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Sacred Geometry

Nearly every ancient archaeological site predating recorded history,
from the Pyramids of Egypt and Mexico, to Stonehenge and beyond,
employs mysterious mathematical alignments throughout their design.

These archetectural formulas, rarely used today, are considered sacred
and have also been found in the way they're arranged relation to each other
and, most inexplicably, in the Monuments of Cydonia, and the Face on Mars.

Following text and images from: Mid-Atlantic Geomancy


The Five Basic Sacred Geometrical Ratios

When one looks at sacred enclosures globally, there is a group of five mathematical ratios that are found all over the world from Japan's pagodas to Mayan temples in the Yucatan, and from Stonehenge to the Great Pyramid. These ratios are:

  • Square Root of Two - 1.414...
  • Square Root of Three - 1.732...
  • Square Root of Five - 2.236...
  • Phi - 1.618... :
    Phi is the Golden Section of the Greeks.
    It was said to be the first section in which the One became many.
  • Pi - 3.1416... : 1
    Pi is found in any circle.
    If the diameter is 1, the circumference is 3.1416 (C = D).

These are all irrational numbers. I have seen pi taken to 1500 decimal places with no discernable pattern to it (is that Chaos?). Let's take a closer look at each of these special numbers, and see how we can find them in the sacred geometry used by geomancers around the world. All five of these numbers gain their meaning only when beaten against the One. They are all ratios of x:1. The One is where it begins.


Pi - 3.1416 : 1 - the Circle
Circle and Pi
The Circle:
Radius (CD) = 1
Diameter (AB) = 2
Circumference =
pi (3.1416) x Diameter
Pi (3.1416 : 1) is found in any circle. In sacred geometry, the circle represents the spiritual realms. A circle, because of that transcendental number pi, cannot be described with the same degree of accuracy as the physical square. The circle is yin.

It is a good shape to do all kinds of spiritual activities in. It is good for groups to work in circles. There are many examples of sacred spaces that are circular.

Ring of Brodgar, Mainland Orkney. Most stone rings in the British isles are not actually circular. Dr Alexander Thom proved this with his pioneering work in the sixties. Some of the true circles are Merry Maidens in Cornwall, Stonehenge and the Ring of Brodgar.
Ring of Brodgar - Mainland Orkney


Square Root of Two - 1.414 : 1 - the Square
 The Square and The Square Root of Two, 1.414
The Square Side (AB) = 1
Diagonal (AC) = Square Root of Two, 1.414
In sacred geometry, the square represents the physical world. It can be defined totally. If its side is one, its perimeter is exactly four, and its area is one square - exactly. The Square is yang.
The square was found was in the Holy of Holies (the back room) of Solomon's Temple (G,H,F,E). This was where the Hebrews kept the Ark of the Covenant and other most sacred treasures. (The dimensions here are taken from the first part of the Ezekiel Chapter 41.)
 The Double Square and Solomon's Temple
The Square Side (AB) = 1
Diagonal (AC) = Square Root of Two, 1.414
 The Square and The Square Root of Two, 1.414
On top of Glastonbury Tor sits an impressive stone tower. The Tor and its tower dominate the Somerset Levels. This is a view taken from inside the tower looking upward.

Square Root of Three - 1.732 : 1 - Vesica Pisces

The Vesica Pisces is created by two identical intersecting circles, the circumference of one intersecting the center of the other. The vulva-shaped space thus created is called the Vesica Pisces.

 The Square Root of Three and the Vesica Pisces
The Vesica Pisces:
Two Circles share a common radius(AB).
Radius AB = 1
The intersecting circles create a Vesica Pisces.
The minor axis of this Vesica Pisces (AB) = 1,
The major axis (CD) = the square root of three, 1.732

CB = AB =1 ..... Therefore:
a� + b�=c�
.5� + x� =1�
x� = .75
2 =.75
x =.8660 = CE
CE is 1/2 of the major axis CD
2 CE =CD
.8660 * 2 =CD
CD =1.7320 = 3

This is the lid of the Chalice Well designed by Bligh Bond in the early part of this century. It covers one of the most powerful Holy Wells in Britain. The Chalice Well has numerous examples of vesicas.

The top half of the Vesica Pisces is the Gothic Arch - see Chartres Cathedral. It is the sacred geometric shape of the Piscean Age.

