Questions involving the pigeonhole principle in Combinatorial Analysis.

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3answers
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Prove that every year contains at least $4$ months and at most $5$ months with $5$ Sundays

Prove that every year contains at least $4$ months and at most $5$ months with $5$ Sundays each. Miklos Bona rates this question as "less difficult than average" while I am stuck on it although I ...
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1answer
26 views

Discrete Structures camper problem [on hold]

If a camp has 12 cabins, what is the smallest number of campers that will guarantee that at least one cabin has more than six people? Please explain each step- I'm confused about how to do this.
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4answers
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In every set of $14$ integers there are two that their difference is divisible by $13$

Prove that in every set of $14$ integers there are two that their difference is divisible by $13$ The proof goes like this, there are $13$ remainders by dividing by $13$, there are $14$ numbers ...
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2answers
30 views

How to show $x,y,z \in A$ - Functions, Combinatorics

If $A \subseteq \{1,2,3,4,5,6\}$, how to show that for every $A$ there are $x,y,z \in \{1,2,3,4,5,6\}$, where $x,y,z$ can also be the same or at least not different from each other, and the following ...
2
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2answers
49 views

Pigeonhole Principle question - sum of natural numbers

Let $f:\{1,2,...,15\} \rightarrow \Bbb N$ be a function such that $\sum_{i=1}^{15} f(i) =100$. $f(15+1)$ is defined to be $f(1)$. I have shown that $14\leq f(i)+f(i+1)$ for some $1\leq i \leq15$ ...
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1answer
38 views

Pigeonhole principle, choosing point in a region [closed]

Consider the following region: It is bounded by a regular hexagon whose sides are of length 1 unit. Show that if any 7 points are chosen in this region (hexagon), then 2 of them must be no further ...
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1answer
42 views

51 Dalmatians grouping

Suppose there are 51 dalmatians and number of dots on each dalmatian is not null. Prove (or dis-prove) there is always a grouping such that at least one group has total number of dots as multiple of ...
4
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3answers
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On the distribution of multiples of 7 into intervals of length 11

Say we have two primes, say 7 and 11. We are to consider the positions of the multiples of 7 inside the (7 buckets of) multiples of $11$. So the buckets of 11 are: $[1,11],[12,22],\ldots ,[67,77]$, ...
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2answers
58 views

Pigeonhole principle, maximum numbers taken [closed]

42 peoples come to a laundromat in a particular day.There are 12 washing machines and exactly one people use one machine.Show that if no more than 6 people using each machine,then there will be a t ...
1
vote
1answer
31 views

Prove that if a graph has six vertices, then at least one of G or $\bar{G}$ has a subgraph isomorphic to $K_3$

I think this proof is related to proving to Theorem on friends and strangers which can be proved with the pigeonhole principle. But I am at a loss as to what are the holes and pigeons in this case. I ...
2
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1answer
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pigeonhole principle - Oneway Island

There is a group of cities with the follwoing rule: Each city is connected to each city linked by a oneway street: For any two different cities $A$ and $B$ is it you either go directly from $A$ to ...
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0answers
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Pigeon Hole Principle - proof of d as a positive integer

Let $d$ be a positive integer and consider any set $A$ of $d+1$ positive integers. Show that there exists two different numbers $x, y\ \epsilon\ A$ so that $ x \mod\ d = y \mod\ d$ and $x =/= y$. ...
3
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1answer
63 views

Pigeon Hole Principle : For $n + 1$ numbers

My question is : Take $n + 1$ numbers out of $1, 2,..., 2n$ Show that there will be two consecutive numbers My Approach : Using the Pigeon Hole Principle , the $n$ holes are ...
2
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1answer
45 views

$5$ points on a sphere [duplicate]

Diffuse $5$ points on a sphere. Prove there is a closed half-sphere that has at least $4$ points on it.
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0answers
63 views

combinatorics - pigeonhole principle - 2

I've advanced a little with this question but I'm not sure that I'm in the right direction. For any set $X$ with $n$ positive numbers, $n>5$, prove the existiance of subset $Y \subset X$ so that ...
12
votes
1answer
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How many people would you need in a room to ensure with 100% probaility that three have the same birthday?

