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CHAPTER
03: HARMONIC PYRAMIDS ON EARTH AND ABROAD
SACRED GEOMETRY
Now that we have given an
overview of the entire aether model in
this series, and covered some of the basics
in terms of how life behaves in the earlier
densities, we shall explore some of the
physical properties of these
densities, and their esoteric connections.
It is important to again remember that
these densities are formed by a fluidlike,
non-physical energy source. The hard proof
for the existence of a fluidlike ‘aether’
is extensive, and will be covered in greater
detail in volumes II and III.
First of all, from sources
including Ra, we know that the Universe
is One. This One is unilaterally referred
to as Pure White Light. It is also referred
to as the "seed sound" of the
Universe, or the AUM. We are then told
that things got rather stale as The One,
since nothing really ever changed in this
Unity. So, The One decided to create new
life from itself. In order to do this,
The One vibrated itself into the "octave."
The Pure White Light became a series of
seven colors - red, orange, yellow, green,
blue, indigo, violet. The visible color
spectrum embodies the memory of this.
The One Seed Sound broke up into a series
of pure tones - do, re, mi, fa, sol, la,
ti. The immutable structure of the Octave,
those notes which are the purest mathematical
ratios and also sound the best to our
ears, holds the memory of this. (They
can be seen and heard with the white keys
on the piano.) Another word for vibration
is “harmonics,” and we will
frequently use that word to describe these
systems.
We need to remember that
this Pure Light and Pure Sound are simply
two different ways of describing the same
vibrations of the fluidlike “intelligent
energy” of the One. There is no
real difference between them, as they
are both functions of vibration. Sound
is a vibration of air molecules, and light
is ultimately a vibration of the fluidlike
aether. We will see in Volume II how Dale
Pond has demonstrated that if you multiply
the pure sound frequencies many times
over, you get the visible color frequencies,
thus showing the equivalence between the
two.
[Most scientists agree that
light behaves like a wave, but they also
try to assert that there is no medium
that the wave is traveling through
– that the wave is simply a particle-like
entity known as a “photon”
traveling through an empty ‘vacuum.’
This is a preposterous notion, as all
natural examples of waves have something
that they are ‘waving’ through.
The basic definition of a wave is “an
impulse that travels through a medium,”
and in reality light is no different.]
The third key “harmonic”
component that we need to have in place
after light and sound is geometry, which
is the visible result of vibration. The
first and most important geometry that
we must start with is the sphere, which
the ancient traditions see as the highest
geometry in the Universe, the pure essence
of the One. In our physics model, the
Universe is ultimately spherical in shape,
as its energy fields expanded at a uniform
rate in all directions as it was formed.
[All of our visible galaxies in the Universe
have coalesced into one single “flat”
super-galaxy, however, but the spherical
energy fields are still present around
this super-galaxy, just not as visible.
This will be discussed in Volume III.]
A sphere can be compressed into a single
point, which has no space and no time,
and thus exist as the simplest object
in the Universe, but the sphere also is
the most complex form in the Universe,
containing all other things within itself.
Although this might not seem to make sense
at first, it is actually quite simple
to explain when we start out with a “flat”
two-dimensional demonstration, as the
ancient students of sacred geometry would
learn.
We start by drawing a circle
with a compass. Any spot on a circle could
be defined as a point, and you could then
take a straightedge and draw a line to
any other possible spot on the circle.
There are literally an infinite number
of different lines, angles and shapes
that could be drawn within the circle.
Mathematically speaking, no other geometric
shape can form as many different geometries
inside of itself as a circle can, and
thus it is the most complex two-dimensional
shape there is. At the same time, its
pure, harmonic structure makes it the
simplest possible two-dimensional shape
in the Universe. It is the only shape
where there is only one edge, no straight
lines, and a curve that is completely
unified for a full 360 degrees around
a single center point. It resolves to
One, and thus it is the simplest possible
two-dimensional shape.
When we expand this into
three dimensions, we can then see that
the similar principle applies to the sphere.
Confusingly, physicist Buckminster Fuller
described a sphere as "a multiplicity
of discrete events, approximately equidistant
in all directions from a nuclear center."
Events, you say? To put this in drastically
simpler language, in a sphere you can
draw an infinite number of lines that
connect to an infinite number of points
(i.e. “events”) on
the surface of the sphere, with all the
lines starting from one single center
point or nucleus, and all the lines will
come out to be the exact same length.
This makes the sphere the most complex
three-dimensional object that there is;
an infinite number of different geometric
shapes can be drawn inside of it, by simply
connecting different points on the surface
of the sphere together. Once you stretch
or flatten the sphere in any way, you
have less symmetry and thus have less
flexibility in what can be geometrically
created inside. (This may seem hard to
understand, but it can be proven mathematically.
This also explains why liquid naturally
forms into spheres when it is in free-fall
and/or in a soap bubble, as the air pressure
on the liquid is equal on all sides.)
