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(SWE 2) For each \lambda (0 < \lambda < 1 and \lambda = \frac{1}{n} for all n = 1, 2, 3, \cdots), construct a continuous function f such that there do not exist x, y with 0 < \lambda < y = x + \lambda \le 1 for which f(x) = f(y).

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#NaslovOznakeRj.KvalitetaTežina
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