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Unlike some other reproductions of classic texts (1) We have not
used OCR(Optical Character Recognition), as this leads to bad
quality books with introduced typos. (2) In books where there are
images such as portraits, maps, sketches etc We have endeavoured to
keep the quality of these images, so they represent accurately the
original artefact. Although occasionally there may be certain
imperfections with these old texts, we feel they deserve to be made
available for future generations to enjoy.
How playwrights from Alfred Jarry and Samuel Beckett to Tom
Stoppard and Simon McBurney brought the power of abstract
mathematics to the human stage The discovery of alternate
geometries, paradoxes of the infinite, incompleteness, and chaos
theory revealed that, despite its reputation for certainty,
mathematical truth is not immutable, perfect, or even perfectible.
Beginning in the last century, a handful of adventurous playwrights
took inspiration from the fractures of modern mathematics to expand
their own artistic boundaries. Originating in the early
avant-garde, mathematics-infused theater reached a popular apex in
Tom Stoppard’s 1993 play Arcadia. In The Proof Stage,
mathematician Stephen Abbott explores this unlikely collaboration
of theater and mathematics. He probes the impact of mathematics on
such influential writers as Alfred Jarry, Samuel Beckett, Bertolt
Brecht, and Stoppard, and delves into the life and mathematics of
Alan Turing as they are rendered onstage. The result is an
unexpected story about the mutually illuminating relationship
between proofs and plays—from Euclid and Euripides to Gödel and
Godot. Theater is uniquely poised to discover the soulful, human
truths embedded in the austere theorems of mathematics, but this is
a difficult feat. It took Stoppard twenty-five years of
experimenting with the creative possibilities of mathematics before
he succeeded in making fractal geometry and chaos theory integral
to Arcadia’s emotional arc. In addition to charting Stoppard’s
journey, Abbott examines the post-Arcadia wave of ambitious works
by Michael Frayn, David Auburn, Simon McBurney, Snoo Wilson, John
Mighton, and others. Collectively, these gifted playwrights
transform the great philosophical upheavals of mathematics into
profound and sometimes poignant revelations about the human
journey.
This lively introductory text exposes the student to the rewards of
a rigorous study of functions of a real variable. In each chapter,
informal discussions of questions that give analysis its inherent
fascination are followed by precise, but not overly formal,
developments of the techniques needed to make sense of them. By
focusing on the unifying themes of approximation and the resolution
of paradoxes that arise in the transition from the finite to the
infinite, the text turns what could be a daunting cascade of
definitions and theorems into a coherent and engaging progression
of ideas. Acutely aware of the need for rigor, the student is much
better prepared to understand what constitutes a proper
mathematical proof and how to write one. Fifteen years of classroom
experience with the first edition of Understanding Analysis have
solidified and refined the central narrative of the second edition.
Roughly 150 new exercises join a selection of the best exercises
from the first edition, and three more project-style sections have
been added. Investigations of Euler's computation of (2), the
Weierstrass Approximation Theorem, and the gamma function are now
among the book's cohort of seminal results serving as motivation
and payoff for the beginning student to master the methods of
analysis.
This lively introductory text exposes the student to the rewards of
a rigorous study of functions of a real variable. In each chapter,
informal discussions of questions that give analysis its inherent
fascination are followed by precise, but not overly formal,
developments of the techniques needed to make sense of them. By
focusing on the unifying themes of approximation and the resolution
of paradoxes that arise in the transition from the finite to the
infinite, the text turns what could be a daunting cascade of
definitions and theorems into a coherent and engaging progression
of ideas. Acutely aware of the need for rigor, the student is much
better prepared to understand what constitutes a proper
mathematical proof and how to write one. Fifteen years of classroom
experience with the first edition of Understanding Analysis have
solidified and refined the central narrative of the second edition.
Roughly 150 new exercises join a selection of the best exercises
from the first edition, and three more project-style sections have
been added. Investigations of Euler's computation of (2), the
Weierstrass Approximation Theorem, and the gamma function are now
among the book's cohort of seminal results serving as motivation
and payoff for the beginning student to master the methods of
analysis.
This popular science title covers adhesion science in an easily
accessible entertaining manner. As well as outlining types of
adhesion and their importance in everyday life, the book covers
interesting future applications of adhesion and inspiration taken
from nature. Ideal for students and the scientifically minded
reader this book provides a fascinating introduction to the science
of what makes things stick.
Getting certified to teach high school mathematics typically
requires completing a course in real analysis. Yet most teachers
point out real analysis content bears little resemblance to
secondary mathematics and report it does not influence their
teaching in any significant way. This textbook is our attempt to
change the narrative. It is our belief that analysis can be a
meaningful part of a teacher's mathematical education and
preparation for teaching. This book is a companion text. It is
intended to be a supplemental resource, used in conjunction with a
more traditional real analysis book. The textbook is based on our
efforts to identify ways that studying real analysis can provide
future teachers with genuine opportunities to think about teaching
secondary mathematics. It focuses on how mathematical ideas are
connected to the practice of teaching secondary mathematics-and not
just the content of secondary mathematics itself. Discussions
around pedagogy are premised on the belief that the way
mathematicians do mathematics can be useful for how we think about
teaching mathematics. The book uses particular situations in
teaching to make explicit ways that the content of real analysis
might be important for teaching secondary mathematics, and how
mathematical practices prevalent in the study of real analysis can
be incorporated as practices for teaching.This textbook will be of
particular interest to mathematics instructors-and mathematics
teacher educators-thinking about how the mathematics of real
analysis might be applicable to secondary teaching, as well as to
any prospective (or current) teacher who has wondered about what
the purpose of taking such courses could be.
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