2016 - 12 - 9

Quartz Graphic 1


There are a few frequencies that are present in all Quartz structure crystals.
This includes all the silicon based crystals pretty much having a Hex form structure.
Rose Quartz has impurities, and there are many others that give other colors, but they all share the Quartz resonance lengths.

Diamond however is a carbon based crystal structure and has a different set of internal numbers.
When you find a length that resonates up a Quartz crystal with the calipers, you go test it on many other crystals and see if it is a universal length.
11.47 mm and 20.86 mm have been identified and labeled, at this time, as universal for all Quartz based crystals.
11.47 mm is a triangular form of nodal arrangement, and 20.86 mm is a square form.
The basic shape of the crystal is HEX form and we can achieve that at 11.47 x 6 = 68.82 mm.

It may very well be this dual frequency resonance that makes storing a vibration inside a crystal possible.

Every Quartz crystal also has a local dimensional resonance field, that is unique to it's size.
If I take one of my large crystal balls, set a scalar coil near it, place a hand on it, then tune a frequency into the scalar coil,
there will be found certain frequencies that cause that particular ball to go into a state of platonic form vibration.
When you hit these it will vibrate up the whole room, and the frequency is dependent on the balls diameter.

These unique ones are very powerful with the quartz balls, and if you set up an SSF [self sustaining field] on one of them, you will have something you cannot shut down very easily.
 A phi ratio used here will create a real problem, as an Aetheric tornado. A pi/2 will create a harmony that is nice.
Shut down was always a concern, but now with the triangular set of release fractals derived off 37000 hz we may start getting more bold

Our goal here is to identify how a quartz crystal can store an imprint within it's matrix structure.
In this way it can be programmed into any size piece of Quartz.
How we can erase it, so it goes dead.
How we can have it become radiant with a fractal that is many times larger then the crystal body.

First we will do some sensing experiments, then next calculate how to install frequencies into it's crystal matrix.

Sensing Quartz Crystal

This section will identify the resonance access portals of the crystal.
This kind of work requires you can accurately feel the vibration node points of resonant lengths and forms.
I will record what I detect here, so others with less sensitivity can duplicate this type of work.
The more you work with it the more sensitive you will become to it.

Identification of the Geometric Resonance Structure

A finger is used to probe for and feel the nodal points of the resonant form.
If you still cannot accurately locate them, use a pin or a nail.

11.47 mm Resonance

1147 Photo

It is important to note this triangle is a 60 degree equilateral form.
It is also worthy of noting, this resonance does not need a crystal to be felt.
This energy feeds the crystal from the background field and is everywhere already.
This is why the crystal forms along this matrix pattern.

20.86 mm Resonance

2086 Photo

It is important to note this triangle is a 90 degree right triangle.
This length then represents the diagonal of a square.
From this we can find the side length as well by division with the square root of 2.
20.86 mm / sqrt 2 = 14.75 mm

This is an electric field signature.

Math and Geometry

The background field is a Source of energy. Unlike EM energy, it is calculated differently.
Conversion of energy in the background field to frequency in the EM field is accomplished geometrically.
As you increase the quantity of space, area, or volume, of a resonant fractal, the frequency increases.
As you decrease the size, there is less energy from the background field and the frequency drops
We have found from experiment, a simple formula, Area = Frequency,
can be applied if metric dimensions are used.

The F gen will then work with the caliper.

With Quartz crystals, 1 kHz = 1 cm squared gives fairly accurate results.

Forms Diagram

Frequency [kHz] = Area [cm^2]

Square Grid

Square grid can be coupled into along any of its square root of 2 levels.
Here are the first two:
14.75 mm
20.86 mm
Etc ...

Area of square grid layers

Area can be doubled as a 2x stack to access other frequencies into the crystal.
1.475 cm squared =  2.175625 kHz
2.086 cm squared =  4.351396 kHz

Touch the black wire from a function generator to a quartz crystal, and test both these frequencies.

2.176 kHz is the stronger for me.

