Calculus : early transcendentals

Calculus early transcendentals

For a three-semester or four-quarter calculus course covering single variable and multivariable calculus for mathematics, engineering, and science majors.   This much anticipated second edition of the most successful new calculus text published in the last two decades retains the best of the first...

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Detalles Bibliográficos
Otros Autores: Briggs, William L., author (author)
Formato: Libro electrónico
Idioma:Inglés
Publicado: Harlow, England : Pearson [2015]
Edición:Second, Global edition
Colección:Always learning.
Materias:
Calculus > Textbooks.
Ver en Biblioteca Universitat Ramon Llull:https://discovery.url.edu/permalink/34CSUC_URL/1im36ta/alma991009767233806719
Tabla de Contenidos:
  • Cover
  • Title Page
  • Copyright Page
  • Contents
  • Preface
  • Acknowledgments
  • Credits
  • 1 Functions
  • 1.1 Review of Functions
  • 1.2 Representing Functions
  • 1.3 Inverse, Exponential, and logarithmic Functions
  • 1.4 Trigonometric Functions and Their inverses
  • Review Exercises
  • 2 Limits
  • 2.1 The idea of limits
  • 2.2 Definitions of limits
  • 2.3 Techniques for computing limits
  • 2.4 Infinite limits
  • 2.5 Limits at infinity
  • 2.6 Continuity
  • 2.7 Precise definitions of limits
  • Review Exercises
  • 3 Derivatives
  • 3.1 Introducing the derivative
  • 3.2 Working with derivatives
  • 3.3 Rules of differentiation
  • 3.4 The Product and Quotient rules
  • 3.5 Derivatives of Trigonometric Functions
  • 3.6 Derivatives as rates of change
  • 3.7 The chain rule
  • 3.8 Implicit differentiation
  • 3.9 Derivatives of logarithmic and Exponential Functions
  • 3.10 Derivatives of inverse Trigonometric Functions
  • 3.11 Related rates
  • Review Exercises
  • 4 Applications of the derivative
  • 4.1 Maxima and minima
  • 4.2 What derivatives Tell us
  • 4.3 Graphing Functions
  • 4.4 Optimization Problems
  • 4.5 Linear approximation and differentials
  • 4.6 Mean Value Theorem
  • 4.7 L'hôpital's rule
  • 4.8 Newton's method
  • 4.9 Antiderivatives
  • Review Exercises
  • 5 Integration
  • 5.1 Approximating areas under curves
  • 5.2 Definite integrals
  • 5.3 Fundamental Theorem of calculus
  • 5.4 Working with integrals
  • 5.5 Substitution rule
  • Review Exercises
  • 6 Applications of integration
  • 6.1 Velocity and net change
  • 6.2 Regions between curves
  • 6.3 Volume by slicing
  • 6.4 Volume by shells
  • 6.5 Length of curves
  • 6.6 Surface area
  • 6.7 Physical applications
  • 6.8 Logarithmic and Exponential Functions revisited
  • 6.9 Exponential models
  • 6.10 Hyperbolic Functions
  • Review Exercises
  • 7 Integration Techniques
  • 7.1 Basic approaches.
  • 7.2 Integration by Parts
  • 7.3 Trigonometric integrals
  • 7.4 Trigonometric substitutions
  • 7.5 Partial Fractions
  • 7.6 Other integration strategies
  • 7.7 Numerical integration
  • 7.8 Improper integrals
  • 7.9 Introduction to differential Equations
  • Review Exercises
  • 8 Sequences and infinite series
  • 8.1 An overview
  • 8.2 Sequences
  • 8.3 Infinite series
  • 8.4 The divergence and integral Tests
  • 8.5 The ratio, root, and comparison Tests
  • 8.6 Alternating series
  • Review Exercises
  • 9 Power series
  • 9.1 Approximating Functions with Polynomials
  • 9.2 Properties of Power series
  • 9.3 Taylor series
  • 9.4 Working with Taylor series
  • Review Exercises
  • 10 Parametric and Polar curves
  • 10.1 Parametric Equations
  • 10.2 Polar coordinates
  • 10.3 Calculus in Polar coordinates
  • 10.4 Conic sections
  • Review Exercises
  • 11 Vectors and Vector-Valued Functions
  • 11.1 Vectors in the Plane
  • 11.2 Vectors in Three dimensions
  • 11.3 Dot Products
  • 11.4 Cross Products
  • 11.5 Lines and curves in space
  • 11.6 Calculus of Vector-Valued Functions
  • 11.7 Motion in space
  • 11.8 Length of curves
  • 11.9 Curvature and normal Vectors
  • Review Exercises
  • 12 Functions of several Variables
  • 12.1 Planes and surfaces
  • 12.2 Graphs and level curves
  • 12.3 Limits and continuity
  • 12.4 Partial derivatives
  • 12.5 The chain rule
  • 12.6 Directional derivatives and the Gradient
  • 12.7 Tangent Planes and linear approximation
  • 12.8 Maximum/minimum Problems
  • 12.9 Lagrange multipliers
  • Review Exercises
  • 13 Multiple integration
  • 13.1 Double integrals over rectangular regions
  • 13.2 Double integrals over General regions
  • 13.3 Double integrals in Polar coordinates
  • 13.4 Triple integrals
  • 13.5 Triple integrals in cylindrical and spherical coordinates
  • 13.6 Integrals for mass calculations.
  • 13.7 Change of Variables in multiple integrals
  • Review Exercises
  • 14 Vector calculus
  • 14.1 Vector Fields
  • 14.2 Line integrals
  • 14.3 Conservative Vector Fields
  • 14.4 Green's Theorem
  • 14.5 Divergence and curl
  • 14.6 Surface integrals
  • 14.7 Stokes' Theorem
  • 14.8 Divergence Theorem
  • Review Exercises
  • Appendix A Algebra review
  • Appendix B Proofs of selected Theorems
  • Answers
  • Index
  • Table of integrals.

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