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

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