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Real Pictures communicates something profound and familiar. The seriousness of the ordinary human events that gets one from here to there while hopefully initiating the future generation in qualities admirable and kind.
Reprint of the original, first published in 1875. The publishing house Anatiposi publishes historical books as reprints. Due to their age, these books may have missing pages or inferior quality. Our aim is to preserve these books and make them available to the public so that they do not get lost.
A #1 New York Times bestseller, this innovative and wildly funny read-aloud by award-winning humorist/actor B.J. Novak will turn any reader into a comedian—a perfect gift for any special occasion! You might think a book with no pictures seems boring and serious. Except . . . here’s how books work. Everything written on the page has to be said by the person reading it aloud. Even if the words say . . . BLORK. Or BLUURF. Even if the words are a preposterous song about eating ants for breakfast, or just a list of astonishingly goofy sounds like BLAGGITY BLAGGITY and GLIBBITY GLOBBITY. Cleverly irreverent and irresistibly silly, The Book with No Pictures is one that kids will beg to hear again and again. (And parents will be happy to oblige.)
David Moore's Pictures from the Real World is a powerful collection of colour documentary photographs of families on a council estate in Derby, made between 1987 and 1988. At the time, few documentary photographers worked in colour and Moore's choice was in many ways a rebellion against the prevalent aesthetic. It was also a critical response to the new political and social realities imposed by Thatcher's government.The series retains a visceral energy 25 years after the event and documents a very particular time in British social and photographic history.
Based on the authors’ combined 35 years of experience in teaching, A Basic Course in Real Analysis introduces students to the aspects of real analysis in a friendly way. The authors offer insights into the way a typical mathematician works observing patterns, conducting experiments by means of looking at or creating examples, trying to understand the underlying principles, and coming up with guesses or conjectures and then proving them rigorously based on his or her explorations. With more than 100 pictures, the book creates interest in real analysis by encouraging students to think geometrically. Each difficult proof is prefaced by a strategy and explanation of how the strategy is translated into rigorous and precise proofs. The authors then explain the mystery and role of inequalities in analysis to train students to arrive at estimates that will be useful for proofs. They highlight the role of the least upper bound property of real numbers, which underlies all crucial results in real analysis. In addition, the book demonstrates analysis as a qualitative as well as quantitative study of functions, exposing students to arguments that fall under hard analysis. Although there are many books available on this subject, students often find it difficult to learn the essence of analysis on their own or after going through a course on real analysis. Written in a conversational tone, this book explains the hows and whys of real analysis and provides guidance that makes readers think at every stage.
In this second edition of the MAA classic, exploration continues to be an essential component. More than 60 new exercises have been added, and the chapters on Infinite Summations, Differentiability and Continuity, and Convergence of Infinite Series have been reorganized to make it easier to identify the key ideas. A Radical Approach to Real Analysis is an introduction to real analysis, rooted in and informed by the historical issues that shaped its development. It can be used as a textbook, as a resource for the instructor who prefers to teach a traditional course, or as a resource for the student who has been through a traditional course yet still does not understand what real analysis is about and why it was created. The book begins with Fourier's introduction of trigonometric series and the problems they created for the mathematicians of the early 19th century. It follows Cauchy's attempts to establish a firm foundation for calculus and considers his failures as well as his successes. It culminates with Dirichlet's proof of the validity of the Fourier series expansion and explores some of the counterintuitive results Riemann and Weierstrass were led to as a result of Dirichlet's proof.