Difference between revisions of "1986 AIME Problems/Problem 9"

Revision as of 18:50, 12 September 2007

Problem

In $\displaystyle \triangle ABC$ , $\displaystyle AB= 425$ , $\displaystyle BC=450$ , and $\displaystyle AC=510$ . An interior point $\displaystyle P$ is then drawn, and segments are drawn through $\displaystyle P$ parallel to the sides of the triangle. If these three segments are of an equal length $\displaystyle d$ , find $\displaystyle d$ .

Solution

Solution 1

Let the points at which the segments hit the triangle be called $D, D', E, E', F, F'$ as shown above. First, note that all three smaller triangles created and the larger triangle are similar ( $\triangle ABC \sim \triangle DPD' \sim \triangle PEE' \sim \triangle F'PF$ ). This is easy to find using repeated alternate interior angles. The remaining three sections are parallelograms, which is also simple to see by the parallel lines.

Since $\displaystyle PDAF'$ is a parallelogram, we find that $PF' = AD$ , and similarly $PE = BD'$ . So $d = PF' + PE' = AD + BD' = 425 - DD'$ . Thus $DD' = 425 - d$ . By the same logic, $EE' = 450 - d$ .

Since $\triangle DPD' \sim \triangle ABC$ , we have the proportion:

$\frac{425-d}{425} = \frac{PD}{510}$

$PD = 510 - \frac{510}{425}d = 510 - \frac{6}{5}d$

Doing the same with $\displaystyle \triangle PEE'$ , we find that $\displaystyle PE' = \displaystyle 510 - \frac{17}{15}d \displaystyle$ . Now, $d = PD + PE' = 510 - \frac{6}{5}d + 510 - \frac{17}{15}d \Longrightarrow d\left(\frac{50}{15}\right) = 1020 \Longrightarrow d = 306$ .

Solution 2

Define the points the same as above.

Let $[CE'PF] = a$ , $[E'EP] = b$ , $\displaystyle [BEPD'] = c \displaystyle$ , $[D'PD] = d$ , $\displaystyle [DAF'P] = e$ and $[F'D'P] = f$

Key theorem: the ratio of the areas of 2 similar triangles is the ratio of a pair of corresponding sides squared.

Let the length of the segment be $x$ and the area of the triangle be $A$ , using the theorem, we get:

$\frac {c + e + d}{A} = \left(\frac {x}{BC}\right)^2$ , $\displaystyle \frac {b + c + d}{A} \displaystyle = \left(\frac {x}{AC}\right)^2$ , $\frac {a + b + f}{A} = \left(\frac {x}{AB}\right)^2$ adding all these together and using $a + b + c + d + e + f = A$ we get $\frac {f + d + b}{A} + 1 = x^2*\left(\frac {1}{BC^2} + \frac {1}{AC^2} + \frac {1}{AB^2}\right)$

Using corresponding angles from parallel lines, it is easy to show that $\triangle ABC \sim \triangle F'PF$ , since $ADPF'$ and $CFPE'$ are parallelograms, it is easy to show that $FF' = AC - x$

Now we have the side length ratio, so we have the area ratio $\displaystyle \frac {f}{A} = \left(\frac {AC - x}{AC}\right)^2 = \left(1 - \frac {x}{AC}\right)^2$ , by symmetry, we have $\displaystyle \frac {d}{A} = \left(1 - \frac {x}{AB}\right)^2$ and $\frac {b}{A} = \left(1 - \frac {x}{BC}\right)^2$

Substituting these into our initial equation, we have $1 + \sum_{cyc}\left(1 - \frac {x}{AB}\right) - \frac {x^2}{AB^2} = 0$ $1 + \sum_{cyc}1 - 2*\frac {x}{AB} = 0$ $\displaystyle \frac {2}{\frac {1}{AB} + \frac {1}{BC} + \frac {1}{CA}} = x$ answer follows after some hideous computation

