Difference between revisions of "2016 AIME II Problems/Problem 9"

(Solution 2)
m (Solution 3 (More Robust Bash))
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Solution by rocketscience
 
Solution by rocketscience
  
== Solution 3 (More Robust Bash) ==
+
== Solution 4 (More Robust Bash) ==
  
 
The reason for bashing in this context can also be justified by the fact 100 isn't very big.  
 
The reason for bashing in this context can also be justified by the fact 100 isn't very big.  

Revision as of 20:59, 23 November 2021

Problem

The sequences of positive integers $1,a_2, a_3,...$ and $1,b_2, b_3,...$ are an increasing arithmetic sequence and an increasing geometric sequence, respectively. Let $c_n=a_n+b_n$. There is an integer $k$ such that $c_{k-1}=100$ and $c_{k+1}=1000$. Find $c_k$.

Solution 1

Since all the terms of the sequences are integers, and 100 isn't very big, we should just try out the possibilities for $b_2$. When we get to $b_2=9$ and $a_2=91$, we have $a_4=271$ and $b_4=729$, which works, therefore, the answer is $b_3+a_3=81+181=\boxed{262}$.

Solution 2

We have $a_k=r^{k-1}$ and $b_k=(k-1)d$. First, $b_{k-1}<c_{k-1}=100$ implies $d<100$, so $b_{k+1}<300$.

It follows that $a_{k+1}=1000-b_{k+1}>700$, i.e., $700 < r^k < 1000$. Dividing through by $r^2$ we get \[\frac{700}{r^2} < r^{j} < \frac{1000}{r^2}\]where $j=k-2$. Since $k$ is atleast $3$ we get $r^3\le r^k <1000$, i.e. $r<10$. Let's make a table: \begin{array}[b]{ c c c c c c c c c } r & 2 & 3 & 4 & 5 & 6 & 7 & 8 & 9 \\[2ex] \left\lfloor\frac{700}{r^2}\right\rfloor & 175  & 77 & 43  & 28 & 19 & 14 & 10 & 8\\[2ex] \left\lfloor\frac{1000}{r^2}\right\rfloor & 250  & 111 & 63  & 40 & 28 & 20 & 16 & 12 \end{array} The only admissible $r^j$ values are $\{3^4, 9\}$.

Since $100=c_{j+1}=r^j+jd+1$, we must have $j\mid 99-r^j$.

Note that $99-3^4=18$, which is not a multiple of $4$, which leaves $r^j=9^1$. We check: $a_j=9$ implies $b_j=91$, i.e. $d=90$, so $b_{j+2}=271$ and $a_{j+2}=729$ and $c_{j+2}=1000$! So it works! Then $c_{j+1}=9^2+181=262$.


Solution 3

Using the same reasoning ($100$ isn't very big), we can guess which terms will work. The first case is $k=3$, so we assume the second and fourth terms of $c$ are $100$ and $1000$. We let $r$ be the common ratio of the geometric sequence and write the arithmetic relationships in terms of $r$.

The common difference is $100-r - 1$, and so we can equate: $2(99-r)+100-r=1000-r^3$. Moving all the terms to one side and the constants to the other yields

$r^3-3r = 702$, or $r(r^2-3) = 702$. Simply listing out the factors of $702$ shows that the only factor $3$ less than a square that works is $78$. Thus $r=9$ and we solve from there to get $\boxed{262}$.

Solution by rocketscience

Solution 4 (More Robust Bash)

The reason for bashing in this context can also be justified by the fact 100 isn't very big.

Let the common difference for the arithmetic sequence be $a$, and the common ratio for the geometric sequence be $b$. The sequences are now $1, a+1, 2a+1, \ldots$, and $1, b, b^2, \ldots$. We can now write the given two equations as the following:

$1+(k-2)a+b^{k-2} = 100$

$1+ka+b^k = 1000$

Take the difference between the two equations to get $2a+(b^2-1)b^{k-2} = 900$. Since 900 is divisible by 4, we can tell $a$ is even and $b$ is odd. Let $a=2m$, $b=2n+1$, where $m$ and $n$ are positive integers. Substitute variables and divide by 4 to get:

$m+(n+1)(n)(2n+1)^{k-2} = 225$

Because very small integers for $n$ yield very big results, we can bash through all cases of $n$. Here, we set an upper bound for $n$ by setting $k$ as 3. After trying values, we find that $n\leq 4$, so $b=9, 7, 5, 3$. Testing out $b=9$ yields the correct answer of $\boxed{262}$. Note that even if this answer were associated with another b value like $b=3$, the value of $k$ can still only be 3 for all of the cases.

-Dankster42

See also

2016 AIME II (ProblemsAnswer KeyResources)
Preceded by
Problem 8
Followed by
Problem 10
1 2 3 4 5 6 7 8 9 10 11 12 13 14 15
All AIME Problems and Solutions

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