Difference between revisions of "1985 AIME Problems/Problem 9"

Revision as of 19:23, 27 June 2019

Problem

In a circle, parallel chords of lengths 2, 3, and 4 determine central angles of $\alpha$ , $\beta$ , and $\alpha + \beta$ radians, respectively, where $\alpha + \beta < \pi$ . If $\cos \alpha$ , which is a positive rational number, is expressed as a fraction in lowest terms, what is the sum of its numerator and denominator?

Solution 1

$[asy] size(200); pointpen = black; pathpen = black + linewidth(0.8); real r = 8/15^0.5, a = 57.91, b = 93.135; pair O = (0,0), A = r*expi(pi/3); D(CR(O,r)); D(O--rotate(a/2)*A--rotate(-a/2)*A--cycle); D(O--rotate(b/2)*A--rotate(-b/2)*A--cycle); D(O--rotate((a+b)/2)*A--rotate(-(a+b)/2)*A--cycle); MP("2",(rotate(a/2)*A+rotate(-a/2)*A)/2,NE); MP("3",(rotate(b/2)*A+rotate(-b/2)*A)/2,NE); MP("4",(rotate((a+b)/2)*A+rotate(-(a+b)/2)*A)/2,NE); D(anglemark(rotate(-(a+b)/2)*A,O,rotate((a+b)/2)*A,5)); label("$\alpha+\beta$",(0.08,0.08),NE,fontsize(8)); [/asy]$

All chords of a given length in a given circle subtend the same arc and therefore the same central angle. Thus, by the given, we can re-arrange our chords into a triangle with the circle as its circumcircle.

$[asy] size(200); pointpen = black; pathpen = black + linewidth(0.8); real r = 8/15^0.5, a = 57.91, b = 93.135; pair O = (0,0), A = r*expi(pi/3), A1 = rotate(a/2)*A, A2 = rotate(-a/2)*A, A3 = rotate(-a/2-b)*A; D(CR(O,r)); D(O--A1--A2--cycle); D(O--A2--A3--cycle); D(O--A1--A3--cycle); MP("2",(A1+A2)/2,NE); MP("3",(A2+A3)/2,E); MP("4",(A1+A3)/2,E); D(anglemark(A2,O,A1,5)); D(anglemark(A3,O,A2,5)); label("$\alpha$",(0.07,0.16),NE,fontsize(8)); label("$\beta$",(0.12,-0.16),NE,fontsize(8)); [/asy]$

This triangle has semiperimeter $\frac{2 + 3 + 4}{2}$ so by Heron's formula it has area $K = \sqrt{\frac92 \cdot \frac52 \cdot \frac32 \cdot \frac12} = \frac{3}{4}\sqrt{15}$ . The area of a given triangle with sides of length $a, b, c$ and circumradius of length $R$ is also given by the formula $K = \frac{abc}{4R}$ , so $\frac6R = \frac{3}{4}\sqrt{15}$ and $R = \frac8{\sqrt{15}}$ .

Now, consider the triangle formed by two radii and the chord of length 2. This isosceles triangle has vertex angle $\alpha$ , so by the Law of Cosines,

$2^2 = R^2 + R^2 - 2R^2\cos \alpha \Longrightarrow \cos \alpha = \frac{2R^2 - 4}{2R^2} = \frac{17}{32}$ and the answer is $17 + 32 = \boxed{049}$ .

Solution 2 (Law of Cosines)

$[asy] size(200); pointpen = black; pathpen = black + linewidth(0.8); real r = 8/15^0.5, a = 57.91, b = 93.135; pair O = (0,0), A = r*expi(pi/3), A1 = rotate(a/2)*A, A2 = rotate(-a/2)*A, A3 = rotate(-a/2-b)*A; D(CR(O,r)); D(O--A1--A2--cycle); D(O--A2--A3--cycle); D(O--A1--A3--cycle); MP("2",(A1+A2)/2,NE); MP("3",(A2+A3)/2,E); MP("4",(A1+A3)/2,E); D(anglemark(A2,O,A1,5)); D(anglemark(A3,O,A2,5)); D(anglemark(A2,A3,A1,18)); label("$\alpha$",(0.07,0.16),NE,fontsize(8)); label("$\beta$",(0.12,-0.16),NE,fontsize(8)); label("$\alpha$/2",(0.82,-1.25),NE,fontsize(8)); [/asy]$

It’s easy to see in triangle which lengths 2, 3, and 4, that the angle opposite the side 2 is $\frac{\alpha}{2}$ , and using the Law of Cosines, we get: $2^2 = 3^2 + 4^2 - 2\cdot3\cdot4\cos\frac{\alpha}{2}$ Which, rearranges to: $21 = 24cos\frac{\alpha}{2}$ And, that gets us: $cos\frac{\alpha}{2} = 7/8$ Using $\cos 2\theta = 2\cos^2 \theta - 1$ , we get that: $\cos\alpha = 17/32$ Which gives an answer of $\boxed{049}$

- AlexLikeMath

Solution 3 (trig)

Using the first diagram above, $\sin \frac{\alpha}{2} = \frac{1}{r}$ $\sin \frac{\beta}{2} = \frac{1.5}{r}$ $\sin(\frac{\alpha}{2}+\frac{\beta}{2})=\frac{2}{r}$ by the Pythagorean trig identities, $\cos\frac{\alpha}{2}=\sqrt{1-\frac{1}{r^2}}$ $\cos\frac{\beta}{2}=\sqrt{1-\frac{2.25}{r^2}}$ so by the composite sine identity $\frac{2}{r}=\frac{1}{r}\sqrt{1-\frac{2.25}{r^2}}+\frac{1.5}{r}\sqrt{1-\frac{1}{r^2}}$ multiply both sides by $2r$ , then subtract $\sqrt{4-\frac{9}{r^2}}$ from both sides squaring both sides, we get $16 - 8\sqrt{4-\frac{9}{r^2}} + 4 - \frac{9}{r^2}=9 - \frac{9}{r^2}$ $\Longrightarrow 16+4=9+8\sqrt{4-\frac{9}{r^2}}\Longrightarrow\frac{11}{8}=\sqrt{4-\frac{9}{r^2}}\Longrightarrow\frac{121}{64}=4-\frac{9}{r^2}$ $\Longrightarrow\frac{(256-121)r^2}{64}=9\Longrightarrow r^2= \frac{64}{15}$ plugging this back in, $\cos^2(\frac{\alpha}{2})=1-\frac{15}{64}=\frac{49}{64}$ so $\cos(\alpha)=2(\frac{49}{64})-1=\frac{34}{64}=\frac{17}{32}$ and the answer is $17+32=\boxed{049}$

Revision as of 00:25, 1 May 2019 (view source) Alexlikemath (talk \| contribs) (Add solution 2 using Law of Cosines directly) ← Older edit		Revision as of 19:23, 27 June 2019 (view source) Alexlikemath (talk \| contribs) m Newer edit →
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−	-~~Alexlikemath~~	+	- AlexLikeMath

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