Description

Book Synopsis

Bridges combinatorics and probability and uniquely includes detailed formulas and proofs to promote mathematical thinking

Combinatorics: An Introduction introduces readers to counting combinatorics, offers examples that feature unique approaches and ideas, and presents case-by-case methods for solving problems.

Detailing how combinatorial problems arise in many areas of pure mathematics, most notably in algebra, probability theory, topology, and geometry, this book provides discussion on logic and paradoxes; sets and set notations; power sets and their cardinality; Venn diagrams; the multiplication principal; and permutations, combinations, and problems combining the multiplication principal. Additional features of this enlightening introduction include:

  • Worked examples, proofs, and exercises in every chapter
  • Detailed explanations of formulas to promote fundamental understanding
  • Promotion of mathematical thinking by examinin

    Table of Contents

    Preface xiii

    1 Logic 1

    1.1 Formal Logic 1

    1.2 Basic Logical Strategies 6

    1.3 The Direct Argument 10

    1.4 More Argument Forms 12

    1.5 Proof By Contradiction 15

    1.6 Exercises 23

    2 Sets 25

    2.1 Set Notation 25

    2.2 Predicates 26

    2.3 Subsets 28

    2.4 Union and Intersection 30

    2.5 Exercises 32

    3 Venn Diagrams 35

    3.1 Inclusion/Exclusion Principle 35

    3.2 Two Circle Venn Diagrams 37

    3.3 Three Square Venn Diagrams 42

    3.4 Exercises 50

    4 Multiplication Principle 55

    4.1 What is the Principle? 55

    4.2 Exercises 60

    5 Permutations 63

    5.1 Some Special Numbers 64

    5.2 Permutations Problems 65

    5.3 Exercises 68

    6 Combinations 69

    6.1 Some Special Numbers 69

    6.2 Combination Problems 70

    6.3 Exercises 74

    7 Problems Combining Techniques 77

    7.1 Significant Order 77

    7.2 Order Not Significant 78

    7.3 Exercises 83

    8 Arrangement Problems 85

    8.1 Examples of Arrangements 86

    8.2 Exercises 91

    9 At Least, At Most, and Or 93

    9.1 Counting With Or 93

    9.2 At Least, At Most 98

    9.3 Exercises 102

    10 Complement Counting 103

    10.1 The Complement Formula 103

    10.2 A New View of ?At Least? 105

    10.3 Exercises 109

    11 Advanced Permutations 111

    11.1 Venn Diagrams and Permutations 111

    11.2 Exercises 120

    12 Advanced Combinations 125

    12.1 Venn Diagrams and Combinations 125

    12.2 Exercises 131

    13 Poker and Counting 133

    13.1 Warm Up Problems 133

    13.2 Poker Hands 135

    13.3 Jacks or Better 141

    13.4 Exercises 143

    14 Advanced Counting 145

    14.1 Indistinguishable Objects 145

    14.2 Circular Permutations 148

    14.3 Bracelets 151

    14.4 Exercises 155

    15 Algebra and Counting 157

    15.1 The Binomial Theorem 157

    15.2 Identities 160

    15.3 Exercises 165

    16 Derangements 167

    16.1 Fixed Point Theorems 168

    16.2 His Own Coat 173

    16.3 Exercises 174

    17 Probability Vocabulary 175

    17.1 Vocabulary 175

    18 Equally Likely Outcomes 181

    18.1 Exercises 188

    19 Probability Trees 189

    19.1 Tree Diagrams 189

    19.2 Exercises 198

    20 Independent Events 199

    20.1 Independence 199

    20.2 Logical Consequences of Influence 202

    20.3 Exercises 206

    21 Sequences and Probability 209

    21.1 Sequences of Events 209

    21.2 Exercises 215

    22 Conditional Probability 217

    22.1 What Does Conditional Mean? 217

    22.2 Exercises 223

    23 Bayes? Theorem 225

    23.1 The Theorem 225

    23.2 Exercises 230

    24 Statistics 231

    24.1 Introduction 231

    24.2 Probability is not Statistics 231

    24.3 Conversational Probability 232

    24.4 Conditional Statistics 239

    24.5 The Mean 241

    24.6 Median 242

    24.7 Randomness 244

    25 Linear Programming 249

    25.1 Continuous Variables 249

    25.2 Discrete Variables 254

    25.3 Incorrectly Applied Rules 258

    26 Subjective Truth 261

    Bibliography 267

    Index 269

Combinatorics

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    A Hardback by TG Faticoni


      View other formats and editions of Combinatorics by TG Faticoni

      Publisher: Wiley-Blackwell
      Publication Date: 3/12/2013 12:00:00 AM
      ISBN13: 9781118404362, 978-1118404362
      ISBN10: 111840436X
      Also in:
      Mathematics

      Description

      Book Synopsis

      Bridges combinatorics and probability and uniquely includes detailed formulas and proofs to promote mathematical thinking

      Combinatorics: An Introduction introduces readers to counting combinatorics, offers examples that feature unique approaches and ideas, and presents case-by-case methods for solving problems.

