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The billiard table with a nowhere differentiable boundary is not well defined; the law of reflection holds a no point of the boundary. Denoting the Koch snowflake by KS, the billiard Omega(KS) is a canonical example of such a table and the focus of the talk. We will show that KS being approximated by a sequence of rational polygons and Omega(KS) being tiled by equilateral triangles both allow us to construct what we call a sequence of compatible periodic hybrid orbits. Under certain situations, such sequences have interesting limiting behavior indicative of the existence of a well-defined billiard orbit of Omega(KS). In addition to this, we provide a topological dichotomy for a sequence of compatible orbits. Other important properties and interesting results will be discussed, especially with regards to the possible presence of self-similarity in what we propose to be a well-defined periodic hybrid of the Koch snowflake fractal billiard Omega(KS). Finally, we will briefly discuss future research problems.