Triangle Grid

All sides being equal at 11.47 mm we have only one frequency choice
Height = 1.147 cm * sin(60) =  0.9933311381 cm

Area = Height * 1.147 cm / 2  = 0.5696754 kHz

570 hz

Touch the black wire from a digital function generator to a quartz crystal, and feel this one vibrate up.
At this point we have found some of the possible programming portals into the grid structure of the quartz crystal.

If you have been trying these, you should be able to understand how we may couple an AC voltage to a crystal matrix of vibration.
This shows how the electric test gear, and the calipers for vibration, can work together through the crystal lattice,
coupling two different forms of energy at a common frequency.

Product of Both

1.2394 mHz

This frequency will vibrate the squares against the triangles.
It is a rather nice feeling to feel the crystal vibrating against itself.
However if we use this frequency as the portal it will split the field into both grids on the crystal.
Set the caliper to 124.00 mm, place the crystal inside the gap, and feel this.
Set the F gen to 1.24 kHz or mHz touch the black wire to the crystal and feel it also.
[Prove to yourself that either method will raise the same vibration on the crystals.]

Erasing the Field in a Crystal

The most important tool to learn well, before you start programming crystals.
Many people will buy a quartz crystal because it speaks to them personally.
The ones from Arkansas, for me, have a very special feel to them, that I enjoy working with.
Many of these crystals also contain vibrations from the location in the earth where they were formed.
Realize that if you erase the program in one of your prized crystals, it will go dead.
The complex vibration system that was working in it, may be much too complex to rebuild.
I recommend using crystals that are "not special" for your first experiences with learning these techniques.

Find a crystal, that has no personal meaning for you, or one that you do not particularly like,
so there is nothing lost when it is erased.

Our goal is to begin to discover the techniques to change the fields stored inside the crystals

Math and Geometry

3350 Release Drawing

The 33.50 mm Erase Technique

A crystal can be erased by installing the background field frequency into it using 37.000 kHz.

333 kHz is everywhere, both inside and outside the crystal.
These two resonance fields are triangular shaped in nodal arrangement.

Fracturing Pattern:

333 / 37 = 9.0000000...
37 / 333 = 0.111111111...

For some reason this cross over of frequencies leaves the crystal dead.

Set the calipers to 33.3 mm and test the nodal pattern. I get a 60 degree triangle.
Set the calipers to 37 mm, I also get a 60 degree triangle.
Set the calipers to 90 mm [ 9 cm ], I also get a 60 degree triangle form.

Set your caliper to 33.5 mm, and if your crystal can slide inside it, this should do the trick,
Center the crystals center of mass at the center of the gap in the calipers and feel it vibrate up.

If the crystal is too large, you will have to aim the calipers end at the center of mass of the crystal then slowly move
towards then away from the crystal, until you feel resonance.
The nodes off the caliper extend linearly off the ends of the gap in a straight line, at the same distance apart as the gap.

Try to do it on all the flat sides, although this is usually not necessary if you hit the center of mass accurately.
You will feel the vibration peak at the correct distance. Then slowly move the crystal away from it.

37000 takes a series of  0.111111... out of the background field and sends it into the crystal to very tiny levels.
It also takes a 9.000000 and sends a strong string of 0's into the crystal at very tiny levels.
This scrambles the format of any other frequencies that have been set up in the triangular grid.

It also seems to crash the square programmed fields on the crystal.

Testing the Technique

Set the caliper to 64.72 mm, a square pattern, slide the crystal through it with the flat sides in alignment with the jaws.
Rotate the crystal to get all the flat sides you can, remove the crystal and feel it for a time.

The crystal now has a strong field on it.

Set the calipers to 33.5 mm, and repeat this.
Hold the crystal for a time and ensure it is now dead.
All the inner tension inside the crystal should now be released.

Alternatively you can use 37.00 mm and it also does a fairly good job.

Clearing Crystal Frequencies Geometrically

[These are the best choices for clearing crystals]

A Triangle of area [ 37000 sq cm ] is reduced geometrically by 4x area steps = frequency/4]
Side length is then calculated, and used for clearing crystals at many distances.
Triangle Side length reduces by 2x geometrically.

