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]]>Measurement Interchange on the Great Pyramid. The Great Pyramid uses different units of measure. British Antiquarian John Frederick Carden Michell (9 February 1933 – 24 April 2009) was an English author and esotericist who was a prominent figure in the development of the Earth mysteries movement. He discusses how the Great Pyramid was conceived by three primary measurement units: They were (1) the 12″ foot. (2) The 1.71818…foot long, shorter Egyptian cubit. (3) The 2.7272… foot long megalithic yard. In his View over Atlantis, he states that:
“The important discoveries about the past have been made not so much through the present refined techniques of treasure hunting and grave robbery, but through the intuition of those whose faith in poetry led them to scientific truth.”
I credit the Lennie Lenape NE American Indians for my discovery for my discovery the hidden engineering capabilities of the 3 x 3 number square. An Indian spirit guide accompanied me on walks around Oquaga Lake. I was the house piano player at Scott’s Oquaga Lake House over some 15 summer seasons. She instructed me on the infinite codes hidden in this number square. Read the internal link if you wish to understand the math:
Thus, we have found the functioning of the three primary units of antiquity demonstrated at the Great Pyramid through this simple number square. Speaking of Michell’s mention of poetry, I have a book of poetry called The Oquaga Spirit Speaks. Here is a sample.
Internal link- Fibonacci Number Meets Pi in a New Discovery
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]]>Clues in the Search for Atlantis Come With Numbers 5 and 6. The story of Atlantis comes to us from Timaeus. This is a Socratic dialogue, written in about 360 B.C. by Plato. Five and six are featured as follows: People were gathered every 5th and 6th years alternately: Thus giving equal honor to odd and even numbers. This gathering of the population was for judgement and atonement. Israel also has atonement, but once a year set on Yom Kippur.
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]]>Pi is approximately equal to 3.14159. It has been represented by the Greek letter “π” since the mid-18th century. It is also referred to as Archimedes’ constant. Being an irrational number, π cannot be expressed as a common fraction. Adepts have succeeded in memorizing the value of π to over 70,000 digits.
mathematical constant π |
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3.1415926535897932384626433… |
Next, what is the Fibonacci number series?
In mathematics, the Fibonacci numbers, commonly denoted F_{n}, form a sequence. Each number is the sum of the two preceding. Ratios stay the same even if you square the numbers in the series:
So what are the numbers up to pi’s relative, 987? This particular number is the sixteenth Fibonacci number. See chart below. Nine hundred and eighty seven- appears is as appears below:^{[2]}
F_{0} | F_{1} | F_{2} | F_{3} | F_{4} | F_{5} | F_{6} | F_{7} | F_{8} | F_{9} | F_{10} | F_{11} | F_{12} | F_{13} | F_{14} | F_{15} | F_{16} | F_{17} | F_{18} | F_{19} | F_{20} |
0 | 1 | 1 | 2 | 3 | 5 | 8 | 13 | 21 | 34 | 55 | 89 | 144 | 233 | 377 | 610 | 987 | 1597 | 2584 | 4181 | 6765 |
Simply take the square root of this number.√987 = 31.41655614…which is close to 10 x pi within in 1/1,000th of a point. 3.14159…
The question now becomes did any ancient civilization make use of 10 circles? Affirmative, the Hebraic. The Tree of life prominently features 10 circles as pictured below:
I believe this knowledge was once known in Atlantis. Esoteric wisdom then came from Atlantis through Egypt to the Hebrew nation. Incidentally 21 x 21, pictured above, = 441. In Hebrew, by gematria, the word for truth equals 441. (The Rabbis pointed out that the Hebrew word for truth – אֶמֶת (eh-MEHT) – begins with the first letter of the Hebrew alphabet, א, continues with one of the two middle letters, מ, and ends with the last letter, ת). In this regard, note the concept of balance which was a key in antiquity. Finally, we can look at a successive number with 987. We have the 10 circle equivalency by diameter from the square root of 987. We thus use 10. 9 ,8, and 7 for this mathematical material.
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]]>In geometry, any of the above Platonic solids, the polyhedron is associated with a second dual figure. In duality the number of vertices of one solid correspond to the number of faces faces of its dual figure. Only edges on both dual figures the same .^{[1]} As described in the picture above: The 8 vertices of the cube become the 8 faces of the octahedron. The cube and octahedron both retain 12 edges. Duality proves beyond doubt that numbers remain constant even if the shape of the geometrical figure changes.
Because numbers between dual figures are constant while the figures themselves are not, numbers are more real and permanent than figures of solid geometry.
Pythagoras’ most important belief was that the physical world was mathematical and that numbers were the real reality.^{[2] }
Certainly, if one takes into account duality, at its deepest level, reality is mathematical in nature, rather than geometrical. Numbers become the constant. Solids can appear and turn into their dual figure. Have fun discussing this point with your friends!
Internal link: Dozen Appears on the Ancient 3 x 3 Number Grid
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]]>In geometry, an icosahedron (/ˌaɪkɒsəˈhiːdrən, –kə-, –koʊ-/ or /aɪˌkɒsəˈhiːdrən/^{[1]}) is a polyhedron with 20 faces. The name comes from Ancient Greek εἴκοσι (eíkosi), meaning ‘twenty’, and ἕδρα (hédra), meaning ‘seat’. The plural can be either “icosahedra” (/-drə/) or “icosahedrons”.
