Re: [math-fun] Fibonacci/Golden Ratio in Art
Interesting! Thanks! Perhaps Q(i*phi) is more visually interesting than Q(phi), since we can get the complex plane ? At 09:53 AM 4/26/2020, Adam P. Goucher wrote:
While Google searching for Fibonacci/phi, I asked myself about the phi number field. Anything interesting there?
Every regular n-polytope (where n >= 3) is geometrically similar to a finite subset of the vector space F^(n+1), where F is the field of characteristic zero generated by phi.
Best wishes,
Adam P. Goucher
https://en.wikipedia.org/wiki/Donald_in_Mathmagic_Land Definite work on this subject. --R On Sun, Apr 26, 2020 at 2:07 PM Henry Baker <hbaker1@pipeline.com> wrote:
Interesting! Thanks!
Perhaps Q(i*phi) is more visually interesting than Q(phi), since we can get the complex plane ?
At 09:53 AM 4/26/2020, Adam P. Goucher wrote:
While Google searching for Fibonacci/phi, I asked myself about the phi number field. Anything interesting there?
Every regular n-polytope (where n >= 3) is geometrically similar to a finite subset of the vector space F^(n+1), where F is the field of characteristic zero generated by phi.
Best wishes,
Adam P. Goucher
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Definite work ... visible here, thank you Richard! https://youtu.be/Fv4gWPurN9k Best, É.
Le 27 avr. 2020 à 02:36, Richard Howard <rich@richardehoward.com> a écrit :
https://en.wikipedia.org/wiki/Donald_in_Mathmagic_Land
Definite work on this subject.
--R
On Sun, Apr 26, 2020 at 2:07 PM Henry Baker <hbaker1@pipeline.com> wrote:
Interesting! Thanks!
Perhaps Q(i*phi) is more visually interesting than Q(phi), since we can get the complex plane ?
At 09:53 AM 4/26/2020, Adam P. Goucher wrote:
While Google searching for Fibonacci/phi, I asked myself about the phi number field. Anything interesting there?
Every regular n-polytope (where n >= 3) is geometrically similar to a finite subset of the vector space F^(n+1), where F is the field of characteristic zero generated by phi.
Best wishes,
Adam P. Goucher
_______________________________________________ math-fun mailing list math-fun@mailman.xmission.com https://mailman.xmission.com/cgi-bin/mailman/listinfo/math-fun
_______________________________________________ math-fun mailing list math-fun@mailman.xmission.com https://mailman.xmission.com/cgi-bin/mailman/listinfo/math-fun
participants (3)
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Henry Baker -
Richard Howard -
Éric Angelini