Yet another tantalizing clue that atoms are geometric patterns within a fluidlike energy flow is the phenomenon of quasi-crystals. In this case, you have crystals that look just like the Platonic solids we’ve been discussing, including the dodecahedron—along with other forms. They are created by supercooling certain combinations of molten metals at a very fast speed—apparently capturing the molecules while they are flip-flopping between space-time and time-space, and freezing them into a half-in, half-out crystal pattern. The problem is that these crystals destroy all the known rules of crystal formation—they should not be able to exist, because you cannot build perfect five-sided crystals out of atoms that are made of particles.51
According to Edgar Fouche, who claims to have worked at the semi-mythical Groom Lake/Area 51, quasi-crystals were found in wreckage recovered from the Roswell crash and eight other similar incidents. They were found to be extremely strong, extremely heat-resistant, and would not conduct electricity—even though the metals within them normally did. Fouche also said they were found to be very useful.
I’ve discovered that the classified research has shown that quasi-crystals are promising candidates for high energy storage materials, metal matrix components, thermal barriers, exotic coatings, infrared sensors, high power laser applications and electro-magnetics. Some high strength alloys and surgical tools are already on the market.52
Here, he’s obviously referring to Kevlar and Teflon, which some insiders say were “reverse-engineered” from crashed extraterrestrial craft. Fouche also said these crystals were baffling to the scientists working in these projects.
The lattice of hydrogen quasi-crystals, and another material not named, formed the basis for the plasma shield propulsion of the Roswell craft, and was an integral part of the biochemically engineered vehicle. A myriad of advanced crystallography undreamed of by scientists were discovered by the scientists and engineers who evaluated, analyzed and attempted to reverse-engineer the technology presented with the Roswell vehicle, and eight more vehicles which have crashed since then. Arguably after 35 years of secret research on the Roswell hardware, those who had recovered these technologies still had hundreds if not thousands of unanswered questions about what they had found—and it was deemed “safe” to quietly introduce “quasi-crystals” to the non-initiated scientific world.53
Obviously, with our new quantum mechanics model in place, we are now much closer to understanding how these crystals may have formed—and it seems that our visitors know much more about this science than we do.
Rocks with Naturally Occurring Quasi-Crystals
In Lost Science by Gerry Vassilatos, I found the intriguing suggestion that certain rocks may have naturally occurring quasi-crystals in them. Apparently Dr. Charles Brush, an American physical chemist who studied gravity in the Victorian era, found certain rocks known as Lintz Basalts, which actually fell more slowly than other materials—by a tiny but measurable amount. As he studied them further, he also found they had an unusual amount of “excess heat.” While this would obviously sound crazy to most people, it makes perfect sense when we remember that if you have the right coherence—which we now know means the right geometry—you can indeed get a gravity-shielding effect and may also be able to pull in energy directly from time-space.54
Dr. Thomas Townsend Brown got samples of these rocks and found that they would spontaneously give off surprisingly high voltages. Just putting wires on the rocks could give you several millivolts—and if you sliced them up into multiple pieces, you could get a full volt of free energy when you put them all together. Brown also found that the rock batteries would get stronger at six P.M., and weaker again at seven A.M.—showing that the light and heat of the Sun had a de-cohering effect on the energy they were pulling in. They also worked better at higher elevations, possibly thanks to a pyramid effect from mountains. Other inventors, such as Hodowanec, independently duplicated and verified these same results.55
According to Vassilatos, certain researchers traveled to the Andes and got up to 1.8-volt surges from a single rock. The more graphite was in the rocks, the more voltage they put out. Best of all, Brown found that they gave off two different electrical signals. One was steady, but the other would fluctuate with solar activity and the positions and configurations between the Sun and the Moon. He also found that distant pulses of gravity in space caused small electrical bursts in the rocks. Other rocks that were rich in silica also produced these charges. Brown was able to spot pulsar activity and supernovas long before they were announced by radio astronomers, as well as solar flares—even though the rocks were shielded from radioactivity, heat and light.56
In the same book, Vassilatos reveals the work of Dr. Thomas Henry Moray, another suppressed scientist who apparently found an even more powerful rock with the same properties. Moray only referred to it as the “Swedish Stone,” and did not say where exactly it came from. It was a soft, silvery white material he found in two different areas—one from a rock outcropping in crystalline form, and another from a smooth white powder he scraped off of a railroad car. When he tried to use the crystal as a piezoelectric detector for radio waves, the signal came out with such power that it destroyed his headphones. Even a very large loudspeaker would blast at an extremely high volume whenever he tuned in to a given radio station. Moray was able to use this material to create an extremely powerful free energy device—and even his first prototype, which only used a wristwatch-size piece of “Swedish Stone,” could simultaneously run a 100-watt light bulb and a 655-watt electric heater. The deeper he drove his grounding rods into the ground, the brighter the light became. In 1925, he demonstrated this technology to the Salt Lake City General Electric Company, as well as several qualified witnesses from Brigham Young University. They tried everything they could to prove it was a fraud, and were allowed to disassemble the entire setup—but they could find nothing. Later, Moray developed prototypes that could pump out fifty kilowatts of energy—enough to power a small factory all day, every day, without ever running out or needing to pay for energy.
