Important News Blog

Emphasis On Orbital Polar and Linear Space

admin — Thu, 26 Jan 2012 04:49:52 +0000

For the past few months, some study and effort may have gone into comparing orbital space and its trans-polar vectors. Many may be aware that space can occupy a plane; however, when orbital space occupies a non-polar plane, the mechanics of interaction may defer to one of the trans-polar vectors (usually the first or second one). Take, for example, the distance between the second and third vector. The measurement of the distance may be difficult to ascertain because orbital movement is constantly in motion. But once the measurement is made, this figure can be used to inversely calculate not only the width, but the vertical distance between the orbit and the vector. The following image may provide some clarity regarding these details.

non polar orbital space

What can be done with this information? Obviously, the initial measurements may not be of much use, but when one encounters a non-polar plane in conjunction with one or more vectors, the characteristics of such a plane can be compared with the details of this one! If an observer or an analyst creates an illustration based on the details of nearby orbital space and then compares it to the illustration, above, the results have the possibility of being overwhelmingly uncanny. Note the angle of the 3rd vector: it appears to be leaning towards the left. Actually, because the space occupied is in more than 8 dimensions, there is actually no leaning whatsoever. It is an illusion based on the perception of just two or three dimensions. That’s why this information is so interesting and important; it compares the normal dimensional perception with an enhanced “more-than-eight” dimensional model and shows the interrelationship between orbital space, vectors, and trans-polar modalities.

News on Textbook Selling and Vibrational Polygons

admin — Sat, 03 Sep 2011 19:48:48 +0000

An important new development has come to the forefront regarding polygons and textbook selling. Previously mentioned diagrams and specifications on the ascension of polygons make use of three kinds of polygons: vibrational polygons, specification-based polygons, and polygons resembling angles measured during textbook selling. When a textbook containing the list of diagrams and specifications is sold, any lists of diagrams and data sheets that remain intact usually consist of methods and protocols related to the measurement of frequencies (i.e. “measuring frequencies”). All frequencies can be measured during: 1.) the time an entity may sell textbooks, 2.) after the time a textbook is sold, or 3.) as a precursor to the sales of a textbook. Remember: a textbook may bear resemblance to a three dimensional polygon — 6 or more sides, curves, lines, and planes. These measurements may be made using dimensional instrumentation (universal non-local instrumentation can also be used, when required, as long as the instrumentation is used sparingly). When a frequency of 23 oscillations per second occurs at the same time a textbook is sold, then dimensional instrumentation is used to count the oscillations during the buying, selling, and recycling of books. At some point, the count of oscillatory vibrations may occur more than 22 times per second. That’s more than 1,320 times per minute! It is very important that one uses an accurately calibrated clock (or timing instrument) to ensure that the correct polygonal count is obtained. Counting vibrations can consume a lot of a mechanism’s time-specific resources, so “specification-based polygons” could be used in conjunction with the analysis. Note: only the most terrestrially based data can be analyzed using vibrational polygons during the time of textbook sales. Consider the following datum: The number of textbooks purchased at a given time and a given place when an entity sells three textbooks: 3. If oscillations are measured during a time of accelerated non-linear vibrations, the pattern becomes more and more like the vibrational polygons which are enhanced with non-local instrumentation. If acceleration continues, then the aforementioned textbook containing the original list of diagrams, specifications, etc., may be purchased, sold, or kept on hand for future consideration. Further studies and analysis may be conducted using journals, magazines, and newsletters if (and only if) the strongest oscillations are based on the first fundamental polygon. Reviewing the following table as well as this document may shed light on any frequency based calculations involving more than 23 oscillations per second:

universal mechanisms (polygon): 200/27.
polygon frequencies: 198/3.
sell textbooks during accurate measurement: frequent.
recycling of data during measurement count: always.

When all is said and done, this important development neither proves, nor disproves the relationship between vibrational polygons, non vibrational polygons, and selling textbooks. To accurately measure the distant and local oscillations, calibrated timing mechanisms are needed when dimensional instrumentation is needed to provide the strongest vibrational count. A textbook containing six or more polygons will not have the oscillations necessary to provide a vibrational count. Reflecting on previously discussed methods of measuring movement (movement = possible vibration), taking a snapshot of a ball during travel will show a snapshot of its momentum-based vector. While stationary, the at-rest ball remains in one place. While in motion, vibrational polygons may affect its movement as described during the previously mentioned events which include the buying and selling of textbooks.

