Читаем – Число Бога. Золотое сечение – формула мироздания полностью

– Число Бога. Золотое сечение – формула мироздания

Wells, D. Curious and Interesting Mathematics. London: Penguin Books, 1997.

3. В пирамиде, к звездам обращенной

Beard, R. S. “The Fibonacci Drawing Board Design of the Great Pyramid of Gizeh”, Fibonacci Quarterly, 6 (1968): 85–87.

Burton, D. M. The History of Mathematics: An Introduction. Boston: Allyn and Bacon, 1985.

Doczi, O. The Power of Limits. Boston: Shambhala, 1981.

Fischler, R. “Th'eories Math'ematiques de la Grande Pyramide”, Crux Mathematicorum, 4 (1978): 122–129.

Fischler, R. “What Did Herodotus Really Say? or How to Build (a Theory of) the Great Pyramid”, Environment and Planning B, 6 (1979): 89–93.

Gardner, M. Fads and Fallacies in the Name of Science. New York: Dover Publications, 1957.

Gazal'e, M. J. Gnomon. Princeton, NJ: Princeton University Press, 1999.

Gillings, R. J. Mathematics in the Time of the Pharaohs. New York: Dover Publications, 1972.

Goff, B. Symbols of Prehistoric Mesopotamia. New Haven, CT: Yale University Press, 1963.

Hedian, H. “The Golden Section and the Artist”, Fibonacci Quarterly, 14 (1976): 406–418.

Lawlor, R. Sacred Geometry. London: Thames and Hudson, 1982.

Mendelssohn, K. The Riddle of the Pyramids. New York: Praeger Publishers, 1974.

Petrie, W. The Pyramids and Temples of Gizeh. London: Field and Tuer, 1883.

Piazzi Smyth, C. The Great Pyramid. New York: Gramercy Books, 1978.

Schneider, M. S. A Beginner’s Guide to Constructing the Universe. New York: Harper Perennial, 1995.

Spence, K. “Ancient Egyptian Chronology and the Astronomical Orientation of the Pyramids”, Nature, 408 (2000): 320–324.

Stewart, I. “Counting the Pyramid Builders”, Scientific American

(September 1998): 98–100.

Verheyen, H. F. “The Icosahedral Design of the Great Pyramid”, in Fivefold Symmetry.

Singapore: World Scientific, 1992, 333–360.

Wier, S. K. “Insights from Geometry and Physics into the Construction of Egyptian

Old Kingdom Pyramids”, Cambridge Archaeological Journal, 6 (1996): 150–163.

4. Второе сокровище

Borissavlievitch, M. The Golden Number and the Scientific Aesthetics of Architecture. London: Alec Tiranti, 1958.

Bruckman, P. S. “Constantly Mean”, «Fibonacci Quarterly», 15 (1977): 236.

Coxeter, H. S. M. Introduction to Geometry. New York: John Wiley Sons, 1963.

Cromwell, P. R. Polyhedra. Cambridge: Cambridge University Press, 1997.

Dixon, K. Mathographics. New York: Dover Publications, 1987.

Ghyka, M. L’Esthetique des proportions dans la nature et dans les arts. Paris: Gallimard, 1927.

Heath, T. A History of Greek Mathematics. New York: Dover Publications, 1981.

Heath, T. The Thirteen Books of Euclid’s Elements. New York: Dover Publications, 1956.

Jowett, B. The Dialogues of Plato. Oxford: Oxford University Press, 1953.

Kraut, R. The Cambridge Companion to Plato. Cambridge: Cambridge University Press, 1992.

Lasserre, F. The Birth of Mathematics in the Age of Plato. London: Hutchinson, 1964.

Pappas, T. The Joy of Mathematics. San Carlos, CA: Wide World Publishing, 1989.

Trachtenberg, M., and Hyman, I. Architecture: From Prehistory to Post Modernism/The

Western Tradition.

New York: Harry N. Abrams, 1986.

Zeising, A. Der goldener Schnitt. Halle: Druck von E. Blochmann Son in Dresden, 1884.

5. Сын доброй матери-природы

http://cedar.evansville.edu/~ck6/index.html.

Adler, I., Barabe, D., and Jean, R. V. “A History of the Study of Phyllotaxis”, Annals of Botany, 80 (1997): 231–244.

Basin, S. L. “The Fibonacci Sequence as It Appears in Nature”, Fibonacci Quarterly, 1 (1963): 53–64.

Brousseau, Brother A. An Introduction to Fibonacci Discovery. Aurora, SD: The Fibonacci Association, 1965.

Bruckman, P. S. “Constantly Mean”, Fibonacci Quarterly, 15 (1977): 236.

Coxeter, H. S. M. “The Golden Section, Phyllotaxis, and Wythoff’s Game”, Scripta Mathematica, 19 (1953): 135–143.

Coxeter, H. S. M. Introduction to Geometry. New York: John Wiley Sons, 1963.

Cook, T. A. The Curves of Life. New York: Dover Publications, 1979.

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