Difference between revisions of "2012 AMC 10A Problems/Problem 23"

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Adam, Benin, Chiang, Deshawn, Esther, and Fiona have internet accounts.  Some, but not all, of them are internet friends with each other, and none of them has an internet friend outside this group.  Each of them has the same number of internet friends.  In how many different ways can this happen?
 
Adam, Benin, Chiang, Deshawn, Esther, and Fiona have internet accounts.  Some, but not all, of them are internet friends with each other, and none of them has an internet friend outside this group.  Each of them has the same number of internet friends.  In how many different ways can this happen?
  
<math> \textbf{(A)}\ 60\qquad\textbf{(B)}\ 170\qquad\textbf{(C)}\ 290\qquad\textbf{(D)}\ 320\qquad\textbf{(E)}\ 660 </math>
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<math> \text{(A)}\ 60\qquad\text{(B)}\ 170\qquad\text{(C)}\ 290\qquad\text{(D)}\ 320\qquad\text{(E)}\ 660 </math>
  
 
== Solution ==
 
== Solution ==
  
 
Note that if <math>n</math> is the number of friends each person has, then <math>n</math> can be any integer from <math>1</math> to <math>4</math>, inclusive.
 
Note that if <math>n</math> is the number of friends each person has, then <math>n</math> can be any integer from <math>1</math> to <math>4</math>, inclusive.
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One person can have at most 4 friends since they cannot be all friends (stated in the problem).
  
 
Also note that the cases of <math>n=1</math> and <math>n=4</math> are the same, since a map showing a solution for <math>n=1</math> can correspond one-to-one with a map of a solution for <math>n=4</math> by simply making every pair of friends non-friends and vice versa.  The same can be said of configurations with <math>n=2</math> when compared to configurations of <math>n=3</math>.  Thus, we have two cases to examine, <math>n=1</math> and <math>n=2</math>, and we count each of these combinations twice.
 
Also note that the cases of <math>n=1</math> and <math>n=4</math> are the same, since a map showing a solution for <math>n=1</math> can correspond one-to-one with a map of a solution for <math>n=4</math> by simply making every pair of friends non-friends and vice versa.  The same can be said of configurations with <math>n=2</math> when compared to configurations of <math>n=3</math>.  Thus, we have two cases to examine, <math>n=1</math> and <math>n=2</math>, and we count each of these combinations twice.
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(Note: If you aren’t familiar with one-to-one correspondences, think of it like this: the number of ways to choose 4 friends is equal to number of ways to exclude one friend from your friend group. Hence, since the number of ways to choose 1 friend is the same thing as choosing 1 to not be friends with, <math>n=1</math> and <math>n=4</math> have the same number of ways. Similarly, <math>n=2</math> and <math>n=3</math> have the same number of ways as well. ~peelybonehead)
  
 
For <math>n=1</math>, if everyone has exactly one friend, that means there must be <math>3</math> pairs of friends, with no other interconnections.  The first person has <math>5</math> choices for a friend.  There are <math>4</math> people left.  The next person has <math>3</math> choices for a friend.  There are two people left, and these remaining two must be friends.  Thus, there are <math>15</math> configurations with <math>n=1</math>.
 
For <math>n=1</math>, if everyone has exactly one friend, that means there must be <math>3</math> pairs of friends, with no other interconnections.  The first person has <math>5</math> choices for a friend.  There are <math>4</math> people left.  The next person has <math>3</math> choices for a friend.  There are two people left, and these remaining two must be friends.  Thus, there are <math>15</math> configurations with <math>n=1</math>.
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For <math>n=2</math>, there are two possibilities.  The group of <math>6</math> can be split into two groups of <math>3</math>, with each group creating a friendship triangle.  The first person has <math>\binom{5}{2} = 10</math> ways to pick two friends from the other five, while the other three are forced together.  Thus, there are <math>10</math> triangular configurations.   
 
For <math>n=2</math>, there are two possibilities.  The group of <math>6</math> can be split into two groups of <math>3</math>, with each group creating a friendship triangle.  The first person has <math>\binom{5}{2} = 10</math> ways to pick two friends from the other five, while the other three are forced together.  Thus, there are <math>10</math> triangular configurations.   
  
