Interrelationships of math and gepmetry appear at the Great Pyramid

Interrelationships of the Past Crossed Disciplines

One source is the stamping mill that makes our Universe: That is the traditional 3 x 3 number square pictured below.

Interrelationships of the Past Crossed Disciplines. Numbers were an ancient reasoning tool.  Ancient philosophers and priests used common numbers to emphasize similarities. This blog simply illustrates one example: How Great Pyramid and the Platonic solids use the same numbers. I’ll walk my reader through the meaning of two diagrams.

Platonic solid transformation is by numbers.#1 = tetrahedron. #2 = cube. #3 = octahedron. #4 = dodecaedron. # 5 = icosahedron.

First: The dimensions of the Great Pyramid. Its essential dimensions are: Square base is 8 x 8 great cubits. The four triangulated faces peak together at 5 great cubits: Note-

  • The base is square. It measures 440 shorter  Egyptian cubits of 1.71818..  feet on each side.
  • One Great Cubit is 55 of such smaller cubits.
  • The Great Pyramid measures 440 cubits or 8 such great cubits on each side.
  • The truncated height is 275 of these smaller cubits.
  • By great cubits this becomes 5.

Next we turn our attention to the 5 solids. First, 5 is the key number for both: The Great Pyramid has 5 faces. There are 5 Platonic solids.What is the source of  five? It is not an arbitrary number. Look at the 3 x 3 number square. Five is at its core. Very important: Interrelationships are deeper than they appear on this number square. Through opposite polarities they go to infinity! One example is in the next paragraph.

Interrelationships here is the ancient source.
This code demonstrates the inner workings of the Great Pyramid and the Platonic Solids.

I mentioned each side of the Pyramid is 440 cubits. Where is 440 n this number square?  For this I must credit an Indian spirit I believe to be from the Lennie Lenape tribe. I spent many summers on Oquaga Lake.

Image result for picture of Oquaga lake
Oquaga Lake is where I worked as a professional pianist. I played many shows in the large, white building at Scott’s Oquaga Lake House. It is full of fun, wonderful memories and stories.

Interrelationships Galore

Take the numbers around the perimeter. Add them two at the time as follows: 49 + 92 + 27 + 76 + 61 + 18 + 83 + 34 = 440. It is the same forwards or backwards. Each side of the square-based Great Pyramid is 440 cubits. It’s the numbers that are important: Ancients of varied civilizations attached their own units of measure to these key numbers. What was the primary reason the Great Pyramid was built?

  1. To illustrate every way the 3 x 3 square can function.
  2. With this knowledge, a new Golden Age of Peace and Plenty can be implemented 

Next, look at the illustrations of the Platonic solids. Vertical column one (on the left) totals the features each solid.  Each of the five has its own horizontal column. This shows the added horizontal values. Here is the total number of faces, corners and edges for each solid. In other words, the topology.

  • The tetrahedron has 14.
  • The cube has 26.
  • The octahedron has 26.
  • The icosahedron has 62.
  • The dodecahedron has 62.

This information can be found in standard textbooks on geometry. Next the chart reduces these topology numbers as follows:

  • Fourteen: 1 +4 = 5. This is for the tetrahedron.
  • Twenty-six: 2 + 6 = 8. This applies to the cube and octahedron.
  • The third different number is sixty-two.  6 + 2 = 8. This applies to the dodecahedron and icosahedron.

We thus see four eights and one five. That duplicates the four-square base of 8 Great Cubits on each side and the pyramid’s height of 5 Great Cubits.

Image result for picture of Oquaga lake
The pot of gold at the end of the rainbow on Oquaga Lake holds knowledge.



Clues dead end when looking for sources. of antiquity

Clues Dead End as in the movie-National Treasure

Clues Dead End As in the Movie-National Treasure. For 15 years I thought the prototype of the cosmos was the 5 Platonic solids. They provided so many answers. Then, after following a path, it dead ended.  An example was my excitement over discovery of ancient cycles of time. Ancients used astrological ages.  An age is a time period in which astrologers claim a primary line of thought runs with people. This realtes relating to culture, society, and politics. There are twelve astrological ages corresponding to the twelve zodiacal signs in western astrology.

