0,1

a(n+1)/a(n) converges to (23+sqrt(533))/2 =23.04339638... Lim a(n)/a(n+1) as n approaches infinity = 0.04339638... = 2/(23+sqrt(533)) = (sqrt(533)-23)/2. Lim a(n+1)/a(n) as n approaches infinity = 23.04339638... = (23+sqrt(533))/2 = 2/(sqrt(533)-23).

Tanya Khovanova, Recursive Sequences

Index entries for recurrences a(n) = k*a(n - 1) +/- a(n - 2)

a(n) =23a(n-1) + a(n-2), starting with a(0) = 2 and a(1) = 23. a(n) = ((23+sqrt(533))/2)^n + ((23-sqrt(533))/2)^n, (a(n))^2 =a(2n)-2 if n=1, 3, 5..., (a(n))^2 =a(2n)+2 if n=2, 4, 6....

G.f.: (2-23x)/(1-23x-x^2). [From Philippe DELEHAM (kolotoko(AT)wanadoo.fr), Nov 02 2008]

a(4)=281959= 23a(3) + a(2) = 23*12236+ 531=((23+sqrt(533))/2)^4 + ((23-sqrt(533))/2)^4 = 281958.999996453 + 0.000003546 = 281959.

Cf. A089141, A051502.

Sequence in context: A167417 A053161 A090731 this_sequence A084322 A073062 A015098

Adjacent sequences: A090311 A090312 A090313 this_sequence A090315 A090316 A090317

easy,nonn

Nikolay V. Kosinov (kosinov(AT)unitron.com.ua), Jan 25 2004

More terms from Ray Chandler (rayjchandler(AT)sbcglobal.net), Feb 14 2004