Moray began trying to secure a patent in 1931, but was continually refused. And in 1939, the Rural Electrification Association sent a “scientific expert” along with others for a meeting with Moray. It turned out they were carrying guns and intended to kill him—but Moray had his own firearm and shot back, driving them off. As a result, Moray replaced all the windows on his car with bulletproof glass, and felt he had to constantly carry a revolver. He was never bothered again, but his breakthrough technology also never saw the light of day.
Later, he found that the Swedish Stone was doing other strange things. For example, he found that by using a standard radio receiver, he was tuning in the sounds of people’s conversations and other day-to-day activities at long distances away—even though there were no microphones in those areas. He was able to travel to the exact sources of the sounds and confirm that he was picking them up. He also found that significant healing effects occurred from these stones as well. Then, by 1961, Moray found he could direct the energy fields his devices generated to grow micro-crystals (sound familiar?) of gold, silver and platinum—from otherwise worthless soil that came from where these elements were mined. Soil that initially only had 0.18 ounces of gold per ton could be used to produce as much as 100 ounces of gold and 225 ounces of silver. He had achieved the alchemist’s dream of transmutation—in this case by starting with tiny crystals of gold, silver or platinum that were already in the soil, and causing them to grow much, much larger—like seeds. Through similar techniques, he was able to manufacture lead that was impossible to melt below 2,000 degrees Fahrenheit, and copper that was extremely strong and heat-resistant—which he used as bearings in high-speed motors. Another alloy he developed could be heated to 12,000 degrees Fahrenheit without melting.57 According to Vassilatos, Moray attempted to synthesize more of the Swedish Stone on his own, and submitted it to a comprehensive microanalytical profile. From these results, we now know the main ingredient w
as ultra-pure Germanium, which does contain a small, relatively harmless amount of radioactivity that can easily be shielded.
Arthur L. Adams, a retired electrical engineer, found a smooth, silvery gray material in Wales in the 1950s that also created extraordinary amounts of power on its own. When a special battery made from slices of these stones was dipped in water, the power became far more substantial—and when the stones were taken out, the water continued to produce electrical power for hours . . . not unlike the DNA Phantom Effect.58 British authorities seized all Adams’s research papers and materials, claiming this was being done for “future social distribution.” That time obviously has not yet arrived.
Genetic Geometry
Amino acids fit together to make proteins. These rules are complex—and scientists really don’t understand why certain amino acids fit together and others do not. Dr. Mark White analyzed these relationships and found that everything makes sense if you map out the amino acids over the surface of a dodecahedron.59
Dr. Mark White discovered that all the perplexing relationships of how nucleotides fit together in the genetic code can be solved by mapping them on a dodecahedron.
What is the ideal form of a DNA molecule? It is a double helix. What is the ideal form of the double helix? It is a dodecahedron . What is the ideal form of the genetic code? It is also a dodecahedron. As important as the double helix was toward understanding DNA, the dodecahedron is equally important toward understanding the genetic code. Perhaps more so.60
The same geometric laws seem to appear in quantum mechanics, planetary geodynamics and life itself—thanks to the fact that the Source Field is fluidlike, and geometry naturally appears when a fluid is pulsated. Pyramids and other funnel-shaped structures harness this flow and generate coherence in a given area, creating increasingly refined geometric patterns—and thus healing biological life, improving our mental health, regularizing the flow of currents in the mantle, the oceans, the atmosphere and the ionosphere to protect us from cataclysms, and improving the hardness and purity of crystalline structures. This science may also pave the way for a wealth of free energy technologies that could permanently end our crippling dependence on oil—and usher in a new era of peace, freedom and prosperity that we may never have dreamed possible before.
CHAPTER SIXTEEN
The Maya Calendar and the Gateway to Intelligent Infinity
Every astronomer owes Johannes Kepler a debt of gratitude for working out the basic laws of planetary motion. Sadly, they’ve all abandoned his greater vision: namely that the spacing of planetary orbits in our solar system could be precisely defined by the Platonic solids. Where did he get this idea from? Was it strictly an original thought, or had he been “tipped off ” by the mystery schools? Just as I was finishing this book, I found solid proof, from a true master of geometry, that Kepler was right. The orbits of the planets do indeed hold the same three-dimensional geometric relationships that we see in the earth’s grid, in DNA and protein synthesis, and all throughout quantum mechanics—namely, the Platonic solids.
I was taught in school that Kepler’s concept of interplanetary geometry was a hilarious wrong turn in science, and certainly had never been proven. Years later, I came to feel he might have been right—but I didn’t have the proof. Then, by a seemingly “random chance,” I “just so happened” to “stumble over” what I was looking for. A friend handed me a book and said, “You might want to read this.” And the best part was the title: A Little Book of Coincidence, by John Martineau.1 Within minutes, I realized I’d been handed the final key I needed to unlock the mysteries of the ancients.