  • 2,160 years equals one astrological age.
  • Another, how there are 1440 minutes in a 24 hour time frame.
  • Another, is the Babylonian’s measure of time called a shar. It equaled 3600 years. The Sumerians defined a “load” by this figure.
  • UnitRatioMean ValueSumerianAkkadianCuneiform
    grain1/18046.6mg ±1.9mgšeuţţatu𒊺
    shekel18.40g ±0.34ggin2šiqlu𒂆
    pound60504g ±20gma-namanû𒈠𒈾
    load360030.2kg ±1.2kggun

What are the Platonic Solid Parallels to the Above?

Platonic solid transformation is by numbers.
#1 = tetrahedron. #2 = cube. #3 = octahedron. #4 = dodecaedron. # 5 = icosahedron.
Platonic solid transformation by numbers
  1. As per the chart above: A cube totals 2160°.
  2. An octahedron has 1440°.
  3. An icosahedron has 3600°.


Octahedron Unifies Space Time in Ancient Cultures – DSO Work

Clues Dead End on National Treasure

In the movie, Ben Gates comes from a family of treasure hunters. Now his grandfather believes that the forefathers buried a treasure.  It is somewhere in the country.  Clues are everywhere.  But, unfortunately, they are highly cryptic and scattered all over the place.
Movie national treasure.JPG
Ancient computing was based on the Platonic Solids

Ancient Computing Utilized the Platonic Solids

Ancient Computing Utilized the Platonic Solids. First: What are the Platonic solids? In three-dimensional space, a Platonic solid is a regularconvex polyhedron. It is constructed by congruent (identical in shape and size) regular (all angles equal and all sides equal) polygonal faces.  They  have the same number of faces meeting at each vertex. Five solids meet those criteria. That’s it. A 6th cannot be constructed.

Four facesSix facesEight facesTwelve facesTwenty faces
(3D model)
(3D model)
(3D model)
(3D model)
(3D model)

The tetrahedron is the basis of the other four solids. Look at the 1st five numbers.  With that knowledge, here is some mathematical fun. 1²  x 2² x 3² x 4² x 5² = 14,400. Where is 14,400 significant as an ancient number?

The tetrahedron is the basic unit of the five.
By vertices, its 4 triangles total 720º (4 x 180° per triangle).  Then 7 + 2 + 0 = 9.
The solid whose faces contain  the most degrees of the 5 is the dodecahedron
With 9 x 720° = 6,480°. (This is exactly 9 x the  tetrahedron’with 720° degrees).  (9 x 720 = 6480).  Its second way is,  6 + 4 + 8 + 0 = 18. Reducing the number by horizontal adding of the smaller numbers,  1 + 8 = 9.

With the remaining three solids: Cube has 2,160°. Each of its 6 squares has 360°. Thus, 6 x 360 = 2160. That is 3 times the 720° of the tetrahedron. Reduce 2160 and we have:  2 + 1 + 6 + 0 = 9.
Icosahedron has 20 triangles. Every triangle has 180°. Thus, 20 x 180 = 360o. That is five times the 720 ° of the basic tetrahedron. Reduce 3600 and we have: 3 + 6 + 0 + 0 = 9
Finally,  there’s the octahedron with 8 triangles. 8 x 180° = 1440. That is 2 x the 720° of the tetrahedron. Then 1 + 4 + 4 + 0 = 9.
In content and quality number 9 imbues the  regular solids.

Ancient Computing had a Source

  • Why was  number 9 the limiting number of the Platonic solids in the manner described above? I like to call the nine-boxed digits in the number square below the “stamping mill of the Universe.”  Nine is the highest number of the traditional arrangement of the pictured numbers.
  • A second mystery: Why are there only 5 possible regular polyhedrons?  Because 5 is the core number of the 3 x 3 number square. The infinitely complex Universe is stamped out from this simplest of number squares.
  • A third mystery to solve:: Why was a megalithic mile 14,400 feet?  How did it relate to King Arthur’s Palace? The answer is simple. Total the number of degrees in the 5 solids. They are listed above.  We have, 720 + 1440 +  2160 + 3600 + 6480 = 14,400. Now read the internal link below.

