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Calculus BC compatible with AP*

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Calculus BC compatible with AP* Details

Thinkwell's Calculus BC Compatible with AP* Calculus lays the foundation for success because, unlike a traditional textbook, students actually like using it. Thinkwell works with the learning styles of students who have found that traditional textbooks are not effective. Watch one Thinkwell video lecture and you'll understand why Thinkwell works better.

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Table of Contents

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1. An Introduction to Calculus BC

  • 1.1 Introduction
    • 1.1.1 Welcome to Calculus II
    • 1.1.2 Review: Calculus I in 20 Minutes

2. Techniques of Integration

  • 2.1 Integration Using Tables
    • 2.1.1 An Introduction to the Integral Table
    • 2.1.2 Making u-Substitutions
  • 2.2 Integrals Involving Powers of Sine and Cosine
    • 2.2.1 An Introduction to Integrals with Powers of Sine and Cosine
    • 2.2.2 Integrals with Powers of Sine and Cosine
    • 2.2.3 Integrals with Even and Odd Powers of Sine and Cosine
  • 2.3 Integrals Involving Powers of Other Trigonometric Functions
    • 2.3.1 Integrals of Other Trigonometric Functions
    • 2.3.2 Integrals with Odd Powers of Tangent and Any Power of Secant
    • 2.3.3 Integrals with Even Powers of Secant and Any Power of Tangent
  • 2.4 An Introduction to Integration by Partial Fractions
    • 2.4.1 Finding Partial Fraction Decompositions
    • 2.4.2 Partial Fractions
    • 2.4.3 Long Division
  • 2.5 Integration by Partial Fractions with Repeated Factors
    • 2.5.1 Repeated Linear Factors: Part One
    • 2.5.2 Repeated Linear Factors: Part Two
    • 2.5.3 Distinct and Repeated Quadratic Factors
    • 2.5.4 Partial Fractions of Transcendental Functions
  • 2.6 Integration by Parts
    • 2.6.1 An Introduction to Integration by Parts
    • 2.6.2 Applying Integration by Parts to the Natural Log Function
    • 2.6.3 Inspirational Examples of Integration by Parts
    • 2.6.4 Repeated Application of Integration by Parts
    • 2.6.5 Algebraic Manipulation and Integration by Parts
  • 2.7 An Introduction to Trigonometric Substitution
    • 2.7.1 Converting Radicals into Trigonometric Expressions
    • 2.7.2 Using Trigonometric Substitution to Integrate Radicals
    • 2.7.3 Trigonometric Substitutions on Rational Powers
  • 2.8 Trigonometric Substitution Strategy
    • 2.8.1 An Overview of Trigonometric Substitution Strategy
    • 2.8.2 Trigonometric Substitution Involving a Definite Integral: Part One
    • 2.8.3 Trigonometric Substitution Involving a Definite Integral: Part Two
  • 2.9 The Calculus of Inverse Trigonometric Functions
    • 2.9.1 More Calculus of Inverse Trigonometric Functions

3. Parametric Equations and Polar Coordinates

  • 3.1 Understanding Parametric Equations
    • 3.1.1 An Introduction to Parametric Equations
    • 3.1.2 The Cycloid
    • 3.1.3 Eliminating Parameters
  • 3.2 Calculus and Parametric Equations
    • 3.2.1 Derivatives of Parametric Equations
    • 3.2.2 Graphing the Elliptic Curve
    • 3.2.3 The Arc Length of a Parameterized Curve
    • 3.2.4 Finding Arc Lengths of Curves Given by Parametric Equations
  • 3.3 Understanding Polar Coordinates
    • 3.3.1 The Polar Coordinate System
    • 3.3.2 Converting between Polar and Cartesian Forms
    • 3.3.3 Spirals and Circles
    • 3.3.4 Graphing Some Special Polar Functions
  • 3.4 Polar Functions and Slope
    • 3.4.1 Calculus and the Rose Curve
    • 3.4.2 Finding the Slopes of Tangent Lines in Polar Form
  • 3.5 Polar Functions and Area
    • 3.5.1 Heading toward the Area of a Polar Region
    • 3.5.2 Finding the Area of a Polar Region: Part One
    • 3.5.3 Finding the Area of a Polar Region: Part Two
    • 3.5.4 The Area of a Region Bounded by Two Polar Curves: Part One
    • 3.5.5 The Area of a Region Bounded by Two Polar Curves: Part Two

