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CMSC 203 / 0201 Fall 2002

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Title: CMSC 203 / 0201 Fall 2002


1
CMSC 203 / 0201Fall 2002
  • Week 11 4/6/8 November 2002
  • Prof. Marie desJardins

2
TOPICS
  • (Probability theory cont.)
  • Generalized combinations and permutations
  • NOTE changes to syllabus
  • Shifting of material some chapter sections
    dropped graphs (7.1-7.5) instead of Boolean
    algebra
  • NOTE topics on midterm
  • 3.1-3.5 Proofs, induction, and program
    correctness
  • 4.1-4.6 Counting
  • 5.1, 5.3, 5.5-5.6 Recurrence relations
    inclusion-exclusion
  • NOT chapters 6, 7, 10 (these will be on the final
    along with ALL EARLIER TOPICS)

3
MON 11/4 (PROBABILITY THEORY CONT. (4.5))
  • see week 9 notes

4
WED 11/6GENERALIZED PERMUTATIONS AND
COMBINATIONS (4.6)
  • HOMEWORK 8 DUE

5
Concepts / Vocabulary
  • Permutations and combinations with repetition
  • sampling with replacement
  • Number of r-permutations of n objects with
    repetition nr
  • Number of r-combinations of n objects with
    repetition C(nr-1, r) DAlemberts method /
    bars and stars
  • Table 4.6.1 gives formulas
  • Permutations with indistinguishable objecs
  • Theorem 3 Number of n-permutations of n objects,
    where there are ni objects of type i (i1, , k)
    n! / (n1! n2! nk!)

6
Examples
  • Exercise 4.6.19 Suppose that a large family has
    14 children, including two sets of identical
    triplets, three sets of identical twins, and two
    individual children. How many ways are there to
    seat these children in a row of chairs if the
    identical triplets or twins cannot be
    distinguished from one another?
  • Exercise 4.6.27 How many different strings can
    be made form the letters in ABRACADABRA, using
    all the letters?

7
Examples II
  • Exercise 4.6.35 How many ways are there to
    travel in xyz space from the origin (0,0,0) to
    the point (4,3,5) by taking positive unit steps
    in any of the three directions?
  • Exercise 4.6.42 A shelf holds 12 books in a row.
    How many ways are there to choose five books so
    that no two adjacent books are chosen?

8
FRI 11/8INCLUSION-EXCLUSION (5.5-5.6)
9
Concepts / Vocabulary
  • Inclusion-exclusion revisited
  • A?B A B - A?B
  • Inclusion-exclusion generalized
  • A?B?C A B C - A?B - A?C - B?C
    A?B?C
  • Principle of Inclusion-Exclusion
  • A1?A2??An ?1?i?nAi - ?1?iltj?nAi?Aj -
    (-1)n1 A1?A2??An
  • Proof by mathematical induction

10
Examples
  • Exercise 5.5.9 How many students are enrolled in
    a course either in calculus, discrete math, data
    structures, or programming languages if there are
    507, 292, 312, and 344 students in these courses,
    respectively 14 in both calculus and data
    structures 213 in both calculus and programming
    languages 211 in both discrete math and data
    structures 43 in both discrete math and
    programming languages and no student may take
    calculus and discrete math, or data structures
    and programming languages, concurrently?

11
Examples II
  • Sieve of Eratosthenes
  • Derangements Example 5.6.4 If n people check
    their hats at a restaurant, and the claim checks
    are misplaced, what is the probability that
    nobody receives the correct hat?
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