Texas Hold'em for Dummies


Mark Harlan - 2006
    It's a game that's deceptively simple, yet within its easy framework you'll find truth and trickery, boredom and fear, skill and misfortune—in other words, all the things that make life fun and worth living! Texas Hold'em For Dummies introduces you to the fundamental concepts and strategies of this wildly popular game. It covers the rules for playing and betting, odds, etiquette, Hold'em lingo, and offers sound advice to avoid mistakes. This handy reference guide gives new and even seasoned players winning strategies and tactics not just for playing the game, but for winning. You'll learn: —Rules and strategies for limit, no-limit, tournament, and online play—How to play the other players—The importance of your bankroll—recommended sizes and more—Hands you should and should not play—How to camouflage your play and dodge traps—When, who, and how to bluff—How to maximize your win with check-raising and trapping—The different approaches for playing in private games, casinos, card rooms, tournaments, and on the Internet—How to use mathematics to your advantageTexas Hold 'Em is a game of both skill and chance. But it's a game that can be beaten, and whether you want to make money, sharpen your game, or just have a good time, Texas Hold 'Em for Dummies will give you the winning edge.

A Tour of the Calculus


David Berlinski - 1995
    Just how calculus makes these things possible and in doing so finds a correspondence between real numbers and the real world is the subject of this dazzling book by a writer of extraordinary clarity and stylistic brio. Even as he initiates us into the mysteries of real numbers, functions, and limits, Berlinski explores the furthest implications of his subject, revealing how the calculus reconciles the precision of numbers with the fluidity of the changing universe. "An odd and tantalizing book by a writer who takes immense pleasure in this great mathematical tool, and tries to create it in others."--New York Times Book Review

Book of Proof


Richard Hammack - 2009
    It is a bridge from the computational courses (such as calculus or differential equations) that students typically encounter in their first year of college to a more abstract outlook. It lays a foundation for more theoretical courses such as topology, analysis and abstract algebra. Although it may be more meaningful to the student who has had some calculus, there is really no prerequisite other than a measure of mathematical maturity. Topics include sets, logic, counting, methods of conditional and non-conditional proof, disproof, induction, relations, functions and infinite cardinality.