Difference between revisions of "2022 AMC 12B Problems/Problem 10"

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\textbf{(E)}\ 12</math>
 
\textbf{(E)}\ 12</math>
  
==Solution==
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==Diagram==
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<asy>
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/* Made by MRENTHUSIASM */
  
Consider triangle <math>AFG</math>. <math>AG = 1</math> and <math>AF = 2</math>. <math>\angle GAF = 120 ^{\circ}</math> because it is an interior angle of a regular hexagon.<sup>See note.</sup> By the [[Law of Cosines]], we have:
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size(200);
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pair A, B, C, D, E, F, G, H;
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A = dir(120);
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B = dir(60);
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C = dir(0);
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D = dir(-60);
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E = dir(-120);
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F = dir(180);
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G = midpoint(A--B);
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H = midpoint(D--E);
  
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filldraw(G--C--H--F--cycle,yellow);
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draw(polygon(6));
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dot("$A$",A,1.5*A,linewidth(4));
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dot("$B$",B,1.5*B,linewidth(4));
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dot("$C$",C,1.5*C,linewidth(4));
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dot("$D$",D,1.5*D,linewidth(4));
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dot("$E$",E,1.5*E,linewidth(4));
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dot("$F$",F,1.5*F,linewidth(4));
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dot("$G$",G,1.5*dir(90),linewidth(4));
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dot("$H$",H,1.5*dir(-90),linewidth(4));
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</asy>
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~MRENTHUSIASM
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 +
==Solution 1 ==
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Let the center of the hexagon be <math>O</math>. <math>\triangle AOB</math>, <math>\triangle BOC</math>, <math>\triangle COD</math>, <math>\triangle DOE</math>, <math>\triangle EOF</math>, and <math>\triangle FOA</math> are all equilateral triangles with side length <math>2</math>. Thus, <math>CO = 2</math>, and <math>GO = \sqrt{AO^2 - AG^2} = \sqrt{3}</math>. By symmetry, <math>\angle COG = 90^{\circ}</math>. Thus, by the Pythagorean theorem, <math>CG = \sqrt{2^2 + \sqrt{3}^2} = \sqrt{7}</math>. Because <math>CO = OF</math> and <math>GO = OH</math>, <math>CG = HC = FH = GF = \sqrt{7}</math>. Thus, the solution to our problem is <math>\sqrt{7} + \sqrt{7} + \sqrt{7} + \sqrt{7} = \boxed{\textbf{(D)}\ 4\sqrt7}</math>.
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 +
~mathboy100
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==Solution 2==
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 +
Consider triangle <math>AFG</math>. Note that <math>AF = 2</math>, <math>AG = 1</math>, and <math>\angle GAF = 120 ^{\circ}</math> because it is an interior angle of a regular hexagon. (See note for details.)
 +
 +
By the [[Law of Cosines]], we have:
 
<cmath>\begin{align*}
 
<cmath>\begin{align*}
 
FG^2 &= AG^2 + AF^2 - 2 \cdot AG \cdot AF \cdot \cos \angle GAF \\
 
FG^2 &= AG^2 + AF^2 - 2 \cdot AG \cdot AF \cdot \cos \angle GAF \\
 
FG^2 &= 1^2 + 2^2 - 2 \cdot 1 \cdot 2 \cdot \cos 120 ^{\circ} \\
 
FG^2 &= 1^2 + 2^2 - 2 \cdot 1 \cdot 2 \cdot \cos 120 ^{\circ} \\
FG^2 &= 1^2 + 2^2 - 4 \cdot \left( \frac 12 \right) \\
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FG^2 &= 5 + 4 \cdot \left( \frac 12 \right) \\
 
FG^2 &= 7 \\
 
FG^2 &= 7 \\
 
FG &= \sqrt 7.
 
FG &= \sqrt 7.
 
