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Romanian Masters of Mathematics Collection
2019 Romanian Master of Mathematics Shortlist
G5
G5
Part of
2019 Romanian Master of Mathematics Shortlist
Problems
(1)
concurrency wanted, starting with a tangential ABCD
Source: 2019 RMM Shortlist G5
6/19/2020
A quadrilateral
A
B
C
D
ABCD
A
BC
D
is circumscribed about a circle with center
I
I
I
. A point
P
≠
I
P \ne I
P
=
I
is chosen inside
A
B
C
D
ABCD
A
BC
D
so that the triangles
P
A
B
,
P
B
C
,
P
C
D
,
PAB, PBC, PCD,
P
A
B
,
PBC
,
PC
D
,
and
P
D
A
PDA
P
D
A
have equal perimeters. A circle
Γ
\Gamma
Γ
centered at
P
P
P
meets the rays
P
A
,
P
B
,
P
C
PA, PB, PC
P
A
,
PB
,
PC
, and
P
D
PD
P
D
at
A
1
,
B
1
,
C
1
A_1, B_1, C_1
A
1
,
B
1
,
C
1
, and
D
1
D_1
D
1
, respectively. Prove that the lines
P
I
,
A
1
C
1
PI, A_1C_1
P
I
,
A
1
C
1
, and
B
1
D
1
B_1D_1
B
1
D
1
are concurrent.Ankan Bhattacharya, USA
geometry
perimeter