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Calculus : single and multivariable / Deborah Hughes-Hallett [and twenty-one others].

Contributor(s): Gleason, Andrew M., author | McCallum, William G., author | Connally, Eric, author | Lovelock, David, author | Quinney, Douglas, author | Flath, Daniel E., author | Lozano, Guadalupe I., author | Rhea, Karen, author | Selin Kalaycioglu, author | Morris, Jerry, author | Ayse Sahin, author | Lahme, Brigitte, author | Mumford, David, author | Spiegler, Adam H., author | Lock, Patti Frazer, author | Osgood, Brad G., author | Feldman, Jeff Tecosky, author | Lomen, David O., author | Patterson, Cody L., author | Tucker, Thomas W., author | Wootton, Aaron D., authorMaterial type: TextTextPublisher: New Jersey : John Wiley & Sons, Inc., c2019Edition: Seventh and Asia editionDescription: xviii, 1146 pages : illustrations ; 28 cmISBN: 978-11-1958573-2Subject(s): CalculusLOC classification: QA303 | C35 2019
Contents:
1 - Foundation for calculus : functions and limits 2 - Key concepts : the derivative 3 - Short-cuts to differentiation 4 - Using the derivative 5 - Key concept : the definite integral 6 - Constructing antiderivatives 7 - Integration 8 - Using the definite integral 9 - Sequences and series 10 - Approximating functions using series 11 - Differential equations 12 - Functions of several variables 13 - A fundamental tool : vectors 14 - Differentiating functions of several variables 15 - Optimization : local and global extrema 16 - Integrating functions of several variables 17 - Parameterization and vector fields 18 - Line integrals 19 - Flux integrals and divergence 20 - The Curl and Stokes' theorem 21 - Parameters, coordinates, and integrals
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Item type Current location Collection Shelving location Call number Copy number Status Date due Barcode
Book Book Cavite State University - CCAT Campus
Book GCS CIR QA303 C35 2019 (Browse shelf) 1 copy Available R0012179

Includes bibliographical references and index.

1 - Foundation for calculus : functions and limits 2 - Key concepts : the derivative 3 - Short-cuts to differentiation 4 - Using the derivative 5 - Key concept : the definite integral 6 - Constructing antiderivatives 7 - Integration 8 - Using the definite integral 9 - Sequences and series 10 - Approximating functions using series 11 - Differential equations 12 - Functions of several variables 13 - A fundamental tool : vectors 14 - Differentiating functions of several variables 15 - Optimization : local and global extrema 16 - Integrating functions of several variables 17 - Parameterization and vector fields 18 - Line integrals 19 - Flux integrals and divergence 20 - The Curl and Stokes' theorem 21 - Parameters, coordinates, and integrals

In English text.

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