What is Combinatorics: Definition and 416 Discussions

Combinatorics is an area of mathematics primarily concerned with counting, both as a means and an end in obtaining results, and certain properties of finite structures. It is closely related to many other areas of mathematics and has many applications ranging from logic to statistical physics, from evolutionary biology to computer science, etc.
The full scope of combinatorics is not universally agreed upon. According to H.J. Ryser, a definition of the subject is difficult because it crosses so many mathematical subdivisions. Insofar as an area can be described by the types of problems it addresses, combinatorics is involved with:

the enumeration (counting) of specified structures, sometimes referred to as arrangements or configurations in a very general sense, associated with finite systems,
the existence of such structures that satisfy certain given criteria,
the construction of these structures, perhaps in many ways, and
optimization: finding the "best" structure or solution among several possibilities, be it the "largest", "smallest" or satisfying some other optimality criterion.Leon Mirsky has said: "combinatorics is a range of linked studies which have something in common and yet diverge widely in their objectives, their methods, and the degree of coherence they have attained." One way to define combinatorics is, perhaps, to describe its subdivisions with their problems and techniques. This is the approach that is used below. However, there are also purely historical reasons for including or not including some topics under the combinatorics umbrella. Although primarily concerned with finite systems, some combinatorial questions and techniques can be extended to an infinite (specifically, countable) but discrete setting.
Combinatorics is well known for the breadth of the problems it tackles. Combinatorial problems arise in many areas of pure mathematics, notably in algebra, probability theory, topology, and geometry, as well as in its many application areas. Many combinatorial questions have historically been considered in isolation, giving an ad hoc solution to a problem arising in some mathematical context. In the later twentieth century, however, powerful and general theoretical methods were developed, making combinatorics into an independent branch of mathematics in its own right. One of the oldest and most accessible parts of combinatorics is graph theory, which by itself has numerous natural connections to other areas. Combinatorics is used frequently in computer science to obtain formulas and estimates in the analysis of algorithms.
A mathematician who studies combinatorics is called a combinatorialist.

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  1. Y

    Combinatorics - In how many ways can three aces and two kings be drawn

    1. In how many ways can three aces and two kings be drawn? 2. There are 24 ways three aces can be drawn and there are 12 ways two kings can be drawn. 3. I tried 24x12=288 ways to get three aces and two kings.. people are telling me that it is wrong, but I am not understanding why
  2. S

    Combinatorics: Find the Coefficient of x^36 in this Generatin Function

    Homework Statement Find the coefficient of x^36 in (x^2 + x^3 + x^4 + x^5 + x^6 + x^7 + x^8)^6 Homework Equations 1/(1-x) = 1 + x + x^2 +... (where +... indicates an infinite series). (1 - x^(m+1)/(1-x)) = 1+x+x^2+...+x^m (I'll call this identity 'TWEAK') The Attempt at a...
  3. S

    Combinatorics: Finding a Generating Function

    Homework Statement A national singing contest has 5 distinct entrants from each state. Use a generating function for modeling the number of ways to pick 20 semifinalists if: a) There is at most 1 person from each state b) There are at most 3 people from each state. Homework...
  4. S

    Combinatorics: Gift Giving at a Party

    Homework Statement Each of ten employees brings one distinct present to an office party. Each present is given to a randomly selected employee by Santa, and any employee can get more than one present. What is the probability that at least two employees receive no presents? Homework...
  5. S

    Ways to Arrange the Letters In COMBINATORICS

    Homework Statement a) How many arrangements of the letters in COMBINATORICS have no consecutive vowels? b) In how many of the arrangements in part (a) do the vowels appear in alphabetical order? Homework Equations C(n,k) P(n,k) The Attempt at a Solution a) First I divided up...
  6. S

    Combinatorics: How Many Ways Are to Arrange the Letters in VISITING?

    Homework Statement How many ways are there to arrange the letters of the word VISITING with no pairof consecutive I's? Homework Equations C(n,k) P(n,k) The Attempt at a Solution I am calculating the entire number of arrangements possible at P(8,5). I then want to find out the...
  7. S

    Combinatorics: Choosing Sets of Distinct Digits

    Homework Statement How many integers between 1000 and 10000 are there with distinct digits (no leading zeros) and at least one of 2 and 4 must appear? Homework Equations None The Attempt at a Solution I am discounting the case of 10,000 since that has repeating digits. Thus...
  8. S

    Combinatorics: Spreading Rumors and Probability

    Homework Statement A rumor is spread randomly among a group of 10 people by successively having one person call someone, who calls someone and so on. A person can pass the rumor on to anyone except the individual who just called. What is the probability that if A starts the rumor, A...
  9. S

