In mathematics concepts, set theory is actually different from other topics of mathematics.
Georg Cantor was involved in the development of the idea. It is the process of mathematics
structure which is under one the vectors spaces and related to another element within the same
set. Cantor took the chance of introducing the new set which included the number of reality and
transfinite as well as the development of the rules through the axiom. Later, Russell exploited the
axiom of the unrestricted class which was first regarded as common equipment with the numbers
and theories of transfinite in the nature of mathematics.
Therefore, set theories deal with the future foundation system used by most of the
professors in equivalence of numbers. The set theory is also related to the mathematical analysis,
topology, and algebra and it mostly applied in the areas with infinite characters. The set theory
in mathematics usually uses the Venn diagrams, but most of the theory is also used in the
database programming as well probability situation. The set theory is also associated with the
field of mathematics in terms of proof and pivotal issues which initially shapes the concepts and
axiom of the notion of the set. Set theory also is involved in the modern techniques of the
mathematical issues. Additionally, set theory constitutes of the list of all members or items
(notation List), an element of the property (predicate notation) and rules of the items or members
(recursive rules).
Set theory is an important topic to the student because it facilitates the learning of the
Structured Query Language and assists in the designing and application development. The theory
also enables the programmers to establish the proper connection of software with the system and
is used in the data processing programs. In addition, the theory is useful in the establishment of
the principle of the transfinite induction and calculus of the numbers. However, it contributes to
the student learning more effective trough the potential understanding of the subject in
