On Fibonacci Vectors

Kübra Çetinberk; Salim Yüce

EN

On Fibonacci Vectors

Öz

The purpose of this article is to study vector products of Fibonacci 3-vectors, Fibonacci 4-vectors and Fibonacci 7-vectors. To achieve this, we first describe the corresponding anti-symmetric matrix for the Fibonacci 3-vector and reconsider the vector product with the aid of this matrix. We examine certain properties of this vector product. Furthermore, we define vector products for Fibonacci 4-vectors and Fibonacci 7-vectors. We also give in the same vein the corresponding anti-symmetric matrix for Fibonacci 7-vector and redefine the vector product by using this matrix. In the final instance we investigate the Lorentzian inner products, Lorentzian vector products and Lorentzian triple scalar products for Fibonacci 3-vectors, Fibonacci 4-vectors and Fibonacci 7-vectors.

Anahtar Kelimeler

Kaynakça

[1] Atanassov, K. T. (2002). New visual perspectives on Fibonacci numbers. World Scientific.
[2] Salter, E. (2005). Fibonacci Vectors. Graduate Theses and Dissertations, University of South Florida, USA.
[3] Güven, İ. A., & Nurkan, S. K. (2015). A new approach to Fibonacci, Lucas numbers and dual vectors. Advances in Applied Clifford Algebras, 25(3), 577-590, https://doi.org/10.1007/s00006-014-0516-7.
[4] Yüce, S., & Torunbalcı Aydın, F. (2016). Generalized dual Fibonacci sequence. The International Journal of Science & Technoledge, 4(9), 193-200.
[5] Kaya, O., & Önder, M. (2018). On Fibonacci and Lucas Vectors and Quaternions. Universal Journal of Applied Mathematics, 6(5), 156-163.
[6] Knuth, D. (2008). NegaFibonacci numbers and the hyperbolic plane. In San Jose-Meeting of the Mathematical Association of America, (Vol. 5).
[7] Struyk, A. (1970). One Curiosum Leads to Another. Scripta Mathematica. 17, 230.
[8] Vajda, S. (1989). Fibonacci and Lucas Numbers, and the Golden Section: Theory and Applications. Ellis Horwood Series. Mathematics and Applications.

Ayrıntılar

Birincil Dil

İngilizce

Konular

Matematik

Bölüm

Araştırma Makalesi

Yazarlar

Kübra Çetinberk ^*
0000-0002-8811-9393
Türkiye

Salim Yüce
0000-0002-8296-6495
Türkiye

Yayımlanma Tarihi

9 Aralık 2020

Gönderilme Tarihi

30 Temmuz 2020

Kabul Tarihi

27 Ağustos 2020

Yayımlandığı Sayı

Yıl 2020 Cilt: 2 Sayı: 2

IZ

https://izlik.org/JA87RS57WZ

Kaynak Göster

RIS / Bibtex

APA

Çetinberk, K., & Yüce, S. (2020). On Fibonacci Vectors. Hagia Sophia Journal of Geometry, 2(2), 12-25. https://izlik.org/JA87RS57WZ

AMA

1.Çetinberk K, Yüce S. On Fibonacci Vectors. HSJG. 2020;2(2):12-25. https://izlik.org/JA87RS57WZ

Chicago

Çetinberk, Kübra, ve Salim Yüce. 2020. “On Fibonacci Vectors”. Hagia Sophia Journal of Geometry 2 (2): 12-25. https://izlik.org/JA87RS57WZ.

EndNote

Çetinberk K, Yüce S (01 Aralık 2020) On Fibonacci Vectors. Hagia Sophia Journal of Geometry 2 2 12–25.

IEEE

[1]K. Çetinberk ve S. Yüce, “On Fibonacci Vectors”, HSJG, c. 2, sy 2, ss. 12–25, Ara. 2020, [çevrimiçi]. Erişim adresi: https://izlik.org/JA87RS57WZ

ISNAD

Çetinberk, Kübra - Yüce, Salim. “On Fibonacci Vectors”. Hagia Sophia Journal of Geometry 2/2 (01 Aralık 2020): 12-25. https://izlik.org/JA87RS57WZ.

JAMA

1.Çetinberk K, Yüce S. On Fibonacci Vectors. HSJG. 2020;2:12–25.

MLA

Çetinberk, Kübra, ve Salim Yüce. “On Fibonacci Vectors”. Hagia Sophia Journal of Geometry, c. 2, sy 2, Aralık 2020, ss. 12-25, https://izlik.org/JA87RS57WZ.

Vancouver

1.Kübra Çetinberk, Salim Yüce. On Fibonacci Vectors. HSJG [Internet]. 01 Aralık 2020;2(2):12-25. Erişim adresi: https://izlik.org/JA87RS57WZ