Simply Good For You
Simply Good For You

Author: Amelia Freer

Publisher: Penguin UK

Published: 2019-12-26

Total Pages: 315

ISBN-13: 1405943459

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Looking after yourself has never been easier than with Simply Good For You, packed with over a hundred delicious, quick and no-nonsense recipes that are as healthy as they are tasty '100 LIGHT & COLOURFUL RECIPES. TASTY STUFF' METRO 'ONE OF THE BEST HEALTHY COOKBOOKS' MAIL ONLINE The delicious new cookbook from the No. 1 bestselling author and leading nutritionist Amelia Freer ___________ Amelia Freer is a No. 1 Sunday Times bestselling author and renowned nutritional therapist, who A-listers turn to when they want to look and feel great. In this beautiful cookbook, discover 100 quick and easy recipes for varied and tempting dishes that are, quite simply, good for you. Recipes include: · BREAKFAST - Butternut Baked Beans, Fruity Breakfast Crumble Bars · LUNCH - Lentil & Lemon Chicken Salad, Vegetable & Feta Fritters · DINNER - Harissa Prawn Skewers with Herbed Broccoli rice, Slow Cooked Pulled Pork with Apple Slaw, One Tray Roasted Winter Salad · SWEET THINGS - Chocolate Raspberry Pots, Coconut & Almond Pear Crumble Inside you'll also find lots of top tips for healthy eating on a budget, ingredient swaps, and kitchen staples. 10% of the author's proceeds from this book will be donated to Women Supporting Women, an initiative of the Prince's Trust, registered charity no. 1079675

Beautiful, Simple, Exact, Crazy
Beautiful, Simple, Exact, Crazy

Author: Apoorva Khare

Publisher: Yale University Press

Published: 2015-08-25

Total Pages: 476

ISBN-13: 0300216424

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Two mathematicians explore how math fits into everything from art, music, and literature to space probes and game shows. In this vibrant work, which is ideal for both teaching and learning, Apoorva Khare and Anna Lachowska explain the mathematics essential for understanding and appreciating our quantitative world. They show with examples that mathematics is a key tool in the creation and appreciation of art, music, and literature, not just science and technology. The book covers basic mathematical topics from logarithms to statistics, but the authors eschew mundane finance and probability problems. Instead, they explain how modular arithmetic helps keep our online transactions safe, how logarithms justify the twelve-tone scale commonly used in music, and how transmissions by deep space probes are like knights serving as messengers for their traveling prince. Perfect for coursework in introductory mathematics and requiring no knowledge of calculus, Khare and Lachowska’s enlightening mathematics tour will appeal to a wide audience. “A whirlwind tour through mathematics and its applications to the real world, laced with stimulating exercises and fascinating historical insights. Destined to become a classic of mathematical exposition.” —Eli Maor, author of e: the Story of a Number and Trigonometric Delights “Khare and Lachowska introduce bite-size pieces of important math by surrounding them with interesting context, from the Monty Hall problem for probability to a story by Dino Buzzati for velocity. Math treated with seriousness and fun.” —Michael Frame, co-author, with Benoit Mandelbrot, of Fractals, Graphics, and Mathematics Education “An excellent book, well-suited for a thoughtful, quantitatively-rigorous ‘Math for Humanists’ course.” —William Goldbloom Bloch, author of The Unimaginable Mathematics of Borges’ Library of Babel

Why Math?
Why Math?

Author: R.D. Driver

Publisher: Springer Science & Business Media

Published: 2012-12-06

Total Pages: 245

ISBN-13: 1461211085

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This text aims to show that mathematics is useful to virtually everyone. And it seeks to accomplish this by offering the reader plenty of practice in elementary mathematical computations motivated by real-world problems. The prerequisite for this book is a little algebra and geometry-nothing more than entrance requirements at most colleges. I hope that users-especially those who "don't like math"-will complete the course with greater confidence in their ability to solve practical problems (without seeking help from someone who is "good at math"). Here is a sampler of some of the problems to be encountered: I. If a U. S. dollar were worth 1. 15 Canadian dollars, what would a Canadian dollar be worth in U. S. money? 2. If the tax rates are reduced 5% one year and then 10% in each of the next 2 years (as they were between 1981 and 1984), what is the overall reduction for the 3 years? 3. An automobile cooling system contains 10 liters ofa mixture of water and antifreeze which is 25% antifreeze. How much of this should be drained out and replaced with pure antifreeze so that the resulting 10 liters will be 40% antifreeze? 4. If you drive halfway at 30 mph and the rest of the distance at 50 mph, what is your average speed for the entire trip? 5. A tank storing solar heated water stands unmolested in a room having an approximately constant temperature of 80°F.

