Let f be a map defined on the interval. Define ˜f, “the double of f,” on, as follows:
and filling the rest of the graph as in Fig. 2.28. Prove that ˜f has a 2nperiodic point at x if and only if f has an n-periodic point at x. Show that if f has points of period 2k(2n + 1), then ˜f has points of period 2k+1(2n + 1).
Fig. 2.28
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