¶ Limit Case: Closest-packed Symmetry as Limit Case
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Limit Case: Closest-packed Symmetry as Limit Case:
“The closest-packed symmetry of uniradius spheres is the mathematical limit case which inadvertently ‘captures’ all the previously unidentifiable otherness of Universe whose inscrutability we call “space”. The closest-packed symmetry of uniradius spheres permits the symmetrically discrete differentiation into the individually isolated domains as sensorially comprehensible concave octahedra and concave vector equilibria, which exactly and complementingly intersperse eternally the convex ‘individualizable phase’ of comprehensibility as closest-packed spheres and their exact, individually proportioned, concave-in-betweenness domains as both closest packed around a nuclear uniradius sphere or as closest packed around a nucleus-free prime volume domain.”
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