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Counting

Counting. Counting. Counting = Determining the number of elements of a finite set. Counting Rules. Product Rule: If there are n 1 choices for the first item and n 2 choices for the second item, then there are n 1 n 2 choices for the two items.

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Counting

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  1. Counting

  2. Counting Counting = Determining the number of elements of a finite set

  3. Counting Rules Product Rule: If there are n1 choices for the first item and n2 choices for the second item, then there are n1n2 choices for the two items Sum Rule: If there are n1 choices of an element from S1 and n2 choices of an element from S2 and S1 S2 is empty, then there are n1 + n2 choices of an element from S1 S2

  4. Counting Examples License numbers have the form LLL DDD. How many different license numbers are available? There are 38 students in a class, and 38 chairs.How many different seating arrangements are there if everyone shows up? How many different predicates are there on  = {a,…,z}?

  5. Important Cases of theProduct Rule • Cartesian product • |A1 A2 …  An| = |A1||A2|. . . |An| • Subsets of a set S • |P(S)|= 2|S| • Strings of length n over  • |n| = ||n

  6. Counting Functions Suppose |S| = n, |T| = m How many functions from S to T? How many one-to-one functions from S to T?

  7. More ComplicatedCounting Examples • BASIC variable names • Variables can be one or two characters long • The first character must be a letter • The second character can be a letter or a digit • The keywords “TO”, “IF”, and “DO” are excluded

  8. Counting Passwords • Passwords must be 4 to 6 characters long, and must contain at least one letter and at least one digit. (Case insensitive, no special characters.)

  9. Inclusion-Exclusion Principle • How many binary strings of length 9 start with 00 or end with 11? |A1A2 | = |A1| + |A2| - |A1A2|

  10. Inclusion-Exclusion • A class has of 40 students has 20 CS majors and 15 math majors. 5 of these students are dual majors. How many students in the class are neither math nor CS majors?

  11. GeneralizingInclusion-Exclusion General: + Singles – Pairs + Triples – Quads + . . .

  12. Pigeonhole Principle If k is a positive integer and k+1 or more objects are placed into k boxes, thenat least one box has two or more objects If N objects are placed into k boxes, then there is at least one box containing at least N/k objects

  13. PHP Applications • Prove that if a city has at least 10 million phone subscribers it needs more than one area code. (Phone numbers of the form XXX-XXXX.) • Prove that if you have 800 people, at least three share a common birthday.

  14. Clever PHP Applications • Every sequence of n2 + 1 distinct numbers contains a subsequence of length n+1 that is either strictly increasing or strictly decreasing. 4, 22, 8, 15, 19, 11, 2, 1, 9, 20, 10, 7, 16, 3, 6, 5, 14

  15. Proof • Let a1, . . . am be a sequence of n2+1 distinct numbers • Let ik be the length of the longest increasing sequence starting at ak • Let dk be the length of the longest decreasing sequence starting at ak • Suppose ik n and dk n for all k • There are n2 possible values of (ik, dk) • So there must be k and j, k < j, with ik = ij and dk = dj • This is a contradiction: • If ak < al al then ik > ij (start at ak and continue with the longest increasing sequence starting at al) • If ak < al al then ik > ij (start at ak and continue with the longest increasing sequence starting at al)

  16. Permutations vs. Combinations How many ways are there of selecting 1st, 2nd, and 3rd place from a group of 10 sprinters? How many ways are there of selecting the top three finishers from a group of 10 sprinters?

  17. r-Permutations An r-permutation is an ordered selectionof r elements from a set P(n, r), number of r-permutations ofan n-element set:

  18. r-Combinations An r-combination is an unordered selection of r elements from a set(or just a subset of size r) C(r, n), number of r-permutations ofan n-element set:

  19. How Many? Binary strings of length 10 with 3 0’s Binary strings of length 10 with 7 1’s How many different ways of assigning 38 students to the 5 seats in the front of the class How many different ways of assigning 38 students to a table that seats 5 students

  20. Prove C(n, r) = C(n, n-r) [Proof 1] Proof by formula

  21. Prove C(n, r) = C(n, n-r) [Proof 2] • Combinatorial proof • Set S with n elements • Every subset A of S with r elements corresponds to a subset of S with n – r elements (the complement of A)

  22. Counting Paths How many paths are there of length n+m-2 from the upper left corner to the lower right corner of an n  m grid?

  23. Binomial Theorem

  24. Binomial Coefficient Identities from the Binomial Theorem

  25. Pascal’s Identity and Triangle

  26. Recap • Permutations • Combinations

  27. How Many? Let s1 be a string of length n over 1 Let s2 be a string of length m over 2 Assuming 1 and 2 are distinct, how many interleavings are there of s1 and s2?

  28. Permutations with Repetition

  29. Combinations with Repetition How many different ways are there of selecting 5 letters from {A, B, C} with repetition?

  30. How many non-decreasing sequences of {1,2,3} of length 5 are there?

  31. How many different ways are there of adding 3 non-negative integers to get 5 ? 1 + 2 + 2  |  |  2 + 0 + 3  | |  0 + 1 + 4 3 + 1 + 1 5 + 0 + 0

  32. C(n+r-1,n-1) r-combinations of an n element set with repetition

  33. Permutations of Indistinguishable Objects How many different strings can be made from reordering the letters ABCDEFGH? How many different strings can be made from reordering the letters AAAABBBB? How many different strings can be made from reordering the letters GOOOOGLE?

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