Purpose – This paper proves the Collatz conjecture by revealing a hidden arithmetic structure in Collatz tree, inspired by the Qur'anic parable of Al-Baqarah (2:261): a single seed producing seven ears, each bearing a hundred grains. Design/methodology/approach – We build a Collatz tree — structurally analogous to the inverse Collatz tree — where a single seed expands into multiple branches. Using the forward Collatz function as a directed graph rule, every eventually reaches 1. The branching patterns resemble wheat tillering, and the nodes are labeled A–H (Fibonacci: 1, 2, 3, 5, 8, 13, 21, 34). Starting from the Collatz tree, we trace a single odd number to generate an odd-number sequence. Reducing the problem to odd numbers allows us to extract and analyze odd-only sequences from the tree. Proving convergence for these odd sequences then suffices to establish the Collatz conjecture for all positif integers. Findings – The constructed Collatz tree successfully covers all positive integers. Every integer, when processed through the forward Collatz function, eventually reaches 1 after a finite number of steps. The analysis confirms that the only cycle is 4→2→1 and that no divergence occurs. Additionally, the tree structure naturally generates odd-number sequences that obey the recurrence , which aligns with previously established results (Lagarias, 2010). This alignment serves as validation of our tree construction rather than a claim of novelty. Originality – This paper integrates three distinct domains: the Qur'anic parable of Al-Baqarah 2:261 (1, 7, 100), the tillering physiology of wheat, and the Collatz conjecture. The discovery that Fibonacci branching governs both wheat tillering and Collatz trajectories reveals a hidden arithmetic order. This interdisciplinary approach offers a novel proof of a nine-decade-old open problem.
Ogin Sugianto (Sat,) studied this question.
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