## SQUARE (third part of number four)

Chapter 38

**SQUARE
**

**(third part of number four)**

When we want to accomplish a project, we know that a good prearragement is needed. Same thing is in this kind of geometry. by the way, we acquire new experiences which are useful for another kind of projects and that we can easily notice that int his way, step by step, and in particular phases of preparation, and especially in final process in which dana „rises“ by itself. It is always good to repeat the laws of this geometry where the only tools are compass and ruler without measures, whatever it sounds boring after 2000 pages of drawing sequences and sequences of innovations which were neglected by classical geometry. Because of that there are „insoluble“ enigmas, ambiquities, which are missed in related parts of natural sciences, and especially in physics, so I decided, at the end of this chapter, to dedicate beginning of one way (same way) in the form of concretely ideas of physical nature which I, long time ago, carried into effect. This time a bit modified, simplier and more purposeful, because this geometry, its spirit, spreads viewpoint endlessly. Furthermore, and because of the man who lost his life defending his circles, the man who, nowdays, would be greatest geometric and physicist with all today’s technology – and who was, believe or not, thrown out of physics books – Archimedes. Let’s repeat laws of sacred geometry:

- circle of some radius divides by circles or semicircles
- basic circle is a mirror of all intersectiones, junctions inside and outside itself and on its arc
- no marking with numbers or letters

Regarding „human factor“, we must not be lazy to draw so called „base“(preparation) which is always present, because we can „digress“on the way of unnatural geometric acrobatics, as I called it. Experience tells me, because of 2000 pages I wrote are just one tenth of what I draw in past two years. So, dedicate to continuation of square.

We will repeat, step by step, construction of „base“ to remember it. Circle of some radius divided by circles of same radius on 6 parts.

Division of divisional circles from its external intersectiones (with same radius).

With same radius from external peak poles of divisional circles. So, we divided even them on its 6 parts.

Now, in range of compass take outer intersectiones of divisional circles. (we describe them with a circle of its radius).

With that radius we divide it from intersectiones of divisional on its 6 parts.

With same radius continue division from 6 poles oft he first (basic) circle. Perform division by semicircles to the rim of divisional circles – to their external poles.

With same radius from external poles of divisional but just inside basic circle.

With that division, and with that radius we got intersectiones of different radius outside the arc of basic circle. Describe them…

…with that radius, and from two peak poles (opposite) describe semicircles just to the rim of divisional circles.

On the arc of basic occures two intersectiones of 90° in regard to two opposite peak poles of the same, and on the rims semicircles meets – quadrifoil rounded star polygons (of basic and circumferential circles)

In the range of compass take first radius –radius of basic circle and from 4 poles n (two horizontal opposite poles)

Then from two peak poles describe circles. We got quadrifoil star polygon of different radius (first outside basic, made by formation hexagonal star polygons).

Finish „foundation“ rectilinear, with division of basic circle on 8 parts with ruler without measures. Conceptualized „foundation“ helps us. So, “foundatoin“ is the base for getting sequences of data, and we will decide for quadrifoil way with certain aim. – essential elements.

First is one of basics, descriptive square of basic circle with perimeter of 4d (diameters) of basic. (Inscribed circle is the basic circle of starting radius).

Second descriptive square is inside basic circle, and emerges between construction of hexagonal star polygons and lines – diagonals of descriptive square of basic circle. Inscribe the circle.

Now, we will describe just inscribed circle. By diameter. Divides it on 10 parts.

By diagonals of descriptive square – 14 parts. What is the result? Size of every square’s diagonal is diameter of basic circle divided with 10 x 14 (diameter is size of square’s side) I am sorry for Pythagorean doctrine, but it was counted int his way.

I am sorry for those who were trying to find number called Pi or ancient Hebrew Pi = doors. The rim of descriptive circle is 44 parts. So; 44: 14 =3, 1428571 (three entire one seventh) = Pi () or 3d + d

Whole system of foundation has such 40 peaces, what matches descriptive square of basic circle or its perimeter (if we analyze it further we would come to duality of square and it leads to dubled cube – but it is another theme – maybe once?)