Johannes Kepler worked out the basic laws of planetary motion. He also believed the planets were spaced apart by geometric relationships, as he illustrated here.
Geometric Forces in Planetary Orbits
I already knew there were impressive harmonic relationships in the orbits of the planets. I wrote about them extensively in all three of my earlier scientific books, which you can go back to my Web site and read for all the details. I also saw some compelling suggestions of a hidden geometry in the planetary orbits when I read Time Stands Still by Keith Critchlow, now considered rare and hard to find. (My copy cost me 150 dollars.) Critchlow’s book also features stunning images of Platonic solids carved into Neolithic stone spheres that were dug up, by the hundreds, all throughout Scotland. Martineau’s book had the final piece I was looking for: Geometry is the key to unlock the mysteries of the solar system. The planets are apparently being held in place and driven through their orbits by the same geometric forces that very likely create atoms and molecules—as well as the global grid. This, of course, makes it much more interesting to chart planetary alignments. We can now reimagine these alignments as moments when the gears in a giant, invisible clock line up with geometric precision. However, instead of flat, circular wheels with teeth on them, these gears are the Platonic solids. And when they line up, we may have the key to stargate travel, far beyond the reach of our solar system—and perhaps across much larger chunks of time than just a few days here and there.
In November 2010, Prince Charles released his new book Harmony: A New Way of Looking at Our World—in which he uses Martineau’s groundbreaking research to argue that the Universe displays evidence of a “grammar of harmony.”
I was captivated when I came across the work of a young geometer called John Martineau while he was studying at my School of Traditional Arts some years ago. He decided to make a close study of how the orbits of the planets relate to each other and how the patterns that can be drawn from them fit so precisely with things made down here on earth. He found many rather beautiful relationships. . . . This is all pretty remarkable evidence that there is a mysterious unity [in] the patterns found throughout the whole of creation. From the smallest of molecules to the biggest of the planetary “particles” revolving around the Sun, everything depends for its stability upon an incredibly simple, very elegant geometric patterning—the grammar of harmony.2
Kepler’s vision of the planets is first discussed on page 12 of Martineau’s book.
Looking for a geometric or musical solution to the orbits, Kepler observed that six heliocentric planets meant five intervals. The famous geometric solution he tried was to fit the five Platonic solids between their spheres.3
On page 14, things get much more interesting: “Kepler . . . particularly noticed that the ratios between planets’ extreme angular velocities were all harmonic intervals.” Then, Martineau begins delivering the goods.
Two nested pentagons define Mercury’s orbital shell (99.4%), the empty space between Mercury and Venus (99.2%), Earth’s and Mars’s relative mean orbits (99.7%), and the space between Mars and Ceres (99.8%). Three nested pentagons define the space between Venus and Mars (99.6%) or Ceres’ and Jupiter’s mean orbits (99.6%). A hidden pattern?4
Absolutely yes. The five-sided pentagon is found in both the dodecahedron, with its five-sided faces, and the icosahedron, with groups of five triangles sharing common points—so we’re definitely on to something.
On page 20, Martineau makes the intriguing suggestion that even though the planetary orbits are elliptical, we can still study the basic proportions that hold them in place as if they were spherical. This is probably because their naturally spherical energy fields are being squeezed by the pressure and momentum of their movement through clouds of gas and dust in the galaxy.
I was stunned to see that if you draw one circle for the average orbit of Mercury, and put three of these circles together to make a triangle, then when you draw a circle around them, you get the orbit of Venus—within 99.9 percent. Of course, since these are actually spheres, it’s not a triangle at all—it’s our classic three-sided tetrahedron, the simplest of all the Platonic solids.
Then, on page 24, Martineau produces a remarkable geometric diagram of the relationship between Earth, Venus and the Sun. Every eight Earth years, or thirteen Venusian years, they line up to form the next corner of a perfect p
entagon—with 99.9 percent precision. Even better, when we work in the nearest and farthest points Venus reaches during this eight-year dance, another pentagon is formed that is even larger—and in perfect proportion to the others. This very likely is the result of Platonic geometries within spheres of energy that are precisely structuring where the planets travel—again, in this case, thanks to the dodecahedron and icosahedron with their five-sided symmetry.
John Martineau illustrates a perfect triangular relationship between the orbits of Mercury and Venus. This triangle forms a tetrahedron in three dimensions.
On page 32, we find out that there is geometric precision between earth and the Moon—thanks to the work of Robin Heath. There are between twelve and thirteen full moons in a year. If we then draw a circle (again, a sphere) with a diameter of thirteen units, and inscribe a perfect, five-sided star inside it, each arm of the star will measure 12.364 units. This is the exact number of full moons in a year—to a 99.95-percent level of accuracy. This again suggests there is a sphere of force between earth and the Moon—where the Moon’s movements are being precisely driven by the rotating vortex currents of gravity within the dodecahedron geometry, which is all based on five-fold symmetry.
The Source Field Investigations Page 36
