It is a well-known fact in physics that classical mechanics describes the macro-world, and quantum mechanics
describes the atomic and sub-atomic world. However, principles of quantum mechanics, such as Heisenberg’s Uncertainty
Principle, can create visible real-life effects. One of the most commonly known of those effects is the stability problem, whereby a
one-dimensional point base object in a gravity environment cannot remain stable beyond a time frame. This paper expands the
stability question from 1- dimensional rod to 2-dimensional highly symmetrical structures, such as an even-sided polygon. Using
principles of classical mechanics, and Heisenberg’s uncertainty principle, a stability equation is derived. The stability problem is
discussed both quantitatively as well as qualitatively.
