Difference between revisions of "2013 AMC 12B Problems/Problem 24"

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==Problem==
 
==Problem==
Let <math>ABC</math> be a triangle where <math>M</math> is the midpoint of <math>\overline{AC}</math>, and <math>\overline{CN}</math> is the angle bisector of <math>\angle{ACB}</math> with <math>N</math> on <math>\overline{AB}</math>. Let <math>X</math> be the intersection of the median <math>\overline{BM}</math> and the bisector <math>\overline{CN}</math>. In addition <math>\triangle BXN</math> is equilateral with <math>AC=2</math>. What is <math>BN^2</math>?
+
Let <math>ABC</math> be a triangle where <math>M</math> is the midpoint of <math>\overline{AC}</math>, and <math>\overline{CN}</math> is the angle bisector of <math>\angle{ACB}</math> with <math>N</math> on <math>\overline{AB}</math>. Let <math>X</math> be the intersection of the median <math>\overline{BM}</math> and the bisector <math>\overline{CN}</math>. In addition <math>\triangle BXN</math> is equilateral with <math>AC=2</math>. What is <math>BX^2</math>?
  
 
<math>\textbf{(A)}\  \frac{10-6\sqrt{2}}{7} \qquad \textbf{(B)}\ \frac{2}{9} \qquad \textbf{(C)}\ \frac{5\sqrt{2}-3\sqrt{3}}{8} \qquad \textbf{(D)}\ \frac{\sqrt{2}}{6} \qquad \textbf{(E)}\ \frac{3\sqrt{3}-4}{5}</math>
 
<math>\textbf{(A)}\  \frac{10-6\sqrt{2}}{7} \qquad \textbf{(B)}\ \frac{2}{9} \qquad \textbf{(C)}\ \frac{5\sqrt{2}-3\sqrt{3}}{8} \qquad \textbf{(D)}\ \frac{\sqrt{2}}{6} \qquad \textbf{(E)}\ \frac{3\sqrt{3}-4}{5}</math>
  
==Solution==
+
==Solution 1==
Let <math>BN=x</math> and <math>NA=y</math>. From the conditions, let's deduct some convenient conditions that seems sufficient to solve the problem.
+
Let <math>BN=x</math> and <math>NA=y</math>. From the conditions, let's deduct some convenient conditions that seem sufficient to solve the problem.
  
  
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Finally, using the law of cosine for triangle <math>BCN</math>, we get
 
Finally, using the law of cosine for triangle <math>BCN</math>, we get
  
<cmath>2 = BC^2 = x^2 + (2x+y)^2 - x(2x+y) = 3x^2 + 3xy + y^2 = (5+3\sqrt{2})x^2</cmath>
+
<cmath>2 = BC^2 = x^2 + (2x+y)^2 - x(2x+y) = 3x^2 + 3xy + y^2 = \left(5+3\sqrt{2}\right)x^2</cmath>
  
<cmath>x^2 = \frac{2}{5+3\sqrt{2}} = \boxed{\textbf{A }\frac{10-6\sqrt{2}}{7}}.</cmath>
+
<cmath>x^2 = \frac{2}{5+3\sqrt{2}} = \boxed{\textbf{(A) }\frac{10-6\sqrt{2}}{7}}.</cmath>
 +
 
 +
==Solution 2 (Analytic)==
 +
<center>[[File:2013 AMC 12B 24.jpg]]</center>
 +
 
 +
 
 +
Let us dilate triangle <math>ABC</math> so that the sides of equilateral triangle <math>BXN</math> are all equal to <math>2.</math> The purpose of this is to ease the calculations we make in the problem. Given this, we aim to find the length of segment <math>AM</math> so that we can un-dilate triangle <math>ABC</math> by dividing each of its sides by <math>AM</math>. Doing so will make it so that <math>AM = 1</math>, as desired, and doing so will allow us to get the length of <math>BN</math>, whose square is our final answer.
 +
 
