For questions about the study of finite or countable discrete structures, specifically how to count or enumerate elements in a set (perhaps of all possibilities) or any subset. It includes questions on permutations, combinations, bijective proofs, and generating functions.

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1
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1answer
21 views

Finding the no of ways to count the letters in an English alphabet

How many strings of six lower case letters from the English alphabet contain a) the letter $a$? b) the letters $a$ and $b$? c) the letters $a$ and $b$ in consecutive positions with $a$ preceding ...
0
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0answers
8 views

Restricted integer composition, where every summand belongs to a different set

Could I get any suggestion on how to calculate the number of restricted integer compositions of a number $n$ with $k$ parts, where every summand belongs has its own subset? \begin{equation} ...
-2
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0answers
31 views

Number of ways for product of integers

We are given two positive integers $n$ and $m$. How many ways to write $n$ as a product of $m$ positive integers written in a non-decreasing order ? For example If $n=24$ and $m=1, 2, 3, 4,$ then ...
0
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1answer
36 views

Is there an equation to find out how after $\frac{6!}{6}$ to locate clockwise increase in numbers in sets of 2

So I asked this question last night what is the max possible combinations of 1 2 3 4 5 6 without repeating And as stated I don't know what symbols mean, but I learned what $!$ is and how it works ...
0
votes
1answer
21 views

Number of Unique Ranks of High Card in Three Card Brag

Well the game is called Teen Patti in India. Almost similar to Three Card Brag a British game. There are total $16440$ Unique High Card hands are present. (Considering the suit.) Hand $1 = 5$ Heart, ...
0
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0answers
9 views

Express reverse inversion, major index, descents in terms of the forward direction.

Given $w=a_1a_2...a_n \in S_n $, then the reverse of $w$ is $w^r=a_n....a_2a_1$. Express inv($w^r$), des($w^r$) and maj($w^r$) in terms inv($w$), des($w$), maj($w$), respectively. I know the ...
0
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0answers
19 views

alternating binomial sums

So we know that $\sum_{i=0}^t\binom{m}{i}\binom{n-m}{t-i}=\binom{n+m}{t}$ by a simple counting argument. Now is there any bound on the quantity $\sum_{i=0}^t(-1)^i\binom{m}{i}\binom{n-m}{t-i}$? Can ...
0
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1answer
29 views

A box with $3$ types of colored balls.

In a box there are $15$ white balls, $8$ black balls, and $12$ red balls. We extract $6$ balls, without putting them back. $(a)$ What is the probability that the first ball is red, the second and ...
0
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1answer
15 views

Morse code symbols represented by sequences of seven or fewer dots and dashes

In Morse code, symbols are represented by variable length sequences of dots and dashes. (For example, A = · −, 1 = · − − − −, and ? = · · − − · ·.) How many different symbols can be represented by ...
1
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3answers
42 views

An ice-cream shop sells $11$ kinds of ice-cream, including mango and lemon.

An ice-cream shop sells $11$ kinds of ice-cream, including mango and lemon. For a bowl, one chooses at random five kinds (not necessarily different). $(a)$ How many different bowls can be made? ...
0
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1answer
10 views

A finite, undirected, connected and simple graph with Eulerian circuit has $3$ vertices with the same degree

Let $G=(V,E)$ a finite, undirected, connected and simple graph, $|V| \ge 3. \space$ Prove: If $G$ has Eulerian circuit then $G$ has $3$ vertices with the same degree.
2
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3answers
40 views

If $n_{1}+n_{2}+n_{3}+n_{4}+n_{5} = 20.$ Then number of such distinct arrangements of $(n_{1},n_{2},n_{3},n_{4},n_{5})$

Let $n_{1}<n_{2}<n_{3}<n_{4}<n_{5}$ be the positive integers such that $n_{1}+n_{2}+n_{3}+n_{4}+n_{5} = 20$ Then number of such distinct arrangements of ...
3
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4answers
48 views

How many $3$-tuples $(a, b, c) \in M^3$ are there such $a+b+c$ is even?

The task is the following: $M= \left \{ 1,2, ... 99,100 \right \}$ How many $3$-tuples $(a, b, c) \in M^3$ are there such $a+b+c$ is even? I tried to solve it this way: There are only two ...
1
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0answers
52 views

What is so special about Higman's Lemma?

Is there a motivational example of Higman's Lemma that brings out the true beauty and importance of Higman's Lemma? What is the thing that made so many people care about it? For an example, I was ...
0
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1answer
44 views

When is the order important in Combinatorics?