Gothic arch on the tower on the Glastonbury Tor. This site was a hermitage and retreat for early Christian monks

Gothic arch in Gallilee of Glastonbury Abbey. Note circular Romanesque arches behind in the Mary Chapel.


Square Root of Five - 2.236 : 1 - the Double Square

The Double Square is found in some of the best known sacred spaces in the world, from the King's Chamber in the Great Pyramid and Solomon's Temple in the Bible to the interior of Calendar II, an important underground stone chamber in Vermont, USA.

The diagonal of a double square is to the shorter side as the square root of five is to one.

The square root of five = .618 + 1 + .618.

The Double Square:
Short Side = 1
Longer Side = 2
Diagonal = Square Root of Five, 2.236

 The Double Square and Solomon's Temple
(ABCD) Double Square in Solomons Temple
Solomons temple provides numerous examples of sacred geometry. The holy place (EFCD) is the place where good Jews who had been properly cleansed could go. This space measures twenty cubits by forty cubits.

Another place where a double square is found is the Calendar II
underground chamber site in central Vermont in the USA.
It measures ten feet by twenty feet.
 Calendar II - Vermont - exterior

Calendar II, a drystone walled underground
stone chamber in central Vermont, USA.

 Calendar II - Vermont - interior

The interior of the chamber is 20 feet long
by 10 feet wide , or 2 to 1. The chamber is
oriented towards the Winter Solstice Sunrise.


Phi - 1.618:1 - � - the Phi Rectangle

 The Golden Section, Phi, 1.618 : 1

The Golden Section, Phi, 1.618:
The shorter section on the right = 3
The longer section = 5

The shorter is to the longer
as the longer is to the whole
3:5 : : 5:8

In the Beginning was the One. In order to observe itself, it cut part of itself away to make 'Other'. This Golden Section is in beautiful proportion. As the subdividing continued away from the One, they continued in this phi ratio. This can be used to go back to the One as well. It is in this sense that three is farther away from the One than two is.

Have you ever noticed that it is easier mathematically to go away from One than to go towards it? In other words, it is easier to add and multiply than it is to subtract and divide.

3:5 : : 5:8. This ratio indicates that it is part of this series: 1 . 2 . 3 . 5 . 8 . 13 . 21 . 34 . 55 . 89, and so on. This is called the Fibonacci Series. Start anywhere in the series, add the number below, and you get the next number (for example, 21 + 13 = 34). As one ascends up the series, any number in the series, when divided into the next one up, gets closer and closer to (but never hits exactly) 1.618, phi, the Golden Section.

 Square ABCD = 1x1 On a line create square
(ABCD) where AB = 1
 Double Square - with Diagonal ED Divide lines (AD) and (BC) in half
at (F) and (E). (BC) = 1, (EC) = .5.

Double square (ECDF) is thus
created with a diameter of (ED).

 Arc from D Creates Phi Rectangle ABGH Using (ED) as a radius
swing arc from (D) downwards to 0
intersect the initial base line at (G).

Extend line (AFD), and create a
perpendicular to line (BECG) at (G)
so that it intersects line (AFD) at (H),
thus creating phi rectangle (ABGH).

The formula that shows this is:

 The Phi Formula
Phi = ( 1 + square root of 5 ) divided by 2

(BE) = 1/2
(ED) = 5/2
.5 + 1.118 = 1.618

 The Golden Section, Phi, 1.618 : 1 Extend arc (DG) through (A) to (I).
Note the clear relationship between
phi and the square root of five.

Solomon's Temple also contains phi. The Vestibule (DCBA) measures twelve cubits by twenty cubits. 12 to 20 can be reduced to 6 to 10 and further to 3 to 5. Three and five are two numbers in the fibonacci series. 3/5 = 1.6, a close approximation to 1.618, or phi.
 The Double Square and Solomon's Temple

 Calendar I Measurement
Calendar I was measured very carefully by the NEARA/ASD Earth Mysteries Group in the early 80's. Three measurements of the length were taken and averaged. The same was done with the width. Upon dividing the length by the width, the resultant ratio was 1.619 to 1. Phi (�) = 1.618 to 1.

The Parthenon is the Queen of Greek Temples, and personifies their interest in Sacred Geometry. If the height of the Parthenon is 1, its width is phi (�) 1.618, and its length is 5, 2.236. And 1.618 + .618 = 2.236.

