It is a fundamental branch of mathematical logic and a foundational theory in mathematics which was developed by .Georg Cantor and Richard Dedekind.

It is a well defined collection of distinct things such as numbers, letters, etc.

They are used to define a set.

It refers to each member of a particular set.

The following are the importance of Set Theory except:

It is a type of set that has no element.
Example: $$B=\left\{prime\ numbers\ between\ 11\ and\ 13\right\}$$

It is a type of set that is consists of a definite number of elements.
$$A=\left\{primary\ colors\right\}$$

Which among the following figures illustrate

UNION OF SETS?

Which among the following figures illustrate

COMPLEMENT OF A SET?

If Set P is a set of counting numbers less than 15, then what is the cardinal number of Set P?

It is a branch of mathematical logic that focuses on the study of mathematical structures within the context of formal languages. It explores how these structures can be described, classified, and understood by using the syntax and semantics of first-order logic.

It is a fundamental theorem for the model theory of classical propositional and first-order logic.

It states that every logically valid formula in first-order logic is provable within the framework of first-order logic. If a statement can be deduced from the axioms of first-order logic using the rules of inference, then it is logically valid.

It is a process that can reduce complex formulas involving quantifiers (like "for all" and "there exists") to simpler ones, making it easier to study models.

This is a criterion used to determine whether a given first-order theory has models of a specific cardinality (size). It helps determine the existence of models of certain sizes for a given theory.