# Classic Problems of Probability

# Classic Problems of Probability

ISBN: 978-1-118-31433-3

Apr 2012

328 pages

$52.99

## Description

Winner of the 2012 PROSE Award for Mathematics from The American Publishers Awards for Professional and Scholarly Excellence.

**"A great book, one that I will certainly add to my personal library." **—

**Paul J. Nahin**, Professor Emeritus of Electrical Engineering, University of New Hampshire

Cl*assic Problems of Probability* presents a lively account of the most intriguing aspects of statistics. The book features a large collection of more than thirty classic probability problems which have been carefully selected for their interesting history, the way they have shaped the field, and their counterintuitive nature.

From Cardano's 1564 Games of Chance to Jacob Bernoulli's 1713 Golden Theorem to Parrondo's 1996 Perplexing Paradox, the book clearly outlines the puzzles and problems of probability, interweaving the discussion with rich historical detail and the story of how the mathematicians involved arrived at their solutions. Each problem is given an in-depth treatment, including detailed and rigorous mathematical proofs as needed. Some of the fascinating topics discussed by the author include:

- Buffon's Needle problem and its ingenious treatment by Joseph Barbier, culminating into a discussion of invariance
- Various paradoxes raised by Joseph Bertrand
- Classic problems in decision theory, including Pascal's Wager, Kraitchik's Neckties, and Newcomb's problem
- The Bayesian paradigm and various philosophies of probability
- Coverage of both elementary and more complex problems, including the Chevalier de Méré problems, Fisher and the lady testing tea, the birthday problem and its various extensions, and the Borel-Kolmogorov paradox

*Classic Problems of Probability* is an eye-opening, one-of-a-kind reference for researchers and professionals interested in the history of probability and the varied problem-solving strategies employed throughout the ages. The book also serves as an insightful supplement for courses on mathematical probability and introductory probability and statistics at the undergraduate level.

Problem 1. Cardano and Games of Chance (1564) 8

Problem 2. Gailieo and a Discovery Concerning Dice (1620) 15

Problem 3. The Chevalier de Méré Problem I: The Problem of Dice (1654) 17

Problem 4. The Chevalier de Méré Problem II: The Problem of Points (1654) 22

Problem 5. Huygens and the Gambler’s Ruin (1657) 39

Problem 6. The Pepys-Newton Connection (1693) 47

Problem 7. Rencontres with Montmort (1708) 50

Problem 8. Jacob Bernoulli and his Golden Theorem (1713) 54

Problem 9. De Moivre’s Problem (1730) 71

Problem 10. De Moivre, Gauss, and the Normal Curve (1730, 1809) 79

Problem 11. Daniel Bernoulli and the St Petersburg Problem (1738) 94

Problem 12. D’Alembert and the “Croix ou Pile” Article (1754) 102

Problem 13. D’Alembert and the Gambler’s Fallacy (1761) 105

Problem 14. Bayes, Laplace, and Philosophies of Probability (1764, 1774) 109

Problem 15. Leibniz’s Error (1768) 132

Problem 16. The Buffon Needle Problem (1777) 134

Problem 17. Bertrand’s Ballot Problem (1887) 143

Problem 18. Bertrand’s Strange Three Boxes (1889) 147

Problem 19. Bertrand’s Chords (1889) 151

Problem 20. Three Coins and a Puzzle from Galton (1894) 156

Problem 21. Lewis Carroll’s Pillow Problem No. 72 (1894) 157

Problem 22. Borel and A Different Kind of Normality (1909) 161

Problem 23. Borel’s Paradox and Kolmogorov’s Axioms (1909, 1933) 165

Problem 24. Of Borel, Monkeys, and the New Creationism (1913) 173

Problem 25. Kraitchik’s Neckties and Newcomb’s Problem (1930, 1960)

Problem 26. Fisher and the lady Tasting Tea (1935) 188

Problem 27. Benford and the Peculiar Behavior of the First Significant Digit (1938) 195

Problem 28. Coinciding Birthdays (1939) 200

Problem 29. Lévy and the Arc Sine Law (1939) 206

Problem 30. Simpson’s Paradox (1951) 210

Problem 31. Gamow, Stern, and Elevators (1958) 215

Problem 32. Monty-Hall, Cars, and Goats (1975) 218

Problem 33. Parrondo’s Perplexing Paradox (1996) 224

Bibliography 230

Photo Credits 254

“Thus, the book can be highly recommend to every lecturer in this field and every student interested in probability and statistics.” (*Zentralblatt Math*, 1 September 2013)