Suppose that R is a ring and that a^2 = a for all a in RZ. Show that R is commutative.

Clifland

Clifland

Answered question

2021-01-31

Suppose that R is a ring and that a2=a for all aRZ. Show that R is commutative.

Answer & Explanation

Bertha Stark

Bertha Stark

Skilled2021-02-01Added 96 answers

For any aR, we have,
(a+a)=(a+a)2
(a+a)=(2a)2
(a+a)=4a2
(a+a)=a2+a2+a2+a2
(a+a)=a+a+a+a(1)
Now, let a,bR
a+b=(a+b)2
=a2+ab+ba+b2
=a+ab+ba+b
ab+ba=0
Adding ba on both sides of above equation, we get,
ab+(ba+ba)=ba
From equation 1, we can observe that same terms on both sides of equation get cancelled out.
So, applying same observation on equation 2, we get, ab=ba
Hence, Ring R is commutative.

Kamal EL-saady

Kamal EL-saady

Beginner2022-05-26Added 1 answers

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?