Definitions, Solved and Unsolved Problems, Conjectures, and Theorems in Number Theory and Geometry
Author: Florentin Smarandache
Publisher: Infinite Study
Published: 1999-12-01
Total Pages: 84
ISBN-13: 187958574X
DOWNLOAD EBOOKRead and Download eBook Full
Author: Florentin Smarandache
Publisher: Infinite Study
Published: 1999-12-01
Total Pages: 84
ISBN-13: 187958574X
DOWNLOAD EBOOKAuthor: Daniel Shanks
Publisher: American Mathematical Society
Published: 2024-01-24
Total Pages: 321
ISBN-13: 1470476452
DOWNLOAD EBOOKThe investigation of three problems, perfect numbers, periodic decimals, and Pythagorean numbers, has given rise to much of elementary number theory. In this book, Daniel Shanks, past editor of Mathematics of Computation, shows how each result leads to further results and conjectures. The outcome is a most exciting and unusual treatment. This edition contains a new chapter presenting research done between 1962 and 1978, emphasizing results that were achieved with the help of computers.
Author: Marius Coman
Publisher: Infinite Study
Published:
Total Pages: 136
ISBN-13: 1599732521
DOWNLOAD EBOOKAbout the works of Florentin Smarandache have been written a lot of books (he himself wrote dozens of books and articles regarding math, physics, literature, philosophy). Being a globally recognized personality in both mathematics (there are countless functions and concepts that bear his name) and literature, it is natural that the volume of writings about his research is huge. What we try to do with this encyclopedia is to gather together as much as we can both from Smarandache’s mathematical work and the works of many mathematicians around the world inspired by the Smarandache notions. We structured this book using numbered Definitions, Theorems, Conjectures, Notes and Comments, in order to facilitate an easier reading but also to facilitate references to a specific paragraph. We divided the Bibliography in two parts, Writings by Florentin Smarandache (indexed by the name of books and articles) and Writings on Smarandache notions (indexed by the name of authors). We treated, in this book, about 130 Smarandache type sequences, about 50 Smarandache type functions and many solved or open problems of number theory. We also have, at the end of this book, a proposal for a new Smarandache type notion, id est the concept of “a set of Smarandache-Coman divisors of order k of a composite positive integer n with m prime factors”, notion that seems to have promising applications, at a first glance at least in the study of absolute and relative Fermat pseudoprimes, Carmichael numbers and Poulet numbers. This encyclopedia is both for researchers that will have on hand a tool that will help them “navigate” in the universe of Smarandache type notions and for young math enthusiasts: many of them will be attached by this wonderful branch of mathematics, number theory, reading the works of Florentin Smarandache.
Author: Richard Guy
Publisher: Springer Science & Business Media
Published: 2013-06-29
Total Pages: 176
ISBN-13: 1475717385
DOWNLOAD EBOOKSecond edition sold 2241 copies in N.A. and 1600 ROW. New edition contains 50 percent new material.
Author: Victor Klee
Publisher: American Mathematical Soc.
Published: 2020-07-31
Total Pages: 333
ISBN-13: 1470454610
DOWNLOAD EBOOKVictor Klee and Stan Wagon discuss some of the unsolved problems in number theory and geometry, many of which can be understood by readers with a very modest mathematical background. The presentation is organized around 24 central problems, many of which are accompanied by other, related problems. The authors place each problem in its historical and mathematical context, and the discussion is at the level of undergraduate mathematics. Each problem section is presented in two parts. The first gives an elementary overview discussing the history and both the solved and unsolved variants of the problem. The second part contains more details, including a few proofs of related results, a wider and deeper survey of what is known about the problem and its relatives, and a large collection of references. Both parts contain exercises, with solutions. The book is aimed at both teachers and students of mathematics who want to know more about famous unsolved problems.
Author: Florentin Smarandache
Publisher: Infinite Study
Published:
Total Pages: 38
ISBN-13:
DOWNLOAD EBOOKPartially or totally unsolved questions in number theory and geometry especially, such as coloration problems, elementary geometric conjectures, partitions, generalized periods of a number, length of a generalized period, arithmetic and geometric progressions are exposed.
Author: Editors: Liu Yanni, Li Ling, Liu Baoli
Publisher: Infinite Study
Published: 2008
Total Pages: 148
ISBN-13: 1599730634
DOWNLOAD EBOOKNew improved results of the research in Chinese language on Smarandache¿s codification used in computer programming, smarandacheials, totient and congruence functions, sequences, irrational constants in number theory, multi-space and geometries.
Author: József Sándor
Publisher: Infinite Study
Published: 2002
Total Pages: 55
ISBN-13: 1931233470
DOWNLOAD EBOOKAuthor: Florentin Smarandache
Publisher: Infinite Study
Published: 2006-01-01
Total Pages: 140
ISBN-13: 1599730138
DOWNLOAD EBOOKThroughout this book, we discuss some open problems in various branches of science, including mathematics, theoretical physics, astrophysics, geophysics etc. It is of our hope that some of the problems discussed in this book will find their place either in theoretical exploration or further experiments, while some parts of these problems may be found useful for scholarly stimulation.The present book is also intended for young physics and mathematics fellows who will perhaps find the unsolved problems described here are at least worth pondering. If this book provides only a few highlights of plausible solutions, it is merely to keep the fun of readers in discovering the answers by themselves. Bon voyage!
Author: Amarnath Murthy
Publisher: Infinite Study
Published: 2005-01-01
Total Pages: 219
ISBN-13: 1931233349
DOWNLOAD EBOOKFlorentin Smarandache is an incredible source of ideas, only some of which are mathematical in nature. Amarnath Murthy has published a large number of papers in the broad area of Smarandache Notions, which are math problems whose origin can be traced to Smarandache. This book is an edited version of many of those papers, most of which appeared in Smarandache Notions Journal, and more information about SNJ is available at http://www.gallup.unm.edu/~smarandache/ . The topics covered are very broad, although there are two main themes under which most of the material can be classified. A Smarandache Partition Function is an operation where a set or number is split into pieces and together they make up the original object. For example, a Smarandache Repeatable Reciprocal partition of unity is a set of natural numbers where the sum of the reciprocals is one. The first chapter of the book deals with various types of partitions and their properties and partitions also appear in some of the later sections.The second main theme is a set of sequences defined using various properties. For example, the Smarandache n2n sequence is formed by concatenating a natural number and its double in that order. Once a sequence is defined, then some properties of the sequence are examined. A common exploration is to ask how many primes are in the sequence or a slight modification of the sequence. The final chapter is a collection of problems that did not seem to be a precise fit in either of the previous two categories. For example, for any number d, is it possible to find a perfect square that has digit sum d? While many results are proven, a large number of problems are left open, leaving a great deal of room for further exploration.