Show that (ZZ_6 +_6, xx_6) is a commutative ring. Is (ZZ_6 +_6, xx_6) a field?

Braxton Pugh

Braxton Pugh

Answered question

2020-12-03

Show that (Z6+6,×6) is a commutative ring. Is (Z6+6,×6) a field?

Answer & Explanation

Anonym

Anonym

Skilled2020-12-04Added 108 answers

Since addition modulo n and multiplication modulo n of integers are commutative . So, the ring (Z6+6,×6) is a commutative ring.
Suppose a,bZ6
Then, ab=ba=m , where m is the reminder obtained when ab, ba is divided by 6 and 0m5
ab mmod6,ba mmod6
Also, a+b=b+a=n , where n is the reminder obtained when a+b,b+a is divided by 6 and 0n5
a+b nmod6,b+a nmod6
Hence, Z6 is a commutative ring
A ring is a field if its every element has an inverse.
As 2,3Z6
but 23=6mod6=0
So, 2 and 3 are zero divisors and do not have inverse .
So, (Z6+6,×6) is not a field.

Do you have a similar question?

Recalculate according to your conditions!

New Questions in Commutative Algebra

Ask your question.
Get an expert answer.

Let our experts help you. Answer in as fast as 15 minutes.

Didn't find what you were looking for?