2001 AIME II Problem 12
Below is the professionally curated solution for Problem 12 of the 2001 AIME II, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2001 AIME II solutions, or check the answer key.
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Difficulty rating: 2990
12.
Given a triangle, its midpoint triangle is obtained by joining the midpoints of its sides. A sequence of polyhedra is defined recursively as follows: is a regular tetrahedron whose volume is To obtain replace the midpoint triangle of every face of by an outward-pointing regular tetrahedron that has the midpoint triangle as a face. The volume of is where and are relatively prime positive integers. Find
Solution:
Attaching a tetrahedron over the midpoint triangle of a face replaces that face by equilateral triangles of half the side length: the corner triangles plus exposed faces of the new tetrahedron. So all faces of are congruent, with side times the original, and has faces.
Passing from to glues one regular tetrahedron onto each face; each is similar to with ratio hence has volume The volume added is
Therefore the volume of is and
Problem 12 in Other Years
1997 AIME · 1998 AIME · 1999 AIME · 2000 AIME I · 2000 AIME II · 2001 AIME I · 2002 AIME I · 2002 AIME II · 2003 AIME I · 2003 AIME II · 2004 AIME I · 2004 AIME II · 2005 AIME I · 2005 AIME II · 2006 AIME I · 2006 AIME II · 2007 AIME I · 2007 AIME II · 2008 AIME I · 2008 AIME II · 2009 AIME I · 2009 AIME II · 2010 AIME I · 2010 AIME II · 2011 AIME I · 2011 AIME II · 2012 AIME I · 2012 AIME II · 2013 AIME I · 2013 AIME II · 2014 AIME I · 2014 AIME II · 2015 AIME I · 2015 AIME II · 2016 AIME I · 2016 AIME II · 2017 AIME I · 2017 AIME II · 2018 AIME I · 2018 AIME II · 2019 AIME I · 2019 AIME II · 2020 AIME I · 2020 AIME II · 2021 AIME I · 2021 AIME II · 2022 AIME I · 2022 AIME II · 2023 AIME I · 2023 AIME II · 2024 AIME I · 2024 AIME II · 2025 AIME I · 2025 AIME II · 2026 AIME I · 2026 AIME II