Let D3 be the dihedral group for the equilateral triangle ABC. Let r be counterclockwise rotation by (27/3) and let s be the flip that leaves A fixed and exchanges B and C. a) Write down the Cayley table for D3 in terms of r and s. b) Let G = Z3 x Z2, where Zn is defined in Problem 1 above. Define the following notation: r = (1,0) and s = (0,1). Write the Cayley table for G in terms of r and s. c) Is G is isomorphic to D3? Explain your answer

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Let D3 be the dihedral group for the equilateral triangle ABC. Let r be counterclockwise rotation by
(27/3 and let s be the flip that leaves A fixed and exchanges B and C.
a) Write down the Cayley table for D3 in terms of r and s.
b) Let G = Z3 x Z2, where Zn is defined in Problem 1 above. Define the following notation: r =
(1,0) and s = (0,1). Write the Cayley table for G in terms of r and s.
c) Is G is isomorphic to D3? Explain your answer
Transcribed Image Text:Let D3 be the dihedral group for the equilateral triangle ABC. Let r be counterclockwise rotation by (27/3 and let s be the flip that leaves A fixed and exchanges B and C. a) Write down the Cayley table for D3 in terms of r and s. b) Let G = Z3 x Z2, where Zn is defined in Problem 1 above. Define the following notation: r = (1,0) and s = (0,1). Write the Cayley table for G in terms of r and s. c) Is G is isomorphic to D3? Explain your answer
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