An Archimedean spiral is defined as a type of mathematical spiral by the equation r = a + bθ, where r represents the distance from the origin to a point on the spiral, θ represents the angle between the radial line from the origin to that point and the positive x-axis, and a and b are constants. By iterating the equation into a grid, complex abstract patterns are created. The result is a series of spirals that radiate out from the origin, sometimes resembling the original spiral and sometimes not. The spirals are combined with a rich color palette, blend modes, and shadows to create intricate and colorful artworks carefully called as Archimedean Patterns. Generative art often results from the combination of mathematical knowledge and creativity. Mathematical equations, such as the Archimedean spiral, provide a structured approach for generating complex patterns and designs. The variables in these equations can be controlled and manipulated to create unique and aesthetically pleasing results. In addition to the precision offered by mathematics, the creative process also plays a significant role in the outcome of generative art. Artistic choices such as color selection, blend mode adjustments, and composition all contribute to the visual appeal of the final piece. >>> Pay attention to a super rare feature called 'Charcoal'! Press [S] to save a high-resolution .png image in full view. D. __________________________________ Feb 2023.