0,3

Jay Kappraff, Beyond Measure, A Guided Tour Through Nature, Myth and Number, World Scientific, 2002, p. 446.

H. Hu, Z.-W. Sun and J.-X. Liu, Reciprocal sums of second order recurrent sequences, Fib. Quart. 39(2001), no. 3, 214-220.

a(n) = a(n-1)*A001566(n-2) - Joe Keane (jgk(AT)jgk.org), May 31 2002

Sum(n>=0, 1/a(n)) = (1/2)*(7-sqrt(5)) - Benoit Cloitre (benoit7848c(AT)orange.fr), Jan 26 2003

1/phi^2 = (.6180339...)^2 = 2/(3+sqrt5) = Sum (2 through infinity) 1/a(n) = 1/3 + 1/21 + 1/987 + 1/2178309... - Gary W. Adamson (qntmpkt(AT)yahoo.com), Jun 12 2003

a(n) = (G^(2^n) - (1 - G)^(2^n))/Sqrt[5] where G = GoldenRatio = (1 + Sqrt[5])/2 [From Artur Jasinski (grafix(AT)csl.pl), Oct 05 2008]

a(n)=(4/5)^(1/2)*Cosh[(2^n)*ArcCosh[((5/4)^(1/2))]] [From Artur Jasinski (grafix(AT)csl.pl), Oct 05 2008]

Table[ Fibonacci[ 2^n ], {n, 0, 9} ]

G = (1 + Sqrt[5])/2; Table[Expand[(G^(2^n) - (1 - G)^(2^n))/Sqrt[5]], {n, 1, 7}] [From Artur Jasinski (grafix(AT)csl.pl), Oct 05 2008]

Table[Round[(4/5)^(1/2)*Cosh[2^n*ArcCosh[((5/4)^(1/2))]]], {n, 1, 10}] [From Artur Jasinski (grafix(AT)csl.pl), Oct 05 2008]

Cf. A000045, A054783, A001566.

Sequence in context: A111433 A111435 A111438 this_sequence A077260 A012110 A054739

Adjacent sequences: A058632 A058633 A058634 this_sequence A058636 A058637 A058638

nonn

Robert G. Wilson v (rgwv(AT)rgwv.com), Jan 16 2001