I am vaguely aware of the Pigeonhole principle and I understand that you would need 367 people to ensure that two people have the same birthday. I think that it may be required to have 734 people in a ...
9
votes
2answers
124 views

Smallest number of points on plane that guarantees an angle of at most $18^\circ$

What is the smallest number $n$, that in any arrangement of $n$ points on the plane, there are three of them making an angle of at most $18^\circ$? It is clear that $n>9$, since the vertices of a ...
2
votes
2answers
93 views

show that at least 3 balls have same weight

You are given 49 balls of colour red, black and white. It is known that, for any 5 balls of the same colour, there exist at least two among them possessing the same weight. The 49 balls are ...
1
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1answer
68 views

Show that for any set of 201 positive integers less than 300, there must be two whose quotient is a power of three (with no remainder)

I guess we should not consider the zeroth power of 3 because it is equal to one. Any positive integer is a multiple of 1. Lets define the set S3 of integers that are multiples of 3 strictly less ...
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2answers
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Pigeonhole principle: In every set of 100 integers, there exist two integers whose difference is a multiple of 37

What are the pigeons and the pigeonholes and how to prove this statements? At first I tried to the following: There are "100 choose 2" or 4950 pairs of integers. But I don't know how to move ...
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3answers
60 views

Pigionhole Principle

Among any group of 3000 people there are at least 9 who have the same birthday. I cant figure out what's the object is and what's the box. And, how to apply it in the principle
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1answer
86 views

Problem with $20$ integers less than $70$

20 pairwise distinct integers each less than 70 are taken and their pairwise differences are taken(magnitude of the difference). Show that there always exists 4 equal numbers. I somehow found ...
0
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1answer
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Whether it is the pigeonhole principle?

I had a question, and I am just wondering if it is a question that involves combinations/permutations or the pigeonhole principle. In a class are $20$ students. What is the probability that at least ...
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1answer
60 views

Pigeon hole principle

Out of eleven square integers we can pick six integers such that $a^2+b^2+c^2=d^2+e^2+f^2 \,(\mod 12)$ This was probably the toughest question in section b of our maths paper.I knew this question ...
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0answers
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Prove that $ax^2 + by^2 \equiv c \ ( \mod{p})$ has integer solutions

Let $p$ be a prime number and $a, b, c$ integers such that $a$ and $b$ are not divisible by $p$. Prove that $ax^2 + by^2 \equiv c \ ( \mod{p})$ has integer solutions Well, this problem can be ...
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1answer
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Square labeled with same number.

Recently I met this combinatorics problem: "Let all points with integer coordinates in a plane be labeled with one of the numbers $1,2,3,...,n$. Prove that there is a rectangle whose vertices are ...
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1answer
80 views

Pigeonhole question about distinct sums

How do I show with the pigeonhole principle that no seven positive integers not exceeding $24$ can have sums of all subsets different. As observed by Ross Millikan, the simplest possible approach ...
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1answer
111 views

Senators full of hatred [closed]

There are 51 senators in a senate. The senate needs to be divided into n committees such that each senator is on exactly one committee. Each senator hates exactly three other senators. (If ...
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0answers
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Pigeon hole principle:Trominoes and chessboards

Heres the question: What is the largest number of squares on an 8 $\times$8 checkerboard which can be colored green,so that in any one arrangement of three squares ("tromino"),at least one square ...
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0answers
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Hard pigeonhole principle problem. [duplicate]

Prove that having 100 whole numbers, one can choose 15 of them so that the difference of any two is divisible by 7. 
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2answers
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prove that every lossless compression algorithm must result in increasing the file size for some inputs.? [closed]

Using Pigeonhole Principle prove that every lossless compression algorithm must result in increasing the file size for some inputs.?
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3answers
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How would you prove this theory of computation problem?

I have trouble proving the following statement, I'm supposed to do it for our theory of computation course but since I've been trying for days I'm looking for a hint : What is the smallest value ...
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0answers
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How was the expression derived?

Prove that in any set of ten different two-digit numbers one can select two disjoint subsets such that the sum of numbers in each of the subsets is the same? (Reference, CRUX magazine March 1975). I ...
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2answers
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Pigeonhole Principle : $mn+1$ pigeons into $n$ holes.

