Difference between revisions of "2020 AIME I Problems/Problem 6"
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− | Set the common radius to <math>r</math>. First, take the cross section of the sphere sitting in the hole of radius 1. If we draw the perpendicular bisector of the chord (the hole) through the circle, this line goes through the center. Connect the center also to where the chord hits the circle, for a right triangle with hypotenuse <math>r</math> and base <math>1</math>. Therefore, the height of this circle outside of the hole is <math>\sqrt{r^2-1}</math>. | + | Set the common radius to <math>r</math>. First, take the cross section of the sphere sitting in the hole of radius <math>1</math>. If we draw the perpendicular bisector of the chord (the hole) through the circle, this line goes through the center. Connect the center also to where the chord hits the circle, for a right triangle with hypotenuse <math>r</math> and base <math>1</math>. Therefore, the height of this circle outside of the hole is <math>\sqrt{r^2-1}</math>. |
− | The other circle follows similarly for a height (outside the hole) of <math>\sqrt{r^2-4}</math>. Now, if we take the cross section of the entire board, essentially making it | + | The other circle follows similarly for a height (outside the hole) of <math>\sqrt{r^2-4}</math>. Now, if we take the cross section of the entire board, essentially making it two-dimensional, we can connect the centers of the two spheres, then form another right triangle with base <math>7</math>, as given by the problem. The height of this triangle is the difference between the heights of the parts of the two spheres outside the holes, which is <math>\sqrt{r^2-1} - \sqrt{r^2-4}</math>. Now we can set up an equation in terms of <math>r</math> with the Pythagorean theorem: <cmath>\left(\sqrt{r^2-1} - \sqrt{r^2-4}\right)^2 + 7^2 = (2r)^2.</cmath> Simplifying a few times, |
<cmath>\begin{align*} | <cmath>\begin{align*} | ||
r^2 - 1 - 2\left(\sqrt{(r^2-1)(r^2-4)}\right) + r^2 - 4 + 49 &= 4r^2 \\ | r^2 - 1 - 2\left(\sqrt{(r^2-1)(r^2-4)}\right) + r^2 - 4 + 49 &= 4r^2 \\ |
Revision as of 17:55, 13 December 2021
Contents
Problem
A flat board has a circular hole with radius and a circular hole with radius such that the distance between the centers of the two holes is Two spheres with equal radii sit in the two holes such that the spheres are tangent to each other. The square of the radius of the spheres is where and are relatively prime positive integers. Find
Solution
Set the common radius to . First, take the cross section of the sphere sitting in the hole of radius . If we draw the perpendicular bisector of the chord (the hole) through the circle, this line goes through the center. Connect the center also to where the chord hits the circle, for a right triangle with hypotenuse and base . Therefore, the height of this circle outside of the hole is .
The other circle follows similarly for a height (outside the hole) of . Now, if we take the cross section of the entire board, essentially making it two-dimensional, we can connect the centers of the two spheres, then form another right triangle with base , as given by the problem. The height of this triangle is the difference between the heights of the parts of the two spheres outside the holes, which is . Now we can set up an equation in terms of with the Pythagorean theorem: Simplifying a few times, Therefore, our answer is .
-molocyxu
Solution 2 (Official MAA)
Consider a cross section of the board and spheres with a plane that passes through the centers of the holes and centers of the spheres as shown.
Let , , and be, respectively, the center of the hole with radius the center of the sphere resting in that hole, and a point on the edge of that hole. Let , , and be the corresponding points for the hole with radius Let be the point on such that . Let the radius of the spheres be . Because and , it follows thatBecause , , and , it follows thatwhich simplifies to . The requested sum is . The value of is approximately
Video solution (With Animation)
Video Solution
https://www.youtube.com/watch?v=qCTq8KhZfYQ
See Also
2020 AIME I (Problems • Answer Key • Resources) | ||
Preceded by Problem 5 |
Followed by Problem 7 | |
1 • 2 • 3 • 4 • 5 • 6 • 7 • 8 • 9 • 10 • 11 • 12 • 13 • 14 • 15 | ||
All AIME Problems and Solutions |
The problems on this page are copyrighted by the Mathematical Association of America's American Mathematics Competitions.