The high priests of the Mesolithic culture worked extensively with the 3 x 3 number squareMesolithic cultures worked with the 3 x 3 number square for ancient computing.  Roses hold a primary ancient secret. Again, read this internal link. The high priests of various cultures and countries knew its secrets. Another known entity was how this tiny number square can become infinite. Link is also below. I’m attempting to restore this lost knowledge. My insights all took place on Oquaga Lake. I was the house piano player at Scott’s Oquaga Lake House for years. I  communed with a female Indian spirit from the Lennie Lenape.  This numerical square could offer a common vision based on balance. That, in turn, could initiate another Golden Age.

Image result for picture of oquaga lake
Beautiful Oquaga Lake, former stomping ground of the Lennie Lenape Indians.

King Arthur: His Palace and the Megalithic Mile

Roses, the only flower allowed in Jerusalem

Tens: Here’s the Formula on How Tens Grow into Infinity – DSO Works

Translating Geometry into Words and Numbers

Translating Geometry to Words and Numbers

Translating Geometry to Words and Numbers. My advance scout for a number of my blogs about antiquity has been the Reverend John Michell. I was introduced to his writings in 1970.  It was The View Over Atlantis. The key is a subject that few have even heard of: “Gematria.” Hear is Wikipedia’s take on the subject. It offers some background for this blog.

Gematria /ɡəˈmtriə/ (Hebrewגמטריא‬ גימטריא‬, plural גמטראות‬ or גמטריאות‬, gematriot)[1] originated as an Assyro-Babylonian-Greek system of alphanumeric code or cipher.  Later adopted into Jewish culture.  It assigns numerical value to a word.  Names or phrases with identical numerical values  bear some relation to the number. This may apply to Nature, a person’s age, or even the calendar year.

Similar systems, many inspired by Hebrew gematria, have been used in other languages.  These include i.e. Greek isopsephy and Arabic abjad numerals.

An example of Hebrew gematria is the word chai  (life). It has two letters. They add up to 18. This has made 18 a “lucky number” among the Jewish people. Gifts of money in multiples of 18 are traditional for this reason.[2]

Translating Geometry- this book got me started on a lifetime journey
A must read book for anyone who wants to understand the curiosities of  the distant past.

Translating Geometry of the Dodecahedron

In Hebrew gematria the noun for “Israel” translates to 541. A regular pentagon has 5 vertexes of 108° each vertex. That totals 540°. The additional “1” in Israel  (541) יִשְׂרָאֵל represents the the core of Israel-  One God. Here is the process:

  • Each of the 12 tribes belong to Israel (541).
  • They each receive their own pentagon on the dodecahedron. This figure is one of the 5 Platonic solids.
  • There are the only 5 possible regular polyhedrons that can be constructed. All corners of these five must be tangent to a sphere’s surface. A sixth cannot be constructed.

Keep in mind: At one time many nations had 12 tribe cultures. Jewish tradition has kept it alive. Again, I refer to the Reverend John Michell. This time the book is the 12 Tribe Nations. Link is below. My contribution is illustrating Israel’s parallel to the dodecahedron. Also, below is my internal link of how our musical system relates to this same dodecahedron.

dodecahedron Archives – DSO Works

Twelve-Tribe Nations – Inner Traditions


TwelveTribe Nations explores the symbolism and use of the number twelve in organizing ancient societies, connecting this sacred number with the twelve …




An honest man has hardly need to count more than his ten fingers.

Ten Fingers set the Limits for Counting for the Honest

Ten Fingers set the Limits for Counting for the Honest. I reference Henry David Thoreau.  Our life is frittered away by detail. An honest man has hardly need to count more than his ten fingers. On extreme cases he may add his ten toes, and lump the rest. Simplicity, simplicity, simplicity! Henry David ThoreauWALDEN: Or, Life in the Woods.