 +
Let <math>O</math> the foot of the altitude from <math>B</math> to <math>NX.</math> On the coordinate plane, position <math>O</math> at <math>(0, 0)</math>, and make <math>NX</math> lie on the x-axis. Since points <math>N</math>, <math>X</math>, and <math>C</math>, are collinear, <math>C</math> must also lie on the x-axis. Additionally, since <math>NX = 2</math>, <math>OB = \sqrt{3}</math>, meaning that we can position point <math>B</math> at <math>(0, \sqrt{3})</math>. Now, notice that line <math>\overline{AB}</math> has the equation <math>y = \sqrt{3}x + \sqrt{3}</math> and that line <math>\overline{BM}</math> has the equation <math>y = -\sqrt{3}x + \sqrt{3}</math> because angles <math>BNX</math> and <math>BXN</math> are both <math>60^{\circ}</math>. We can then position <math>A</math> at point <math>(n, \sqrt{3}(n + 1))</math> and <math>C</math> at point <math>(p, 0)</math>. Quickly note that, because <math>CN</math> is an angle bisector, <math>AC</math> must pass through the point <math>(0, -\sqrt{3})</math>.
 +
 
 +
We proceed to construct a system of equations. First observe that the midpoint <math>M</math> of <math>AC</math> must lie on <math>BM</math>, with the equation <math>y = -\sqrt{3}x + \sqrt{3}</math>. The coordinates of <math>M</math> are <math>\left(\frac{p + n}{2}, \frac{\sqrt{3}}{2}(n + 1)\right)</math>, and we can plug in these coordinates into the equation of line <math>BM</math>, yielding that <cmath>\frac{\sqrt{3}}{2}(n + 1) = -\sqrt{3}(\frac{p + n}{2}) + \sqrt{3} \implies n + 1 = -p - n + 2 \implies p = -2n + 1.</cmath> For our second equation, notice that line <math>AC</math> has equation <math>y = \frac{\sqrt{3}}{p}x - \sqrt{3}</math>. Midpoint <math>M</math> must also lie on this line, and we can substitute coordinates again to get <cmath>\frac{\sqrt{3}}{2}(n + 1) = \frac{\sqrt{3}}{p}(\frac{p + n}{2}) - \sqrt{3} \implies n + 1 = \frac{p + n}{p} - 2 \implies n + 1 = \frac{n}{p} - 1</cmath> <cmath>\implies p = \frac{n}{n + 2}.</cmath>
 +
 
 +
Setting both equations equal to each other and multiplying both sides by <math>(n + 2)</math>, we have that <math>-2n^2 - 4n + n + 2 = n \implies -2n^2 - 4n + 2 = 0</math>, which in turn simplifies into <math>0 = n^2 + 2n - 1</math> when dividing the entire equation by <math>-2.</math> Using the quadratic formula, we have that <cmath>n = \frac{-2 \pm \sqrt{4 + 4}}{2} = -1 - \sqrt{2}.</cmath> Here, we discard the positive root since <math>A</math> must lie to the left of the y-axis. Then, the coordinates of <math>C</math> are <math>(3 + 2\sqrt{2}, 0)</math>, and the coordinates of <math>A</math> are <math>(-1 - \sqrt{2}, -\sqrt{6}).</math> Seeing that segment <math>AM</math> has half the length of side <math>AC</math>, we have that the length of <math>AM</math> is <cmath>\frac{\sqrt{(3 + 2\sqrt{2} - (-1 - \sqrt{2}))^2 + (\sqrt{6})^2}}{2} = \frac{\sqrt{16 + 24\sqrt{2} + 18 + 6}}{2} = \sqrt{10 + 6\sqrt{2}}.</cmath>
 +
 
 +
Now, we divide each side length of <math>\triangle ABC</math> by <math>AM</math>, and from this, <math>BN^2</math> will equal <math>\left(\frac{2}{\sqrt{10 + 6\sqrt{2}}}\right)^2 = \frac{2}{5+3\sqrt{2}} = \boxed{\textbf{(A) }\frac{10-6\sqrt{2}}{7}.}</math>
 +
 
