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Difference between revisions of "2006 Cyprus MO/Lyceum/Problem 22"

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<math>ABCD</math> is rectangular and the points <math>K,L,M,N</math> lie on the sides <math>AB, BC, CD, DA</math> respectively so that <math>\frac{AK}{KB}=\frac{BL}{LC}=\frac{CM}{MD}=\frac{DN}{NA}=2</math>. If <math>E_1</math> is the area of <math>KLMN</math> and <math>E_2</math> is the area of the rectangle <math>ABCD</math>, the ratio <math>\frac{E_1}{E_2}</math> equals
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<math>AB\Gamma \Delta</math> is rectangular and the points <math>K,\Lambda ,M,N</math> lie on the sides <math>AB, B\Gamma, \Gamma \Delta , \Delta A</math> respectively so that <math>\frac{AK}{KB}=\frac{B\Lambda}{\Lambda \Gamma}=\frac{\Gamma M}{M\Delta}=\frac{\Delta N}{NA}=2</math>. If <math>E_1</math> is the area of <math>K\Lambda MN</math> and <math>E_2</math> is the area of the rectangle <math>AB\Gamma \Delta</math>, the ratio <math>\frac{E_1}{E_2}</math> equals
  
 
A. <math>\frac{5}{9}</math>
 
A. <math>\frac{5}{9}</math>

Revision as of 21:02, 17 October 2007

Problem

2006 CyMO-22.PNG

$AB\Gamma \Delta$ is rectangular and the points $K,\Lambda ,M,N$ lie on the sides $AB, B\Gamma, \Gamma \Delta , \Delta A$ respectively so that $\frac{AK}{KB}=\frac{B\Lambda}{\Lambda \Gamma}=\frac{\Gamma M}{M\Delta}=\frac{\Delta N}{NA}=2$. If $E_1$ is the area of $K\Lambda MN$ and $E_2$ is the area of the rectangle $AB\Gamma \Delta$, the ratio $\frac{E_1}{E_2}$ equals

A. $\frac{5}{9}$

B. $\frac{1}{3}$

C. $\frac{9}{5}$

D. $\frac{3}{5}$

E. None of these

Solution

Let $AB = CD = x$, $BC = AD = y$. Using the Pythagorean Theorem, $KM = \sqrt{\frac{x^2}{9} + y^2}$, $LN = \sqrt{x^2 + \frac{y^2}{9}}$. Using the formula $A = \frac{1}{2}d_1d_2$ for a rhombus, we get $\frac{1}{2}\sqrt{\left(x^2 + \frac{y^2}{9}\right)\left(x^2 + \frac{y^2}{9}\right)} = \frac{1}{2}\sqrt{\frac{x^4}{9} + \frac{y^4}{9} + \frac{82}{81}x^2y^2} = \frac{\sqrt{9x^4 + 9y^4 + 82x^2y^2}}{18}$. Thus the ratio is $\frac{\sqrt{9x^4 + 9y^4 + 82x^2y^2}}{18xy}$. There is no way we can simplify this further, and in fact we can plug in different values of $x,y$ to see that the answer is $\mathrm{E}$.

Be careful not to just try a couple of simple examples like $ABCD$ being a square, where we will get the answer $5/9$, which is incorrect in general.

See also

2006 Cyprus MO, Lyceum (Problems)
Preceded by
Problem 21 		Followed by
Problem 23
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