Difference between revisions of "2003 AMC 12A Problems/Problem 13"
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Revision as of 14:25, 23 March 2010
Problem
The polygon enclosed by the solid lines in the figure consists of 4 congruent squares joined edge-to-edge. One more congruent square is attatched to an edge at one of the nine positions indicated. How many of the nine resulting polygons can be folded to form a cube with one face missing?
Solution
Let the squares be labeled , , , and .
When the polygon is folded, the "right" edge of square becomes adjacent to the "bottom edge" of square , and the "bottom" edge of square becomes adjacent to the "bottom" edge of square .
So, any "new" square that is attatched to those edges will prevent the polygon from becoming a cube with one face missing.
Therefore, squares , , and will prevent the polygon from becoming a cube with one face missing.
Squares , , , , , and will allow the polygon to become a cube with one face missing when folded.
Thus the answer is .