The sphere is also the simplest three-dimensional
formation in the Universe for the same
reasons as the circle; namely, there is
only one edge, perfectly symmetrical in
its curvature around a center point, and
thus all resolves to One. For comparison,
a cube would have six sides or edges,
and this is one of the simplest three-dimensional
shapes that there is. The sphere has only
one ‘side’.
Interestingly, the work
of Dr. Hans Jenny (pronounced “Yenny”)
has shown that when a spherical area of
fluid is vibrated at pure “Diatonic”
sound frequencies, i.e. the basic vibrations
of the Octave, then geometric forms emerge
inside the fluid. Tiny particles that
Jenny put in the fluid known as ‘colloids’
would assemble into basic geometric forms
during the experiment, leaving clear water
in between – where normally the
particles would be suspended all throughout
the water equally. If Dr. Jenny turned
up the sound frequency to a higher level,
then more complex geometric structures
would appear, and when he turned it back
down to the original level, the exact
same geometry that he started with would
be seen once again in the same way. This
is quite a dramatic demonstration when
seen on Dr. Jenny’s “Cymatics”
video, which is accessible from various
sources – yet such research has
been remarkably undervalued and / or ignored
by the scientific community.
Thus, geometry is a very
basic characteristic of vibration –
or as Pythagoras once said, “Geometry
is frozen music.” The five most
important three-dimensional geometries
are collectively known as the Platonic
solids, since the Greek philosopher Plato
first wrote them about in modern times.
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Figure 3.1 – The
five Platonic Solids.
As one note, the Star Tetrahedron
is more technically known as an interlaced
tetrahedron. You can also examine the
tetrahedron by itself, which is simply
a four-sided pyramid with equilateral
triangles on each face, but in terms of
the workings of energy as vibration, it
appears that most tetrahedral structures
have two tetrahedrons stuck inside of
each other as we see above.
There is clear evidence
that any scientific effort which moves
towards a discovery of the importance
of these geometries in the Universe is
being actively suppressed, as those in
the secret brotherhoods still have a high
degree of power and feel bound to “ever
conceal and never reveal” the “secrets
of the Order.” Many of these group
members have deliberately arisen to power
in various scientific institutions, and
are thus positioned to deflect certain
types of research, especially those related
to free energy / anti-gravity, as we shall
discuss in Volume II. Richard Hoagland
and the Enterprise Mission, working with
Lt. Col. Tom Bearden, have shown how such
suppression efforts trace back to the
19th century, at least. The great 19th
century pioneer who analyzed the behavior
of the electromagnetic (EM) wave was Sir
James Clerk Maxwell. His equations, known
as “quaternions,” were used
to map out the full, hidden internal structures
of the EM wave in full 3-D view, with
over 200 equations altogether. When you
analyze all 200+ quaternions as a group,
you see the geometry of a tetrahedron
inside a sphere. This is the hidden secret
of the electromagnetic wave, the underlying
structure that determines its behavior
as it moves along – and Oliver Heaviside
and others, who reduced Maxwell’s
equations to four basic quaternions and
declared the hidden geometry to be “occult
nonsense”, vigorously removed it
from all academic debate. Had this not
been done, we may have “solved the
puzzle” far earlier along.
There is no direct way to
prove that those from the secret groups
inspired this political move on Maxwell’s
work, but it is exactly what we would
expect based on their own system of beliefs
that they are sworn to uphold on pain
of death. An even more obvious example
was the demonizing of the “aether”
concept through using the results of the
Michelson-Morley experiment as “proof.”
19th century mystic Madame Blavatsky predicted
that the aether would be removed from
discussion, and that “the pillars
of science would come down along with
it.” We will discuss this more fully
in volumes II and III. Even now, the anti-aether
bias is so strong that you will be almost
immediately dismissed if you try to bring
it up in a scientific discussion –
but we are not concerned, as time and
proof will heal this wound.
Once we do accept the existence
of a fluidlike aether at various levels
of density, where each density has a different
quality of vibration, then we realize
that certain clear geometric forms will
emerge at the various “pure”
frequencies. Indeed, geometry is the single
most important aspect of the aether’s
behavior in terms of being able to construct
stable structures, such as crystals. Without
the geometry, matter would not be possible,
as geometry is what allows the “field
bubbles” of the aether to clump
together in precise, organized patterns,
forming specific molecules. Otherwise,
the best we could hope for is that the
spheres would line up pole-to-pole, and
otherwise be free flowing around each
other – and this behavior would
not be complex enough to build matter.
The tips of the geometries have more strength
to attract each other than the other areas
on the surface of the sphere, as we shall
discuss below, and this allows the spheres
to organize into non-random “matrix”
patterns.
Though we cannot directly
see these geometries most of the time,
except in crystal structures, microclusters
and quasi-crystals (volume III), they
create distinct “stresses”
or pressure zones in the aether that can
exert enormous forces on their environment.
