Slični zadaci

IMO Shortlist 1987 problem 21

In an acute-angled triangle $ABC$ the interior bisector of angle $A$ meets $BC$ at $L$ and meets the circumcircle of $ABC$ again at $N$ . From $L$ perpendiculars are drawn to $AB$ and $AC$ , with feet $K$ and $M$ respectively. Prove that the quadrilateral $AKNM$ and the triangle $ABC$ have equal areas.(IMO Problem 2)

Proposed by Soviet Union.

Slični zadaci

Lista Tekst Dva stupca

Zadaci

#	Naslov	Oznake	Rj.
1174	IMO Shortlist 1964 problem 2	1964 IMO geo kružnica shortlist trokut	1
1574	IMO Shortlist 1981 problem 17	1981 IMO geo kružnica shortlist trokut	1
1589	IMO Shortlist 1982 problem 13	1982 IMO geo kružnica shortlist trokut	0
1663	IMO Shortlist 1985 problem 22	1985 IMO geo kružnica shortlist trokut	1
1847	IMO Shortlist 1992 problem 20	1992 IMO geo kružnica shortlist trokut	1
1964	IMO Shortlist 1997 problem 8	1997 IMO geo kružnica shortlist trokut	2

Školjka

IMO Shortlist 1987 problem 21

Slični zadaci