Difference between revisions of "1995 AHSME Problems/Problem 30"
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==Solution 2== | ==Solution 2== | ||
− | Place the cube so that its space diagonal is perpendicular to the ground. The space diagonal has length of <math>3\sqrt{3}</math>, the altitude of the newly placed cube is <math>3\sqrt{3}</math>. The plane that is perpendicular and bisecting the space diagonal is now parallel to the ground and also bisecting the space diagonal into <math>\frac{3\sqrt{3}}{2}</math>. | + | Place the cube so that its space diagonal is perpendicular to the ground. The space diagonal has length of <math>3\sqrt{3}</math>, the altitude of the top vertex of the newly placed cube is <math>3\sqrt{3}</math>. The plane that is perpendicular and bisecting the space diagonal is now parallel to the ground and also bisecting the space diagonal into <math>\frac{3\sqrt{3}}{2}</math>, so that the height of the plane is <math>\frac{3\sqrt{3}}{2}</math>. |
By symmetry, the space diagonal is trisected by the pyramid at the top of the cube and the pyramid at the bottom of the cube. | By symmetry, the space diagonal is trisected by the pyramid at the top of the cube and the pyramid at the bottom of the cube. | ||
− | We can prove that the space diagonal is trisected. Let the altitude of the pyramid at the top of the cube be <math>h</math>. The | + | We can prove that the space diagonal is trisected. Let the altitude of the pyramid at the top of the cube be <math>h</math>. The base of the pyramid is an equilateral triangle with a side length of <math>\sqrt{1^2+1^2}=\sqrt{2}</math>. <math>h = \sqrt{3^2-(\frac{ \sqrt{3} }{2} \cdot \frac23 \cdot \sqrt{2})^2} = \sqrt{9-6}=\sqrt{3}</math>. The altitude of the pyramid at the bottom of the cube is also <math>h</math>. The altitude in the middle is <math>3\sqrt{3}-\sqrt{3}-\sqrt{3}=\sqrt{3}</math>. |
The altitude from the vertex at the top to the bottom is <math>3\sqrt{3}</math>. The altitude from the next <math>3</math> vertices to the bottom are all <math>2\sqrt{3}</math>. The altitude from the next <math>3</math> vertices to the bottom are all <math>\sqrt{3}</math>. The altitude from the bottom-most vertex to the bottom is <math>0</math>. | The altitude from the vertex at the top to the bottom is <math>3\sqrt{3}</math>. The altitude from the next <math>3</math> vertices to the bottom are all <math>2\sqrt{3}</math>. The altitude from the next <math>3</math> vertices to the bottom are all <math>\sqrt{3}</math>. The altitude from the bottom-most vertex to the bottom is <math>0</math>. |
Revision as of 04:27, 30 September 2023
Contents
Problem
A large cube is formed by stacking 27 unit cubes. A plane is perpendicular to one of the internal diagonals of the large cube and bisects that diagonal. The number of unit cubes that the plane intersects is
Solution 1
Place one corner of the cube at the origin of the coordinate system so that its sides are parallel to the axes.
Now consider the diagonal from to . The midpoint of this diagonal is at . The plane that passes through this point and is orthogonal to the diagonal has the equation .
The unit cube with opposite corners at and is intersected by this plane if and only if . Therefore the cube is intersected by this plane if and only if .
There are six cubes such that : permutations of and .
Symmetrically, there are six cubes such that .
Finally, there are seven cubes such that : permutations of and the central cube .
That gives a total of intersected cubes.
Note that there are only 8 cubes that are not intersected by our plane: 4 in each of the two opposite corners that were connected by the original diagonal.
Solution 2
Place the cube so that its space diagonal is perpendicular to the ground. The space diagonal has length of , the altitude of the top vertex of the newly placed cube is . The plane that is perpendicular and bisecting the space diagonal is now parallel to the ground and also bisecting the space diagonal into , so that the height of the plane is .
By symmetry, the space diagonal is trisected by the pyramid at the top of the cube and the pyramid at the bottom of the cube.
We can prove that the space diagonal is trisected. Let the altitude of the pyramid at the top of the cube be . The base of the pyramid is an equilateral triangle with a side length of . . The altitude of the pyramid at the bottom of the cube is also . The altitude in the middle is .
The altitude from the vertex at the top to the bottom is . The altitude from the next vertices to the bottom are all . The altitude from the next vertices to the bottom are all . The altitude from the bottom-most vertex to the bottom is .
The length of the space diagonal of a unit cube is . The highest point of the bottom-most unit cube has an altitude of . As , therefore, the plane that is perpendicular will not pass through the unit cube at the bottom.
For the next cubes from the bottom, the altitude of their highest point is . As , therefore, the plane that is perpendicular will not pass through the next unit cubes.
The lowest point of the top-most unit cube has an altitude of . As , therefore, the plane that is perpendicular will not pass through the unit cube at the top.
For the next cubes from the top, the altitude of their lowest point is . As , therefore, the plane that is perpendicular will not pass through the next unit cubes.
Thus, the plane does not pass through unit cubes, it passes through unit cubes.
See also
1995 AHSME (Problems • Answer Key • Resources) | ||
Preceded by Problem 29 |
Followed by Final Question | |
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 • 26 • 27 • 28 • 29 • 30 | ||
All AHSME Problems and Solutions |
The problems on this page are copyrighted by the Mathematical Association of America's American Mathematics Competitions.