Water is a mysterious substance, yet we take it for granted. It is the most misunderstood and most abused element on Earth. Its chemical formula is H2O but that isn't all there is to it. Water is alive. It is the lifeblood of the Earth. Water has its own living energy, and if water dies, our Earth dies with it. Water makes up 60 to 70% of our bodies. Minerals, proteins, sugars, and other substances dissolve in this water forming colloids, which carry a subtle electrical charge. Thus, water provides the electrical life force in all living things. Even dispersed into a fine mist, water continues to carry this vital life force, maintaining its potency and power. It is literally good to the last drop. Since water is alive, it continuously needs to regenerate itself by dewing in a spiral or vortex motion which we see in the shape of a tornado's funnel.
Children have been creating an "artificial vortex" in their homes for countless of years since as a scientific project it becomes a method and apparatus for demonstrating the centripetal forces of nature as a spiral (video).
Implosion Technology and the Vortex In Nature (Wikipedia)
Cavitation involves an implosion process. When a cavitation bubble forms in a liquid (for example, by a high-speed water propeller), this bubble is typically rapidly collapsed—imploded—by the surrounding liquid.
Viktor Schauberger used this technology to describe the suctional process that causes matter to move inwards, not outwards as is the case with explosion. This inward (centripetal) motion, however, does not follow a straight (radial) path to the centre; it follows a spiralling, whirling path. This is called a vortex. This usage is unique to Schauberger, whose theories are not widely accepted by scientists. These die-hard scientists do NOT want to reveal this information...why?
My interest is in reviving and harnessing the technology as a FREE energy principle for practical use which is addressing the physics and fluid dynamics. So here is a watered (pun intended) down version of creating a "tornado based on the physical properties and potential applications: metallurgy (physical) spiritual ascension non-physical, and beyond.
Vortices display some special properties:
The fluid pressure in a vortex is lowest in the center and rises progressively with distance from the center. This is in accordance with Bernoulli's Principle. The core of a vortex in air is sometimes visible because of a plume of water vapor caused by condensation in the low pressure of the core. The spout of a tornado is a classic and frightening example of the visible core of a vortex. A dust devil is also the core of a vortex, made visible by the dust drawn upwards by the turbulent flow of air from ground level into the low pressure core.
The core of every vortex can be considered to contain a vortex line, and every particle in the vortex can be considered to be circulating around the vortex line. Vortex lines can start and end at the boundary of the fluid or form closed loops. They cannot start or end in the fluid. (See Helmholtz's theorems.) Vortices readily deflect and attach themselves to a solid surface. For example, a vortex usually forms ahead of the propeller disk or jet engine of a slow-moving airplane. One end of the vortex line is attached to the propeller disk or jet engine, but when the airplane is taxiing the other end of the vortex line readily attaches itself to the ground rather than end in midair. The vortex can suck water and small stones into the core and then into the propeller disk or jet engine.
Two or more vortices that are approximately parallel and circulating in the same direction will merge to form a single vortex. The circulation of the merged vortex will equal the sum of the circulations of the constituent vortices. Vortices contain a lot of energy in the circular motion of the fluid. In an ideal fluid this energy can never be dissipated and the vortex would persist forever. However, real fluids exhibit viscosity and this dissipates energy very slowly from the core of the vortex. (See Rankine vortex). It is only through dissipation of a vortex due to viscosity that a vortex line can end in the fluid, rather than at the boundary of the fluid. For example, the wingtip vortices from an airplane dissipate slowly and linger in the atmosphere long after the airplane has passed. This is a hazard to other aircraft and is known as wake turbulence. According to Drunvalo Mechelzidek he recommends the MerKaba activation as a natural, non-physical process for spiritual ascension. (in his own words)...
I want to talk about vortex energy here, because we need this information in order to understand the energies that exist around the world's Sacred Sites.
In this discussion, I will not try to interpret the underlying meaning of this energy. My purpose is only to bring your attention to the fact that these energies exist around Sacred Sites, and to make you aware of their complexity. Then, when you read someone else's ideas about Sacred Sites and vortexes, you will realize that you have to ''see'' from where they are before you will be able to make up your own mind as to what it all means.
What follows is a layman's summary of the way the energy in a vortex moves, its possible nature, and what personal meaning it may have for you.
