Difference between revisions of "2015 AMC 12A Problems/Problem 22"

Latest revision as of 12:08, 5 May 2024

Problem

For each positive integer $n$ , let $S(n)$ be the number of sequences of length $n$ consisting solely of the letters $A$ and $B$ , with no more than three $A$ s in a row and no more than three $B$ s in a row. What is the remainder when $S(2015)$ is divided by $12$ ?

$\textbf{(A)}\ 0\qquad\textbf{(B)}\ 4\qquad\textbf{(C)}\ 6\qquad\textbf{(D)}\ 8\qquad\textbf{(E)}\ 10$

Solution 1

One method of approach is to find a recurrence for $S(n)$ .

Let us define $A(n)$ as the number of sequences of length $n$ ending with an $A$ , and $B(n)$ as the number of sequences of length $n$ ending in $B$ . Note that $A(n) = B(n)$ and $S(n) = A(n) + B(n)$ , so $S(n) = 2A(n)$ .

For a sequence of length $n$ ending in $A$ , it must be a string of $A$ s appended onto a sequence ending in $B$ of length $n-1, n-2, \text{or}\ n-3$ . So we have the recurrence: $A(n) = B(n-1) + B(n-2) + B(n-3) = A(n-1) + A(n-2) + A(n-3)$

We can thus begin calculating values of $A(n)$ . We see that the sequence goes (starting from $A(0) = 1$ ): $1,1,2,4,7,13,24...$

A problem arises though: the values of $A(n)$ increase at an exponential rate. Notice however, that we need only find $S(2015)\ \text{mod}\ 12$ . In fact, we can use the fact that $S(n) = 2A(n)$ to only need to find $A(2015)\ \text{mod}\ 6$ . Going one step further, we need only find $A(2015)\ \text{mod}\ 2$ and $A(2015)\ \text{mod}\ 3$ to find $A(2015)\ \text{mod}\ 6$ .

Here are the values of $A(n)\ \text{mod}\ 2$ , starting with $A(0)$ : $1,1,0,0,1,1,0,0...$

Since the period is $4$ and $2015 \equiv 3\ \text{mod}\ 4$ , $A(2015) \equiv 0\ \text{mod}\ 2$ .

Similarly, here are the values of $A(n)\ \text{mod}\ 3$ , starting with $A(0)$ : $1,1,2,1,1,1,0,2,0,2,1,0,0,1,1,2...$

Since the period is $13$ and $2015 \equiv 0\ \text{mod}\ 13$ , $A(2015) \equiv 1\ \text{mod}\ 3$ .

Knowing that $A(2015) \equiv 0\ \text{mod}\ 2$ and $A(2015) \equiv 1\ \text{mod}\ 3$ , we see that $A(2015) \equiv 4\ \text{mod}\ 6$ , and $S(2015) \equiv 8\ \text{mod}\ 12$ . Hence, the answer is $\textbf{(D)}$ .

Note that instead of introducing $A(n)$ and $B(n)$ , we can simply write the relation $S(n)=S(n-1)+S(n-2)+S(n-3),$ and proceed as above.

Recursion Solution 2

The huge $n$ value in place, as well as the "no more than... in a row" are key phrases that indicate recursion is the right way to go. Let's go with finding the case of $S(n)$ from previous cases. So how can we make the words of $S(n)$ ? Do we choose 3-in-a-row of one letter, $A$ or $B$ , or do we want $2$ consecutive ones or $1$ ? Note that this covers all possible cases of ending with $A$ and $B$ with a certain number of consecutive letters. And obviously they are all distinct.

[Convince yourself that each case for $S(n)$ is considered exactly once by using these cues: does it end in $3$ , $2$ , or $1$ consecutive letter(s) ( $1$ consecutive means a string like ... $BA$ , ... $AB$ , as in the letter switches) and does it $WLOG$ consider both $A$ and $B?$ ]

From there we realize that $S(n)=S(n-1)+S(n-2)+S(n-3)$ because 3 in a row requires $S(n-3)$ , and so on. We need to find $S(2015)$ mod 12. We first compute $S(2015)$ mod $3$ and mod $4$ . By listing out the residues mod $3$ , we find that the cycle length for mod $3$ is $13$ . $2015$ is $0$ mod $13$ so $S(2015) = S(13) = 2$ mod $3$ . By listing out the residues mod $4$ , we find that the cycle length for mod $4$ is $4$ . S(2015) = S(3) = mod $4$ . By Chinese Remainder Theorem, $S(2015) =\boxed{8}$ mod $12$ .

Solution 3 (Easy Version)

We can start off by finding patterns in $S(n)$ . When we calculate a few values we realize either from performing the calculation or because the calculation was performed in the exact same way that $S(n) = 2^n - 2((n_4)- (n_5) \dots (n_n))$ . Rearranging the expression we realize that the terms aside from $2^{2015}$ are congruent to $0$ mod $12$ (Just put the equation in terms of $2^{2015}$ and the four combinations excluded and calculate the combinations mod $12$ ). Using patterns we can see that $2^{2015}$ is congruent to $8$ mod $12$ . Therefore $\boxed {8}$ is our answer. ~Very minor edit in LaTeX by get-rickrolled

