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What If There’s a Whole Family of 2D Number Systems? | Dimensional Algebra Part 1

In this video, we journey from the familiar world of complex numbers into the unexplored realm of *Mokabic numbers* and beyond. You'll discover how each 2D number system has its own unique geometry and algebra, built using real numbers as coefficients and defined by rotational symmetry. We introduce the *Mokabic number system**, where the unit t satisfies t^3 = -1, giving rise to a beautiful hexagonal structure and 60° rotations. Then, we explore how to **generalize all 2D number systems* using the form r^n = -1, where each n creates a unique algebraic universe. Finally, we reveal the foundation of a much bigger idea — a recursive method to build higher-dimensional number systems using lower ones as coefficients. This is the first step into *Dimensional Algebra* — a powerful new framework for understanding space, rotation, and algebraic structure in any dimension. Tags: Complex Numbers, Mokabic Numbers, t³ = -1, Generalized 2D Numbers, Algebraic Geometry, Rotational Algebra, Dimensional Algebra, Quaternion Alternative, New Number System