6. Let I and J be ideals in the ring R. (a) Prove that InJ is an ideal in R. (b) Prove that I+J = {i+j|i€1,je J} is an ideal in R. (c) Prove that IJ = {a,b, |n 2 1, a, e 1,b, e J} is an ideal in R.

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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6. Let I and .J be ideals in the ring R.
(a) Prove that
InJ
is an ideal in R.
(b) Prove that
I+J = {i+j|i€ I,je J}
is an ideal in R.
(c) Prove that
IJ = {a,b |n 2 1, a, e I, b, E J}
is an ideal in R.
(d) Prove that IJCINJ. Give an example where IJÇINJ.
(e) Is {ab | a € 1,be J} an ideal in R?
Transcribed Image Text:6. Let I and .J be ideals in the ring R. (a) Prove that InJ is an ideal in R. (b) Prove that I+J = {i+j|i€ I,je J} is an ideal in R. (c) Prove that IJ = {a,b |n 2 1, a, e I, b, E J} is an ideal in R. (d) Prove that IJCINJ. Give an example where IJÇINJ. (e) Is {ab | a € 1,be J} an ideal in R?
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