IDEALS IN RINGS UP TO ISOMORPHISM (original) (raw)
Rings are built from abelian groups. While ideals (I), special subrings of Rings (R), with Rings, form Quotient Rings (R/I) isomorphic to existing Rings (¯R). Thus, this process creates new Rings. Here, we use this platform to explore ideals such as prime, principal and Maximal, based on certain theories to enhance this creativity to our advantage. Examples are considered, examined and explored for applicability of these theories and creativity of New Rings.
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