I use this formular: Z ← Z² + F(C) where F(C) is a complex function of the screen coordinate C. If F does not depend on Z, it means that F(C) can be calculated before the starting of the iteration process. Which makes calculations faster.
In this video F(C) = p∙(⁴C)ᵐ + u.
m, p and u are reals numbers. ⁴C is a TETRATION with the high of 4: ⁴C = C^(C^(C^C)).
I make the following morphing:
(m, p, u) = (1, 0.8, 0) → (1, 0.2, ½) → (1, 0.4, -0.2) → (1, 0.4, 0) → (1, 0.325, 1/4) →
(1.38, 0.3125, 0.187) → (3/4, 0.3, 1/8) → (3/4, ½, 1/8) → (1½, 1, ½) → (1, 0.18, 0) →
(1, 1, 1) → (2, 1, 1) → (2, 1, -1) → (1, 0.2, 0)
In this video F(C) = p∙(⁴C)ᵐ + u.
m, p and u are reals numbers. ⁴C is a TETRATION with the high of 4: ⁴C = C^(C^(C^C)).
I make the following morphing:
(m, p, u) = (1, 0.8, 0) → (1, 0.2, ½) → (1, 0.4, -0.2) → (1, 0.4, 0) → (1, 0.325, 1/4) →
(1.38, 0.3125, 0.187) → (3/4, 0.3, 1/8) → (3/4, ½, 1/8) → (1½, 1, ½) → (1, 0.18, 0) →
(1, 1, 1) → (2, 1, 1) → (2, 1, -1) → (1, 0.2, 0)
- Category
- Paul Mccartney
- Tags
- Jens-Peter Christensen, Mandelbrot, Fractal
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