Ascension of Polygon Consciousness

admin — Thu, 21 Jul 2011 18:20:17 +0000

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 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.

Secondary Escalation of One Dimensional Vector

admin — Fri, 01 Jul 2011 20:07:46 +0000

It is quite difficult to capture the primary escalation of a vector for use in an infinite detector diagram. However, capturing the secondary escalation of a one-dimensional vector is easy when considering parallel conformity.

When escalation is observed (as in the photo, above), less doubt is left to the imagination. In the future, an announcement may be made if additional photos are forthcoming.

Arranging Infinite Circles and Squares in Space

admin — Thu, 30 Jun 2011 18:49:08 +0000

When an infinite amount of squares, circles, and diagonal lines are gathered into a space, there will be an arrangement which becomes apparent. Suppose the given space is no larger than a sheet of paper. The squares and diagonal lines will seem to group near the center, as well as the edges. The circles, however, may appear to overlap the centermost diagonal line, forming a valley. Whether this valley is sloped, angular, or linear will depend on the quantity of diagonal lines, squares, and circles. Special attention that is given to the tangent formed where the circle touches the diagonal line always results in less-than-special attention simultaneously given to the other shapes. Conversely, if a finite amount of space is reduced, there exists the possibility that no tangent will be formed. One may wonder, “Where, and how, do triangles appear and disappear?” The answer to that is found on the edge of the space (assuming the space has more than two dimensions). Each edge cannot consist of only a linear shape; there must be triangles, squares, and diagonal lines all coexisting with the valley discussed earlier. Consider the case of two or more valleys occupying a single plane. Only subdimensional tetrahedrons will blend in nicely.

Subdimensional Tetrahedrons
Given that blue or red tetrahedrons can be grouped as parallel hedrons, it can be presumed that nonexistant tetrahedrons can only be compared to subdimensional tetrahedrons when the red and blue colors are combined, and then dissipated. When red dissipates, a pale red can remain. When blue dissipates, a violet color can consume the previously mentioned triangles (assuming they are gathered within a valley along side a tangential plane. If a red tetrahedral shape is animated in a space larger than a sheet of paper, a blue shape of the same dimension may also be animated, revealing the appearance of diagonal lines being reduced. Reduction always results in a centered point when balancing subdimensional tetrahedrons on an imagined terrestrial plane (linear or not!). The carryover from red, to blue, to triangular, to diagonal can be observed telescopically when non-linear distance needs to be maintained. Infinite amounts of diagonal lines no longer sublimate the triangular edges, red and blue tetrahedrons are no longer grouped, and edges are no longer needed when dimension ceases to exist.

Sentient Receding Forays

admin — Tue, 15 Mar 2011 20:25:18 +0000

When counting a sentient receding foray into the doorway of a sixty fifth galaxy, there is always the chance the foray may supersede an earlier event. If counting doorways are done sequentially, an advancement (or progression) can be made into the sixty sixth galaxy without the chance of negative results in a given dimension. Both galaxies can be equidistant from their centers regardless of non-sequential or sequential counting. For example, if a foray into a galaxy reveals 400 or more interplanetary objects, each object can be categorized as blue, yellow, white, tan, and the telltale interspace golden color. No negative result has ever occurred when a sixty sixth galaxy has been discerned, as long as counting is done in sequence, in a doorway. Adding one galaxy to another might only supersede the processed occurrence when an unambiguous method of counting (i.e. subtraction, division, addition) is used. Reconstructing the equidistant galactic centers can be done using material that can be shaped and molded with a minimal amount of pressure and a quick measurement of the material’s mass. These shapes and molds may then be counted and used during a future advancement into a galaxy with astounding results. Sentient receding forays become easy when done correctly, in accordance with space and interspace rules of physics. If by chance the golden color of space is revealed, then counting, advancement, and supersedence could occur frequently with no negative results. Only three minerals may be affected which seem to have no impact on a reconstructed galactic center. The three minerals found near the center have universal dimensions: tall, deep, folded in, and angled. The tallest dimension is measured in inches, the deepest dimension is measured in light years. Angled and “folded in” dimensions are measured by aligning the blue, yellow, and white centers.

