Difference between revisions of "2017 AIME I Problems/Problem 9"

Revision as of 01:34, 9 March 2017

Problem 9

Let $a_{10} = 10$ , and for each integer $n >10$ let $a_n = 100a_{n - 1} + n$ . Find the least $n > 10$ such that $a_n$ is a multiple of $99$ .

Solution 1

Writing out the recursive statement for $a_n, a_{n-1}, \dots, a_{10}$ and summing them gives $a_n+\dots+a_{10}=100(a_{n-1}+\dots+a_{9})+n+\dots+10$ Which simplifies to $a_n=99(a_{n-1}+\dots+a_{10})+\frac{1}{2}(n+10)(n-9)$ Therefore, $a_n$ is divisible by 99 if and only if $\frac{1}{2}(n+10)(n-9)$ is divisible by 99, so $(n+10)(n-9)$ needs to be divisible by 9 and 11. Assume that $n+10$ is a multiple of 11. Writing out a few terms, $n=12, 23, 34, 45$ , we see that $n=45$ is the smallest $n$ that works in this case. Next, assume that $n-9$ is a multiple of 11. Writing out a few terms, $n=20, 31, 42, 53$ , we see that $n=53$ is the smallest $n$ that works in this case. The smallest $n$ is $\boxed{45}$ .

Solution 2

$a_n \equiv a_{n-1} + n \pmod {99}$ By looking at the first few terms, we can see that $a_n \equiv 10+11+12+ \dots + n \pmod {99}$ This implies $a_n \equiv \frac{n(n+1)}{2} - \frac{10*9}{2} \pmod {99}$ Since $a_n \equiv 0 \pmod {99}$ , we can rewrite the equivalence, and simplify $0 \equiv \frac{n(n+1)}{2} - \frac{10*9}{2} \pmod {99}$ $0 \equiv n(n+1) - 90 \pmod {99}$ $0 \equiv n^2+n+9 \pmod {99}$ $0 \equiv 4n^2+4n+36 \pmod {99}$ $0 \equiv (2n+1)^2+35 \pmod {99}$ $64 \equiv (2n+1)^2 \pmod {99}$ The only squares that are congruent to $64 \pmod {99}$ are $(\pm 8)^2$ and $(\pm 19)^2$ , so $2n+1 \equiv -8, 8, 19, \text{or } {-19} \pmod {99}$ $2n+1 \equiv -8 \pmod {99}$ yields $n=45$ as the smallest integer solution.

$2n+1 \equiv 8 \pmod {99}$ yields $n=53$ as the smallest integer solution.

$2n+1 \equiv -19 \pmod {99}$ yields $n=89$ as the smallest integer solution.

$2n+1 \equiv 19 \pmod {99}$ yields $n=9$ as the smallest integer solution. However, $n$ must be greater than $10$ .

The smallest positive integer solution greater than $10$ is $n=\boxed{045}$ .

@@ Line 3: / Line 3: @@
 ==Solution 1==
-Writing out the recursive statement for <math>a_n, a_{n-1}, \dots, a_{10}</math> and summing them gives <cmath>a_n+\dots+a_{10}=100(a_{n-1}+\dots+a_{10})+n+\dots+10</cmath>
+Writing out the recursive statement for <math>a_n, a_{n-1}, \dots, a_{10}</math> and summing them gives <cmath>a_n+\dots+a_{10}=100(a_{n-1}+\dots+a_{9})+n+\dots+10</cmath>
 Which simplifies to <cmath>a_n=99(a_{n-1}+\dots+a_{10})+\frac{1}{2}(n+10)(n-9)</cmath>
 Therefore, <math>a_n</math> is divisible by 99 if and only if <math>\frac{1}{2}(n+10)(n-9)</math> is divisible by 99, so <math>(n+10)(n-9)</math> needs to be divisible by 9 and 11. Assume that <math>n+10</math> is a multiple of 11. Writing out a few terms, <math>n=12, 23, 34, 45</math>, we see that <math>n=45</math> is the smallest <math>n</math> that works in this case. Next, assume that <math>n-9</math> is a multiple of 11. Writing out a few terms, <math>n=20, 31, 42, 53</math>, we see that <math>n=53</math> is the smallest <math>n</math> that works in this case. The smallest <math>n</math> is <math>\boxed{45}</math>.

2017 AIME I (Problems • Answer Key • Resources)
Preceded by Problem 8	Followed by Problem 10
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Difference between revisions of "2017 AIME I Problems/Problem 9"

Revision as of 01:34, 9 March 2017

Contents

Problem 9

Solution 1

Solution 2

See also