The numbers 1 – 5 were basic in ancient measure. The ancients were even more simplistic than stated in the quote by  Thoreau. You could count the fingers on one hand to understand ancient  sacred philosophy. Here are but of examples of ancient math using the 1st five numbers.

  • Our first example uses the same total as numbers one through five squared:  Please follow the process: Total triple straight combinations on the 3 x 3 number square that total 15. This is done by three boxes in straight lines: First here is the product of the 1st five numbers:  1 x 2 x 3 x 4 x 5  = 120. On the square find 8 separate combinations of numbers totaling 15: Three are horizontal. Three are vertical. Two are diagonal:  Horizontal first: 4 + 9 + 2 = 15. Next, 3 + 5 + 7  = 15. Then, 8 + 1 + 6 = 15. Next we tally vertical combinations: 4 + 3 + 8 = 15. Next, 9 + 5 + 1 = 15. Then, 2 + 7 + 6 = 15. Diagonal combinations are:  4 + 5 + 6 = 15. Then 2+ 5 + 8 =15.  Thus, 45 + 45 + 30 = 120. Again, this is the same total as product of the numbers 1 – 5.
  • Related image

The primary unit of distance measure around the world was the megalithic mile. It was 14,400 feet. John Michell and Robin Heath amply cover this unit in their writings,

Even ten fingers are too many for anicent measure
Square numbers 1 – 5 and multiply them.  The product equals a basic measure of antiquity by number. The megalithic mile of  14,400 feet.

Again, look at the 1st five numbers.  1²  x 2² x 3² x 4² x 5² = 14,400. Of course, the basic numbers of the Pythagorean right triangle are the 3, 4, 5. . It states tthe square of the hypotenuse (the side opposite the right angle) is equal to the sum of the squares of the other two sides. Thus, 3 ² + 4² = 5².

Pythagorean theorem
The sum of the areas of the two squares on the legs (a and b) equals the area of the hypotenuse.

We Hardly Need Even Ten Fingers for Counting

Let get even more basic: 1 ² + 2² = 5. That defines the center of the 3 x 3 number square. There are  five regular polyhedrons called the Platonic Solids. If you say so what? The pattern continues:  Take numbers 2 and 3:  We see that in likewise fashion 2² + 3² = 13. On the 5 x 5 number square, 13 is the central number. Thirteen also defines the number of semi-regular solids. See the internal link below for pictures of the 7 basic number squares of antiquity.
To end this blog, I reiterate the three words by Thoreau:  Simplicity, simplicity, simplicity! Even ten fingers are too many.  Why simplicity? It can help us regain a lost Golden Age of peace and plenty.


Pyramiding Dots is a Mathematical Marvel

Pyramiding Dots is a Mathematical Marvel.

triangular number or triangle number counts objects arranged in an equilateral triangle, as in the diagram on the right. The nth triangular number is the number of dots composing a triangle with n dots on a side, and is equal to the sum of the n natural numbers from 1 to n. The sequence of triangular numbers (sequence A000217 in the OEIS), starting at the 0th triangular number, is

0, 1, 3, 6, 10, 15, 21, 28, 36, 45, 55, 66, 78, 91, 105, 120, 136, 153, 171, 190, 210, 231, 253, 276, 300, 325, 351, 378, 406, 435, 465, 496, 528, 561, 595, 630, 666…
pyramiding dots point to the 3 x 3 number square grid and the periodic chart
Pyramiding dots offers a fresh viewpoint on the periodic chart.

triple grand unity of number squares, geometry and chemistryThe periodic charted was coded longer than 10,000 years ago on a number square

The numerical sequence of the vertical rows on the periodic chart was coded longer than 10,000 years ago.  It appears in graph form on the simplest of number squares.

