Difference between revisions of "2003 AIME I Problems/Problem 7"

Revision as of 11:03, 11 July 2020

Problem

Point $B$ is on $\overline{AC}$ with $AB = 9$ and $BC = 21.$ Point $D$ is not on $\overline{AC}$ so that $AD = CD,$ and $AD$ and $BD$ are integers. Let $s$ be the sum of all possible perimeters of $\triangle ACD$ . Find $s.$

Solution

$[asy] size(220); pointpen = black; pathpen = black + linewidth(0.7); pair O=(0,0),A=(-15,0),B=(-6,0),C=(15,0),D=(0,8); D(D(MP("A",A))--D(MP("C",C))--D(MP("D",D,NE))--cycle); D(D(MP("B",B))--D); D((0,-4)--(0,12),linetype("4 4")+linewidth(0.7)); MP("6",B/2); MP("15",C/2); MP("9",(A+B)/2); [/asy]$

Denote the height of $\triangle ACD$ as $h$ , $x = AD = CD$ , and $y = BD$ . Using the Pythagorean theorem, we find that $h^2 = y^2 - 6^2$ and $h^2 = x^2 - 15^2$ . Thus, $y^2 - 36 = x^2 - 225 \Longrightarrow x^2 - y^2 = 189$ . The LHS is difference of squares, so $(x + y)(x - y) = 189$ . As both $x,\ y$ are integers, $x+y,\ x-y$ must be integral divisors of $189$ .

The pairs of divisors of $189$ are $(1,189)\ (3,63)\ (7,27)\ (9,21)$ . This yields the four potential sets for $(x,y)$ as $(95,94)\ (33,30)\ (17,10)\ (15,6)$ . The last is not a possibility since it simply degenerates into a line. The sum of the three possible perimeters of $\triangle ACD$ is equal to $3(AC) + 2(x_1 + x_2 + x_3) = 90 + 2(95 + 33 + 17) = \boxed{380}$ .

Solution 2

Using Stewart's Theorem, letting the side length be c, and the cevian be d, then we have $30d^2+21*9*30=9c^2+21c^2=30c^2$ . Dividing both sides by thirty leaves $d^2+189=c^2$ . The solution follows as above.

Solution 3 (LAW OF COSINES BASH)

Drop an altitude from point $D$ to side $AC$ . Let the intersection point be $E$ . Since triangle $ADC$ is isosceles, AE is half of $AC$ , or $15$ . Then, label side AD as $x$ . Since $AED$ is a right triangle, you can figure out $\cos A$ with adjacent divided by hypotenuse, which in this case is $AE$ divided by $x$ , or $\frac{15}{x}$ . Now we apply law of cosines. Label $BD$ as $y$ . Applying law of cosines, $y^2 = x^2+9^2- 2 \cdot x \cdot 9 \cdot \cos A$ . Since $\cos A$ is equal to $\frac{15}{x}$ , $y^2 = x^2+9^2- 2 \cdot x \cdot 9 \cdot \frac{15}{x}$ , which can be simplified to $y^2 = x^2 -189$ . The solution proceeds as the first solution does.

-intelligence_20

@@ Line 27: / Line 27: @@
 == Solution 3 (LAW OF COSINES BASH) ==
-Drop an altitude from point D to side AC. Let the intersection point be E. Since triangle <math>ADC</math> is isosceles, AE is half of AC, or <math>\frac{15}{2}</math>. Then, label side AD as x. Since AED is a right triangle, you can figure out <math>\cos A</math> with adjacent divided by hypotenuse, which in this case is AE divided by x, or 15/x. Now we apply law of cosines. Label BD as y. Applying law  of cosines,
+Drop an altitude from point <math>D</math> to side <math>AC</math>. Let the intersection point be <math>E</math>. Since triangle <math>ADC</math> is isosceles, AE is half of <math>AC</math>, or <math>15</math>. Then, label side AD as <math>x</math>. Since <math>AED</math> is a right triangle, you can figure out <math>\cos A</math> with adjacent divided by hypotenuse, which in this case is <math>AE</math> divided by <math>x</math>, or <math>\frac{15}{x}</math>. Now we apply law of cosines. Label <math>BD</math> as <math>y</math>. Applying law  of cosines,
-<math>y^2 = x^2+9^2- 2 \cdot x \cdot 9 \cdot \cos A</math>. Since <math>\cos A</math> is equal to 15/x, <math>y^2 = x^2+9^2- 2 \cdot x \cdot 9 \cdot 15/x</math>, which can be simplified to <math>y^2 = x^2 -189</math>. The solution proceeds as the first solution does.
+<math>y^2 = x^2+9^2- 2 \cdot x \cdot 9 \cdot \cos A</math>. Since <math>\cos A</math> is equal to <math>\frac{15}{x}</math>, <math>y^2 = x^2+9^2- 2 \cdot x \cdot 9 \cdot \frac{15}{x}</math>, which can be simplified to <math>y^2 = x^2 -189</math>. The solution proceeds as the first solution does.
 -intelligence_20

2003 AIME I (Problems • Answer Key • Resources)
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