Fractals are complex geometric patterns that exhibit self-similarity at different scales. They can be found in many natural phenomena, such as snowflakes, coastlines, and clouds. Fractals also have applications in fields such as computer graphics, data compression, and chaos theory. The project aims to explore fractal patterns using cellular automata and mathematical equations. The focus is on generating 3D objects that depict various states of growth through coloration, creating a visual representation of the underlying mathematics. Cellular automata are used to simulate complex systems and are particularly useful for exploring patterns that emerge from simple rules. By combining cellular automata with mathematical equations, the project seeks to create intricate fractal patterns that can be visually represented through 3D objects. The coloration of these objects is used to depict the various states of growth, providing a unique aesthetic that relates to the math behind the patterns.
