Find an example of a commutative ring ? that contains a subset, say ?, such that for every ? ∈ ? we have ?? ∈ ?, but ? is not an ideal of ?. Find an example of a commutative ring A that contains a...

Find an example of a commutative ring ? that contains a subset, say ?, such that for
every ? ∈ ? we have ?? ∈ ?, but ? is not an ideal of ?.

Find an example of a commutative ring A that contains a subset, say S, such that for<br>every s E S we have as E S, but S is not an ideal of A.<br>

Extracted text: Find an example of a commutative ring A that contains a subset, say S, such that for every s E S we have as E S, but S is not an ideal of A.

Jun 05, 2022

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Find an example of a commutative ring ? that contains a subset, say ?, such that for every ? ∈ ? we have ?? ∈ ?, but ? is not an ideal of ?. Find an example of a commutative ring A that contains a...

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