Curvature of Stellar Cosmological Space

admin — Sat, 18 Dec 2010 04:58:46 +0000

Curvature of the stellar cosmological space conforms to inter-dimensional foundations. Overdeveloped curvature and underdeveloped tangential foundations consist of forms that only result in dimensional space analysis when certain standards are applied to the original cosmology. One may assume, “important space, dimension and curvature have intermediate textures as their foundation,” if no regard is given to non-conformist (relativistic) standards when applying thought processes to controlling the measurement.

Stellar dimensional space consists of:
a.) motion
b.) vacuum space
c.) lines and curves
d.) etheric dimensions
e.) countable dimensions

Fluid foundation without curvature consists of:
a.) lack of curvature
b.) foundation that is fluid
c.) foundation without curvature

When fluid foundation is extracted from the excess curvature of stellar cosmological space, an analysis of dimension may conform to some specific and relativistic standard when vacuum space, lack of curvature, and controlled tangential foundations are studied. If one refers to the following illustration (previously shown in the upcoming past lecture), the idea that space has intermediate textures that conform to relativistic standards becomes clear:

controlled tangential foundations

If one discerns parts of the above displayed illustration, a very odd fluidic motion becomes apparent. When reversed, curves become lines, angular dimension becomes etheric, and fluid changes into a textured dimensional foundation. Three colors are of utmost interest to those who explain their interest to displayed fields of time and dimension. The first color is red, the second color is yellow, and the third color is not currently named, as it has been previously unidentified. Simplistic views of this third color may follow.

Waves That Arrive May Pulsate

admin — Thu, 04 Nov 2010 17:29:42 +0000

Waves that arrive may pulsate. Waveforms in excess of 284 cubic meters in volume may encapsulate interior particulates by a special means of adhesion. When an adhesive wave manifests an apparition exceeding 284 cubic meters, new measurements are required to determine the wave and adhesion ratio vis a vis its interior particulates. All particles, by nature, demonstrate the state of being particulates. In this dimension, certain matter can be measured using quantitative particulate measurement. In the 5th and 7th dimension, adhesion waves become the prima facie method of measuring special particles. One may keep in mind that exceeding 300 cubic meters would result in qualitative, rather than quantitative, conclusions.

Using careful particulate-based apparati, the list of interior constructs becomes evident when adhesion between special particles is calculated. The previously mentioned cubic meter reference becomes non sequitur when operating in a dimension higher than 10 (e.g. the 11th dimension, the 32nd dimension, etc.). There is no place for cubic meters in some of the higher dimensions, as planar references are often used in both quantitative and qualitative particulate measurements. Often, the curvature of space will envelope both the first and second cubic meter in both the highest, and second-to-highest dimension when qualitative particulate measurements demonstrate their states of being. Building of sample adhesive waves requires a carefully considered understanding of particulate formulas, not to mention waves and cubic dimensions.

A final thought regarding the movement of the aforementioned waveforms: when sampled in an indeterminate space plane (either inside or outside the universe), some textbooks on adhesion waves might indicate travel both to, and from, their centers causing random confusion amongst the particles. This is sometimes remedied by using more accurate measurements. Intertwining more than 284 cubic meters with exterior particulates adheres to non-informative analysis when dimensions “11″ to “32″ are observed.

Transitional Linear Space Distance

admin — Sat, 16 Oct 2010 22:51:54 +0000

In a transitional expression of distant space, one cannot always expect linear dimensions to follow adverse, and inverse interpretations. Four hundred expressions are sometimes calculated when measuring distant space (considering the first fifty, followed by three hundred and fifty). Measuring a linear dimension in reversed space may produce the following:

a.) Results.
b.) Spacing of distance.
c.) Dimensional circular space.
d.) Insufficient results.

Further calculations are assumed when linearity is taken into consideration. Continuous movement is sometimes seen. When proximity limits the horizontal transitions, the adverse vertical transition would be considered.

Springed Helix Dimension Conference

admin — Sat, 28 Aug 2010 18:10:38 +0000

Announcement: During February’s event in year 4080 (Wednesday the 28th thru Thursday the 29th), the slideshow will not be presented at the springed helix dimension conference. Be aware that interdimensional conflicts may occur at any time during the years 4070 – 4090. Thank you.