 +
==Solution 3 ==
 +
 
 +
By some angle-chasing, we find that <math>\triangle ANC \sim \triangle BXC</math>. From here, construct a point <math>D</math> on <math>AC</math> such that <math>\triangle DXC \sim \triangle ANC</math>. Now, let <math>BC = a</math>, which means that <math>DM = a - 1</math> and <math>AD = 2 - a</math>, and let <math>BN = BX = XN = XD = DN = b</math>. Note that we want to compute <math>b^2</math>. Because <math>\triangle AND \sim \triangle DXM</math>, we have:
 +
 
 +
<cmath>\frac{AN}{2-a} = \frac{b}{a-1} \implies AN = \frac{b(2-a)}{(a-1)}</cmath>
 +
 
 +
However, we have more similar triangles. In fact, going back to our original pair of similar triangles - <math>\triangle ANC</math> and <math>\triangle BXC</math> - gives us more similarity ratios:
 +
 
 +
<cmath>\frac{AN}{AC} = \frac{BX}{BC} \implies \frac{\frac{b(2-a)}{(a-1)}}{2} = \frac{b}{a} \implies a = \sqrt{2}</cmath>
 +
 
 +
Since we constructed point <math>D</math> such that <math>DX</math> is parallel to <math>AB</math>, we now examine trapezoid <math>ABXD</math>. From the variables that we already set up, we know that <math>AB = b + b\sqrt{2}, BX = XD = b</math>, and <math>DA = 2 - \sqrt{2}</math>. Let <math>X'</math> denote the foot of the perpendicular from <math>X</math> to base <math>AB</math> and define <math>D'</math> similarly.
 +
 
 +
Because <math>\triangle BXX'</math> is a <math>30, 60, 90</math> triangle, <math>XX' = \frac{b\sqrt{3}}{2}</math> and <math>BX' = \frac{b}{2}</math>. Thus, <math>D'A = b\sqrt{2} - \frac{b}{2}</math> and <math>DD' = XX' = \frac{b\sqrt{3}}{2}</math>. By the Pythagorean Theorem on <math>\triangle ADD'</math>,
 +
 
 +
<cmath>\left (b\sqrt{2} - \frac{b}{2} \right)^2 + \left(\frac{b\sqrt{3}}{2} \right)^2 = \left(2 - \sqrt{2} \right)^2 \implies b^2 = \boxed{\textbf{(A) } \frac{10-6\sqrt{2}}{7}}</cmath>.
 +
 
 +
 
 +
==Solution 4 ==
 +
Since <math>\triangle BXN</math> is equilateral, let's assume the sides of them are all <math>a</math>, and denote the length of <math>XM</math> is <math>m</math>. Since <math>CN</math> bisects <math>\angle BCA</math>, applying the angle bisector theorem and we can get <math>BC=\frac{a}{m}</math>;<math>AN=2m</math>. Now applying LOC, we can get <math>(a+2m)^2+(a+m)^2-2(a+2m)(a+m)\cos\frac{\pi}{3}=1</math>. We get <math>a^2+3m^2+3am=1</math>. Now applying the Stewart theorem in <math>\triangle BAC</math>, we can find that <math>{\frac{a^2}{m^2}+(a+2m)^2=2(1+(a+m)^2)}</math>, after simplifying, we get <math>{\frac{a^2}{m^2}-a^2+2m^2=2}</math>. After observation, the main key for this problem is <math>a^2</math>, so we can solve <math>a</math> in term of <math>m</math>. Let's see the equation <math>{\frac{a^2}{m^2}-a^2+2m^2=2}</math>, we can find that <math>a=\sqrt{2}m</math> so <math>a^2=2m^2</math>. Now back solving the first equation we can get that <math>a=\frac{-3m+\sqrt{4-3m^2}}{m}</math>cuz the negative one can't work. After solving, we can get that <math>m^2=\frac{1}{5+3\sqrt{2}}</math> so <math>a^2=2m^2</math> and we get <math>a^2 = \boxed{\textbf{(A) } \frac{10-6\sqrt{2}}{7}}</math>~ bluesoul
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 +
==Solution 5 (Similar Triangles)==
 +
 
 +
Denote the length of <math>AN</math> as <math>a</math> and the length of <math>NB</math> as <math>b.</math>
 +
 
