Graph Theory

Master the Nuts and Bolts of Graph Theory: the Heart of Communication and Transportation Networks, Internet, GPS, ...

Ratings 4.51 / 5.00
Graph Theory

What You Will Learn!

  • Master fundamental concepts in Graph Theory
  • Understand Eulerian and Hamiltonian paths and circuits. And many related topics to Paths.
  • Get to know a wide range of different Graphs, and their properties.
  • Be able to preform Elementary, Advanced Operations on Graphs to produce a new Graph
  • Understand Graph Coloring.
  • Know how to turn a Graph into a Matrix and vice versa.
  • Obtain a solid foundation in Trees, Tree Traversals, and Expression Trees.

Description

What is this course about?

Graph Theory is an advanced topic in Mathematics. On a university level, this topic is taken by senior students majoring in Mathematics or Computer Science; however, this course will offer you the opportunity to obtain a solid foundation in Graph Theory in a very short period of time, AND without requiring you to have any advanced Mathematical background.   

The course is designed to be understood by a 12th grader since the structure of the course starts with the very basic idea of how to create a Graph, and with each step the ideas get more and more complex. The course consists of several sections and in each section, there are video lectures where I explain a few concepts. There are quizzes (with solutions) after every lecture so you can test what you have learned in that lecture.


The structure of the course goes as following starting with the first section:     

  1. Supplements

  2. Fundamentals        

  3. Paths

  4. Graphs Types

  5. Trees

  6. Digraphs and Tournaments

  7. Planar Graphs

  8. Graphs Operations

  9. Graph Colorings


YOU WILL ALSO GET:

  1. Lifetime Access

  2. Q&A section with support

  3. Access on mobile and TV

  4. Certificate of completion

  5. 30-day money-back guarantee 

How are the concepts delivered?    

Each lecture is devoted to explaining a concept or multiples concepts related to the topic of that section. There are example(s) after the explanation(s) so you understand the material more. The course is taught in plain English, away from cloudy, complicated mathematical jargon and that is to help the student learn the material rather than getting stuck with fancy words. 

     

How to learn better?    

Take notes and repeat the lectures to comprehend the concepts more. Also, there are quizzes after every lecture so you can test what you have learned. 

Who Should Attend!

  • Mathematics or Computer Science students
  • Anyone interested in learning advanced Mathematics in an easy way

TAKE THIS COURSE

Tags

  • Discrete Math

Subscribers

8204

Lectures

67

TAKE THIS COURSE



Related Courses