Vortexes: Energy In Motion
The simplest vortex is a circle, where the beginning meets the end. Moving matter — in the form of water, wind or dust, any form of energy such as electricity through a wire, or even magnetic fields — can move in circles. But when the movement of the energy begins to spiral, a special vortex is formed — a hurricane is a good example of this — and the nature of a spiral vortex is determined by the way it moves.
At first, we might think that a spiral is a spiral is a spiral. But on closer examination, we can see that a spiral may be more complex than we had thought. For example, a spiral moving toward the center is different from one that is expanding, or moving away from center. And further, the direction that the spiral is moving — clockwise or counterclockwise — is an important factor. Some scientists see vortexes as either male or female, depending on which direction they are rotating. Generally, clockwise is seen as ''female,'' and counterclockwise as ''male.''
But is it really that straightforward? For is it not true that the direction a vortex is rotating depends on where you are located relative to it? When we look from the North Pole, the Earth appears to be moving from East to West, and would thus be ''male.'' But viewed from the South Pole, the Earth appears to be moving from West to East, and would be ''female.'' So which is it? Perhaps what you see is what you get.
Again, I'm not here to interpret, only to point the way for your own experiences.
Here are more thoughts: If you are positioned above a sprinkler like a ''Rainbird,'' which rotates to make the water move in a vortex — two directions are taking place at once. The water may appear to be moving, say, clockwise. But if you look only at the object that is rotating and creating the vortex, you will see that it is rotating in the opposite direction. Think about it.
To me, what this means is that if a vortex appears to be moving in a certain direction, the force that created it will be moving in the opposite direction. Very often, vortex researchers forget this idea, and so mix up the idea of male and female when they describe a specific vortex. But a problem arises in comparing one vortex to another unless both researchers use the same system to identify them. For example, the Japanese see the ''North'' pole of a magnet in the exact opposite way that Americans do. We see it as the ''South'' pole.
Endless versus Finite Energy Motion
Vortexes also follow certain mathematical laws as they move. Two such examples are the Golden Mean vortex and the Fibonacci vortex. They appear almost the same, but they are extremely different in their natures.
The Golden Mean vortex will rotate toward or away from center forever — never reaching the center and never ending its outer expression. And the Fibonnaci vortex also rotates forever outward from the center. But the Fibonnaci vortex is absolutely finite in its inner quest to reach the center. It eventually comes to its beginning, and there must either stop or reverse direction. If it reverses direction, a Fibonnaci spiral will appear to create a completely new, outwardly-moving vortex — of the opposite spin!
Another vortex type, the toroidal vortex, also reverses its spin as it enters exact center. And this type of vortex actually moves in three dimensions, following the contours of the torus shape.
So if someone describes how a vortex is moving, or says it is female or male, we must realize not only that where we are located relative to the vortex determines its nature, but that nothing is as simple as it may seem.
The Mass of the Earth rotating around its axis creates two giant vortexes coming from the North and South poles. Also incredible are the two vortexes arising from the magnetic poles. These are the four major vortexes of the Earth. But there are millions of smaller ones.
In California, for example, there is a vortex called the Mystery Spot, because although it is provably real, no one understands it.
The Mystery Spot is about two or three city blocks in diameter, and its edge is extremely defined, like a huge soap bubble that's halfway in the Earth and halfway out. On the edge of this vortex, the California State Parks department has built a perfectly level, concrete pad with a permanent line drawn down its middle at the exact spot where the edge of the vortex crosses it. Built-in to this concrete pad is an instrument to prove that it is really perfectly level. And the Parks department encourages people to bring their own levels, so that they can see for themselves. Because without this proof, it would be impossible to believe that the earth in this area is not strongly tilted!
To experience the mystery of this vortex, two people stand on opposite sides of the line — so one of them is inside the vortex, and the other one is outside. Then the Park Rangers ask both people if the other's height seems the same as it was before they took these positions. And always, the person inside the vortex appears to be about four inches shorter than they were a few minutes before. It is amazing. I have done this, and the person inside the vortex truly appears to be much shorter. And when the two people change positions, the other person appears shorter.
The Mystery Spot is not the only one of its kind. Friends brought me two rocks from inside another vortex in the United States that has the same effect. And we found that just by holding one of these rocks, the same phenomenon happens: The person holding the rock appears shorter! They don't need to be in the vortex itself. This experience is so real that no one who has ever tried it so far has failed to have the same results.
