2005 AIME II Problem 10

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Concepts:3D geometryvolumecoordinate geometry

Difficulty rating: 2450

10.

Given that O\mathcal{O} is a regular octahedron, that C\mathcal{C} is the cube whose vertices are the centers of the faces of O,\mathcal{O}, and that the ratio of the volume of O\mathcal{O} to that of C\mathcal{C} is mn,\frac{m}{n}, where mm and nn are relatively prime positive integers, find m+n.m + n.

Solution:

Place the octahedron's vertices at (±1,0,0),(\pm 1, 0, 0), (0,±1,0),(0, \pm 1, 0), (0,0,±1).(0, 0, \pm 1). It is two square pyramids glued along the square with vertices (±1,0,0)(\pm 1, 0, 0) and (0,±1,0),(0, \pm 1, 0), which has area 2,2, and each pyramid has height 1,1, so VO=21321=43.V_{\mathcal{O}} = 2 \cdot \frac{1}{3} \cdot 2 \cdot 1 = \frac{4}{3}.

Each face centroid is the average of that face's three vertices, e.g. (13,13,13),\left(\frac{1}{3}, \frac{1}{3}, \frac{1}{3}\right), so the cube has vertices (±13,±13,±13).\left(\pm\frac{1}{3}, \pm\frac{1}{3}, \pm\frac{1}{3}\right). Its edge is 23\frac{2}{3} and its volume is 827.\frac{8}{27}.

The ratio is 4/38/27=92,\frac{4/3}{8/27} = \frac{9}{2}, so m+n=9+2=11.m + n = 9 + 2 = 11.

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