    Combinatorics: Ways to Choose Playing Cards

    Homework Statement How many ways are there to pick 2 different cards from a standard 52-card deck such that the first card is a spade and the second card is not a queen. Homework Equations P(n,k) C(n,k) The Attempt at a Solution Since the player must have one spade, there are 13...
  10. S

    Combinatorics: Choosing Books on a Shelf

    Homework Statement Given nine different English books, seven different French books, and five different German books: How many ways are there to mak a row of three books in which exactly one language is missing? Homework Equations P(n,k) C(n,k) The Attempt at a Solution I...
  11. S

    Combinatorics: Choosing Job Applicants

    Homework Statement There are eight applicants for a job, and three different judges who each rank the three applicants. Applicants are chosen if an donly if they appear in the top three in all three rankings. a) How many ways can the three judges produce their three rankings? b) What is...
  12. S

    Combinatorics Problem: Selection of Job Applicants

    Homework Statement There are eight applicants for the job of dog catcher and three different judges who each rank the applicants.Applicants are chosen if and only if they appear in the top three in all three rankings a) How many ways can the three judges produce their three rankings? b) What...
  13. O

    Combinatorics Problem: Finding Samples with Non-Conforming Chips

    So here is the problem: Now what seems logical to me is first choose 1 of the 10 non-performing and then choose 4 from the remaining 139 chips. What is wrong with my logic here? I don't get the answer the book gets (130,721,752), and instead get 148, 916, 260.
  14. A

    Combinatorics Problem: Choosing Couples in a Dance Class with 22 Students

    Homework Statement A dance class consists of 22 students, of which 10 are women and 12 are men. If 5 men and 5 women are to be chosen and then paired off, how many results are possible? Homework Equations The Attempt at a Solution We can say that for the first couple, there are a...
  15. M

    Number of Ways to Walk Between Corners of Blocks

    suppose that I want to walk from the corner of a block to the corner of another block (I depart from the corner of coordinates (0,0) and want to get to the corner with coordinates (X,Y), with X and Y being whole numbers. ); and I want to do so by walking N block sides (I can walk over the same...
  16. M

    Should I take Combinatorics or Abstract Algebra?

    I am a senior student double majoring in computer science and mathematics with the intention of getting a p.h.d in theoretical computer science(either computational complexity or applied discrete mathematics). for the upcoming winter semester I can take 1 math course. The ones that are related...
  17. A

    Combinatorics Problem: Forming Coalitions with at least 5 Mandates

    Homework Statement There are 7 parties competing in the elections. One party has obtained 3 mandates, and the rest 6 have received one mandate each. a) How many different coalitions with at least 5 mandates can be formed? b) Assume that the parties are being called to join each other in a...
  18. I

    Combinatorics Problem: How Many Ways Can I Put K Birds into M Cages?

    Homework Statement I have K birds to put into M cages. How many ways can I do this(no limit on the amount of birds in a cage - there can be empty cages)? Unfortunately I haven't had a combinatorics course (and my friends who have apparently have forgotten all of it...) so I'm a little...
  19. A

    Combinatorics - Permutations of abcdefg. Which is right?

    Homework Statement How many permutations of the letters a, b, c, d, e, f, g have either two or three letters between a and b? b _ _ a is also very much possible.Homework Equations nPr= n!/(n - r)!, where n >= rThe Attempt at a Solution For this question there can be 4 cases which are as...
  20. S

    Combinatorics Problem: Sending 15 Postcards to 15 Friends in Unique Ways

    Homework Statement You have 3 types of postcards. There are 5 of each type. How many ways can you send the 15 postcards to 15 friends, if each friend receives 1. The Attempt at a Solution I thought it would merely be 15!/(3*5!)
  21. N

    The Summation Identity (Combinatorics)

    Homework Statement Use the Summation Identity to count the cubes of all integers sizes formed by an n by n by n assembly of cubes. Homework Equations Summation Identity: Sum [from i = 0 to n] (i choose k) = (n+1 choose k+1). Sum [from i = 0 to n] (i^3) = (n^2)(n+1)^2 / 4 = (sum[from...
  22. F

    Combinatorics: 16 People Seated in a Row/Circle

    In how many ways can 16 people be seated: A. In a row, if 4 of the 16 do not want to sit next to one another B. In a row, if 3 of the 16 must be seated next to one another C. In a circle, if 3 of the 16 must be seated next to one another D. In a circle, if 4 of the 16 do not want to...
  23. T

    Summing Series Using Combinatorial Identities

    Homework Statement Sum the series 1^2+2^2+\cdots|n^2 by observing that m^2=2* \dbinom{m}{2} + \dbinom{m}{1} and using the identity \dbinom{0}{k}+ \dbinom{1}{k} + \cdots+ \dbinom{m}{k}= \dbinom{m+1}{k+1}. Homework Equations The Attempt at a Solution I know that...
  24. Q

