Difference between revisions of "2006 IMO Problems/Problem 1"

Latest revision as of 00:02, 19 November 2023

Problem

Let $ABC$ be triangle with incenter $I$ . A point $P$ in the interior of the triangle satisfies $\angle PBA+\angle PCA = \angle PBC+\angle PCB$ . Show that $AP \geq AI$ , and that equality holds if and only if $P=I.$

Solution

We have $\angle IBP = \angle IBC - \angle PBC = \frac{1}{2} \angle ABC - \angle PBC = \frac{1}{2}(\angle PCB - \angle PCA).$

and similarly $\angle ICP = \angle PCB - \angle ICB = \angle PCB - \frac{1}{2} \angle ACB = \frac{1}{2}(\angle PBA - \angle PBC).$ Since $\angle PBA + \angle PCA = \angle PBC + \angle PCB$ , we have $\angle PCB - \angle PCA = \angle PBA - \angle PBC.$

It follows that $\angle IBP = \frac{1}{2} (\angle PCB - \angle PCA) = \frac{1}{2} (\angle PBA - \angle PBC) = \angle ICP.$ Hence, $B,P,I,$ and $C$ are concyclic.

Let ray $AI$ meet the circumcircle of $\triangle ABC\,$ at point $J$ . Then, by the Incenter-Excenter Lemma, $JB=JC=JI=JP$ .

Finally, $AP+JP \geq AJ = AI+IJ$ (since triangle APJ can be degenerate, which happens only when $P=I$ ), but $JI=JP$ ; hence $AP \geq AI$ and we are done.

By Mengsay LOEM , Cambodia IMO Team 2015

latexed by tluo5458 :)

minor edits by lpieleanu

@@ Line 1: / Line 1: @@
 ==Problem==
-Let <math>ABC</math> be triangle with incenter <math>I</math>. A point <math>P</math> in the interior of the triangle satisfies <math>\angle PBA+\angle PCA = \angle PBC+\angle PCB</math>. Show that <math>AP \geq AI</math>, and that equality holds if and only if <math>P=I</math>
+Let <math>ABC</math> be triangle with incenter <math>I</math>. A point <math>P</math> in the interior of the triangle satisfies <math>\angle PBA+\angle PCA = \angle PBC+\angle PCB</math>. Show that <math>AP \geq AI</math>, and that equality holds if and only if <math>P=I.</math>
 ==Solution==
-We have angle(IBP)= angle(IBC) - angle(PBC)=1/2 angle(ABC) - angle(PBC)=1/2 [ angle(PBA) - angle(PBC)]  (1)
+We have
-and similarly angle(ICP)=angle(PCB) - angle(ICB) = angle(PCB) - 1/2 angle(ACB)= 1/2[ angle(PCB) - angle(PCA)] (2)
+<cmath>\angle IBP = \angle IBC - \angle PBC = \frac{1}{2} \angle ABC - \angle PBC = \frac{1}{2}(\angle PCB - \angle PCA).</cmath>
-since angle(PBA)+angle(PCA)=angle(PBC)+angle(PCB)  , then  angle(PBA) - angle(PBC) =  angle(PCB) - angle(PCA)  (3)
-(1) , (2) and (3) therefore : angle(IBP)=angle(ICP)  i.e  BIPC is con cyclic .
+and similarly <cmath>\angle ICP = \angle PCB - \angle ICB = \angle PCB - \frac{1}{2} \angle ACB = \frac{1}{2}(\angle PBA - \angle PBC).</cmath>
-Let J be a point of intersection between (AI) and the circumcise of triangle ABC , then IJB is isosceles traingle because of angle(BIJ)=angle(IBJ)
+Since <math>\angle PBA + \angle PCA = \angle PBC + \angle PCB</math>, we have <math>\angle PCB - \angle PCA = \angle PBA - \angle PBC.</math>
-so JB=JC=JI , then JI=JP  (because BIPC con cyclic) .
+It follows that <cmath>\angle IBP = \frac{1}{2} (\angle PCB - \angle PCA) = \frac{1}{2} (\angle PBA - \angle PBC) = \angle ICP.</cmath> Hence, <math>B,P,I,</math> and <math>C</math> are concyclic.
+Let ray <math>AI</math> meet the circumcircle of <math>\triangle  ABC\, </math> at point <math>J</math>. Then, by the Incenter-Excenter Lemma, <math>JB=JC=JI=JP</math>.
+Finally, <math>AP+JP \geq AJ = AI+IJ</math> (since triangle APJ can be degenerate, which happens only when <math>P=I</math>), but <math>JI=JP</math>; hence <math>AP \geq AI</math> and we are done.
-In triangle APJ  :  AP+JP >=  AJ=AI+IJ   but JI=JP  so  AP >= AI  .
 By Mengsay LOEM  , Cambodia IMO Team 2015
+latexed by tluo5458 :)
+minor edits by lpieleanu
+==See Also==
+{{IMO box|year=2006|before=First Problem|num-a=2}}

2006 IMO (Problems) • Resources
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Difference between revisions of "2006 IMO Problems/Problem 1"

Latest revision as of 00:02, 19 November 2023

Problem

Solution

See Also