UnknownGleason, Andrew M.
John Wiley & Sons (Hoboken, New Jersey, 2013) (eng) English9781118572214Unknown6th ed.CALCULUS-TEXTBOOKS; UnknownThis Sixth Edition of Calculus continues the effort to promote courses in which understanding and computation reinforce each other. Calculus: Multivariable 6th Edition reflects the many voices of users at research universities, four-year colleges, community colleges, and secondary schools. This new edition has been streamlined to create a flexible approach to both theory and modeling. For instructors wishing to emphasize the connection between calculus and other fields, the text includes a variety of problems and examples from the physical, health, and biological sciences, engineering and economics. In addition, new problems on the mathematics of sustainability and new case studies on calculus in medicine by David E. Sloane, MD have been added.
New to This Edition:
-. New Strengthen Your Understanding problems at the end of every section. These problems ask students to reflect on what they have learned by deciding “What is wrong?” with a statement and to “Give an example” of an idea.
-. Updated Data and Models: For example, Section 11.7 follows the current debate on Peak Oil Production, underscoring the importance of mathematics in understanding the world’s economic and social?problems.
-. Drill Exercises build student skill and confidence.
-. Online Problems available in WileyPLUS or WeBWorK, for example. Many problems are randomized, providing students with expanded opportunities for practice with immediate feedback.
Physical dimension
xii, pages 684-1182 27 cm.ill.
Summary / review / table of contents
Chapter 12: Functions of Several Variables
Chapter 13: A Fundamental Tool: Vectors
Chapter 14: Differentiating Functions of Several Variables
Chapter 15: Optimization: Local and Global Extrema
Chapter 16: Integrating Functions of Several Variables
Chapter 17: Parameterization and Vector Fields
Chapter 18: Line Integrals
Chapter 19: Flux Integrals and Divergence
Chapter 20: The Curl and Stokes’ Theorem
Chapter 21: Parameters, Coordinates, and Integrals