Difference between revisions of "1991 AIME Problems/Problem 11"

(See also)
(Solution)
 
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In summary, <math>a_{}^{}+b+c=\boxed{012}</math>.-->
 
In summary, <math>a_{}^{}+b+c=\boxed{012}</math>.-->
 
\documentclass{article}
 
\usepackage{amsmath}
 
 
\begin{document}
 
 
\section*{Note}
 
 
The derivation for tan(15) is as follows:
 
 
1. **Given:**
 
  \[
 
  \tan(30^\circ) = \frac{\sqrt{3}}{3}
 
  \]
 
 
2. **Using the double angle formula for tangent:**
 
  \[
 
  \tan(30^\circ) = \tan(15^\circ + 15^\circ) = \frac{2 \tan(15^\circ)}{1 - \tan^2(15^\circ)}
 
  \]
 
 
3. **Set the equations equal to each other:**
 
  \[
 
  \frac{\sqrt{3}}{3} = \frac{2 \tan(15^\circ)}{1 - \tan^2(15^\circ)}
 
  \]
 
 
4. **Let tan(15)=x:**
 
  \[
 
  \frac{\sqrt{3}}{3} = \frac{2x}{1 - x^2}
 
  \]
 
 
5. **Cross-multiply to solve for x:**
 
  \[
 
  \sqrt{3}(1 - x^2) = 6x
 
  \]
 
  \[
 
  \sqrt{3} - \sqrt{3}x^2 = 6x
 
  \]
 
  \[
 
  \sqrt{3}x^2 + 6x - \sqrt{3} = 0
 
  \]
 
 
6. **This is a quadratic equation in x:**
 
  \[
 
  \sqrt{3}x^2 + 6x - \sqrt{3} = 0
 
  \]
 
 
7. **Solve the quadratic equation:**
 
  \[
 
  x = \frac{-6 \pm \sqrt{6^2 - 4(\sqrt{3})(-\sqrt{3})}}{2(\sqrt{3})}
 
  \]
 
  \[
 
  x = \frac{-6 \pm \sqrt{36 + 12}}{2\sqrt{3}}
 
  \]
 
  \[
 
  x = \frac{-6 \pm \sqrt{48}}{2\sqrt{3}}
 
  \]
 
  \[
 
  x = \frac{-6 \pm 4\sqrt{3}}{2\sqrt{3}}
 
  \]
 
  \[
 
  x = \frac{-6}{2\sqrt{3}} \pm \frac{4\sqrt{3}}{2\sqrt{3}}
 
  \]
 
  \[
 
  x = -\frac{3}{\sqrt{3}} \pm 2
 
  \]
 
  \[
 
  x = -\sqrt{3} \pm 2
 
  \]
 
 
8. **Select the appropriate root (since tan(15) is positive in the first quadrant):**
 
  \[
 
  \tan(15^\circ) = 2 - \sqrt{3}
 
  \]
 
 
Therefore, the final expression is:
 
\[
 
\tan(15^\circ) = \frac{\sqrt{3} - 1}{\sqrt{3} + 1}
 
\]
 
 
\end{document}
 
  
 
== See also ==
 
== See also ==

Latest revision as of 16:46, 24 May 2024

Problem

Twelve congruent disks are placed on a circle $C^{}_{}$ of radius 1 in such a way that the twelve disks cover $C^{}_{}$, no two of the disks overlap, and so that each of the twelve disks is tangent to its two neighbors. The resulting arrangement of disks is shown in the figure below. The sum of the areas of the twelve disks can be written in the from $\pi(a-b\sqrt{c})$, where $a,b,c^{}_{}$ are positive integers and $c^{}_{}$ is not divisible by the square of any prime. Find $a+b+c^{}_{}$.

[asy] unitsize(100); draw(Circle((0,0),1)); dot((0,0)); draw((0,0)--(1,0)); label("$1$", (0.5,0), S);  for (int i=0; i<12; ++i) { dot((cos(i*pi/6), sin(i*pi/6))); }  for (int a=1; a<24; a+=2) { dot(((1/cos(pi/12))*cos(a*pi/12), (1/cos(pi/12))*sin(a*pi/12))); draw(((1/cos(pi/12))*cos(a*pi/12), (1/cos(pi/12))*sin(a*pi/12))--((1/cos(pi/12))*cos((a+2)*pi/12), (1/cos(pi/12))*sin((a+2)*pi/12))); draw(Circle(((1/cos(pi/12))*cos(a*pi/12), (1/cos(pi/12))*sin(a*pi/12)), tan(pi/12))); }[/asy]

_Diagram by 1-1 is 3_

Solution

We wish to find the radius of one circle, so that we can find the total area.

Notice that for them to contain the entire circle, each pair of circles must be tangent on the larger circle. Now consider two adjacent smaller circles. This means that the line connecting the radii is a segment of length $2r$ that is tangent to the larger circle at the midpoint of the two centers. Thus, we have essentially have a regular dodecagon whose vertices are the centers of the smaller triangles circumscribed about a circle of radius $1$.

We thus know that the apothem of the dodecagon is equal to $1$. To find the side length, we make a triangle consisting of a vertex, the midpoint of a side, and the center of the dodecagon, which we denote $A, M,$ and $O$ respectively. Notice that $OM=1$, and that $\triangle OMA$ is a right triangle with hypotenuse $OA$ and $m \angle MOA = 15^\circ$. Thus $AM = (1) \tan{15^\circ} = 2 - \sqrt {3}$, which is the radius of one of the circles. The area of one circle is thus $\pi(2 - \sqrt {3})^{2} = \pi (7 - 4 \sqrt {3})$, so the area of all $12$ circles is $\pi (84 - 48 \sqrt {3})$, giving an answer of $84 + 48 + 3 = \boxed{135}$.


Note that it is very useful to understand the side lengths of a 15-75-90 triangle, as these triangles often appear on higher level math contests. The side lengths are in the ratio $\sqrt {3} - 1$, $\sqrt {3} + 1$, and $2\sqrt {2}$, or $1$, $\sqrt{3} + 2$, and $\sqrt{2} + \sqrt{6}$

See also

1991 AIME (ProblemsAnswer KeyResources)
Preceded by
Problem 10
Followed by
Problem 12
1 2 3 4 5 6 7 8 9 10 11 12 13 14 15
All AIME Problems and Solutions

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