Linear incidence geometry is perhaps one of the oldest subjects studied in Mathematics. It is concerned with configurations of points, lines, and hyperplanes that are given by incidence constraints. Despite the beauty of the proofs and the valuable insights that they offer to any geometer, this subject has been dormant for a while. This is because, in recent decades, new algorithmic approaches to verifying such theorems have been proven to be highly effective to the point that theorems of this kind can now be checked with minimal human input. However, a new set of questions has now arisen with Fomin and Pylyavskyy's Master Theorem, which not only gives a completely new approach to the subject by associating tilings of a surface to incidence theorems but also is a useful tool for proving and generating incidence theorems in all dimensions.