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All-Russian Olympiad Regional Round
1999 All-Russian Olympiad Regional Round
10.2
10.2
Part of
1999 All-Russian Olympiad Regional Round
Problems
(1)
collinear circumcenters - All-Russian MO 1999 Regional (R4) 10.2
Source:
9/25/2024
Given a circle
ω
\omega
ω
, a point
A
A
A
lying inside
ω
\omega
ω
, and point
B
B
B
(
B
≠
A
B \ne A
B
=
A
). All possible triangles
B
X
Y
BXY
BX
Y
are considered, such that the points
X
X
X
and
Y
Y
Y
lie on
ω
\omega
ω
and the chord
X
Y
XY
X
Y
passes through the point
A
A
A
. Prove that the centers of the circumcircles of the triangles
B
X
Y
BXY
BX
Y
lie on the same straight line.
geometry
collinear