I.   Introductory Provisions

Computations are the thirtieth of thirty-three (33) Administrative Elements of Trust being summarizing, calculation and reckoning of arithmetic numbers and values associated with the Property of Trusts, Estates and Funds. All valid Computations in association with any Trust or Estate or Fund must be in accord with these present Canons.

As the Computations in association with valid Trusts, Estates and Funds are in association with Rights and forms of Property, all Computations must obey the Canons of Natural Law and the Elemental Concepts of Numbers, Sets, Perfect Numbers, Imperfect Numbers, Inheritance, Variables, Derivative Sets and Axioms.

In accord with Natural Law, all Computations associated with valid Trusts, Estates and Funds must obey the Elemental Concepts of Numbers being:

(i) All numbers are both unique concepts and objects in themselves; and

(ii) All numbers may be represented symbolically; and

(iii) All numbers are real by virtue of their existence; and

(iv) The degree of reality of a number is dependent upon the degree to which the number represents real world objects and/or measurements and relationships of real world objects; and

(v) The set of all numbers may be defined as the UNISET; and

(vi) The nature, properties, quantity and value of Property of a valid Trust, Estate or Fund may be expressed through numbers in accord with these rules.

In accord with Natural Law, all Computations associated with valid Trusts, Estates and Funds must obey the Elemental Concepts of Sets being:

(i) All Numbers are a Set of 1; and

(ii) All numbers of a Set may be defined as existing between the prime numbers of 0 and 1 by some multiplying degree (ratio); and

(iii) 0 is a member of 1 and itself; and

(iv) 1 is a Set and a member of itself; and

(v) The Sum of these Properties may also be known as the UNISET; and

(vi) If one member of the UNISET ceased to exist, the total set being UNISET ceases to exist; and

(vii) The existence of UNISET is therefore dependent on the existence of each individual member of the Set for itself to exist; and

(viii) The Sets of numbers of a valid Trust, Estate or Fund may be presented in accord with these rules.

In accord with Natural Law, all Computations associated with valid Trusts, Estates and Funds must obey the Elemental Concepts of Perfect Numbers being:

(i) A Perfect Number is any positive number including zero that can be expressed as a ratio of itself or other positive numbers; and

(ii) Infinity, Six, Two, One and Zero are examples of perfect prime numbers related to themselves, 1 and other numbers; and

(iii) All Perfect Numbers may be defined as either Unique, Similar or Idea (theoretical); and

(iv) Unique Perfect Numbers – can represent uniquely real objects (e.g.1, 3,5, 7, 9, 11 etc) and are found most commonly in the unique measurement of real objects; and

(v) Similar Perfect Numbers – can only represent collective real objects (e.g. 2, 4, 6) and are found most commonly as sets of real world objects; and

(vi) Idea Perfect Numbers – cannot represent real objects (e.g. 2.5); and

(vii) Perfect Number are equivalent in part to integers in mathematics as the term incorporates the set of positive numbers. However, as integers may also contain negative numbers, the term Integer is never permitted as a valid description of numbers; and

(viii) The quantity, valuation and essential character of Property of any valid Trust, Estate or Fund can only be expressed in Perfect Numbers and never in Imperfect Numbers.

In accord with Natural Law, all Computations associated with valid Trusts, Estates and Funds must obey the Elemental Concepts of Imperfect Numbers being:

(i) An Imperfect Number is any positive or negative number excluding zero that cannot be expressed as a ratio of itself; and

(ii) Pi is an imperfect unique number expressing the level of perfection of geometric configuration of perfect numbers in a circle; and

(iii) All imperfect numbers may be defined as either Unique, Similar or Idea (theoretical); and

(iv) Unique Imperfect Numbers – can represent uniquely real ratios (e.g. pi, e); and

(v) Similar Imperfect Numbers – can only represent collective real ratios (e.g. 180º); and

(vi) Idea Imperfect Numbers – cannot represent real ratios or real objects (e.g. -1.2); and

(vii) Imperfect Numbers are equivalent in part to integers in mathematics as the term incorporates the set of numbers. However, as integers may also contain natural numbers, the term Integer is never permitted to be used as a valid description; and

(viii) The use of Imperfect Numbers to describe the value, or quantity or essential character of Property of a Trust, or Estate or Fund is absolutely forbidden.

