2007 AIME II Problem 13
Below is the professionally curated solution for Problem 13 of the 2007 AIME II, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2007 AIME II solutions, or check the answer key.
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Difficulty rating: 2920
13.
A triangular array of squares has one square in the first row, two in the second, and, in general, squares in the th row for With the exception of the bottom row, each square rests on two squares in the row immediately below, as illustrated in the figure. In each square of the eleventh row, a or a is placed. Numbers are then placed into the other squares, with the entry for each square being the sum of the entries in the two squares below it. For how many initial distributions of 's and 's in the bottom row is the number in the top square a multiple of
Solution:
Label the bottom-row entries Since each square is the sum of the two below it, the contributions accumulate with Pascal's-triangle weights: the top square equals
Modulo direct checking (or Lucas' theorem with ) shows for while and So the top square is a multiple of exactly when
For / entries this sum is or either all four are (one way) or exactly three are (four ways), for choices. The remaining seven entries are free, so the count is
Problem 13 in Other Years
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