    Combinatorics and alternating series

    Homework Statement Prove that 1 - \dbinom{n}{1}\ + \dbinom{n}{2} \ - \dbinom{n}{3} \ + \cdots \ + (-1)^r \dbinom{n}{r} = (-1)^r \dbinom{n - 1}{r} by induction. Homework Equations The Attempt at a Solution Well, I know how to solve the normal binomial sums by using the...
  25. S

    Finding number of paths via combinatorics

    Hi, I'm trying to figure out a variation of the problem where you determine the number of paths on a discrete grid from one point to another. For example, for the paths from (0,0) to (a,b), you can consider one path to be a rearrangement of a word with a x's and b y's, so the number of paths...
  26. T

    Understanding Factorials: A Combinatorics Primer

    In my combinatorics book, it's discussing inclusion-exclusion, and it says that n!-(n-1)! = (n-1)!*(n-1)! Can someone help me understand the rules of factorials? Thanks!
  27. H

    Mastering Combinatorics: Calculating Probabilities for Liar's Dice

    Probably the only area of math that really confuses me. :frown: I'm trying to calculate some probabilities for Liar's Dice. Essentially, the probabilities that a certain number of faces will appear when five dice are rolled, with one being a wildcard. If I try a specific combinatoric approach...
  28. I

    Enumerative Combinatorics help

    I was reading Stanley's first volume on Enumerative Combinatorics, and I am seemingly stuck on a basic question regarding compositions. It may be that my algebra skills are rusty, but I just cannot get the correct formula for the number of compositions of n into even numbers of even valued...
  29. D

    Choosing Postgrad Programme: Arithmetic Combinatorics Vs Algebraic Number Theory

    Dear all, I am attending a taught postgrad programme starting next October. I can not decide whether to take the Algebraic Number Theory or the (additive/arithmetic) Combinatorics modules. My choice will determine my PhD route, so it is a choice of career rather than just a choice of...
  30. ShayanJ

    How many ways can two knights threaten each other on a chessboard?

    Find the number of ways of placing two knights in a chessboard that they can threaten each other. I tried to solve it like this but it was wrong because the answer was not among the four options. I wrote the number of squares that that the knight can threaten on every square that we place...
  31. H

    Elementary combinatorics problem - why am I wrong?

    6 unique experienced persons 2 unique inexperienced persons How many 3-person combinations if at most one in the group can be inexperienced? 6*5*4/3! + 6*5*2/2! is the answer. My answer was 6*5*4/3! + 6*5*2/3! Why does the book divide by a 2-permutation and not a 3-permutation for...
  32. S

    Combinatorics Two n-digit integers Question

    Homework Statement Two n-digit integers (leading zeros allowed) are considered equivalent if one is a rearrangement of the other. (For example, 12033, 20331, and 01332 are considered equivalent five-digit integers.) If the digits 1, 3, and 7 can appear at most once, how many nonequivalent...
  33. P

    Inclusion/Exclusion Combinatorics

    Homework Statement Determine the number of permutations of {1,2,3,4,5,6,7} in which exactly four integers are in there natural positions. The Attempt at a Solution Would this be solved by using the Inclusion/Exclusion Principle and finding \left|S\right| - \sum \left|A_{1}\right|...
  34. P

    Combinatorics Proof: Prove n5^n = \frac{5}{4} Sum

    Homework Statement Prove that n5^n = \frac{5}{4} \sum_{k=0}^{n}k\begin{pmatrix}n\\k\end{pmatrix}4^k (Hint: First Expand (1+x^2)^n) The Attempt at a Solution So if I expand that I get (1+x^2)^n = (1+x^2)(1+x^2)...(1+x^2) n times so it equals \sum_{k=0}^n (1+x^2) Not sure where to...
  35. P

    Basic Combinatorics Inclusion-Exclusion Principle Clarification

    Homework Statement How many integers between 1 and 2009, inclusive are (a) not divisible by 3,2, and 10 (b) not divisible by 3,2, or 10? Homework Equations The number of objects of the set S that have none of the properties is given by the alternating expression: \mid S \mid -\sum...
  36. T

    Combinatorics, is this correct

    Homework Statement 6 children are sitting arounbd a round table, with each chair numbered from 1 to six. In how many ways can we rearange them so that no child sits across from the child who was across him before. Homework Equations The Attempt at a Solution Because the chairs...
  37. T

    Can a Subset of Questions Appear Exactly Once in Original and New Worksheets?