Now, let ‘s look at the grid lines of the 3 x 3 number square. Look at the whole line segments.  Two units are  found most easily. Just look at two consecutive sides on the perimeter on the grid. We immediately found 2 units.  Numbers 8, 18 and 32 are more difficult. They come as square roots of defined whole line segments on the grid

  • The diagonal from points “A” to “E” (where the two dark intersect to form the right angle) This diagonal equals √8 in terms of the basic grid unit.
  • Line BD (the entire diagonal of the complete square) equals √18
  • Finally triangle ABD or CBD equals √32.

The numbers of the graph of the magic square as illustrated above  and vertical rows of the periodic chart  then become the same:  2, 8, 18,  and 32.

How Pyramiding Dots is a Mathematical Marvel

Finally, regard the above number sequence of dots. Again, look at the numbers above.


  • Pyramid dots from 1 to 18. We have 153 dots.
  • Pyramid dots from 1 to 32. We have 496 dots.

Key vertical coding numbers on the periodic chart can appear when we use the pyramided form of dots aw 18 and 32.  All posts on are free. For those who have read them, 18 and 32 also are key numbers of the five Platonic solids. Three of the solids total 32 triangulated faces. The other two total 18 non-triangulated faces.

Final Point With Pyramiding Dots

Look at the totals for the 18 and 32 rows. They total 153 and 496 respectively. These are key numbers in Christianity and mystical Judaism.

  •  Miraculous catch of 153 fish fresco in the Spoleto Cathedral, Italy (second miracle). According to John 21:11
“Simon Peter climbed back into the boat and dragged the net ashore. It was full of 153 large fish, but even with so many the net was not torn”. This has become known popularly as the “153 fish” miracle. Gospel of John,[5] seven of the disciples—PeterThomasNathanael, the sons of Zebedee (James and John), and two others – decided to go fishing one evening…


In Hebrew letters and numbers share the same symbol. The total of its 5 letters in Hebrew that spell Malkuth is 496. The number 496 is one of the pyramided  totals of dots given above.

Conclusion: Somehow and sometime, perhaps with the Great Flood, an entire civilization was destroyed. Those on Noah’s Arc survived. We have struggled by our collective sweat of our brow ever since.  I believe the tiny 3 x 3 number square holds the key to a lost and prehistoric Golden Age. In reviving this “Grain of Mustard Seed” we have the tool we need to create another Golden Age of peace and plenty.

100 Inspirational Quotes That Summarize The Wisdom About Life More








Octahedron Unifies Space Time in Ancient Cultures

Octahedron Unifies Space Time in Ancient Cultures. It does so from an Earthly viewpoint. First of all, what is an octahedron? It is one of the 5 regular polyhedrons. The other 4 are the tetrahedon, icosahedron, cube and dodecahedron. However you view any one of them, it is totally symmetrical. . Together they are also called the Five Platonic Solids. How is the octahedron identified? By its number corners, edges and faces. It has the following:

  • 8 faces
  • 6 corners
  • 12 edges
  • These total 26 topological features. See the featured picture above

(dual polyhedron)

The octahedron has a non- identical twin brother (or sister). It is called a cube. They don’t look alike. But consider this. The cube has:

  • 8 corners
  • 12 edges
  •  6 faces

The twelve edges are the same in both. Whereas, the number of faces and corners trade places. They are as closely connected as twins. The octahedron pictured below contains a cube. The 6 corners of the octahedron have their points touching the center on the 6 faces of the cube.  For that reason, they are called dual polyhedrons.

File:Dual Cube-Octahedron.svg

So How is it That the Octahedron Unifies Space Time?

Unfortunately, the Egyptian Library at Alexandria was burned down. Its wisdom describing prehistory was destroyed.  Both the cube and octahedron were considered to be harmonious figures. This thought actually goes back to at least 11,000 B.C. Why harmonious? Because of the numerical relationship of its topology.

  • 12 is one-third greater than 8
  • 6 is one-third less than 8.
  • Eight is the number that defines the musical octave. That is the most harmonious and fundamental overtone of the entire overtone series. Guy Murchie thoroughly explains this in his two volumes of The Music of the Spheres.

How Does This Knowledge Date Back to Prehistoric Times?