In a shop five different type of chocolates are sold. How many different ways 6 chocolate bars can be chosen in such a way that at least 3 chocolate bars must be of type one and at most one of type ...
0
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0answers
33 views

Here is a question on combinatorics [on hold]

here are ten items on sale at a bazaar, each costing less than one dollar. Prove that it is possible for two people to purchase distinct subsets of these objects and pay exactly the same amount. (Not ...
0
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0answers
11 views

Bounding entries of random vector

Given a random vector $\mathbf{e} \in \mathbb{R}^n$, is it possible to count (or bound) the number of entries in $\mathbf{e}$ that have $|e_i| \ge 1/ \sqrt{n}$? It is known that entries in ...
1
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1answer
109 views

Covering board with pieces

Suppose we have board, of size (16x16) And 31 (1x4) + 33 (2x2) pieces. Is it possible to cover up board with those pieces, if so - how? If not - why? So far I was unable to think of anything ...
6
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0answers
25 views

Chromatic Number of Circulant Graph

Consider the Circulant Graph $Ci_{2n}(1,n-1,n)$ as described here: http://mathworld.wolfram.com/MusicalGraph.html Another way to describe $Ci_{2n}(1,n-1,n)$ would be $2n$ vertices with vertex set ...
1
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2answers
33 views

$6$ real numbers, sum of any $3$ consecutive is negative, while sum of any $4$ consecutive is positive. Prove false. [on hold]

It's from my combinatorics class, could anyone give me some hints? Thanks Sorry, I shortened the original phrasing of the question, which made it ambiguous here. The question goes: A computer ...
0
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0answers
7 views

Families of 3-element subsets such that no two intersect more than once

Another user asked the following question: "How can I determine the size of the largest collection of $k$-element subsets of an $n$-element set such that each pair of subsets has at most $m$ elements ...
0
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0answers
17 views

Number of ways of selecting a submatrix?

Given a matrix $N \times M$ and a point $(x,y)$ then in how many ways can you select a submatrix such that the point lies inside the submatrix ?
0
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2answers
21 views

Permutations with repeated item [on hold]

I have: Orange Apple Orange Guava Pineapple Watermelon Strawberry Note the repeated Orange. Out of these 7, I have to choose 4 fruits. How many permutations are possible?
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0answers
23 views

equal unions and intersections

Let $N$ be a $n$-element set and $k\ge n+2$. The sets $P_1,\dots,P_k$ are nonempty and their union equals $N$. Then there exists disjoint sets $I,J\subset\{1,\dots,k\}$ such that $\bigcup_{i\in ...
2
votes
1answer
59 views

Coupon Collectors Problem with Packets: Clarifying Wikipedia

The Coupon Collector's Problem (CCP) is very useful in many applications. However, the "default" CCP is relatively simple: suppose you have an urn containing $n$ pairwise different balls. Now you want ...
3
votes
4answers
76 views

Given that $6$ men and $6$ women are divided into pairs, what is the probability that none of the women will sit with a man?

I've generalized the question I was given here for simplicity: $6$ men and $6$ women are to be paired for a bus trip. If the pairings are done randomly, what's the probability that no women will end ...
-1
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0answers
17 views

Confusing Conditional Probability question 68 [on hold]

The four top tennis players in the world A, B, C, and D are invited to a special tournament where the winner gets one million dollars. In round one, Player A plays player D and player B plays player ...
2
votes
4answers
79 views

Prove the formula $\sum_{k=1}^n k\binom{n}{k} = n \cdot 2^{n-1}$ for all integers $n > 0$ [duplicate]

I just got to this question and I became a question mark. I wonder if anyone can help me with this one, because I don't even know how to begin to tackle this problem. The question: Prove the ...
2
votes
1answer
49 views

In how many ways can $8$ appointments be scheduled for a physician visiting a nursing home with $20$ patients? [on hold]

A physician routinely visits a local nursing home on Thursday mornings to examine patients. Suppose the facility has $20$ residents, but the physician only has time to check $8$. The supervisor places ...
0
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0answers
4 views

Counting subgraphs of bounded extremal degrees

Let $m\leq n-1$. Is there a closed expression counting the subgraphs of minimum degree $\geq m$ (resp. maximum degree $\geq m$) on $n$ labelled vertices?
0
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1answer
40 views

Finding a closed formula for: $1\cdot2\cdot3+2\cdot3\cdot4+…+(n-2)\cdot(n-1)\cdot(n)$ [duplicate]

As I calculated the sum of the serie above doesn't exist(sum doesn't converge). How can I prove it using the double computing(combinatorical method)?
1
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1answer
31 views

How many ways to divide $n$ different pieces of chocolate in two non empty groups?

