Difference between revisions of "2015 AIME I Problems/Problem 6"

Revision as of 13:41, 1 September 2022

Problem

Point $A,B,C,D,$ and $E$ are equally spaced on a minor arc of a circle. Points $E,F,G,H,I$ and $A$ are equally spaced on a minor arc of a second circle with center $C$ as shown in the figure below. The angle $\angle ABD$ exceeds $\angle AHG$ by $12^\circ$ . Find the degree measure of $\angle BAG$ .

$[asy] pair A,B,C,D,E,F,G,H,I,O; O=(0,0); C=dir(90); B=dir(70); A=dir(50); D=dir(110); E=dir(130); draw(arc(O,1,50,130)); real x=2*sin(20*pi/180); F=x*dir(228)+C; G=x*dir(256)+C; H=x*dir(284)+C; I=x*dir(312)+C; draw(arc(C,x,200,340)); label("$A$",A,dir(0)); label("$B$",B,dir(75)); label("$C$",C,dir(90)); label("$D$",D,dir(105)); label("$E$",E,dir(180)); label("$F$",F,dir(225)); label("$G$",G,dir(260)); label("$H$",H,dir(280)); label("$I$",I,dir(315)); [/asy]$

Solution 1

Let $O$ be the center of the circle with $ABCDE$ on it.

Let $x$ be the degree measurement of $\overarc{ED}=\overarc{DC}=\overarc{CB}=\overarc{BA}$ in circle $O$

and $y$ be the degree measurement of $\overarc{EF}=\overarc{FG}=\overarc{GH}=\overarc{HI}=\overarc{IA}$ in circle $C$ .

$\angle ECA$ is, therefore, $5y$ by way of circle $C$ and $\frac{360-4x}{2}=180-2x$ by way of circle $O$ . $\angle ABD$ is $180 - \frac{3x}{2}$ by way of circle $O$ , and $\angle AHG = 180 - \frac{3y}{2}$ by way of circle $C$ .

This means that:

$180-\frac{3x}{2}=180-\frac{3y}{2}+12$

which when simplified yields $\frac{3x}{2}+12=\frac{3y}{2}$ or $x+8=y$ Since: $5y=180-2x$ and $5x+40=180-2x$ So: $7x=140\Longleftrightarrow x=20$ $y=28$ $\angle BAG$ is equal to $\angle BAE$ + $\angle EAG$ , which equates to $\frac{3x}{2} + y$ . Plugging in yields $30+28$ , or $\boxed{058}$ .

Solution 2

Let $m$ be the degree measurement of $\angle GCH$ . Since $G,H$ lie on a circle with center $C$ , $\angle GHC=\frac{180-m}{2}=90-\frac{m}{2}$ .

Since $\angle ACH=2 \angle GCH=2m$ , $\angle AHC=\frac{180-2m}{2}=90-m$ . Adding $\angle GHC$ and $\angle AHC$ gives $\angle AHG=180-\frac{3m}{2}$ , and $\angle ABD=\angle AHG+12=192-\frac{3m}{2}$ . Since $AE$ is parallel to $BD$ , $\angle DBA=180-\angle ABD=\frac{3m}{2}-12=$ $\overarc{BE}$ .

We are given that $A,B,C,D,E$ are evenly distributed on a circle. Hence,

$\overarc{ED}=\overarc{DC}=\overarc{CB}=\overarc{BA}$ $=\frac{\angle DBA}{3}=\frac{m}{2}-4$

Here comes the key: Draw a line through $C$ parallel to $AE$ , and select a point $X$ to the right of point $C$ .

$\angle ACX$ = $\overarc{AB}$ + $\overarc{BC}$ = $m-8$ .

Let the midpoint of $\overline{HG}$ be $Y$ , then $\angle YCX=\angle ACX+\angle ACY=(m-8)+\frac{5m}{2}=90$ . Solving gives $m=28$

The rest of the solution proceeds as in solution 1, which gives $\boxed{058}$

Solution 3

Let $\angle GAH = \varphi \implies \overset{\Large\frown} {GH} = 2\varphi \implies$ $\overset{\Large\frown} {EF} = \overset{\Large\frown} {FG} = \overset{\Large\frown} {HI} = \overset{\Large\frown} {IA} = 2\varphi \implies$ $\angle AGH = 2\varphi, \angle ACE = 10 \varphi.$

$BD||GH \implies \angle AJB = \angle AGH = 2 \varphi.$ $\triangle AHG: \angle AHG = \beta = 180^\circ – 3 \varphi$ $\triangle ABJ: \angle ABD + \angle BAG = \alpha + \gamma = 180^\circ + 2 \varphi.$ Let arc $\overset{\Large\frown} {AB} = 2\psi \implies$ $\angle ACE = \frac {360^\circ – 8 \psi}{2}= 180^\circ – 4 \psi, \angle ABD = \frac {360^\circ – 6 \psi}{2} =180^\circ – 3 \psi.$ $\beta – \gamma = 3(\varphi – \psi) = 12^\circ \implies \psi = \varphi – 4^\circ \implies 10 \varphi = 180^\circ – 4(\varphi – 4^\circ) \implies 14 \varphi = 168^\circ \implies \varphi = 12^\circ.$

Therefore $\gamma = 180^\circ – 3 \cdot (12^\circ – 4^\circ) = 156^\circ \implies \alpha = 180^\circ + 2 \cdot 12^\circ – 156^\circ = \boxed{\textbf{058}}.$

@@ Line 70: / Line 70: @@
+==Solution 3==
+[[File:2015 AIME I 6.png|500px|right]]
+Let <math>\angle GAH = \varphi \implies \overset{\Large\frown} {GH} = 2\varphi \implies</math>
+<cmath>\overset{\Large\frown} {EF} = \overset{\Large\frown} {FG} = \overset{\Large\frown} {HI} = \overset{\Large\frown} {IA} = 2\varphi \implies</cmath>
+<cmath>\angle AGH = 2\varphi, \angle ACE = 10 \varphi.</cmath>
+<cmath>BD||GH \implies \angle AJB = \angle AGH = 2 \varphi.</cmath>
+<cmath>\triangle AHG:  \angle AHG = \beta = 180^\circ – 3 \varphi </cmath>
+<cmath>\triangle ABJ:  \angle ABD + \angle BAG = \alpha + \gamma = 180^\circ + 2 \varphi. </cmath>
+Let arc <math> \overset{\Large\frown} {AB} = 2\psi \implies</math>
+<math>\angle ACE = \frac {360^\circ – 8 \psi}{2}= 180^\circ – 4 \psi,  \angle ABD = \frac {360^\circ – 6 \psi}{2} =180^\circ – 3 \psi.</math>
+<math>\beta – \gamma = 3(\varphi – \psi) = 12^\circ \implies \psi = \varphi – 4^\circ \implies 10 \varphi = 180^\circ – 4(\varphi – 4^\circ) \implies 14 \varphi = 168^\circ \implies \varphi = 12^\circ.</math>
+Therefore <math>\gamma = 180^\circ – 3 \cdot (12^\circ – 4^\circ) = 156^\circ \implies  \alpha = 180^\circ + 2 \cdot 12^\circ – 156^\circ = \boxed{\textbf{058}}.</math>
 ==See Also==

2015 AIME I (Problems • Answer Key • Resources)
Preceded by Problem 5	Followed by Problem 7
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