THE FIFTH ARITHMETICAL OPERATION

The Rational Mean: The fifth arithmetical operation. All means as particular cases of the Rational Mean (Generalized Mediant). The new Arithmonic Mean as an essential arithmetical operation for roots solving. New Properties and observations on Number.

Roots Solving: Bernoulli´s, Newton´s and many other new algorithms --converging even faster than Halley´s-- trivially found just by agency of arithmetic (The Rational Mean), no Cartesian system, no decimals, no derivatives. No precedents, at all.

Generalized Continued Fractions: Traditional continued fractions as particular cases of a new general concept "Generalized Continued Fractions". (Fractal Fractions)

These pages are just a brief introduction to the book:

“LA QUINTA OPERACION ARITMÉTICA, Revolución del Número”

(Translation: The Fifth Arithmetical Operation, Number Revolution)

ISBN:980-07-6632-4. 200 pages, spanish language.

Author: D. Gómez.

Linked pages:

BRITANNICA.COM Encyclopaedia Britannica. Best’s web sites
CORNELL THEORY CENTER (CTC) Math and Science Gateway.
INRIA PROJECT ALGORITHMS. Steven Finch and related pages. (Another link)
MATH PAGES, K. Brown. Generalized Mediant
MATH ARCHIVES: Numerical Analysis Math Archives: Number Theory
XCALIBRE University of Cambridge. Resources for the gifted and talented.
UNIVERSITY OF CAMBRIDGE Department of Pure Mathematics and Mathematical Statistics. Descriptions of areas/courses in number theory, lecture notes
AUSTRALIAN NATIONAL UNIVERSITY SUPER COMPUTER FACILITY. Murray Dow
Universität der Bundeswehr München. Fakultät für Sozialwissenschaften
Technische Universität Dresden(Pdf-archive), Fakultät Informatik, Institut für Theoretische Informatik. LV Algorithmen and Datenstrukturen. Prof. Dr.-Ing. habil. E.P. Stoschek.
Workshop on Design of Algorithms. Related Article
Cut-The-Knot Key Topics.
NRICH. University of Cambridge
UNIVERSIDAD DE ANTIOQUIA Dpto. de Ciencias exactas y Naturales
EL PARAÍSO DE LAS MATEMATICAS Mirror: matematicas.metropoliglobal.com
Mathematics Florida State University. Math WWW VL: Specialized Fields. Mirror at Israel Institute of Technology Mirror
MATH FORUM Internet Mathematics Library, Number Theory
The Farey Room interesting transformations of the Farey and Continued Fraction Mapping
N. J. A. Sloane: Data Base of Integer Sequences
Keith Matthews, Dept. of Mathematics, University of Queensland, Australia.
UGA Mathematics. Mathematics Department, University of Georgia (Another link). Mirror
Dipartimento di Matematica dell'Università di Roma Tre Web di Teoria dei Numeri. Mirror
Department of Pure Mathematics, University of Cambridge. Mirror
University of Electro-Communication, Tokyo Mirror
PUNJAB TECHNICAL UNIVERSITY. Jalandhar
Harish-Chandra Research Institute, School of mathematics, India
www.numbertheory.org Canadian Site. Mirror
Vedic Mathematics
Prof. Athanassios G. Kartsatos. Department of Mathematics, University of South Florida
PhD. Zémplen Gábor Department of History & Philosophy of Science, Eötvös University Budapest Hungría.
The Journal of Transfigural Mathematics is an interdisciplinary journal (English) of mathematics, logic, philosophy of mathematics and science, literature and arts. The goal of the JTfM is to generate debate. It looks around for inventions, discoveries and new scientific ideas, specially, those that disturbs the 'status quo'. (Another link)
A Catalog of Mathematics Resources Dr. M. Maheswaran, University of Wisconsin
Catalog of Mathematics Resources. Dr. Farjami, University of Tehran, Iran
Numbers Constants and computation Xavier Gourdon and Pascal Sebah.
Geometry The online learning center.
Numericana. Gérard P. Michon, Ph.D.
Real M. A. T. H. S. University at Buffalo. State University of New York
Appetizers and Lessons for Mathematics and Reason. © Alan Selby, Ph. D, Montreal
Prof. David eppstein. The geometry junkyard. Department of Information and Computer Science at the University of California
Prof. Salvador Vera Ballesteros Dpto. Matemáticas Aplicada. Universidad Málaga
Prof. Kirby Urner Phyton-list posting
St. George’s School Mathcounts.
Pakistan Khkhan, Sir Syed University of Engineering & Technology
The National Urban Alliance for Effective Education Founded by The College Board & Teachers College, Columbia University, NYC
University of Surrey, R. Knott, Fascinating Facts and Figures about the Golden Section
J. Wilson, The University of Georgia, new constructions ...
GLad Construction Home Page
William Johnston, new Euclidean constructions ...
Carlos Martín Piera Madrid.
ArmedForces Military guide.
Euphrates Web Page Community, hosting the Web Pages of William Paterson University
students and faculty.
Nerdworld
FirstScience.com
Count on
www.sitesforteachers.com
Education Planet SocialStudiesPlanet
World of Education
Science & Research
Links of Interest to a Mathematics Teacher
DMOZ. Math-Number Theory
Tu aprendes matematicas
www.1000dictionaries.com
YourMathematicsLinks
NumbersOrg
Ideas And Activities
Encyclopedia.Smartengine
The Teachers Guide. Mathematics
Numbers
José López Goitia. UPV/EHU. Vizcaya. País Vazco.
Principia
Biblioteca Nacional de Venezuela. Search by using “otros” option and ISBN: 9800766324.

