A332151 -id:A332151 - cp's OEIS frontend

A332150 a(n) = 5(10^(2n+1)-1)/9 - 510^n.

0, 505, 55055, 5550555, 555505555, 55555055555, 5555550555555, 555555505555555, 55555555055555555, 5555555550555555555, 555555555505555555555, 55555555555055555555555, 5555555555550555555555555, 555555555555505555555555555, 55555555555555055555555555555, 5555555555555550555555555555555

Offset: 0

M. F. Hasler, Feb 09 2020

Index entries for linear recurrences with constant coefficients, signature (111,-1110,1000).

Cf. A002275 (repunits R_n = (10^n-1)/9), A002279 (5*R_n), A011557 (10^n).
Cf. A138148 (cyclops numbers with binary digits), A002113 (palindromes).
Cf. A332120 .. A332190 (variants with different repeated digit 2, ..., 9).
Cf. A332151 .. A332159 (variants with different middle digit 1, ..., 9).

A332150 := n -> 5*((10^(2*n+1)-1)/9-10^n);

Array[5 ((10^(2 # + 1)-1)/9 - 10^#) &, 15, 0]
Table[With[{c=PadRight[{},n,5]},FromDigits[Join[c,{0},c]]],{n,0,15}] (* or *) LinearRecurrence[{111,-1110,1000},{0,505,55055},20] (* Harvey P. Dale, Jun 30 2025 *)

apply( {A332150(n)=(10^(n*2+1)\9-10^n)*5}, [0..15])

def A332150(n): return (10**(n*2+1)//9-10**n)*5

a(n) = 5*A138148(n) = A002279(2n+1) - 5*10^n.
G.f.: 5*x*(101 - 200*x)/((1 - x)(1 - 10*x)(1 - 100*x)).
a(n) = 111*a(n-1) - 1110*a(n-2) + 1000*a(n-3) for n > 2.

cp's OEIS Frontend

A332150 a(n) = 5(10^(2n+1)-1)/9 - 510^n.

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cp's OEIS Frontend

A332150 a(n) = 5*(10^(2n+1)-1)/9 - 5*10^n.

Views

Author

Keywords

Links

Crossrefs

Programs

Maple

Mathematica

PARI

Python

Formula

A332150 a(n) = 5(10^(2n+1)-1)/9 - 510^n.