After the example I think that the order of the groups doesn't matter so ${(A),(B,C)}$ and $(B,C),(A)$ counted as $1$. Suppose we split $5$ chocolates into a group of size $1$ and a group of size of ...
-1
votes
5answers
79 views

Deck of Cards Stats Probability Question [on hold]

Randomly select two cards in sequence from a full deck of 52 cards, what i s the probability that the first one is a King given that the second one is a King. If someone can please help me with this ...
2
votes
0answers
27 views

Distribution of distinct object problem

So i was given this question. How many ways are there to place 10 distinct people within 3 distinct rooms with exactly 5 people in the first room and 2 people in the second room? So i asked this ...
0
votes
1answer
17 views

Summation of all j-combinations (Expanding composition formula)

I found a formula for a problem that I was trying to solve, the Formula 3.2 in Section 3 at page 441 of this document.I am a little unsure about the "Summation over all j-combinations". Here is what I ...
2
votes
0answers
31 views

Generating subsets with 1 common element

I have a number $n$ and a set $S$ of $n(n-1)/2$ elements : $ \{1, 2, \ldots, n(n-1)/2\}$ I'm looking for an algorithm to generate $n$ distinct subsets of $S$, each having $n-1$ elements, with the ...
2
votes
1answer
20 views

How do you calculate the width of the Poset Lattice of Divisors?

Let $n = 10800 = 2^43^35^2$ I can find a set of eleven divisors of $n$ such that none divides another: $$\begin{array}{ccccc} & & & 2 3^3 & 3^35\\ & & 2^23^2 & ...
4
votes
3answers
223 views

How many solutions for equation with simple restrictions

I'm working on an assignment in which I have to count the number of solutions for this particular equation: $$x_1+x_2+x_3+x_4=20$$for non negative integers with $x_1<8 $ and $x_2<6$ I'm aware ...
3
votes
1answer
61 views

Number of 'walks' which stay above 0.

Consider a set of distinct $n$ numbers where $a_i \in \mathbb{R} $ and $$\sum_{i=1}^{n} a_i = 0$$ A walk is defined to be the sum of the numbers, so that the $k$th position is the partial sum to $k$. ...
0
votes
2answers
46 views

How many 10-digit decimal sequences (using 0, 1, 2, . . . , 9) are there in which digits 3, 4, 5, 6 all appear?

So i was given this question. How many 10-digit decimal sequences (using 0, 1, 2, . . . , 9) are there in which digits 3, 4, 5, 6 all appear? My solution below (not sure if correct) Let $A_i$ = set ...
5
votes
2answers
35 views

solve for variable in combination

i have the combination ${n\choose 11}=12376$ and am looking to solve for $n$. it turns out to be $17$. of course can use brute force approach where just plug numbers in for $n$ but am looking for a ...
-1
votes
2answers
39 views

What is the probability that when a deck of cards is shuffled and dealt, exactly 3 of the 4 aces will be dealt within the last 20 cards? [on hold]

I am trying to figure out this problem, I think that it is a "permutations with repetition" type of question.
1
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2answers
34 views

Number of ways of selecting 3 numbers from $\{1,2,3,\cdots,3n\}$ such that the sum is divisible by 3

Find the Number of ways of selecting 3 numbers from $\{1,2,3,\cdots,3n\}$ such that the sum is divisible by 3. (Numbers are selected without replacement). I made a list like this: The sum of ...
1
vote
1answer
37 views

Give a recursion for the number h(n) of strings in S of length n.

Let S be the set of strings on the alphabet {0,1,2,3} that do not contain 12 or 20 as a substring. Solving this I got: $$ h(n) = 4h(n-1) - 2h(n-2)$$ with $h(0) = 1, h(1) = 4,h(2) = 14 $. When I did ...
3
votes
1answer
27 views

Probability: Finding the Number of Pears Given Two Scenarios

You have a bag containing 20 apples, 10 oranges, and an unknown number of pears. If the probability that you select 2 apples and 2 oranges is equal to the probability that you select 1 apple, 1 ...
1
vote
1answer
48 views

How many ways are there to place 10 distinct people within 3 distinct rooms with exactly 5 people in the first room and 2 people in the second room?

So I was given this question. How many ways are there to place $10$ distinct people within $3$ distinct rooms with exactly $5$ people in the first room and $2$ people in the second room? I have ...
0
votes
0answers
28 views

Looking for mathematical/combinatorial and computational explanation regarding adding values in a $5 \times 4$ (matrix?) with a constraint.

Given the following matrix (not sure if I should call it that): Matrix $5 \times 4$ I want to add all possible combinations of values such that each Horse gets but one value from each Bookie. What I ...
-1
votes
2answers
54 views

Number of words of length $n$ on the alphabet $a,b,c$ recurrence. [on hold]

Let $a_{n}$ be the number of words of length $n$ on the alphabet $a,b,c$ such that $b,c$ are not adjacent. What is the recurrence relation for $a_{n}$.
1
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0answers
22 views

Small tree containing smaller trees

Given $n$, what is the smallest number $N=N(n)$ with the property that there exists a tree on $N$ (unlabelled) vertices that contains a copy of every tree on $n$ vertices? That such $N$ must exist is ...
1
vote
2answers
82 views

Find the recursive definition for the number of strings on 0, 1, 2 avoiding the substring 012?

This is the question $a(n)$ the number of strings on $0, 1, 2$ avoiding the substring $012$ and the answer is $$a(n)=3a(n−1)−a(n−3)$$ with $$a(0)=1,a(1)=3,a(2)=9$$ My question is how to you get this ...