. Math. Soc., 20 (1973) Abstract A-648. %D A001599 Andreas and Eleni Zachariou, Perfect, semi-perfect and Ore numbers, Bull. Soc. Math. Grece (N.S.), 13 (1972) 12-22. %H A001599 T. D. Noe and Klaus Brockhaus, Table of n, a(n) for n=1..170 %H A001599 Takeshi Goto, All harmonic numbers less than 10^14 %H A001599 Takeshi Goto, Table of a(n) for n=1..937 %H A001599 Eric Weisstein's World of Mathematics, Harmonic Divisor Number %e A001599 n=140 has Sigma[ 0,140 ]=12 divisors with Sigma[ 1,140 ]=336. Average divisor is 336/12=28, an integer and divides n: n=5*28. n=496, Sigma[ 0,496 ]=10, Sigma[ 1,496 ]=992: average divisor 99.2 is not an integer, but n/(Sigma_1/Sigma_0)=496/99.2=5 is an integer. %t A001599 Do[ If[ IntegerQ[ n*DivisorSigma[0, n]/ DivisorSigma[1, n]], Print[n]], {n, 1, 1550000}] %o A001599 (PARI) a(n)=if(n<0,0,n=a(n-1);until(0==(sigma(n,0)*n)%sigma(n,1),n++); n) - Michael Somos Feb 06 2004 %Y A001599 See A003601 for analogues referring to arithmetic mean and A000290 for geometric mean of divisors. %Y A001599 See A001600 and A090240 for the integer values obtained. %Y A001599 sigma_0(n) (or tau(n)) is the number of divisors of n (A000005). %Y A001599 sigma_1(n) (or sigma(n)) is the sum of the divisors of n (A000203). %Y A001599 Cf. A007340, A090945, A035527, A007691, A074247, A053783. Not a subset of A003601. %Y A001599 Sequence in context: A084778 A155588 A108051 this_sequence A074247 A053783 A110047 %Y A001599 Adjacent sequences: A001596 A001597 A001598 this_sequence A001600 A001601 A001602 %K A001599 nonn,nice %O A001599 1,2 %A A001599 N. J. A. Sloane (njas(AT)research.att.com). %E A001599 More terms from Klaus Brockhaus (klaus-brockhaus(AT)t-online.de), Sep 18 2001 Search completed in 0.002 seconds