A136391 -id:A136391

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A354044

a(n) = 2*(-i)^n*(n*sin(c*(n+1)) - i*sin(-c*n))/sqrt(5) where c = arccos(i/2).

+10
7

0, 2, 5, 11, 23, 45, 86, 160, 293, 529, 945, 1673, 2940, 5134, 8917, 15415, 26539, 45525, 77842, 132716, 225685, 382877, 648165, 1095121, 1846968, 3109850, 5228261, 8777315, 14716223, 24643389, 41220110, 68873848, 114964805, 191719849, 319436697, 531789785

(list; graph; refs; listen; history; text; internal format)

OFFSET

0,2

LINKS

Jianing Song, Table of n, a(n) for n = 0..1000

Peter Luschny, Illustration of A354044.

Peter Luschny, The Fibonacci Function.

Index entries for linear recurrences with constant coefficients, signature (2,1,-2,-1).

FORMULA

a(n) = [x^n] ((2 - x)*x*(x + 1))/(x^2 + x - 1)^2.

a(n) = (((-1 - sqrt(5))^(-n)*(sqrt(5)*n - n - 2) + (-1 + sqrt(5))^(-n)*(sqrt(5)*n + n + 2)))/(2^(1 - n)*sqrt(5)).

a(n) = (-1)^(n - 1)*(Fibonacci(-n) - n*Fibonacci(-n - 1)).

a(n) = (-1)^(n - 1)*A353595(-n, -n). (A353595 is defined for all n in Z.)

a(n) = ((-42*n^2 + 259*n - 350)*a(n - 3) + (123*n^2 - 76*n - 446)*a(n - 2) + (207*n^2 - 885*n + 412)*a(n - 1)) / ((165*n - 542)*(n - 1)) for n >= 4.

a(n) = Fibonacci(n) + n*Fibonacci(n+1). - Jianing Song, May 16 2022

MAPLE

c := arccos(I/2): a := n -> 2*(-I)^n*(n*sin(c*(n+1)) - I*sin(-c*n))/sqrt(5):

seq(simplify(a(n)), n = 0..35);

PROG

(Julia)

function fibrec(n::Int)

n == 0 && return (BigInt(0), BigInt(1))

a, b = fibrec(div(n, 2))

c = a * (b * 2 - a)

d = a * a + b * b

iseven(n) ? (c, d) : (d, c + d)

end

function A354044(n)

n == 0 && return BigInt(0)

a, b = fibrec(n + 1)

a*(n - 1) + b

end

println([A354044(n) for n in 0:35])

(PARI) a(n) = fibonacci(n) + n*fibonacci(n+1) \\ Jianing Song, May 16 2022

CROSSREFS

Cf. A000045 (the Fibonacci numbers), A007502, A088209, A094588, A136391, A178521, A264147, A353595.

KEYWORD

nonn,easy

AUTHOR

Peter Luschny, May 16 2022

STATUS

approved

A246715

n * Lucas(n) - (n - 1) * Lucas(n - 1).

+10
1

1, 5, 6, 16, 27, 53, 95, 173, 308, 546, 959, 1675, 2909, 5029, 8658, 14852, 25395, 43297, 73627, 124909, 211456, 357270, 602551, 1014551, 1705657, 2863493, 4800990, 8039608, 13447563, 22469261, 37505879, 62546285, 104212364, 173489994, 288593903, 479706787, 796815125, 1322659237, 2194126122, 3637574444, 6027141411, 9980945785

(list; graph; refs; listen; history; text; internal format)

OFFSET

1,2

COMMENTS

By definition, the arithmetic mean of a(1), ... a(n) is equal to L(n) and a(n) - Lucas(n) = (n - 1) * Lucas(n - 2). See A136391 for the Fibonacci case.

LINKS

Table of n, a(n) for n=1..42.

FORMULA

Recurrence: a(n + 1) = a(n) + a(n - 1) + 5*F(n - 2), n >= 2, where F = A000045. Proof: similar to A136391.

Also, a(n) = 2*a(n - 1) + a(n - 2) - 2*a(n - 3) - a(n - 4).

G.f.: x*(1 - x)*(1 + 4*x - x^2)/(1 - x - x^2)^2.

EXAMPLE

a(6) = 53 = 6*Lucas(6) - 5*Lucas(5) = 6 * 18 - 5 * 11 = 108 - 55.

a(4) = 16 = 4*Lucas(2) + Lucas(3) = 3*Lucas(2) + Lucas(4).

MAPLE

with(combinat): seq(n*(fibonacci(n-1)+fibonacci(n-3)) +fibonacci(n)+fibonacci(n-2), n=1..40).

MATHEMATICA

Table[LucasL[n]n - LucasL[n - 1](n - 1), {n, 35}] (* Alonso del Arte, Sep 02 2014 *)

PROG

(PARI) a(n) = n*(fibonacci(n-1)+fibonacci(n-3)) +fibonacci(n)+fibonacci(n-2); \\ Michel Marcus, Sep 02 2014