      Detailing how combinatorial problems arise in many areas of pure mathematics, most notably in algebra, probability theory, topology, and geometry, this book provides discussion on logic and paradoxes; sets and set notations; power sets and their cardinality; Venn diagrams; the multiplication principal; and permutations, combinations, and problems combining the multiplication principal. Additional features of this enlightening introduction include:

      • Worked examples, proofs, and exercises in every chapter
      • Detailed explanations of formulas to promote fundamental understanding
      • Promotion of mathematical thinking by examinin

        Table of Contents

        Preface xiii

        1 Logic 1

        1.1 Formal Logic 1

        1.2 Basic Logical Strategies 6

        1.3 The Direct Argument 10

        1.4 More Argument Forms 12

        1.5 Proof By Contradiction 15

        1.6 Exercises 23

        2 Sets 25

        2.1 Set Notation 25

        2.2 Predicates 26

        2.3 Subsets 28

        2.4 Union and Intersection 30

        2.5 Exercises 32

        3 Venn Diagrams 35

        3.1 Inclusion/Exclusion Principle 35

        3.2 Two Circle Venn Diagrams 37

        3.3 Three Square Venn Diagrams 42

        3.4 Exercises 50

        4 Multiplication Principle 55

        4.1 What is the Principle? 55

        4.2 Exercises 60

        5 Permutations 63

        5.1 Some Special Numbers 64

        5.2 Permutations Problems 65

        5.3 Exercises 68

        6 Combinations 69

        6.1 Some Special Numbers 69

        6.2 Combination Problems 70

        6.3 Exercises 74

        7 Problems Combining Techniques 77

        7.1 Significant Order 77

        7.2 Order Not Significant 78

        7.3 Exercises 83

        8 Arrangement Problems 85

        8.1 Examples of Arrangements 86

        8.2 Exercises 91

        9 At Least, At Most, and Or 93

        9.1 Counting With Or 93

        9.2 At Least, At Most 98

        9.3 Exercises 102

        10 Complement Counting 103

        10.1 The Complement Formula 103

        10.2 A New View of ?At Least? 105

        10.3 Exercises 109

        11 Advanced Permutations 111

        11.1 Venn Diagrams and Permutations 111

        11.2 Exercises 120

        12 Advanced Combinations 125

        12.1 Venn Diagrams and Combinations 125

        12.2 Exercises 131

        13 Poker and Counting 133

        13.1 Warm Up Problems 133

        13.2 Poker Hands 135

        13.3 Jacks or Better 141

        13.4 Exercises 143

        14 Advanced Counting 145

        14.1 Indistinguishable Objects 145

        14.2 Circular Permutations 148

        14.3 Bracelets 151

        14.4 Exercises 155

        15 Algebra and Counting 157

        15.1 The Binomial Theorem 157

        15.2 Identities 160

        15.3 Exercises 165

        16 Derangements 167

        16.1 Fixed Point Theorems 168

        16.2 His Own Coat 173

        16.3 Exercises 174

        17 Probability Vocabulary 175

        17.1 Vocabulary 175

        18 Equally Likely Outcomes 181

        18.1 Exercises 188

        19 Probability Trees 189

        19.1 Tree Diagrams 189

        19.2 Exercises 198

        20 Independent Events 199

        20.1 Independence 199

        20.2 Logical Consequences of Influence 202

        20.3 Exercises 206

        21 Sequences and Probability 209

        21.1 Sequences of Events 209

        21.2 Exercises 215

        22 Conditional Probability 217

        22.1 What Does Conditional Mean? 217

        22.2 Exercises 223

        23 Bayes? Theorem 225

        23.1 The Theorem 225

        23.2 Exercises 230

        24 Statistics 231

        24.1 Introduction 231

        24.2 Probability is not Statistics 231

        24.3 Conversational Probability 232

        24.4 Conditional Statistics 239

        24.5 The Mean 241

        24.6 Median 242

        24.7 Randomness 244

        25 Linear Programming 249

        25.1 Continuous Variables 249

        25.2 Discrete Variables 254

        25.3 Incorrectly Applied Rules 258

        26 Subjective Truth 261

        Bibliography 267

        Index 269

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