What is abelian group - Definition and Meaning

Abelian Group :

Let (G,*) be a group. If a,b belongs to G and a*b = b*a, then the group is said to be abelian or commutative group.


Formula :

a,b ∈ G a * b = b * a

Example :

{0,1,2,3,4,5,..} belongs to G, a=1, b=2. We have a * b = 2 and b * a = 2. So the given group is an abelian group.
Acute Triangle Abundant Number

Learn what is abelian group. Also find the definition and meaning for various math words from this math dictionary.


english Calculators and Converters


Sitemap