Description
Book SynopsisTable of ContentsPreface vii
Supplements ix
Acknowledgments xi
The Roots of Calculus xv
1 Limits and Continuity 1
1.1 Limits (An Intuitive Approach) 1
1.2 Computing Limits 13
1.3 Limits at Infinity; End Behavior of a Function 21
1.4 Limits (Discussed More Rigorously) 30
1.5 Continuity 39
1.6 Continuity of Trigonometric Functions 50
2 The Derivative 77
2.1 Tangent Lines and Rates of Change 77
2.2 The Derivative Function 87
2.3 Introduction to Techniques of Differentiation 98
2.4 The Product and Quotient Rules 105
2.5 Derivatives of Trigonometric Functions 110
2.6 The Chain Rule 114
2.7 Implicit Differentiation 124
2.8 Related Rates 142
2.9 Local Linear Approximation; Differentials 149
3 The Derivative in Graphing and Applications 169
3.1 Analysis of Functions I: Increase, Decrease, and Concavity 169
3.2 Analysis of Functions II: Relative Extrema; Graphing Polynomials 180
3.3 Analysis of Functions III: Rational Functions, Cusps, and Vertical Tangents 189
3.4 Absolute Maxima and Minima 200
3.5 Applied Maximum and Minimum Problems 208
3.6 Rectilinear Motion 222
3.7 Newton’s Method 230
3.8 Rolle’s Theorem; Mean-Value Theorem 235
4 Integration 249
4.1 An Overview of the Area Problem 249
4.2 The Indefinite Integral 254
4.3 Integration by Substitution 264
4.4 The Definition of Area as a Limit; Sigma Notation 271
4.5 The Definite Integral 281
4.6 The Fundamental Theorem of Calculus 290
4.7 Rectilinear Motion Revisited Using Integration 302
4.8 Average Value of a Function and its Applications 310
4.9 Evaluating Definite Integrals by Substitution 315
5 Applications of the Definite Integral in Geometry, Science, and Engineering 336
5.1 Area Between Two Curves 336
5.2 Volumes by Slicing; Disks and Washers 344
5.3 Volumes by Cylindrical Shells 354
5.4 Length of a Plane Curve 360
5.5 Area of a Surface of Revolution 365
5.6 Work 370
5.7 Moments, Centers of Gravity, and Centroids 378
5.8 Fluid Pressure and Force 387
6 Exponential, Logarithmic, and Inverse Trigonometric Functions 336
6.1 Exponential and Logarithmic Functions 336
6.2 Derivatives and Integrals Involving Logarithmic Functions 347
6.3 Derivatives of Inverse Functions; Derivatives and Integrals Involving Exponential Functions 353
6.4 Graphs and Applications Involving Logarithmic and Exponential Functions 360
6.5 L’Hôpital’s Rule; Indeterminate Forms 367
6.6 Logarithmic and Other Functions Defined by Integrals 376
6.7 Derivatives and Integrals Involving Inverse Trigonometric Functions 387
6.8 Hyperbolic Functions and Hanging Cables 398
7 Principles of Integral Evaluation 406
7.1 An Overview of Integration Methods 406
7.2 Integration by Parts 409
7.3 Integrating Trigonometric Functions 417
7.4 Trigonometric Substitutions 424
7.5 Integrating Rational Functions by Partial Fractions 430
7.6 Using Computer Algebra Systems and Tables of Integrals 437
7.7 Numerical Integration; Simpson’s Rule 446
7.8 Improper Integrals 458
8 Mathematical Modeling with Differential Equations 471
8.1 Modeling with Differential Equations 471
8.2 Separation of Variables 477
8.3 Slope Fields; Euler’s Method 488
8.4 First-Order Differential Equations and Applications 494
9 Infinite Series 504
9.1 Sequences 504
9.2 Monotone Sequences 513
9.3 Infinite Series 520
9.4 Convergence Tests 528
9.5 The Comparison, Ratio, and Root Tests 534
9.6 Alternating Series; Absolute and Conditional Convergence 539
9.7 Maclaurin and Taylor Polynomials 549
9.8 Maclaurin and Taylor Series; Power Series 559
9.9 Convergence of Taylor Series 567
9.10 Differentiating and Integrating Power Series; Modeling with Taylor Series 575
10 Parametric and Polar Curves; Conic Sections 588
10.1 Parametric Equations; Tangent Lines and Arc Length for Parametric Curves 588
10.2 Polar Coordinates 600
10.3 Tangent Lines, Arc Length, and Area for Polar Curves 613
10.4 Conic Sections 622
10.5 Rotation of Axes; Second-Degree Equations 639
10.6 Conic Sections in Polar Coordinates 644
11 Three-dimensional Space; Vector
11.1 Rectangular Coordinates in 3-Space; Spheres; Cylindrical Surfaces 657
11.2 Vectors 663
11.3 Dot Product; Projections 673
11.4 Cross Product 682
11.5 Parametric Equations of Lines 692
11.6 Planes in 3-Space 698
11.7 Quadric Surfaces 705
11.7 Cylindrical and Spherical Coordinates 715
12 Vector-Valued Functions 723
12.1 Introduction to Vector-Valued Functions 723
12.2 Calculus of Vector-Valued Functions 729
12.3 Change of Parameter; Arc Length 738
12.4 Unit Tangent, Normal, and Binormal Vectors 746
12.5 Curvature 751
12.6 Motion Along a Curve 759
12.7 Kepler’s Laws of Planetary Motion 771
13 Partial Derivatives 781
13.1 Functions of Two or More Variables 781
13.2 Limits and Continuity 791
13.3 Partial Derivatives 800
13.4 Differentiability, Differentials, and Local Linearity 812
13.5 The Chain Rule 820
13.6 Directional Derivatives and Gradients 830
13.7 Tangent Planes and Normal Vectors 840
13.8 Maxima and Minima of Functions of Two Variables 845
13.9 Lagrange Multipliers 856
14 Multiple Integrals 925
14.1 Double Integrals 925
14.2 Double Integrals Over Nonrectangular Regions 932
14.3 Double Integrals in Polar Coordinates 941
14.4 Surface Area; Parametric Surfaces 948
14.5 Triple Integrals 961
14.6 Triple Integrals in Cylindrical and Spherical Coordinates 968
14.7 Change of Variables in Multiple Integrals; Jacobians 977
14.8 Centers of Gravity Using Multiple Integrals 989
15 Topics in Vector Calculus 1001
15.1 Vector Fields 1001
15.2 Line Integrals 1010
15.3 Independence of Path; Conservative Vector Fields 1025
15.4 Green’s Theorem 1035
15.5 Surface Integrals 1042
15.6 Applications of Surface Integrals; Flux 1049
15.7 The Divergence Theorem 1058
15.8 Stokes’ Theorem 1067
Appendix A A1
Appendix B 00
Appendix C 00
Appendix D 00
Appendix E 00
Answers 00
Index I1