However, the group can also form a friendship hexagon, with each person sitting on a vertex, and each side representing the two friends that person has.  The first person may be seated anywhere on the hexagon [[Without loss of generality]].  This person has <math>\binom{5}{2} = 10</math> choices for the two friends on the adjoining vertices.  Each of the three remaining people can be seated "across" from one of the original three people, forming a different configuration.  Thus, there are <math>10 \cdot 3! = 60</math> hexagonal configurations, and in total <math>70</math> configurations for <math>n=2</math>.
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However, the group can also form a friendship hexagon, with each person sitting on a vertex, and each side representing the two friends that person has.  The first person may be seated anywhere on the hexagon [[without loss of generality]].  This person has <math>\binom{5}{2} = 10</math> choices for the two friends on the adjoining vertices.  Each of the three remaining people can be seated "across" from one of the original three people, forming a different configuration.  Thus, there are <math>10 \cdot 3! = 60</math> hexagonal configurations, and in total <math>70</math> configurations for <math>n=2</math>.
  
 
As stated before, <math>n=3</math> has <math>70</math> configurations, and <math>n=4</math> has <math>15</math> configurations.  This gives a total of <math>(70 + 15)\cdot 2 = 170</math> configurations, which is option <math>\boxed{\textbf{(B)}\ 170}</math>.
 
As stated before, <math>n=3</math> has <math>70</math> configurations, and <math>n=4</math> has <math>15</math> configurations.  This gives a total of <math>(70 + 15)\cdot 2 = 170</math> configurations, which is option <math>\boxed{\textbf{(B)}\ 170}</math>.
  
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=== Note ===
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We can also calculate the triangular configurations by applying <math>\frac{\binom{6}{3}}{2} = \frac{20}{2}=10</math> (Because choosing <math>A</math>,<math>B</math> and <math>C</math> is the same as choosing <math>D</math>,<math>E</math> and <math>F</math>.
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For the hexagonal configurations, we know that the total amount of combinations is <math>6!=720</math>. However, we must correct for our  overcounting because of rotation and reflection. We have that there are <math>{720 \over 6 \cdot 2} = 60</math> because there <math>6</math> rotations of the hexagon and 2 reflections (clockwise and counterclockwise) for each valid way.
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=== Note 2 ===
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We can also calculate the hexagonal configurations by placing each person at a random vertex (6!) and dividing for rotations (by 6) and reflections (by 2):
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                                                <math>\frac{6!}{12}=60</math>
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=== Note 3 ===
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For the hexagonal configuration, it is essentially congruent to counting the number of paths that start and end with A. From <math>A</math>, we have <math>5</math> options, then the next one has <math>4</math>, and so on, so we have: <math>5\cdot 4 \hdots 1 \cdot 1</math>, where the final <math>1</math> is because the final point needs to reconnect to <math>A</math>. Thus, there are <math>5! = 120</math> ways. Dividng by <math>2</math> since we overcounted by accounting for both directions, we have <math>120/2 = \fbox{60}</math>
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-bigbrain123
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==Video Solution by Richard Rusczyk==
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https://www.youtube.com/watch?v=92X9ePsgPRU
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==Remark==
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This is similar to a certain 2023 Mathcounts Chapter Problem.....
 
== See Also ==
 
== See Also ==
  
 
{{AMC10 box|year=2012|ab=A|num-b=22|num-a=24}}
 
{{AMC10 box|year=2012|ab=A|num-b=22|num-a=24}}
 +
 
{{AMC12 box|year=2012|ab=A|num-b=18|num-a=20}}
 
{{AMC12 box|year=2012|ab=A|num-b=18|num-a=20}}
 
[[Category:Introductory Combinatorics Problems]]
 
 
{{MAA Notice}}
 
{{MAA Notice}}

Revision as of 16:53, 12 October 2023

The following problem is from both the 2012 AMC 12A #19 and 2012 AMC 10A #23, so both problems redirect to this page.

Problem

Adam, Benin, Chiang, Deshawn, Esther, and Fiona have internet accounts. Some, but not all, of them are internet friends with each other, and none of them has an internet friend outside this group. Each of them has the same number of internet friends. In how many different ways can this happen?