The Strong Sylow Theorem for the Prime p in Simple Locally Finite Groups
The Strong Sylow Theorem for the Prime p in Simple Locally Finite Groups

Author: Dipl.-Math. Felix F. Flemisch

Publisher: BoD – Books on Demand

Published: 2024-09-11

Total Pages: 214

ISBN-13: 3759733247

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This research paper continues [15]. We begin with giving a profound overview of the structure of arbitrary simple groups and in particular of the simple locally finite groups and reduce their Sylow theory for the prime p to a quite famous conjecture by Prof. Otto H. Kegel (see [38], Theorem 2.4) "Let the p-subgroup P be a p-uniqueness subgroup in the finite simple group S which belongs to one of the seven rank-unbounded families. Then the rank of S is bounded in terms of P.") about the rank-unbounded ones of the 19 known families of finite simple groups. We introduce a new scheme to describe the 19 families, the family T of types, define the rank of each type, and emphasise the rôle of Kegel covers. This part presents a unified rather complete picture of known results all of whose proofs are by reference. Subsequently we apply new ideas to prove the conjecture for the Alternating Groups. Thereupon we are remembering Kegel covers and -sequences. Next we suggest future research by stating a way 1) and a way 2) how to prove and even how to optimise Kegel's conjecture step-by-step or peu à peu which leads to Conjecture 1, Conjecture 2 and Conjecture 3 thereby unifying Sylow theory in locally finite simple groups with Sylow theory in locally finite and p-soluble groups whose joint study directs very reliably Sylow theory in (locally) finite groups. For any unexplained terminology we refer to [15]. We then continue the program begun above to optimise along the way 1) the theorem about the first type = An of infinite families of finite simple groups step-by-step to further types by proving it for the second type = A = PSL n . We start with applying new ideas to prove Conjecture 2 about the General Linear Groups over (commutative) locally finite fields, stating that their rank is bounded in terms of their p-uniqueness, and break down this basic insight to the Special Linear Groups and the Projective Special Linear (PSL) Groups over locally finite fields. We close with suggestions for future research regarding the remaining rank-unbounded types (the beautiful "Classical Groups") and the way 2), regarding (locally) finite and p-soluble groups, and regarding our new perceptions of the very pioneering contributions by Cauchy and by Galois to Sylow theory in finite groups. We hope to enthuse group theorists with these suggestions and are ready to coördinate related research work. We include the predecessor research paper [15] as an Appendix.

Beautiful Math
Beautiful Math

Author: Chris Bernhardt

Publisher: MIT Press

Published: 2024-09-17

Total Pages: 240

ISBN-13: 0262549778

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From the bestselling author of Quantum Computing for Everyone, a concise, accessible, and elegant approach to mathematics that not only illustrates concepts but also conveys the surprising nature of the digital information age. Most of us know something about the grand theories of physics that transformed our views of the universe at the start of the twentieth century: quantum mechanics and general relativity. But we are much less familiar with the brilliant theories that make up the backbone of the digital revolution. In Beautiful Math, Chris Bernhardt explores the mathematics at the very heart of the information age. He asks questions such as: What is information? What advantages does digital information have over analog? How do we convert analog signals into digital ones? What is an algorithm? What is a universal computer? And how can a machine learn? The four major themes of Beautiful Math are information, communication, computation, and learning. Bernhardt typically starts with a simple mathematical model of an important concept, then reveals a deep underlying structure connecting concepts from what, at first, appear to be unrelated areas. His goal is to present the concepts using the least amount of mathematics, but nothing is oversimplified. Along the way, Bernhardt also discusses alphabets, the telegraph, and the analog revolution; information theory; redundancy and compression; errors and noise; encryption; how analog information is converted into digital information; algorithms; and, finally, neural networks. Historical anecdotes are included to give a sense of the technology at that time, its impact, and the problems that needed to be solved. Taking its readers by the hand, regardless of their math background, Beautiful Math is a fascinating journey through the mathematical ideas that undergird our everyday digital interactions.