So the: 1) inner circle of the matter knowledge= subtended arch 2)out of the center to find 1's own center as coming out=soddy circles 3)enter the circle nr 2 as =concentric circles 4) out of the circle nr 2 as the projective frontal=coaxal circles. So this defines the history of the Maya as their civilization was based totally on the circles inside circles as the other codex documents were burned by the Spanish priests as being dangerous to their own circle "illegal secrecy" and so they destroyed the Mayan mathematics of circles. . |
article: Henryk Szubinski
There are about 3 or 4 basic geometrical references to the functions of circles within circles in the Mayan civilization. The motion of 1 discipline of the Mayan sorcery of dreaming must have the completion with the change to the outer circle as the way to exit the relations with the sorcerers master. So the apprentice of sorcery enters into the inner circle without knowing that to balance the knowledge he or she must displace through the outer circle as the completion of the training of traditional Mayan sorcery. 1) inner knowledge gained as the matter of the center of the circle. 2) out of the center to find 1's own center as the 1st stage in coming out by the radius 3) in to circle nr 2 as the diagonal alignment. 4) out of circle nr 2 as being free from the duality of the circumference multiple 2. The basics of the 1234 as the reference to the types of "circles ( Mayan centers) and the types of inner circles as the "gods or kings" as the downfall of Maya by way of the various knowledge development as the types of geometry in use in the conflicts between them as the problems between the , 1) subtended arch 2)Soddy circles 3)concentric circles 4)coaxal circles as the clue to the "Mayan Kuxtal" as the written explanation of "of nature". or as the concentric circles. |
The article will deal with:
the 3 cycles ,of the above Mayan calendar cog wheel as the path of the rotating cogs.
are the basics of the :
1) concentric circles
2) the subtended angles and lines of the geometrical matter model.
3)soddy circles.
these are described following:
image, the telegraph
Mayan looking crop circle in Solsbury Hill : As was said to be the 2012 prediction.The structure is of the circle inside the circle as the same as the Mayan calendar cog system shown previously.
The facts of the circle inside the circle.
The model of every science is to have the material evidence in the center of the circumference as the observational evidence of the section on the circumference where the radius is linked to the matter as the " 1 of the 5 forces" as the diagonal defines the repeating of the experiments used as the diagram shown below. The unknown is that the image itself is enough to state scientific facts. The rule being that belief systems have no matter center and so their supportive arguments are that the circumference alone is enough.
In geometry, an angle subtended by an arc, line segment, or any other section of a curve is one whose two rays pass through the endpoints of the arc (or other object). ... For example, one may speak of the angle subtended by an arc of a circle when the angle's vertex is the center of the circle.
image below:
credit: theschoolrun
Mayan looking crop circle in Solsbury Hill : As was said to be the 2012 prediction.The structure is of the circle inside the circle as the same as the Mayan calendar cog system shown previously.
The facts of the circle inside the circle.
The model of every science is to have the material evidence in the center of the circumference as the observational evidence of the section on the circumference where the radius is linked to the matter as the " 1 of the 5 forces" as the diagonal defines the repeating of the experiments used as the diagram shown below. The unknown is that the image itself is enough to state scientific facts. The rule being that belief systems have no matter center and so their supportive arguments are that the circumference alone is enough.
In geometry, an angle subtended by an arc, line segment, or any other section of a curve is one whose two rays pass through the endpoints of the arc (or other object). ... For example, one may speak of the angle subtended by an arc of a circle when the angle's vertex is the center of the circle.
image below:
credit: theschoolrun
image credit: star worlds.
The use of the circle inside the circle as the way that the Mayans were looking for the center as matter proof of their theories.
The use of the circle inside the circle as the way that the Mayans were looking for the center as matter proof of their theories.
How many circles are in a circle?
Circle packing in a circle
Number of unit circlesEnclosing circle radiusDensity
11≈ 3.923...0.7148...
124.029...0.7392...
13≈ 4.236...0.7245...
144.328...0.7474...
the density on the right side of the tally, defines the matter center of the increased amounts of the circles in 1 circle.
