Foundations of Higher Mathematics
Author: Peter Fletcher
Publisher:
Published: 1992
Total Pages: 0
ISBN-13: 9780534983864
DOWNLOAD EBOOK →Author: Peter Fletcher
Publisher:
Published: 1992
Total Pages: 0
ISBN-13: 9780534983864
DOWNLOAD EBOOK →Author: Daniel M. Fendel
Publisher: Addison Wesley
Published: 1990
Total Pages: 486
ISBN-13:
DOWNLOAD EBOOK →Foundations of Higher Mathematics: Exploration and Proof is the ideal text to bridge the crucial gap between the standard calculus sequence and upper division mathematics courses. The book takes a fresh approach to the subject: it asks students to explore mathematical principles on their own and challenges them to think like mathematicians. Two unique features-an exploration approach to mathematics and an intuitive and integrated presentation of logic based on predicate calculus-distinguish the book from the competition. Both features enable students to own the mathematics they're working on. As a result, your students develop a stronger motivation to tackle upper-level courses and gain a deeper understanding of concepts presented.
Author: Bob A. Dumas
Publisher: McGraw-Hill Education
Published: 2007
Total Pages: 0
ISBN-13: 9780071106474
DOWNLOAD EBOOK →This book is written for students who have taken calculus and want to learn what "real mathematics" is.
Author: Stella Fletcher
Publisher:
Published: 1992
Total Pages:
ISBN-13: 9780534930554
DOWNLOAD EBOOK →Author: Wendell Motter
Publisher:
Published: 2019-07-19
Total Pages: 107
ISBN-13: 9781081357788
DOWNLOAD EBOOK →This textbook prepares students for the more abstract mathematics courses that follow calculus. Appropriate for self-study or for use in courses called transition courses, this text introduces students to proof techniques, analyzing proofs, and writing proofs of their own. Written in a clear, conversational style, this book provides a solid introduction to such topics as the real number system, logic, set theory, mathematical induction, relations, functions, and continuity. It is also a good reference text that students can use when writing or reading proofs in their more advanced courses.
Author: Sam Vandervelde
Publisher: Lulu.com
Published: 2010
Total Pages: 258
ISBN-13: 055750337X
DOWNLOAD EBOOK →This engaging math textbook is designed to equip students who have completed a standard high school math curriculum with the tools and techniques that they will need to succeed in upper level math courses. Topics covered include logic and set theory, proof techniques, number theory, counting, induction, relations, functions, and cardinality.
Author: Dennis Sentilles
Publisher: Courier Corporation
Published: 2013-05-20
Total Pages: 416
ISBN-13: 0486277585
DOWNLOAD EBOOK →This helpful "bridge" book offers students the foundations they need to understand advanced mathematics. The two-part treatment provides basic tools and covers sets, relations, functions, mathematical proofs and reasoning, more. 1975 edition.
Author: Ethan D. Bloch
Publisher: Springer Science & Business Media
Published: 2013-12-01
Total Pages: 434
ISBN-13: 1461221307
DOWNLOAD EBOOK →The aim of this book is to help students write mathematics better. Throughout it are large exercise sets well-integrated with the text and varying appropriately from easy to hard. Basic issues are treated, and attention is given to small issues like not placing a mathematical symbol directly after a punctuation mark. And it provides many examples of what students should think and what they should write and how these two are often not the same.
Author: Henri Bourles
Publisher: Elsevier
Published: 2017-07-10
Total Pages: 268
ISBN-13: 0081021127
DOWNLOAD EBOOK →This precis, comprised of three volumes, of which this book is the first, exposes the mathematical elements which make up the foundations of a number of contemporary scientific methods: modern theory on systems, physics and engineering. This first volume focuses primarily on algebraic questions: categories and functors, groups, rings, modules and algebra. Notions are introduced in a general framework and then studied in the context of commutative and homological algebra; their application in algebraic topology and geometry is therefore developed. These notions play an essential role in algebraic analysis (analytico-algebraic systems theory of ordinary or partial linear differential equations). The book concludes with a study of modules over the main types of rings, the rational canonical form of matrices, the (commutative) theory of elemental divisors and their application in systems of linear differential equations with constant coefficients. Part of the New Mathematical Methods, Systems, and Applications series Presents the notions, results, and proofs necessary to understand and master the various topics Provides a unified notation, making the task easier for the reader. Includes several summaries of mathematics for engineers