Inverse Matrix RSLPFLcircfr (0,1/b,0) of Order 3×3 to the Power of Positive Integer Using Adjoin Method

Authors

  • Ade Novia Rahma UIN Sultan Syarif Kasim Riau
  • Velyn Wulanda UIN Sultan Syarif Kasim Riau
  • Rahmawati Rahmawati UIN Sultan Syarif Kasim Riau
  • Corry Corazon Marzuki UIN Sultan Syarif Kasim Riau

DOI:

https://doi.org/10.15575/kubik.v8i2.25517

Keywords:

Keywords, Inverse, Adjoin Methods, RSLPFLcircfr.

Abstract

The matrix RSLPFLcircfr  is a particular form of the circular matrix RSLPFLcircfr . This study aims to determine the general form of the inverse matrix RSLPFLcircfr  to the power of positive integers. This research begins by determining the general form of the power of the matrix RSLPFLcircfr  which is then proven by using mathematical induction. Next, predicting the determinant of the power of the matrix RSLPFLcircfr which is then continued by proving the form generalization of the determinant of the power of the matrix RSLPFLcircfr by direct proof using cofactor expansion. Furthermore, by determining the cofactor matrix of the power of the matrix RSLPFLcircfr  we will obtain the inverse of the matrix to the power of the matrix RSLPFLcircfr  using the adjoin method.

References

[1] Kannan, K. ., Elumalai, N., & Kavitha, M. (2018). On s-normal Circulant and con-s-normal Circulant Matrices. International Journal of Scientific Research in Mathematical and Statistical Sciences.

[2] Jiang, X., & Hong, K. (2014). Exact determinants of some special circulant matrices involving four kinds of famous numbers. Abstract and Applied Analysis, 2014.

[3] Olson,Brian J.Shaw.et.al.(2014).Circulant matrices and their application to vibration analysis.Journal Applied Mechanics Reviews,66(4)

[4] Iang, Zhao Lin&Xu, Zong Ben.(2005)."Efficient algorithm for finding the inverse and the group inverse of FLS r-circulant matrix". Journal of Applied Mathematics and Computing,18.45-57.

[5] Pillai,T.Dhashna.,C.T.Briji.(2020).†A Study on Circulant Matrices and its Application in Solving Polynomial Equations and Data Smoothingâ€.International Journal of Mathematics Trends and Technology(IJMTT).66(6).

[6] Davis, & Philip, J. (1979). Circulan Matrices. Division of Applied Mathematics Brown University New York.

[7] N.Yogeesh.(2016).†A Study of Solving Linear System of Equations by GAUSS-JORDAN Matrix Method-An Algorithmic Approachâ€.Jetir.3(5).

[8] Amalia,H.I.,Noviani,E.(2021).â€Invers Matriks Dengan Menggunakan Metode Faddeev Dan Algoritma Leverrier-Faddeevâ€.Buletin Ilmiah Matematika Statistika dan Terapannya(Bimaster).10(4),417-426.

[9] Kurniadi,Edi.(2021).â€Dekomposisi dan Sifat Matriks Struktur Pada Aljabar Lie Frobenius Berdimensi 4â€.Seminar Nasional Riset dan Pengabdian ke lll.

[10] Putra,E.K,F.Aryani.(2017).Invers Matriks Positif Menggunakan Metode Adjoin. Jurnal Sains Matematika Dan Statistik,3(1).

[11] C.C.Marzuki,F.Aryani.(2019).Invers Matriks Toeplitz Bentuk Khusus Menggunakan Metode Adjoin. Jurnal Sains Matematika Dan Statistika.5(1).

[12] Rahmawati, Fitri, N., & Rahma, A. N. (2020). Invers Matriks RSFPLRcircfr (0,b,...,b). Jurnal Sains Matematika Dan Statistika, 6(1), 113–121.

[13] Aqilah, Z. (2020). Invers Matriks Hankel Bentuk Khusus Ordo Berpangkat Bilangan Bulat Positif Menggunakan Adjoin. Skripsi Universitas Islam Negeri Sultan Syarif Kasim Riau.

[14] Jauzah, S. M. (2022). Invers Matriks Toeplitz Bentuk Khusus Ordo 4×4 Berpangkat Bilangan Bulat Positif Menggunakan Adjoin. Skripsi Universitas Islam Negeri Sultan Syarif Kasim Riau.

[15] Rinaldi, M. (2012). Matematika Diskrit (Revisi Kel). Informatika.

[16] K. H. Rosen, Discrete Mathematics and Its Applications. New York: Mc Graw Hill, 2007

[17] Anton, H., & Chris, R. (2004). Aljabar Linear Elementer (Kedelapan). Erlangga.

Downloads

Published

2023-09-28

Issue

Vol. 8 No. 2 (2023): KUBIK: Jurnal Publikasi Ilmiah Matematika

Section

Articles

License

Authors who publish in KUBIK: Jurnal Publikasi Ilmiah Matematika agree to the following terms:

  1. Authors retain copyright and grant the journal right of first publication with the work simultaneously licensed under a Attribution-ShareAlike 4.0 International (CC BY-SA 4.0) License that allows others to share the work with an acknowledgment of the work's authorship and initial publication in this journal.
  2. Authors are able to enter into separate, additional contractual arrangements for the non-exclusive distribution of the journal's published version of the work (e.g., post it to an institutional repository or publish it in a book), with an acknowledgment of its initial publication in this journal.
  3. Authors are permitted and encouraged to post their work online (e.g., in institutional repositories or on their website) prior to and during the submission process, as it can lead to productive exchanges, as well as earlier and greater citation of published work (See The Effect of Open Access).

 

Â