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2021 Fall AMC 12B Problems/Problem 24: Difference between revisions

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- kevinmathz
- kevinmathz
== Solution 3 ==
This solution is based on this figure: [[:Image:2021_AMC_12B_(Nov)_Problem_24,_sol.png]]
Denote by <math>O</math> the circumcenter of <math>\triangle BED</math>.
Denote by <math>R</math> the circumradius of <math>\triangle BED</math>.
In <math>\triangle BCF</math>, following from the law of cosines, we have
<cmath>
\begin{align*}
CF^2 & = BC^2 + BF^2 - 2 BC \cdot BF \cos \angle CBF \\
& = BC^2 + BF^2 + 2 BC \cdot BF \cos \angle ABC .  \hspace{1cm} (1)
\end{align*}
</cmath>
For <math>BF</math>, we have
<cmath>
\begin{align*}
BF & = 2 R \cos \angle FBO \\
& = 2 R \cos \left( 180^\circ - \angle ABC - \angle CBO \right) \\
& = 2 R \cos \left( 180^\circ - \angle ABC - \frac{180^\circ - \angle BOD}{2} \right) \\
& = 2 R \cos \left( 180^\circ - \angle ABC - \frac{180^\circ - 2 \angle BED}{2} \right) \\
& = 2 R \cos \left( 180^\circ - \angle ABC - \frac{180^\circ - 2 \angle BCA}{2} \right) \\
& = 2 R \cos \left( 90^\circ - \angle ABC + \angle BCA \right) \\
& = 2 R \sin \left( \angle ABC - \angle BCA \right) \\
& = \frac{BD}{\sin \angle BED} \sin \left( \angle ABC - \angle BCA \right) \\
& = \frac{BD}{\sin \angle BCA} \sin \left( \angle ABC - \angle BCA \right) \\
& = BD \left( \sin \angle ABC \cot \angle BCA - \cos \angle ABC \right) . \hspace{1cm} (2)
\end{align*}
</cmath>
The fourth equality follows from the property that <math>B</math>, <math>D</math>, <math>E</math> are concyclic.
The fifth and the ninth equalities follow from the property that <math>A</math>, <math>B</math>, <math>C</math>, <math>E</math> are concyclic.
Because <math>AD</math> bisects <math>\angle BAC</math>, following from the angle bisector theorem, we have
<cmath>
\[
\frac{BD}{CD} = \frac{AB}{AC} .
\]
</cmath>
Hence, <math>BD = \frac{24 \cdot 11}{31}</math>.
In <math>\triangle ABC</math>, following from the law of cosines, we have
<cmath>
\begin{align*}
\cos \angle ABC & = \frac{AB^2 + BC^2 - AC^2}{2 AB \cdot BC} \\
& = \frac{9}{16}
\end{align*}
</cmath>
and
<cmath>
\begin{align*}
\cos \angle BCA & = \frac{AC^2 + BC^2 - AB^2}{2 AC \cdot BC} \\
& = \frac{57}{64} .
\end{align*}
</cmath>
Hence, <math>\sin \angle ABC = \frac{5 \sqrt{7}}{16}</math> and <math>\sin \angle BCA = \frac{11 \sqrt{7}}{64}</math>.
Hence, <math>\cot \angle BCA = \frac{57}{11 \sqrt{7}}</math>.
Now, we are ready to compute <math>BF</math> whose expression is given in Equation (2).
We get <math>BF = 9</math>.
Now, we can compute <math>CF</math> whose expression is given in Equation (1).
We have <math>CF = 30</math>.
Therefore, the answer is <math>\boxed{\textbf{(C) }30}</math>.
~Steven Chen (www.professorchenedu.com)


==See Also==
==See Also==
{{AMC12 box|year=2021 Fall|ab=B|num-a=25|num-b=23}}
{{AMC12 box|year=2021 Fall|ab=B|num-a=25|num-b=23}}
{{MAA Notice}}
{{MAA Notice}}

Revision as of 23:32, 25 November 2021

Problem

Triangle $ABC$ has side lengths $AB = 11, BC=24$, and $CA = 20$. The bisector of $\angle{BAC}$ intersects $\overline{BC}$ in point $D$, and intersects the circumcircle of $\triangle{ABC}$ in point $E \ne A$. The circumcircle of $\triangle{BED}$ intersects the line $AB$ in points $B$ and $F \ne B$. What is $CF$?

