The book deals with Axiomatic Systems taught at the tertiary level. The subject matter is presented in 7 chapters followed by a short bibliography and alphabetically arranged index. The first 2 chapters offer pre-requisites starting from number system and set theory. The next 2 chapters deal with mathematical logic, truth tables and history of various finite geometries, especially those of Fano, Pappus and Desargues. Some basic properties of Axiomatic...