If you have to put $n+1$ pigeons into $n$ holes, according to Pigeonhole principle, you will have to put two pigeons into the same hole. But what if you have to put $mn+1$ pigeons into $n$ holes? ...
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2answers
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Pigeonhole principle application

Say there are $p_{1}$ red balls and $p_{2}$ green balls. We put all the balls in a circle with $p_{1}+p_{2}$ places in total. It is forbidden that a ball (red or green) is placed between two red ...
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0answers
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Using the pigeonhole principle to prove there is at least a sum of numbers bigger than 29.

There is a circumference with 14 points $\{p_{1}, p_{2}, ... p_{14}\}$. These points are assigned numbers 1 to 14 randomly. It must be proven that if points are taken three-by-three, these triplets ...
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2answers
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Pigeonhole Principle and Sets

Can anyone point me in the right direction for this homework question? I know what the pigeonhole principle is but don't see how it helps :( Let $n\geqslant 1$ be an integer and consider the set S = ...
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2answers
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Prove that any set of 2015 numbers has a subset who's sum is divisible by 2015

I assume this is correct to any size set, not 2015 in particular... it's obviously true for 2. I know from pen and paper it's true for 3, and 4.... I understand that I should look at the reminders, ...
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2answers
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A problem about pigeonhole principle or graph.

Let $A=\{1,2,...,n\}$, where $\binom{n}{3}\geq n+1$. Let $A_1,A_2,...,A_{n+1}$ be distinct subsets of $A$ such that $\bigcup_{i=1}^{n+1}A_i=A$ and $n(A_i)=3$ for all $i$. How to prove or disprove that ...
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0answers
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mantissa of pi and pigeonhole

It might be worth noting that this is a "pigeonhole principle" problem, but I'm not sure how to use PHP with it. The mantissa of pi is the fractional part of it (i.e. everything after the decimal ...
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2answers
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Chessboard Pigeonhole Question

"Each square of a 4-by-19 chessboard is colored either green, yellow or red. Prove that the board must contain a rectangle consisting of at least four squares, and such that its four corner squares ...
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0answers
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Seeking Feedback on my solution: Maximum area of a triangle inside a rectangle.

I was solving problem 3.3.16 from Paul Zeitz's book "The Art and Craft of Problem Solving." The problem reads Inside a 1 x 1 square, 101 points are placed.Show that some three of them form a ...
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0answers
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Pigeonhole Principle Party Question [duplicate]

I have this question in my assignment that I am not able to solve: In a conference where $n$ representatives attend, if $1$ of any $4$ of the attendants shake hands with the other $3$, prove that $1$ ...
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2answers
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Pigeon-hole with the sum of 3 numbers

In any set consisting of exactly 7 different numbers chosen from the first 9 positive whole numbers, there are always 3 different numbers whose sum is 15. Is this true or false? There's a follow-up ...
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2answers
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Pigeon Hole Question

Work shown below. "Suppose that the numbers 1 ,2 ,3 ,…,12 are randomly distributed around a circle. Prove or disprove each of the following assertions: a) There must be three neighbors whose sum is ...
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7answers
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Are there rigorous formulation and proof of the pigeonhole principle?

The well known and intuitive pigeonhole principle states that if $n$ items are put in $m$ containers, and $n>m$, then there is at least one container which has more than one object. I've always ...
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1answer
75 views

Pigeon-Hole Problem

Let $p$ and $q$ be two positive integers so that the largest common divisor of $p$ and $q$ is 1. Prove that for any non-negative integers $s\leq p-1$ and $t\leq q-1$, there exists a non-negative ...
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7answers
269 views

How the cardinality of $\mathbb{R^+}$ and $\mathbb{R}$ same?

Let me first confirm you that this question is not a duplicate of either this, this or this or any other similar looking problem. Here in the current problem I'm asking to disprove me(most probably ...
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2answers
90 views

Is this question a pigeon hole question?

How many integers must you pick in order to be sure that at least two of them have the same remainder when divided by 15? Explain. It seems like this is similar to the birthday pigeon hole ...
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3answers
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pidgeonhole problem need assistance

Suppose you have a sequence 2014, 20142014, 201420142014, . . . Show that there is an element in this sequence such that it is divisible by 2013. This is a problem I had on an exam and I know that ...