2011 AMC 10A Problem 24

Below is the professionally curated solution for Problem 24 of the 2011 AMC 10A, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2011 AMC 10A solutions, or check the answer key.

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Concepts:3D geometryvolumecube geometrysimilarity

Difficulty rating: 2380

24.

Two distinct regular tetrahedra have all their vertices among the vertices of the same unit cube. What is the volume of the region formed by the intersection of the tetrahedra?

112\dfrac{1}{12}

212\dfrac{\sqrt2}{12}

312\dfrac{\sqrt3}{12}

16\dfrac{1}{6}

26\dfrac{\sqrt2}{6}

Solution:

The two regular tetrahedra use the two alternating sets of four vertices of the cube. Each has edge length 2\sqrt2, a face diagonal of the cube.

The volume of a regular tetrahedron with edge length ss is 212s3\dfrac{\sqrt2}{12}s^3. Thus one large tetrahedron has volume 212(2)3=13\dfrac{\sqrt2}{12}(\sqrt2)^3=\dfrac13.

Intersect one tetrahedron with the other. Each face of the first cuts from the second a corner tetrahedron similar to the original with scale factor 12\dfrac12, so each cut-off piece has 18\dfrac18 of the large tetrahedron's volume.

There are four such corner pieces, so the intersection has 1418=121-4\cdot\dfrac18=\dfrac12 of the volume of one large tetrahedron. Hence the intersection volume is 1213=16\dfrac12\cdot\dfrac13=\dfrac16.

Thus, D is the correct answer.

Problem 24 in Other Years