Proving a Product of Commutative Rings not an Integral Domain:

silvermane
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Homework Statement


Prove that if we have two commutative rings R and S and form the product R X S, then R X S cannot be an integral domain.


The Attempt at a Solution


We have that an integral domain is a commutative ring with 1 not= 0 and with non-zero zero-divisors.

==> (1,0)X(0,1) = (0,0), Thus it's not an integral domain.

I just want to make sure I'm doing this logically correct :)
 
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I think that pretty much sums up why RXS isn't an integral domain.
 
Dick said:
I think that pretty much sums up why RXS isn't an integral domain.

lol that's what I thought, just wasn't sure if i needed more!
It seems too easy... :P
 

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