0,1

Ruling out finitely many exceptional terms, this sequence differs by a constant from several related enumerations with a slightly more complicated structure (fourth-order linear recurrence):

For n>0, A141221(n)=a(n)-1. For n>2, A141384(n)=a(n)+1.

G. P. Michon, Silent Prisms: A Screaming Game for Short-Sighted People.

Recurrence: a(n+3) = 7*a(n+2)-9*a(n+1)+a(n)

Generating function: (3-14x+9x^2)/(1-7x+9x^2-x^3)

Formula: a(n) = A^n + B^n + C^n

where, putting u = atan(sqrt(5319)/73), we have:

A = 5.3538557854308282... = (7+2*srqt(22)*cos(u/3))/3

B = 1.5235479602692093... = (7-sqrt(22)*cos(u/3)+sqrt(66)*sin(u/3))/3

C = 0.1225962542999624... = (7-sqrt(22)*cos(u/3)-sqrt(66)*sin(u/3))/3

a(0) = 3 = A^0+B^0+C^0

a(1) = 7 = A+B+C

Cf. A141221, A141384.

Adjacent sequences: A141382 A141383 A141384 this_sequence A141386 A141387 A141388

Sequence in context: A000644 A015459 A115083 this_sequence A059296 A123332 A051342

easy,nice,nonn

Gerard P. Michon (g.michon(AT)att.net), Jul 02 2008, Jul 23 2008