Think about the force that is contained
in a whirlpool and you’ll see how
a fluid can have areas of stronger and
weaker force inside of it. These geometric
forms therefore possess both qualities
of a fluid, as they are forming in a fluid
medium, as well as a crystal, as they
are clearly geometric – hence Dr.
Harold Aspden refers to them as “fluid
crystals.” By the end of Volume
III, we will have constructed a complete
physics model to demonstrate how these
formations are hidden within all physics,
whether quantum, biological or cosmological.
If you think the science of chemistry
and quantum physics is complete as it
is, you will be very surprised to find
out how many problems there are with the
current models – and that the design
we present here solves every one of these
problems. In this book we will cover some
of the basics of how this geometric patterning
works, including the “Global Grid”
of energy lines on the Earth, which directly
shape the continents.
The most important quality
of the Platonic Solids is that each shape
fits perfectly into a sphere, such that
all its outer points precisely merge with
the outside surface of the sphere. Each
of the straight lines that make up these
objects will be the same length, and all
geometric points on the sphere’s
surface are equidistant from their neighbors
– which is exactly what we would
expect with the science of vibration.
Plato and other Greek philosophers also
pointed out that all the angle measurements
in these geometric solids are the same,
and that each side of the three-dimensional
objects have to be the same shape. Although
this may seem confusing at first, it actually
works out very nicely. There are only
five major shapes to contend with when
we look at this information. Those five
shapes are the octahedron, star tetrahedron,
cube (hexahedron), dodecahedron and icosahedron.
In order to understand why
such geometric objects form inside a vibrating
sphere of fluidlike energy, we have to
know a little about wave movement. If
we have a simple two-dimensional wave,
such as a vibrating guitar string, then
there are three basic components that
will stay the same if the wave is not
disturbed. These three basic components
are the wavelength, the frequency and
the amplitude. The wavelength is how long
each part of the wave is, i.e. “the
observed distance between two adjacent
wave crests,” (measured as a length
quantity in angstroms when dealing with
visible light.) The frequency is the number
of wave crests that pass by an observer
each second – measured as cycles
per second or “hertz,” and
the amplitude is how high each wave is
– i.e. “the size of the wave
measured from zero to peak.”
Any color or sound that
stays the same for a length of time will
have a continuous repetition of the same
wavelength during that time. As a typical
example, the “concert-level”
frequency for the note A is 440 cycles
per second. This means that when air vibrates
440 times in one second, our ear interprets
this as the musical sound “A”.
That’s all there is to it. If those
440 cycles didn’t all have the same
frequency and amplitude, then we wouldn’t
hear a steady pitch at a steady volume.
If we increase the frequency of the sound,
such as by going up to 497 cycles per
second, then the pitch will go up as the
wavelength shortens. If we increase the
amplitude, the volume of the sound will
go up as the height of the wave increases,
but its pitch will stay the same.
We should also remember
that complex information can be stored
in these waves. We have two types of waves
that are used for radio: frequency modulation,
or FM, and amplitude modulation, or AM.
The word ‘modulation’ simply
means ‘changing.’ So, as a
simple explanation, the FM waves stay
at the same amplitude but have continuing
changes (modulations) in their frequency,
whereas the AM waves maintain the same
frequency but have continuing changes
in amplitude. That’s basically all
there is to it. Since these electromagnetic
waves can move so fast, there is a great
deal of information that can be stored
within them – and that is an important
point. The encoded information of AM/FM
radio, CB, the police / fire / emergency
bands, broadcast and satellite television
stations, cordless and cellular telephone
conversations are always around us in
every moment.
Now when we have a three-dimensional
geometric waveform inside of a sphere,
the wavelength and frequency would be
represented by the distance between the
various node points across the surface
of the sphere, which could be measured
in degrees, and calculated by the sine
function in trigonometry. The amplitude
would be measured by the size of the sphere,
which could be measured in radians, and
calculated by the cosine function. Thus,
as we pump up the strength (amplitude)
of a given spherical energy field, so
too will we increase its size –
which explains why these structures exist
from the tiniest level of quantum mechanics
all the way up to the known Universe.
It is also important to realize that in
this fluidlike aether system, increases
in frequency will also draw in more aetheric
energy from the surrounding environment,
and thereby increase the size (amplitude)
of the sphere as one geometry shifts to
another. We will explore this later in
the chapter, when we see how neatly the
different Platonic Solids “nest”
inside of each other, with each new geometry
larger than the one inside of it. So typically,
a frequency increase will also involve
an amplitude increase.
