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http://repository.ipb.ac.id/handle/123456789/134447| Title: | Determinan dan Invers Matriks Circulant dengan Entri Barisan Fibonacci |
| Other Titles: | On Determinant and Inverse of Circulant Matrix with Fibonacci Numbers |
| Authors: | Mas'oed, Teduh Wulandari Guritman, Sugi Junior, Mochammad Dzoukkar Dudayev Nurlianto |
| Issue Date: | 2024 |
| Publisher: | IPB University |
| Abstract: | Matriks Circulant adalah matriks segi yang disusun oleh operasi pergeseran sirkular kanan, yaitu pergeseran entri terakhir ke posisi utama disertai pergeseran semua entri lainnya ke posisi berikutnya. Entri-entri dari matriks circulant dapat diisi dengan berbagai macam barisan bilangan, salah satunya bilangan Fibonacci. Pada karya ilmiah ini diformulasikan determinan dan invers matriks circulant dengan entri bilangan Fibonacci. Pembuktian formulasi determinan diperoleh dengan menggunakan operasi baris dasar sehingga ekuivalen ke matriks segitiga atas, dan nilai determinannya adalah hasil kali semua unsur diagonal matriks segitiga atas. Sedangkan formulasi invers diperoleh dengan mengadaptasi langkah pada metode sebelumnya, sehingga diperoleh A_(n)^(-1)=QD^(-1)P dengan P dan Q berturut-turut merupakan matriks yang diperoleh dari serangkaian operasi baris dasar dan operasi kolom dasar tersebut yang dikenakan pada matriks identitas I_(n). Circulant matrix is a square matrix composed by a right circulant shift operation, namely the shift of the last entry to the first position followed by the shift of all other entries to the next position. The entry of a circulant matrix can be filled by any sequences of numbers, one of which is the Fibonacci numbers sequence. In this research, the determinants and the inverses of circulant matrix are formulated with Fibonacci numbers of entries. The proof of the determinant formulation is obtained using elementary row operation that it is equivalent to upper triangular matrix, and the determinant value is the product of all the diagonal. While the inverse formulation is obtained by adapting the previous method, then we obtain A_(n)^(-1)=QD^(-1)P where P and Q are matrices of a series of elementary row operation and elementary column operation performed previously applied to identity matrix I_(n). |
| URI: | http://repository.ipb.ac.id/handle/123456789/134447 |
| Appears in Collections: | UT - Mathematics |
Files in This Item:
| File | Description | Size | Format | |
|---|---|---|---|---|
| Cover, Lembar Pernyataan, Abstrak, Lembar Pengesahan, Prakata dan Daftar Isi.pdf Restricted Access | Cover | 700.14 kB | Adobe PDF | View/Open |
| G54190043_Mochammad Dzoukkar Dudayev Nurlianto Junior.pdf Restricted Access | Fullteks | 922.32 kB | Adobe PDF | View/Open |
| Lampiran.pdf Restricted Access | Lampiran | 547.12 kB | Adobe PDF | View/Open |
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