Difference between revisions of "2007 AMC 10A Problems/Problem 21"
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First of all, it is pretty easy to see the length of each edge of the bigger cube is <math>2</math> so the radius of the sphere is <math>1</math>. We know that when a cube is inscribed in a sphere, assuming the edge length of the square is <math>x</math> the radius can be presented as <math>\frac {\sqrt3x}{2} = 1</math>, we can solve that <math>x=\frac {2\sqrt3}{3}</math> and now we only need to apply the basic formula to find the surface and we got our final answer as <math>\frac {2\sqrt3}{3}*\frac {2\sqrt3}{3}*6=8</math> and the final answer is <math>\boxed{C}</math> | First of all, it is pretty easy to see the length of each edge of the bigger cube is <math>2</math> so the radius of the sphere is <math>1</math>. We know that when a cube is inscribed in a sphere, assuming the edge length of the square is <math>x</math> the radius can be presented as <math>\frac {\sqrt3x}{2} = 1</math>, we can solve that <math>x=\frac {2\sqrt3}{3}</math> and now we only need to apply the basic formula to find the surface and we got our final answer as <math>\frac {2\sqrt3}{3}*\frac {2\sqrt3}{3}*6=8</math> and the final answer is <math>\boxed{C}</math> | ||
− | ==Solution | + | ==Solution 5 (Become Einstein)== |
The cube's radius is half of the side length of the cube, since it's inscribed. The diagonal of the small cube is equal to the diameter of sphere. Since the volume of the large cube is <math>72</math>, its side length is <math>2\cdot 9^{\frac{1}{3}}</math>, so the radius of the circle is <math>9^{\frac{1}{3}}</math>. | The cube's radius is half of the side length of the cube, since it's inscribed. The diagonal of the small cube is equal to the diameter of sphere. Since the volume of the large cube is <math>72</math>, its side length is <math>2\cdot 9^{\frac{1}{3}}</math>, so the radius of the circle is <math>9^{\frac{1}{3}}</math>. |
Revision as of 13:08, 3 February 2023
Contents
Problem
A sphere is inscribed in a cube that has a surface area of square meters. A second cube is then inscribed within the sphere. What is the surface area in square meters of the inner cube?
Solution
Solution 1
We rotate the smaller cube around the sphere such that two opposite vertices of the cube are on opposite faces of the larger cube. Thus the main diagonal of the smaller cube is the side length of the outer square.
Let be the surface area of the inner square. The ratio of the areas of two similar figures is equal to the square of the ratio of their sides. As the diagonal of a cube has length where is a side of the cube, the ratio of a side of the inner square to a side of the outer square is (since the side of the outer square = the diagonal of the inner square). So we have . Thus .
Solution 2 (computation)
The area of each face of the outer cube is , and the edge length of the outer cube is . This is also the diameter of the sphere, and thus the length of a long diagonal of the inner cube.
A long diagonal of a cube is the hypotenuse of a right triangle with a side of the cube and a face diagonal of the cube as legs. If a side of the cube is , we see that .
Thus the surface area of the inner cube is .
Solution 3, from AoPS
Since the surface area of the original cube is 24 square meters, each face of the cube has a surface area of square meters, and the side length of this cube is 2 meters. The sphere inscribed within the cube has diameter 2 meters, which is also the length of the diagonal of the cube inscribed in the sphere. Let represent the side length of the inscribed cube. Applying the Pythagorean Theorem twice givesHence each face has surface areaSo the surface area of the inscribed cube is square meters.
Solution 4
First of all, it is pretty easy to see the length of each edge of the bigger cube is so the radius of the sphere is . We know that when a cube is inscribed in a sphere, assuming the edge length of the square is the radius can be presented as , we can solve that and now we only need to apply the basic formula to find the surface and we got our final answer as and the final answer is
Solution 5 (Become Einstein)
The cube's radius is half of the side length of the cube, since it's inscribed. The diagonal of the small cube is equal to the diameter of sphere. Since the volume of the large cube is , its side length is , so the radius of the circle is .
The diameter of the cube is the hypotenuse of a triangle whose sides are: The large cube, the large cube's face diagonal, the diameter of the large cube.
Let be the side length of the small cube. Therefore,
Solving, so the volume is
-Benedict T (countmath1)
See also
2007 AMC 10A (Problems • Answer Key • Resources) | ||
Preceded by Problem 20 |
Followed by Problem 22 | |
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 10 Problems and Solutions |
The problems on this page are copyrighted by the Mathematical Association of America's American Mathematics Competitions.