The only thing left to explain
is why the vibrations form tips or points
or vertices at the surface of the sphere,
with straight lines connecting them. Again,
returning to a the simple study of a wave
in two dimensions, known as wave mechanics,
we know that every wave has certain points
known as “nodes” where there
is no movement. This is easiest to see
with the basic sine wave, which is shaped
like a slow-moving wave on the surface
of a lake – a continuing S-shaped
curve. If you pluck a guitar string, there
are certain areas of the wave where there
is no movement at all, but it actually
will remain perfectly still. These areas
are the “nodes,” and you obtain
the wavelength by measuring the distance
between these nodes. A node could also
be seen as the area where a child’s
seesaw is supported by a metal pole; either
side of the seesaw can go up and down,
but the middle of the board will always
stay in the same place. Again, such a
point is known in wave mechanics as a
“node” or a “moment
point.”
Similarly, the pointy tips
or vertices of the Platonic Solids represent
the nodes of the wave. These points are
where the least amount of vibration is
occurring throughout the entire sphere.
Consequently, we will see that in this
“stillness” is great power,
caused by the pressure surrounding the
points. These node areas (as well as the
exact center of the sphere) actually have
the greatest energetic strength across
the entire surface of the sphere, because
the surrounding higher-pressure zones
of vibration will naturally gather up
and direct everything “loose”
in the area back to these low-pressure
zones. It is for this very reason that
the most number of loose “colloids”
would gather into these nodes in Dr. Jenny’s
experiments. (This is also the same reason
why high-pressure storm clouds will rush
into a low-pressure zone in our atmosphere.)
Since these nodes exert great force on
each other by the laws of vibration, then
as the old saying goes, “the shortest
distance between two points is a straight
line.” So, straight lines of force
are naturally formed between these nodes
once they are created, and when you see
all the lines combined together, the geometric
object emerges – just like connect-the-dots.
The last terms from wave
mechanics that we need to introduce at
this time are “moving wave”
and “standing wave.” (The
terms “dynamic” or “propagating”
for the moving wave and “static”
for the standing wave are also used.)
This is quite self-explanatory –
a moving wave moves through space, where
a standing wave stands still as it vibrates.
So, if we have a sphere of fluid that
remains stationary and has a geometric
stress pattern of vibration inside of
it, that geometry is referred to as a
“standing wave.” Once we think
in these terms, it becomes easy to put
the model together – it is based
on simple, known physical principles of
vibrating fluid, and the quasi-solid “stresses”
that can be formed inside of it by vibration.
MATCHING UP GEOMETRIC
FORMS TO THE “DENSITIES”
Now if we think back to
the idea that there is an Octave of aetheric
densities in the Universe, we can see
that these densities have color, sound
and geometric components. This is perhaps
the most frequently studied connection
that was explored by the inheritors of
the ancient mysteries, long after they
had lost track of the full scope of scientific
knowledge that was behind it. So, one
early puzzle that we worked on from 1996
to 1998 was, “How do we assign a
geometric shape to each of the seven major
densities, since there are only five Platonic
Solids and the sphere to work with?”
We do not need eight shapes, as the ancient
traditions tell us that the sphere exists
both at the beginning and the end of the
Octave. Similarly, in the Octave of sound,
any note that is an octave higher than
another note will sound the same, just
in a different register – a higher
or lower octave. Mathematically, any musical
note that is an octave higher than another
note will have exactly twice as many cycles
per second – so “A”
at 440 cycles per second will again become
“A” when it gets to 880 cycles
per second.
So where is the seventh
shape? The answer was found in the “religious
myths” of the ancient Vedic scriptures
from India, the remnants of the Rama empire,
as told in Robert Lawlor’s invaluable
book Sacred Geometry. The Hindus, or their
contacts, supplied the answer by supplying
us with one of the Platonic Solids twice.
Just as the sphere appears twice, at the
beginning and end of the octave, so does
its closest harmonic partner, the icosahedron,
located at the second and seventh density
levels. For the rich, mystical culture
of the ancient Vedic texts, with the full
cooperation of extradimensional entities
flying about in fabulous vimanas, the
icosahedron shape was actually turned
into a god. They named him Purusha, and
in the seventh dimension, or density,
he represents the masculine force in the
universe.
Figure 3.2 – The
icosahedron, known as the masculine god
“Purusha” to the ancient Rama
empire.
As we just said, Purusha
also shows up as the first shape for the
sphere to crystallize into when we are
at the beginning of the spectrum. Therefore,
the One, being a manifestation of all
conscious entities, must crystallize down
into the world of form as Purusha, and
any entity must again attain the level
of Purusha to return to the One at the
end of the cycle. The next image from
Lawlor’s Sacred Geometry shows how
you would draw an icosahedron in two dimensions,
using a compass and straightedge.
Figure 3.3 – The
icosahedron, as drawn in two dimensions
with a compass and straightedge. (From
Sacred Geometry)
Before we assert that the
Hindu culture was sexist and male-driven,
assigning masculinity to all the best
spiritual forces in life, realize that
there is a yin to our yang. The universal
feminine force is referred to as Prakriti,
and is identified as the dodecahedron,
or the sixth density.
