The k-Tribonacci Matrix and the Pascal Matrix

Sri Gemawati; Musraini Musraini; Mirfaturiqa Mirfaturiqa

doi:10.37905/jjom.v6i1.24131

Jambura Journal of Mathematics (Feb 2024)

The k-Tribonacci Matrix and the Pascal Matrix

Sri Gemawati,
Musraini Musraini,
Mirfaturiqa Mirfaturiqa

Affiliations

Sri Gemawati: Universitas Riau
Musraini Musraini: Universitas Riau
Mirfaturiqa Mirfaturiqa: Sekolah Tinggi Teknologi Pekanbaru

DOI: https://doi.org/10.37905/jjom.v6i1.24131
Journal volume & issue: Vol. 6, no. 1
pp. 125 – 130

Abstract

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This article discusses the relationship between the k-Tribonacci matrix Tn(k) and the Pascal matrix Pn, by first constructing the k-Tribonacci matrix and then looking for its inverse. From the inverse k-Tribonacci matrix, unique characteristics can be constructed so that general shapes can be constructed, and then from the relationship of the k-Tribonacci matrix Tn(k) and the Pascal matrix Pn obtain a new matrix, i.e. Un(k). Furthermore, a factor is derived from the relationship of the k-Tribonacci matrix Tn(k) and the Pascal matrix Pn i.e. Pn = Tn(k)Un(k).

Published in Jambura Journal of Mathematics

ISSN: 2654-5616 (Print); 2656-1344 (Online)
Publisher: Department of Mathematics, Universitas Negeri Gorontalo
Country of publisher: Indonesia
LCC subjects: Science: Mathematics
Website: https://ejurnal.ung.ac.id/index.php/jjom/index

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