Difference between revisions of "2015 AIME II Problems/Problem 3"
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Checking the first few possible solutions, we find that <math>m=\boxed{476}</math> is the first solution that has <math>s(m)=17</math>, and we're done. | Checking the first few possible solutions, we find that <math>m=\boxed{476}</math> is the first solution that has <math>s(m)=17</math>, and we're done. | ||
− | ==Solution | + | ==Solution 4== |
Since the sum of the digits in the base-10 representation of <math>m</math> is <math>17</math>, we must have <math>m\equiv 17 \pmod{9}</math> or <math>m\equiv -1\pmod{9}</math>. | Since the sum of the digits in the base-10 representation of <math>m</math> is <math>17</math>, we must have <math>m\equiv 17 \pmod{9}</math> or <math>m\equiv -1\pmod{9}</math>. |
Revision as of 20:21, 9 March 2020
Problem
Let be the least positive integer divisible by whose digits sum to . Find .
Solution 1
The three-digit integers divisible by , and their digit sum:
Thus the answer is .
Solution 2 (Faster)
We can do the same thing as solution 1, except note the following fact: is a multiple of and its digits sum to .
Therefore, we can add it onto an existing multiple of that we know of to have , shown in the right-hand column, provided that its units digit is less than and its hundreds digit is less than . Unfortunately, does not fit the criteria, but does, meaning that, instead of continually adding multiples of , we can stop here and simply add to reach our final answer of .
~Tiblis
Solution 3
The digit sum of a base integer is just . In this problem, we know , or for a positive integer .
Also, we know that , or .
Obviously is a solution. This means in general, is a solution for non-negative integer .
Checking the first few possible solutions, we find that is the first solution that has , and we're done.
Solution 4
Since the sum of the digits in the base-10 representation of is , we must have or . We also know that since is divisible by 17, .
To solve this system of linear congruences, we can use the Chinese Remainder Theorem. If we set , we find that and , because . The trick to getting here was to find the number such that , so that when we take things , the goes away. We can do this using the Extended Euclidean Algorithm or by guess and check to find that .
Finally, since , we repeatedly add multiples of until we get a number in which its digits sum to 17, which first happens when .
See also
2015 AIME II (Problems • Answer Key • Resources) | ||
Preceded by Problem 2 |
Followed by Problem 4 | |
1 • 2 • 3 • 4 • 5 • 6 • 7 • 8 • 9 • 10 • 11 • 12 • 13 • 14 • 15 | ||
All AIME Problems and Solutions |
The problems on this page are copyrighted by the Mathematical Association of America's American Mathematics Competitions.