Joe Cell Matrix

Using The Joe Cell Matrix

Group 2 Joe Cell Matrix

With the square matrix of figure1 all line row, column and diagonal values = 255. No matter which way you add all the columns, rows or diagonals they will always add up to the single line value of 255. Also the 4 inner cells ( 51.0, 71.4, 56.1 & 76.5) all add to 255. The 4 outer most corners of the1st.outer ring (25.5, 86.7, 40.8 & 102) also add to the value 255. This function then creates a centre cross over the square/matrix when viewing only these associated values.

Other important functions of the matrix :

	Step Value = 5.1.
	Start Level = 25.5
	Line Value = 255
	Total Sum = 1020
	Options = 10 ( 4 x rows + 4 x columns + 2 x diagonals)
	Inner Ring = 255 x 1 = 255 (Centre)
	Outer 1st Ring = 255 x 3 = 765

Unbalanced Matrix

25.5	45.9	66.3	86.7
30.6	51.0	71.4	91.8
35.7	56.1	76.5	96.9
40.8	61.2	81.6	102

Balanced Matrix

25.5	81.6	61.2	86.7
96.9	51.0	71.4	35.7
91.8	56.1	76.5	30.6
40.8	66.3	45.9	102

figure 1

We normally don't use decimal placing in a square matrix, as nature does not use decimals or fractions of a whole. But in the matrix of figure 1 we are using a dimension value which was taken from an actual physically measure. Stainless steel piping comes in 'outside diameter' values very close to the values expressed in the matrix. I wanted absolute accuracy to allow others to understand or be able to modify from these values. If I where using physical material volume and not measurement math, I would use whole values in the matrix. I could still use integer or whole math by simply removing the decimal point of the matrix values and replacing the decimal point when I derive the new cylinder physical values from the matrix.

CYLINDER VALUES

If we use these values in a simple metric coordinate system we can apply millimetre suffix to these and can then apply them as the diameters, length and thickness of the cylinders. With hind sight, there are four cylinders in the Joe Cell, therefore there needs to be four (4) individual values, hence the matrix must be 4 x 4. Because we are also using volume (3D), each value must exist on both the X & Y planes, thus the reason why I believe we use the diagonal. I will try to explain further why I believe this X,Y, Z 3D functions the way it does at the end of this document.

DERIVING VALUES FROM THE MATRIX

Using the left diagonal from the matrix of figure 1 we have the values:

	25.5
	51.0
	76.5
	102

CYLINDER DIAMETER :

We can convert the above diagonal values directly to the metric coordinate system.
So the values now become :

	25.5 mm Dia.
	51.0 mm Dia.
	76.5 mm Dia.
	102 mm Dia.

CYLINDER LENGTH :

We now know the 'line value' of the balance square is 255. This can be used as the constant length of each cylinder which equals 255mm

So the value becomes :

255 mm length

CYLINDER THICKNESS :

The wall thickness of each cylinder (pipe) may be taken from the ratio of the diagonal values.
Starting from the smallest inside cylinder working out to the largest outer cylinder. That is 25.5/5.1 , 51.0/25.5 , 76.5/51.0 , 102/76.5
(See figure 2 below.)

Derived Values from matrix

figure 2

I guess you could try to average the above values an use them as a constant cylinder thickness.
(5 + 2 + 1.5 + 1.3 ) / 4 = 2.45 mm . I'm experimenting with a constant 1.5 mm thickness.

Most stainless steel pipe sizing and grades come with a constant ratio of thickness e.g. 1.5, 1.75, 2.0 an so on. You may like to try an experiment with different constants or you may use the above ratio if you desire. There is another ratio you could apply to derive the above cylinder thickness, but it brings in the hypothetical next cell value from the above square. (See figure 3 below.) The black border around the 127.5 value designates the hypothetical next diagonal cylinder value from a larger matrix.(larger matrix not shown.)

Derived Values from matrix

figure 3

If the constructor is using the hypothetical next cylinder value, this will give the cylinder ratio values as : 1: 51.0/25.5, 2 : 76.5 /51.0, 3 : 102/76.5, 4 : 127.5/102.0 [127.5 = hypothetical next cell value.] I have only mentioned the above hypothetical next cell value here in case people wish to try it ?

SUMMATION & FREQUENCY:

The Line value of the Matrix is 255.

	Inner Ring = 255 x 1 = 255
	Outer 1st Ring = 255 x 3 = 765

Total summation value becomes 4 x 255 = 1020
This value can be converted to the Hertz frequency :

1020 Hz

This cell might or at least should give out a frequency or pulse at 1020 Hz ?

Some one may like to check this frequency against the harmonics of the vehicles ignition coil. The now mathematically tuned cell may work better or worse with resonance of the ignition coil ?

CONCLUDING:

Using the values from the matrix of figure 1 we can tabulate the following:

Cyl.	O/Dia. mm	Len. mm	Thick mm	Inner/Vol. mm³
1	25.5	255	5	48116
2	51.0	255	2	442410
3	76.5	255	1.5	1081943
4	102	255	1.3	1978804

The Joe Cell matrix of figure 1 could have just as easily been worked out on volume. I leave this up to other people to experiment with the different values an matrices.... I hope the above matrix material is simplified enough for all people to understand. Please share your findings with all other people, and please don't forget to share your findings with me as well!...

Why use the left diagonal ?

As I believe the Natural order of the 3D universe is the balance of two forces (binary). The 3rd state could be the differential summation point, balance zero point or rest state of these two opposing forces. To have something exist it must be present on the X plane as well as exist on the Y plane (binary). When these two forces meet or combine by sum difference or force charge they force the third plane Z into existence. By two natural forces combining the energy must go some where, so it moves at any angle on the Z plane. So as I believe binary then becomes trinary (3D). This is also evident with matrices: as the X & Y plane move/intersect they create the diagonal Z plane. So we can then represent a frame of motion (matrix) on a 2D sheet of paper as a map of 3D. I therefore believe Prof. J.R.R. Searl may use the left diagonal for this reason also. There is also a mirror image-opposite of two triangle halves when balancing all matrices. Prof. Searl also uses many other functions and options from with in all matrices.

Points to Remember:

	If the input is random the output will be order. (As in the square in figure 1=255.)
	If the input is order the output will be random. (As in the unbalance matrix.)

In case people have not noticed, all square matrices have two triangle halves that make up the total square. The upper triangle is the mirror image-opposite of the lower triangle. The triangles usually separate along the left diagonal. This mirror image-opposite function is not always obvious with every matrix. When using any unbalance square matrix, the right upper triangle is always greater in sum value than the lower left triangle, until you balance the square matrix. You may not notice the mirror image opposite triangles first up as some matrices do not display this right away. You may like to view the sporting draw matrix for a better visualisation into the mirror opposite function. At times you may need to understand this mirror image-opposite function to be able to apply it in mapping a matrix to a reality system.

Distribution Rights.

People may use, distribute, copy, print or hyperlink the Joe Cell Matrix material as they so desire, provided they fully acknowledge the original copyright of the author G.D.Mutch along with the following persons below:

	G.D.Mutch Australia. [Joe Cell Matrix]
	J.R.R.Searl. England [Law of the Squares.]
	Joe Blow. Australia. [Whom ever he may be.]

Let us all work together for a cleaner more content world for all...

Good luck with your J-Cell...

G.D.Mutch [B.I.T]
Rockhampton Qld.
Australia.4701
Email : gmutch@bigpond.net.au