GET THE TWO MENTIONED TABLES

By Robert Norman Kruse
2nd May, 2025

Don't forget to request Table "I" and Table "II" which are both mentioned in the Compendium Document.

Table "I" shows the coexistence (and counts) of uni-factored number patterns at several factorization levels for constellation "k" sizes going from "1" to "6" inclusive.  This shows that the basic counting function of the Kruse Super Sieve can accurately keep track of the concurrent factorization of number patterns.

Table "II" shows that the uni-factored numbers within any sized template segment (reclassified as remainders modulo (the size of the template segment)) exactly match the remainders obtained by dividing the uni-factored numbers within the associated target segment by the size of this same template segment such that there is always a one-to-one correspondence between these two separate sets of remainders as to the uniqueness, count and magnitude of all of these remainders.  This shows that the basic counting function of the Kruse Super Sieve does work correctly when using the simplified pseudo multiplications and the short-cut math to count number patterns.

You can get both of these two tables plus several other documents via the Adobe cloud storage system.  See the endnotes section of the Compendium Document for more.

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Related Updates

  • MEDIA UPDATE NOW AVAILABLE published on 6th January, 2025
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  • SECOND EDITION NOW AVAILABLE published on 1st February, 2025
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