@@ Line 1: / Line 1: @@
 == Problem ==
-In <math>\displaystyle \triangle ABC</math>, <math>\displaystyle AB= 425</math>, <math>\displaystyle BC=450</math>, and <math>\displaystyle AC=510</math>. An interior point <math>\displaystyle P</math> is then drawn, and segments are drawn through <math>\displaystyle P</math> parallel to the sides of the triangle. If these three segments are of an equal length <math>\displaystyle d</math>, find <math>\displaystyle d</math>.
+In <math>\displaystyle \triangle ABC</math>, <math>\displaystyle AB= 425</math>, <math>\displaystyle BC=450</math>, and <math>\displaystyle AC=510</math>. An interior [[point]] <math>\displaystyle P</math> is then drawn, and [[segment]]s are drawn through <math>\displaystyle P</math> [[parallel]] to the sides of the [[triangle]]. If these three segments are of an equal length <math>\displaystyle d</math>, find <math>\displaystyle d</math>.
+__TOC__
 == Solution ==
-{{solution}}
+=== Solution 1 ===
+[[Image:1986_AIME-9.png]]
+Let the points at which the segments hit the triangle be called <math>D, D', E, E', F, F'</math> as shown above. First, note that all three smaller triangles created and the larger triangle are [[similar triangles|similar]] (<math>\triangle ABC \sim \triangle DPD' \sim \triangle PEE' \sim \triangle F'PF</math>). This is easy to find using repeated [[alternate interior angles]]. The remaining three sections are [[parallelogram]]s, which is also simple to see by the parallel lines.
+Since <math>\displaystyle PDAF'</math> is a parallelogram, we find that <math>PF' = AD</math>, and similarly <math>PE = BD'</math>. So <math>d = PF' + PE' = AD + BD' = 425 - DD'</math>. Thus <math>DD' = 425 - d</math>. By the same logic, <math>EE' = 450 - d</math>.
+Since <math>\triangle DPD' \sim \triangle ABC</math>, we have the [[proportion]]:
+<math>\frac{425-d}{425} = \frac{PD}{510}</math>
+<math>PD = 510 - \frac{510}{425}d = 510 - \frac{6}{5}d</math>
+Doing the same with <math>\displaystyle \triangle PEE'</math>, we find that <math>\displaystyle PE' = \displaystyle 510 - \frac{17}{15}d \displaystyle</math>. Now, <math>d = PD + PE' = 510 - \frac{6}{5}d + 510 - \frac{17}{15}d \Longrightarrow d\left(\frac{50}{15}\right) = 1020 \Longrightarrow d = 306</math>.
+=== Solution 2 ===
+Define the points the same as above.
+Let <math>[CE'PF] = a</math>, <math>[E'EP] = b</math>, <math>\displaystyle [BEPD'] = c \displaystyle</math>, <math>[D'PD] = d</math>, <math>\displaystyle [DAF'P] = e</math> and <math>[F'D'P] = f</math>
+Key theorem: the ratio of the areas of 2 similar triangles is the ratio of a pair of corresponding sides squared.
+Let the length of the segment be <math>x</math> and the area of the triangle be <math>A</math>, using the theorem, we get:
+<math>\frac {c + e + d}{A} = \left(\frac {x}{BC}\right)^2</math>, <math>\displaystyle \frac {b + c + d}{A} \displaystyle = \left(\frac {x}{AC}\right)^2</math>, <math>\frac {a + b + f}{A} = \left(\frac {x}{AB}\right)^2</math>
+adding all these together and using <math>a + b + c + d + e + f = A</math> we get
+<math>\frac {f + d + b}{A} + 1 = x^2*\left(\frac {1}{BC^2} + \frac {1}{AC^2} + \frac {1}{AB^2}\right)</math>
+Using [[corresponding angles]] from parallel lines, it is easy to show that <math>\triangle ABC \sim \triangle F'PF</math>, since <math>ADPF'</math> and <math>CFPE'</math> are parallelograms, it is easy to show that <math>FF' = AC - x</math>
+Now we have the side length [[ratio]], so we have the area ratio
+<math>\displaystyle \frac {f}{A} = \left(\frac {AC - x}{AC}\right)^2 = \left(1 - \frac {x}{AC}\right)^2</math>, by symmetry, we have
+<math>\displaystyle \frac {d}{A} = \left(1 - \frac {x}{AB}\right)^2</math> and <math>\frac {b}{A} = \left(1 - \frac {x}{BC}\right)^2</math>
+Substituting these into our initial equation, we have
+<math>1 + \sum_{cyc}\left(1 - \frac {x}{AB}\right) - \frac {x^2}{AB^2} = 0</math>
+<math>1 + \sum_{cyc}1 - 2*\frac {x}{AB} = 0</math>
+<math>\displaystyle \frac {2}{\frac {1}{AB} + \frac {1}{BC} + \frac {1}{CA}} = x</math>
+answer follows after some hideous computation
 == See also ==
 {{AIME box|year=1986|num-b=8|num-a=10}}
@@ Line 8: / Line 49: @@
 * [[American Invitational Mathematics Examination]]
 * [[Mathematics competition resources]]
+[[Category:Intermediate Geometry Problems]]

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