Learn the definition of a group – one of the most fundamental ideas from abstract algebra.

If you found this video helpful, please share it with your friends!

Educators dan Researcher in UTM

Learn the definition of a group – one of the most fundamental ideas from abstract algebra.

If you found this video helpful, please share it with your friends!

Filed Under: Teaching

- Perbincangan dalam kumpulan
- Group Discussion in my Modern Algebra Class
- Perjumpaan bulanan NC UTM
- Applied Algebra and Analysis Group (AAAG) Monthly Meeting
- BENGKEL WEB 2.0 FOR TEACHING AND LEARNING : SOCIAL MEDIA AND BLOG
- Sepetang di CTL
- Sepohon Kayu by UNIC (Gema Gegar Vaganza 2017)
- Modern Algebra : Factor (Quotient) Groups
- Modern Algebra : Cosets and Lagrange Theorem
- Modern Algebra : Direct Products/Finitely Generated Abelian
- Modern Algebra : Isomorphisms
- Modern Algebra : Permutation/Symmetric Groups
- Modern Algebra : Cyclic Groups
- Modern Algebra : Definition and Examples of Subgroups
- Modern Algebra : Some Properties and Proving involving Group
- Modern Algebra : Examples of Groups
- Modern Algebra : Definition of Group No. 4
- Modern Algebra : Definition of Group No. 3
- Modern Algebra : Definition of Group No. 2
- Modern Algebra : Definition of Group No. 1

Copyright © 2019 · Associate Child Theme on Genesis Framework · WordPress · Log in

We use cookies to ensure that we give you the best experience on our website. If you continue to use this site we will assume that you are happy with it.Accept

there are 4 basic operation: addition, subtraction, multiplication and division

definition of group:

set of elements

operation: * (binary operation)

closed under *

inverses: for all a element of G, there exist a unit of a^(-1) element of G such that a^(-1) * a= e = a * a^(-1)

identity,e: there exist a unit of e such that e*a=a*e for all a element of G

Associative: (a*b)*c=a*(b*c) for all a,b,c are elements of G

We understand all 4 basic operation

nice explaination