Condensed mathematics was invented in 2018 by Clausen and Scholze to act as a unifying framework for various branches of mathematics. As such, I aim to perform and motivate the construction of condensed sets. For this, I shall start with a topological space and look at specific maps to it. Using a few fancy terms (that I shall explain), this results then in a condensed set. On the way, I shall also highlight why condensed sets are well suited for group cohomology, the area in which my thesis question lies.