Let G 0 -{(81%) = : a, b ER, a 0 (a) Show that G is a subgroup of SL(2). (b) For each of the following functions, determine whether it is a homomorphism, justifying your answer. (i) 1: (G, x) →→→ (G, X) a +0}. a 0 1/a (81%) → (¹0) b a (ii) 2: (G, x) →→→ (G, X) a 0 b 1/a a (1/a) → (6% 1/a) b b/a (iii) 03: (G, ×) → (R, +) → a-b (c) For any mapping o in part (b) that is a homomorphism, find its image and kernel.

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Let G -{(81%) 1/a): b : a, b ER, a (a) Show that G is a subgroup of SL(2). (b) For each of the following functions, determine whether it is a homomorphism, justifying your answer. (i) 1 (G, x) → (G, X) b (ii) 2 (G, X) → (G, X) 1/a) → (¹1/⁰9) 0 a a b +0}. a (8 1/a) → (b%a 1/a) b (iii) 03 (G, X)→ (R,+) 0 1/a) → a- (c) For any mapping o in part (b) that is a homomorphism, find its image and kernel. (d) For any mapping o in part (b) that is a homomorphism, determine a standard group that is isomorphic to the quotient group G/Ker o.