Description

Book Synopsis
First course calculus texts have traditionally been either engineering/science-oriented with too little rigor, or have thrown students in the deep end with a rigorous analysis text.

Table of Contents

Preface ix

Introduction xi

Preliminary notation xv

1 The real numbers 1

1.1 Intuitive picture of R as points on the number line 2

1.2 The field axioms 6

1.3 Order axioms 8

1.4 The Least Upper Bound Property of R 9

1.5 Rational powers of real numbers 20

1.6 Intervals 21

1.7 Absolute value |·|and distance in R 23

1.8 (∗) Remark on the construction of R 26

1.9 Functions 28

1.10 (∗) Cardinality 40

Notes 43

2 Sequences 44

2.1 Limit of a convergent sequence 46

2.2 Bounded and monotone sequences 54

2.3 Algebra of limits 59

2.4 Sandwich theorem 64

2.5 Subsequences 68

2.6 Cauchy sequences and completeness of R 74

2.7 (∗) Pointwise versus uniform convergence 78

Notes 85

3 Continuity 86

3.1 Definition of continuity 86

3.2 Continuous functions preserve convergence 91

3.3 Intermediate Value Theorem 99

3.4 Extreme Value Theorem 106

3.5 Uniform convergence and continuity 111

3.6 Uniform continuity 111

3.7 Limits 115

Notes 124

4 Differentiation 125

4.1 Differentiable Inverse Theorem 136

4.2 The Chain Rule 140

4.3 Higher order derivatives and derivatives at boundary points 144

4.4 Equations of tangent and normal lines to a curve 148

4.5 Local minimisers and derivatives 157

4.6 Mean Value, Rolle’s, Cauchy’s Theorem 159

4.7 Taylor’s Formula 167

4.8 Convexity 172

4.9 0/0 form of l’Hôpital’s Rule 180

Notes 182

5 Integration 183

5.1 Towards a definition of the integral 183

5.2 Properties of the Riemann integral 198

5.3 Fundamental Theorem of Calculus 210

5.4 Riemann sums 226

5.5 Improper integrals 232

5.6 Elementary transcendental functions 245

5.7 Applications of Riemann Integration 278

Notes 296

6 Series 297

6.1 Series 297

6.2 Absolute convergence 305

6.3 Power series 320

Appendix 335

Notes 337

Solutions 338

Solutions to the exercises from Chapter 1 338

Solutions to the exercises from Chapter 2 353

Solutions to the exercises from Chapter 3 369

Solutions to the exercises from Chapter 4 388

Solutions to the exercises from Chapter 5 422

Solutions to the exercises from Chapter 6 475

Bibliography 493

Index 495

The How and Why of One Variable Calculus

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    Order before 4pm today for delivery by Wed 24 Jun 2026.

    A Hardback by Amol Sasane


      View other formats and editions of The How and Why of One Variable Calculus by Amol Sasane

      Publisher: John Wiley & Sons Inc
      Publication Date: 14/08/2015
      ISBN13: 9781119043386, 978-1119043386
      ISBN10: 1119043387

      Description

      Book Synopsis
      First course calculus texts have traditionally been either engineering/science-oriented with too little rigor, or have thrown students in the deep end with a rigorous analysis text.

      Table of Contents

      Preface ix

      Introduction xi

      Preliminary notation xv

      1 The real numbers 1

      1.1 Intuitive picture of R as points on the number line 2

      1.2 The field axioms 6

      1.3 Order axioms 8

      1.4 The Least Upper Bound Property of R 9

      1.5 Rational powers of real numbers 20

      1.6 Intervals 21

      1.7 Absolute value |·|and distance in R 23

      1.8 (∗) Remark on the construction of R 26

      1.9 Functions 28

      1.10 (∗) Cardinality 40

      Notes 43

      2 Sequences 44

      2.1 Limit of a convergent sequence 46

      2.2 Bounded and monotone sequences 54

      2.3 Algebra of limits 59

      2.4 Sandwich theorem 64

      2.5 Subsequences 68

      2.6 Cauchy sequences and completeness of R 74

      2.7 (∗) Pointwise versus uniform convergence 78

      Notes 85

      3 Continuity 86

      3.1 Definition of continuity 86

      3.2 Continuous functions preserve convergence 91

      3.3 Intermediate Value Theorem 99

      3.4 Extreme Value Theorem 106

      3.5 Uniform convergence and continuity 111

      3.6 Uniform continuity 111

      3.7 Limits 115

      Notes 124

      4 Differentiation 125

      4.1 Differentiable Inverse Theorem 136

      4.2 The Chain Rule 140

      4.3 Higher order derivatives and derivatives at boundary points 144

      4.4 Equations of tangent and normal lines to a curve 148

      4.5 Local minimisers and derivatives 157

      4.6 Mean Value, Rolle’s, Cauchy’s Theorem 159

      4.7 Taylor’s Formula 167

      4.8 Convexity 172

      4.9 0/0 form of l’Hôpital’s Rule 180

      Notes 182

      5 Integration 183

      5.1 Towards a definition of the integral 183

      5.2 Properties of the Riemann integral 198

      5.3 Fundamental Theorem of Calculus 210

      5.4 Riemann sums 226

      5.5 Improper integrals 232

      5.6 Elementary transcendental functions 245

      5.7 Applications of Riemann Integration 278

      Notes 296

      6 Series 297

      6.1 Series 297

      6.2 Absolute convergence 305

      6.3 Power series 320

      Appendix 335

      Notes 337

      Solutions 338

      Solutions to the exercises from Chapter 1 338

      Solutions to the exercises from Chapter 2 353

      Solutions to the exercises from Chapter 3 369

      Solutions to the exercises from Chapter 4 388

      Solutions to the exercises from Chapter 5 422

      Solutions to the exercises from Chapter 6 475

      Bibliography 493

      Index 495

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