This essay evaluates Hegel's claim that the phenomenon of time exhibits a quantitative logic in the context of a paradox concerning temporal presence. On the one hand, in time, the present always is. It seems that the very nature of time, assuming that it is really passing, requires us to assent to the continuous being of the present. If time is always passing, there must always be a present when the passing actually occurs and thus when beings actually exist. On the other hand, any particular moment of presence, as a point or an interval, immediately ceases to be or has not yet come to be. And, because of this, no delineated moment can be purely self-present. Conceived as an unextended point, presence would be nothing enduring of its own against time's passing, while, conceived as an interval, presence contains before and after within itself, meaning as an interval that is not actually present at once. The paradox is therefore that time's passing demands we think being present and presence as being, while being present, strictly speaking, seems impossible due precisely to that passing. Hegel claims to reconcile the self-same form of presence, a presence that always is, with continuous change under the category of quantity. However, I argue that the non-identity between the logical category and the phenomenon of time renders this reconciliation ineffective against the paradox, breaking down, more specifically, as it concerns the formation of a temporal magnitude. I evaluate alternative Hegelian interpretations for determining whether the irresolvability of the paradox proves problematic after all, arguing that the paradox in fact presents a significant problem for the conceivability of temporal existence.