Figure 3.4 – The
dodecahedron, known as the feminine goddess
“Prakriti” to the ancient
Rama empire. (From Sacred Geometry)
In fact, it appears that
each density can be considered as having
either “male” or “female”
qualities, the second being female, third
male, fourth female, fifth male, et cetera.
Let us not forget that the Oneness is
a combination of both genders in Unity.
Thus, as Purusha starts as female in the
second density, we see that it is, indeed,
a father / mother god, also encompassing
the feminine, or Prakriti archetype within
itself. Once we read further into the
design and understand the metaphysical
and spiritual properties of the dimensions,
their “genders” will make
tremendously good sense. Other than the
sphere, we can see that Purusha and Prakriti
are the two highest shapes in the spectrum,
so it makes sense, in some way, that these
two shapes themselves could have been
personified as gods and goddesses. These
higher realms are clearly something we
can aspire to, and these are, essentially,
conscious shapes.
Our own home is currently
in shape number 3. This, the octahedron,
is the vibratory level that provides the
invisible background framework for the
energy that all of our atoms and molecules
are created from. Rod Johnson, whose sacred
geometry model of quantum physics covered
in Volume III, has asserted that the massless
"neutrinos" that have been observed
in the laboratory could well be octahedrons.
However, more often than not these vibrations
would remain undetectable, as they are
only the underlying framework of reality,
not the actual reality itself. When you
look at a finished skyscraper, you don't
see the I-beams. Similarly, we don't see
the "zero-point energy" that
creates "virtual particles"
of protons, neutrons and electrons which
constantly wink in and out of existence,
but yet we know that it must exist. Therefore,
the ancient physics would teach us that
this shape represents the fundamental
background for all matter in our "density."
This is the forgotten ancient teaching.
It is important to realize that this is
only a general rule, as within our own
density we see evidence of all the Platonic
Solids, representing the different “sub-densities.”
We need all of them in place to be able
to build physical matter – but the
strongest one in third-density is the
octahedron.
Figure 3.5 – The
octahedron, which is the underlying geometry
of our own “third density.”
To look at just the top
half of an octahedron, we can easily see
that it is identical to the shape of the
Egyptian Great Pyramid. With the full
physics model in place, this simple fact
will clearly illustrate that all pyramids
were designed in order to be able to focus
this geometric energy of the aether, much
as would a funnel direct a flow of water.
As we will see later in this volume, the
“torsion fields” on the Earth
can vary from place to place far more
than the normal “push” of
gravity or of the Earth’s magnetic
field, and in the Russian lingo, any pyramid
acts as a “passive torsion generator.”
Matter itself behaves like
a vibrating sponge that is submerged in
water, with fluidlike energy continually
flowing in and out of it with a pulsating
motion. When you clump matter together
into a single structure, the shape of
that structure will determine how the
aether “currents” flow through
it. Any cylinder or cone-shaped object
will harness and focalize torsion fields,
as we have extensively documented in Volume
III. There are always torsion fields coming
out of the Earth in spirals, and the cone
shape can direct and focus these fields.
Let us not forget that these fields are
composed of intelligent energy, so one
major benefit of harnessing these fields
is that they will dramatically enhance
your physical health as well as your spiritual
consciousness in a short time –
hence the ancient Egyptians referred to
the pyramids as “temples of initiation.”
And we know that the Greek word “Pyramid”
is a conjunction of the words “Pyre”
and “Amid,” meaning “Fire
in the Middle.” This “fire
in the middle” represents the energy
fields that are harnessed inside the Pyramid
– hence the name itself conceals
part of the secret.
In essence, with the proper
science in place, we realize that the
Great Pyramid of Gizeh, the most precisely
constructed pyramid on Earth, is a fantastic
machine, fashioned with a technology that
is far more advanced than our present
scientific level of understanding. The
reason why is that this is a technology
of consciousness, working off of a physics
model that we are only just now rediscovering
in the public arena. And the more that
we examine the Pyramid, the more that
we can see how accurate and comprehensive
the ancient knowledge that went into it
must be.
It is an established, longstanding
fact that if you take the difference between
the base and height measurements of the
Pyramid, the pi ratio of 3.14159 is expressed.
This means that you could draw a circle
from one corner, over the top and down
to the opposite corner, and that circle
would perfectly touch all three points.
Then, all we have to do is think in three
dimensions, and we will quickly discover
that the Pyramid mathematically fits perfectly
within a half-sphere.
Figure 3.6 – The
Great Pyramid fits perfectly within a
half-sphere, as pictured.
So, in a very direct fashion,
the pyramid structure forms “resonance”
with the aether, causing a sphere of unseen
energy to form around itself just like
this. Remember that the strongest geometric
energy structure of our own dimension,
if we could see it, would look exactly
like this. Thus, the Pyramid was not only
a geometric object, it was literally built
as a giant, solidified “consciousness
unit.” On one level, we could think
of it as a giant statue in honor of the
energy density that we now inhabit –
but it is also a very potent machine.