Vortexes in Your Neighborhood?
If you simply walk through the forest and look carefully, you will notice that vortexes are everywhere. Of course, some geographical locations are more active and others are calmer. But in general, Earth vortexes are everywhere.
How can you detect them? Look to see how the bark of the trees is formed. When you see bark spiraling up a tree, you are probably inside a vortex. If you look closer, you can sometimes actually see the outline of the vortex in the vegetation. And a near-perfect circle will be apparent on the surface of the Earth.
Have you ever noticed how a lawn will sometime have a perfectly round area where the grass is super-green?
And if you are standing in a female vortex, then you will find a male vortex not too far away. They balance each other, and are usually connected. In the female vortex, clockwise, you will probably notice that everything is dead. There will be very little or no life in this circle. In the male vortex, counterclockwise, the life there will be exaggerated and super healthy. Usually people don't even notice these vortexes, as they seem to blend in — but once you notice one, you will begin to see them everywhere.
Vortexes Often Have Special Attributes
About 15 years ago, I was in a vortex in Peru at Sachsahuaman. Our guide had pointed it out to me, and it was most unusual. The ancient Incas had built a stone circle, flat with the ground, exactly centered on this vortex. It had, I believe, twelve spokes coming out of the center. The vortex itself was only about 40 feet in diameter, but it was really strong. There were ten of us, and we all felt this rotating field very pronouncedly. According to our guide, this vortex was why the Incas built the stone temple in this location.
Like many others, this Peruvian vortex has special attributes. When you sit in its center and speak, it will reflect the sound back. This vortex is high on a hill, with no walls or anything nearby, but if you speak a word or make a sound out loud, you will get echos. This can be a truly shocking experience. The echos sound as though you are in a glass dome — there are at least three echoes coming back. Again, in the very center of this vortex I saw a perfectly round clump of green grass about three feet in diameter, while the rest of the surrounding area was dry.
In the vortex of the Mystery Spot, the parks department will show you how objects roll uphill, defying gravity. Until you have actually seen something like this, it seems impossible.
The Experience of Sacred Sites
So as you read the articles in this month's Spirit of Ma'at, understand the special nature of vortexes and how they are associated with sacred sites.
If you truly wish to experience vortex energy, where the characteristics of ''reality'' are subtly altered, you can simply go into nature and find the real thing.
Or visit a sacred site or temple, where the energies are strong and palpable. Then you will perhaps begin to understand the ancient knowledge they contain — why these sites exist where they do, and what they mean.
For you may read what others hypothesize, but there is no substitute for going there and experiencing them yourself.
With Sacred Sites and vortex energy, we encounter one more phenomenon that reminds us that truth is not always in the words.
A vortex can be any circular or rotary flow. Perhaps unexpectedly, not all vortices possess vorticity. Vorticity is a mathematical concept used in fluid dynamics. It can be related to the amount of "circulation" or "rotation" in a fluid. In fluid dynamics, vorticity is the circulation per unit area at a point in the flow field. It is a vector quantity, whose direction is (roughly speaking) along the axis of the swirl. The vorticity of a free vortex is zero everywhere except at the center, whereas the vorticity of a forced vortex is non-zero. Vorticity is an approximately conserved quantity, meaning that it is not readily created or destroyed in a flow. Therefore, flows that start with minimal vorticity, such as water in a basin, create vortices with minimal vorticity, such as the characteristic swirling and approximately free vortex structure when it drains. By contrast, fluids that initially have vorticity, such as water in a rotating bowl, form vortices with vorticity, exhibited by the much less pronounced low pressure region at the center of this flow. Also in fluid dynamics, the movement of a fluid can be said to be vortical if the fluid moves around in a circle, or in a helix, or if it tends to spin around some axis. Such motion can also be called solenoidal. In the atmospheric sciences, vorticity is a property that characterizes large-scale rotation of air masses. Since the atmospheric circulation is nearly horizontal, the (3 dimensional) vorticity is nearly vertical, and it is common to use the vertical component as a scalar vorticity.
Practical Use of the Vortex Energy For the Extraction of Gold and Other Precious Metals
Traditional gold recovery and refining methods employ a variety of mechanical and chemical operations to produce precious metals of commercial purity. Depending on the quality of the gold source and its composition, any one of several different refining methods can be used to recover and refine gold to high purity.
