Difference between revisions of "2007 Alabama ARML TST Problems/Problem 15"

Latest revision as of 17:12, 21 March 2018

Problem

Let $P$ be a point inside isosceles right triangle $ABC$ such that $\angle C = 90^{\circ}$ , $AP = 5$ , $BP = 13$ , and $CP = 6\sqrt{2}$ . Find the area of $ABC$ .

Solution

Solution 1

Let $D$ , $E$ , and $F$ be the reflections of $P$ over sides $BC$ , $CA$ , and $AB$ , respectively. We then have that $[AEC]=[APC]$ , $[FAB]=[PAB]$ , and $[BCD]=[BCP]$ . This shows that $[AECDBF]=2[ABC]$ . I shall now proceed to find $[AECDBF]$ . This is equal to

$[AECDBF]=[AEF]+[BDF]+[DEF]$

Note that $\angle CAE=\angle CAP$ and $\angle BAP=\angle BAF$ , so $\angle EAF=2\angle CAB=90^{\circ}$ . Similarly, $\angle FBD=90^{\circ}$ and $\angle DCE=180^{\circ}$ . Now note that $AE=AF=AP=5$ and $BD=BF=BP=13$ . Therefore $[AEF]=\frac{25}{2}$ and $[BDF]=\frac{169}{2}$ . Also note that $EF=5\sqrt{2}$ and $DF=13\sqrt{2}$ . We also know that $D$ , $C$ , and $E$ are collinear, so $DE=EC+CD=2CP=12\sqrt{2}$ . This shows that $DEF$ is a 5-12-13 right triangle, so it has area $\frac{EF\cdot DE}{2}=60$ , so

$[ABC]=\frac{[AECDBF]}{2}=\frac{\frac{25}{2}+\frac{169}{2}+60}{2}=\boxed{\frac{157}{2}}$

Solution 2

Rotate the diagram by 90 degrees about $C$ so that $B$ goes to $A$ , $A$ goes to a point $D$ , and $P$ goes to $P'$ . Since the image of $BP$ under this rotation is $AP'$ , $AP' = 13$ . Since $\triangle PCP'$ is a 45-45-90 right triangle, $PP' = 12$ . Thus, $APP'$ is a 5-12-13 right triangle, with $\angle APP' = 90^\circ$ . Note that $\angle APC = \angle APP' + PP'C = 90^\circ + 45^\circ = 135^\circ$ , so by Law of Cosines on triangle $APC$ ,

$AC^2 = AP'^2 + P'C^2 - 2(AP')(P'C)\cos 135^\circ = 25 + 72 - 2(-\frac{1}{\sqrt{2}}) (6\sqrt{2})(5) = 157,$

so $[ABC] = \frac{AC^2}{2} = \boxed{\frac{157}{2}}$ .

@@ Line 3: / Line 3: @@
 ==Solution==
+=== Solution 1 ===
 [[File:2007AlabamaARMLTST15.png]]
-Let <math>D</math>, <math>E</math>, and <math>F</math> be the reflections of <math>P</math> over sides <math>BC</math>, <math>CA</math>, and <math>AB</math>, respectively. We then have that <math>[AEC]=[APC]</math>, <math>[FAB]=[PAB]</math>, and <math>[BCD]=[BCP]</math>. This shows that <math>[AECDBF]=2[ABC]</math>. I shall now proceed to find <math>[AECDBF]</math>.
+Let <math>D</math>, <math>E</math>, and <math>F</math> be the reflections of <math>P</math> over sides <math>BC</math>, <math>CA</math>, and <math>AB</math>, respectively. We then have that <math>[AEC]=[APC]</math>, <math>[FAB]=[PAB]</math>, and <math>[BCD]=[BCP]</math>. This shows that <math>[AECDBF]=2[ABC]</math>. I shall now proceed to find <math>[AECDBF]</math>. This is equal to
-Note that <math>\angle CAE=\angle CAP</math> and <math>\angle BAP=\angle BAF</math>, so <math>\angle EAF=2\angle CAB=90^{\circ}</math>. Similarly, <math>\angle FBD=90^{\circ}</math> and <math>\angle DCE=180^{\circ}</math>. Therefore
 <cmath>[AECDBF]=[AEF]+[BDF]+[DEF]</cmath>
-Now note that <math>AE=AF=AP=5</math> and <math>BD=BF=BP=13</math>. Therefore <math>[AEF]=\frac{25}{2}</math> and <math>[BDF]=\frac{169}{2}</math>. Also note that <math>EF=5\sqrt{2}</math> and <math>DF=13\sqrt{2}</math>. We also know that <math>D</math>, <math>C</math>, and <math>E</math> are collinear, so <math>DE=EC+CD=2CP=12\sqrt{2}</math>. This shows that <math>DEF</math> is a 5-12-13 right triangle, so it has area <math>\frac{EF\cdot DE}{2}=60</math>, so
+Note that <math>\angle CAE=\angle CAP</math> and <math>\angle BAP=\angle BAF</math>, so <math>\angle EAF=2\angle CAB=90^{\circ}</math>. Similarly, <math>\angle FBD=90^{\circ}</math> and <math>\angle DCE=180^{\circ}</math>. Now note that <math>AE=AF=AP=5</math> and <math>BD=BF=BP=13</math>. Therefore <math>[AEF]=\frac{25}{2}</math> and <math>[BDF]=\frac{169}{2}</math>. Also note that <math>EF=5\sqrt{2}</math> and <math>DF=13\sqrt{2}</math>. We also know that <math>D</math>, <math>C</math>, and <math>E</math> are collinear, so <math>DE=EC+CD=2CP=12\sqrt{2}</math>. This shows that <math>DEF</math> is a 5-12-13 right triangle, so it has area <math>\frac{EF\cdot DE}{2}=60</math>, so
 <cmath>[ABC]=\frac{[AECDBF]}{2}=\frac{\frac{25}{2}+\frac{169}{2}+60}{2}=\boxed{\frac{157}{2}}</cmath>
+=== Solution 2 ===
+Rotate the diagram by 90 degrees about <math>C</math> so that <math>B</math> goes to <math>A</math>, <math>A</math> goes to a point <math>D</math>, and <math>P</math> goes to <math>P'</math>. Since the image of <math>BP</math> under this rotation is <math>AP'</math>, <math>AP' = 13</math>. Since <math>\triangle PCP'</math> is a 45-45-90 right triangle, <math>PP' = 12</math>. Thus, <math>APP'</math> is a 5-12-13 right triangle, with <math>\angle APP' = 90^\circ</math>. Note that <math>\angle APC = \angle APP' + PP'C = 90^\circ + 45^\circ = 135^\circ</math>, so by Law of Cosines on triangle <math>APC</math>,
+<cmath>AC^2 = AP'^2 + P'C^2  - 2(AP')(P'C)\cos 135^\circ = 25 + 72 - 2(-\frac{1}{\sqrt{2}}) (6\sqrt{2})(5) = 157,</cmath>
+so <math>[ABC] = \frac{AC^2}{2} = \boxed{\frac{157}{2}}</math>.
 ==See also==
 {{ARML box|year=2007|state=Alabama|num-b=14|after=Last Problem}}

2007 Alabama ARML TST (Problems)
Preceded by: Problem 14	Followed by: Last Problem
1 • 2 • 3 • 4 • 5 • 6 • 7 • 8 • 9 • 10 • 11 • 12 • 13 • 14 • 15

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