We have also been told by Ra that it was
far more effective when it was first built
than it is now, due to the changing positions
of the Earth and the deterioration of
its stone faces.
Many Pyramidologists have
pointed out that the outside of the Great
Pyramid expresses the exact length of
an Earth year, 365.2422, in many different
measurements. Since scholars understand
that the Pyramid perfectly fits into a
half-sphere, many have concluded that
the Pyramid is designed to represent the
Earth. But that wouldn't explain why the
pyramid builders didn’t simply erect
a globe, especially with the apparent
technology that they had at their disposal
to precisely position such huge stones.
It is only now that we can see why the
octahedral form was chosen in order to
do this.
Though we cannot see the
Pyramid as a crystal now, it is a well-known
fact in Egyptological circles that when
the Pyramid was first built, it was entirely
covered on the outside with casing stones.
These were made of white Tura limestone
that was precisely mirror-polished to
a glowing sheen (Lemesurier, 1977.) It
was so bright in daylight as to be blinding,
hence the ancient Egyptians named it “Ta
Khut,” or “The Light.”
It would be very easy to conclude that
it was not built by primitive human beings
when seen in this original form. In the
next picture below, we see the remnants
of these stones that still exist along
the bottom.
Figure 3.7 – Casing
stones that still exist along the base
perimeter of the Great Pyramid.
What is not often known
is that the spaces in between these casing
stones were only 1/100th of an inch wide
(Lemesurier, Hoagland.) For comparison,
the best that modern technology could
do to align the heat shield tiles on the
Space Shuttle was one thirtieth of an
inch tolerance (Hoagland.) This puts the
fashioning of the casing stones on the
level of optical precision; something
we would normally only use for extremely
sensitive pieces of equipment. All of
this precision was used to make it that
much more effective as a “machine”
that harnessed torsion fields.
Furthermore, in these incredibly
tight spaces between casing stones, so
tight that a knife blade cannot be pushed
into them, there is an impossibly thin
layer of “cement” holding
them together. This “cement”
is so strong that to strike the joint
with a sledgehammer, the limestone itself
breaks before the “cement”
does. Still to this day, no one has provided
a satisfactory explanation for how this
could have been done. It certainly appears
that the stones themselves were fused
in place, and thus it wasn’t cement
at all, but a product of extreme heat,
melting the two stones together. So how
did they get the heat? A laser, perhaps?
Or was it focused consciousness, transforming
the matter phase of conscious limestone
molecules? Ra's explanations start to
make more and more sense to us as we go
along, as in their model, they were able
to use consciousness to visualize how
they wanted the stones to arrange themselves,
and their visualizations would then become
reality.
To summarize, then, the
outside of the Pyramid was fashioned with
an optical precision that is only now
matched by the type of work that we would
do on a mirror lens for a reflecting telescope
(Hoagland.) We must then picture a giant
pyramid built out of four mirrors, so
bright in the daylight as to be almost
blinding. Again, it is no wonder that
ancient Egyptians referred to it as “Ta
Khut,” or The Light. When it was
in its true crystal state, there could
be no doubt that it was not built by the
humans of the time; it would be a most
totally alien-looking structure. We can
only imagine its original appearance now,
as earthquakes jarred most of the casing
stones loose in the early years of the
first millennium AD, and these perfect
white stones were then hauled off to build
mosques in Cairo. Thus we can only measure
the original design of the casing stones
from the few that remain along the bottom,
still intact. The top of the second pyramid
also has some casing stones still remaining.
Figure 3.8 – Top-down
view of second pyramid on the Giza plateau,
showing casing stones at top.
This almost insane degree
of precision starts to make a lot more
sense when we realize what energies might
be able to be harnessed by the building
of such a structure. These energies would
not be cold and lifeless like electricity;
instead, they would represent conscious
energy, and could thus be directed by
a conscious human being, once trained.
The author’s own sources, along
with Ra and the Cayce readings, indicate
that a person well trained in directing
this energy could rejuvenate dying bodies
to extreme youth and vitality, travel
in time and levitate massive objects with
ease. Furthermore, it helped to stabilize
the Earth on its axis, decrease severe
weather and earthquakes in the surrounding
area, heal and normalize the mind, purify
water, create usable energy and eliminate
leftover radiation from nuclear battles
in much shorter amounts of time. The more
we learn about the science that is involved,
the more obvious this will become –
and the greater of a desire we will have
to rebuild a worldwide network of pyramids
once again to heal the earth of the present
damages that we are creating.