These are the 5 sacred geometrical ratios - Pi (2),(3),(5) and Phi. They are found in sacred spaces all over the world. Remember, sacred geometry is basically simple. You must do it with your hands, if you want to really gnow sacred geometry.

 The Parthenon


Squaring the Circle - The Great Pyramid

 The Sphinx
The Great Pyramid of Egypt
(Sphinx in foreground)
The square represents the physical. The circle represents the spiritual. All sacred geometers have attempted the impossible: to square the circle (create a square who's perimeter is equal to the circumference of a circle.) Here is the first of two valiant attempts:

This squaring of the circle works with a right triangle that represents the apothem(ZY) (a line drawn from the base of the center of one of the sides to top of the pyramid), down to the center of the base (ZE), and out to the point where the apothem touches the Earth (EY).

 pyramid see-thru Now let's look at this in 2D,
from directly above.

For the purpose of this exercise,
the side (AB) of the base equals 2.

 Squaring the Circle - Pyramid Base (ABCD) is the base of the Great Pyramid.
This is lettered similarly to the wire frame version (above).

For the purpose of this exercise,
the side (AB) of the base equals 2.

 Squaring the Circle - Pyramid Base - 1 Construct square (i JKD),
thus creating double square (JKE f).
 Squaring the Circle - Pyramid Base - 2 Create diagonal (EK)
which intersects (i D) at (l).

iD = 1,
therefore the diameter
of the circle is also 1.
(EK) = (5) = .618 + 1 + .618.

 Squaring the Circle - Pyramid Base - 3
Put the point of your compass at (E) and extend it along the diagonal (EK) to point (m) where the circle intersects (EK), and draw the arc downward to intersect (KD f C) at (n).

If (EK) = (5), and (l m/l D and l i = .5, the diameter of this circle is 1. This makes (E m) = .618 + 1, or 1.618.

(E m) is the apothem.

 Squaring the Circle - Pyramid Base - 4
Draw (E n) which intersects (A i l D ) at (o).

Put compass point at (f) and extend it to (n). Again put your point at (E) and draw the circle which happens to have the radius (E o).

(f n) is the height of the Great Pyramid.

This circle comes remarkably close to having the same circumference as the perimeter of the base (ABCD).

Let's go back to the original right triangle (EYZ)

(EY) = .5

(YZ) = phi

(EZ) = (phi)

 Squaring the Circle - Pyramid Base - Phi

EY = .5, The apothem is phi/1.618. This makes the 51 degree + degree angle.

Using a� + b� = c�, this makes the height the square root of phi.


Squaring the Circle - The Earth & the Moon

 Squaring the Circle - Earth and Moon - 1 Create a square (ABCD) with (AB) = 11.
Create diagonals (AC) and (BD) crossing at center point (E).
Construct a circle which is tangent to square (ABCD) at f
 Squaring the Circle - Earth and Moon - 2 Construct two 3 . 4 . 5 right triangles, with the 4 . 5 angles at (A) and (D).
Connect the 5 . 3 angles creating square (abcd) with side (ab) = 3.
{4 + 3 + 4 = 11, or side (AD) of square (ABCD)}.
Create diagonals (ac) and (bd) centering at (e).
Create a circle that is tangent to square (abcd) at four places.
 Squaring the Circle - Earth and Moon - 3
Draw line (Ee) which intersects side (AD) at (F).
(EF) = the radius of the larger circle and (eF) = the radius of the smaller circle.

The larger circle thus created is to the smaller circle as the moon is to the Earth!

With your compass point at (E), create a circle with radius (Ee).
This creates a circle whose circumference is equal to the perimeter of square (ABCD)!

The Math

(AB) = 11
(EF) = 1/2 of (AB) = 5.5

(ab) = 3
(eF) = 1.5

Therefore

5.5 + 1.5 = 7.

The circumference of a circle is equal to two times the radius (the diameter) times pi (3.1416).

C= 14 x 3.1416
C= 43.9824

In Square (ABCD), (AB) = 11
The perimeter of a square is four times one side.
11 x 4 = 44

Very Close,what?

According to the Cambridge Encyclopedia, the equator radius of the Earth is 3963 miles. The equator radius of the Moon is 1080.

The claim is that the smaller circle (in square abcd) is to the larger circle (in square ABCD) as the Moon is to the Earth.

