¶ Octahedron Model of Doubleness of Unity (2)
← Octahedron Model of Doubleness of Unity (1) | Octahedron as Model of Doubleness of Unity (3) →
Index Entry
Octahedron Model of Doubleness of Unity:
"-outing transformation. In both the octahedron and the icosahedron, each of the vertexes is tense-vector-restrained from escaping outwardly by the convergent vectorial strength of the system’s other immediately surrounding-- at minimum three-- vertexial event neighbors. But contrariwise, each of the octahedron’s and icosahedron’s vertex events are constrainingly impelled inwardly in an exact central-system direction and thence impelled toward diametric exit and inside-outing transformation; and their vertex events would do so were it not for their diametrically opposed vertexes, which are surroundingly tense-vector-restrained from permitting such outward egress.
"As a consequence of its uniquely unopposed diametric vertexing-- ergo permitted-- diametric exit, only the tetrahedron among all the symmetric polyhedra can turn itself pulsatingly inside-out, and can do so in eight different ways (see Sec, 624); and in each instance, as it does so, one-half of its combined concave-convex unity ‘twoness’ is always inherently invisible.
“The octahedron, however, restrainingly vector-blocked as described, can only infold itself pulsatingly to a condition of hemispherical congruence like a deflated basketball.”
