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Two circles, externally tangent and a third circle comes in

Source: Balkan MO 1997, Problem 3

April 24, 2006

geometrygeometric transformationhomothetycircumcircleparallelogrampower of a point

Problem Statement

The circles

\mathcal C_1

and

\mathcal C_2

touch each other externally at

D

, and touch a circle

\omega

internally at

B

and

C

, respectively. Let

A

be an intersection point of

\omega

and the common tangent to

\mathcal C_1

and

\mathcal C_2

at

D

. Lines

AB

and

AC

meet

\mathcal C_1

and

\mathcal C_2

again at

K

and

L

, respectively, and the line

BC

meets

\mathcal C_1

again at

M

and

\mathcal C_2

again at

N

. Prove that the lines

AD

,

KM

,

LN

are concurrent. Greece

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