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Discrete Mathematics Lecture 7

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Title: Discrete Mathematics Lecture 7


1
Discrete MathematicsLecture 7
Harper Langston New York University
2
Poker Problems
  • What is a probability to contain one pair?
  • What is a probability to contain two pairs?
  • What is a probability to contain a triple?
  • What is a probability to contain royal flush?
  • What is a probability to contain straight flush?
  • What is a probability to contain straight?
  • What is a probability to contain flush?
  • What is a probability to contain full house?

3
Combinations with Repetition
  • An r-combination with repetition allowed is an
    unordered selection of elements where some
    elements can be repeated
  • The number of r-combinations with repetition
    allowed from a set of n elements is C(r n 1,
    r)
  • Soft drink example

4
Algebra of Combinations and Pascals Triangle
  • The number of r-combinations from a set of n
    elements equals the number of (n
    r)-combinations from the same set.
  • Pascals triangle C(n 1, r) C(n, r 1)
    C(n, r)
  • C(n,r) C(n,n-r)

5
Binomial Formula
  • (a b)n ?C(n, k)akbn-k
  • Examples
  • Show that ?C(n, k) 2n
  • Show that ?(-1)kC(n, k) 0
  • Express ?kC(n, k)3k in the closed form

6
Probability Axioms
  • P(Ac) 1 P(A)
  • P(A ? B) P(A) P(B) P(A ? B)
  • What if A and B mutually disjoint?(Then P(A ? B)
    0)

7
Conditional Probability
  • For events A and B in sample space S if P(A) ¹ 0,
    then the probability of B given A is P(A B)
    P(A ? B)/P(A)
  • Example with Urn and Balls- An urn contains 5
    blue and

8
Conditional Probability Example
  • An urn contains 5 blue and 7 gray balls. 2 are
    chosen at random.- What is the probability they
    are blue?- Probability first is not blue but
    second is?- Probability second ball is blue?-
    Probability at least one ball is blue?-
    Probability neither ball is blue?

9
Conditional Probability Extended
  • Imagine one urn contains 3 blue and 4 gray balls
    and a second urn contains 5 blue and 3 gray balls
  • Choose an urn randomly and then choose a ball.
  • What is the probability that if the ball is blue
    that it came from the first urn?

10
Bayes Theorem
  • Extended version of last example.
  • If S, our sample space, is the union of n
    mutually disjoint events, B1, B2, , Bn and A is
    an even in S with P(A) ¹ 0 and k is an integer
    between 1 and n, thenP(Bk A)
    P(A Bk) P(Bk) .
  • P(A B1)P(B1) P(A
    Bn)P(Bn)
  • Application Medical Tests (false positives,
    etc.)

11
Independent Events
  • If A and B are independent events, P(A ? B)
    P(A)P(B)
  • If C is also independent of A and B P(A ? B ? C)
    P(A)P(B)P(C)
  • Difference from Conditional Probability can be
    seen via Russian Roulette example.

12
Generic Functions
  • A function f X ? Y is a relationship between
    elements of X to elements of Y, when each element
    from X is related to a unique element from Y
  • X is called domain of f, range of f is a subset
    of Y so that for each element y of this subset
    there exists an element x from X such that y
    f(x)
  • Sample functions
  • f R ? R, f(x) x2
  • f Z ? Z, f(x) x 1
  • f Q ? Z, f(x) 2

13
Generic Functions
  • Arrow diagrams for functions
  • Non-functions
  • Equality of functions
  • f(x) x and g(x) sqrt(x2)
  • Identity function
  • Logarithmic function

14
One-to-One Functions
  • Function f X ? Y is called one-to-one
    (injective) when for all elements x1 and x2 from
    X if f(x1) f(x2), then x1 x2
  • Determine whether the following functions are
    one-to-one
  • f R ? R, f(x) 4x 1
  • g Z ? Z, g(n) n2
  • Hash functions

15
Onto Functions
  • Function f X ? Y is called onto (surjective)
    when given any element y from Y, there exists x
    in X so that f(x) y
  • Determine whether the following functions are
    onto
  • f R ? R, f(x) 4x 1
  • f Z ? Z, g(n) 4n 1
  • Bijection is one-to-one and onto
  • Reversing strings function is bijective

16
Inverse Functions
  • If f X ? Y is a bijective function, then it is
    possible to define an inverse function f-1 Y ? X
    so that f-1(y) x whenever f(x) y
  • Find an inverse for the following functions
  • String-reverse function
  • f R ? R, f(x) 4x 1
  • Inverse function of a bijective function is a
    bijective function itself

17
Pigeonhole Principle
  • If n pigeons fly into m pigeonholes and n gt m,
    then at least one hole must contain two or more
    pigeons
  • A function from one finite set to a smaller
    finite set cannot be one-to-one
  • In a group of 13 people must there be at least
    two who have birthday in the same month?
  • A drawer contains 10 black and 10 white socks.
    How many socks need to be picked to ensure that a
    pair is found?
  • Let A 1, 2, 3, 4, 5, 6, 7, 8. If 5 integers
    are selected must at least one pair have sum of 9?

18
Pigeonhole Principle
  • Generalized Pigeonhole Principle For any
    function f X ? Y acting on finite sets, if n(X)
    gt k N(Y), then there exists some y from Y so
    that there are at least k 1 distinct xs so
    that f(x) y
  • If n pigeons fly into m pigeonholes, and, for
    some positive k, m gtkm, then at least one
    pigeonhole contains k1 or more pigeons
  • In a group of 85 people at least 4 must have the
    same last initial.
  • There are 42 students who are to share 12
    computers. Each student uses exactly 1 computer
    and no computer is used by more than 6 students.
    Show that at least 5 computers are used by 3 or
    more students.

19
Composition of Functions
  • Let f X ? Y and g Y ? Z, let range of f be a
    subset of the domain of g. The we can define a
    composition of g o f X ? Z
  • Let f,g Z ? Z, f(n) n 1, g(n) n2. Find f
    o g and g o f. Are they equal?
  • Composition with identity function
  • Composition with an inverse function
  • Composition of two one-to-one functions is
    one-to-one
  • Composition of two onto functions is onto

20
Cardinality
  • Cardinality refers to the size of the set
  • Finite and infinite sets
  • Two sets have the same cardinality when there is
    bijective function associating them
  • Cardinality is is reflexive, symmetric and
    transitive
  • Countable sets set of all integers, set of even
    numbers, positive rationals (Cantor
    diagonalization)
  • Set of real numbers between 0 and 1 has same
    cardinality as set of all reals
  • Computability of functions
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