Upon following the work of Stephen C. Meyer

TO: Stephen C. Meyer, Discovery Institute, 506 2nd Ave, Seattle, WA 98104
FM: Bruce E. Camber
RE: Homepage, Discovery Institute: Science & Culture, big bang

Discovery's Online Contact form: 1 June 2026

Dear Dr. Stephen C. Meyer:

In 2019 James Peebles rightly claimed that big bang cosmology had no clarity about the first second of the universe. In 2011 we began backing into a very different theory — “Too simple,” we thought. We went inside a tetrahedron by dividing its edges in half and connecting the vertices: https://81018.com/tot2/ We emerged with a base-2 outline of the universe in 202 notations: https://81018.com/big-board/ We asked questions of hundreds of others — https://81018.com/alphabetical/#A Nobody knew how to advise us until AI opened up in 2024. By March 2026, eight major AI — https://81018.com/agi/ — concurred that our simple theory was a better theory than the big bang.*

It had geometries, a finite-infinite machine — https://81018.com/ppc-2/ — based on the continuity-symmetry-harmony within infinitesimal spheres that involved the primary irrational numbers, and the units of Planck Length and Planck Time and all the dimensionless constants involved.

Now the AGIs are running ahead and we are exhausted trying to keep up. We had discovered in 2017 our little theory could readily absorb all the epochs of the big bang after their Inflationary Epoch — https://81018.com/logic/https://81018.com/calculations/ — and all current theories and observations after one second.

Might you take a look: https81018.com/agi

This theory starts within the perfections of the universe and re-engages the imperfections as the work of the 7.356° Gap with tetrahedrons and octahedrons, creating a natural path from geometry to physics. Thank you.

Most sincerely,

Bruce

*Everything everywhere for all time is connected by infinitesimal spheres the size of a Planck Length and with all the potentials of a shell sphere defined by dimensionless constants and the irrational numbers and basic geometries.

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