Difference between revisions of "1968 AHSME Problems/Problem 35"

Revision as of 16:52, 27 December 2014

Problem

$[asy] draw(circle((0,0),10),black+linewidth(.75)); fill((-11,0)--(11,0)--(11,-11)--(-11,-11)--cycle,white); draw((-10,0)--(10,0),black+linewidth(.75)); draw((-sqrt(96),2)--(sqrt(96),2),black+linewidth(.75)); draw((-8,6)--(8,6),black+linewidth(.75)); draw((0,0)--(0,10),black+linewidth(.75)); draw((-8,6)--(-8,2),black+linewidth(.75)); draw((8,6)--(8,2),black+linewidth(.75)); dot((0,0)); MP("O",(0,0),S);MP("a",(5,0),S); MP("J",(0,10),N);MP("D",(sqrt(96),2),E);MP("C",(-sqrt(96),2),W); MP("F",(8,6),E);MP("E",(-8,6),W);MP("G",(0,2),NE); MP("H",(0,6),NE);MP("L",(-8,2),S);MP("M",(8,2),S); [/asy]$ In this diagram the center of the circle is $O$ , the radius is $a$ inches, chord $EF$ is parallel to chord $CD$ . $O$ , $G$ , $H$ , $J$ are collinear, and $G$ is the midpoint of $CD$ . Let $K$ (sq. in.) represent the area of trapezoid $CDFE$ and let $R$ (sq. in.) represent the area of rectangle $ELMF.$ Then, as $CD$ and $EF$ are translated upward so that $OG$ increases toward the value $a$ , while $JH$ always equals $HG$ , the ratio $K:R$ becomes arbitrarily close to:

$\text{(A)} 0\quad\text{(B)} 1\quad\text{(C)} \sqrt{2}\quad\text{(D)} \frac{1}{\sqrt{2}}+\frac{1}{2}\quad\text{(E)} \frac{1}{\sqrt{2}}+1$

Solution

Let $OG = a - 2h$ , where $h = JH = HG$ . Since the areas of rectangle $EHGL$ and trapezoid $EHGC$ are both half of rectangle $CDFE$ and $EFDC$ , respectively, the ratios between their areas will remain the same, so let us consider rectangle $EHGL$ and trapezoid $EHGC$ . Draw radii $OC$ and $OE$ , both of which obviously have length $a$ . By the Pythagorean theorem, the length of $EH$ is $\sqrt{(OG + h)^2 - a^2}$ , and the length of $CG$ is $\sqrt{OG^2 - a^2}$ . It follows that the area of rectangle $EHGL$ is $R = EH * HG = h\sqrt{(OG + h)^2 - a^2}$ while the area of trapezoid $EHGC$ is $K = \frac{HG}{2}(EH + CG)$ $= \frac{h}{2}(\sqrt{(OG + h)^2 - a^2} + \sqrt{OG^2 - a^2})$ . Now, we want to find the limit, as $OG$ approaches $a$ , of $\frac{K}{R}$ . Note that this is equivalent to finding the same limit as $h$ approaches $0$ . Substituting $a - 2h$ into $OG$ yields that $K = \frac{h}{2}(\sqrt{(a - 2h + h)^2 - a^2} + \sqrt{(a - 2h)^2 - a^2}) =$ $\frac{h}{2}(\sqrt{h^2 - 2ah} + \sqrt{(4h^2 - 4ah})$ and that $R = h\sqrt{(a - 2h + h)^2 - a^2} = h(\sqrt{h^2 - 2ah})$ . Our answer thus becomes $\lim_{h\rightarrow 0}\frac{\frac{h}{2}(\sqrt{h^2 - 2ah} + \sqrt{(4h^2 - 4ah})}{h(\sqrt{h^2 - 2ah})} = \frac{1}{2} * \frac{\sqrt{h}(\sqrt{h - 2a} + 2\sqrt{h - a})}{\sqrt{h}(\sqrt{h - 2a})}$ $\implies \frac{1}{2} * \frac{\sqrt{- 2a} + 2\sqrt{- a}}{\sqrt{- 2a}} = \frac{1}{2}(1 + \frac{2}{\sqrt{2}}) = \frac{1}{2}+\frac{1}{\sqrt{2}} \textbf{ (D)}$

@@ Line 20: / Line 20: @@
 == Solution ==
-<math>\fbox{D}</math>
+Let <math>OG = a - 2h</math>, where <math>h = JH = HG</math>. Since the areas of rectangle <math>EHGL</math> and trapezoid <math>EHGC</math> are both half of rectangle <math>CDFE</math> and <math>EFDC</math>, respectively, the ratios between their areas will remain the same, so let us consider rectangle <math>EHGL</math> and trapezoid <math>EHGC</math>. Draw radii <math>OC</math> and <math>OE</math>, both of which obviously have length <math>a</math>. By the Pythagorean theorem, the length of <math>EH</math> is <math>\sqrt{(OG + h)^2 - a^2}</math>, and the length of <math>CG</math> is <math>\sqrt{OG^2 - a^2}</math>. It follows that the area of rectangle <math>EHGL</math> is <math>R = EH * HG = h\sqrt{(OG + h)^2 - a^2}</math> while the area of trapezoid <math>EHGC</math> is  <math>K = \frac{HG}{2}(EH + CG)</math> <math>= \frac{h}{2}(\sqrt{(OG + h)^2 - a^2} + \sqrt{OG^2 - a^2})</math>. Now, we want to find the limit, as <math>OG</math> approaches <math>a</math>, of <math>\frac{K}{R}</math>. Note that this is equivalent to finding the same limit as <math>h</math> approaches <math>0</math>. Substituting <math>a - 2h</math> into <math>OG</math> yields that <math>K = \frac{h}{2}(\sqrt{(a - 2h + h)^2 - a^2} + \sqrt{(a - 2h)^2 - a^2}) =</math> <math>\frac{h}{2}(\sqrt{h^2 - 2ah} + \sqrt{(4h^2 - 4ah})</math> and that <math>R = h\sqrt{(a - 2h + h)^2 - a^2} = h(\sqrt{h^2 - 2ah})</math>. Our answer thus becomes
+<cmath>\lim_{h\rightarrow 0}\frac{\frac{h}{2}(\sqrt{h^2 - 2ah} + \sqrt{(4h^2 - 4ah})}{h(\sqrt{h^2 - 2ah})} = \frac{1}{2} * \frac{\sqrt{h}(\sqrt{h - 2a} + 2\sqrt{h - a})}{\sqrt{h}(\sqrt{h - 2a})}</cmath>
+<cmath>\implies \frac{1}{2} * \frac{\sqrt{- 2a} + 2\sqrt{- a}}{\sqrt{- 2a}} = \frac{1}{2}(1 + \frac{2}{\sqrt{2}}) = \frac{1}{2}+\frac{1}{\sqrt{2}} \textbf{  (D)}</cmath>
 == See also ==

1968 AHSME (Problems • Answer Key • Resources)
Preceded by Problem 34	Followed by Problem 35
1 • 2 • 3 • 4 • 5 • 6 • 7 • 8 • 9 • 10 • 11 • 12 • 13 • 14 • 15 • 16 • 17 • 18 • 19 • 20 • 21 • 22 • 23 • 24 • 25 • 26 • 27 • 28 • 29 • 30
All AHSME Problems and Solutions

Page

Toolbox

Search

Difference between revisions of "1968 AHSME Problems/Problem 35"

Revision as of 16:52, 27 December 2014

Problem

Solution

See also