Let q(z) = Show that 1 is a repelling fixed point of q and that WS (l) is dense on the unit circle in the complex plane. Why doesn’t this contradict Theorem 14.11? Let J (z) = . a) Find the fixed points of J and determine whether they are attracting, Repelling, or no hyperbolic. b) Describe the periodic points off. Determine whether they are attracting, repelling, or non hyperbolic. c) Describe the orbit of all the points in IC to the best of your ability.
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