Explaining Why Z[-7] Is Not a Euchlidean Domain

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SUMMARY

Z[-7] is not a Euclidean domain because it contains irreducible elements that are not prime. Specifically, the elements 1 - √(-7) and 2 are irreducible in Z[-7], yet they do not satisfy the properties required for prime elements. This contradiction arises from the fundamental definition of Euclidean domains, where irreducible elements must also be prime. The multiplication of 1 - √(-7) by its complex conjugate further illustrates this point.

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ElDavidas
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I know this is a physics forum but I've got a quick question about a Euchlidean domain:

Assuming that [itex]1 - \sqrt {-7}[/itex]and [itex]2[/itex] are irreduclible, explain why[itex]Z[-7][/itex] is not a euchlidean domain?

This is a pure maths question and I've asked questions about other pure maths courses and got decent answers.

Thanks
 
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There is no h in Euclidean.

If Z[-7] were Euclidean, then in particular all irreducible elements would be prime. This leads to a contradiction.
 
Try multiplying 1-sqrt(-7) by its complex conjugate too.
 

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