On the impossibility of an infinite chain in The Collatz Conjecture

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There are 2 versions of this paper. The newer is better... --- The Collatz Conjecture defines a number sequence constructed as follows: If X_1 is odd, then X_2 = 3X_1 + 1. If X_1 is even, then X_2 = X_1 / 2. The conjecture itself asserts that every such sequence, starting from any number, eventually reaches the number 1 (or, more precisely, the cycle 4-2-1). There are two hypothetical exceptions - either another cycle other than 4-2-1, or an infinite divergent sequence. In this paper, we will prove that the second option is impossible.

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