I've been watching multiple videos on the subject of Zeno's Dichotomy Paradox. Specifically, I have been looking into the paradox of halving distances. Where you continuously halve the distance from Point A to Point B an infinite number of times. In at least one or two of the videos I watched they showed a simplistic mathematics proof for the paradox.
Here's my question or dilemma. I've stumbled upon something that looks like Zeno's Paradox, in a completely unrelated problem. Could I use the same proof used in Zeno's Paradox to help my proof in this other problem? Or is Zeno's Paradox technically not considered to have a proven solution and therefore could not be used as part of the proof for this other problem?