 +
Let <math>M'</math> be the midpoint of <math>\overline{BC} .</math> Denote the intersection of <math>\overline{MM'}</math> and <math>\overline{CN}</math> as <math>X' .</math> Note that <math>MX' = \frac12 AN = \frac{a}{2}</math> and <math>CN = 2\cdot NX' .</math> As <math>\overline{MM'} || \overline{AB},</math> we have that <math>\triangle MXX' \sim \triangle BXN</math> or <math>\triangle MXX'</math> is equilateral and <math>XX' =MX' = \frac{a}{2}.</math> Thus, <math>CN = 2b+a</math> and <math>CX=a+b.</math>
 +
 
 +
Observe that
 +
 
 +
<cmath>\triangle BXC\sim \triangle ANC \implies \frac{BX}{XC} =\frac{AN}{NC} \implies \frac{b}{b+a} = \frac{a}{2b+a} \implies a = \sqrt 2 b.</cmath>
 +
 
 +
By the angle bisector theorem, we have that <math>BC=\frac{2b}{a} = \sqrt 2.</math>
 +
 
 +
We apply the Law of Cosines on <math>\triangle BXC</math> as follows:
 +
<cmath>
 +
BC^2=BX^2+XC^2-2BX\cdot XC\cdot \cos120^\circ
 +
</cmath>
 +
<cmath>\begin{align*}
 +
2&=b^2+(\sqrt 2+1)^2b^2 +(\sqrt2 + 1)b^2 \\
 +
&=b^2(5+3\sqrt 2)
 +
\end{align*}</cmath>
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or
 +
<cmath>\boxed{b^2=\textbf{(A) } \frac{10-6\sqrt{2}}{7}}</cmath>
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 +
~ASAB
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 +
==Solution 6==
 +
 
 +
[[File:2013AMC12BProblem24Solution6.png|center|500px]]
 +
 
 +
<math>\angle BXC = \angle ANC</math>, <math>\angle BCX = \angle ACN</math>, <math>\triangle BCX \sim \triangle ACN</math>, <math>\frac{CX}{CN} = \frac{BC}{AC}</math>
 +
 
 +
<math>\angle MBC = \angle BAC</math>, <math>\angle BCM = \angle ACB</math>, <math>\triangle BCM \sim \triangle ACB</math>, <math>\frac{BC}{AC} = \frac{CM}{BC}</math>, <math>BC = \sqrt{2}</math>
 +
 
 +
Let <math>BX = x</math>, <math>CN = CX + x</math>, <math>\frac{CX}{CX + x} = \frac{\sqrt{2}}{2}</math>, <math>2CX = CX \sqrt{2} + x \sqrt{2}</math>, <math>CX = x(\sqrt{2} + 1)</math>
 +
 
 +
<math>BC^2 = BX^2 + CX^2 - 2 \cdot BX \cdot CX \cdot \cos 120^\circ</math>
 +
 
 +
<math>2 = x^2(\sqrt{2} + 1)^2 + x^2 + x^2(\sqrt{2} + 1) = 5x^2 + 3x^2 \sqrt{2}</math>
 +
 
 +
<math>x^2 = \frac{2}{5 + 3 \sqrt{2} } = \boxed{\textbf{(A) }\frac{10-6\sqrt{2}}{7}}</math>
 +
 
 +
~[https://artofproblemsolving.com/wiki/index.php/User:Isabelchen isabelchen]
 +
 
 +
==Video Solution by MOP 2024==
 +
https://youtu.be/y0s6OTQ7KfI
 +
 
 +
~r00tsOfUnity
  
 
== See also ==
 
== See also ==

Latest revision as of 21:49, 20 October 2024

Problem

Let $ABC$ be a triangle where $M$ is the midpoint of $\overline{AC}$, and $\overline{CN}$ is the angle bisector of $\angle{ACB}$ with $N$ on $\overline{AB}$. Let $X$ be the intersection of the median $\overline{BM}$ and the bisector $\overline{CN}$. In addition $\triangle BXN$ is equilateral with $AC=2$. What is $BX^2$?

