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Another quadrilateral in a circle

Source: APMO 2013, Problem 5

May 3, 2013

ratiogeometrycircumcirclegeometry proposed

Problem Statement

Let

ABCD

be a quadrilateral inscribed in a circle

\omega

, and let

P

be a point on the extension of

AC

such that

PB

and

PD

are tangent to

\omega

. The tangent at

C

intersects

PD

at

Q

and the line

AD

at

R

. Let

E

be the second point of intersection between

AQ

and

\omega

. Prove that

B

,

E

,

R

are collinear.

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