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#23 YAHWEH prescribes the inner Tree of Life

 

 YAHWEH prescribes yod population of inner Tree of Life

A 26-gon with its 26 sectors turned into tetractyses has 156 yods surrounding its centre.* This is the sum of all possible combinations of the letters of the Godname YAHWEH with number value 26:

YHVH = 26.

Y = 10, H = 5, V = 6.

 

1. Y + H + V = 21;
2. YH + YV + HV + HH = 52;
3. YHV + YHH + HVH = 57;
4. YHVH = 26.

  Total = 156.

 

131 black yods line the sides of the 26 tetractyses, where 131 is the number value of Samael, the Archangel of Geburah (see here). Weighting each yod with the Tetrad (4) generates the number 524. This is the number of yods in the (7+7) enfolded polygons of the inner Tree of Life when their (47+47) sectors are tetractyses, the number 4 located at the centre of the 26-gon denoting the four yods of the root edge shared by the 14 polygons. YAHWEH, therefore, prescribes the yod population of the inner Tree of Life. Outside their root edge, each set of seven enfolded polygons contains 260 yods (see here). This is the number of yods in 26 separate tetractyses. It is another way in which YAHWEH prescribes the inner Tree of Life. The Godname EHYEH with number value 21 prescribes this number because 131 is the sum of the 21 integers in the sequence:

 

11 + 10 + 9 + 8 + 7 + 6 + 5 + 4 + 3 + 2 + 1 + 2 + 3 + 4 + 5 + 6 + 7 + 8 + 9 + 10 +11,

 

so that 524 (=4×131) is the sum of the 21 integers spaced four units apart and with the Tetrad in the middle of the sequence:

 

44 + 40 + 36 + 32 + 28 + 24 + 20 + 16 + 12 + 8 + 4 + 8 + 12 + 16 + 20 + 24 + 28 + 32 + 36 + 40 + 44.

 

The central number 4 denotes the four yods in the root edge that are shared by each set of seven enfolded polygons, whose 260 yods correspond to the sum of the 10 integers 8-44 on either side of the Tetrad.

 

The Decad (10) also determines the yod population 524 because the cubes of 1, 2, 3 & 4 assigned to the 61 yods in a decagon whose sectors are tetractyses add up to this number:

 

 Decagonal representation of 524

 


 

* Proof: Each sector of an n-gon adds six yods when it is a tetractys. Number of yods in an n-gon ≡ N(n) = 6n + 1. The number of yods in a 26-gon = N(26) = 6×26 + 1 = 157. Surrounding its centre are 156 yods.

 

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