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4203 Mathematical Probability Chapter 2: Probability

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Title: 4203 Mathematical Probability Chapter 2: Probability


1
4203 Mathematical ProbabilityChapter 2
Probability
  • Instructor Dr. Ayona Chatterjee
  • Spring 2011

2
Classical Probability concept
  • If there are N equally likely possibilities of
    which one must occur and n are regarded as
    favorable, or as a success, then the probability
    of success is given by the ration n/N.
  • Example Probability of drawing a red card from a
    pack of cards 26/52 0.5.

3
Probability
  • Measures the likeliness of an outcome of an
    experiment.
  • The probability of an event is the proportion of
    the time that events of the same kind will occur
    in the long run.
  • Is a number between 0 and 1, with 0 and 1
    included.
  • Probability of an event A is the ratio of
    favorable outcomes to event A to the total
    possible outcomes of that experiment.

4
Some Definitions
  • An experiment is the process by which an
    observation or measurement is made.
  • When an experiment is preformed it can result in
    one or more outcomes which are called events.
  • A sample space associated with an experiment is
    the set containing all possible outcomes of that
    experiment. It is denoted by S.
  • Elements of the sample space are called sample
    points.

5
Sample spaces
  • Can be
  • Finite (toss a coin)
  • Countable (toss a coin till the first head
    appears)
  • Discrete (toss a coin)
  • Continuous (weight of a coin)

6
Example
  • A manufacturer has five seemingly identical
    computer terminals available for shipping.
    Unknown to her, two of the five are defective. A
    particular order calls for two of the terminals
    and is filled by randomly selecting two of the
    five that are available.
  • List the sample space for this experiment.
  • Let A denote the event that the order is filled
    with two nondefective terminals. List the sample
    points in A.

7
Venn Diagram
  • Graphical representation of sets.
  • A is complement of event A.

8
Probability of an Event
  • POSTULATE 1 The probability of an event is a
    nonnegative real number that is P(A)gt0 for any
    subset A of S.
  • POSTULATE 2 P(S) 1.
  • POSTULATE 3 If A1, A2, .is a finite or infinite
    sequence of mutually exclusive events of S then
    P(A1 U A2 U..)P(A1 )P(A2 )..

9
Mutually exclusive events
  • Two events A and B are said to be mutually
    exclusive if there are no elements common to the
    two sets. The intersection of the two sets is
    empty.

10
Rules of Probability
  • If A and A are complementary events in a sample
    space S, then P(A)1-P(A). Thus P(S) 1.
  • P(F) 0, probability of an empty set 0.
  • If A and B are events in a sample space S and A
    is subset B the P(A) lt P(B).
  • If A and B are any two events in a sample space
    then P(A U B) P(A)P(B) P(A B).

11
Conditional Probability
  • The conditional probability of an event A, given
    that an event B has occurred, is equal to
  • Provided P(B) gt 0.
  • Theorem If A and B are any two events in a
    sample space S and P(A)?0, then

12
Independent Events
  • Two events A and B are independent if and only if
  • If A and B are independent then A and B are also
    independent.





13
Example
  • A coin is tossed three times. If A is the event
    that a head occurs on each of the first two
    tosses, B is the event that a tail occurs on the
    thrid toss and C is the event that exactly two
    tails occur in the three tosses, show that
  • Events A and B are independent.
  • Events B and C are dependent.

14
Bayes Theorem
  • If B1, B2, ., and Bk constitute a partition of
    the sample space S and P(Bi) ?0, for i1, 2, .,
    k, then for any event A in S such that P(A) ?0

15
Reliability of a product
  • The reliability of a product is the probability
    that it will function within specified limits for
    a specific period of time under specified
    environmental conditions.
  • The reliability of a series system consisting of
    n independent components is given by
  • The reliability of a parallel system consisting
    of n independent components is given by
  • Ri is the reliability of the ith component.
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