Probability
John Wiley & Sons Inc (Verlag)
978-1-118-24125-7 (ISBN)
An introduction to probability at the undergraduate level
Chance and randomness are encountered on a daily basis. Authored by a highly qualified professor in the field, Probability: With Applications and R delves into the theories and applications essential to obtaining a thorough understanding of probability.
With real-life examples and thoughtful exercises from fields as diverse as biology, computer science, cryptology, ecology, public health, and sports, the book is accessible for a variety of readers. The book’s emphasis on simulation through the use of the popular R software language clarifies and illustrates key computational and theoretical results.
Probability: With Applications and R helps readers develop problem-solving skills and delivers an appropriate mix of theory and application. The book includes:
Chapters covering first principles, conditional probability, independent trials, random variables, discrete distributions, continuous probability, continuous distributions, conditional distribution, and limits
An early introduction to random variables and Monte Carlo simulation and an emphasis on conditional probability, conditioning, and developing probabilistic intuition
An R tutorial with example script files
Many classic and historical problems of probability as well as nontraditional material, such as Benford’s law, power-law distributions, and Bayesian statistics
A topics section with suitable material for projects and explorations, such as random walk on graphs, Markov chains, and Markov chain Monte Carlo
Chapter-by-chapter summaries and hundreds of practical exercises
Probability: With Applications and R is an ideal text for a beginning course in probability at the undergraduate level.
ROBERT P. DOBROW, PhD, is Professor of Mathematics at Carleton College. He has taught probability for over fifteen years and has authored numerous papers in probability theory, Markov chains, and statistics.
Preface xi
Acknowledgments xiv
Introduction xv
1 First Principles 1
1.1 Random Experiment, Sample Space, Event 1
1.2 What Is a Probability? 3
1.3 Probability Function 4
1.4 Properties of Probabilities 7
1.5 Equally Likely Outcomes 10
1.6 Counting I 12
1.7 Problem-Solving Strategies: Complements, Inclusion–Exclusion 14
1.8 Random Variables 18
1.9 A Closer Look at Random Variables 21
1.10 A First Look at Simulation 22
1.11 Summary 26
Exercises 27
2 Conditional Probability 34
2.1 Conditional Probability 34
2.2 New Information Changes the Sample Space 39
2.3 Finding P(A and B) 40
2.4 Conditioning and the Law of Total Probability 49
2.5 Bayes Formula and Inverting a Conditional Probability 57
2.6 Summary 61
Exercises 62
3 Independence and Independent Trials 68
3.1 Independence and Dependence 68
3.2 Independent Random Variables 76
3.3 Bernoulli Sequences 77
3.4 Counting II 79
3.5 Binomial Distribution 88
3.6 Stirling’s Approximation 95
3.7 Poisson Distribution 96
3.8 Product Spaces 105
3.9 Summary 107
Exercises 109
4 Random Variables 117
4.1 Expectation 118
4.2 Functions of Random Variables 121
4.3 Joint Distributions 125
4.4 Independent Random Variables 130
4.5 Linearity of Expectation 135
4.6 Variance and Standard Deviation 140
4.7 Covariance and Correlation 149
4.8 Conditional Distribution 156
4.9 Properties of Covariance and Correlation 162
4.10 Expectation of a Function of a Random Variable 164
4.11 Summary 165
Exercises 168
5 A Bounty of Discrete Distributions 176
5.1 Geometric Distribution 176
5.2 Negative Binomial—Up from the Geometric 184
5.3 Hypergeometric—Sampling Without Replacement 189
5.4 From Binomial to Multinomial 194
5.5 Benford’s Law 201
5.6 Summary 203
Exercises 205
6 Continuous Probability 211
6.1 Probability Density Function 213
6.2 Cumulative Distribution Function 216
6.3 Uniform Distribution 220
6.4 Expectation and Variance 222
6.5 Exponential Distribution 224
6.6 Functions of Random Variables I 229
6.7 Joint Distributions 235
6.8 Independence 243
6.9 Covariance, Correlation 249
6.10 Functions of Random Variables II 251
6.11 Geometric Probability 256
6.12 Summary 262
Exercises 265
7 Continuous Distributions 273
7.1 Normal Distribution 273
7.2 Gamma Distribution 290
7.3 Poisson Process 296
7.4 Beta Distribution 304
7.5 Pareto Distribution, Power Laws, and the 80-20 Rule 308
7.6 Summary 312
Exercises 315
8 Conditional Distribution, Expectation, and Variance 322
8.1 Conditional Distributions 322
8.2 Discrete and Continuous: Mixing it up 328
8.3 Conditional Expectation 332
8.4 Computing Probabilities by Conditioning 342
8.5 Conditional Variance 346
8.6 Summary 352
Exercises 353
9 Limits 359
9.1 Weak Law of Large Numbers 361
9.2 Strong Law of Large Numbers 367
9.3 Monte Carlo Integration 372
9.4 Central Limit Theorem 376
9.5 Moment-Generating Functions 385
9.6 Summary 391
Exercises 392
10 Additional Topics 399
10.1 Bivariate Normal Distribution 399
10.2 Transformations of Two Random Variables 407
10.3 Method of Moments 411
10.4 Random Walk on Graphs 413
10.5 Random Walks on Weighted Graphs and Markov Chains 421
10.6 From Markov Chain to Markov Chain Monte Carlo 429
10.7 Summary 440
Exercises 442
Appendix A Getting Started with R 447
Appendix B Probability Distributions in R 458
Appendix C Summary of Probability Distributions 459
Appendix D Reminders from Algebra and Calculus 462
Appendix E More Problems for Practice 464
Solutions to Exercises 469
References 487
Index 491
Verlagsort | New York |
---|---|
Sprache | englisch |
Maße | 165 x 236 mm |
Gewicht | 839 g |
Themenwelt | Mathematik / Informatik ► Mathematik ► Wahrscheinlichkeit / Kombinatorik |
ISBN-10 | 1-118-24125-8 / 1118241258 |
ISBN-13 | 978-1-118-24125-7 / 9781118241257 |
Zustand | Neuware |
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