The provided text explores the concept of incommensurability, specifically focusing on the square root of 2. The text outlines two methods for understanding incommensurability: a geometric approach that is intuitive but potentially less rigorous, and an arithmetical approach that uses logic and number theory to provide a more formal proof. The arithmetical approach is illustrated by the proof by contradiction, which demonstrates that the square root of 2 cannot be expressed as a ratio of two integers. The text argues that despite the emphasis on the arithmetical approach in modern mathematics, there is value in exploring the potential for combining geometric and arithmetical methods to gain deeper insights.