Question: Consider the equation x = 2 -x (a) Solve the equation (accurate to 3 decimal places) by performing fixed-point iteration as given. b) Find

Consider the equation x = 2 -x (a) Solve the equation (accurate to 3 decimal places) by performing fixed-point iteration as given. b) Find an interval [a, b] such that iteration of xn+1 = 2n is guaranteed to converge to a unique fixe point for any x = [a, b]. In x c) Show that the given equation is algebraically equivalent to x = teration in this form fails to converge. Explain why fixed poi In 2

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