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Learn how to make a genuine difference in your life by taking our popular An Introduction to Graph Theory Course. Our commitment to online learning and our technical experience has been put to excellent use within the content of these educational modules. By enrolling today, you can take your knowledge of An Introduction to Graph Theory to a whole new level and quickly reap the rewards of your study in the field you have chosen.
We are confident that you will find the skills and information that you will need to succeed in this area and excel in the eyes of others. Do not rely on substandard training or half-hearted education. Commit to the best, and we will help you reach your full potential whenever and wherever you need us.
Please note that An Introduction to Graph Theory provides valuable and significant theoretical training for all. However, it does not offer official qualifications for professional practice. Always check details with the appropriate authorities or management.
By completing the training in An Introduction to Graph Theory, you will be able to significantly demonstrate your acquired abilities and knowledge of An Introduction to Graph Theory. This can give you an advantage in career progression, job applications, and personal mastery in this area.
This course is designed to provide an introduction to An Introduction to Graph Theory and offers an excellent way to gain the vital skills and confidence to start a successful career. It also provides access to proven educational knowledge about the subject and will support those wanting to attain personal goals in this area. Full-time and part-time learners are equally supported, and the study periods are entirely customisable to your needs.
Once you have completed all the modules in the An Introduction to Graph Theory course, you can assess your skills and knowledge with an optional assignment. Our expert trainers will assess your assignment and give you feedback afterwards.
Show off Your New Skills with a Certification of Completion
The learners have to successfully complete the assessment of this An Introduction to Graph Theory course to achieve the CPD accredited certificate. Digital certificates can be ordered for only £10. Learners can purchase printed hard copies inside the UK for £29, and international students can purchase printed hard copies for £39.
Course Promo | |||
Graph Theory Promo | 00:02:00 | ||
Module 01: Supplements | |||
Textbook Recommendations | 00:02:00 | ||
Tools and Softwares | 00:05:00 | ||
Sets | 00:09:00 | ||
Number Sets | 00:10:00 | ||
Parity | 00:12:00 | ||
Terminologies | 00:07:00 | ||
Module 02: Fundamentals | |||
Introduction | 00:03:00 | ||
Graphs | 00:11:00 | ||
Subgraphs | 00:09:00 | ||
Degree | 00:10:00 | ||
Sum of Degrees of Vertices Theorem | 00:23:00 | ||
Adjacency and Incidence | 00:09:00 | ||
Adjacency Matrix | 00:16:00 | ||
Incidence Matrix | 00:08:00 | ||
Isomorphism | 00:08:00 | ||
Module 03: Paths | |||
Introduction | 00:01:00 | ||
Walks, Trails, Paths, and Circuits | 00:13:00 | ||
Examples | 00:10:00 | ||
Eccentricity, Diameter, and Radius | 00:07:00 | ||
Connectedness | 00:20:00 | ||
Euler Trails and Circuits | 00:18:00 | ||
Fleury’s Algorithm | 00:10:00 | ||
Hamiltonian Paths and Circuits | 00:06:00 | ||
Ore’s Theorem | 00:14:00 | ||
Dirac’s Theorem | 00:06:00 | ||
The Shortest Path Problem | 00:16:00 | ||
Module 04: Graph Types | |||
Introduction | 00:01:00 | ||
Trivial, Null and Simple Graphs | 00:10:00 | ||
Regular Graphs | 00:10:00 | ||
Complete, Cycles and Cubic Graphs | 00:10:00 | ||
Path, Wheel and Platonic Graphs | 00:11:00 | ||
Bipartite Graphs | 00:14:00 | ||
Module 05: Trees | |||
Introduction | 00:01:00 | ||
Trees | 00:14:00 | ||
Cayley’s Theorem | 00:03:00 | ||
Rooted Trees | 00:10:00 | ||
Binary Trees | 00:14:00 | ||
Binary Tree Traversals | 00:18:00 | ||
Binary Expression Trees | 00:09:00 | ||
Binary Search Trees | 00:19:00 | ||
Spanning Trees | 00:10:00 | ||
Forest | 00:07:00 | ||
Module 06: Digraphs and Tournaments | |||
Introduction | 00:01:00 | ||
Digraphs | 00:12:00 | ||
Degree | 00:09:00 | ||
Isomorphism | 00:08:00 | ||
Adjacency Matrix | 00:10:00 | ||
Incidence Matrix | 00:05:00 | ||
Walks, Paths and Cycles | 00:12:00 | ||
Connectedness | 00:05:00 | ||
Tournaments | 00:08:00 | ||
Module 07: Planar Graphs | |||
Introduction | 00:01:00 | ||
Planar Graphs | 00:10:00 | ||
Kuratowski’s Theorem | 00:14:00 | ||
Euler’s Formula | 00:10:00 | ||
Dual Graphs | 00:11:00 | ||
Module 08: Graph Operations | |||
Introduction | 00:01:00 | ||
Vertex and Edge Deletion & Addition | 00:08:00 | ||
Cartesian Product | 00:10:00 | ||
Graph Join and Transpose | 00:04:00 | ||
Complement Graphs | 00:05:00 | ||
Module 09: Graph Colourings | |||
Introduction | 00:01:00 | ||
Vertex Colourings | 00:05:00 | ||
Edge Colourings | 00:09:00 | ||
Total Colourings | 00:05:00 | ||
Assignment | |||
Assignment – An Introduction to Graph Theory | 00:00:00 |
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