I know that my answer comes at least 3 years late, but I have learned about Ruby quite recently and I must admit that the literature sometimes presents (in my opinion) misleading explanations, even though one is handling a very simple problem. Moreover, I am (and was) surprised by such appalling phrases as:
"The best way to deal with this paradox, at least for now, is to ignore it."
stated by the author D. Black, and quoted in the question, but this attitude seems to be pervasive. I have experienced this tendency within the physics community but I have not suspected it had also spread through the programming one. I am not stating that nobody understands what is lurking behind, but it seems at least intriguing why not providing the (indeed) very simple and precise answer, as in this case there is one, without invoking any obscure words such as "paradox" within the explanation.
This so-called "paradox" (even though it is definitely NOT such thing) comes from the (at least misleading) belief that "being an instance of (a subclass of)" should be something as "being an element of" (in, say, naive set theory), or in other terms, a class (in Ruby) is the set containing all the objects sharing some common property (for instance, under this naive interpretation the class String includes all the string objects). Even though this naive point of view (which I may call the "membership interpretation") may help understanding isolated (and rather easy) classes such as String or Symbol, it indeed PRODUCES A CLEAR CONTRADICTION with our naive understanding (and also the axiomatic one, for it contradicts Von Neumann's regularity axiom of set theory, if someone knows what I am talking about) of the membership relationship, for an object could not be an element of itself, as the previous interpretation implies when regarding the object Class.
The previously stated problem is easily avoided if one gets rid of such misleading membership interpretation with a very simply minded model as follows.
I would have guess that my following explanation is well-known by the experts, so I claim no originality at all, but perhaps it was not rephrased in the (simple) terms I am going to present it: in some sense I am completely astonished that (apparently) nobody stated in these terms from the very beginning, and my intention is just to highlight what I believe is the basic underlying structure.
Let us consider a set O of (basic) objects, which consists of all the (basic) objects Ruby has, provided with a mapping f from O to O (which is more or less the .class method), satisfying that the image of the composition of f with itself has only one element.
This latter element (or object) is denoted Class (indeed, what you know to be the class Class).
I would be tempted to write this post using LaTeX code but I am not quite sure if it will be parsed and converted into typical math expressions.
The image of the mapping f is (by definition) the set of Ruby classes (e.g. String, Object, Symbol, Class, etc).
Ruby programmers (even though if they do not know it) interpret the previous construction as follows: we say that an object "x is an instance of y" if and only if y = f(x). By the way this tells us you exactly that Class is an instance of Class (i.e. of itself).
Now, we would need much more decorations to this simple model in order to get the full Ruby hierarchy of classes and functionality (imposing the existence of some fixed members on the image of the map f, a partial order on the image of the map f in order to define subclasses to get afterwards inheritance, etc), and in particular to get the nice picture that was interestingly upvoted, but I suppose that everybody can figure this out from the primitive model I gave (I have written some pages explaining this for myself, after having read several Ruby manuals. I may provide a copy if anybody finds it useful).