Difference between revisions of "1987 IMO Problems/Problem 1"

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as desired.
 
as desired.
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Slightly Clearer Solution
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For any <math>k</math>, if there are <math>p_n(k)</math> permutations that have <math>k</math> fixed points, then we know that each fixed point is counted once in the product <math>k \cdot p_n{k}</math>. Therefore the given sum is simply the number of fixed points among all permutations of <math>\{ 1, \ldots , n \}</math>. However, if we take any <math>x</math> such that <math>1 \le x \le n</math> and <math>x</math> is a fixed point, there are <math>(n-1)!</math> ways to arrange the other numbers in the set. Therefore our desired sum becomes <math>n \cdot (n-1)! = n!</math>, so we are done.
  
 
==Solution 2==
 
==Solution 2==
 
 
The probability of any number <math>i</math> where <math>1\le i\le n</math> being a fixed point is <math>\frac{1}{n}</math>. Thus, the expected value of the number of fixed points is <math>n\times \frac{1}{n}=1</math>.  
 
The probability of any number <math>i</math> where <math>1\le i\le n</math> being a fixed point is <math>\frac{1}{n}</math>. Thus, the expected value of the number of fixed points is <math>n\times \frac{1}{n}=1</math>.  
  
 
The expected value is also <math>\sum_{k=0}^{n} \frac{k \cdot p_n (k)}{n!}</math>.
 
The expected value is also <math>\sum_{k=0}^{n} \frac{k \cdot p_n (k)}{n!}</math>.
  
Thus, <cmath>\sum_{k=0}^{n} \frac{k \cdot p_n (k)}{n!}=1</cmath> or <cmath>\sum_{k=0}^{n} k \cdot p_n (k) = n!</cmath>.
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Thus, <cmath>\sum_{k=0}^{n} \frac{k \cdot p_n (k)}{n!}=1</cmath> or <cmath>\sum_{k=0}^{n} k \cdot p_n (k) = n!.</cmath>
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== Note ==
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Maybe try and find a formula for <math>p_n(k)</math>. It is quite elementary if you know basic properties of binomial coefficients and stuff. For instance, how many ways can we choose <math>k</math> fixed points out of the <math>n</math> total digits? Well, it can be done in <math>\binom{n}{k}</math> ways. Now since we want exactly <math>k</math> fixed points, what do we do with the remaining <math>(n-k)</math> digits? Well we don't want any of those fixed. Clearly, of the <math>(n-k)</math> spots left to put these <math>(n-k)</math> points, we can put where it started off. So we have then <math>(n-k-1)</math> spots to put one of the remaining <math>(n-k)</math> points. Continuing on, we actually obtain a formula for <math>p_n(k)</math>, namely, <math>\binom{n}{k}(n-k-1)(n-k-2)\dots1</math>. Now we have to be careful, because now, what about for <math>k=n-1</math>? We see that no matter how we choose <math>n-1</math> fixed points, we always have to put the remain point into the last possible spot, which was the spot it started on. Therefore, we must eliminate the case <math>k=n-1</math>.
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~th1nq3r
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== Note 2 ==
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<math>p_n(k)</math> is actually <math>\binom{n}{k}d(n-k)</math>, where <math>d</math> is the derangement counter function (See https://oeis.org/A000166)
  
 
{{IMO box|before=First question|num-a=2|year=1987}}
 
{{IMO box|before=First question|num-a=2|year=1987}}
  
 
[[Category:Olympiad Combinatorics Problems]]
 
[[Category:Olympiad Combinatorics Problems]]

Latest revision as of 17:54, 10 May 2023

Problem

Let $p_n (k)$ be the number of permutations of the set $\{ 1, \ldots , n \} , \; n \ge 1$, which have exactly $k$ fixed points. Prove that

$\sum_{k=0}^{n} k \cdot p_n (k) = n!$.

(Remark: A permutation $f$ of a set $S$ is a one-to-one mapping of $S$ onto itself. An element $i$ in $S$ is called a fixed point of the permutation $f$ if $f(i) = i$.)

Solution

The sum in question simply counts the total number of fixed points in all permutations of the set. But for any element $i$ of the set, there are $(n-1)!$ permutations which have $i$ as a fixed point. Therefore

$\sum_{k=0}^{n} k \cdot p_n (k) = n!$,

as desired.

Slightly Clearer Solution

For any $k$, if there are $p_n(k)$ permutations that have $k$ fixed points, then we know that each fixed point is counted once in the product $k \cdot p_n{k}$. Therefore the given sum is simply the number of fixed points among all permutations of $\{ 1, \ldots , n \}$. However, if we take any $x$ such that $1 \le x \le n$ and $x$ is a fixed point, there are $(n-1)!$ ways to arrange the other numbers in the set. Therefore our desired sum becomes $n \cdot (n-1)! = n!$, so we are done.

Solution 2

The probability of any number $i$ where $1\le i\le n$ being a fixed point is $\frac{1}{n}$. Thus, the expected value of the number of fixed points is $n\times \frac{1}{n}=1$.

The expected value is also $\sum_{k=0}^{n} \frac{k \cdot p_n (k)}{n!}$.

Thus, \[\sum_{k=0}^{n} \frac{k \cdot p_n (k)}{n!}=1\] or \[\sum_{k=0}^{n} k \cdot p_n (k) = n!.\]

Note

Maybe try and find a formula for $p_n(k)$. It is quite elementary if you know basic properties of binomial coefficients and stuff. For instance, how many ways can we choose $k$ fixed points out of the $n$ total digits? Well, it can be done in $\binom{n}{k}$ ways. Now since we want exactly $k$ fixed points, what do we do with the remaining $(n-k)$ digits? Well we don't want any of those fixed. Clearly, of the $(n-k)$ spots left to put these $(n-k)$ points, we can put where it started off. So we have then $(n-k-1)$ spots to put one of the remaining $(n-k)$ points. Continuing on, we actually obtain a formula for $p_n(k)$, namely, $\binom{n}{k}(n-k-1)(n-k-2)\dots1$. Now we have to be careful, because now, what about for $k=n-1$? We see that no matter how we choose $n-1$ fixed points, we always have to put the remain point into the last possible spot, which was the spot it started on. Therefore, we must eliminate the case $k=n-1$.

~th1nq3r

Note 2

$p_n(k)$ is actually $\binom{n}{k}d(n-k)$, where $d$ is the derangement counter function (See https://oeis.org/A000166)

1987 IMO (Problems) • Resources
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