Golden_rectangle

This article is about the geometrical figure. For the Indian highway project, see Golden Quadrilateral.

The large rectangle BA is a golden rectangle; that is, the proportion b:a is 1:$\backslash varphi$. For any such rectangle, and only for rectangles of that specific proportion, if we remove square B, what is left, A, is another golden rectangle; that is, with the same proportions as the original rectangle.

A golden rectangle is a rectangle whose side lengths are in the golden ratio, 1:$\backslash varphi$ (one-to-phi), that is, approximately 1:1.618.

A distinctive feature of this shape is that when a square section is removed, the remainder is another golden rectangle, that is, with the same proportions as the first. Square removal can be repeated infinitely, which leads to an approximation of the golden spiral.

According to astrophysicist and math popularizer Mario Livio, since the publication of Luca Pacioli\'s Divina Proportione in 1509,Pacioli, Luca. De divina proportione, Luca Paganinem de Paganinus de Brescia (Antonio Capella) 1509, Venice. when "with Pacioli\'s book, the Golden Ratio started to become available to artists in theoretical treatises that were not overly mathematical, that they could actually use,"Livio, Mario (2002). The Golden Ratio: The Story of Phi, The World\'s Most Astonishing Number. New York: Broadway Books. ISBN 0-7679-0815-5.  many artists and architects have proportioned their works to approximate the form of the golden rectangle, which has been considered aesthetically pleasing. The proportions of the golden rectangle have been observed in works predating Pacioli\'s publication.Van Mersbergen, Audrey M., Rhetorical Prototypes in Architecture: Measuring the Acropolis with a Philosophical Polemic, Communication Quarterly, Vol. 46, 1998 ("a \'Golden Rectangle\' has a ratio of the length of its sides equal to 1:1.61803+. The Parthenon is of these dimensions.")

Constructing a golden rectangle

A method to construct a golden rectangle. The square is outlined in red. The resulting dimensions are in the ratio 1:$\backslash varphi$, the golden ratio.

A golden rectangle can be constructed with only straightedge and compass by this technique:

1. Construct a simple square
2. Draw a line from the midpoint of one side of the square to an opposite corner
3. Use that line as the radius to draw an arc that defines the height of the rectangle
4. Complete the golden rectangle

Applications of the golden rectangle

• Jan Tschichold describes the use of the golden rectangle in medieval book designs
• Le Corbusier\'s 1927 Villa Stein in Garches features a rectangular ground plan, elevation, and inner structure that are closely approximate to golden rectangles.Le Corbusier, The Modulor, p. 35, as cited in Padovan, Richard, Proportion: Science, Philosophy, Architecture (1999), p. 320. Taylor & Francis. ISBN 0-419-22780-6: "Both the paintings and the architectural designs make use of the golden section".

See also

• Leonardo of Pisa
• Fibonacci numbers
• Kepler triangle

References

External links

Wikimedia Commons has media related to:

Golden rectangle

• Golden Ratio at MathWorld
• The Golden Mean and the Physics of Aesthetics
• Golden rectangle demonstration With interactive animation
• Golden Rectangle Construction Interactive website

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