- Membership
- Publications
- Meetings
- Competitions
- Community
- Programs
- Students
- High School Teachers
- Faculty and Departments
- Underrepresented Groups
- MAA Awards
- MAA Grants

- News
- About MAA

Publisher:

World Scientific

Publication Date:

2009

Number of Pages:

694

Format:

Hardcover

Series:

Series on Knots and Everything 22

Price:

142.00

ISBN:

9789812775825

Category:

Monograph

[Reviewed by , on ]

Mark Bollman

04/24/2010

At Mathfest in 2007, I attended a talk on “Puzzling Probabilities Featuring the Street Game of Craps” by Jack Alexander of Miami Dade College. The mathematical level of the talk was fairly elementary, but the talk was extremely engaging, and I walked away thinking what a pleasure it was to encounter very familiar mathematics approached in a new way. I had much the same reaction to Stakhov’s book, which begins with the golden section (the source for what is termed “harmony mathematics”) and ranges widely throughout many areas of mathematics.

As is often the case with works involving the golden section, there are a number of sections which overestimate the significance of the ratio, but these do not detract from the otherwise fine exposition. The lively treatment of such topics as hyperbolic functions, Fibonacci codes, and non-Euclidean geometry is a welcome collection of diverse topics in a single book.

Where the book goes a bit too far is evident only in the epilogue, where, in a list of conclusions about the significance of “harmony mathematics”, we find the following:

Thus, the neglect of the “golden section” and its associated idea of mathematical harmony is one more “strategic mistake” in not only mathematics and mathematics education, but also theoretical physics. (p. 625)

and

We affirm that the

Mathematics of Harmonyshould become a base for the reform of modern mathematical education on the base of theancient idea of Harmonyandgolden section.(p. 660)

I’m not convinced that these conclusions are valid, and even less certain that they’ve been adequately justified here. These crankish pronouncements aside, this is a worthwhile collection of elementary and not-so-elementary results.

Mark Bollman (mbollman@albion.edu) is associate professor of mathematics and chair of the department of mathematics and computer science at Albion College in Michigan. His mathematical interests include number theory, probability, and geometry. His claim to be the only Project NExT fellow (Forest dot, 2002) who has taught both English composition and organic chemistry to college students has not, to his knowledge, been successfully contradicted. If it ever is, he is sure that his experience teaching introductory geology will break the deadlock.

*Classical Golden Mean, Fibonacci Numbers, and Platonic Solids:*- The Golden Section

- Fibonacci and Lucas Numbers

- Regular Polyhedrons

*Mathematics of Harmony:*- Generalizations of Fibonacci Numbers and the Golden Mean

- Hyperbolic Fibonacci and Lucas Functions

- Fibonacci and Golden Matrices

*Application in Computer Science:*- Algorithmic Measurement Theory; Fibonacci Computers

- Codes of the Golden Proportion

- Ternary Mirror-Symmetrical Arithmetic

- A New Coding Theory Based on a Matrix Approach

- Log in to post comments