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- ...Construction.png|right|250px|demonstrating a simple method to construct a Golden Ratio rectangle}} ...left (b) sections so that <math>\scriptstyle \frac{a}{b}</math> equals the golden ratio.}}4 KB (685 words) - 19:54, 1 November 2013
- 12 bytes (1 word) - 01:19, 23 December 2007
- 254 bytes (29 words) - 02:13, 10 September 2009
- Auto-populated based on [[Special:WhatLinksHere/Golden ratio]]. Needs checking by a human.566 bytes (73 words) - 16:56, 11 January 2010
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- #REDIRECT [[Golden ratio]]26 bytes (3 words) - 15:03, 28 December 2007
- #REDIRECT [[Golden ratio]]26 bytes (3 words) - 15:03, 28 December 2007
- #REDIRECT [[Golden ratio]]26 bytes (3 words) - 15:04, 28 December 2007
- #REDIRECT [[Golden ratio]]26 bytes (3 words) - 15:05, 28 December 2007
- #REDIRECT [[Golden ratio]]26 bytes (3 words) - 15:06, 28 December 2007
- #REDIRECT [[Golden ratio]]26 bytes (3 words) - 15:06, 28 December 2007
- "golden ratio": 83% "Golden Ratio": 12%739 bytes (70 words) - 17:12, 10 May 2007
- ...Construction.png|right|250px|demonstrating a simple method to construct a Golden Ratio rectangle}} ...left (b) sections so that <math>\scriptstyle \frac{a}{b}</math> equals the golden ratio.}}4 KB (685 words) - 19:54, 1 November 2013
- *[[Golden ratio]]136 bytes (13 words) - 17:46, 17 February 2008
- {{rpl|Golden ratio}}2 KB (204 words) - 17:02, 3 January 2014
- Auto-populated based on [[Special:WhatLinksHere/Golden ratio]]. Needs checking by a human.566 bytes (73 words) - 16:56, 11 January 2010
- == Direct formula and the [[golden ratio]] == ...math> . The above constant <math>\ A</math> is known as the famous [[golden ratio]] <math>\ \Phi.</math> Thus:5 KB (743 words) - 13:10, 27 July 2008
- This animation illustrates how [[Fibonacci numbers]] and the [[Golden ratio]] lead to [[biological structure]].<ref>Cristóbal Vila (2010) [http://vime889 bytes (129 words) - 00:22, 23 March 2010
- {{r|Golden ratio}}902 bytes (143 words) - 03:08, 16 October 2008
- {{r|Golden ratio}}3 KB (375 words) - 10:21, 31 July 2009
- ...]]'s paintings have distinct mathematical implications, particularly the [[golden ratio]].3 KB (404 words) - 02:18, 11 January 2011
- Let us illustrate Newton's method with a concrete numerical example. The [[golden ratio]] (φ ≈ 1.618) is the largest root of the polynomial <math>f(x) = ...ange the value, we can be reasonably sure to have obtained a value for the golden ratio that is correct to the precision used.17 KB (2,889 words) - 12:40, 11 June 2009
- * The [[golden ratio]], <math> (1+\sqrt{5})/2 </math>, is also an algebraic number(actually, an7 KB (1,145 words) - 00:49, 20 October 2013