There are infinitely many non-similar shapes of icosahedra, some of them being more symmetrical than others. The best known is the (convex, non-stellated) regular icosahedron—one of the Platonic solids—whose faces are 20 equilateral triangles.
Nine Basic Numbers Were Once Used With No Zeroes. This is a fun internal link.
For this post the numerical similarity between the featured triangle and the icosahedron become apparent by the following operations:
In the realm of speculation, author Zecharia Sitchin asserted that Sumerian mythology suggests that this hypothetical planet of Nibiru is in an elongated, 3,600-year-long elliptical orbit around the sun. This number is in keeping with the 3600 theme of the post. I am not trying to say he his right or wrong, just to point out the speculative post.
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]]>Fibonacci (c. 1170–1250) introduced the decimal system to Europe using the term zephyrum. This became zefiro in Italian. It Venice it was contracted to zero.
Number squares (a.k.a. magic squares) were the guiding light of the ancients. Our feature picture shows the prime number square. Seven were used. Each was a assigned to a different celestial body. They ranged in size from 3 x 3 to 9 x 9. One squared and two squared merely define the centers of these squares. Ten was synthetic as it fused any two opposite numbers on this square.
What is so significant about these magic squares? They teach the lesson of balance; each square balances in several ways. For example on the 3 x 3 any two opposite numbers equal ten. Any straight row of three numbers total 15. If something was wrong with the world, you might say it was out of balance.
The simplest and basic polygon was the tetrahedron. With four triangles, at 180° per triangle, it totaled 720°. The most complex was the dodecahedron. It had 12 pentagons around its core. It had the most angular degrees with 6480°. Divide the most complex figure by degree number by the simplest: 6480 ÷ 720 = 9. I explain how the 3 x 3 magic square stamps out the five solids in another post. For that reason ancients used 9 basic numbers.
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]]>Most likely, at this point you are asking: How can they be alternate? They are a thousand numbers apart. After all, 2080 – 1080 = 1000!
John Michell, goes into the subject of these numbers in great detail. Actually, 1080 started me on a 32 year quest. John Frederick Carden Michell was an English author and esotericist, He was a prominent in the Earth mysteries movement. Over his life he published over forty books.
What is it that these two numbers refer to? Another, simpler number, being #8. Number “ten eighty” evokes the octagon. In our featured pictures the octagon has eight angles an 135°/each angle. Doing the math, 8 x 135° = 1080°.
How do we get 2080 out of this number square? Simply total all the numbers that it contains. The above picture is of the 8 x 8 magic square (also called a number square). Numbers are arranged so that any opposite two total 65. Even though 1080 and 2080 are a thousand numbers apart, both of their essences invoke number eight according to the ancients. One number, being 1080, conjures up geometry in the shape of an octagon. The other, being 2080, invokes a number square. Incidentally, this number square (or magic square) was supposed to invoke the influence of Mercury.
Here’s a mathematical shortcut to find 2080: Any two opposite numbers total 65. It has 32 pairs of opposite numbers; therefore 32 x 65 =2080. Just how significant is this 8 x 8 grid? The greatest surviving man made wonder of the world is the Great Pyramid of Egypt. It is set on a grid that is 8 great cubits by 8 great cubits.
Here is an internal link on reviving antiquity.com: Pythagorean Triangle Numbers 3,4,5,
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Development by progression is a theme of the Tree of Life. Number one is the most abstract, while ten in the most concrete, Kether is the crownly name as it holds the “1 position: Top number one is its placement on the picture on the tree. It’s connected by paths (tube like lines) to other emanations (circles), but like the king, stands apart.
In the Hebraic language, letters doubled as numbers. They actually shared the same symbol. Take the numbers of each of its three letters.
The sum of these three letters becomes 620. We our post we will take it as 62: Zero, “0”, was not considered a real number. It was synthetic and had to exist with another, such as 10.
First of all, the dodecahedron was though of as the shape of the Universe. It has the parallel function of the entire containing all of Creation as the crownly top. This figure was thought to contain the Universe. (The Dodecahedron). Its 3 features add up to 62: 20 + 30 + 12 = 62.
Conclusion: 62 features parallel crownly 62(0).
Utilizing Number Squares by the Cosmic Tree
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]]>The most obvious ways number squares interaction is in the numerical pattern of the periodic chart. Look at the featured picture. This is explained below.It explains how the patterning of the chart is found in the prime 3 x 3 grid.
Periodic Chart Coding A New but Ancient View
Another point, in the realm of chemistry, the featured picture shows the periodic chart’s numerical patterning. This is found on the diagonal of the oddly number squares. Note how the darkened boxes show this sequence duplicate the sequence: 2,8,18 and 32.
In mathematics, the Fibonacci numbers are the numbers in the following integer sequence, called the Fibonacci sequence, and characterized by the fact that every number after the first two is the sum of the two preceding ones:^{[1]}^{[2]}}
Conclusion: Interactions are quite varied and complex. A lost civilization knew about this. Most of us today still do not. Keep checking, more is upcoming.
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