Examined here is a proposed zero-dimensional number theory as the process of labelling zero-dimensional space as a point and zero-dimensional time as a moment as the different mathematical values of 0 and 1 respectively. By such it can be shown how zero-dimensional time in being mathematically labelled as a unit can form relationships between zero-dimensional spatial points labelled as 0. Here, zero-dimensional time can be demonstrated to derive a suite of mathematical operators for zero-dimensional points that then relate with each other in the form of equations for 1d, 2d, and 3d timespace. By such, time can be shown to represent the fundamental basis for all mathematical equation operators (addition, subtraction division, multiplication, equality, exponentiation, etc) for points in space. Subsequently, it is proposed that the resulting time and space (timespace) equations are synonymous with the mathematical equations that describe both the physical phenomenal field forces and their associated particle activity. In this process, solutions can be shown for Goldbach’s conjecture, the Riemann hypothesis, and Fermat’s last theorem, together with the formulation of a physical theory matching known physics theory equations and associated constants. The result of such is a zero-dimensional number theory that both prescribes the basis for a mathematical theorem together with becoming a physical theory as a process of accounting for the equations of physical phenomena.