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Discrete Mathematics Lecture 7

This lecture covers various poker problems, combinations with repetition, algebra of combinations, probability axioms, conditional probability, Bayes' theorem, independent events, generic functions, one-to-one and onto functions, inverse functions, and the pigeonhole principle.

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Discrete Mathematics Lecture 7

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  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 Pascal’s Triangle • The number of r-combinations from a set of n elements equals the number of (n – r)-combinations from the same set. • Pascal’s 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, then:P(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 > 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) > k * N(Y), then there exists some y from Y so that there are at least k + 1 distinct x’s so that f(x) = y • “If n pigeons fly into m pigeonholes, and, for some positive k, m >k*m, then at least one pigeonhole contains k+1 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) = n^2. 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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