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A celebration of newly found freedom and reflections upon the contradictions of post-Soviet society.
María de San José Salazar (1548-1603) took the veil as a Discalced ("barefoot") Carmelite nun in 1571, becoming one of Teresa of Avila's most important collaborators in religious reform and serving as prioress of the Seville and Lisbon convents. Within the parameters of the strict Catholic Reformation in Spain, María fiercely defended women's rights to define their own spiritual experience and to teach, inspire, and lead other women in reforming their church. María wrote this book as a defense of the Discalced practice of setting aside two hours each day for conversation, music, and staging of religious plays. Casting the book in the form of a dialogue, María demonstrates through fictional conversations among a group of nuns during their hours of recreation how women could serve as very effective spiritual teachers for each other. The book includes one of the first biographical portraits of Teresa and Maria's personal account of the troubled founding of the Discalced convent at Seville, as well as her tribulations as an Inquisitional suspect. Rich in allusions to women's affective relationships in the early modern convent, Book for the Hour of Recreation also serves as an example of how a woman might write when relatively free of clerical censorship and expectations. A detailed introduction and notes by Alison Weber provide historical and biographical context for Amanda Powell's fluid translation.
Praised for its "exceptionally good value" by the Journal of Recreational Mathematics, this book offers fun-filled insights into many fields of mathematics. The brainteasers include original puzzles as well as new approaches to classic conundrums. A vast assortment of challenges features domino puzzles, the game of noughts and crosses, games of encirclement, sliding movement puzzles, subtraction games, puzzles in mechanics, games with piles of matches, a road puzzle with concentric circles, "Catch the Giant," and much more. Detailed solutions show several methods by which a particular problem may be answered, why one method is preferable, and where the others fail. With numerous worked examples, the clear, step-by-step analyses cover how the problem should be approached, including hints and enumeration of possibilities and determination of probabilities, application of the theory of probability, and evaluation of contingencies and mean values. Readers are certain to improve their puzzle-solving strategies as well as their mathematical skills.
Games, puzzles by disciples of master mathematician include geometrical puzzles, items on tiling, numbers & coding theory, more.
Ranging from ancient Greek and Roman problems to the most modern applications of special mathematical techniques for amusement, this popular volume contains material to delight both beginners and advanced mathematicians. Its 250 lively puzzles, problems, situations, and demonstrations of recreational mathematics feature full solutions and analyses. Fifty-seven highly unusual historic problems are derived from ancient Greek, medieval European, Arabic, and Hindu sources. Other problems are based on "mathematics without numbers," geometry, topology, the calendar, arithmetic, and the mathematics of chess moves. Fifty pages comprise numerical pastimes built out of figurate numbers, Mersenne numbers, Fermat numbers, cyclic numbers, automorphic numbers, and prime numbers; probability problems are also fully analyzed. More than forty pages are devoted to magic squares, and the concluding portion of the book presents more than twenty-five new positional and permutational games of permanent value. A discussion of fairy chess is followed by rules and procedural information on latruncles, go, reversi, jinx, ruma, lasca, tricolor, four-story towers, tetrachrome, and other games. More than a collection of wonderful puzzles, this volume offers a thorough, rigorous, and entertaining sampler of recreational mathematics, highlighted by numerous insights into specialized fields.
This book provides an in-depth look at the primary foundations of economics explored through the lens of the Pawnee Department of Parks and Recreation. Each episode of the hit television series, Parks and Recreation, includes material to help an eager learner understand the basics of one of the most fascinating fields of study. Whether you’ve wondered how economists determine specialization or why fast-food restaurants continue to pop up around your neighborhood, the same situations have occurred in Pawnee. Each chapter highlights key scenes or major episodes that demonstrate how the characters experience economics in exactly the same way the rest of us do. This text primarily builds on the debates that take place between Leslie, Ron, and their co-workers, while also exploring key questions such as whether governments should try to help people through direct intervention or sell off all the swings to private corporations and let businesses handle day-to-day decisions. Learn how incentives can make Jerry appear to be a more productive employee short-term, but end up causing chaos. Do you wonder what it would be like to live in the early 1800s? Thankfully Leslie has already done that for us. This book is a must-read for anyone looking for a fun way to learn the principles of economics, including as a supplementary text, and for all fans of Parks and Recreation. Take the advice of Tom and Donna and treat yo’ self to this key read.
Mathematical Recreations and Essays W. W. Rouse Ball For nearly a century, this sparkling classic has provided stimulating hours of entertainment to the mathematically inclined. The problems posed here often involve fundamental mathematical methods and notions, but their chief appeal is their capacity to tease and delight. In these pages you will find scores of "recreations" to amuse you and to challenge your problem-solving faculties-often to the limit. Now in its 13th edition, Mathematical Recreations and Essays has been thoroughly revised and updated over the decades since its first publication in 1892. This latest edition retains all the remarkable character of the original, but the terminology and treatment of some problems have been updated and new material has been added. Among the challenges in store for you: Arithmetical and geometrical recreations; Polyhedra; Chess-board recreations; Magic squares; Map-coloring problems; Unicursal problems; Cryptography and cryptanalysis; Calculating prodigies; ... and more. You'll even find problems which mathematical ingenuity can solve but the computer cannot. No knowledge of calculus or analytic geometry is necessary to enjoy these games and puzzles. With basic mathematical skills and the desire to meet a challenge you can put yourself to the test and win. "A must to add to your mathematics library."-The Mathematics Teacher We are delighted to publish this classic book as part of our extensive Classic Library collection. Many of the books in our collection have been out of print for decades, and therefore have not been accessible to the general public. The aim of our publishing program is to facilitate rapid access to this vast reservoir of literature, and our view is that this is a significant literary work, which deserves to be brought back into print after many decades. The contents of the vast majority of titles in the Classic Library have been scanned from the original works. To ensure a high quality product, each title has been meticulously hand curated by our staff. Our philosophy has been guided by a desire to provide the reader with a book that is as close as possible to ownership of the original work. We hope that you will enjoy this wonderful classic work, and that for you it becomes an enriching experience.
Professor Malcolmson provides a full account of the sports, pastimes and festive celebrations of the English labouring people in the eighteenth century.
Number theory proves to be a virtually inexhaustible source of intriguing puzzle problems. Includes divisors, perfect numbers, the congruences of Gauss, scales of notation, the Pell equation, more. Solutions to all problems.