4. Sequences and Series

  • 4.1 Sequences
    • 4.1.1 The Limit of a Sequence
    • 4.1.2 Determining the Limit of a Sequence
    • 4.1.3 The Squeeze and Absolute Value Theorems
  • 4.2 Monotonic and Bounded Sequences
    • 4.2.1 Monotonic and Bounded Sequences
  • 4.3 Infinite Series
    • 4.3.1 An Introduction to Infinite Series
    • 4.3.2 The Summation of Infinite Series
    • 4.3.3 Geometric Series
    • 4.3.4 Telescoping Series
    • 4.3.5 Applications of Series
  • 4.4 Convergence and Divergence
    • 4.4.1 Properties of Convergent Series
    • 4.4.2 The nth-Term Test for Divergence
  • 4.5 The Integral Test
    • 4.5.1 An Introduction to the Integral Test
    • 4.5.2 Examples of the Integral Test
    • 4.5.3 Using the Integral Test
    • 4.5.4 Defining p-Series
  • 4.6 The Direct Comparison Test
    • 4.6.1 An Introduction to the Direct Comparison Test
    • 4.6.2 Using the Direct Comparison Test
  • 4.7 The Limit Comparison Test
    • 4.7.1 An Introduction to the Limit Comparison Test
    • 4.7.2 Using the Limit Comparison Test
    • 4.7.3 Inverting the Series in the Limit Comparison Test
  • 4.8 The Alternating Series
    • 4.8.1 Alternating Series
    • 4.8.2 The Alternating Series Test
    • 4.8.3 Estimating the Sum of an Alternating Series
  • 4.9 Absolute and Conditional Convergences
    • 4.9.1 Absolute and Conditional Convergence
  • 4.10 The Ratio and Root Tests
    • 4.10.1 The Ratio Test
    • 4.10.2 Examples of the Ratio Test
    • 4.10.3 The Root Test
  • 4.11 Polynomial Approximations of Elementary Functions
    • 4.11.1 Polynomial Approximation of Elementary Functions
    • 4.11.2 Higher-Degree Approximations
  • 4.12 Taylor and Maclaurin Polynomials
    • 4.12.1 Taylor Polynomials
    • 4.12.2 Maclaurin Polynomials
    • 4.12.3 The Remainder of a Taylor Polynomial
    • 4.12.4 Approximating the Value of a Function
  • 4.13 Taylor and Maclaurin Series
    • 4.13.1 Taylor Series
    • 4.13.2 Examples of the Taylor and Maclaurin Series
    • 4.13.3 New Taylor Series
    • 4.13.4 The Convergence of Taylor Series
  • 4.14 Power Series
    • 4.14.1 The Definition of Power Series
    • 4.14.2 The Interval and Radius of Convergence
    • 4.14.3 Finding the Interval and Radius of Convergence: Part One
    • 4.14.4 Finding the Interval and Radius of Convergence: Part Two
    • 4.14.5 Finding the Interval and Radius of Convergence: Part Three
  • 4.15 Power Series Representations of Functions
    • 4.15.1 Differentiation and Integration of Power Series
    • 4.15.2 Finding Power Series Representations by Differentiation
    • 4.15.3 Finding Power Series Representations by Integration
    • 4.15.4 Integrating Functions Using Power Series

5. Differential Equations

  • 5.1 Solving a Homogeneous Differential Equation
    • 5.1.1 Separating Homogeneous Differential Equations
    • 5.1.2 Change of Variables
  • 5.2 Solving First-Order Linear Differential Equations
    • 5.2.1 First-Order Linear Differential Equations
    • 5.2.2 Using Integrating Factors

6. Vector Calculus and the Geometry of R2 and R3

  • 6.1 Vectors and the Geometry of R2 and R3
    • 6.1.1 Coordinate Geometry in Three-Dimensional Space
    • 6.1.2 Introduction to Vectors
    • 6.1.3 Vectors in R2 and R3
    • 6.1.4 An Introduction to the Dot Product
    • 6.1.5 Orthogonal Projections
    • 6.1.6 An Introduction to the Cross Product
    • 6.1.7 Geometry of the Cross Product
    • 6.1.8 Equations of Lines and Planes in R3
  • 6.2 Vector Functions
    • 6.2.1 Introduction to Vector Functions
    • 6.2.2 Derivatives of Vector Functions
    • 6.2.3 Vector Functions: Smooth Curves
    • 6.2.4 Vector Functions: Velocity and Acceleration

About the Author

Author BUR

Edward Burger
Williams College

Edward Burger, Professor of Mathematics at Williams College, earned his Ph.D. at the University of Texas at Austin, having graduated summa cum laude with distinction in mathematics from Connecticut College.

He has also taught at UT-Austin and the University of Colorado at Boulder, and he served as a fellow at the University of Waterloo in Canada and at Macquarie University in Australia. Prof. Burger has won many awards, including the 2001 Haimo Award for Distinguished Teaching of Mathematics, the 2004 Chauvenet Prize, and the 2006 Lester R. Ford Award, all from the Mathematical Association of America. In 2006, Reader's Digest listed him in the "100 Best of America". After completing his tenure as Gaudino Scholar at Williams, he was named Lissack Professor for Social Responsibility and Personal Ethics.

Prof. Burger is the author of over 50 articles, videos, and books, including the trade book, Coincidences, Chaos, and All That Math Jazz: Making Light of Weighty Ideas and of the textbook The Heart of Mathematics: An Invitation to Effective Thinking. He also speaks frequently to professional and public audiences, referees professional journals, and publishes articles in leading math journals, including The Journal of Number Theory and American Mathematical Monthly. His areas of specialty include number theory, Diophantine approximation, p-adic analysis, the geometry of numbers, and the theory of continued fractions.

Prof. Burger's unique sense of humor and his teaching expertise combine to make him the ideal presenter of Thinkwell's entertaining and informative video lectures.

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