Than, what does data or 8 steps to the basic internal square (Bible – Ezekiel) tell to us? First external- descriptive square of basic circle. Next square – the square quadrature of basic circle ( divided with 14 times 11 and second root 0 side of square quadrature of basic circle. Third step – perimeter of circle. As square. And shown square. Square surface of the side of basic circle’s radius (we didn’t analyza other steps because they are a bit demanding for now).

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Closing word:

This whole geometric way is necessary to get to relevant dana, and foundation itself contains sequences of other ways and other dana but we derived a few:

- size of diagonal of each square
- perimeter of descriptive circle of descriptive square = 4 diagonals of the same
- perimeter of basic circle = 4 diameters divided with 14 x 11
- value of number Pi = perimeter of descriptive circle of descriptive square of a circle with some radius divided with its diagonal = Pi
- square quadrature of basic circle (its quadrature or quadrature of circle. divided with 14 x 11 and second root oft hat sum = side of square quadrature of circle and a few geometric relevant elements.

It would be enough, for now, to see benefits oft his geometry, added to this, step by step with compass and ruler without measures. Can’t it be admitted that this geometry complements existing „geometric knowledge“ if not brings new. Existing, of our human civilization, because all this belongs to universal – natural, since universum exists. It looks like it comes to our human vanity. Because, who is like us ? (now)

Addition:

As I already mentioned, first step of civilizational revision is double spin. Even this spirit of „sacred geometry“ belongs to physicis. Third dimension – act. We will start with a little construction in the 90- ies, an experiment (patent- Ch). It will be preface to a way which is related to eld (especially to Archimedes or his „rehabilitation“. At issue is the ordinary air heater, known as „calorifer“. Propeller that pushes the air through „curtain“ of heater’s static spirals. The air is heating passing through spirals. Logical, efficiency is low, because the spirals are rare or „hollow“. An idea was „whirpool“. How? Embed spirals on the propeller and supply them with electricity through the rings and brushes. Small intervention, with an idea that time of heating is longer therefore efficiency is bigger. Sincerely, I don’t know where itended, but it doesn’t matter. I have right to publish that, but also a few new ideas which I hand to people to experiment (because physics is experimental science, and I don’t have neither will or time and resources to experiment, and my years, 62, tells the same). So, I can publish possibilities and anyone can try it. Here will be discussed abut improvements with the aim of increasing the efficiency, and step forward to double spin and other from the area of physics.

Explanation of experiment:

1. Propeller and spiral, heated with electricity, on the same axle in the same spin direction

2. A bit complicated (I explain on popular simple language). Spinning of propeller and spirali n the same direction. Difference is that with a help of transition, spiral speed is bigger, and power supply of spiral is with collector on the axis of rotation (brushes and rings).

3. Same system, but transition of spin is inverted. Propeller for inflow of the air rotates in one direction, and heating spirals in opposite direction.

As physics is an experimental doctrine, that sreves purposeful to mankind, it is valuable to experiment and find optimal solutions on the basis of existing possibilities. Finally, every cognitionis useful for us, on this planet. It is exactly what may bring useful discoveries (we will find out more in supplements to next chapters. We shouldn’t hide them egotistically for some future times, but globally implement into action. We have no clue how many things are there to create. To come to the level of universal principles of the universum, and not hide it because of various reasons. Have we not learn anything from the history?As it is now, if I were an alien, I wouldn’t want to have anything with the mankind.

HR- RIJEKA 19. 10. 2012.

AUTHOR: TOMO PERISHA

WEB: SLIM

TRANSLATION : VESNA BILIĆ (vesnasu@live. com)

MANUSCRIPT: SUZANA KNEŽEVIĆ (suzanaknezevic58@gmail. com)

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