Discovering Goedels Incompleteness Theorem is definitely one of the most fascinating scientific adventures one can embark on. I apply it’s implications very loosely and creatively to make it fun.
It is about the stability of any system and also proof why a system cannot be supported by it’s own rules alone. Any system needs a superset of rules to stabilize but that brings the obvious conclusion that a rule-based system is a fractal of ever larger instruction sets.
It is also a fascinating evidence that the concept of God, who is basically a superset of ruleset that contain all subgroups, is a very logical conclusion to make.
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