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IMO Shortlist 1969 problem 59

$(SWE 2)$ 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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Lista Tekst Dva stupca

Zadaci

#	Naslov	Oznake	Rj.
1557	IMO Shortlist 1979 problem 26	1979 alg funkcija shortlist	0
1685	IMO Shortlist 1987 problem 1	1987 alg funkcija shortlist	0
1748	IMO Shortlist 1989 problem 10	1989 alg funkcija shortlist	1
1788	IMO Shortlist 1990 problem 18	1990 alg funkcija shortlist	0
1829	IMO Shortlist 1992 problem 2	1992 alg funkcija shortlist	3
1978	IMO Shortlist 1997 problem 22	1997 alg funkcija shortlist	1

Školjka

IMO Shortlist 1969 problem 59

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