With the algorithmic expression of the precise quantity of zero and infinity we are able to formulate the methodological foundations of metamathematical analysis. These new metamathematical principles could give a unified framework to handle the well-known principles of numbers, algebras, logics, functions and geometry. This would help us to give precise formulas for those mathematical and physical problems which have approximate expressions at present. The most important result however, in using this new analytical method, is its ability to compactly express, like a hologram, the numbers, functions and geometrical relationships of a given system.

From this compact holographical expression we would be able to reverse engineer the system’s defining parameters as initial conditions and the same time the expression would be able to intelligently adapt or tune itself to any problem which is an unprecedented result in the history of science, since the success of this step has always been depended on the intelligence and the ingenuity of the scientists mind. This infinitely precise mathematical analysis could also help to decide whether an algorithmic expression is solvable in polynomial time, in this way it could be used to prove or solve the so called P = NP problem.