The holiest sites of antiquity were designed as cubes or square base pyramids. The square base upright pyramid is found in the top half of the octahedron. Although the bottom half is not there, it is implied. As a cube, the Biblical Holy of Holies was set in back third of Solomon’s Temple. The total  rectangular perimeter of  the temple was 60 x 20 cubits.  The 20 x 20 cubit back  third becomes cubic. Also, the Ka-aba in Arabic literally means, cube. 

Much of the  world order of antiquity was destroyed. The cause was invaders from Afghanistan. The invaders were called Kurgans.  Riane Eisler discusses this her The Chalice and the Blade.

An award winning book by a great author

What was the purpose of these Holy Sites? – To spread harmony and peace throughout the world. This was effected by their geometric harmony. Since many were destroyed, war has ensued. In unity we find peace. In division we find war. The octahedron unifies space time. It defines space as a geometric form.  How does it define time? Each vertex of the regular triangles holds 60°. The 4 upper triangles of the octahedron have a total of 12 vertices. 12 x 60° = 720°. The lower 4 triangles total 12 vertices. They  also total 720°. The upper 4 triangles represent the 720 minutes in 12 hours of daytime at the equinox. The lower 4 triangles represent 720 minutes contained in 12 hours of nighttime also marked by the equinox.

Conclusion: Look for harmonious  models. Base civilization on  these models. Peace follows. The ancients did in through geometry. The same can also help us today.



Civilization in Atlantis had a race track for horses

Civilization and Music Have a Key Number – 660

Civilization Has a Key Number – Six Hundred and Sixty (660). It is mostly known  as the number of feet in a furlong.  In the featured picture distances for horses are usually marked by furlongs. A furlong is a measure of distance in imperial units and U.S. customary units equal to one-eighth of a mile, equivalent to 660 feet, 220 yards, 40 rods, or 10 chains. Six hundred and sixty also specifies a musical tone: Diatonic E in vibrations per second. Ancient instruments have been unearthed. We know how their tones vibrate.

In Civilization the Furlong and Farming Once Went Together With Racing Horses

Originally a furlong represented the distance that a team of oxen could plow a furrow (a long shallow trench in a field), on average, before they had to rest. This was also the length of an acre, which in Anglo-Saxon times was considered to be 40 × 4 rods (660 × 66 feet). A furlong appears to have been used as a horse racing measurement because in early days racing took place in fields next to ground that had been plowed. Therefore, the distance could be assessed quickly by comparing the racetrack with the number of furrows made in the neighboring plowed field.

Where Does Number 660 Stem From?

In its utter simplicity we find the ultimate complexity
660 lies hidden in the walls of the simplest number square- 3 x 3. This square is the mathematical crown jewel  of Neolithic cultures. 

660 appears in two prominent ways. I was shown this by an American Indian spirit around  Oquaga Lake. The poetry she spoke to me is below. When she made her introduction, our family was residing at Bluestone Farm.  It said: “If you wish to know the secrets of antiquity, erase the lines on this number square. Read them by three or two numbers  at the time. Do it as I will show you. At that time I was a full time pianist for the Scott family on Oquaga Lake

  • Horizontal totals: 49 + 61 = 110. Next, 94 + 16 =110. Second group: 35 + 75 =110. Reversed, 53 + 57 = 110. Third horizontal group: 81 + 29 =110. Reversed 18 + 92 =110. Total these 6 horizontal grouping = 660.
  • The same 660 can be reached  with the double digit vertical totals  when added in a similar manner.
Here I was enlightened concerning the 3 x 3 number square used in builiding in Neolithic times. It was a dramatic revelation given by the Oquaga Spirit.
Bluestone farm situated on Bluestone Mountain.

660 is a Prominent Feature of the 5 Platonic Solids

The hidden 660 also runs parallel to the 5 Platonic solids. The core number is “5”.   Of the solids, the tetrahedron has 4 faces. The cube has 6. An octahedron has 8 faces. The Dodecahedron has 12. The icosahedron has 20. Add them together by their squares: 4²  +  6²  +  8²  + 12²  + 20² = 660. If you studied the blogs, here is what becomes apparent: Neolithic priests knew the 3 x 3 number square as the stamping mill of the Universe.

