If R is a commutative associative ring with neutral element. Then if R <mrow class="MJX

freakygirl838w

freakygirl838w

Answered question

2022-06-08

If R is a commutative associative ring with neutral element. Then if R | P is an integral domain a b R | P a = 0   o r   b = 0 , then 1 ? This is the only thing I can deduct from another proof, is this correct , or must I search for another reason?

Answer & Explanation

ejigaboo8y

ejigaboo8y

Beginner2022-06-09Added 29 answers

If 1 P, then since P is an ideal every multiple of 1 is in P, meaning P = R. R / R is the ring with one element, which apparently by convention is not an integral domain.
Mohammad Cannon

Mohammad Cannon

Beginner2022-06-10Added 4 answers

Thx

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