What are circles inside circles?
as related to the Mayan cog use.
from:
http://www.malinc.se/math/geometry/dothisen.php
Soddy circlesGiven three circles that are mutually externally tangent to each other, it is always possible to construct two new circles that are tangent to each of the three circles. These two new circles are so-called Soddy circles. This is a special case of circles of Apollonius.
Start with a triangle and three tangent circles.
image from:
Wolfram mathworld.
Circle packing in a circle
Number of unit circlesEnclosing circle radiusDensity
11≈ 3.923...0.7148...
124.029...0.7392...
13≈ 4.236...0.7245...
144.328...0.7474...
the density on the right side of the tally, defines the matter center of the increased amounts of the circles in 1 circle.
What are circles inside circles?
as related to the Mayan cog use.
from:
http://www.malinc.se/math/geometry/dothisen.php
Soddy circlesGiven three circles that are mutually externally tangent to each other, it is always possible to construct two new circles that are tangent to each of the three circles. These two new circles are so-called Soddy circles. This is a special case of circles of Apollonius.
Start with a triangle and three tangent circles.
image from:
Wolfram mathworld.
concentric circles within circles as the Mayan "focus sense" of their perception of the universe and matter and nature.
image credit:
Wolfram mathworld.
image credit:
Wolfram mathworld.
from Wikipedia
Concentric circles.
In geometry, two or more objects are said to be concentric, coaxal, or coaxial when they share the same center or axis. Circles,[1] regular polygons[2] and regular polyhedra,[3] and spheres[4] may be concentric to one another (sharing the same center point), as may cylinders[5] (sharing the same central axis).
Geometric properties[edit]In the Euclidean plane, two circles that are concentric necessarily have different radii from each other.[6] However, circles in three-dimensional space may be concentric, and have the same radius as each other, but nevertheless be different circles. For example, two different meridians of a terrestrial globe are concentric with each other and with the globe of the earth (approximated as a sphere). More generally, every two great circles on a sphere are concentric with each other and with the sphere.[7]
By Euler's theorem in geometry on the distance between the circumcenter and incenter of a triangle, two concentric circles (with that distance being zero) are the circumcircle and incircle of a triangle if and only if the radius of one is twice the radius of the other, in which case the triangle is equilateral.[8]:p. 198
The circumcircle and the incircle of a regular n-gon, and the regular n-gon itself, are concentric. For the circumradius-to-inradius ratio for various n, see Bicentric polygon#Regular polygons.
The region of the plane between two concentric circles is an annulus, and analogously the region of space between two concentric spheres is a spherical shell.[4]
For a given point c in the plane, the set of all circles having c as their center forms a pencil of circles. Each two circles in the pencil are concentric, and have different radii. Every point in the plane, except for the shared center, belongs to exactly one of the circles in the pencil. Every two disjoint circles, and every hyperbolic pencil of circles, may be transformed into a set of concentric circles by a Möbius transformation.[9][10]
What are concentric circles placed on top of one another ?
See the side view.
from Wikipedia:
excerpt:
The word Teuchitlán is derived from Teotzitlán or Teutzitlán interpreted as "place dedicated to the divine", "place of the God Tenoch " or "place dedicated to the revered God".[2]
Possibly the city foundation goes back to the Aztecs, which erected it on a hill called Huachimontón, north of its current location.[2] It was founded by members of Nahuatlacas groups that developed central Mexico during the postclassical period, however it is known that buildings at Teuchitlán were built prior to such development. The creative culture that constructed "'Guachimontones"' is called Teuchitlán tradition, its apogee was between 200 and 400 CE, disappearing in about 900 CE, possibly before the arrival of the Anahuaca colonists.
Circular stepped-pyramid at the Guachimontones location known as 'Circle 2'
Concentric circles.
In geometry, two or more objects are said to be concentric, coaxal, or coaxial when they share the same center or axis. Circles,[1] regular polygons[2] and regular polyhedra,[3] and spheres[4] may be concentric to one another (sharing the same center point), as may cylinders[5] (sharing the same central axis).