Comments

Some authors have pointed out that "Arithmetic" was the main obstacle ancients should overcome in order to solve problems involving what we call nowadays "roots-solving methods of higher degree", and that such analytic algorithms could only be found, formulated and explained by agency of the modern Cartesian system and infinitesimal calculus. Now, the facetious response to such statements is: "Number beats Axes. Arithmetic beats Fluxions", mainly because, we can see now that ancients certainly had at hand the most simple arithmetical tool (The Rational Mean, The Fifth Arithmetical Operation) for solving all those problems of higher degree. The implausible fact that ancients and many modern mathematicians could have easily carried out such an elemental operation but --from all the evidences-- they didn't, bring to light an astonishing testimony of something wrong about the whole story of roots-solving and the definition of irrational numbers and their arithmetical operations. Worst, all these observations throw many doubts about the so-called "rigorousness" of modern mathematics.

Based on the extremely simple arithmetical processes and wonderful properties of Number shown in the book and its introductory web pages: Rational Mean Definition-&-Evaluation, Roots Solving and Continued fractions) and considering the incomprehensible and astonishing absence of any precedent on this matter all through the history of Arithmetic and roots solving, one can realize now that it is certainly a ridiculous arrogance to think that the artificial and personal creations (i.e.: Cartesian system; decimal fractions; imaginary numbers, etc.) of any individual could ever exceed the natural order determined by God in accordance with the harmonies of Number. Indeed, it is so hard to realize these so simple arithmetical methods do not appear in any book on numbers since ancient times up to now. No matter all the absurd attacks and troubles these comments have caused to me in the Usenet since long time ago, these very simple arithmetical web-pages will continue their task: Bringing to light the true story on roots solving and the irrational numbers.

Nowadays, people of modern societies are suffering the consequences of social leaderships that have been thoroughly affected (mainly, since the rise of Cartesian system and mechanistic philosophy) by egotistic conceptions of people who use to consider about themselves as better planners than God. Many bizarre "scientific" conceptions have certainly inspired people with confusedness, atheism, chaos and dehumanisation.

These are not pessimistic conclusions, at all, but an encouraging message based on all those elemental and natural principles of Quantity which have been passed over by many "great mechanistic" minds.

Indeed, there are very good news here, specially, for young people because from now on, by means of simple arithmetic they will be able to learn at primary or secondary school the "most advanced" analytic methods (Halley’s, Newton’s, Bernoulli’s, Power series expansions) which have been brought to us as exclusive superb products of the "divine" Cartesian system and its fluxions.

Some other works:

"Superior Arithmetic, New Developments and Applications".

Book (English), ISBN: 980-07-1451-0. Copyright ©, 1993.

"Los números irracionales, nuevos elementos".

Paper (Spanish), ISBN: 980-07-2792-2.
"New Elements For The Irrational Numbers". The Journal Of Transfigural Mathematics (JTfM), September edition, 1996.

Scalene and Isosceles Partitions (SIP)

New simple method for dividing any line segment AB into an arbitrary number of equal parts. The new SIP construction allows to find a wide variety of partition sequences ruled by second-order recurrence relations, as for example, the well known FIBONACCI SEQUENCE !. It also leads the way for using higher-order recurrence relations!. The Journal Of Transfigural Mathematics (JTfM), January edition, 1997.

Structural Design Software.

Other useful web sites:

Kirby Urner, 4D Solutions. Synergetics
Mathematics information servers
Structural Software, mailing lists, news.
ACI International Homepage.
Structural Engineering WWW Server.
National Center for Earthquake Engineering Research.
U.S. Copyright Office Home Page
Library of Congress WWW/Z39.50 Gateway
Freebuttons
Free-graphics

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No part of this page may be reproduced, stored or transmitted in any form or by any means without the prior permission of the author: D. Gómez.

Last revision: 2002