Answer to Question #350973 in Abstract Algebra for OLX

Question #350973

6. A ring A is such that every ideal not contained in the nilradical contains a non-

zero idempotent (that is, an element e such that e² = e #= 0). Prove that the

nilradical and Jacobson radical of A are equal.

Service report

It's been a while since this question is posted here. Still, the answer hasn't been got. Consider converting this question to a fully qualified assignment, and we will try to assist. Please click the link below to proceed: Submit order

Learn more about our help with Assignments: Abstract Algebra

Comments

No comments. Be the first!

Answer to Question #350973 in Abstract Algebra for OLX

Comments

Leave a comment

Related Questions