2019 AMC 12A Problems/Problem 13
Problem
How many ways are there to paint each of the integers either red, green, or blue so that each number has a different color from each of its proper divisors?
Solution 1
The and can be painted with no restrictions because the set of integers does not contain a multiple or proper factor of or . There are 3 ways to paint each, giving us ways to paint both. The is the most restrictive number. There are ways to paint , but WLOG, let it be painted red. cannot be the same color as or , so there are ways to paint , which automatically determines the color for . cannot be painted red, so there are ways to paint , but WLOG, let it be painted blue. There are choices for the color for , which is either red or green in this case. Lastly, there are ways to choose the color for .
.
Solution 2
We note that the primes can be colored any of the colors since they don't have any proper divisors other than , which is not in the list. Furthermore, is the only number in the list that has distinct prime factors (namely, and ), thus we do casework on .
Case 1: and are the same colors
In this case, we have primes to choose the color for (, , and ). Afterwards, , , and have two possible colors, which will determine the color of . Thus, there are possibilities here.
Case 2: and are different colors
In this case, we have primes to color. WLOG, we'll color the first, then the . Then there are color choices for , and color choices for . This will determine the color of as well. After that, we only need to choose the color for and , which each have choices. Thus, there are possibilities here as well.
Adding up gives .
Solution 3
require different color each, therefore ways to color these.
and are whatever, therefore ways to color these.
can be in two ways once is colored, and thus has also following , which leaves another for .
All together: .
--DrB_Coach.
See Also
2019 AMC 12A (Problems • Answer Key • Resources) | |
Preceded by Problem 12 |
Followed by Problem 14 |
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All AMC 12 Problems and Solutions |
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