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Difference between revisions of "1964 AHSME Problems/Problem 35"

(See Also)
(added another possibly time-consuming but good solution, i guess)
Line 5: Line 5:
 
<math>\textbf{(A) }3:11\qquad\textbf{(B) }5:11\qquad\textbf{(C) }1:2\qquad\textbf{(D) }2:3\qquad \textbf{(E) }25:33</math>
 
<math>\textbf{(A) }3:11\qquad\textbf{(B) }5:11\qquad\textbf{(C) }1:2\qquad\textbf{(D) }2:3\qquad \textbf{(E) }25:33</math>
  
==Solution==
+
==Solution 1==
 
Using Law of Cosines
 
Using Law of Cosines
 
and the fact that the ratio equals cos(a)/[cos(b)cos(c)]
 
and the fact that the ratio equals cos(a)/[cos(b)cos(c)]
 
B 5:11
 
B 5:11
  
 +
==Solution 2 (coordinates)==
  
 +
<asy>
 +
draw((0,0)--(15,0)--(6.6,11.2)--(0,0));
 +
draw((0,0)--(9.6,7.2));
 +
draw((6.6,0)--(6.6,11.2));
 +
draw((15,0)--(3267/845,5544/845));
 +
label("$B$",(15,0),SE);
 +
label("$C$",(6.6,11.2),N);
 +
label("$E$",(6.6,0),S);
 +
label("$15$",(7.5,-0.75),S);
 +
label("$14$",(11,5.75),ENE);
 +
label("$13$",(3,6),WNW);
 +
label("$A$",(0,0),SW);
 +
label("$D$",(9.6,7.2),NE);
 +
label("$H$",(6.6,3.5),E);
 +
</asy>
 +
The reason why we have <math>HD</math> shorter than <math>HA</math> is that all the ratios' left hand side (<math>HD</math>) is less than the ratios' right hand side (<math>HA</math>).
 +
 +
We label point <math>A</math> as the origin and point <math>B</math>, logically, as <math>(15,0)</math>. By Heron's Formula, the area of this triangle is <math>84.</math> Thus the height perpendicular to <math>AB</math> has a length of <math>11.2,</math> and by the Pythagorean Theorem, <math>AE</math> and <math>EB</math> have lengths <math>6.6</math> and <math>8.4,</math> respectively. These lengths tell us that <math>C</math> is at <math>(6.6,11.2)</math>.
 +
 +
The slope of <math>BC</math> is <math>\dfrac{0-11.2}{15-6.6}=-\dfrac{4}{3},</math> and the slope of <math>AD</math> is <math>\dfrac{3}{4}</math> by taking the negative reciprocal of <math>-\dfrac{4}{3}.</math> Therefore, the equation of line <math>AD</math> can best be represented by <math>y=\dfrac{3}{4}x.</math>
 +
 +
We next find the intersection of <math>CE</math> and <math>AD</math>. We automatically know the <math>x</math>-value; it is just <math>6.6</math> because <math>CE</math> is a straight line hitting <math>(6.6,0).</math> Therefore, the <math>y</math>-value is at <math>\dfrac{3}{4}\times 6.6=4.95.</math> Therefore, the intersection between <math>CE</math> and <math>AD</math> is at <math>(6.6,4.95)</math>.
 +
 +
We also need to find the intersection between <math>BC</math> and <math>AD</math>. To do that, we know that the line of <math>AD</math> is represented as <math>y=\dfrac{3}{4}x,</math> and the slope of line <math>BC</math> is <math>-\dfrac{4}{3}.</math> We just need to find line <math>BC</math>'s y-intercept. So far, we have <math>y=-\dfrac{4}{3}x+b,</math> where <math>b</math> is a real y-intercept. We know that <math>B</math> is located at <math>(15,0),</math> so we plug that into the equation and yield <math>b=20.</math> Therefore, the intersection between the two lines is
 +
<cmath>
 +
\dfrac{3}{4}x=-\dfrac{4}{3}x+20,
 +
9x=-16x+240,
 +
25x=240,
 +
x=9.6,
 +
y=\dfrac{3}{4}\times 9.6,
 +
y=7.2.
 +
</cmath>
 +
After that, we use the distance formula: <math>HA</math> has a length of <cmath>\sqrt{(6.6-0)^2+(4.95-0)^2}=\sqrt{\dfrac{1089}{25}+\dfrac{9801}{400}}=\sqrt{\dfrac{1089*16+9801}{400}}=\sqrt{\dfrac{27225}{400}}=\sqrt{\dfrac{1089}{16}}=\dfrac{33}{4}=8.25,</cmath> and <math>HD</math> has a length of <cmath>\sqrt{(9.6-6.6)^2+(7.2-4.95)^2}=\sqrt{3^2+(\dfrac{36}{5}-\dfrac{99}{20})^2}=\sqrt{9+\dfrac{81}{16}}=\sqrt{\dfrac{225}{16}}=3.75.</cmath>
 +
Thus, we have that <math>\dfrac{3.75}{8.25}=\dfrac{\frac{15}{4}}{\frac{33}{4}}=\dfrac{15}{33}=\dfrac{5}{11}=\bold{\boxed{B}}.</math>
 