The use of solvent extraction to recover metals is a greatly underutilized technology. Solvent Extraction can provide significant reductions in operational costs in comparison to more traditional methods of metals recovery and refining.
Our CDE 9 Gold collector is:
Biodegradable and not biotoxic
Easy to handle-low volatility (bp. 254.6C); low flammability in part because of a high flash point (118C)
Low solubility in water
A process that delivers nearly quantitative yields of high purity gold
Very selective for gold chloride
Suitable for small and large operations
Easily integrated into existing refining processes
Digest your ore with CDE Leach converting any AU complexes to Au(lll)Cl
Extract the AuCl from the pregnant solution as chlorauric acid with CDE 5
Reduce the AU(lll) with CDD9 to Au0 (metallic gold)
Recycle the CDE 5 back into the process
Pregnant Solution of CDE Leach that has digested enough of your ore to get a yellow/orange/gold color. (See our leaching video and primer.)
Hydrochloric Acid Solution (HCl Sol). You make this solution by purchasing 38% Muriatic Acid (available from most hardware stores) and dilute three times with distilled or reverse osmosis water. If you buy one quart of Muriatic Acid, you will make 4 quarts ofHCl Sol.
# 42 Whatman Filters or equivalent
CDE 5Gold Collector
CDE 9Gold Stripper
HCL Sol– Hydrochloric Acid as made according to directions above.
PGM's– Platinum Group Metals
PART –When testing we use units of 25 ml. We have substituted the word part for each 25ml we use. This will allow you to adjust the arithmetic for your setup no matter the size.
This can readily scale-up to any size set-up
Rings and holders
One beaker marked "Gold"- 400 mL
One beaker marked "Step 2"
One beaker marked "Step 2"- 400 mL
Magnetic Stirring Hotplate and stir bar.
1. Prepare 1 parts of clear leach by filtering pregnant solution through a # 42 Whatman filter into the beaker marked Gold. [NOTE: You may rinse the debris from the filtering back into your original leaching container to retain any unleached metals.]
2. Add 1 parts of distilled water and stir manually (stirring rod or agitating the beaker)
3. Add 2 parts of CDE 5 Gold Collector.
4. Place beaker on a magnetic stirring hotplate, place stir bar in the beaker and agitate strongly for 45 minutes at 98 degrees F.
5. Transfer the solution to a separatory funnel and allow it to settle into two layers. The gold will be in the top layer.
6. Drain the bottom layer into a beaker marked "Pregnant solution minus Au" and set it aside. [This "waste" liquid will be processed later for possible platinum group metals. The procedure is the same, but the collectors and strippers and different for each metal. Supplies may be purchased from Rocky Ledge.]
7. Place the CDE 5 into a beaker and add an equal amount of CDE 9 gold separator.
8. Agitate vigorously while bringing the solution to 180 F. This could take as long as 90 minutes depending on the volume as well as your heating and stirring equipment.
9. As the temperature rises a color change in the liquid will become apparent.
10. At approximately 180 F any gold present will appear to be "black" particulate floating in the solution. When the color is no longer modifying stop the heating and stirring.
11. Place the solution into a separatory funnel and allow to separate.
12. Drain the bottom solution through a # 42 Whatman filter to collect the gold particulate.
13. Rinse the particulate from the filter paper into an appropriate beaker. Add a small amount of HCL to the liquid and stir vigorously.
14. An amount of the gold will be "in the vortex" created by the stirring. Slowly add isopropyl alcohol—store-bought cheap rubbing alcohol—to the dilute HCL solution. When the mix is approximately 50/50 the gold will fall out of the vortex and settle in the bottom.
15. Air dry the powder in a protected area. You can be assured the material remaining is an ultra high quality gold in sponge form. This sponge gold is sale-able as it is.
16. Contact Rocky Ledge Mining Supply for further information. We can be a broker for your sponge gold under certain circumstances.
This method is extremely effective even when the pregnant solution is quite complex. Selective recovery of high quality Gold and PGM's is possible and therefore has great value with many ores.
Be careful, neat and thorough.
The quality of the results is dependent on the quality of the procedures.
Always use a fume hood.