\end{align*}</cmath>
 
\end{align*}</cmath>
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By [[SAS Congruence]], triangles <math>AFG</math>, <math>BCG</math>, <math>CDH</math>, and <math>EFH</math> are congruent, and by [[CPCTC]], quadrilateral <math>GCHF</math> is a rhombus. Therefore, the perimeter of <math>GCHF</math> is <math>4 \cdot FG = \boxed{\textbf{(D)}\ 4\sqrt7}</math>.
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 +
Note: The sum of the interior angles of any polygon with <math>n</math> sides is given by <math>180 ^{\circ} (n - 2)</math>. Therefore, the sum of the interior angles of a hexagon is <math>720 ^{\circ}</math>, and each interior angle of a regular hexagon measures <math>\frac{720 ^{\circ}}{6} = 120 ^{\circ}</math>.
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== Solution 3 ==
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We use a coordinates approach. Letting the origin be the center of the hexagon, we can let <math>A = (-1, \sqrt{3}), B = (1, \sqrt{3}), C = (2, 0), D = (1, -\sqrt{3}), E = (-1, -\sqrt{3}), F = (-2, 0).</math> Then, <math>G = (0, \sqrt{3})</math> and <math>H = (0, -\sqrt{3}).</math>
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We use the distance formula four times to get <math>CH, HF, FG, \text{ and } GC.</math>
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<cmath>\begin{alignat*}{8}
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CH^2 &= (2-0)^2 + (0-(-\sqrt{3}))^2 &&= 7 &&\rightarrow CH &&= \sqrt{7}, \\
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HF^2 &= (0-(-2))^2 + (-\sqrt{3}-0)^2 &&= 7 &&\rightarrow HF &&= \sqrt{7}, \\
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FG^2 &= (-2-0)^2 + (0-\sqrt{3})^2 &&= 7 &&\rightarrow FG &&= \sqrt{7}, \\
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GC^2 &= (0-2)^2 + (\sqrt{3}-0)^2 &&= 7 &&\rightarrow GC &&= \sqrt{7}.
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\end{alignat*}</cmath>
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Thus, the perimeter of <math>GCHF = CH + HF + FG + GC = \sqrt{7} + \sqrt{7} + \sqrt{7} + \sqrt{7} = \boxed{\textbf{(D)}\ 4\sqrt7}</math>.
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~sirswagger21
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Note: the last part of this solution could have been simplified by noting that <math>CH = HF = FG = GC = \sqrt{7}.</math>
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== Solution 4 ==
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Note that triangles <math>\triangle{GAF}, \triangle{FEH}, \triangle{HDC},</math> and <math>\triangle{CBG}</math> are all congruent, since they have side lengths of <math>1</math> and <math>2</math> and an included angle of <math>120^{\circ}.</math>
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By the Law of Cosines, <cmath>FG=\sqrt{1^2+2^2-2\cdot{1}\cdot{-\frac{1}{2}}}=\sqrt{7}.</cmath> Therefore, <math>FG+GC+CH+HF=4\cdot{FG}=\boxed{\textbf{(D)}\ 4\sqrt7}.</math>
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 +
-Benedict T (countmath1)
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== Solution 5 (Answer Choices + Pythagorean Theorem Extension) ==
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Like the previous solutions, note that <math>\triangle{GAF}, \triangle{FEH}, \triangle{HDC},</math> and <math>\triangle{CBG}</math> are all congruent by SAS. It follows that quadrilateral <math>GCHF</math> is a rhombus.
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Recall the Pythagorean Theorem, which states <math>a^2+b^2=c^2</math> for all right triangles, where <math>c</math> is the hypotenuse of the triangle. However, by drawing a quick diagram of an obtuse triangle, we can see that <math>a^2+b^2<c^2</math>, in any given obtuse triangle.
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Since <math>ABCDEF</math> is a regular hexagon, all of its angles are obtuse. It follows that <math>\triangle{GAF}</math> is an obtuse triangle. Using the extended Pythagorean Theorem for obtuse triangles, we have: <cmath>AG^2+AF^2<GF^2 \implies 1^2+2^2<GF^2 \implies \sqrt{5}<GF</cmath>
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Since <math>GCHF</math> is a rhombus, the perimeter is <math>4GF</math>. This eliminates all answer choices but <math>D</math> and <math>E</math>, since in all of those options <math>GF<\sqrt{5}</math>. Lastly, <math>E</math> is eliminated due to the triangle inequality, as <math>1+2</math> is not greater than <math>12/4=3</math>.
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Hence, the answer is <math>\boxed{\textbf{(D)}\ 4\sqrt7}</math>.
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~SwordOfJustice
 +
 +
==Video Solution 1 by mop 2024==
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https://youtu.be/ezGvZgBLe8k&t=0s
 +
 +
~r00tsOfUnity
 +
 +
==Video Solution 2 (Under 1 min!)==
 +
https://youtu.be/XUIm4yOwVd0
 +
 +
~Education, the Study of Everything
 +
 +
==Video Solution 3 by SpreadTheMathLove==
 +
https://www.youtube.com/watch?v=6I3ZNpI7qwE
  