37000 cm squared
 = 37 kHz

Triangle Reduction

Side length =  sqrt (4 * Area / sqrt 3)
292.3146247... cm

Caliper Settings

2923.15 mm
1461.57 mm
730.79 mm
365.39 mm
182.70 mm
91.35 mm
45.67 mm
22.84 mm
11.42 mm
5.71 mm
2.85 mm
1.43 mm

Function Generator Frequencies


Clearing with Rotating Fields

In the chart above the fields produced will be stationary and triangular in format, thus to clear a crystal will take a lot of work running down all the sides edges and tip.
If we instead derrive a spinning circular field, it will clear all the angles at once as we move down the crystal, as it spins around the center of the crystal.

Find the diameter of a circle with an area of 37,000 cm

Area = pi r^2
Diameter = 2 * sqrt Area / pi
Diameter = 217.0480 cm

Diameter can be divided by steps of 2 for geometric reduction of 4x frequency

2170.480 mm 
1085.24 mm
542.62 mm
271.31 mm
135.66 mm
67.83 mm
33.91 mm
16.96 mm
8.48 mm

135.66 mm can be done on an 8" caliper and works well.
One pass down a crystal, at the correct distance away, and it's cleared!

Programming Quartz Crystal

 Portal to both matrix's:

Frequency Split Diagram

The frequency of the square inside the crystal is 2.176 kHz
Frequency of the triangle is 570 hz
The product is 1.2394 mHz ,
however testing shows the kHz frequency works well also.
The difference of the two is 1.606 kHz
The ratio between the two is 3.81754 which will also vibrate up.

These are the product, the difference, and the ratio between the two root vibrations, making 5 frequencies we can use.
All of these frequencies will vibrate up the crystal, but none of them will imprint a self sustaining field on it.

 Program the GL into the Crystals Triangle Portal

GL =  4.8195 cm
Caliper reveals this is a 60 degree triangle form.

333 kHz [background field]  /  4.8195 kHz [GL]  =  69.09430 kHz [IF]
69.09430 kHz [IF]  / 0.5696754 kHz [Crystal Triangle Portal]  =  121.287140 Hz [IF]

0.121287 cm
12.1287 mm
12.13 mm

This programming feels very nice!

Program the Ra into the Crystals Square Portal

Ra = 15 cm
Ra is a Square form

333 kHz [background field]  /  15 kHz [Ra]  =  22.2 kHz [IF]
22.2 kHz [IF]  / 2.175625 kHz
[Crystal Portal]  =  10.203964378 kHz [IF]

102.04 mm

A Large Field Around the Crystal

Set up an auric field around the crystal coupled to the background field.
333000 hz / 1239.4 hz  =   268.68 hz

Set the 300 mm calipers to 268.68 mm, set the crystal inside at the center.
The background field now splits, one side surrounds the crystal and the other couples to the inside of the crystal.

Remove the calipers and note the field around the crystal remains.

268.68 Photo

Palm the layers around the crystal, they are stratified like a Joe Cell.
The first layer is at the distance of the calipers shown above from the center of mass of the crystal.
Successive layers will reach out a very long distance away from the crystal.

Clear the Field

Set a caliper to 37.00 mm and hold it pointing at the center of mass of the crystal.
Move the distance so that the crystal meets the 2x distance off the end of the caliper gap.
Do this towards all the flat sides of the crystal, and move it closer then further away.
The field crashes, and releases the coupling to the background field from the outside of the crystal.

As an alternate you can set an F gen to 37 kHz and touch the black wire on all the sides of the crystal.

If the field remains in your head, you can use these tips.
150 Khz Hold the Black wire
Neo magnets held on the skull at different points until you feel a release.
You can do this on the crystal also, but often the problem will be found in the head.
Set the crystal further away and do not connect with it for a time.