Tetrahedron {3, 3}Cube {4, 3}Octahedron {3, 4}Dodecahedron {5, 3}Icosahedron {3, 5}
χ = 2χ = 2χ = 2χ = 2χ = 2

 Most important for musicians

Characteristic numbers where converted into set musical tones. Our A-440 comes also  from this square. Add the perimeter two numbers at the time. Overlap them: 49 + 92 + 27  + 76 + 61 +18 + 83 + 34 = 440. Treating the numbers diagonally in the same way gives you the same total again. The ratio of the musical 5th for civilization is set out by this number square:
  • 660/440 = 3/2 which is a diatonic fifth.
  • 660 and 440 were made congruent with diatonic A and E by our ancestors.

Conclusion: Making our civilization harmonious was key to the founders of culture. The musical fifth is a “perfect” interval. Let us reinfuse our culture with “harmonious peace” as referred to  by the Oquaga Spirit:

video 35 of 35

Peaceful training as per the Oquaga Spirit

Mesolithic Times Had a Unique Standard

Mesolithic Times Had a Unique Standard. Where did I come this knowledge that few know about? I was the piano player at Scotts Oquaga Lake House. An Indian spirit guide that dwells around the lake instructed me in the ways of antiquity.  I’m quite sure that those  who read this blog will not be familiar with most of what they will read. The Mesolithic era began about 8000 bce, after the end of the Pleistocene Epoch (i.e., about 2,600,000 to 11,700 years ago), and lasted until about 2700 bce. At that time (2700 bce) it has been postulated that the Great Pyramid and Stonehenge may have been constructed. These structures code the knowledge of earlier times that this blog and other blogs on will illustrate.

Related image

The five regular polyhedrons (Platonic Solids) are a geometrical construct of the 3 x 3 number square. Mesolithic cultures had knowledge of this. Our civilization today mostly does not.

The high priests of the Mesolithic culture worked extensively with the 3 x 3 number square
Mesolitic culture worked with the 3 x 3 number square. The high priests of various countries knew of its secrets.

The 3 x 3 number square holds numbers one to nine. Any straight row of three totals 15. However, it also contains a plethora of hidden number codes. If you wish to understand a few, click on-Mysteries of Music Unearthed By Tick-Tack-Toe.  I’ve blogged about its use at Teotihuacan.  Many of my blogs are about its hidden number codes. This square was the cornerstone of not only Mesolithic cultures; but even of civilizations before the great deluge described in the story of Noah.  Understanding its manner of operation  promises a path to  peace for today. Here is an excerpt for my still unpublished Staff of God, Volume 1, inspired by the Oquaga Spirit.  Its entire 424 pages are written in quatrains. The  quatrains below describe  but a small fraction of  how this number square relates to the Platonic Solids. 

Numbers one to nine are arranged in a unique way
Above is the traditional arrangement of the 3 x 3 square.  It can be arranged in other ways.
As used by the 5 regular polyhedrons (pictured above)
Nine can also be found in several ways. Here are two:

The tetrahedron is the basic unit of the five.
By vertices, its 4 triangles total 720º (4 x 180° per triangle).  Then 7 + 2 + 0 = 9.
The solid whose faces contain  the most degrees of the 5 is the dodecahedron
With 9 x 720° = 6,480°. (This is exactly 9 x the  tetrahedron’with 720° degrees).  (9 x 720 = 6480).  Its second way is,  6 + 4 + 8 + 0 = 18. Then 1 + 8 = 9.

With the remaining three solids: Cube has 2,160°. Each of its 6 squares has 360°. Thus, 6 x 360 = 2160.Then  2 + 1 + 6 + 0 = 9.
Icosahedron has 20 triangles. Every triangle has 180°. Thus, 20 x 180 = 360o. Then 3 + 6 + 0 + 0 = 9
Then there’s the octahedron with 8 triangles. 8 x 180° = 1440. Then 1 + 4 + 4 + 0 = 9.
In content and quality number 9 imbues the  regular solids.

