The study of groups from geometric viewpoint has recently become one of the focus of researches in group theory, which started with the Cayley graph. Later, the study grew through the years, leading to the definition of many graphs of groups and investigation of graphical properties of finite groups. This development exists due to the fact that groups can be profitably studied as geometric objects in their own right, since the geometry exists both in the group itself and in the spaces it acts on. This study basically shows how groups and spaces interact together, which helps in understanding the symmetries of much more complicated objects. In this thesis, the order product prime graph of finite groups is defined as the graph whose vertices ...