MathDB

10.3

Part of 2006 Moldova National Olympiad

Problems(1)

Moldova mo 2006, 10th grade

Source: Moldova MO 2006

3/21/2006
A convex quadrilateral ABCD ABCD is inscribed in a circle. The tangents to the circle through A A and C C intersect at a point P P, such that this point P P does not lie on BD BD, and such that PA2=PBā‹…PD PA^{2}=PB\cdot PD. Prove that the line BD BD passes through the midpoint of AC AC.
geometrytrapezoidgeometry unsolved