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Linear Algebra

Theory, Intuition, Code

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Linear algebra is a crucial branch of mathematics for computational sciences, encompassing machine learning, AI, data science, statistics, simulations, computer graphics, and signal processing. Traditional textbooks often present linear algebra differently from its practical applications in these fields. For instance, while the "determinant" of a matrix is significant in theory, its practical utility may be limited. This book is designed for those eager to grasp mathematical concepts in linear algebra and matrix analysis while applying them to data analyses on computers, such as statistics and signal processing. Key features include clear explanations of concepts and theories, multiple perspectives on the same ideas to enhance learning, and visualizations that bolster geometric intuition. Implementations in MATLAB and Python are emphasized, as real-world applications require software proficiency. The content ranges from beginner to intermediate topics, covering vectors, matrix multiplications, least-squares projections, eigendecomposition, and singular-value decomposition. The focus is on modern, application-oriented aspects of linear algebra, with intuitive visual explanations of diagonalization, eigenvalues, and eigenvectors. The book also includes codes for practical understanding and a mix of hand-solved exercises and advanced coding challenges, reinforcing that math is an active pursuit, not a passive one.

Nákup knihy

Linear Algebra, Mike X. Cohen

Jazyk
Rok vydání
2021
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Doručení

Platební metody

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Titul
Linear Algebra
Podtitul
Theory, Intuition, Code
Jazyk
anglicky
Vydavatel
Sincxpress BV
Rok vydání
2021
Vazba
měkká
Počet stran
589
ISBN10
9083136604
ISBN13
9789083136608
Série
Anotace
Linear algebra is a crucial branch of mathematics for computational sciences, encompassing machine learning, AI, data science, statistics, simulations, computer graphics, and signal processing. Traditional textbooks often present linear algebra differently from its practical applications in these fields. For instance, while the "determinant" of a matrix is significant in theory, its practical utility may be limited. This book is designed for those eager to grasp mathematical concepts in linear algebra and matrix analysis while applying them to data analyses on computers, such as statistics and signal processing. Key features include clear explanations of concepts and theories, multiple perspectives on the same ideas to enhance learning, and visualizations that bolster geometric intuition. Implementations in MATLAB and Python are emphasized, as real-world applications require software proficiency. The content ranges from beginner to intermediate topics, covering vectors, matrix multiplications, least-squares projections, eigendecomposition, and singular-value decomposition. The focus is on modern, application-oriented aspects of linear algebra, with intuitive visual explanations of diagonalization, eigenvalues, and eigenvectors. The book also includes codes for practical understanding and a mix of hand-solved exercises and advanced coding challenges, reinforcing that math is an active pursuit, not a passive one.