$\text{(A)}\ 60\qquad\text{(B)}\ 170\qquad\text{(C)}\ 290\qquad\text{(D)}\ 320\qquad\text{(E)}\ 660$

Solution

Note that if $n$ is the number of friends each person has, then $n$ can be any integer from $1$ to $4$, inclusive.

One person can have at most 4 friends since they cannot be all friends (stated in the problem).

Also note that the cases of $n=1$ and $n=4$ are the same, since a map showing a solution for $n=1$ can correspond one-to-one with a map of a solution for $n=4$ by simply making every pair of friends non-friends and vice versa. The same can be said of configurations with $n=2$ when compared to configurations of $n=3$. Thus, we have two cases to examine, $n=1$ and $n=2$, and we count each of these combinations twice.

(Note: If you aren’t familiar with one-to-one correspondences, think of it like this: the number of ways to choose 4 friends is equal to number of ways to exclude one friend from your friend group. Hence, since the number of ways to choose 1 friend is the same thing as choosing 1 to not be friends with, $n=1$ and $n=4$ have the same number of ways. Similarly, $n=2$ and $n=3$ have the same number of ways as well. ~peelybonehead)

For $n=1$, if everyone has exactly one friend, that means there must be $3$ pairs of friends, with no other interconnections. The first person has $5$ choices for a friend. There are $4$ people left. The next person has $3$ choices for a friend. There are two people left, and these remaining two must be friends. Thus, there are $15$ configurations with $n=1$.

For $n=2$, there are two possibilities. The group of $6$ can be split into two groups of $3$, with each group creating a friendship triangle. The first person has $\binom{5}{2} = 10$ ways to pick two friends from the other five, while the other three are forced together. Thus, there are $10$ triangular configurations.

However, the group can also form a friendship hexagon, with each person sitting on a vertex, and each side representing the two friends that person has. The first person may be seated anywhere on the hexagon without loss of generality. This person has $\binom{5}{2} = 10$ choices for the two friends on the adjoining vertices. Each of the three remaining people can be seated "across" from one of the original three people, forming a different configuration. Thus, there are $10 \cdot 3! = 60$ hexagonal configurations, and in total $70$ configurations for $n=2$.

As stated before, $n=3$ has $70$ configurations, and $n=4$ has $15$ configurations. This gives a total of $(70 + 15)\cdot 2 = 170$ configurations, which is option $\boxed{\textbf{(B)}\ 170}$.

Note

We can also calculate the triangular configurations by applying $\frac{\binom{6}{3}}{2} = \frac{20}{2}=10$ (Because choosing $A$,$B$ and $C$ is the same as choosing $D$,$E$ and $F$.


For the hexagonal configurations, we know that the total amount of combinations is $6!=720$. However, we must correct for our overcounting because of rotation and reflection. We have that there are ${720 \over 6 \cdot 2} = 60$ because there $6$ rotations of the hexagon and 2 reflections (clockwise and counterclockwise) for each valid way.

Note 2

We can also calculate the hexagonal configurations by placing each person at a random vertex (6!) and dividing for rotations (by 6) and reflections (by 2):

                                                $\frac{6!}{12}=60$

Note 3

For the hexagonal configuration, it is essentially congruent to counting the number of paths that start and end with A. From $A$, we have $5$ options, then the next one has $4$, and so on, so we have: $5\cdot 4 \hdots 1 \cdot 1$, where the final $1$ is because the final point needs to reconnect to $A$. Thus, there are $5! = 120$ ways. Dividng by $2$ since we overcounted by accounting for both directions, we have $120/2 = \fbox{60}$

-bigbrain123

Video Solution by Richard Rusczyk

https://www.youtube.com/watch?v=92X9ePsgPRU

Remark

This is similar to a certain 2023 Mathcounts Chapter Problem.....

See Also

2012 AMC 10A (ProblemsAnswer KeyResources)
Preceded by
Problem 22
Followed by
Problem 24
1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25
All AMC 10 Problems and Solutions
2012 AMC 12A (ProblemsAnswer KeyResources)
Preceded by
Problem 18
Followed by
Problem 20
1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25
All AMC 12 Problems and Solutions

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