Indeed, Ra tells us that
the Pyramid was a giant gift that they
produced for our civilization, a gift
whose primary purpose centered on providing
a temple for initiation while also functioning
as an effective balancing agent for the
Earth’s energy fields. Having a
“temple of initiation” meant
that higher-level energies could be harnessed
and integrated into the physical and nonphysical
bodies of the human seeker, and the full
soul evolution progress through the spectrum
of seven densities could then be made
while still on Earth. This was a very
rigorous and terrifying process, as one
essentially confronts all of the “distortions”
of the personality self at once, in what
amounts to a subjectively long-lasting
nightmare. A trained healer, who can travel
with the person out-of-body while they
go on this journey, was always present
for this work to be done, since the fear
alone could cause the person to lose track
of the physical body and thereby die.
If the initiation was successful,
then after such a progressive evolution
is complete, that entity would have access
to all the power of the entire octave
of dimensions, becoming like a god and
having Christlike abilities, if it decided
not to leave the Earth. One reason that
the inheritors of the Atlantean Mysteries
felt that they had to keep the knowledge
a secret is that they felt that if a negatively-polarized
person made sufficient progress in the
Pyramid, they could become a very powerful
force of evil on Earth – even though
it appears that this would not truly be
possible, since the negative path cannot
sustain itself above the fifth density.
It should be no surprise
that mystical tradition long holds that
Jesus also completed a Pyramidal initiation
in such a manner, and might well have
been the only person coming in well equipped
enough to actually complete the process
in full. According to the Edgar Cayce
readings, Jesus enjoyed a former lifetime
as Hermes, the co-designer of the Pyramid
with the priest Ra-Ta, who later reincarnated
as Cayce himself. Thus, it appears that
Jesus later utilized the very piece of
technology that he originally helped to
build, in order to complete his own initiation.
As we will see in the end
of the book, the Pyramid actually wrote
Jesus’ arrival directly into a timeline
based on a geometric and numeric code
built into the design of the chambers
and passages inside. The prophetic statement
of this Messianic arrival occurs at the
moment where the narrow Ascending Passage
suddenly heightens tremendously into the
Grand Gallery. This particular event in
the Pyramid symbolism is arguably one
of the single most powerful symbolic events
of the entire span of time given. Obviously
Jesus knew, even as he helped design this
incredible structure, what he would later
use it for in future lifetimes.
If the pyramid shape is
a basic product of understanding a more
advanced physics than we are now using,
then we would expect that the technology
would be discovered by any civilized society
on any inhabited planet. In 1981, Ra said
that Mars is the only remaining planet
in our Solar System that had third-dimensional
humanoid life like ourselves in any recent
past. And in the late 1980's, Richard
Hoagland’s work began to be more
widely known, which did indeed reveal
the remnants of just such a civilization.
From Hoagland and others' data regarding
Mars, we see that the largest and easiest
pyramid to identify in the Viking-photographed
Cydonia region of Mars is five-sided,
almost precisely duplicating the top of
an icosahedron, or the Hindu god Purusha,
if we remember. Near this five-sided pyramid
is a city complex of slightly smaller
pyramids that appear identical to those
we see in Egypt.
In addition, the Mariner-photographed
Elysium pyramids on Mars are clearly in
the form of tetrahedrons, and Carl Munck,
whom we will meet in later chapters, demonstrates
a North American Earth mound in the form
of a tetrahedron in his book The Code,
also available from the Laura Lee Online
Bookstore. Furthermore, Hoagland and others
have written of spherical glass domes
on the Moon, which might well serve the
same purpose in harnessing torsion fields,
holding in an atmosphere and providing
a clear view of “outer space.”
Our own ex-NASA astrophysicist Maurice
Chatelain, whom we also shall discuss
in later chapters, came forward in 1995
with the shattering revelation that NASA
had found "geometric ruins of unknown
origin" on the Moon during the Mariner
and Apollo missions. More recently, similar
testimony was given at the Disclosure
Project conferences, starting on May 9,
2001 – and we attended the May 10
event and personally interviewed the witness.
GEOMETRIC ENERGY
TRANSITIONS
Our next question is, “How
do we naturally map out the transitions
from one geometric energy frequency to
the next?” Through a moderately
complex set of procedures, one can demonstrate
how each geometric form will naturally
“grow” out of the one before
it. To begin with, the sphere into the
icosahedron is relatively obvious –
the movement of formless Unity into geometric
form – so there is no real modeling
to be done. The second-density icosahedron
into the third-density octahedron will
be clearly modeled in Volume II. In order
to turn our own octahedron into the shape
of the 4th dimension, all that is required
is to expand each face into a basic four-sided
triangle, or tetrahedron. In our diagram
here, we conceptualize it as if you were
going to place a tetrahedron onto each
face separately.
Figure 3.8 – The
transition of the octahedron (L) into
the star tetrahedron (R).
