Answer to Question #205738 in Abstract Algebra for hussain

(i) It is true that for any ring "R", there is an ideal "I" of "R" such that "R\/I" is commutative. Indeed, let "I=R," then the quotient ring "R\/I=R\/R" is singleton, and hence is commutative.

(ii) It is false that if "S" is an ideal of a non-trivial ring "R" and "f" a ring homomorphism from "R" to a ring "R'," then "f^{-1}(f(S))=S." Indeed, let us consider the trivial ring homomorphism "f:R\\to R',\\ f(x)=0'" for each "x\\in R." Let "S=\\{0\\}" be a trivial ideal of "S." Then "f^{-1}(f(S))=f^{-1}(f(\\{0\\}))=f^{-1}(0')=R\\ne\\{0\\}=S."

It is true only for trivial ring "R=\\{0\\}." In this case a unique ideal of "R" is "S=\\{0\\}=R" and for any homomorhism "f" we have that "f^{-1}(f(S))=f^{-1}(f(\\{0\\}))=f^{-1}(0')=\\{0\\}=S."