The Indivisible Aspects Theory with Redefined Zeros (IATRZ) is a proposed new framework attempting to integrate principles from mathematics, philosophy, and physics. It tries to offers a fresh perspective on zero, infinitesimals, and infinity, plausibly reshaping our understanding of the numerical system. In this new perspective, zero, infinitesimals, and infinity are intricately interconnected, forming a unity. Zero plays a vital role in the emergence of infinitesimals, which, in turn, contribute to the boundless expanse of infinity. The IATRZ system redefines zero as an indivisible component of every value, enabling a holistic comprehension of numerical values. Absolute zero becomes the neutral reference point, allowing for the evaluation and comparison of values. Infinitesimals bridge the gap between zero and finite values, revealing the continuous nature of numerical progression. Infinity represents the limitless potential and vastness of the numerical landscape, allowing us to explore the finest granularity possible. This proposed framework challenges traditional interpretations and invites us to explore the interconnectedness of numerical values.