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IMO Shortlist 1989 problem 13

Let $ABCD$ be a convex quadrilateral such that the sides $AB, AD, BC$ satisfy $AB = AD + BC.$ There exists a point $P$ inside the quadrilateral at a distance $h$ from the line $CD$ such that $AP = h + AD$ and $BP = h + BC.$ Show that:
$\frac {1}{\sqrt {h}} \geq \frac {1}{\sqrt {AD}} + \frac {1}{\sqrt {BC}}$

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Lista Tekst Dva stupca

Zadaci

#	Naslov	Oznake	Rj.
1786	IMO Shortlist 1990 problem 16	1990 IMO geo shortlist	0
1599	IMO Shortlist 1983 problem 3	1983 IMO geo shortlist trokut	0
1456	IMO Shortlist 1973 problem 14	1973 IMO geo shortlist trokut	0
1176	IMO Shortlist 1964 problem 4	1964 IMO geo shortlist	1
1157	IMO Shortlist 1961 problem 4	1961 IMO geo shortlist trokut	1
1144	IMO Shortlist 1959 problem 4	1959 IMO geo shortlist trokut	7

Školjka

IMO Shortlist 1989 problem 13

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