$\textbf{(A)}\  \frac{10-6\sqrt{2}}{7} \qquad \textbf{(B)}\ \frac{2}{9} \qquad \textbf{(C)}\ \frac{5\sqrt{2}-3\sqrt{3}}{8} \qquad \textbf{(D)}\ \frac{\sqrt{2}}{6} \qquad \textbf{(E)}\ \frac{3\sqrt{3}-4}{5}$

Solution 1

Let $BN=x$ and $NA=y$. From the conditions, let's deduct some convenient conditions that seem sufficient to solve the problem.


$M$ is the midpoint of side $AC$.

This implies that $[ABX]=[CBX]$. Given that angle $ABX$ is $60$ degrees and angle $BXC$ is $120$ degrees, we can use the area formula to get

\[\frac{1}{2}(x+y)x \frac{\sqrt{3}}{2} = \frac{1}{2} x \cdot CX \frac{\sqrt{3}}{2}\]

So, $x+y=CX$ .....(1)


$CN$ is angle bisector.

In the triangle $ABC$, one has $BC/AC=x/y$, therefore $BC=2x/y$.....(2)

Furthermore, triangle $BCN$ is similar to triangle $MCX$, so $BC/CM=CN/CX$, therefore $BC = (CX+x)/CX = (2x+y)/(x+y)$....(3)

By (2) and (3) and the subtraction law of ratios, we get

\[BC=2x/y = (2x+y)/(y+x) = y/x\]

Therefore $2x^2=y^2$, or $y=\sqrt{2}x$. So $BC = 2x/(\sqrt{2}x) = \sqrt{2}$.

Finally, using the law of cosine for triangle $BCN$, we get

\[2 = BC^2 = x^2 + (2x+y)^2 - x(2x+y) = 3x^2 + 3xy + y^2 = \left(5+3\sqrt{2}\right)x^2\]

\[x^2 = \frac{2}{5+3\sqrt{2}} = \boxed{\textbf{(A) }\frac{10-6\sqrt{2}}{7}}.\]

Solution 2 (Analytic)

2013 AMC 12B 24.jpg


Let us dilate triangle $ABC$ so that the sides of equilateral triangle $BXN$ are all equal to $2.$ The purpose of this is to ease the calculations we make in the problem. Given this, we aim to find the length of segment $AM$ so that we can un-dilate triangle $ABC$ by dividing each of its sides by $AM$. Doing so will make it so that $AM = 1$, as desired, and doing so will allow us to get the length of $BN$, whose square is our final answer.

Let $O$ the foot of the altitude from $B$ to $NX.$ On the coordinate plane, position $O$ at $(0, 0)$, and make $NX$ lie on the x-axis. Since points $N$, $X$, and $C$, are collinear, $C$ must also lie on the x-axis. Additionally, since $NX = 2$, $OB = \sqrt{3}$, meaning that we can position point $B$ at $(0, \sqrt{3})$. Now, notice that line $\overline{AB}$ has the equation $y = \sqrt{3}x + \sqrt{3}$ and that line $\overline{BM}$ has the equation $y = -\sqrt{3}x + \sqrt{3}$ because angles $BNX$ and $BXN$ are both $60^{\circ}$. We can then position $A$ at point $(n, \sqrt{3}(n + 1))$ and $C$ at point $(p, 0)$. Quickly note that, because $CN$ is an angle bisector, $AC$ must pass through the point $(0, -\sqrt{3})$.

We proceed to construct a system of equations. First observe that the midpoint $M$ of $AC$ must lie on $BM$, with the equation $y = -\sqrt{3}x + \sqrt{3}$. The coordinates of $M$ are $\left(\frac{p + n}{2}, \frac{\sqrt{3}}{2}(n + 1)\right)$, and we can plug in these coordinates into the equation of line $BM$, yielding that \[\frac{\sqrt{3}}{2}(n + 1) = -\sqrt{3}(\frac{p + n}{2}) + \sqrt{3} \implies n + 1 = -p - n + 2 \implies p = -2n + 1.\] For our second equation, notice that line $AC$ has equation $y = \frac{\sqrt{3}}{p}x - \sqrt{3}$. Midpoint $M$ must also lie on this line, and we can substitute coordinates again to get \[\frac{\sqrt{3}}{2}(n + 1) = \frac{\sqrt{3}}{p}(\frac{p + n}{2}) - \sqrt{3} \implies n + 1 = \frac{p + n}{p} - 2 \implies n + 1 = \frac{n}{p} - 1\] \[\implies p = \frac{n}{n + 2}.\]

