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The group of 3, 6 and 9 is special because the result of any function
with these ciphers as base always is a 3, a 6 or a 9. The table below
shows the multiplications and divisions for the reciprocals 3 and 6.
1×3= 3 (3)
2×3= 6 (6)
3×3= 9 (9)
4×3=12 (3)
5×3=15 (6)
6×3=18 (9)
7×3=21 (3)
8×3=24 (6)
9×3=27 (9)
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1÷6=0.1 666.. (3)
2÷6=0.3 333.. (6)
3÷6=0.4 999.. (9)
4÷6=0.6 666.. (3)
5÷6=0.8 333.. (6)
6÷6=0.9 999.. (9)
7÷6=1.1 666.. (3)
8÷6=1.1 333.. (6)
9÷6=1.4 999.. (9)
1×9= 9 (9)
2×9=18 (9)
3×9=27 (9)
4×9=36 (9)
5×9=45 (9)
6×9=54 (9)
7×9=63 (9)
8×9=72 (9)
9×9=81 (9)
1×6= 6 (6)
2×6=12 (3)
3×6=18 (9)
4×6=24 (6)
5×6=30 (3)
6×6=36 (9)
7×6=42 (6)
8×6=48 (3)
9×6=54 (9)
Wholly Science – Understanding the Process of Creation
1÷3=0.333.. (6)
2÷3=0.666.. (3)
3÷3=0.999.. (9)
4÷3=1.333.. (6)
5÷3=1.666.. (3)
6÷3=1.999.. (9)
7÷3=2.333.. (6)
8÷3=2.666.. (3)
9÷3=2.999.. (9)
Multiplying by 3 or dividing with 6 results
in a clockwise movement, while multiplying
by 6 or dividing with 3 results in a counterclockwise
movement. The figure to the left
shows both movements. This figure also
represents the clockwise movement created
by adding 3 or subtracting 6, and the
counter-clockwise movement created by
adding 6 or subtracting 3.
1÷9=0.111.. (1)
2÷9=0.222.. (2)
3÷9=0.333.. (3)
4÷9=0.444.. (4)
5÷9=0.555.. (5)
6÷9=0.666.. (6)
7÷9=0.777.. (7)
8÷9=0.888.. (8)
9÷9=0.999.. (9)
The most special cipher of all is the 9. The result of any multiplication
with 9 is always a 9. Just like 1 and 8, the 9 is also its own recip-
rocal. However, any division by 9 not always results in a 9. Dividing
by 9 does not alter the cipher root value, and the same is true for adding
or subtracting 9. The table above shows the basic multiplications
and divisions with 9 as the base cipher.
The figure to the left shows each of the three
cipher groups as a triangle. The triangle is the
symbol for trinity. Each of these groups is a
trinity in itself. To accentuate that the trinity
of 3, 6 and 9 is special, its triangle has dotted
lines.
All this belong to the basics of cipher
mathematics, in which adding, subtracting,
multiplying, and dividing are the four basic functions, which create
movement in the Flow World. Let us now look at two advanced
functions. The first is doubling. The table below shows the beginning
of the doubling sequence and the cipher root values of each number.
1 2 4 8 16 32 64 128 256 512 1024 2048
1 2 4 8 7 5 1 2 4 8 7 5
In the Shadow World, there are many examples of projections that
result from this doubling series. Firstly, the process of cell division
results in doubling the amount of cells. After 6 divisions, there are 64
cells that together form an independent unity. This cipher root value
also shows this unity, since it is 1. Another example is the digital
programming language based on this doubling series. Combining
binary values (yin or yang) on three positions results in 8 different
trigrams of the I Ching, while combining two trigrams (again yin and
yang) results in 64 hexagrams. Lastly, the chess board also has 8
times 8 makes 64 fields.
The doubling sequence is an infinite repetition of the series of 1, 2, 4,
8, 7, and 5. The opposite is true for the complementary function of
Wholly Science – Understanding the Process of Creation 107