미적분학 1에서는 일변수 함수를 다룬다. 어떤 독자들에게는 이 책이 과학적 내용이 지나치게 많아 다소 당혹스럽게 느껴질 수도 있을 것이다. 그러나 뉴턴이 케플러 법칙을 보이기 위하여 만든 것이 미적분학의 시작이 되었고 그것이 이 책 전반부의 핵심 주제이다. 극한, 미분, 적분, 관성 좌표계, 극좌표계, 변수 변환, 미분 방정식은 이 과학적 목표를 달성하기 위한 수학적 요소들이다. 미적분학은 뉴턴 이후에도 많은 발전을 이루어 왔다. 이 책의 후반부에서는 적분과 미분 기법을 배우지만 핵심은 수열과 급수를 이용한 근사 기법이다. 이 책에서 학생들이 주도적으로 생각할 수 있도록 적절한 질문을 제시하려고 노력하였다. 질문은 학습을 이끄는 원동력이자 창의적 사고의 출발점이다. 이 책에 담긴 질문과 문제들에 대해 생각하고 답을 찾아가는 과정 속에서 학생들이 미적분학을 더욱 깊이 이해할 수 있기를 바란다.

Part I Differentiation: Mathematical Description of Motion

1 Limit and Continuity #1 (with Common Language) 3

1.1 Common Language Definitions 4

1.2 ε-δ arguments for quality control 9

2 Limit and Continuity #2 (with ε-δ argument) 15

2.1 Rigorous definitions using ε-δ 15

2.2 Examples 20

2.3 Limits as and 22

3 Differentiation 25

3.1 Rate of Increase 25

3.2 Differentiation Rules 28

3.3 Intermediate and Mean Value Theorem 32

4 Chain Rule and Variable-Centered Notation 37

4.1 Chain Rule 37

4.2 Variable-Centered Notation 42

5 Integration & Fundamental Theorem of Calculus 49

5.1 Antiderivative 49

5.2 Area Function as an Integral 51

5.3 Riemann Sum and Area 53

6 Inverse Functions and Their Derivatives 63

6.1 Graph and Differentiation 63

6.2 Inverse Functions in Variable-Centered Notation 67

6.3 Integration by change of variables 68

7 Logarithm, Exponential, & Implicit Differentiation 73

7.1 Natural logarithm 73

7.2 Exponential function 76

7.3 Implicit differentiation 78

Part II Kepler and Newton’s Laws of Motion

8 Rectangular Coordinate System and Curves in 85

8.1 Projection and coordinate system 85

8.2 Vector Space 90

8.3 Inner Product 91

8.4 Cross product 94

9 Polar coordinates in 99

9.1 Moving particle and trajectory curves in space 99

9.2 Polar coordinates 100

9.3 Motion in polar coordinates 103

9.4 Ellipse in polar coordinates 105

9.5 Curves in polar coordinates (optional) 107

10 First Order Differential Equations 111

10.1 First order differential equations 111

10.2 Separation of variables 116

10.3 First-Order Linear Equation and Integrating Factor 118

11 Second Order Differential Equations 123

11.1 Second Order Linear Equation 123

11.2 Homogeneous Problem and Characteristic Polynomial 127

11.3 Initial value problem 131

12 Newton’s Law on Earth’s Surface 135

12.1 Newton’s law of motion and gravitation 135

12.2 Work and energy 136

12.3 Gravity force and potential energy on Earth 137

12.4 Projectile motion on Earth 139

13 Newton’s Law in Space: Two-Body Problem 145

13.1 Two-body problem 145

13.2 Center of mass (barycenter) 146

13.3 Kepler problem 148

13.4 Orbit of ICBM #1 (Optional) 152

14 Kepler’s Law (Optional) 157

14.1 Kepler’s first law and elliptical orbits 157

14.2 Examples and Applications 161

Part III The Arts of Calculus

15 Curves and Particle Trajectories in 169

15.1 Arclength as a variable 169

15.2 TNB coordinate system 172

15.3 Computation formulas 177

16 Linearization and Differentiation 181

16.1 Linearization 181

16.2 Differentials 183

16.3 Differentials for linear approximation 185

17 Inverse trigonometric and hyperbolic functions 189

17.1 Inverse trigonometric functions 189

17.2 Hyperbolic functions 194

18 L’Hˆpital’s rule and big-oh / little-oh 199

18.1 L’Hˆpital’s rule 199

18.2 Calculating limits using inverse functions 203

18.3 Big-oh and little-oh 204

19 Integration by substitution and by parts 207

19.1 Substitution 208

19.2 Integration by parts 210

19.3 Trigonometric substitution 213

20 Rational Functions and Improper Integration 217

20.1 Integration of rational functions 217

20.2 Integral over unbounded domains 221

20.3 Integral of unbounded functions 224

Part IV Approximation Techniques and Series

21 Numerical Integration 231

21.1 Numerical integration and Riemann sum 231

21.2 Convergence order 233

21.3 Numerical integration and Gauss–Legendre quadrature 236

22 Sequences and Series 243

22.1 Sequence of real numbers 243

22.2 Series of real numbers 248

22.3 Power series 250

23 Tests for Absolute Convergence 255

23.1 Integral Test 255

23.2 Comparison Test 257

23.3 Ratio test 258

23.4 Root test 261\

24 Power Series 267

24.1 Convergence of a power series 267

24.2 Radius of convergence 269

24.3 Alternating series 272

24.4 Rearrangement and conditional convergence 274

25 Taylor Series 279

25.1 Taylor series 279

25.2 Applications and two other versions 285

25.3 Convergence order of Gauss–Legendre 290

Part V Appendix

26 Energy of Planet Orbits 295

26.1 Potential energy in space 296

26.2 Energy of circular orbits 296

26.3 Energy of elliptical orbits 298

26.4 Interstellar and solar system objects 301

27 Elliptic and Hyperbolic Orbits 303

27.1 Eccentricity and focus of an ellipse 303

27.2 Directrices and ellipses 304

27.3 Polar equations of an ellipse 307

27.4 Display solar system orbits 309

27.5 Orbit of ICBM #2 310

28 Calculus for Planet Orbits 315

28.1 Variable centered notation 315

28.2 Coordinate system 316

28.3 Motion in polar coordinates 316

28.4 Newton’s law of motion and gravitation 317

28.5 Two-body problem 318

28.6 Kepler problem 319

Index 321

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