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Lecture 16: Binomial Distribution and Continuous Distributions

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Title: Lecture 16: Binomial Distribution and Continuous Distributions


1
Lecture 16 Binomial Distribution and Continuous
Distributions
  • Professor Aurobindo Ghosh
  • E-mail ghosh_at_galton.econ.uiuc.edu

2
The Binomial Distribution
  • The binomial experiment can result in only one
    out of two outcomes.
  • Typical cases where the binomial experiment
    applies
  • A coin flipped results in heads or tails
  • An election candidate wins or loses
  • An employee is male or female
  • A car uses 87octane gasoline, or another gasoline.

3
Binomial experiment
  • There are n trials (n is finite and fixed).
  • Each trial can result in a success or a failure.
  • The probability p of success is the same for all
    the trials.
  • All the trials of the experiment are independent.
  • Binomial Random Variable
  • The binomial random variable counts the number of
    successes in n trials of the binomial experiment.
  • By definition, this is a discrete random variable.

4
  • Example 6.9
  • 5 of a catalytic converter production run is
    defective.
  • A sample of 3 converter s is drawn. Find the
    probability distribution of the number of
    defectives.
  • Solution
  • A converter can be either defective or good.
  • There is a fixed finite number of trials (n3)
  • We assume the converter state is independent on
    one another.
  • The probability of a converter being defective
    does not change from converter to converter
    (p.05).

The conditions required for the binomial
experiment are met
5
  • Let X be the binomial random variable indicating
    the number of defectives.
  • Define a success as a converter is found to be
    defective.

X P(X) 0 .8574 1 .1354 2 .0071 3
..0001
6
  • Mean and variance of binomial random variable
  • E(X) m np
  • V(X) s2 np(1-p)
  • Example 6.10
  • Records show that 30 of the customers in a shoe
    store make their payments using a credit card.
  • This morning 20 customers purchased shoes.
  • Use Table 1 of Appendix B to answer some
    questions stated in the next slide.

7
  • What is the probability that at least 12
    customers used a credit card?
  • This is a binomial experiment with n20 and
    p.30.

.01.. 30
0 . . 11
P(At least 12 used credit card)
P(Xgt12)1-P(Xlt11) 1-.995 .005
.995
8
  • What is the probability that at least 3 but not
    more than 6 customers used a credit card?

.01.. 30
0 2 . 6
P(3ltXlt6) P(X3 or 4 or 5 or 6) P(Xlt6)
-P(Xlt2) .608 - .035 .573
.035
.608
9
  • What is the expected number of customers who used
    a credit card?
  • E(X) np 20(.30) 6
  • Find the probability that exactly 14 customers
    did not use a credit card.
  • Let Y be the number of customers who did not use
    a credit card.P(Y14) P(X6) P(Xlt6) -
    P(xlt5) .608 - .416 .192
  • Find the probability that at least 9 customers
    did not use a credit card.
  • Let Y be the number of customers who did not use
    a credit card.P(Ygt9) P(Xlt11) .995

10
Continuous Probability Distributions
  • A continuous random variable has an uncountably
    infinite number of values in the interval (a,b).
  • The probability that a continuous variable X will
    assume any particular value is zero.

The probability of each value
1/4 1/4 1/4
1/4 1
1/3 1/3
1/3 1
1/2
1/2 1
1/2
11
  • To calculate probabilities we define a
    probability density function f(x).
  • The density function satisfies the following
    conditions
  • f(x) is non-negative,
  • The total area under the curve representing f(x)
    equals 1.
  • The probability that x falls between a and b is
    found by calculating the area under the graph of
    f(x) between a and b.

Whole Area 1
P(altxltb)
12
Uniform Distribution
  • A random variable X is said to be uniformly
    distributed if its density function is

13
  • Example 7.1
  • The time elapses between the placement of an
    order and the delivery time is uniformly
    distributed between 100 and 180 minutes.
  • Define the graph and the density function.
  • What proportion of orders takes between 2 and 2.5
    hours to deliver?

f(x) 1/80 100ltxlt180
P(120lt xlt150) (150-120)(1/80) .375
1/80
x
100
180
120
150
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