Prove that the characteristic of an integral domain is either zero or prime. (using contradiction)
I know I need to assume that the characteristic is not prime, but not sure how to go about that.
Any help appreciated,
Thanks!
Also, Prove that a finite ring R cannot have characteristic zero. Then deduce that every finite integral domain, (and consequently every finite field) has a prime characteristic.
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12-09-2010, 04:40 AM #1
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The characteristic of an integral domain help?
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