CD Tesis

Invers Dan Invers Moore-Penrose Untuk Matriks Interval

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Algebra for interval numbers has been developed by various authors. For the operations of addition, subtraction, and scalar multiplication, there aren't many differences among the numerous algebras for interval numbers. However, other algebraic alternatives are offered by various authors for division/inverse operations and multiplikation. All of the provided algebras, however, are irrelevant to a ̃(r)⊗(1\/a ̃(r))=i ̃(r). As a result, the author modifies interval number algebra so that A ̃⊗A ̃^(-1)=I ̃ applies to interval matrices. Initially, the midpoint of an interval number (m(a ̃ )) is provided in order to accomplish this purpose. Afterwards, the interval matrix's basic row operations are modified to determine the inverse of the interval matrix. Furthermore, the algebra of interval numbers is also used to determine the Moore-Penrose inverse of the interval matrix.
Keywords: Interval number, interval matrix, inverse of the interval matrix, Moore-Penrose inverse of the interval matrix.

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Ketersediaan

Informasi Detail

Judul Seri

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No. Panggil

2010247510

Penerbit

Pekanbaru : Universitas Riau Pascasarjana Tesis Pendidikan Matematika., 2024

Deskripsi Fisik

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Bahasa

Indonesia

ISBN/ISSN

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Klasifikasi

2010247510

Tipe Isi

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Tipe Media

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Tipe Pembawa

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Edisi

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Subjek

PENDIDIKAN MATEMATIKA

Info Detail Spesifik

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Pernyataan Tanggungjawab

Jaka

Versi lain/terkait

Lampiran Berkas

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