In geometry, a golden spiral is a logarithmic spiral whose growth factor is φ, the golden ratio. That is, a golden spiral gets wider (or further from its origin) by a factor of φ for every quarter turn it makes.*
This artwork was originally part of a number of elements for a new series of Alan Turing portraits based around Pop Art Fibonacci Curves. I got distracted and thought the beauty of the curves warranted it's own series.
Type: Fine-Art Print
Materials: 100% Cotton Paper
Paper: Hahnemühle German Etching
Size A1: Gallery Edition of 20
Size A0: Gallery Edition of only 6
Size A1: 59.4 x 84.1cm, (23.4" x 33.1")
Size A0: 84.1 x 118.8cm (33.1" x 46.8")
A0Image: approx. 68 x 96cms (27"x 38")
This artwork is sold unframed
Includes: Certificates of Authenticity
Signed by the Artist in pencil on the front**
Artwork will be shipped rolled in secure tube.
*Approximate logarithmic spirals can occur in nature (for example, the arms of spiral galaxies or phyllotaxis of leaves); golden spirals are one special case of these logarithmic spirals. A recent analysis of spirals observed in mouse corneal epithelial cells indicated that some can be characterised by the golden spiral, and some by other spirals It is sometimes stated that spiral galaxies and nautilus shells get wider in the pattern of a golden spiral, and hence are related to both φ and the Fibonacci series. In truth, spiral galaxies and nautilus shells (and many mollusk shells) exhibit logarithmic spiral growth, but at a variety of angles usually distinctly different from that of the golden spiral. This pattern allows the organism to grow without changing shape.
Check out the close-up details for a better idea of the final image.
Extremely flattered to be included in the Saatchi Blog 'Art We Love' A Few Painting Techniques Artists Use Explained: LinkHERE
**Hand-signed in pencil as StewartHR aka Czar Catstick & The Emperor's New Clothes Collective @BigFatArts Gallery.