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Problems
Contests
National and Regional Contests
Cuba Contests
Cuba MO
2007 Cuba MO
6
6
Part of
2007 Cuba MO
Problems
(1)
ABC isosceles wanted, BG > BF = GC 2007 Cuba MO 2.6
Source:
9/15/2024
Let the triangle
A
B
C
ABC
A
BC
be acute. Let us take in the segment
B
C
BC
BC
two points
F
F
F
and
G
G
G
such that
B
G
>
B
F
=
G
C
BG > BF = GC
BG
>
BF
=
GC
and an interior point
P
P
P
to the triangle on the bisector of
∠
B
A
C
\angle BAC
∠
B
A
C
. Then are drawn through
P
P
P
,
P
D
∥
A
B
PD\parallel AB
P
D
∥
A
B
and
P
E
∥
A
C
PE \parallel AC
PE
∥
A
C
,
D
∈
A
C
D \in AC
D
∈
A
C
and
E
∈
A
B
E \in AB
E
∈
A
B
,
∠
F
E
P
=
∠
P
D
G
\angle FEP = \angle PDG
∠
FEP
=
∠
P
D
G
. prove that
△
A
B
C
\vartriangle ABC
△
A
BC
is isosceles.
geometry
isosceles