Program the Ra Fractal into both Portals of the Crystal 


Ra = 150 mm = 15 cm

333 kHz [background field]  /  15 kHz [Ra]  =  22.2 kHz [IF]
22.2 kHz [IF]  / 1.2394 kHz [Crystal Portal]  =  17.91189 kHz [IF]

Set the F gen to 17.912 kHz touch it to all the flat sides of the crystal.
Alternately set the calipers to 179.12 mm, and set the crystal in the center, rolling it to all flat sides.

Confirm the field is present.
Set the calipers to 150 mm for sensing.
Palm the field and note there is a layer every 150 mm out from center of mass of the crystal.
The first will have the crystal at the center, with layers 150 / 2 = 75 mm out from it's center of mass.

Depending on the crystal mass, the layers may fill the room.
This one is pretty strong coming from both portals.
Hold it in a hand for a time, move the other hand closer then further to get the punch.

Clear the field.
Clear the head.

Making the field density higher
Ra = 150 mm = 15 cm
Ra is a square format resonance.
Area = 15 * 15 = 225 cm sq

333 kHz [background field]  /  225 kHz [Ra]  =  1.48 kHz [IF]
1.48 kHz [IF]  / 1.2394 kHz [Crystal Portal]  =  1.1941261 kHz [IF]

Set the caliper to 11.94 mm or F gen to 1.194 kHz
Program the crystal
Palm the crystal

Clear the field on the crystal using 37 mm
Clear the head

I love the way a large stack of neo magnets clears the head!

Points of Convergence

Lets examine closer the root frequencies of the crystal.

 Square  =  2.175625 kHz
[ The square may represent the electric field.]

Square Modifiers

Resonance on the square can be altered in two ways shown above.
On the left the linear side is increased by square root of 2, and the area becomes 2x larger.
This pattern will fit the crystal grid.

On the right a circle inscribes the square and the area of the circle increases by Pi / 2

We now convert the square to the larger circle by Pi / 2

2.175625 * Pi / 2 =  3.417463758 kHz

Triangle = 0.5696754 kHz

Hex Diagram

To convert the triangle to a hex form, we multiply the area by 6.
Frequency = 0.5696754 x 6 = 3.4180524 kHz

HEX and Circle Cross Couple


The two areas above, HEX and Circle are within 0.000588642 cm  / 2 =  0.000294321 cm.
If we average them by 1/2 the difference we may be able to fire up both with one length.
3.417463758 + 0.000294321 =  3.4177580 mm

3.418 kHz

34.18 mm

Creates Self Sustaining Field in the crystal.
Does not feel particularly good.

Use 37 mm to clear the field.

Lets see of we can modulate a GL over this one.

GL =  4.8195 cm
Caliper reveals this is a 60 degree triangle form.

333 kHz [background field]  /  4.8195 kHz [GL]  =  69.09430 kHz [IF]
69.09430 kHz [IF]  / 3.417758 kHz [Crystal Hex Portal]  =  20.216264580 Hz [IF]

.20 mm

If you can set your calipers this accurately, then aim them at the center of mass of the crystal, move slowly in and out, you will find where it vibrates up.
The field is self sustaining, with relatively high pressure, but the GL can be felt radiating from it to a good distance out in all directions.

Formula 2
In the last example we fudged the decimal point a bit, but even at this the length is too small to work with for most people.
We can do a different conversion that will provide results as well, because factors will still combine in all directions.
As well I will make corrections to the top line as kHz / kHz = Hz

333 kHz [background field]  /  4.8195 kHz [GL]  =  69.09430 Hz [IF]
 3,417.758 Hz [Crystal Hex Portal] / 69.09430 Hz [IF]  =     49.46512230 Hz [IF]  

.049 cm
.49 mm

What comes out of the crystal this time is about like an 8x GL in distance, but the field very close to the crystal is more dense.
One may be able to program crystals with feeler gauges!

For erasing this one you can add a .37 mm and it seems to work well.
Then give it a good once over from many directions with the 37 mm setting.
Then go clear your own head again if you are recreating the vibration on the crystal from memory of it on your body.

To be continued -
[We are only scratching the surface of the possibilities with Quartz Crystal programming.]

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