%D8%B1%D9%82%D9%85_%D8%A8%D9%8A%D9%84%E0%A6%AA%E0%A7%87%E0%A6%B2_%E0%A6%B0%E0%A6%BE%E0%A6%B6%E0%A6%BF%E0%A6%AE%E0%A6%BE%E0%A6%B2%E0%A6%BEPell-Folge%CE%91%CF%81%CE%B9%CE%B8%CE%BC%CE%BF%CE%AF_%CF%84%CE%BF%CF%85_%CE%A0%CE%B5%CE%BBPell_numberN%C3%BAmero_de_PellSuite_de_PellN%C3%BAmero_de_Pell%D7%A1%D7%93%D7%A8%D7%AA_%D7%A4%D7%9C%D5%8A%D5%A5%D5%AC%D5%AB_%D5%A9%D5%AB%D5%BE%E3%83%9A%E3%83%AB%E6%95%B0%ED%8E%A0_%EC%88%98PellgetalLiczby_Pella%D0%A7%D0%B8%D1%81%D0%BB%D0%BE_%D0%9F%D0%B5%D0%BB%D0%BB%D1%8F%D0%9F%D0%B5%D0%BB_%D0%B1%D1%80%D0%BE%D1%98%D0%A7%D0%B8%D1%81%D0%BB%D0%BE_%D0%9F%D0%B5%D0%BB%D0%BB%D1%8FQ1386491%E4%BD%A9%E7%88%BE%E6%95%B8%E4%BD%A9%E5%B0%94%E6%95%B0
about
description
denominator of close rational approximation to the square root of 2
@en
denominator of close rational approximation to the square root of 2
@en-ca
denominator of close rational approximation to the square root of 2
@en-gb
la entjera vico difinita per P₀ = 0, P₁ = 1, kaj Pᵢ₊₂ = 2Pᵢ₊₁ + Pᵢ
@eo
name
Liczby Pella
@pl
Número de Pell
@gl
Pell number
@en
Pell number
@en-ca
Pell number
@en-gb
Pell-Folge
@de
Pell-Folge
@de-ch
Pellgetal
@nl
nombre de Pell
@fr
nombro de Pell
@eo
type
label
Liczby Pella
@pl
Número de Pell
@gl
Pell number
@en
Pell number
@en-ca
Pell number
@en-gb
Pell-Folge
@de
Pell-Folge
@de-ch
Pellgetal
@nl
nombre de Pell
@fr
nombro de Pell
@eo
altLabel
numero de Pell
@es
prefLabel
Liczby Pella
@pl
Número de Pell
@gl
Pell number
@en
Pell number
@en-ca
Pell number
@en-gb
Pell-Folge
@de
Pell-Folge
@de-ch
Pellgetal
@nl
nombre de Pell
@fr
nombro de Pell
@eo
P2581
P6366
P646
P138
P2534
<math xmlns="http://www.w3.org ...... tation>
</semantics>
</math>
P2581
P279
P2812
PellNumber