#### Michael Lawrence Morton's Matrix Message #51 A Whole Number Creator

Using the Hoagland Tetrahedral Latitude (in arc-degrees) .... in combination with the 45 arc-degree "diagonal-in-a-square" ... I've discovered that our whole-number sequence can be generated, using multiples of the number 18. Note ... 18 is 'double 9', of course. This refers to the 'supreme importance' of the number 9. (Gary Val Tenuta !!) .

Use the sine or cosine of 45, and the sine of 19.47122061 ...

(COS 45 X SIN 19.47122061) Squared X 18 = 1 " . . . . . . . . . . " . . . . . . . . . . ". . . . . . . X 36 = 2 " . . . . . . . . . . " . . . . . . . . . . ". . . . . . . X 54 = 3 " . . . . . . . . . . " . . . . . . . . . . ". . . . . . . X 72 = 4 " . . . . . . . . . . " . . . . . . . . . . ". . . . . . . X 90 = 5 " . . . . . . . . . . " . . . . . . . . . . ". . . . . . . X 108 = 6 Etc. . . . . . . . .Etc. . . . . . . . .Etc.. . . . . .Etc.

Notice that the "repeating 5s" decimal harmonic is produced by SQUARING the product of (COS 45 X SIN 19.47122061) ... (0.707106781 X 0.333333333) = 0.23570226 ... then ... (0.23570226 X 0.23570226) = 0.055555555 ... repeating 5s.

But not only is a "repeating 5s" decimal harmonic produced ... the specific number "0.055555555" is created, which ... when multiplied by 18 ... gives the number "1". This, in turn, becomes the template for "multiples of 18" ... to generate our series of consecutive whole numbers.

The Square and the Tetrahedral Latitude

We are seeing the importance of an *interaction* between the RIGHT ANGLE (90 arc-degrees) and the Hoagland (see the work of Richard C. Hoagland, and his book, "The Monuments of Mars") Tetrahedral Latitude of rotating planetary bodies ... 19.47122061 arc-degrees from the equator (on an 'ideal sphere'), north and south latitude. I propose that the nature of this geometric *interaction* ... be researched, because I think it is of fundamental importance to understanding more about physics.

The sum of the corner-angles in a Square is 360 arc-degrees .... the same as the circumference on a circle or sphere. A Square has 4 'right angles', of course. The number 4 is the SQUARE of 2, and also the DOUBLE of 2. This is a unique meeting ... an equation, if you will ... of a number 'times' itself and the same number 'times' 2. Are we seeing, here, any aspect(s) of a "geometry of our whole-number system" ?

-- Michael L. Morton

NOTE: Copying and circulation of this paper is encouraged, but please include the author's copyright. Thanks ~ MLM

(c) 1999 by mailto:Milamo@aol.com Michael Lawrence Morton ~ArchaeocryptographerTo contact the author please e-mail above or telephone: 412-819-0202 Pittsburgh, PA, USA.==

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