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Difference between revisions of "2024 AMC 10A Problems/Problem 22"

(Solution 2)
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==Solution 2==
 
==Solution 2==
  
Let's start by looking at kite <math>\mathcal K</math>. We can quickly deduce based off of the side lengths that the kite can be split into <math>2</math> <math>30</math>-<math>60</math>-<math>90</math> triangles. Going back to the triangle ABC, focus on side AB. There are <math>4</math> kites, they are all either reflected over the line AB or a line perpendicular to AB, meaning the length of AB can be split up into 4 equal parts.  
+
Let's start by looking at kite <math>\mathcal K</math>. We can quickly deduce based off of the side lengths that the kite can be split into two <math>30-60-90</math> triangles. Going back to the triangle <math>\triangle ABC</math>, focus on side <math>AB</math>. There are <math>4</math> kites, they are all either reflected over the line <math>AB</math> or a line perpendicular to <math>AB</math>, meaning the length of <math>AB</math> can be split up into 4 equal parts.  
  
Pick out the bottom-left kite, and we can observe that the kite and the triangle formed by the intersection of the kite and <math>\Delta ABC</math> share a <math>60</math> degree angle. (this was deduced from the <math>30</math>-<math>60</math>-<math>90</math> triangles in the kite) The line AB and the right side of the kite are perpendicular, forming a <math>90</math> degree angle. Because that is also a <math>30</math>-<math>60</math>-<math>90</math> triangle with a hypotenuse of <math>\sqrt3</math>, so we find the length of AB to be <math>4*3/2</math>, which is <math>6</math>.  
+
Pick out the bottom-left kite, and we can observe that the kite and the triangle formed by the intersection of the kite and <math>\Delta ABC</math> share a <math>60</math> degree angle. (this was deduced from the <math>30-60-90</math> triangles in the kite) The line AB and the right side of the kite are perpendicular, forming a <math>90^{\circ}</math> angle. Because that is also a <math>30-60-90</math> triangle with a hypotenuse of <math>\sqrt3</math>, so we find the length of AB to be <math>4*3/2</math>, which is <math>6</math>.  
  
Then, we can drop an altitude from C to AB. We know that will be equivalent to the sum of the longer side of the kite and the shorter side of the triangle formed by the intersection of the kite and <math>\Delta ABC</math>. (Look at the line formed on the left of C that drops down to AB if you are confused) We already have those values from the <math>30</math>-<math>60</math>-<math>90</math> triangles, so we can just plug it into the triangle area formula, <math>bh/2</math>. We get <math>6*(\sqrt3+\sqrt3/2)/2</math> ==> <math>3*(\sqrt3+\sqrt3/2)</math> ==> <math>3*\sqrt3/2</math> ==> <math>\textbf{(B) }\dfrac92\sqrt3\qquad</math>
+
Then, we can drop an altitude from <math>C</math> to <math>AB</math>. We know that will be equivalent to the sum of the longer side of the kite and the shorter side of the triangle formed by the intersection of the kite and <math>\Delta ABC</math>. (Look at the line formed on the left of <math>C</math> that drops down to <math>AB</math> if you are confused) We already have those values from the <math>30-60-90</math> triangles, so we can just plug it into the triangle area formula, <math>bh/2</math>. We get <cmath>6\cdot\dfrac{\sqrt3+\frac{\sqrt3}{2}}{2}\rightarrow3\cdot(\sqrt3+\dfrac{\sqrt3}{2})\rightarrow3\cdot\dfrac{\sqrt3}{2}\rightarrow\boxed{\textbf{(B) }\dfrac92\sqrt3}</cmath>
  
 
~YTH (Need help with Latex and formatting)
 
~YTH (Need help with Latex and formatting)
  
 
~WIP (Header)
 
~WIP (Header)
 +
 +
~Tacos_are_yummy_1 (<math>\LaTeX</math> & Formatting)
  
 
==See also==
 
==See also==
 
{{AMC10 box|year=2024|ab=A|num-b=21|num-a=23}}
 
{{AMC10 box|year=2024|ab=A|num-b=21|num-a=23}}
 
{{MAA Notice}}
 
{{MAA Notice}}

Revision as of 19:49, 8 November 2024

Problem

Let $\mathcal K$ be the kite formed by joining two right triangles with legs $1$ and $\sqrt3$ along a common hypotenuse. Eight copies of $\mathcal K$ are used to form the polygon shown below. What is the area of triangle $\Delta ABC$?

Asset-ddfea426a1acee64ea44467d8aa8797a.png

$\textbf{(A) }2+3\sqrt3\qquad\textbf{(B) }\dfrac92\sqrt3\qquad\textbf{(C) }\dfrac{10+8\sqrt3}{3}\qquad\textbf{(D) }8\qquad\textbf{(E) }5\sqrt3$

Solution 1

Let $\mathcal K$ be quadrilateral MNOP. Drawing line MO splits the triangle into $\Delta MNO$. Drawing the altitude from N to point Q on line MO, we know NQ is $\sqrt3/2$, MQ is $3/2$, and QO is $1/2$.

Screenshot 2024-11-08 2.33.52 PM.png

Due to the many similarities present, we can find that AB is $4(MQ)$, and the height of $\Delta ABC$ is $NQ+MN$

AB is $4(3/2)=6$ and the height of $\Delta ABC$ is $\sqrt3+\sqrt3/2=3\sqrt3/2$.

Solving for the area of $\Delta ABC$ gives $6*3\sqrt3/2*1/2$ which is $\textbf{(B) }\dfrac92\sqrt3\qquad$

~9897 (latex beginner here)

Solution 2

Let's start by looking at kite $\mathcal K$. We can quickly deduce based off of the side lengths that the kite can be split into two $30-60-90$ triangles. Going back to the triangle $\triangle ABC$, focus on side $AB$. There are $4$ kites, they are all either reflected over the line $AB$ or a line perpendicular to $AB$, meaning the length of $AB$ can be split up into 4 equal parts.

Pick out the bottom-left kite, and we can observe that the kite and the triangle formed by the intersection of the kite and $\Delta ABC$ share a $60$ degree angle. (this was deduced from the $30-60-90$ triangles in the kite) The line AB and the right side of the kite are perpendicular, forming a $90^{\circ}$ angle. Because that is also a $30-60-90$ triangle with a hypotenuse of $\sqrt3$, so we find the length of AB to be $4*3/2$, which is $6$.

Then, we can drop an altitude from $C$ to $AB$. We know that will be equivalent to the sum of the longer side of the kite and the shorter side of the triangle formed by the intersection of the kite and $\Delta ABC$. (Look at the line formed on the left of $C$ that drops down to $AB$ if you are confused) We already have those values from the $30-60-90$ triangles, so we can just plug it into the triangle area formula, $bh/2$. We get \[6\cdot\dfrac{\sqrt3+\frac{\sqrt3}{2}}{2}\rightarrow3\cdot(\sqrt3+\dfrac{\sqrt3}{2})\rightarrow3\cdot\dfrac{\sqrt3}{2}\rightarrow\boxed{\textbf{(B) }\dfrac92\sqrt3}\]

~YTH (Need help with Latex and formatting)

~WIP (Header)

~Tacos_are_yummy_1 ($\LaTeX$ & Formatting)

See also

2024 AMC 10A (ProblemsAnswer KeyResources)
Preceded by
Problem 21 		Followed by
Problem 23
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 10 Problems and Solutions

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