There's more to space than mere distance. There is also the duality that finds expression and use in projective geometry. Consider two intersecting lines. The lines intersect in a point, and the point and two lines are in this sense equivalent. It would be fruitful at this point to examine the standard geometric entities of point, line, plane, circle, &c.
1 create an empty three dimensional space into which your mind's eye might peer.
2 posit a point in this space and imagine all the lines that pass through that point. The object made up of all those lines is called a 'pencil of lines', and it may variously be considered as containing the unifying point or not, as circumstances dictate. This is a more expansive notion of the duality as noted supra.
3 With this second geometric structure image it is more easy to see that there are two fundamental ways of defining any thing, a positive and negative definition, or specification: we may say either 'this thing' or 'not all these other things'.
we may also consider a line constructed of points, & associated with it the pencils of the points from which we composed it in our mental space.
Generally, the line is considered to be dual with a pencil of planes, each point contributing from its pencil only those lines which lie in a plane at right angles to the constructed line at the point under consideration. The image of this general form is the easiest to consider, but all the other lines in each pencil also lie in these fundamental 'normal' planes and form a system of skew planes also associated with the line.
Generally, the line is considered to be dual with a pencil of planes, each point contributing from its pencil only those lines which lie in a plane at right angles to the constructed line at the point under consideration. The image of this general form is the easiest to consider, but all the other lines in each pencil also lie in these fundamental 'normal' planes and form a system of skew planes also associated with the line.
one can generalize these notions to curved lines and various 3D surfaces. The idea is to take any object in one's mind and attach all the associated tangent lines and planes, the minimum necessary to grasp the image. Although normal and other intersecting lines and planes can be considered they are tangential to these purposes.
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External reality is, for human perception, a set of different massive objects defined by space. Space is the dual to mass and is negative as mass is positive. The occult fields unknown to mainstream science are likely operations and changes occurring in this negative space.
we have a hand upon which are placed some symbols and various glyphs. The glyphs are representations of the negative space associated with the hand considered apart from the rest of the body, which explains why it appears to be severed.
Consider your own hand for a moment and picture the associated geometric structures associated with its boundary in some real space. It is helpful here if you can already see finer detail in the extended human energy structure or if you have seen it and those finer details in the past, perhaps when under stress.
This field is what the various glyphs refer to and describe. If one does not easily see, or has not seen, these energetic structures, one may become cognizant of them relatively easily, especially when one has some general idea of what to look for.
One might attempt to see the fields surrounding one's own hand, or indeed of any object, in a dimly lit environment. It is useful here to focus one's vision on the boundary between an object and the air and to keep one's eyes in a state of focusing on the distance of the object; we are trying to see something that is not exactly matter, after all.
Consider a single outstretched finger. It is roughly a cylinder capped with half a sphere. From the tip of the finger there emanates a central axial line. Around that line there is a family of approximate paraboloids varying in what may as well be called density. This is the basic structure emanating from each fingertip. As one bends one's finger, curving the axial line, the family of paraboloids varies in response.
On the thumb, this basic structure is roughly delineated: We see the cone-like triangular issuance from the tip, and a spiral issuance portending from the joint in opposite direction to the material.
On the forefinger, the various spiral structure are shown as again developed at the joints.
On the middle-finger, the dividing third of five is the axial line as dividing the clockwise and counterclockwise depository spirals.
On the little-finger, the basic structure is again delineated, this time as ingress....
Consider a single outstretched finger. It is roughly a cylinder capped with half a sphere. From the tip of the finger there emanates a central axial line. Around that line there is a family of approximate paraboloids varying in what may as well be called density. This is the basic structure emanating from each fingertip. As one bends one's finger, curving the axial line, the family of paraboloids varies in response.
On the thumb, this basic structure is roughly delineated: We see the cone-like triangular issuance from the tip, and a spiral issuance portending from the joint in opposite direction to the material.
On the forefinger, the various spiral structure are shown as again developed at the joints.
On the middle-finger, the dividing third of five is the axial line as dividing the clockwise and counterclockwise depository spirals.
On the little-finger, the basic structure is again delineated, this time as ingress....
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