By [[SAS Congruence]], triangles <math>AFG</math>, <math>BCG</math>, <math>CDH</math>, and <math>EFH</math> are congruent, and by [[CPCTC]], quadrilateral <math>GCHF</math> is a rhombus. Therefore, its perimeter is <math>4 \cdot FG = \boxed{\textbf{(D)} \ 4 \sqrt 7}</math>.
+
==Video Solution(1-16)==
 +
https://youtu.be/SCwQ9jUfr0g
  
Note: The sum of the internal angles of any polygon with <math>n</math> sides is given by <math>180 ^{\circ} (n - 2)</math>. Therefore, the sum of the internal angles of a hexagon is <math>720 ^{\circ}</math>, and each internal angle of a regular hexagon measures <math>\frac{720 ^{\circ}}{6} = 120 ^{\circ}</math>.
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~~Hayabusa1
  
 
== See Also ==
 
== See Also ==

Latest revision as of 21:16, 27 October 2023

Problem

Regular hexagon $ABCDEF$ has side length $2$. Let $G$ be the midpoint of $\overline{AB}$, and let $H$ be the midpoint of $\overline{DE}$. What is the perimeter of $GCHF$?

$\textbf{(A)}\ 4\sqrt3 \qquad \textbf{(B)}\ 8 \qquad \textbf{(C)}\ 4\sqrt5 \qquad \textbf{(D)}\ 4\sqrt7 \qquad \textbf{(E)}\ 12$

Diagram

[asy] /* Made by MRENTHUSIASM */  size(200); pair A, B, C, D, E, F, G, H; A = dir(120); B = dir(60); C = dir(0); D = dir(-60); E = dir(-120); F = dir(180); G = midpoint(A--B); H = midpoint(D--E);  filldraw(G--C--H--F--cycle,yellow);  draw(polygon(6)); dot("$A$",A,1.5*A,linewidth(4)); dot("$B$",B,1.5*B,linewidth(4)); dot("$C$",C,1.5*C,linewidth(4)); dot("$D$",D,1.5*D,linewidth(4)); dot("$E$",E,1.5*E,linewidth(4)); dot("$F$",F,1.5*F,linewidth(4)); dot("$G$",G,1.5*dir(90),linewidth(4)); dot("$H$",H,1.5*dir(-90),linewidth(4)); [/asy] ~MRENTHUSIASM

Solution 1

Let the center of the hexagon be $O$. $\triangle AOB$, $\triangle BOC$, $\triangle COD$, $\triangle DOE$, $\triangle EOF$, and $\triangle FOA$ are all equilateral triangles with side length $2$. Thus, $CO = 2$, and $GO = \sqrt{AO^2 - AG^2} = \sqrt{3}$. By symmetry, $\angle COG = 90^{\circ}$. Thus, by the Pythagorean theorem, $CG = \sqrt{2^2 + \sqrt{3}^2} = \sqrt{7}$. Because $CO = OF$ and $GO = OH$, $CG = HC = FH = GF = \sqrt{7}$. Thus, the solution to our problem is $\sqrt{7} + \sqrt{7} + \sqrt{7} + \sqrt{7} = \boxed{\textbf{(D)}\ 4\sqrt7}$.

~mathboy100

Solution 2

Consider triangle $AFG$. Note that $AF = 2$, $AG = 1$, and $\angle GAF = 120 ^{\circ}$ because it is an interior angle of a regular hexagon. (See note for details.)

By the Law of Cosines, we have: \begin{align*} FG^2 &= AG^2 + AF^2 - 2 \cdot AG \cdot AF \cdot \cos \angle GAF \\ FG^2 &= 1^2 + 2^2 - 2 \cdot 1 \cdot 2 \cdot \cos 120 ^{\circ} \\ FG^2 &= 5 + 4 \cdot \left( \frac 12 \right) \\ FG^2 &= 7 \\ FG &= \sqrt 7. \end{align*} By SAS Congruence, triangles $AFG$, $BCG$, $CDH$, and $EFH$ are congruent, and by CPCTC, quadrilateral $GCHF$ is a rhombus. Therefore, the perimeter of $GCHF$ is $4 \cdot FG = \boxed{\textbf{(D)}\ 4\sqrt7}$.

