Space Attractor in a neighbourhood of (0.00000000000000000000, -0.01448385194481410267), in the profound of the Julia set corresponding to the point (-0.74452870115870395384, 0.14818387295279708549) of the Mandelbrot. Original Mandelbrot NFT: https://opensea.io/assets/0x6e96fb1f6d8cb1463e018a2cc6e09c64ed474dea/1400
A collection of Julia sets, mathematically connected to the Mandelbrot Set Collection and the Mandelbrot Trilogy Collection
These artworks are generated with a numerical algorithm and engraved into 4200 unique NFTs. Each work represents the neighborhood of one of our favorite points of the Julia corresponding to the point C at the center of a piece of the Mandelbrot Set Collection.
Julia's zoom factor is the logarithm of the Mandelbrot's zoom and colored with a similar gradient, based on how fast the iteration the function f(z) = z^2 + c diverges to infinity. And remember: golden-colored points are very scarce.
There are 128 video pieces realized by Abramo, plus 66 videos and 50 images created by Maths Town.
You can get more information and mint a new, randomly selected Julia on our website
#1400 - Profound Space Attractor (B)
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#1400 - Profound Space Attractor (B)
- 가격USD 가격수량만료From
- 가격USD 가격수량하한가와의 차이만료From
Space Attractor in a neighbourhood of (0.00000000000000000000, -0.01448385194481410267), in the profound of the Julia set corresponding to the point (-0.74452870115870395384, 0.14818387295279708549) of the Mandelbrot. Original Mandelbrot NFT: https://opensea.io/assets/0x6e96fb1f6d8cb1463e018a2cc6e09c64ed474dea/1400
A collection of Julia sets, mathematically connected to the Mandelbrot Set Collection and the Mandelbrot Trilogy Collection
These artworks are generated with a numerical algorithm and engraved into 4200 unique NFTs. Each work represents the neighborhood of one of our favorite points of the Julia corresponding to the point C at the center of a piece of the Mandelbrot Set Collection.
Julia's zoom factor is the logarithm of the Mandelbrot's zoom and colored with a similar gradient, based on how fast the iteration the function f(z) = z^2 + c diverges to infinity. And remember: golden-colored points are very scarce.
There are 128 video pieces realized by Abramo, plus 66 videos and 50 images created by Maths Town.
You can get more information and mint a new, randomly selected Julia on our website