2022 07 21
Say you have a 2-depth cube. The goal is to prove it has certain characteristics, but you don’t know what those characteristics are.
For simple purposes, the characteristics will be associated with only one of the eight inner cubes.
However, we also don’t know the characteristic of that particular inner cube.
It is easy to conclude that when we don’t know the characteristics, the measurement of the probability that the characteristic exists when it is observed will be far below 50%.
The question is, on grounds this simple, or much more complicated, how could unique characteristics be observed empirically, particularly genius characteristics?
It is a possible conjecture that some sort of deductive reasoning might be required, if probability fails.
…
I defined the existence of objects in the Loggo.
THEREIS APATH UNCERTAIN THOUGH WARIE
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