Video Solution by Richard Rusczyk

https://artofproblemsolving.com/videos/amc/2015amc12a/400

~ dolphin7

@@ Line 5: / Line 5: @@
 <math>\textbf{(A)}\ 0\qquad\textbf{(B)}\ 4\qquad\textbf{(C)}\ 6\qquad\textbf{(D)}\ 8\qquad\textbf{(E)}\ 10 </math>
-==Solution==
+==Solution 1==
 One method of approach is to find a recurrence for <math>S(n)</math>.
@@ Line 29: / Line 29: @@
 * Note that instead of introducing <math>A(n)</math> and <math>B(n)</math>, we can simply write the relation <math>S(n)=S(n-1)+S(n-2)+S(n-3),</math> and proceed as above.
-==Recursion Solution II==
+==Recursion Solution 2==
 The huge <math>n</math> value in place, as well as the "no more than... in a row" are key phrases that indicate recursion is the right way to go.
 Let's go with finding the case of <math>S(n)</math> from previous cases.
-So how can we make the words of <math>S(n)</math>? Do we choose 3-in-a-row of one letter, <math>A</math> or <math>B</math>, or do we want 2 consecutive ones or 1? Note that this covers all possible cases of ending with <math>A</math> and <math>B</math> with a certain number of consecutive letters. And obviously they are all distinct.
+So how can we make the words of <math>S(n)</math>? Do we choose 3-in-a-row of one letter, <math>A</math> or <math>B</math>, or do we want <math>2</math> consecutive ones or <math>1</math>? Note that this covers all possible cases of ending with <math>A</math> and <math>B</math> with a certain number of consecutive letters. And obviously they are all distinct.
-[Convince yourself that each case for <math>S(n)</math> is considered exactly once by using these cues: does it end in 3, 2, or 1 consecutive letter(s) (1 consecutive means a string like ...BA, ...AB, as in the letter switches) and does it WLOG consider both A and B?]
+[Convince yourself that each case for <math>S(n)</math> is considered exactly once by using these cues: does it end in <math>3</math>, <math>2</math>, or <math>1</math> consecutive letter(s) (<math>1</math> consecutive means a string like ...<math>BA</math>, ...<math>AB</math>, as in the letter switches) and does it <math>WLOG</math> consider both <math>A</math> and <math>B?</math>]
-From there we realize that <math>S(n)=S(n-1)+S(n-2)+S(n-3)</math> because 3 in a row requires <math>S(n-3)</math>, and so on. Let's start using all <math>S(n)</math> values <math>(\mod12)</math>. We also know that <math>S(1)=2, S(2)=4, S(3)=8</math>, and so on. These residues are: <math>2, 4, 8, 2, 2, 0, 4, 6, 10, 8, 0, 6, 2, 8, 4, 2, 2, 8...</math>, upon which the cycle repeats. Note that the cycle length is 52, and <math>2015=38\cdot 52+39</math>, so the residue of <math>S(2015)(\mod{12})</math> is the residue of <math>S(39)=\boxed{8}</math>.
+From there we realize that <math>S(n)=S(n-1)+S(n-2)+S(n-3)</math> because 3 in a row requires <math>S(n-3)</math>, and so on. We need to find <math>S(2015)</math> mod 12. We first compute <math>S(2015)</math> mod <math>3</math> and mod <math>4</math>. By listing out the residues mod <math>3</math>, we find that the cycle length for mod <math>3</math> is <math>13</math>. <math>2015</math> is <math>0</math> mod <math>13</math> so <math>S(2015) = S(13) = 2</math> mod <math>3</math>. By listing out the residues mod <math>4</math>, we find that the cycle length for mod <math>4</math> is <math>4</math>. S(2015) = S(3) = mod <math>4</math>. By Chinese Remainder Theorem, <math>S(2015) =\boxed{8}</math> mod <math>12</math>.
+==Solution 3 (Easy Version)==
+We can start off by finding patterns in <math>S(n)</math>. When we calculate a few values we realize either from performing the calculation or because the calculation was performed in the exact same way that <math>S(n) = 2^n - 2((n_4)- (n_5) \dots (n_n))</math>. Rearranging the expression we realize that the terms aside from <math>2^{2015}</math> are congruent to <math>0</math> mod <math>12</math>(Just put the equation in terms of <math>2^{2015}</math> and the four combinations excluded and calculate the combinations mod <math>12</math>). Using patterns we can see that <math>2^{2015}</math> is congruent to <math>8</math> mod <math>12</math>. Therefore <math>\boxed {8}</math> is our answer.
+~Very minor edit in LaTeX by get-rickrolled
+== Video Solution by Richard Rusczyk ==
+https://artofproblemsolving.com/videos/amc/2015amc12a/400
-==Solution 3 (Easy Version)==
+~ dolphin7
-We can start off by finding patterns in <math>S(n)</math>. When we calculate a few values we realize either from performing the calculation or because the calculation was performed in the exact same way that <math>S(n) = 2^n - 2((n_4)- (n_5) \dots (n_n))</math>. Rearranging the expression we realize that the terms aside from <math>2^2015</math> are congruent to <math>0</math> mod <math>12</math>(Just put the equation in terms of 2^2015 and the four combinations excluded and calculate the combinations mod <math>12</math>). Using patterns we can see that <math>2^{2015}</math> is congruent to <math>8</math> mod <math>12</math>. Therefore <math>\boxed {8}</math> is our answer.
 == See Also ==
 {{AMC12 box|year=2015|ab=A|num-b=21|num-a=23}}

2015 AMC 12A (Problems • Answer Key • Resources)
Preceded by Problem 21	Followed by Problem 23
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