(EF) = 5.5
(F e) = 1.5
5.5 : 1.5 :: 3963 : 1080
5.5 / 1.5 = 3.66666
3963 / 1080 = 3.6694 - (if it had been 3960, it would have been exact!)

Sacred Geometry

Geomancers are interested in sacred geometry because this is the study of the way that spirit integrates into matter - by echoing and amplifying the geometry of nature and planetary movements, we help to align the resonance of body/mind/spirit with the harmonic frequencies of the above and the below.

Geomancers are interested in sacred geometry because it has been found that certain spaces, with particular ratios, enable the participant to resonate or vibrate at the appropriate rate that maximizes the possibility of connection to the One.

A violin ain't built out of a cigar box! It is built with the proper wood with the proper shape and ratios, so that it resonates correctly for the notes/frequencies it is expected to produce. These same principles are applied to sacred spaces to maximize the possibility that whatever is being done there on spiritual levels will succeed.




Definition

Two Dimensions
I've been a student of sacred geometry for over twenty-five years. While there has been recent interest in three-dimensional sacred geometry based on the Platonic Solids and in sacred sites themselves, most sacred geometrical documents I've read talk in only two dimensions - height and width.

Obviously there is a fourth dimension and others beyond it that are much more complex and sophisticated. But why does the record left to us from geomancers of the past come primarily in two dimensions? Don't just tell me about paper being only two-dimensional! ;-)

Two is closer to the One than three is. It's less complex. I think one of the biggest mistakes Western geomancers have made was to take something that is very simple and make it much more complex. The Chartres Labyrinth strikes me as being an example of this. This stuff is simple. If you really gnow (that is, know both rationally and intuitively) a handful of irrational ratios - pi (), phi (�) and the square roots of two, three and five, you've basically got it all.

Three-dimensional sacred geometry just builds on this basic handful.

Numbers
One aspect of Sacred Geometry is that it works with irrational numbers. To go to the spiritual, one must go beyond the rational, and it appears that some of these ratios and numbers can lead us there. By being inside a sacred space that has been constructed using one of a handful of these sacred geometrical ratios, the resonance that has been set up can enhance the possibility of your making the spiritual connection you want to make.

So, what are these irrational numbers? (Thanks to Forrest Cahoon for his help with the following mathematical definitions.) Let's begin with the rational.

Rational Numbers
A rational number is a number which can be expressed as the ratio of two integers (whole numbers), such as 1/3 or 37/22. All numbers which, when represented in decimal notation, either stop after a finite number of digits or fall into a repeating pattern, are rational numbers.

Irrational Numbers
An irrational number is one that cannot be represented as a ratio of any two whole-number integers, and consequently it does not fall into a repeating pattern of any sort when written in decimal notation.

All of the Sacred Geometry ratios we will be working with, the square roots of two (1.414), three (1.732) and five (2.238), phi (1.618) and pi (3.1416), are all irrational numbers.

Transcendental Numbers
There are certain kinds of irrational numbers that are called transcendental numbers. Just like irrational numbers, they are defined by what they are not (they aren't rational numbers), yet transcendental numbers are so identified because they are not another sort of number, known as an algebraic number.

Any number which is a solution to a polynomial equation is an algebraic number. A polynomial equation is a sum of one or more terms involving the same variable raised to various powers, for example:

7 (x5) + 5 (x3) + x = 137
Any x for which any such equation is true is an algebraic number. Because the square root of two is a solution to the polynomial equation
x2 = 2
it is an algebraic number.

A transcendental number requires an infinite number of terms to be defined exactly. That's one way of thinking of God/dess. There are special equations to derive transcendental numbers where the terms get smaller and smaller as you go along, so you can keep adding them together to reach any level of accuracy you need, but the true number cannot be reached exactly. That is the beauty of transcendental numbers!

Pi (3.1416...) is such a transcendental number. It is the only one we will be using here with Sacred Geometry. One infinite equation which relates to the value of pi is this:

Pi / 4 = 1 - (1/3) + (1/5) - (1/7) + (1/9) - (1/11) + (1/13) - (1/15) + ...and so on into infinity.

One final point
there is just one trick
When working with Sacred Geometry:

K I S S

You Got It!

KEEP IT SIMPLE STUPID!
{Really.}



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