The main part of this thesis presents the beginnings of mathematics from the periods of Ancient Egypt and Babylon to the Middle Ages. It mainly focuses on the issue of convergence and infinite divisibility of lengths, which were important problems in the history of mathematics. It addresses Babylonian square root calculations, Zeno’s paradox of the tortoise and Achilles in Greek mathematics, and Oresme’s proof of the divergence of the harmonic series. The introductory part is followed by a chapter discussing sequences and series for better understanding of the problems. The final part of the thesis touches on the modern concept of sequence and convergence in metric spaces.