Título : |
Fundamentos de álgebra lineal |
Tipo de documento: |
texto impreso |
Autores: |
Ron Larson, Autor ; Oliver Davidson Vejar, Traductor |
Mención de edición: |
Sétima edición |
Editorial: |
México, D.F. : Cengage Learning Editores |
Fecha de publicación: |
2015 |
Número de páginas: |
ix, 390, [46] páginas |
Il.: |
ilustraciones, diagramas |
Dimensiones: |
27 cm |
ISBN/ISSN/DL: |
978-607-519-803-3 |
Nota general: |
Título original en inglés: Elementary Linear Algebra |
Idioma : |
Español (spa) Idioma original : Inglés (eng) |
Clasificación: |
512.5 Álgebras lineales, multilineales, multidimensionales |
Nota de contenido: |
Sistemas de ecuaciones lineales -- Matrices -- Determinantes -- Espacios vectoriales -- Espacios con producto interno -- Transformaciones lineales -- Eligevalores y eligenvectores. |
Link: |
https://biblioteca.unap.edu.pe/opac_css/index.php?lvl=notice_display&id=91227 |
Fundamentos de álgebra lineal [texto impreso] / Ron Larson, Autor ; Oliver Davidson Vejar, Traductor . - Sétima edición . - México, D.F. : Cengage Learning Editores, 2015 . - ix, 390, [46] páginas : ilustraciones, diagramas ; 27 cm. ISBN : 978-607-519-803-3 Título original en inglés: Elementary Linear Algebra Idioma : Español ( spa) Idioma original : Inglés ( eng)
Fundamentos de álgebra lineal
Larson, Ron -
México, D.F. : Cengage Learning Editores - 2015
Título original en inglés: Elementary Linear Algebra
Sistemas de ecuaciones lineales -- Matrices -- Determinantes -- Espacios vectoriales -- Espacios con producto interno -- Transformaciones lineales -- Eligevalores y eligenvectores.
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) 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