Gives a comprehensive definition of Common Isolates. Proposes their accomodation in the pre-first octaves of arrays. Dis-tinguishes between anteriorising and posteriorising common isolates. The latter are shown to be possibleonly in the first-order-arrays of a facet. Gives tentative schedules of common isolates of Time, Space, Energy and Matter. Introduces the Level Idea in Time and Space. Refers to a new starter of round. Concludes with the end for a study of Abstract Classification.
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