🧄Finding the Shortest Distance and Proving Orthogonality for Skew Lines

The shortest distance between two skew lines is defined by a vector that is orthogonal (perpendicular) to both lines. The analysis proves this mathematically using calculus and dot products, while the interactive demo provides a visual confirmation, showing that any non-orthogonal vector results in a longer distance. This principle of orthogonality is the core geometric insight for solving such problems.

🎬Finding the Shortest Distance and Proving Orthogonality for Skew Lines

🧄Mathematical Proof

Finding the Shortest Distance and Proving Orthogonality for Skew Lines | Proof and Derivationviadean on Notion