Please discrete mathematics per bhi video banaaiye.... Formal logic- Statement, Symbolic Representation and Tautologies, Quantifiers, Predicate validity, Propositional logic. Semi groups and monoids, Relations and ordering. Functions definitions and examples of semi groups and monoids (including those pertaining to concatenation operation). Homomorphism of semi groups and monoids. Quotient subgroups, sub semigroups and sub monoids. Direct products. Basic Homomorphism theorem. UNIT-II Lattices: - Lattices as partially ordered sets. Their properties. Lattices as Algebraic systems. Sub lattices, direct products and Homomorphism complete, Complemented and distribution lattices. Boolean Algebras:- Boolean Algebras as lattices. Various Boolean identities. The switching Algebras examples. Sub Algebras. Direct products and Homeomorphisms, Join- irreducible elements, Atoms and miterms, Boolean forms and their equivalence. Minterms Boolean forms. Minimization of Boolean functions. Application of Boolean Algebras to switching theory (usj and, OR and not gates).The karnaugh map method. UNIT-III Graph theory: Definition of (Undirected) graphs, Paths, Circuits, Cycles and Sub graphs. Indeed subgroups... Degree of vertex. Connectivity. Planner graphs and their properties. Trees. Euler’s formula for connected planar graphs complete and complete Bipartite graphs. Non Planer graph Kuratoueskis theorem (Statematonly). Spanning trees. Cut sets, Fundamental cut-sets, and Cycles. Minimal spanning trees and kruskal’s Algerian. Euler’s theorem on the existence of eulerian paths and circuits. Directed graphs. In degree and out degree of a vertex. Weighted undirected graphs, Dijkstra’s Algorithm. Strong connectivity and marshal’s Algorithm. Directed trees. Surch trees. Tree traversals. UNIT-IV Introductory computability Theory - Finite state machines and their Transition Table Diagrams. Equivalence of finite state machines. Reduced machines. Homomorphism. Finite Automata. Acceptors. Non- deterministic Finite Automata and equival ends of it are power to that of Deterministic Finite Automata. UNIT-V Phrase structure Grammar. Rewriting Rules. Derivations, Sentential forms. Language generated by a Grammar. Regular context - free, and context sensitivity Grammars and Languages. Regular sets, Regular expressions and pumping Lemna Kleene’s Theorem stamens.
Shukriya bhai bahut hi acche tariqe se samjhaya aapne
Thanks a lot !!!
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Sir can u please explain reiz lemma
Please discrete mathematics per bhi video banaaiye....
Formal logic- Statement, Symbolic Representation and Tautologies, Quantifiers, Predicate
validity, Propositional logic.
Semi groups and monoids, Relations and ordering. Functions definitions and examples of semi
groups and monoids (including those pertaining to concatenation operation). Homomorphism of
semi groups and monoids. Quotient subgroups, sub semigroups and sub monoids. Direct products.
Basic Homomorphism theorem.
UNIT-II
Lattices: - Lattices as partially ordered sets. Their properties. Lattices as Algebraic systems. Sub
lattices, direct products and Homomorphism complete, Complemented and distribution lattices.
Boolean Algebras:- Boolean Algebras as lattices. Various Boolean identities. The switching
Algebras examples. Sub Algebras. Direct products and Homeomorphisms, Join- irreducible
elements, Atoms and miterms, Boolean forms and their equivalence. Minterms Boolean forms.
Minimization of Boolean functions. Application of Boolean Algebras to switching theory (usj
and, OR and not gates).The karnaugh map method.
UNIT-III
Graph theory: Definition of (Undirected) graphs, Paths, Circuits, Cycles and Sub graphs. Indeed
subgroups... Degree of vertex. Connectivity. Planner graphs and their properties.
Trees. Euler’s formula for connected planar graphs complete and complete Bipartite graphs. Non
Planer graph Kuratoueskis theorem (Statematonly). Spanning trees. Cut sets, Fundamental
cut-sets, and Cycles. Minimal spanning trees and kruskal’s Algerian. Euler’s theorem on the
existence of eulerian paths and circuits. Directed graphs. In degree and out degree of a vertex.
Weighted undirected graphs, Dijkstra’s Algorithm. Strong connectivity and marshal’s Algorithm.
Directed trees. Surch trees. Tree traversals.
UNIT-IV
Introductory computability Theory - Finite state machines and their Transition Table Diagrams.
Equivalence of finite state machines. Reduced machines. Homomorphism. Finite Automata.
Acceptors. Non- deterministic Finite Automata and equival ends of it are power to that of
Deterministic Finite Automata.
UNIT-V
Phrase structure Grammar. Rewriting Rules. Derivations, Sentential forms. Language generated
by a Grammar. Regular context - free, and context sensitivity Grammars and Languages. Regular
sets, Regular expressions and pumping Lemna Kleene’s Theorem stamens.
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Nice explanation along with cute animation and beautiful colors!😍
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Thanks for expressing your feelings
can't x be belong to real number?