Comments on: More About The Golden Ratio https://www.anneskyvington.com.au/golden-ratio-art/ Your muse is live in the city and the bush Wed, 31 May 2017 06:30:56 +0000 hourly 1 https://wordpress.org/?v=6.7.1 By: Anne Skyvington https://www.anneskyvington.com.au/golden-ratio-art/comment-page-1/#comment-1015 Sat, 27 Aug 2016 07:43:22 +0000 http://www.anneskyvington.com/?p=8173#comment-1015 In reply to Deepak Singh.

Thanks, Deepak. It’s nice to connect with like-minded people.

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By: Anne Skyvington https://www.anneskyvington.com.au/golden-ratio-art/comment-page-1/#comment-1014 Sat, 27 Aug 2016 07:41:44 +0000 http://www.anneskyvington.com/?p=8173#comment-1014 In reply to Deepak Singh.

Thanks Deepak. I’m fascinated by this, even though it is out of favour with many people in this scientific age.

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By: Deepak Singh https://www.anneskyvington.com.au/golden-ratio-art/comment-page-1/#comment-1013 Thu, 25 Aug 2016 03:50:08 +0000 http://www.anneskyvington.com/?p=8173#comment-1013 Very informative work. I like this. Thanks for reading and commenting.

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By: Anne Skyvington https://www.anneskyvington.com.au/golden-ratio-art/comment-page-1/#comment-1012 Fri, 15 Jul 2016 02:05:26 +0000 http://www.anneskyvington.com/?p=8173#comment-1012 In reply to IAN WELLS.

Hi Ian
Lovely to hear from you again. I’ll have a look at that. I’d also like to look at some examples of architecture and art that fit in with this phenomena. Does it have any deeper implications?

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By: IAN WELLS https://www.anneskyvington.com.au/golden-ratio-art/comment-page-1/#comment-1011 Thu, 14 Jul 2016 10:56:27 +0000 http://www.anneskyvington.com/?p=8173#comment-1011 As I have stated previously, I am fascinated by the phenomena of mathematics in nature. Thank you for this expansion on your previous post on the golden ratio. Fascinating.

Have you considered looking at fractals? “A fractal is a natural phenomenon or a mathematical set that exhibits a repeating pattern that displays at every scale. It is also known as expanding symmetry or evolving symmetry. If the replication is exactly the same at every scale, it is called a self-similar pattern. An example of this is the Menger Sponge.” (Wikipedia)

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