This method is what I use on eWaste which anyone can harness.
If you follow the procedures it never misses
Creating and Harnessing the Inverted Pyramid Shape Relative To The Standard Pyramid Shape
Archimedes's Principle says that a body immersed in a fluid is buoyed up by a force equal to the weight of the displaced fluid. The relative density of the object compared to the density of the fluid determines whether it will sink or float.
The pressure due to the fluid is equal to pgh (density times acceleration due to gravity, times height) and when applied to an area, gives the force.
Therefore the force at the top of the object is:
P1A = pfluidgh1 A
and the force at the bottom of the object is:
P2A = pfluidgh2 A
so the buoyant force pushing up on the object is:
Fb = F2 – F1
= pfluidgA (h2-h1)
which is the density of the fluid, times acceleration due to gravity, times the volume of the fluid displaced.
The formula: Fb = pfluidgV
applies not only to a rectangular object, but can be generalized to an object with any shape.
If the buoyant force is more than the weight of the object, this means that the object's density is less than the fluid's density. This results in the object rising or floating up.
If the buoyant force is less than the weight of the object, this means that the object's density is more than the fluid's density. This results in the object sinking.
Also when objects are heated, they expand.
density formula: p=m/V, where p is density, m is mass, and V is volume
When a pocket of air is heated, it expands and the volume increases, thus density decreases. And if the density of the air pocket is less than the density of the surrounding cooler air it will rise.
Rising air in the center meets less resistance because it is surrounded by air that is also rising.
Rising air creates a vacuum causing cooler air from the sides to move in to replace the rising air. This causes a wind which further pushes the rising air.
Ordinary linear momentum is a measure of an object's tendency to move at constant speed along a straight path. Linear momentum depends on speed and mass.
When objects moved in curved paths, we can generalize the idea of linear momentum to something called angular momentum, an object's tendency to spin.
Like linear momentum, the total angular momentum of an isolated object is conserved.
Imagine an object with mass, rotating around an axis. Here, the angular momentum is the product of its mass, velocity (tangential), and radius (the distance from the axis point around which the object is spinning around).
L = mvr
Note that this applies to an object that has its mass at the distance r from the axis.
However, we can generalize this to the shape of te Great Pyramid at El Giza, Egypt to which when inverted and counter to the standard as connected by both bases of the pyramids where a diamond is observed as a 3-D integration, the mass is distributed all along the distance r and not just at the end of that distance r. For example, the body of a figure skater has most of its mass near the axis of rotation, and the mass of his or her arms and hands at a farther distance out.
Let us assume all the mass is at the distance r from the axis of rotation.
Conservation of angular momentum then explains why figure skaters or divers spin faster when they bring in their arms or tuck themselves in a roll.
For angular momentum to conserve in a spin, the angular momentum before must equal the angular momentum after.
The mass of the figure skater doesn't change. So if the radius decreases (by the skater bringing in their arms), then the velocity increases.
Lbefore = Lafter
mviri = mvfrf
Acceleration is the change of velocity in a short period of time:
When an object is rotating around something, the acceleration force to keep it rotating is:
F = ma = m v2 / r
The acceleration causes the direction of velocity to continually change to keep it rotating.
When you swing a ball on a string, you exert a force on the string, causing a tension, which then exerts a force on the ball.
At the same time, the ball exerts an equal amount of force in the opposite direction. The ball exerts a force on the string, causing a tension, which then exerts a force on your hand.
The •Coriolis Force is an inertial force that was described by the French engineer-mathematician Gustave Gaspard Coriolis in 1835.
In a rotating frame of reference, it is an inertial force acting to the right of the direction of movement when rotating counter-clockwise and to the left of the direction of movement when rotating clockwise.
It occurs because the Earth rotates eastward and it rotates faster (tangentially) as you approach the Equator and slower at the poles.
The Coriolis force is very, very weak and plays an insignificant role in the spinning of water in a sink or a toilet. The way the water spins is more likely due to the oval shape of the bowl or the off center drain. On the scale of large storms and hurricanes, the Coriolis force causes air to rotate around the center in a cyclonic direction (counter clockwise in the northern hemisphere, clockwise in the southern hemisphere).
The complete process for harnessing the vortex to extract precious metals such as gold, platinum, palladium, etc. can be duplicated when you receive the FREE CD