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Geometry |
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Authors: Dante Servi
Le spirali logaritmiche (r=ae^bθ), partendo da un punto di distanza (a) dalla loro origine si possono sviluppare allontanandosi (se b > 0) oppure avvicinandosi (se b < 0) ad essa, questo provo a dire che vale anche per la spirale aurea. Ho corretto la proposta per semplificare la costruzione della spirale aurea basata sui rettangoli aurei. The logarithmic spirals (r=ae^bθ), starting from a point of distance (a) from their origin, can develop by moving away (if b > 0) or approaching (if b < 0) to it, this I try to say that also applies to the golden spiral. I corrected the proposal to simplify the construction of the golden spiral based on the golden rectangles.
Comments: 10 Pages. Copyright by Servi Dante.
Download: PDF
[v1] 2020-06-06 17:19:21
[v2] 2020-06-07 03:51:53
[v3] 2020-06-18 06:53:26
[v4] 2020-06-19 08:36:57 (removed)
[v5] 2021-03-04 08:19:24
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