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A json-conjecture hypothesizes that proving the number of platonic forms to be infinity^infinity in number proves that math is real.
An injecture is the surface-area of the Vikaasian limit.
The json-conjecture is an injecture.
Proving the number of platonic limits to be uncountable would prove math is real.
A postulation that the number of platonic forms being uncountable is the last falsifiable statement in mathematics.
Json conjecture = injecture.
If the number of json-conjectures (platonic forms) is proven to be uncountable; mathematics will have been proven real.
A postulation that the number of platonic forms being uncountable is the last falsifiable statement in mathematics.
Json-conjecture = injecture.
If the number of json-conjectures (platonic forms) is proven to be uncountable; mathematics will have been proven real.