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30 Empty Relation

#Discretemathematics
Learn the Fundamental of Discrete Math as Discrete Math forms the basis of Computer Science.

Discrete mathematics is the study of mathematical structures that are fundamentally discrete rather than continuous.

Fundamental of Discrete Math – Set Theory, Relations, Functions and Mathematical Induction!
More than 1,700 students from 120 countries!
Discrete mathematics - types of relations reflexive symmetric transitive equivalence discrete mathematics math hindi urdu.

types of relations in discrete math which are #reflexive #symmetric #transitive and #equivalance #relation will be discussed in this lecture with examples in hindi urdu in discrete mathematics math in set thoery also we will learn directed graph and matrix representation of relations!.. take full course of discrete mathematics :.. truth table tutorial - discrete mathematics logic.
how to pass in discrete mathematics | importance and strategy | mumbai university.
syllabus of discrete mathematics...

Certificate of Completion for your Job Interviews!
By the end of this course, you will be able to define a set and represent the same in different forms;
define different types of sets such as, finite and infinite sets, empty set, singleton set, equivalent sets, equal sets, sub sets, proper subsets, supersets, give examples of each kind of set, and solve problems based on them;
define union and intersection of two sets, and solve problems based on them;
define universal set, complement of a set, difference between two sets, and solve problems based on them;
define Cartesian product of two sets, and solve problems based on them;
represent union and intersection of two sets, universal sets, complement of a set, difference between two sets by Venn Diagram;
solve problems based on Venn Diagram;
define relation and quote examples of relations;
find the domain and range of a relation;
represent relations diagrammatically;
define different types of relations such as, empty relation, universal relation, identity relation, inverse relation, reflexive relation, symmetric relation, transitive relation, equivalence relation, and solve problems based on them;
define function and give examples of functions;
find the domain, codomain and range of a function;
define the different types of functions such as injective function (one-to-one function), surjective function (onto function), bijective function, give examples of each kind of function, and solve problems based on them.
define and give examples of even and odd functions;
figure out if any given function is even, odd, or neither from graphs as well as equations;
define composition of two functions;
find the composition of functions;
define the inverse of a function;
find the inverse of any given function;
find the domain and range of the inverse function;
Understand the concept of Mathematical Induction and the logic behind it;
Learn to prove statements using Mathematical Induction;
Learn to apply Mathematical Induction in a Brain Teasing Real World Problem;
Understand the application of Mathematical Induction in Computer Program/Algorithm Correctness Proofs;
Learn to apply Mathematical Induction for proving a Result from Geometry;
Learn to apply Mathematical Induction for proving the Divisibilities;
Learn to apply Mathematical Induction for proving the sum of Arithmetic Progressions;
Learn to apply Mathematical Induction for proving the the Sum of squares of first n natural numbers;
Learn to apply Mathematical Induction for proving the Inequalities;
Learn to apply Mathematical Induction for proving the sum of Geometric Progressions.


course on Discrete Mathematics.

represent union an intersection of two sets, universal sets, complement of a set, difference between two sets by Venn Diagram; (Set Theory)
solve problems based on Venn Diagram; (Set Theory)
define RELATION and quote examples of relations; (Relations)
find the domain and range of a relation; (Relations)
represent relations diagrammatically; (Relations)
define different types of relations such as, empty relation, universal relation, identity relation, inverse relation, reflexive relation, symmetric relation, transitive relation, equivalence relation, and solve problems based on them; (Relations)
define FUNCTION and give examples of functions; (Functions)
find the domain, codomain and range of a function; (Functions)
define the different types of functions such as injective function (one-to-one function), surjective function (onto function), bijective function, give examples of each kind of function, and solve problems based on them; (Functions)
define and give examples of even and odd functions; (Functions)
figure out if any given function is even, odd, or neither from graphs as well as equations; (Functions)
define composition of two functions; (Functions)
find the composition of functions; (Functions)
define the inverse of a function; (Functions)

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