==See Also==
 
==See Also==
 
{{AHSME 40p box|year=1964|num-b=34|num-a=36}}
 
{{AHSME 40p box|year=1964|num-b=34|num-a=36}}

Revision as of 12:19, 21 April 2020

Problem

The sides of a triangle are of lengths $13$, $14$, and $15$. The altitudes of the triangle meet at point $H$. if $AD$ is the altitude to the side of length $14$, the ratio $HD:HA$ is:

$\textbf{(A) }3:11\qquad\textbf{(B) }5:11\qquad\textbf{(C) }1:2\qquad\textbf{(D) }2:3\qquad \textbf{(E) }25:33$

Solution 1

Using Law of Cosines and the fact that the ratio equals cos(a)/[cos(b)cos(c)] B 5:11

Solution 2 (coordinates)

[asy] draw((0,0)--(15,0)--(6.6,11.2)--(0,0)); draw((0,0)--(9.6,7.2)); draw((6.6,0)--(6.6,11.2)); draw((15,0)--(3267/845,5544/845)); label("$B$",(15,0),SE); label("$C$",(6.6,11.2),N); label("$E$",(6.6,0),S); label("$15$",(7.5,-0.75),S); label("$14$",(11,5.75),ENE); label("$13$",(3,6),WNW); label("$A$",(0,0),SW); label("$D$",(9.6,7.2),NE); label("$H$",(6.6,3.5),E); [/asy] The reason why we have $HD$ shorter than $HA$ is that all the ratios' left hand side ($HD$) is less than the ratios' right hand side ($HA$).

We label point $A$ as the origin and point $B$, logically, as $(15,0)$. By Heron's Formula, the area of this triangle is $84.$ Thus the height perpendicular to $AB$ has a length of $11.2,$ and by the Pythagorean Theorem, $AE$ and $EB$ have lengths $6.6$ and $8.4,$ respectively. These lengths tell us that $C$ is at $(6.6,11.2)$.

The slope of $BC$ is $\dfrac{0-11.2}{15-6.6}=-\dfrac{4}{3},$ and the slope of $AD$ is $\dfrac{3}{4}$ by taking the negative reciprocal of $-\dfrac{4}{3}.$ Therefore, the equation of line $AD$ can best be represented by $y=\dfrac{3}{4}x.$

We next find the intersection of $CE$ and $AD$. We automatically know the $x$-value; it is just $6.6$ because $CE$ is a straight line hitting $(6.6,0).$ Therefore, the $y$-value is at $\dfrac{3}{4}\times 6.6=4.95.$ Therefore, the intersection between $CE$ and $AD$ is at $(6.6,4.95)$.

We also need to find the intersection between $BC$ and $AD$. To do that, we know that the line of $AD$ is represented as $y=\dfrac{3}{4}x,$ and the slope of line $BC$ is $-\dfrac{4}{3}.$ We just need to find line $BC$'s y-intercept. So far, we have $y=-\dfrac{4}{3}x+b,$ where $b$ is a real y-intercept. We know that $B$ is located at $(15,0),$ so we plug that into the equation and yield $b=20.$ Therefore, the intersection between the two lines is \[\dfrac{3}{4}x=-\dfrac{4}{3}x+20, 9x=-16x+240, 25x=240, x=9.6, y=\dfrac{3}{4}\times 9.6, y=7.2.\] After that, we use the distance formula: $HA$ has a length of \[\sqrt{(6.6-0)^2+(4.95-0)^2}=\sqrt{\dfrac{1089}{25}+\dfrac{9801}{400}}=\sqrt{\dfrac{1089*16+9801}{400}}=\sqrt{\dfrac{27225}{400}}=\sqrt{\dfrac{1089}{16}}=\dfrac{33}{4}=8.25,\] and $HD$ has a length of \[\sqrt{(9.6-6.6)^2+(7.2-4.95)^2}=\sqrt{3^2+(\dfrac{36}{5}-\dfrac{99}{20})^2}=\sqrt{9+\dfrac{81}{16}}=\sqrt{\dfrac{225}{16}}=3.75.\] Thus, we have that $\dfrac{3.75}{8.25}=\dfrac{\frac{15}{4}}{\frac{33}{4}}=\dfrac{15}{33}=\dfrac{5}{11}=\bold{\boxed{B}}.$

See Also

1964 AHSC (ProblemsAnswer KeyResources)
Preceded by
Problem 34 		Followed by
Problem 36
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