| Ethan D. Bloch - Mathematics - 2011 - 358 pages
“Proofs and Fundamentals: A First Course in Abstract Mathematics” 2nd edition is designed as a "transition" course to introduce undergraduates to the writing of rigorous ... | |
| John M. Howie - Mathematics - 2001 - 276 pages
Understanding the concepts and methods of real analysis is an essential skill for every undergraduate mathematics student. Written in an easy-to-read style, Real Analysis is a ... | |
| Saul Stahl - Mathematics - 1999 - 269 pages
A provocative look at the tools and history of real analysis This new work from award-winning author Saul Stahl offers a real treat for students of analysis. Combining ... | |
| Houshang H. Sohrab - Mathematics - 2003 - 559 pages
Basic Real Analysis demonstrates the richness of real analysis, giving students an introduction both to mathematical rigor and to the deep theorems and counter examples that ... | |
| George Pedrick - Mathematics - 1994 - 279 pages
This text on advanced calculus discusses such topics as number systems, the extreme value problem, continuous functions, differentiation, integration and infinite series. The ... | |
| Ethan D. Bloch - Mathematics - 1997 - 421 pages
The uniqueness of this text in combining geometric topology and differential geometry lies in its unifying thread: the notion of a surface. With numerous illustrations ... | |
| K. G. Binmore - Mathematics - 1982 - 361 pages
For the second edition of this very successful text, Professor Binmore has written two chapters on analysis in vector spaces. The discussion extends to the notion of the ... | |
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