FIBONACCI_SPIRAL is a MATLAB library which displays points on a Fibonacci spiral, suggesting the arrangement of seeds in a sunflower, for instance.
The spirals exhibited in nature can be modeled by a simple spiral of points generated, in polar coordinates, by starting at R = 0, A = 0, and then repeated incrementing R by dR = 1, and A by an angle dA of about 137.5 degrees, or, more precisely, by 2 * PI * ( PHI - 1 ) / PHI radians, where PHI is the Golden Ratio, equal to (1+sqrt(5))/2.
The spiral along which the points occur sequentially is not, in fact, what the viewer first notices. Instead, an image of the spiral will seem to exhibit two families of spirals emerging at a sharp angle from the center. One family rotates clockwise, the other counter-clockwise.
The program fibonacci_spiral simply displays the blue dots representing the points; in this image, the Fibonacci spirals are evident. The program fibonacci_spiral_connected includes a red spiral line that connects the dots in the sequence in which they are generated. Plots of this kind are not very legible after 100 or so points.
The computer code and data files described and made available on this web page are distributed under the GNU LGPL license.
FIBONACCI_SPIRAL is available in a MATLAB version.
LORENZ_SIMULATION, a MATLAB program which solves the Lorenz equations and displays the solution, for various starting conditions.
MANDELBROT, a MATLAB program which generates an ASCII PPM image of the Mandelbrot set;
You can go up one level to the MATLAB source codes.