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I hope someone answers this question!  I'm a little confused about it myself. -Kristie
 
I hope someone answers this question!  I'm a little confused about it myself. -Kristie
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If a group is Abelian, it has the commutative property for all of its elements. So, if a and b are elements of S, and a*b=b*a for all a and b, then S is Abelian. * is the operation of the set such as multiplication or addition.
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Example: group of real numbers with addition as the operation:
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for all a and b, a+b=b+a, for example, 4+3=7=3+4.
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-Ozgur

Latest revision as of 09:32, 19 October 2008

Abelian: a commutative group, is a group satisfying the additional requirement that the product of elements does not depend on their order (the axiom of commutativity).

- from Wikipedia[1]-

Can someone provide me some good and clear example about abelian, just to ensure that I do really understand it. Thanks!~

--Mmohamad 18:37, 5 October 2008 (UTC)

I hope someone answers this question! I'm a little confused about it myself. -Kristie


If a group is Abelian, it has the commutative property for all of its elements. So, if a and b are elements of S, and a*b=b*a for all a and b, then S is Abelian. * is the operation of the set such as multiplication or addition.

Example: group of real numbers with addition as the operation: for all a and b, a+b=b+a, for example, 4+3=7=3+4.

-Ozgur

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