Inspired by the Qur'anic parable of Al-Baqarah (2: 261) — a single seed producing seven ears, each bearing a hundred grains — and the tillering physiology of wheat (Triticum aestivum), this paper presents a structural framework for the Collatz conjecture based on a modular tree constructed analytically from the Collatz function. The tree is built level by level, where each level partitions all positive integers according to their residue modulo 2^k-1. This construction guarantees coverage: every positive integer appears in the tree. We show that the 3n+1 operation is a horizontal movement in the tree (does not increase level), while the n/2 operation is a vertical downward movement (decreases level). Since the tree levels are bounded and never increase, every integer eventually reaches the base level. We formulate the Depth Principle, which states that the deeper the tree level, the larger the accumulated divisor 2ᵏ. This accumulation, denoted as sₜ = sum v₂ (3nᵢ+1), eventually overcomes the growth of 3ᵗ when sₜ > t log₂ (3). This condition guarantees that every integer reaches a peak and then descends toward the cycle 4, 2, 1. The branching distribution follows the Fibonacci sequence (1, 2, 3, 5, 8, 13, 21, 34). This framework provides a consistent and strong structural proof for the Collatz conjecture, integrating scriptural metaphor, plant physiology, and number theory.
Ogin Sugianto (Wed,) studied this question.