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Question

Let A=Q×Q and let be a binary operation on A defined by (a,b)(c,d)=(ac,b+ad) for (a,b)(c,d)ϵA. Determine, whether is commutative and associative. Then, with respect to on A

(i) Find the identity element in A

(ii) Find the invertible elements of A.

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Solution

Given binary operation is :
(a,b)(c,d)=(ac,b+ad) (i)
(c,d)(a,b)=(ca,d+cb) (ii)
Since (i)(ii)
Thus, is not commutative.
Now, (a,b)((c,d)(e,f))
=(a,b)(ce,d+cf)
=(ace,b+ad+acf) (iii)
And, ((a,b)(c,d))(e,f)
=(ac,b+ad)(e,f)
=(ace,b+ad+acf) (iv)
From (iii) and (iv), we have
(a,b)((c,d)(e,f))=((a,b)(c,d))(e,f).
Thus, is associative.
(i) Let (x,y) be the identity element in A.
Now, (a,b)(x,y)=(a,b)=(x,y)(a,b)(a,b)A
(ax,b+ay)=(a,b)=(xa,y+bx)
Equating corresponding terms, we have
ax=a, b+ay=b or a=xa, b=y+bx
x=1 and y=0
Hence, (1,0) is the identity element in A.
(ii) Let (a,b) be an invertible element in A and let (c,d) be its inverse in A.
Now, (a,b)(c,d)=(1,0)=(c,d)(a,b)
(ac, b+ad)=(1,0)=(ca, d+bc)
[by equating corresponding elemensts]
ac=1, b+ad=0 or 1=ca, 0=d+bc
c=1a and d=ba, where, a0
Therefore, (a,b)A is an invertible element of A if a0, and inverse of (a,b) is(1a, ba).

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