Each face on the octahedron,
which is in the form of an equilateral
triangle, (composed entirely of 60-degree
internal angles, with each side the same
length,) becomes one three-sided tip of
a star tetrahedron. As the octahedron
has eight sides, you would then need to
add eight tetrahedra to its faces. To
animate this progression like a cartoon,
it would appear that the octahedron was
suddenly blooming like a flower; the faces
suddenly sprout upwards as the tetrahedra
rise into position. [Compare the diagram
here with the original harmonic table
in order to help visualize this. The top
right shape in the diagram shows where
one of the eight tetrahedra would be,
in terms of position, if it were not attached
directly to the octahedron.]
In order to then progress
from the fourth dimension to the fifth,
you can look at the diagram and easily
see how a simple connect-the-dots on the
edge points of the star tetrahedron forms
the cube. To go from the fifth-dimensional
cube to the sixth-dimensional dodecahedron,
a further outward expansion is required,
where each face of the cube sprouts an
inward-slanting "rooftop" in
order to turn into the dodecahedron. The
"roof" shape that appears is
most easily seen in the rectangular area
below, whereas the square area would be
more akin to an overhead view.
Figure 3.9 – The
cube’s “nested” position
within the dodecahedron.
Then, if you put a dot in
the center of each pentagon on the dodecahedron
and connect all of the dots together,
you will have a series of lines that form
five-pointed stars that create the icosahedron
shape, the last major node before the
return to the Sphere. In short, going
back to our original harmonic table again,
we can see how the entire progression
is a sphere, or a Oneness, expanding into
the “seed” or fundamental
form of the icosahedron, which then by
its structure gives rise to all of the
other forms contained therein (Lawlor,
1982.) The "seed" aspect of
the icosahedron is why the Hindus associated
it with a male god - they were using the
metaphor of the semen, or "seed of
life."
Figure 3.10 – The
full hierarchy of geometric shapes that
represent the Octave of densities, L-R
What we have here is an
understanding of the fact that the shapes
formed by these energy vibrations can
grow, much in the way that crystals grow.
ALL IS ONE
We shall briefly cover another
point that has been a major source of
confusion to those reading this book,
and attempt to break it down into simpler
terms in this revised edition. If you
still find it difficult to understand,
just be reminded that it isn’t an
essential point that is needed to understand
the physics. In order for the Universe
to truly be One, there must be a level
where there is no space and no time –
where All is Here and Now. Sources such
as “Seth” through Jane Roberts
tell us that nothing in the Universe really
‘exists,’ including the aether
itself – that all the Universe is
expanding and contracting from a single
point of Oneness in each and every moment.
So, the many tiny “field
bubbles” that make up the fluidlike
aether appear to flow around each other
when we study their behavior. On one level,
this is indeed true, as the experiments
of Dr. Nikolai Kozyrev, Nikola Tesla and
others have demonstrated, which we will
cover in Volume III. On another level,
we must remember that the amplitude of
the spherical wave shows us that the “zero
point” of the wave is indeed right
in the center, meaning that the wave itself
is constantly expanding and collapsing
from a single point. Think of a balloon
that is constantly inflating and deflating
from a very tiny point to a very large
sphere. At the highest level of vibration,
all of the energy in the sphere is contained
within the central point. Though this
does seem confusing, various sources such
as Seth and Ra tell us that all of those
single points are actually joined together
in Oneness – that there is only
one single point that all is emanating
from. This is another way that we can
understand that we do have a perfect “spark”
of the One Infinite Creator within ourselves.
If this is true, and we
have every reason to believe that it is,
then each of the geometric shapes that
we have discussed must be continually
present, at their own frequency, in every
“consciousness unit” or field
bubble in the entire Universe. Roughly
speaking, every energy form is pulsating
from a point, through the icosahedron,
into the octahedron, to the star tetrahedron,
to the cube, to the dodecahedron, again
to the icosahedron, and again back into
the sphere or point once more. This is
the only way we can explain that Seth
would tell us, loosely paraphrased, that
“your entire reality system is “off”
as much as it is “on,” and
you simply do not vibrate quickly enough
to see what is in between the gaps.”
Another analogy that we have used is the
idea of a filmstrip. The actual filmstrip
in a movie camera is a series of still
pictures that are separated from each
other, but when we watch them fast enough,
they form “moving pictures,”
or “movies.”
So, the spherical energy
that forms the Universe itself could be
seen to vibrate through all the different
shapes at mind-numbing speeds, forever
expanding from a single point out to form
the boundaries of space and time as we
know it and then compressing back into
that space yet again just as quickly.
Although it seems almost impossible to
conceive of our entire universe as crumpling
up into a single point over and over again
at speeds too fast to measure, this is
exactly what is happening, say sources
such as Ra. Since all of physical reality
is ultimately nothing but conscious energy
in vibration, each density would then
have the illusion of only existing at
one level in this energetic system. In
fact, all of the densities are interpenetrable,
and the vibrations from higher densities
will exert measurable stresses in space
and time here in the third. Among other
things, this forms the basis for the Global
Grid, which we will examine in future
chapters.
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