Geometric properties[edit]In the Euclidean plane, two circles that are concentric necessarily have different radii from each other.[6] However, circles in three-dimensional space may be concentric, and have the same radius as each other, but nevertheless be different circles. For example, two different meridians of a terrestrial globe are concentric with each other and with the globe of the earth (approximated as a sphere). More generally, every two great circles on a sphere are concentric with each other and with the sphere.[7]
By Euler's theorem in geometry on the distance between the circumcenter and incenter of a triangle, two concentric circles (with that distance being zero) are the circumcircle and incircle of a triangle if and only if the radius of one is twice the radius of the other, in which case the triangle is equilateral.[8]:p. 198
The circumcircle and the incircle of a regular n-gon, and the regular n-gon itself, are concentric. For the circumradius-to-inradius ratio for various n, see Bicentric polygon#Regular polygons.
The region of the plane between two concentric circles is an annulus, and analogously the region of space between two concentric spheres is a spherical shell.[4]
For a given point c in the plane, the set of all circles having c as their center forms a pencil of circles. Each two circles in the pencil are concentric, and have different radii. Every point in the plane, except for the shared center, belongs to exactly one of the circles in the pencil. Every two disjoint circles, and every hyperbolic pencil of circles, may be transformed into a set of concentric circles by a Möbius transformation.[9][10]
What are concentric circles placed on top of one another ?
See the side view.
from Wikipedia:
excerpt:
The word Teuchitlán is derived from Teotzitlán or Teutzitlán interpreted as "place dedicated to the divine", "place of the God Tenoch " or "place dedicated to the revered God".[2]
Possibly the city foundation goes back to the Aztecs, which erected it on a hill called Huachimontón, north of its current location.[2] It was founded by members of Nahuatlacas groups that developed central Mexico during the postclassical period, however it is known that buildings at Teuchitlán were built prior to such development. The creative culture that constructed "'Guachimontones"' is called Teuchitlán tradition, its apogee was between 200 and 400 CE, disappearing in about 900 CE, possibly before the arrival of the Anahuaca colonists.
Circular stepped-pyramid at the Guachimontones location known as 'Circle 2'
comment Henryk S. To me it looks like the landing of the flying saucers that people have related to ancient civilization and peaceful contact with e.t beings.
However ,the structure of the pole in the center of the image as part of the pyramidal structure does remind me of some of the "Mayan factor data" that describes the "galactic beam alignment" of the concentric circles within other circles as the rule by which they are aligned upwards to the galaxies, stars and planets as the first type of "signal transmitter". from Wikipedia Name:Guachimontones archaeological site TypeMesoamerican archaeology LocationTeuchitlán, Jalisco Mexico RegionWestern Mesoamerica Coordinates20°41′41.68″N 103°50′9.93″WCoordinates: 20°41′41.68″N 103°50′9.93″W CultureShaft tomb tradition – Teuchitlán tradition LanguageNahuatl - Totorames - Cora language - Chibcha language Chronology300 BCE - 900 CE PeriodMesoamerican, Late Classical, Postclassical Apogee200 – 400 CE INAH Web PageGuachimontones archaeological site official web page |
Because the figures of the sorcerers and their circular power , each of the circular inner and outer were stars out there in "Mayan astronomy" as the sorcerers ruled over each for each sorcerer. So that the circles in circles defined their inner and outer reality and various colors of the stars they were what is defined as, "people from the stars" as in terms of being from them= out wards sorcerers view and the ,"to them= the sorcerers view of outside the circle.
Probably the Spaniards tried to keep this secret because their own belief system was based on 1 star in their history ,and so they destroyed all of the Mayan stellar male gods = sorcerers "pre ancient " definition.
Probably the Spaniards tried to keep this secret because their own belief system was based on 1 star in their history ,and so they destroyed all of the Mayan stellar male gods = sorcerers "pre ancient " definition.
Possibly, the way of perception of the Mayans in regards to the nature of the Amazon and nature as the whole in terms of the inner and outer references to circles could have been similar to the colors from modern cameras and their lens effects shown below as the camera has the circle inside the circle type of approach and the effects of the colors reflecting off the lens as the Mayan dreaming type colors and lights.
image from
oikonomia creative.
image from
oikonomia creative.