THE PROOF OF THE ABC CONJECTURE
The such parameterization we have infinitely many, but for each ε>0, there is n₀ natural number such that when parameters are greater than n₀, then the inequality c<(rad(abc)^(1+ε) is true and when parameters are less than n₀, then there are only finitely many parameterization's such that there are only finitely many triples of (a,b,c) for which the inequality c<(rad(abc)^(1+ε) is false, therefore the ABC conjecture is true.
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