Setting both equations equal to each other and multiplying both sides by $(n + 2)$, we have that $-2n^2 - 4n + n + 2 = n \implies -2n^2 - 4n + 2 = 0$, which in turn simplifies into $0 = n^2 + 2n - 1$ when dividing the entire equation by $-2.$ Using the quadratic formula, we have that \[n = \frac{-2 \pm \sqrt{4 + 4}}{2} = -1 - \sqrt{2}.\] Here, we discard the positive root since $A$ must lie to the left of the y-axis. Then, the coordinates of $C$ are $(3 + 2\sqrt{2}, 0)$, and the coordinates of $A$ are $(-1 - \sqrt{2}, -\sqrt{6}).$ Seeing that segment $AM$ has half the length of side $AC$, we have that the length of $AM$ is \[\frac{\sqrt{(3 + 2\sqrt{2} - (-1 - \sqrt{2}))^2 + (\sqrt{6})^2}}{2} = \frac{\sqrt{16 + 24\sqrt{2} + 18 + 6}}{2} = \sqrt{10 + 6\sqrt{2}}.\]

Now, we divide each side length of $\triangle ABC$ by $AM$, and from this, $BN^2$ will equal $\left(\frac{2}{\sqrt{10 + 6\sqrt{2}}}\right)^2 = \frac{2}{5+3\sqrt{2}} = \boxed{\textbf{(A) }\frac{10-6\sqrt{2}}{7}.}$

Solution 3

By some angle-chasing, we find that $\triangle ANC \sim \triangle BXC$. From here, construct a point $D$ on $AC$ such that $\triangle DXC \sim \triangle ANC$. Now, let $BC = a$, which means that $DM = a - 1$ and $AD = 2 - a$, and let $BN = BX = XN = XD = DN = b$. Note that we want to compute $b^2$. Because $\triangle AND \sim \triangle DXM$, we have:

\[\frac{AN}{2-a} = \frac{b}{a-1} \implies AN = \frac{b(2-a)}{(a-1)}\]

However, we have more similar triangles. In fact, going back to our original pair of similar triangles - $\triangle ANC$ and $\triangle BXC$ - gives us more similarity ratios:

\[\frac{AN}{AC} = \frac{BX}{BC} \implies \frac{\frac{b(2-a)}{(a-1)}}{2} = \frac{b}{a} \implies a = \sqrt{2}\]

Since we constructed point $D$ such that $DX$ is parallel to $AB$, we now examine trapezoid $ABXD$. From the variables that we already set up, we know that $AB = b + b\sqrt{2}, BX = XD = b$, and $DA = 2 - \sqrt{2}$. Let $X'$ denote the foot of the perpendicular from $X$ to base $AB$ and define $D'$ similarly.

Because $\triangle BXX'$ is a $30, 60, 90$ triangle, $XX' = \frac{b\sqrt{3}}{2}$ and $BX' = \frac{b}{2}$. Thus, $D'A = b\sqrt{2} - \frac{b}{2}$ and $DD' = XX' = \frac{b\sqrt{3}}{2}$. By the Pythagorean Theorem on $\triangle ADD'$,

\[\left (b\sqrt{2} - \frac{b}{2} \right)^2 + \left(\frac{b\sqrt{3}}{2} \right)^2 = \left(2 - \sqrt{2} \right)^2 \implies b^2 = \boxed{\textbf{(A) } \frac{10-6\sqrt{2}}{7}}\].


