I need solution of Q2 of

Answered question

2022-03-27

 

I need solution of Q2 of given assignment

Answer & Explanation

nick1337

nick1337

Expert2023-04-26Added 777 answers

Let R be a ring and let a, b be any elements of R. Then, we have:
a(b)=(ab) and (b)a=(ba)
To prove this, we need to use the distributive property of rings.
a(b)=a(b(1))=ab(1)=(ab)
(b)a=(a(1))b=ab=(ba)
Therefore, we have shown that a(b)=(b)a=(ab) for any elements a, b in R.
We can also show that 0a=a0=0 for any element a in R.
0a=(0+0)a=0a+0a
Adding (0a) to both sides, we get:
0a+(0a)=0a+0a+(0a)
Simplifying, we get:
0=0a
Similarly, we can show that a0=0 by using the same steps.
Therefore, we have shown that 0a=a0=0 for any element a in R.
In conclusion, we have proved that if R is a ring, then a(b)=(b)a=(ab) and 0a=a0=0 for any elements a, b in R.

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