Question: Consider the geometry (C, G), where G = fez +ne = =1,n = Z). Let D denote the set of all lines in C. Note

Consider the geometry (C, G), where G = fez +ne = =1,n = Z). Let D denote the set of all lines in C. Note that D is an invariant set because every element of G is a GLT and GLTs take lines to lines. . Prove that G is a transformation group. . Give an example of a minimally invariant subset of D containing exactly one line. . Give an example of a minimally invariant subset of D containing exactly two lines. . Describe the minimally invariant subset of D) containing the line 4x + y = 1

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