Applied Linear Algebra. Taylor, J., Noble, B., & Daniel, J. W. Volume 72 , 1988. Publication Title: The Mathematical Gazette Issue: 462 ISSN: 00255572doi abstract bibtex "This text aims to teach basic methods and algorithms used in modern, real problems that are likely to be encountered by engineering and science students - and to foster understanding of why mathematical techniques work and how they can be derived from first principles. No text goes as far (and wide) in applications. The authors present applications hand in hand with theory, leading students through the reasoning that leads to the important results, and provide theorems and proofs where needed. Because no previous exposure to linear algebra is assumed, the text can be used for a motivated entry-level class as well as advanced undergraduate and beginning graduate engineering/applied math students."–Publisher's description. 1. Linear algebraic systems – 2. Vector spaces and bases – 3. Inner products and norms – 4. Minimization and least squares approximation – 5. Orthogonality – 6. Equilibrium – 7. Linearity – 8. Eigenvalues – 9. Linear dynamical systems – 10. Iteration of linear systems – 11. Boundary value problems in one dimension.
@book{taylor_applied_1988,
title = {Applied {Linear} {Algebra}},
volume = {72},
isbn = {978-3-319-91040-6},
abstract = {"This text aims to teach basic methods and algorithms used in modern, real problems that are likely to be encountered by engineering and science students - and to foster understanding of why mathematical techniques work and how they can be derived from first principles. No text goes as far (and wide) in applications. The authors present applications hand in hand with theory, leading students through the reasoning that leads to the important results, and provide theorems and proofs where needed. Because no previous exposure to linear algebra is assumed, the text can be used for a motivated entry-level class as well as advanced undergraduate and beginning graduate engineering/applied math students."--Publisher's description. 1. Linear algebraic systems -- 2. Vector spaces and bases -- 3. Inner products and norms -- 4. Minimization and least squares approximation -- 5. Orthogonality -- 6. Equilibrium -- 7. Linearity -- 8. Eigenvalues -- 9. Linear dynamical systems -- 10. Iteration of linear systems -- 11. Boundary value problems in one dimension.},
author = {Taylor, John and Noble, Ben and Daniel, James W.},
year = {1988},
doi = {10.2307/3619970},
note = {Publication Title: The Mathematical Gazette
Issue: 462
ISSN: 00255572},
}
Downloads: 0
{"_id":"BZ2eYgp4ftpngQoR7","bibbaseid":"taylor-noble-daniel-appliedlinearalgebra-1988","author_short":["Taylor, J.","Noble, B.","Daniel, J. W."],"bibdata":{"bibtype":"book","type":"book","title":"Applied Linear Algebra","volume":"72","isbn":"978-3-319-91040-6","abstract":"\"This text aims to teach basic methods and algorithms used in modern, real problems that are likely to be encountered by engineering and science students - and to foster understanding of why mathematical techniques work and how they can be derived from first principles. No text goes as far (and wide) in applications. The authors present applications hand in hand with theory, leading students through the reasoning that leads to the important results, and provide theorems and proofs where needed. Because no previous exposure to linear algebra is assumed, the text can be used for a motivated entry-level class as well as advanced undergraduate and beginning graduate engineering/applied math students.\"–Publisher's description. 1. Linear algebraic systems – 2. Vector spaces and bases – 3. Inner products and norms – 4. Minimization and least squares approximation – 5. Orthogonality – 6. Equilibrium – 7. Linearity – 8. Eigenvalues – 9. Linear dynamical systems – 10. Iteration of linear systems – 11. Boundary value problems in one dimension.","author":[{"propositions":[],"lastnames":["Taylor"],"firstnames":["John"],"suffixes":[]},{"propositions":[],"lastnames":["Noble"],"firstnames":["Ben"],"suffixes":[]},{"propositions":[],"lastnames":["Daniel"],"firstnames":["James","W."],"suffixes":[]}],"year":"1988","doi":"10.2307/3619970","note":"Publication Title: The Mathematical Gazette Issue: 462 ISSN: 00255572","bibtex":"@book{taylor_applied_1988,\n\ttitle = {Applied {Linear} {Algebra}},\n\tvolume = {72},\n\tisbn = {978-3-319-91040-6},\n\tabstract = {\"This text aims to teach basic methods and algorithms used in modern, real problems that are likely to be encountered by engineering and science students - and to foster understanding of why mathematical techniques work and how they can be derived from first principles. No text goes as far (and wide) in applications. The authors present applications hand in hand with theory, leading students through the reasoning that leads to the important results, and provide theorems and proofs where needed. Because no previous exposure to linear algebra is assumed, the text can be used for a motivated entry-level class as well as advanced undergraduate and beginning graduate engineering/applied math students.\"--Publisher's description. 1. Linear algebraic systems -- 2. Vector spaces and bases -- 3. Inner products and norms -- 4. Minimization and least squares approximation -- 5. Orthogonality -- 6. Equilibrium -- 7. Linearity -- 8. Eigenvalues -- 9. Linear dynamical systems -- 10. Iteration of linear systems -- 11. Boundary value problems in one dimension.},\n\tauthor = {Taylor, John and Noble, Ben and Daniel, James W.},\n\tyear = {1988},\n\tdoi = {10.2307/3619970},\n\tnote = {Publication Title: The Mathematical Gazette\nIssue: 462\nISSN: 00255572},\n}\n\n\n\n","author_short":["Taylor, J.","Noble, B.","Daniel, J. W."],"key":"taylor_applied_1988","id":"taylor_applied_1988","bibbaseid":"taylor-noble-daniel-appliedlinearalgebra-1988","role":"author","urls":{},"metadata":{"authorlinks":{}},"html":""},"bibtype":"book","biburl":"https://bibbase.org/zotero/dancili","dataSources":["sMzdddtr9jRe8zeKY"],"keywords":[],"search_terms":["applied","linear","algebra","taylor","noble","daniel"],"title":"Applied Linear Algebra","year":1988}