In accord with Natural Law, all Computations associated with valid Trusts, Estates and Funds must obey the Elemental Concepts of Inheritance being:

(i) A member of a Set inherits the properties of the Set to which it belongs; and

(ii) All objects of a Set share common properties to some degree according to their inheritance of Sets; and

(iii) All objects of Sets have unique properties to some degree according to their specialized inheritance of Sets.

In accord with Natural Law, all Computations associated with valid Trusts, Estates and Funds must obey the Elemental Concepts of Variables being:

(i) All known and unknown numbers may be represented as unique sets of symbols representing possible values called Variables; and

(ii) All Variables may be defined into only one of two (2) types being Real and Theoretical; and

(iii) A Real Variable is any Variable that represents a known object and/or property of an object; and

(iv) A Theoretical Variable is any variable that does not represents a known object and/or property of an object; and

(v) All Variables naturally inherit the rules and restrictions according to its type (Real or Theoretical) and particular use; and

(vi) All Variables are specialized and unique to some degree (Unique Variable) depending upon their particular type; and

(vii) All Variables are co-dependent to some degree (Co-dependent Variable) depending upon their particular type; and

(viii) All Variables are common and interchangeable to some degree (Universal Variable) depending upon their particular type.

In accord with Natural Law, all Computations associated with valid Trusts, Estates and Funds must obey the Elemental Concepts of Derivative Sets being:

(i) A Derivative Sets is any Set (of numbers) expressed by its Inheritance from a previous Set and some kind of active Computation of its Elements; and

(ii) There are four kinds of Derivative Sets, Simple Growth, Exponential Growth, Simple Decay and Exponential Decay; and

(iii) A Simple Growth Derivative Set denotes the statement - "the sum SET of all elements of type [a] by ADDITION as the NUMBER of the SET [t] increases by 1 as the value of type [a] elements increase from value [x] to [z] by method [c]"; and

(iv) A Exponential Growth Derivative Set denotes the statement - "the sum SET of all elements of type [a] by MULTIPLICATION as the NUMBER of the SET [t] increases by 1 as the value of type [a] elements increase from value [x] to [z] by method [c]"; and

(v) A Simple Decay Derivative Set denotes the statement - "the sum SET of all elements of type [a] by SUBTRACTION as the NUMBER of the SET [t] increases by 1 as the value of type [a] elements decrease from value [x] to [z] by method [c]"; and

(vi) A Exponential Decay Derivative Set denotes the statement - "the sum SET of all elements of type [a] by DIVISION as the NUMBER of the SET [t] increases by 1 as the value of type [a] elements decrease from value [x] to [z] by method [c]".

In accord with Natural Law, all Computations associated with valid Trusts, Estates and Funds must obey the Elemental Concepts of Axiom being:

(i) Proof of Axiom is the validation that an axiom satisfies all conditions for which it is intended to be used; and

(ii) The first condition of Proof of Axiom is Existence- that the axiom exists in a published form consistent with the rules of Natural Law and these Canons; and

(iii) The second condition of Proof of Axiom is Dimension- that the dimension of the Axiom is defined and consistent with the use of variables and any special conditions; and

(iv) The third condition of Proof of Axiom is Statement- that the axiom declares a formal statement capable of being tested to produce a consistent result; and

(v) The fourth condition of Proof of Axiom is Result- that the axiom produces a result when tested that can be documented and reproduced; and

(vi) A valid Axiom that satisfies all four (4) conditions for which it is intended may be said to have been proven if evidence of its test can be both produced and then reproduced; and

(vii) A valid Axiom which is unable to satisfy all conditions for which it is intended and/or cannot be produced with evidence of its test and reproduced is said to be unproven. This however, does not mean an axiom is invalid - only as yet unproven.