Difference between revisions of "2003 AIME II Problems/Problem 11"

Revision as of 20:40, 20 September 2008

Problem

Triangle $ABC$ is a right triangle with $AC = 7,$ $BC = 24,$ and right angle at $C.$ Point $M$ is the midpoint of $AB,$ and $D$ is on the same side of line $AB$ as $C$ so that $AD = BD = 15.$ Given that the area of triangle $CDM$ may be expressed as $\frac {m\sqrt {n}}{p},$ where $m,$ $n,$ and $p$ are positive integers, $m$ and $p$ are relatively prime, and $n$ is not divisible by the square of any prime, find $m + n + p.$

Solution

Solution 1

We use the Pythagorean Theorem on $ABC$ to determine that $AB=25.$

Let $N$ be the orthogonal projection from $C$ to $AB.$ Thus, $[CDM]=\frac{(DM)(MN)} {2}$ , $MN=AM-AN$ , and $[ABC]=\frac{24 \cdot 7} {2} =\frac{25 \cdot (CN)} {2}.$

From the third equation, we get $CN=\frac{168} {25}.$

By the Pythagorean Theorem in $\Delta ACN,$ we have

$AN=\sqrt{(\frac{24 \cdot 25} {25})^2-(\frac{24 \cdot 7} {25})^2}=\frac{24} {25}\sqrt{25^2-7^2}=\frac{576} {25}.$

Thus, $MN=\frac{576} {25}-\frac{25} {2}=\frac{527} {50}.$

In $\Delta ADM$ , we use the Pythagorean Theorem to get $DM=\sqrt{15^2-(\frac{25} {2})^2}=\frac{5} {2} \sqrt{11}.$

Thus, $[CDM]=\frac{527 \cdot 5\sqrt{11}} {50 \cdot 2 \cdot 2}= \frac{527\sqrt{11}} {40}.$

Hence, the answer is $527+11+40=\boxed{578}.$

Solution 2

By the Pythagorean Theorem in $\Delta AMD$ , we get $DM=\frac{5\sqrt{11}} {2}$ . Since $ABC$ is a right triangle, $M$ is the circumcenter and thus, $CM=\frac{25} {2}$ . We let $\angle CMD=\theta$ . By the Law of Cosines,

$2 \cdot (12.5)^2-2 \cdot (12.5)^2 * \cos (90+\theta).$

It follows that $\sin \theta = \frac{527} {625}$ . Thus, $[CMD]=\frac{1} {2} (12.5) (\frac{5\sqrt{11}} {2})(\frac{527} {625})=\frac{527\sqrt{11}} {40}$ .

Solution 3

Suppose $ABC$ is plotted on the cartesian plane with $C$ at $(0,0)$ , $A$ at $(0,7)$ , and $B$ at $(24,0)$ . Then $M$ is at $(12,3.5)$ . Since $\Delta AMD$ is isosceles, $MD$ is perpendicular to $AM$ , and since $AM=12.5$ and $AD=15, MD=2.5\sqrt{11}$ . The slope of $AM$ is $-\frac{7}{24}$ so the slope of $MD$ is $\frac{24}{7}$ . Draw a vertical line through $M$ and a horizontal line through $D$ . Suppose these two lines meet at $X$ . then $MX=\frac{24}{7}DX$ so $MD=\frac{25}{7}DX=\frac{25}{24}MD$ by the pythagorean theorem. So $MX=2.4\sqrt{11}$ and $DX=.7\sqrt{11}$ so the coordinates of D are $(12-.7\sqrt{11},2.5-2.4\sqrt{11})$ . Since we know the coordinates of each of the vertices of $\delta CMD$ , we can apply shoestring theorem to find the area of CMD, $\frac{527 \sqrt{11}}{40}$ .

@@ Line 35: / Line 35: @@
 It follows that <math>\sin \theta = \frac{527} {625}</math>. Thus,
 <math>[CMD]=\frac{1} {2} (12.5) (\frac{5\sqrt{11}} {2})(\frac{527} {625})=\frac{527\sqrt{11}} {40}</math>.
+'''Solution 3'''
+Suppose <math>ABC</math> is plotted on the [[cartesian plane]] with <math>C</math> at <math>(0,0)</math>, <math>A</math> at <math>(0,7)</math>, and <math>B</math> at <math>(24,0)</math>.
+Then <math>M</math> is at <math>(12,3.5)</math>. Since <math>\Delta AMD</math> is isosceles, <math>MD</math> is perpendicular to <math>AM</math>, and since <math>AM=12.5</math> and <math>AD=15, MD=2.5\sqrt{11}</math>.
+The slope of <math>AM</math> is <math>-\frac{7}{24}</math> so the slope of <math>MD</math> is <math>\frac{24}{7}</math>.
+Draw a vertical line through <math>M</math> and a horizontal line through <math>D</math>. Suppose these two lines meet at <math>X</math>. then <math>MX=\frac{24}{7}DX</math> so <math>MD=\frac{25}{7}DX=\frac{25}{24}MD</math> by the pythagorean theorem.
+So <math>MX=2.4\sqrt{11}</math> and <math>DX=.7\sqrt{11}</math> so the coordinates of D are <math>(12-.7\sqrt{11},2.5-2.4\sqrt{11})</math>.
+Since we know the coordinates of each of the vertices of <math>\delta CMD</math>, we can apply
+[[shoestring theorem]] to find the area of CMD, <math>\frac{527 \sqrt{11}}{40}</math>.
 == See also ==
 {{AIME box|year=2003|n=II|num-b=10|num-a=12}}

2003 AIME II (Problems • Answer Key • Resources)
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Difference between revisions of "2003 AIME II Problems/Problem 11"

Revision as of 20:40, 20 September 2008

Problem

Solution

See also