Note: The sum of the interior angles of any polygon with $n$ sides is given by $180 ^{\circ} (n - 2)$. Therefore, the sum of the interior angles of a hexagon is $720 ^{\circ}$, and each interior angle of a regular hexagon measures $\frac{720 ^{\circ}}{6} = 120 ^{\circ}$.

Solution 3

We use a coordinates approach. Letting the origin be the center of the hexagon, we can let $A = (-1, \sqrt{3}), B = (1, \sqrt{3}), C = (2, 0), D = (1, -\sqrt{3}), E = (-1, -\sqrt{3}), F = (-2, 0).$ Then, $G = (0, \sqrt{3})$ and $H = (0, -\sqrt{3}).$

We use the distance formula four times to get $CH, HF, FG, \text{ and } GC.$ \begin{alignat*}{8} CH^2 &= (2-0)^2 + (0-(-\sqrt{3}))^2 &&= 7 &&\rightarrow CH &&= \sqrt{7}, \\ HF^2 &= (0-(-2))^2 + (-\sqrt{3}-0)^2 &&= 7 &&\rightarrow HF &&= \sqrt{7}, \\ FG^2 &= (-2-0)^2 + (0-\sqrt{3})^2 &&= 7 &&\rightarrow FG &&= \sqrt{7}, \\ GC^2 &= (0-2)^2 + (\sqrt{3}-0)^2 &&= 7 &&\rightarrow GC &&= \sqrt{7}. \end{alignat*} Thus, the perimeter of $GCHF = CH + HF + FG + GC = \sqrt{7} + \sqrt{7} + \sqrt{7} + \sqrt{7} = \boxed{\textbf{(D)}\ 4\sqrt7}$.

~sirswagger21

Note: the last part of this solution could have been simplified by noting that $CH = HF = FG = GC = \sqrt{7}.$

Solution 4

Note that triangles $\triangle{GAF}, \triangle{FEH}, \triangle{HDC},$ and $\triangle{CBG}$ are all congruent, since they have side lengths of $1$ and $2$ and an included angle of $120^{\circ}.$

By the Law of Cosines, \[FG=\sqrt{1^2+2^2-2\cdot{1}\cdot{-\frac{1}{2}}}=\sqrt{7}.\] Therefore, $FG+GC+CH+HF=4\cdot{FG}=\boxed{\textbf{(D)}\ 4\sqrt7}.$

-Benedict T (countmath1)

Solution 5 (Answer Choices + Pythagorean Theorem Extension)

Like the previous solutions, note that $\triangle{GAF}, \triangle{FEH}, \triangle{HDC},$ and $\triangle{CBG}$ are all congruent by SAS. It follows that quadrilateral $GCHF$ is a rhombus.

Recall the Pythagorean Theorem, which states $a^2+b^2=c^2$ for all right triangles, where $c$ is the hypotenuse of the triangle. However, by drawing a quick diagram of an obtuse triangle, we can see that $a^2+b^2<c^2$, in any given obtuse triangle.

Since $ABCDEF$ is a regular hexagon, all of its angles are obtuse. It follows that $\triangle{GAF}$ is an obtuse triangle. Using the extended Pythagorean Theorem for obtuse triangles, we have: \[AG^2+AF^2<GF^2 \implies 1^2+2^2<GF^2 \implies \sqrt{5}<GF\]

Since $GCHF$ is a rhombus, the perimeter is $4GF$. This eliminates all answer choices but $D$ and $E$, since in all of those options $GF<\sqrt{5}$. Lastly, $E$ is eliminated due to the triangle inequality, as $1+2$ is not greater than $12/4=3$.

Hence, the answer is $\boxed{\textbf{(D)}\ 4\sqrt7}$.

~SwordOfJustice

Video Solution 1 by mop 2024

https://youtu.be/ezGvZgBLe8k&t=0s

~r00tsOfUnity

Video Solution 2 (Under 1 min!)

https://youtu.be/XUIm4yOwVd0

~Education, the Study of Everything

Video Solution 3 by SpreadTheMathLove

https://www.youtube.com/watch?v=6I3ZNpI7qwE

Video Solution(1-16)

https://youtu.be/SCwQ9jUfr0g

~~Hayabusa1

See Also

2022 AMC 12B (ProblemsAnswer KeyResources)
Preceded by
Problem 9
Followed by
Problem 11
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
All AMC 12 Problems and Solutions

The problems on this page are copyrighted by the Mathematical Association of America's American Mathematics Competitions. AMC logo.png