Difference between revisions of "2019 IMO Problems/Problem 6"
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We define <math>A' = PG \cap AI.</math> | We define <math>A' = PG \cap AI.</math> | ||
− | <math>RD||AI, PRGD</math> cyclic <math>\implies \angle IAP = \angle DRP = \angle DGP.</math> | + | |
− | <math>RD||AI, RD \perp RG, RI=GI \implies \angle AIR = \angle AIG \implies \triangle AIR \sim \triangle GIA' \implies \frac {AI}{GI} = \frac {RI}{A'I}\implies A'I \cdot AI = R^2 | + | <math>RD||AI, PRGD</math> is cyclic <math>\implies \angle IAP = \angle DRP = \angle DGP.</math> |
− | Let <math>DA'</math> meets <math>\omega</math> again at S | + | |
− | Opposite sides of any quadrilateral inscribed in the circle <math>omega</math> meet on the polar line of the intersection of the diagonals with respect to <math>\omega \implies DI</math> and <math>PS</math> meet on the line through <math>A</math> perpendicular to <math>AI.</math> | + | <math>RD||AI, RD \perp RG, RI=GI \implies \angle AIR = \angle AIG \implies</math> |
+ | <cmath>\triangle AIR \sim \triangle GIA' \implies \frac {AI}{GI} = \frac {RI}{A'I}\implies A'I \cdot AI = R^2.</cmath> | ||
+ | An inversion with respect <math>\omega</math> swap <math>A</math> and <math>A' \implies A'</math> is the midpoint <math>EF.</math> | ||
+ | |||
+ | Let <math>DA'</math> meets <math>\omega</math> again at <math>S.</math> We define <math>T = PS \cap DI.</math> | ||
+ | |||
+ | Opposite sides of any quadrilateral inscribed in the circle <math>\omega</math> meet on the polar line of the intersection of the diagonals with respect to <math>\omega \implies DI</math> and <math>PS</math> meet on the line through <math>A</math> perpendicular to <math>AI.</math> | ||
The problem is reduced to proving that <math>Q \in PST.</math> | The problem is reduced to proving that <math>Q \in PST.</math> | ||
+ | |||
+ | <i><b>Step 2</b></i> |
Revision as of 12:20, 29 August 2022
Problem
Let be the incenter of acute triangle
with
. The incircle
of
is tangent to sides
,
, and
at
,
, and
, respectively. The line through
perpendicular to
meets
again at
. Line
meets ω again at
. The circumcircles of triangles
and
meet again at
.
Prove that lines
and
meet on the line through
perpendicular to
.
Solution
Step 1
We find an auxiliary point
Let be the antipode of
on
where
is radius
We define
is cyclic
An inversion with respect
swap
and
is the midpoint
Let meets
again at
We define
Opposite sides of any quadrilateral inscribed in the circle meet on the polar line of the intersection of the diagonals with respect to
and
meet on the line through
perpendicular to
The problem is reduced to proving that
Step 2