2021 AMC 12A Problems/Problem 25
Problem
Let denote the number of positive integers that divide , including and . For example, and . (This function is known as the divisor function.) LetThere is a unique positive integer such that for all positive integers . What is the sum of the digits of
Solution
Suppose a counting number x be not divisible by 3. Multiply x by 9. Multiplying x by 9 adds a set divisors that are the original divisors multiply by 3 and an additional divisors that are the originals multiplied by 9 which end up saying that . Another consequence is multiplying the denominator by . So now because because . A property of multiples of 9 is their digits add up to multiples of 9, so the only possibility is
Edit: It seems that this proof is not complete because we also need to check whether multiply by 3 is better than multiply by 9. It is better to multiply by 9 than by 3 shown by similar logic ~Lopkiloinm
See also
2021 AMC 12A (Problems • Answer Key • Resources) | |
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