Answer to Question #276147 in Abstract Algebra for medyl

Consider the ring "(\\R,+,\\cdot)" of real numbers. Let "A=\\mathbb Q" be the set of rational numbers. Since for "a,b\\in\\mathbb Q" we get that "a-b\\in\\mathbb Q" and "a\\cdot b\\in\\mathbb Q," we conclude that "(\\mathbb Q,+,\\cdot)" is a subring of the ring "(\\R,+,\\cdot)." On the other hand, for "\\sqrt{2}\\in\\R" and "1\\in\\mathbb Q" we get that "\\sqrt{2}\\cdot 1=\\sqrt{2}\\notin\\mathbb Q," and hence "(\\mathbb Q,+,\\cdot)" is not an ideal of the ring "(\\R,+,\\cdot)."