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Beschreibung
"From the author of Calculus Simplified, an accessible, personalized approach to Calculus 2Second-semester calculus is rich with insights into the nature of infinity and the very foundations of geometry, but students can become overwhelmed as they struggle to synthesize the range of material covered in class. Oscar Fernandez provides a "Goldilocks approach" to learning the mathematics of integration, infinite sequences and series, and their applications-the right depth of insights, the right level of detail, and the freedom to customize your student experience. Learning calculus should be an empowering voyage, not a daunting task. Calculus 2 Simplified gives you the flexibility to choose your calculus adventure, and the right support to help you master the subject.Provides an accessible, user-friendly introduction to second-semester college calculusThe unique customizable approach enables students to begin first with integration (traditional) or with sequences and series (easier)Chapters are organized into mini lessons that focus first on developing the intuition behind calculus, then on conceptual and computational masteryFeatures more than 170 solved examples that guide your learning and more than 400 exercises, with answers, that help assess your understandingIncludes optional chapter appendixesComes with supporting materials online, including video tutorials and interactive graphs"--
"From the author of Calculus Simplified, an accessible, personalized approach to Calculus 2Second-semester calculus is rich with insights into the nature of infinity and the very foundations of geometry, but students can become overwhelmed as they struggle to synthesize the range of material covered in class. Oscar Fernandez provides a "Goldilocks approach" to learning the mathematics of integration, infinite sequences and series, and their applications-the right depth of insights, the right level of detail, and the freedom to customize your student experience. Learning calculus should be an empowering voyage, not a daunting task. Calculus 2 Simplified gives you the flexibility to choose your calculus adventure, and the right support to help you master the subject.Provides an accessible, user-friendly introduction to second-semester college calculusThe unique customizable approach enables students to begin first with integration (traditional) or with sequences and series (easier)Chapters are organized into mini lessons that focus first on developing the intuition behind calculus, then on conceptual and computational masteryFeatures more than 170 solved examples that guide your learning and more than 400 exercises, with answers, that help assess your understandingIncludes optional chapter appendixesComes with supporting materials online, including video tutorials and interactive graphs"--
Über den Autor
Oscar E. Fernandez
Inhaltsverzeichnis
  • Preface
  • Before You Begin
  • To the Student
  • To the Instructor

  • 1 The Fast-Track Introduction to Calculus 2
  • 1.1 First Things First: What Is Calculus?
  • 1.2 Limits: (Still) The Foundation of Calculus
  • 1.3 The Three Dicult Questions That Drove the Development of Calculus 2
    • 2 Integration Techniques and Approximations
  • 2.1 Integrating, Leibniz’s Way
  • 2.2 Approximating Integrals, Riemann’s Way
  • 2.3 The Trapezoidal Rule
  • 2.4 How to Approximate Integrals to Any Desired Accuracy
  • 2.5 Integration by Parts
  • 2.6 Trigonometric Integrals
  • 2.7 Trigonometric Substitution
  • 2.8 Partial Fraction Decomposition
  • 2.9 Parting Thoughts
    • Chapter 2 Exercises

  • Chapter 2 Appendix
  • A2.1 Evaluating Riemann Sums Using Summation Formulas
  • A2.2 Additional Error Theorems for Riemann Sums and the Trapezoidal Rule
  • A2.3 The Tabular Method for Integration by Parts
  • A2.4 Integrands That Are Products of Powers of Sine and Cosine
  • A2.5 Integrands That Are Sine-Cosine Products with Dierent Arguments
  • A2.6 A Brief Review of Long Division and Its Uses in Partial Fraction Decomposition
    • 3 Applications of Integration
  • 3.1 A Quick Preview of What’s to Come
  • 3.2 Area between Curves
  • 3.3 Volumes by Cross Sections
  • 3.4 Volumes of Revolution: The Disk Method
  • 3.5 Volumes of Revolution: The Washer Method
  • 3.6 Volumes of Revolution: The Shell Method
  • 3.7 Calculating the Length of a Curve
  • 3.8 Calculating the (Lateral) Area of a Surface
  • 3.9 Parting Thoughts
    • Chapter 3 Exercises

  • Chapter 3 Appendix
  • A3.1 Area between Two Curves: The Riemann Sums Approach
  • A3.2 Riemann Sums Approach to Volumes by Cross Sections
  • A3.3 Riemann Sums Approach to the Disk Method
  • A3.4 Riemann Sums Approach to the Washer Method
  • A3.5 Riemann Sums Approach to the Shell Method
  • A3.6 Volumes of Revolution: Noncoordinate Axes of Revolution
    • 4 Sequences and Series
  • 4.1 Introduction to Sequences
  • 4.2 Convergence of Sequences
  • 4.3 Innite Series
  • 4.4 Special Series and the Series Laws
  • 4.5 The Limit and Direct Comparison Tests
  • 4.6 Alternating Series
  • 4.7 The Ratio Test
  • 4.8 Approximating the Sum of an Alternating Series
  • 4.9 Taylor Polynomials
  • 4.10 Taylor’s Theorem
  • 4.11 Power Series and Their Convergence
  • 4.12 Power Series as Functions
  • 4.13 Taylor Series
  • 4.14 Convergence of Taylor Series
  • 4.15 Applications of Taylor Series
  • 4.16 Parting Thoughts
    • Chapter 4 Exercises

    • 5 Connections between Integration and Series
  • 5.1 Partial Fractions and Telescoping Series
  • 5.2 Power/Taylor Series and Integration
  • 5.3 Improper Integrals
  • 5.4 The Integral Test for Series
  • 5.5 Parting Thoughts
    • Chapter 5 Exercises

    • Epilogue
    • Acknowledgments

    • Appendixes A--D: Precalculus and Calculus Review
  • A Algebra and Geometry Review
  • B Precalculus (Functions) Review
  • C Calculus Review I—Through Dierentiation
  • D Calculus Review II—Integration
    • Appendix E: Integration Basics
  • E.1 The Fundamental Theorem of Calculus
  • E.2 Antiderivatives and the Evaluation Theorem
  • E.3 Properties of Integrals
  • E.4Net Signed Area
  • E.5 Integrating Transcendental Functions
  • E.6 The Substitution Rule
    • Appendix F: L’Hôpital’s Rule

    • Appendix F Exercises

    • Answers to Exercises
    • Bibliography
    • Index of Applications
    • Subject Index
    Details
    Medium: Taschenbuch
    Inhalt: Einband - flex.(Paperback)
    ISBN-13: 9780691263755
    ISBN-10: 0691263752
    Sprache: Englisch
    Einband: Kartoniert / Broschiert
    Autor: Fernandez, Oscar
    Hersteller: Princeton University Press
    Verantwortliche Person für die EU: Libri GmbH, Europaallee 1, D-36244 Bad Hersfeld, gpsr@libri.de
    Maße: 248 x 180 x 20 mm
    Von/Mit: Oscar Fernandez
    Erscheinungsdatum: 27.05.2025
    Gewicht: 0,541 kg
    Artikel-ID: 132605376

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