Let (G, ') denote the set of all 2 x 2 real matrices A with det{. and det {A} € Q (the rational numbers). (a) Prove that (G, ·) is a group with respect to multiplication. (Matrix multiplication is always associative, so you may assume that. But check closure and the existence of an identity element and inverse elements very carefully.) (b) Is this group Abelian? Justify. 2.

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' Let (G, ) denote the set of all 2 × 2 real matrices A with det{A} # 0 and det {A} EQ (the rational numbers). (a) Prove that (G, ·) is a group with respect to multiplication. (Matrix multiplication always associative, so you may assume that. But check closure and the existence of an identity element and inverse elements very carefully.) (b) Is this group Abelian? Justify. Given a group (G, *) and a nonempty set S. Let GS denote the set of all mappings from the set S to the set G. Find an operation on GS that will yield a group. Show that your choice of operation is correct.