Square Matrices of Order 2, 1st ed. 2017 Theory, Applications, and Problems
Auteurs : Pop Vasile, Furdui Ovidiu
Préfacier : Bernstein Dennis S.
Matrices have a vast practical importance to mathematics, science, and engineering; therefore the readership of this book is intended to be broad: high school students wishing to learn the fundamentals of matrix theory, first year students who like to participate in mathematical competitions, graduate students who want to learn more about an application of a certain technique, doctoral students who are preparing for their prelim exams in linear algebra, and linear algebra instructors. Chapters 1?3 complement a standard linear algebra course. Pure and applied mathematicians who use matrix theory for their applications will find this book useful as a refresher. In fact, anyone who is willing to explore the methodologies discussed in this book and work through a collection of problems involving matrices of order 2 will be enriched.
Ovidiu Furdui is an associate professor of mathematics at the Technical University of Cluj-Napoca, Romania. He has published more than 300 problems in journals, with a problem column, from all over the world and he is the author of the Springer text Limits, Series and Fractional Part Integrals.
Contains a unique collection of enriching problems for a wide spectrum of readership
Discusses all important topics related to the theory of square matrices of order 2
Presents an enriching source of material for a wide swath of potential readers
Accessible to readers with a modest background in mathematics
Date de parution : 04-2017
Ouvrage de 370 p.
15.5x23.5 cm
Date de parution : 05-2018
Ouvrage de 370 p.
15.5x23.5 cm
Disponible chez l'éditeur (délai d'approvisionnement : 15 jours).
Prix indicatif 52,74 €
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Mots-clés :
special matrices; problems matrix theory; elementary transformations; Cayley-Hamilton theorem; Jordan canonical theorem; powers of matrices; binomial matrix; Pell's Diophantine equation; matrix Gamma function; affine applications; homothetic transformations; degenerate conics; nondegenerate conics; series mirabilis; matrix calculus; functions of matrices; conics; homographic sequences; characteristic polynomial; matrix Riemann zeta function