$\textbf{(A) } 28 \qquad \textbf{(B) } 20\sqrt{2} \qquad \textbf{(C) } 30 \qquad \textbf{(D) } 32 \qquad \textbf{(E) } 20\sqrt{3}$

Solution 1

By the Inscribed Angle Theorem and the definition of angle bisectors note that\[\angle ABD=\angle ABC=\angle AEC\ \text{and}\ \angle BAD=\angle DAC=\angle EAC\]so $\triangle ABD\sim\triangle AEC$. Therefore $\frac{AB}{AD}=\frac{AE}{AC}\rightarrow AB\cdot AC=AD\cdot AE$. By PoP, we can also express $AD\cdot AE$ as $AB\cdot AF,$ so $AB\cdot AC=AB\cdot AF\rightarrow AC=AF=20$ and $BF=20-AB=20-11=9$. Let $CF=x$. Applying Stewart’s theorem on $\triangle ACF$ with cevian $\overrightarrow{CB},$ we have \begin{align*} 11\cdot 9\cdot 20+24\cdot 20\cdot 24&=11x^{2}+20\cdot 9\cdot 20 \\ 1980+11{,}520&=11x^{2}+3600 \\ 13{,}500&=11x^{2}+3600 \\ 11x^{2}&=9900 \\ x^{2}&=900 \\ x&=\boxed{\textbf{(C)} ~30}. \end{align*}

~Punxsutawney Phil

Solution 2

Claim: $\triangle ADC \sim \triangle ABE.$

Proof: Note that $\angle CAD = \angle CAE = \angle EAB$ and $\angle DCA = \angle BCA = \angle BEA$ meaning that our claim is true by AA similarity.

Because of this similarity, we have that \[\frac{AC}{AD} = \frac{AE}{AB} \to AB \cdot AC = AD \cdot AE = AB \cdot AF\] by Power of a Point. Thus, $AC=AF=20.$

Now, note that $\angle CAF = \angle CAB$ and plug into Law of Cosines to find the angle's cosine: \[AB^2+AC^2-2\cdot AB \cdot AC \cdot \cos(\angle CAB) = BC^2 \to \cos(\angle CAB) = -\frac{1}{8}.\]

So, we observe that we can use Law of Cosines again to find $CF$: \[AF^2+AC^2-2 \cdot AF \cdot AC \cdot \cos(\angle CAF) = CF^2 \to CF = \boxed{\textbf{(C) }30}.\]

- kevinmathz

Solution 3

This solution is based on this figure: Image:2021_AMC_12B_(Nov)_Problem_24,_sol.png

Denote by $O$ the circumcenter of $\triangle BED$. Denote by $R$ the circumradius of $\triangle BED$.

In $\triangle BCF$, following from the law of cosines, we have \begin{align*} CF^2 & = BC^2 + BF^2 - 2 BC \cdot BF \cos \angle CBF \\ & = BC^2 + BF^2 + 2 BC \cdot BF \cos \angle ABC . \hspace{1cm} (1) \end{align*}

For $BF$, we have \begin{align*} BF & = 2 R \cos \angle FBO \\ & = 2 R \cos \left( 180^\circ - \angle ABC - \angle CBO \right) \\ & = 2 R \cos \left( 180^\circ - \angle ABC - \frac{180^\circ - \angle BOD}{2} \right) \\ & = 2 R \cos \left( 180^\circ - \angle ABC - \frac{180^\circ - 2 \angle BED}{2} \right) \\ & = 2 R \cos \left( 180^\circ - \angle ABC - \frac{180^\circ - 2 \angle BCA}{2} \right) \\ & = 2 R \cos \left( 90^\circ - \angle ABC + \angle BCA \right) \\ & = 2 R \sin \left( \angle ABC - \angle BCA \right) \\ & = \frac{BD}{\sin \angle BED} \sin \left( \angle ABC - \angle BCA \right) \\ & = \frac{BD}{\sin \angle BCA} \sin \left( \angle ABC - \angle BCA \right) \\ & = BD \left( \sin \angle ABC \cot \angle BCA - \cos \angle ABC \right) . \hspace{1cm} (2) \end{align*} The fourth equality follows from the property that $B$, $D$, $E$ are concyclic. The fifth and the ninth equalities follow from the property that $A$, $B$, $C$, $E$ are concyclic.

Because $AD$ bisects $\angle BAC$, following from the angle bisector theorem, we have \[ \frac{BD}{CD} = \frac{AB}{AC} . \]

Hence, $BD = \frac{24 \cdot 11}{31}$.

In $\triangle ABC$, following from the law of cosines, we have \begin{align*} \cos \angle ABC & = \frac{AB^2 + BC^2 - AC^2}{2 AB \cdot BC} \\ & = \frac{9}{16} \end{align*} and \begin{align*} \cos \angle BCA & = \frac{AC^2 + BC^2 - AB^2}{2 AC \cdot BC} \\ & = \frac{57}{64} . \end{align*}

Hence, $\sin \angle ABC = \frac{5 \sqrt{7}}{16}$ and $\sin \angle BCA = \frac{11 \sqrt{7}}{64}$. Hence, $\cot \angle BCA = \frac{57}{11 \sqrt{7}}$.

Now, we are ready to compute $BF$ whose expression is given in Equation (2). We get $BF = 9$.

Now, we can compute $CF$ whose expression is given in Equation (1). We have $CF = 30$.


Therefore, the answer is $\boxed{\textbf{(C) }30}$.

~Steven Chen (www.professorchenedu.com)

See Also

2021 Fall 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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