Part 8/10:
The recurring themes in vortex math show that sequences—whether starting from 1, 3, or 9—are infinite and self-sustaining. The patterns are resilient to the size of the numbers involved; regardless of how large they grow, multiplying by 2 and then taking the vortex sum or mod 9 keeps them within predictable cycles.
This invariance suggests a deep underlying symmetry within the number system. For example, the pattern 124875 repeats eternally once it begins, and similar rules apply for the 36 pattern and the 9 pattern.
The pattern of 36, for instance, is especially notable because it demonstrates a non-stop, perpetual cycle that continues indefinitely, emphasizing the robustness of these digital behaviors.