Posts Tagged ‘consciousness’

Ascension of Polygon Consciousness

What: ascension.
Consider two or more points in a parametric field. When one of the points ascends to a vertical plane, the remaining points remain below the fundamental horizontal plane of the ascended point. If a line is stretched between those two points, a vertical (or semi-vertical) vector is formed. The simple awareness of the points, the field, the plane, and the higher point brings about “polygon consciousness,” which can only be observed after the ascension of the original point.
Why: polygons.
The aforesaid parametric field can hold more than one point, if the sum of all the points is less than weight (in grams) of the entire field. When one point ascends, the other points carry an equally opposing weight to the first point in the field. Whether the parametric field is measurable or not is of no concern to the second or third points. Therefore, polygon consciousness can only ascend when more than one vector, point, or plane descends.
How: conscious awareness.
When a falling object causes a vertically moving vector to lift (ascend), the downward moving object causes at least four points to move outward in a simple parametric field. Being conscious of the falling object in relation to the vertical vector almost always results in the complex awareness of a.) higher points, b.) opposing weights, and c.) ever-developing concern over the future measurement of both upward and downward moving objects. In the following image, there is a downward moving object with its shadow moving upward.

polygon ascension consciousness

polygon ascenscion consciousness

Although it looks like a button, one may wish to consider it as a “point” with an infinite number of surface vectors. Next to the upward-moving shadow, the ascension of the larger object (illustrated by the red diamond-shaped polygon) is apparent because its shadow is rapidly accelerating downward. Obviously, the only reason this happens is because both objects exist in the same field of consciousness, of “polygon consciousness.” Variations of the movements may be discussed in the future.


Tetrahedral Energetics and Consciousness

When energy condenses into a tetrahedral shape, fifteen directional electrons become sentient. Their consciousness appears almost instantly. The conveniently sentient electron bears no resemblance to the original tetrahedron (either polar, or nonpolar). This can be measured in certain instances: when at place of origin, when at place of source, and when below a linear plane. All together, these 15 electrons weigh less than three times the original weight of the tetrahedron. When the consciousness collapses on itself, these electrons tend to circulate outside the geometric shapes. Nevertheless, the original tetrahedral structure continues with its original sentience. Because clarification can be important, the following may clarify:

  • Observation: modal
  • Sentience: reciprocating
  • Conscious: yes
  • Beginning shape: tetrahedron
  • Penultimate shape: to be discovered
As mentioned in the “Stick Drawing on Stone Bark” allegory, multiparticle beams can sometimes be seen radiating away from the center, as long as proper measurements are taken. Measurement is only appropriate, in this instance, when the original count is skewed (i.e. greater than, or less than 15).

Absolute condensation of energy is not always necessary (if ever necessary). The consciousness continues to pervade the smallest particle whether or not measurements have been taken. This absolute condensation of energetic particles (of formerly driven – or – sometimes imagined systems) quite possibly drives the functioning of many sentient tetrahedral shapes, as long as the original structure is maintained foremost in a given theory. Conclusion: when modal observation is used to clarify sentient particles, counting of the original concepts of directional electrons may swiftly move in consciousness.