11

Part of 2008 Junior Balkan Team Selection Tests - Moldova

Problems(1)

isosceles wanted, congurent triangles wanted, parallelograms, AD = BC

Source: 2008 Moldova JBMO TST 3.3

N

be a convex quadrilateral with

AD = BC, CD \nparallel AB, AD \nparallel BC

M

\vartriangle BF N \equiv \vartriangle AEN

are the midpoints of the sides

CD

AB

, respectively. a) If

E

F

are points, such that

MCBF

ADME

are parallelograms, prove that

\vartriangle BF N \equiv \vartriangle AEN

P = MN \cap BC

Q = AD \cap MN

R = AD \cap BC

. Prove that the triangle

PQR

geometrycongruent trianglesparallelogramequal segmentsisosceles