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Functions and Models | |
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Four Ways to Represent a Function | |
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Mathematical Models | |
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New Functions from Old Functions | |
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Graphing Calculators and Computers | |
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Exponential Functions | |
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Inverse Functions and Logarithms | |
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Parametric Curves | |
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Review | |
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Principles of Problem Solving | |
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Limits And Derivatives | |
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The Tangent and Velocity Problems | |
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The Limit of a Function | |
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Calculating Limits Using the Limit Laws | |
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Continuity | |
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Limits Involving Infinity | |
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Tangents, Velocities, and Other Rates of Change | |
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Derivatives | |
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The Derivative as a Function | |
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Linear Approximations | |
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What does f' say about f? Review | |
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Focus on Problem Solving | |
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Differentiation Rules | |
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Derivatives of Polynomials and Exponential Functions | |
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The Product and Quotient Rules | |
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Rates of Change in the Natural and Social Sciences | |
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Derivatives of Trigonometric Functions | |
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The Chain Rule | |
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Implicit Differentiation | |
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Derivatives of Logarithmic Functions | |
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Linear Approximations and Differentials | |
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Review | |
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Focus on Problem Solving | |
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Applications of Differentiation | |
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Related Rates | |
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Maximum and Minimum Values | |
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Derivatives and the Shapes of Curves | |
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Graphing with Calculus and Calculators | |
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Indeterminate Forms and l'Hospital's Rule | |
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Optimization Problems | |
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Applications to Economics | |
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Newton's Method | |
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Antiderivatives | |
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Review | |
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Focus on Problem Solving | |
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Integrals | |
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Areas and Distances | |
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The Definite Integral | |
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Evaluating Definite Integrals | |
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The Fundamental Theorem of Calculus | |
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The Substitution Rule | |
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Integration by Parts | |
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Additional Techniques of Integration | |
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Integration Using Tables and Computer Algebra Systems | |
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Approximate Integration | |
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Improper Integrals | |
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Review | |
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Focus on Problem Solving | |
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Applications of Integration | |
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More about Areas | |
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Volumes | |
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Arc Length | |
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Average Value of a Function | |
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Applications to Physics and Engineering | |
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Applications to Economics and Biology | |
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Probability | |
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Review | |
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Focus on Problem Solving | |
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Differential Equations | |
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Modeling with Differential Equations | |
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Direction Fields and Euler's Method | |
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Separable Equations | |
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Exponential Growth and Decay | |
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The Logistic Equation | |
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Predator-Prey Systems | |
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Review | |
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Focus on Problem Solving | |
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Infinite Sequences And Series | |
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Sequences | |
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Series | |
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The Integral and Comparison Tests; Estimating Sums | |
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Other Convergence Tests | |
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Power Series | |
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Representation of Functions as Power Series | |
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Taylor and Maclaurin Series | |
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The Binomial Series | |
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Applications of Taylor Polynomials | |
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Review | |
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Focus on Problem Solving | |
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Intervals, Inequalities, And Absolute Values | |
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Coordinate Geometry | |
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Trigonometry | |
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Precise Definitions Of Limits | |
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A Few Proofs | |
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Sigma Notation | |
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Integration Of Rational Functions By Partial Fractions | |
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Polar Coordinates | |
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Complex Numbers | |
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Answers To Odd-Numbered Exercises | |
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Index | |