This is my 248th blog. At this time I plan 1001. Please keep checking. They are easy to find. Just click below on :


Home of the Oquaga spirit who told me secrets that included those of Mesolithic Cultures
Oquaga Lake is shaped like the outline of a bear.
 Enjoy my free poetry reading as given to me by the Oquaga Spirit.





Different Takes on Faith

Source: Is There a Stamp that Fabricates Our Universe?

Source: Is There a Stamp that Fabricates Our Universe? Yes. The obvious answer is our Creator, God. But does our Creator go through a medium? Does He use a preferred tool? I searched for years. Like the Greeks, I looked to geometry. I became convinced it was the five regular polyhedrons. Plato discusses how they are the idealized shapes behind everything.

Our source? Is it the milky way or the Andromeda Strain?
Our source, the Universe, poses many questions? First and foremost: Where did it come from. Why is man here? Is there an overall riding plan that unifies our arts and sciences?

I tend to look for overriding patterns between dissimilar things. This is because of my piano playing. You play the same patterns of notes on the keys: Eight white keys. Then two black. Then three black over and over. Yet, the tune or music can always be different. Looking at what things have in common is called “wisdom”. This quality promotes peace. Only looking at differences promotes strife and war. I think that in the Bible, that explains why David was first a musician. That’s also why Plato, in his Republic, said music should be mandatory study for everyone until the age of 30.

So why did I think the 5 regular polyhedrons were the source? Because of a parallel I found between the number of degrees  that their polygons contained and the diameters of the Earth, Sun and Moon expressed in miles.

  • Earth: Diameter often quoted as 7,920 miles. The Octahedron has 8 triangulated faces. 180 degrees/triangle x 8 = 1440. A dodecahedron has 12 pentagons. Each angle of each of the 5 angles of one pentagon 108 degrees. Thus, their total  540 degrees per pentagon x 12 pentagons = 6480 degrees  Add the two:  1440 + 6480 = 7,920. Bingo, the Earth’s number.
  • God, working through the solids, wanted to be sure arrived at the Earth’s diameter a second way: Add the degrees of whole Platonic solids as follows: The 720 (of a tetrahedron) + 1440 (of the octahedron) + 3600 (of the icosahedron) + the 2160 ( of the cube). Total = 7920.
  • Moon: Its diameter is often given as 2160 miles. A cube has 6 squares. Each square has 360 degrees between its four corners with 90 degrees per corner.   6 squares x 360 = 2,160. Another bingo, 2160 is a commonly given diameter of the moon in miles.
  • Sun: Its diameter is often approximated as 864,000 miles. I’ve blogged about are multiplication by powers of ten are continually happening  on the 3 x 3 number square. You can only realize this after you understand its hidden number codes. Go to Then click on “all posts”.  Now, the 720 (of a tetrahedron) + 1440 (of the octahedron) + 6480 (of the doecahedron)  total 8640. When multiplied by 10 x 10 (100) you get the approximation of the Sun’s diameter in miles-864,000.

To conclude: The source is a life long search. But, it’s well worth the effort. By the way, my realizations finally came from a spirit. I call her the Oquaga Spirit. She  dwells around Oquaga Lake in Deposit, New York. I was the piano player at Scott’s Oquaga Lake House.  Her dictated book of poetry is now available on as a product. I’ve memorized the poems and am available for recitations. If you can’t afford the book, eventually I will blog about the poems.-David

Source: I thought it was the 5 Platonic Solids

Source: For years I thought the key to understanding balance was the 5 regular polyhedrons. In fact they are secondary. They are stamped out of the 3 x 3 number square.
Source: I believe that “balance” is the law: (1)The middle way. (2)Not going to extremes. These 5 regular polyhedrons are the only possible totally balanced five. A 6th cannot be built that’s regular. Yet, these 5 solids still have a source. Read my blogs about: the 3 x 3 number square.You will then know its hidden number codes. Everything will become clear.