Solution 4

Since $\triangle BXN$ is equilateral, let's assume the sides of them are all $a$, and denote the length of $XM$ is $m$. Since $CN$ bisects $\angle BCA$, applying the angle bisector theorem and we can get $BC=\frac{a}{m}$;$AN=2m$. Now applying LOC, we can get $(a+2m)^2+(a+m)^2-2(a+2m)(a+m)\cos\frac{\pi}{3}=1$. We get $a^2+3m^2+3am=1$. Now applying the Stewart theorem in $\triangle BAC$, we can find that ${\frac{a^2}{m^2}+(a+2m)^2=2(1+(a+m)^2)}$, after simplifying, we get ${\frac{a^2}{m^2}-a^2+2m^2=2}$. After observation, the main key for this problem is $a^2$, so we can solve $a$ in term of $m$. Let's see the equation ${\frac{a^2}{m^2}-a^2+2m^2=2}$, we can find that $a=\sqrt{2}m$ so $a^2=2m^2$. Now back solving the first equation we can get that $a=\frac{-3m+\sqrt{4-3m^2}}{m}$cuz the negative one can't work. After solving, we can get that $m^2=\frac{1}{5+3\sqrt{2}}$ so $a^2=2m^2$ and we get $a^2 = \boxed{\textbf{(A) } \frac{10-6\sqrt{2}}{7}}$~ bluesoul

Solution 5 (Similar Triangles)

Denote the length of $AN$ as $a$ and the length of $NB$ as $b.$

Let $M'$ be the midpoint of $\overline{BC} .$ Denote the intersection of $\overline{MM'}$ and $\overline{CN}$ as $X' .$ Note that $MX' = \frac12 AN = \frac{a}{2}$ and $CN = 2\cdot NX' .$ As $\overline{MM'} || \overline{AB},$ we have that $\triangle MXX' \sim \triangle BXN$ or $\triangle MXX'$ is equilateral and $XX' =MX' = \frac{a}{2}.$ Thus, $CN = 2b+a$ and $CX=a+b.$

Observe that

\[\triangle BXC\sim \triangle ANC \implies \frac{BX}{XC} =\frac{AN}{NC} \implies \frac{b}{b+a} = \frac{a}{2b+a} \implies a = \sqrt 2 b.\]

By the angle bisector theorem, we have that $BC=\frac{2b}{a} = \sqrt 2.$

We apply the Law of Cosines on $\triangle BXC$ as follows: \[BC^2=BX^2+XC^2-2BX\cdot XC\cdot \cos120^\circ\] \begin{align*} 2&=b^2+(\sqrt 2+1)^2b^2 +(\sqrt2 + 1)b^2 \\ &=b^2(5+3\sqrt 2) \end{align*} or \[\boxed{b^2=\textbf{(A) } \frac{10-6\sqrt{2}}{7}}\]

~ASAB

Solution 6

2013AMC12BProblem24Solution6.png

$\angle BXC = \angle ANC$, $\angle BCX = \angle ACN$, $\triangle BCX \sim \triangle ACN$, $\frac{CX}{CN} = \frac{BC}{AC}$

$\angle MBC = \angle BAC$, $\angle BCM = \angle ACB$, $\triangle BCM \sim \triangle ACB$, $\frac{BC}{AC} = \frac{CM}{BC}$, $BC = \sqrt{2}$

Let $BX = x$, $CN = CX + x$, $\frac{CX}{CX + x} = \frac{\sqrt{2}}{2}$, $2CX = CX \sqrt{2} + x \sqrt{2}$, $CX = x(\sqrt{2} + 1)$

$BC^2 = BX^2 + CX^2 - 2 \cdot BX \cdot CX \cdot \cos 120^\circ$

$2 = x^2(\sqrt{2} + 1)^2 + x^2 + x^2(\sqrt{2} + 1) = 5x^2 + 3x^2 \sqrt{2}$

$x^2 = \frac{2}{5 + 3 \sqrt{2} } = \boxed{\textbf{(A) }\frac{10-6\sqrt{2}}{7}}$

~isabelchen

Video Solution by MOP 2024

https://youtu.be/y0s6OTQ7KfI

~r00tsOfUnity

See also

2013 AMC 12B (ProblemsAnswer KeyResources)
Preceded by
Problem 23
Followed by
Problem 25
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

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