AI Chat Paper
Note: Please note that the following content is generated by AMiner AI. SciOpen does not take any responsibility related to this content.
{{lang === 'zh_CN' ? '文章概述' : 'Summary'}}
{{lang === 'en_US' ? '中' : 'Eng'}}
Chat more with AI
PDF (282.4 KB)
Collect
Submit Manuscript AI Chat Paper
Show Outline
Outline
Show full outline
Hide outline
Outline
Show full outline
Hide outline
Research Article | Open Access

A new approach to Leonardo number sequences with the dual vector and dual angle representation

Faik Babadağ1( )Ali Atasoy2
Department of Mathematics, Kırıkkale University, 71450, Yahşihan, Kırıkkale, Turkey
Keskin Vocational School, Kırıkkale University, 71800, Keskin, Kırıkkale, Turkey
Show Author Information

Abstract

In this paper, we introduce dual numbers with components including Leonardo number sequences. This novel approach facilitates our understanding of dual numbers and properties of Leonardo sequences. We also investigate fundamental properties and identities associated with Leonardo number sequences, such as Binet's formula and Catalan's, Cassini's and D'ocagne's identities. Furthermore, we also introduce a dual vector with components including Leonardo number sequences and dual angles. This extension not only deepens our understanding of dual numbers, it also highlights the interconnectedness between numerical sequences and geometric concepts. In the future it would be valuable to replicate a similar exploration and development of our findings on dual numbers with Leonardo number sequences.

CLC number: 05A15, 11B37, 11B39

References

【1】
【1】
 
 
AIMS Mathematics
Pages 14062-14074

{{item.num}}

Comments on this article

Go to comment

< Back to all reports

Review Status: {{reviewData.commendedNum}} Commended , {{reviewData.revisionRequiredNum}} Revision Required , {{reviewData.notCommendedNum}} Not Commended Under Peer Review

Review Comment

Close
Close
Cite this article:
Babadağ F, Atasoy A. A new approach to Leonardo number sequences with the dual vector and dual angle representation. AIMS Mathematics, 2024, 9(6): 14062-14074. https://doi.org/10.3934/math.2024684

422

Views

19

Downloads

2

Crossref

1

Web of Science

1

Scopus

Received: 25 February 2024
Revised: 29 March 2024
Accepted: 08 April 2024
Published: 18 April 2024
©2024 the Author(s), licensee AIMS Press.

This is an open access article distributed under the terms of the Creative Commons Attribution License (https://creativecommons.org/licenses/by/4.0)