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I. Introductory provisions
1.1 Introductory Provisions
Article 2 - Natural Law
An Axiom is defined by the EIKOS Language System as being any valid IDEA based on one or more SYMERIC FORMULA having certain assumptions and applicability. A Symeric Formula is defined as a combination of ELEMENTS defined by EIKOS, LOGOS, NUMERICS, UNISET and GEOLEX in a formal FUNCTION and RELATION.
All Natural Law key concepts, classes and rules are constructed from the relationship between RELATIONSHIPS & MEASUREMENT to the rest of the set of OBJECTS and CONCEPTS defined by the Ucadia Classification System, the Ucadia Standard Model of Universal Elements and the Ucadia Symbols System.
The total sum of three hundred and sixty seven (367) primary set of axiom of Natural Laws are sufficient to provide for the complete representation of all possible relationships, properties, axiom and scientific theorem of objects and concepts defined in the Ucadia Standard Model of Universal Elements.
The Natural Laws may be defined as a single (1) axiom known as the Universal Law. In addition, the UCA Model may be defined fourteen (14) primary sets of axioms or the complete set of three hundred and sixty seven (367) primary sets of axioms. Each axiom is dependent on the existence of at least one (1) other axiom of the SET. Furthermore, the Universal Law can be demonstrated to have universal specificity and applicability at each and every level of matter, thereby proving its validity as the Universal Law.
All Natural Law may be discerned and derived from the Natural Laws of UCADIA.