A Concise Introduction to Pure Mathematics (Chapman Hall/Crc Mathematics) (Chapman Hall/CRC Mathematics Series) [Paperback]

Martin Liebeck (Author)

Book Description

ISBN-10: 1584885475 | ISBN-13: 978-1584885474 | Publication Date: November 2, 2005 | Edition: 2

A Concise Introduction to Pure Mathematics, Second Edition provides a robust bridge between high school and university mathematics, expanding upon basic topics in ways that will interest first-year students in mathematics and related fields and stimulate further study. Divided into 22 short chapters, this textbook offers a selection of exercises ranging from routine calculations to quite challenging problems.

The author discusses real and complex numbers and explains how these concepts are applied in solving natural problems. He introduces topics in analysis, geometry, number theory, and combinatorics.

What's New in the Second Edition:

Contains extra material concerning prime numbers, forming the basis for data encryption

Explores "Secret Codes" - one of today's most spectacular applications of pure mathematics

Discusses Permutations and their importance in many topics in discrete mathematics

The textbook allows for the design of courses with various points of emphasis, because it can be divided into four fairly independent sections related to: an introduction to number systems and analysis; theory of the integers; an introduction to discrete mathematics; and functions, relations, and countability.

Editorial Reviews

Review

A gentle but fascinating introduction into the culture of mathematics…This book will give a student the understanding to go on in further courses in abstract algebra and analysis. The notion of a proof will no longer be foreign, but also mathematics will not be viewed as some abstract black box. At the very least, the student will have an appreciation of mathematics.

As usual, Liebeck's writing style is clear and easy to read. This is a book that could be read by a student on his or her own. There is a wide selection of problems ranging from routine to quite challenging.
Robert Guralnick, Chair of the Mathematics Department, University of Southern California, from the Foreword

About the Author

Liebeck; M.W. Imperial College, London, England, UK, --This text refers to an out of print or unavailable edition of this title.

Product Details

• Paperback: 224 pages
• Publisher: Chapman and Hall/CRC; 2 edition (November 2, 2005)
• Language: English
• ISBN-10: 1584885475
• ISBN-13: 978-1584885474
• Product Dimensions: 9.1 x 5.8 x 0.5 inches
• Shipping Weight: 11.2 ounces
• Average Customer Review: 4.4 out of 5 stars  See all reviews (5 customer reviews)
• Amazon Best Sellers Rank: #924,135 in Books (See Top 100 in Books)

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Customer Reviews

Most Helpful Customer Reviews

27 of 27 people found the following review helpful:

4.0 out of 5 stars The missing link, October 2, 2000

By 

Joe Stauffer (Norman, OK United States) - See all my reviews
(REAL NAME)   

This review is from: A Concise Introduction to Pure Mathematics (Paperback)

I'm not sure how many of us there are out there, but I am one of a breed of consumers of applied mathematics who learned some pretty sophisticated mathematical technology without the rigor of pure mathematics. Although this book is aimed at freshmen entering mathematics programs who need to be inculturated into the world of pure mathematics, I found it to be the crucial link I needed to advance my own applied mathematical training. I reached a point where I was ready to move from applied texts to the more cryptic world of math texts written for graduate mathematicians. Unfortunately, I was not properly trained to decypher their special language and way of doing things, particularly that of the formal proof. I found reading introductory texts in analysis to be like trying to learn Japanese from books which were themselves written in Japanese. Then I found this wonderful little text. It made things much more accessible to me and helped me crack enough of the code where I could find my way around those analysis texts, which in turn allowed me to move on to the graduate math texts containing the methods I am studying now. The book is a bit high priced for its size, but for me it was well worth it.

7 of 7 people found the following review helpful:

4.0 out of 5 stars Nicely-written transition from high school to college mathematics. Targeted more toward classroom use than self-study, August 16, 2009

By 

Reader - See all my reviews

This review is from: A Concise Introduction to Pure Mathematics (Chapman Hall/Crc Mathematics) (Chapman Hall/CRC Mathematics Series) (Paperback)

This is a review of the (2005) 2nd ed. The number of texts covering the transition from secondary school to college mathematics has grown considerably in recent years. This is one of the better-written and well-organized texts. Its greatest concentration is on important concepts from pure mathematics, such as sets and numbers, real and complex, and some interesting topics from number theory. Explanations are clear and the in-text examples and proofs are well chosen and explained. The emphasis here is primarily on proofs rather than on the solution of applied problems. The author uses only the minimum level of mathematical rigor required, and this is supplemented by clear discussions. I enjoyed the gentle introduction to set theory and the in-text questions, followed by solutions. The proofs of propositions are clear and complete.

The Forward says this book can "be read by a student on his or her own". The Preface restates this slightly differently, by saying that as "well as being designed for use in a first university course, the book is also suitable for self-study". However, debatably, this text does not serve both purposes equally well, as it seems less suitable for a self-study target audience.

A " Solutions Manual for a Concise Introduction to Pure Mathematics" is listed on-line. The Solutions Manual described is about 70 pages in length. If this is correct, it's contents could easily have been included with this text, while still keeping the text relatively concise at less than 300 pages. At the time of this review, this manual was not available from Amazon or other on-line sellers.

The lack of fully-worked solutions to exercises is typical of many books designed for classroom use. This allows faculty to assign problems that students must work out on their own, as solutions are not readily available. While this approach is, arguably, appropriate for a classroom environment, the lack of detailed exercise solutions considerably reduces the value of this text for self-study. Mathematics is not a spectator sport, so the opportunity to work through a considerable variety of problems and check results against detailed solutions is quite important, particularly for self-study. The lack of fully-worked exercise solutions is perhaps the key deficiency of this text. However, it is enjoyable to read, with explanations that are very well done. Thus, although not self-contained, it could be excellent for self-study if supplemented appropriately with a problems book with fully-worked solutions.

6 of 6 people found the following review helpful:

5.0 out of 5 stars An excellent way to discover the basics of becoming a mathematician, October 2, 2008

By 

Rick - See all my reviews

This review is from: A Concise Introduction to Pure Mathematics (Chapman Hall/Crc Mathematics) (Chapman Hall/CRC Mathematics Series) (Paperback)

I encountered this book in my first proofs course, and it was a delight to read. My less dedicated classmates found the book too difficult, but I think it's just right for a student who has been curious about methods of proof and some of the more elementary parts of pure mathematics. Some of the problems are easy and some are pretty challenging, but I think they can all be solved especially if you've got access to people who know mathematics (and everyone on the internet has this is they look).