 |
|
|
|
|
|
|
|
 |
|
||||||
|
|||||||
you are here: > Self > 14.
LOGOS
| 14.5 |
The Creation Of Physical Form = Creation Of Rules Governing Physical Form
|
|
| Once UCA created physical form (the Unita), it also created a series of rules governing physical form. But first, let us re-trace and summarize the important knowledge that allows us to consider how UCA- Unique Collective Awareness created the infinite physical universe of UNITA, or UNITAS | ||
| 14.5.1 | The key relationships between rules and concepts discussed so far | |
| First, we began with fundamental concepts ( without form), we call PRIMUS DA. Second, the Primus DA, allow us to construct a model of thinking, classification and argument, called LOGOS. | ||
| In turn, we saw that LOGOS is categorized into key prime ideas we called ABSOLUTE DIA's: | ||
| 1. UCADIA- | The constant prime ideas around the prime idea of UCA | |
| 2. UNIDIA- | The Constant prime ideas based around the prime idea of the Universe ( still to be outlined) | |
| 3. CORDIA- | The Constant prime idea based around the prime idea of life ( still to be outlined). | |
| These Prime Ideas, then underpin the second level of Logos, enabling us to construct coherent frameworks for categorization and argument we call the Genesis Ideas, or Ordos: | ||
| The Ordos (principles) of Existence | ||
| The Ordos (principles) of Categorization | ||
| The Ordos (principles) of Identity | ||
| The Ordos (principles) of Contradiction | ||
| The Ordos (principles) of Pattern ( still to be discussed) | ||
| The Ordos (principles) of Cause ( still to be discussed) | ||
| The Ordos (principles) of Effect ( still to be discussed) | ||
| The Ordos (principles) of Ratios ( still to be discussed) | ||
| The Ordos (principles) of Argument (still to be discussed) | ||
| Then from the thinking framework of Logos, we considered the creation laws and their sequence in actually creating the physical universe, we called the AEONs. | ||
| The 12 Creation Laws (AEONs) | ||
|
||
|
||
|
||
|
||
|
||
|
||
|
||
|
||
|
||
|
||
|
||
|
||
| 14.5.2 | The laws governing physical form | |
| From these thinking tools of LOGOS and the AEONS, a range of fundamental sets of laws are then created. These exist as part of UCA and their existence is confirmed by the behaviour of each and every level of matter within certain tolerances. | ||
| For example, the fact that chairs where you are do not spontaneously break down into sub atomic elements, causing a massive surge in motion, implies the existence of these rules in constant operation. | ||
| These rules are defined from the universal: | ||
|
||
|
||
|
||
| 14.5.3 | EIKOS- a language describing the features, relationships and complex functions of physical form | |
| EIKOS is the scientific language of UCA, describing in symbolic representation to actual features, relationships, motions and interactions between all matter in the Universe. | ||
| Hence the word Eikon from the original greek word meaning "likeness, image". Therefore Eikos describes the likeness of symbolic representation to what UCA actual does- therefore Eikos is a language describing the workings of UCA, just as Logos provides a language of ideas and their relationships with words. | ||
| EIKOS is divided into a number of sub disciplines, which are called "branches": | ||
| (1) NUMERICS e.g. | ||
|
e.g. forms of numeration additive numeration multiplicative notation o decimal point notation sexigesimal notation binary, octal, hexadecimal | |
|
e.g. rational numbers perfect and amicable numbers powers and roots pi irrational numbers | |
|
e.g. permutations graph theory samples with replacement combinations | |
| (2) SYMERICS e.g. | ||
|
(including algebra) | |
|
e.g. o linear o quadratic o inequalities o root, exponential o logarithmic o quartic o diophantine equations History | |
|
||
| (3) GEOLEX e.g. | ||
|
||
|
||
|
||
| (4) AXIOMATICS e.g. | ||
|
||
| 14.5.4 | Why Eikos? Why not mathematics? | |
| Considering that most people on earth at some time have learned the essential concepts of mathematics, it is fair to ask why consider the concept of EIKOS, rather than continue with the wealth of knowledge contained in the science of mathematics. | ||
| There are three key reasons for this: | ||
| (1) | The fundamentals of mathematics are based upon the essential pillars of logic, which we discussed in the previous chapter is a classification system, that does not best represent the nature of the "real" world, nor UCA. As such, to use mathematics as it currently is configured, would conflict with the understandings of Logos and the principles of UCA as so far discussed. | |
| (2) | Mathematics has become more complex in terms of language, terms, symbols, logic rules and formulas. Mathematics has grown from its beginnings into a major science and language of its own, with thousands of complex terms, symbols, rules of logic and formulas. | |
| Many key concepts underpinning mathematics are simply not supported by UCA as having application to this dimension or the sustainment of any other dimension. | ||
| (2) | Godel's Incompleteness theorem proved 0 = 1, proved the existence of the prime contradiction underpinning every mathematic rule, every formula and every set. The rules of mathematics however are still written in a world of 0 = 0 , 1 = 1. In other words, the rules don't match up to the prime truth- nothing is absolute. Eikos on the other hand is surprisingly simple, consistent with the observations of Logos and UCA. | |
| The American Constitution of Government is one example, the Roman Christian Canon Law and the Ten Commandments are other good examples. | ||
|
Copyright © 2010 UCADIA. All rights reserved. |
||