In mathematics, a transfinite set is a set with an uncountable infinite number of elements. But what happens when you add a paradoxical twist to this concept?
Meet the Set of All Possible Outcomes, where every possible outcome is not only possible, but inevitable. This set contains all possible transfinite sets, including the set of all possible outcomes.
But wait, it gets weirder. The Set of All Possible Outcomes contains a subset of all possible paradoxes, including the Liar Paradox, the Barber Paradox, and the Grandfather Paradox. But which one is the real paradox?