    Homework Statement My professor has 50 questions. In the beginning of the semester he makes 10 work sheets each with 5 questions. At the end of the semester, he makes 10 new worksheets from the same quetions, this tiem sorted by difficulty. Prove that there exists a subset of 10 question in...
  38. C

    My revised solution:b. 1c. 10d. 5e. 15

    1. (a) How many repeating three-digit numbers can be formed using the numbers {1, 2, 3}? (b) How many non-repeating three-digit numbers can be formed using the numbers {1, 2, 3}? My solutions: a. 3 x 3 x 3=27 b. 3 x 2 x 1 =6 2. (a) Construct a tree diagram for 4 tosses of a fair coin...
  39. S

    Combinatorics problem about determining number of paths

    Hi, I'm trying to figure out a variation of the problem where you determine the number of paths on a discrete grid. For example, for the paths from (0,0) to (a,b), you can consider it to be a rearrangement of a word with a x's and b y's, so the number of paths is (a+b)! / a!b!. The...
  40. F

    Find Coefficient of x^9y^10 in (3x^3 - 4y^2)^8 | Combinatorics Problem Solution

    Homework Statement Find the coefficient of x^{9} y^{10} in (3x^{3} - 4y^{2})^{8} Homework Equations The professor gave us a somewhat algebraic tactic or shortcut for solving these kinds of problems, mainly consisting of solving for each exponent. It can be somewhat tricky for me to explain...
  41. S

    Unique Arrangements of n As and Bs in a Circle | Combinatorics Homework

    Homework Statement You are given n identical As and n identical Bs. You are supposed to arrange them in a circle. How many unique arrangements are there? Homework Equations Use of combinatorics The Attempt at a Solution At first, I tried working out the answer if I arrange them in...
  42. silvermane

    Perfect Coverings of 2-by-2n Chessboard | Combinatorics Fun

    Homework Statement 1. Recall that Fn denotes the number of perfect coverings of a 2–by–n chessboard with dominoes. Use combinatorial reasoning to show that F2n = Sum [of k=0 to k=n] of (nCk) Fk for all integers n ≥ 0. Make sure to describeFk in the context of perfect coverings of a 2–by–2n...
  43. C

    What are the possible combinations in a poker game with a standard 52-card deck?

    Homework Statement in a poker game we want to calculate the Probability to get differnet combinations. in a card deck there are 52 cards from 4 different series. each series has 13 cards. we assume that each card get 5 random cards. What is the number of combinations to get the cards? (The...
  44. M

    How Do I Evaluate a Summation Involving Binomial Coefficients?

    how do I evaluate \sum_{k=0}^d \binom{n+d-k}{n} ?
  45. S

    Combinatorics problem regarding number of possible paths

    Hi, I'm trying to figure out a variation of the problem where you determine the number of paths on a discrete grid. For example, for the paths from (0,0) to (a,b), you can consider it to be a rearrangement of a word with a x's and b y's, so the number of paths is (a+b)! / a!b!. The...
  46. D

    Exploring the Relationship Between Combinatorics and Choosing Committees

    Homework Statement {n \choose 0} + {n+1 \choose 1} + {n+2 \choose 2}+...+{n+r \choose r} = {n+r+1 \choose r} We have to prove by counting both sides in a different way. For example, consider {n \choose 0}^2 + {n \choose 1}^2+...+{n \choose n}^2 = {2n \choose n} The RHS can be described as a...
  47. D

    Combinatorics: Even 3-Digit Numbers from 1-7 with Restrictions

    given the numbers 1 2 3 4 5 6 7, how many even 3 digit numbers can be made from these 7 digits a) if each number can only be used once b) if each number can be rused for b) what i did was: for the first digit i have 7 options, for the second still 7, since i can reuse, and for the 3rd...
  48. W

    Counting Distinct Poker Hands with Specific Criteria

    Homework Statement A poker hand contains five cards dealt from a deck of 52. How many distinct poker hands can be dealt containing: a) two pairs (for example 2 kings, 2 aces, and a 3) b) a flush (five cards in a given suit) c) a straight flush (any five in sequence in a given suit, but not...
  49. D

    Proof of ((nchoose2) choose 2)=3(n choose 3) +3(n choose 4)

    Homework Statement Give two proofs (algebraic and combinatorial) of the following formula: ((nchoose2) choose 2)=3(n choose 3) +3(n choose 4) Homework Equations The Attempt at a Solution Alright, I have part of the algebraic one but I get stuck, also I don't know how to...
  50. D

    How Many Paths Exist from (0, 0, 0) to (a, b, c) in a 3D Grid?

    Homework Statement Let a, b, and c be positive integers. How many paths are there from (0, 0, 0) to (a, b, c) if we are only allowed to increase one of the coordinates by one at each step? Homework Equations The Attempt at a Solution This problem is easy for the path between...
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