6.
The intersection of any two ideals of a ring R
(a) in again an ideal of R
(b) may or may
(c) can never be an ideal of R
(d) none of thes
Answers
Answered by
0
Answer:
Prove that the intersection of any set of Ideals of a ring is an Ideal. Since A and B are both Ideals of a ring R, A and B are both Subrings of a ring R. ... In particular,
Answered by
0
Answer:
may or may it's right u think
Similar questions