As follows from the problem (A fixed point x* is stable (attractor or attractor) if the condition |f (x*)| 1. For what values of l are the fixed points found in the previous problem stable? Show graphically how the evolution of the system occurs, if the initial point x0 = 0.1 = / = x*, and l = 0.5.), for l > 3/4, the transformation f = 4lx(1 - x) has no attracting points. Show that these same fixed points are not attractive for the function f2. Note. Vos
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