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IMO Shortlist 1995 problem G2

Let $A, B$ and $C$ be non-collinear points. Prove that there is a unique point $X$ in the plane of $ABC$ such that $XA^2 + XB^2 + AB^2 = XB^2 + XC^2 + BC^2 = XC^2 + XA^2 + CA^2.$

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Lista Tekst Dva stupca

Zadaci

#	Naslov	Oznake	Rj.
2344	Hrvatska matematička olimpijada 1994 - Drugi dan - Zadatak 3	1994 geo hmo hrv kvadrat min nejednakost	4
2278	IMO Shortlist 2008 problem G2	2008 geo kružnica shortlist	12
1916	IMO Shortlist 1995 problem NC4	1995 shortlist	3
1913	IMO Shortlist 1995 problem NC1	1995 shortlist	5
1864	IMO Shortlist 1993 problem G2	1993 geo kružnica shortlist	0
1197	IMO Shortlist 1966 problem 14	1966 geo komb kružnica shortlist	2

Školjka

IMO Shortlist 1995 problem G2

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