👉 The drawn math involves the concept of fractals, which are geometric shapes that exhibit self-similarity at various scales. Imagine a simple shape like the Sierpinski triangle, formed by repeatedly removing triangles from a larger equilateral triangle. Each iteration creates smaller triangles that mirror the larger ones, creating an infinitely detailed pattern. This process can be described mathematically using recursive equations and geometric transformations, such as scaling and rotation. The fractal dimension, a measure of complexity, often exceeds the traditional integer dimensions (1D, 2D, 3D), reflecting the intricate structure's complexity. This drawn math not only visually represents these patterns but also demonstrates how simple rules can generate infinitely complex structures, bridging geometry, algebra, and chaos theory.
