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2015 AMC 10B Problems/Problem 22

Revision as of 00:40, 14 March 2015 by Arebei2 (talk | contribs) (Created page with "Solution Triangle <math>AFG</math> is isosceles so <math>AG</math>=<math>AF</math>=<math>1</math>. Using the symmetry of pentagon <math>FGHIJ</math>, notice that <math>\angl...")
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Solution

Triangle $AFG$ is isosceles so $AG$=$AF$=$1$. Using the symmetry of pentagon $FGHIJ$, notice that $\angle{FAG}$ is congruent to $\angle{FBI}$, so triangles $JHG$ and $DIJ$ are congruent to our original triangle $AFG$. Therefore, $JH$ = $1$. Now, we still need to find the length of $FG$ and $DC$. Also, we know that $FJ$ = $FG$ since pentagon $FGHIJ$ is regular. Let's call the length of $FG$ and $FJ$ $x$. Now we can solve for $x$. Triangles $AFG$ and $AJH$ are similar. So,

\[\frac{1}{x+1} = \frac{x}{1}\]

From this, we get $x = \frac{\sqrt{5} -1}{2}$.

Now, we just have to find the length of $DC$ which we'll call $y$. We already know that $DJ$ = $AF$ = $1$. Triangles $AFG$ and $ADC$ are similar so we have,

\[\frac{1}{2+x} = \frac{x}{y}\]

Solving for $y$ we get $y = \frac{\sqrt{5} +1}{2}$

Adding up $FG$ , $JH$, and $CD$ gives us $1 + x + y$ which is $\boxed{\mathbf{(D)}\ 1+\sqrt{5}\ }$

Solution by arebei2

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