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Sampling Distributions

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Title: Sampling Distributions


1
Sampling Distributions
  • Chapter 9

2
9.1 Introduction
  • In real life calculating parameters of
    populations is prohibitive because populations
    are very large.
  • Rather than investigating the whole population,
    we take a sample, calculate a statistic related
    to the parameter of interest, and make an
    inference.
  • The sampling distribution of the statistic is the
    tool that tells us how close is the statistic to
    the parameter.

3
9.2 Sampling Distribution of the Mean
  • An example
  • A die is thrown infinitely many times. Let X
    represent the number of spots showing on any
    throw.
  • The probability distribution of X is

E(X) 1(1/6) 2(1/6) 3(1/6) .
3.5 V(X) (1-3.5)2(1/6) (2-3.5)2(1/6)
.
2.92
4
Throwing a die twice sample mean
  • Suppose we want to estimate m from the mean of
    a sample of size n 2.
  • What is the distribution of ?

5
Throwing a die twice sample mean
6
The distribution of when n 2
7
Sampling Distribution of the Mean
6
8
Sampling Distribution of the Mean
9
Sampling Distribution of the Mean
Demonstration The variance of the sample mean is
smaller than the variance of the population.
Mean 1.5
Mean 2.5
Mean 2.
Population
1.5
2.5
2
1
2
3
1.5
2.5
2
1.5
2.5
2
1.5
2.5
2
1.5
2.5
2
Compare the variability of the population to the
variability of the sample mean.
1.5
2.5
1.5
2.5
2
1.5
2.5
2
1.5
2.5
2
1.5
2.5
1.5
2.5
2
1.5
2.5
2
Let us take samples of two observations
1.5
2.5
2
10
Sampling Distribution of the Mean
Also, Expected value of the population (1 2
3)/3 2
Expected value of the sample mean (1.5 2
2.5)/3 2
11
The Central Limit Theorem
  • If a random sample is drawn from any population,
    the sampling distribution of the sample mean is
    approximately normal for a sufficiently large
    sample size.
  • The larger the sample size, the more closely the
    sampling distribution of will resemble a
    normal distribution.

12
Sampling Distribution of the Sample Mean
13
Sampling Distribution of the Sample Mean
  • Example 9.1
  • The amount of soda pop in each bottle is normally
    distributed with a mean of 32.2 ounces and a
    standard deviation of .3 ounces.
  • Find the probability that a bottle bought by a
    customer will contain more than 32 ounces.
  • Solution
  • The random variable X is the amount of soda in a
    bottle.

0.7486
m 32.2
x 32
14
Sampling Distribution of the Sample Mean
  • Find the probability that a carton of four
    bottles will have a mean of more than 32 ounces
    of soda per bottle.
  • Solution
  • Define the random variable as the mean amount of
    soda per bottle.

0.9082
15
Sampling Distribution of the Sample Mean
  • Example 9.2
  • Deans claim The average weekly income of B.B.A
    graduates one year after graduation is 600.
  • Suppose the distribution of weekly income has a
    standard deviation of 100. What is the
    probability that 25 randomly selected graduates
    have an average weekly income of less than 550?
  • Solution

16
Sampling Distribution of the Sample Mean
  • Example 9.2 continued
  • If a random sample of 25 graduates actually had
    an average weekly income of 550, what would you
    conclude about the validity of the claim that the
    average weekly income is 600?
  • Solution
  • With m 600 the probability of observing a
    sample mean as low as 550 is very small (0.0062).
    The claim that the mean weekly income is 600 is
    probably unjustified.
  • It will be more reasonable to assume that m is
    smaller than 600, because then a sample mean of
    550 becomes more probable.

17
9.3 Sampling Distribution of a Proportion
  • The parameter of interest for nominal data is the
    proportion of times a particular outcome
    (success) occurs.
  • To estimate the population proportion p we use
    the sample proportion.

The estimate of p
18
9.3 Sampling Distribution of a Proportion
  • Since X is binomial, probabilities about can
    be calculated from the binomial distribution.
  • Yet, for inference about we prefer to use
    normal approximation to the binomial.

19
Normal approximation to the Binomial
  • Normal approximation to the binomial works best
    when
  • the number of experiments (sample size) is large,
    and
  • the probability of success, p, is close to 0.5.
  • For the approximation to provide good results two
    conditions should be met
  • np 5 n(1 - p) 5

20
Normal approximation to the Binomial
Example Approximate the binomial probability
P(x10) when n 20 and p .5 The parameters of
the normal distribution used to approximate the
binomial are m np s2 np(1 - p)
21
Normal approximation to the Binomial
Let us build a normal distribution to approximate
the binomial P(X 10).
m np 20(.5) 10 s2 np(1 - p)
20(.5)(1 - .5) 5 s 51/2 2.24
P(XBinomial 10)
.176
10
22
Normal approximation to the Binomial
  • More examples of normal approximation to the
    binomial

P(Ylt 4.5)
P(X 4) _at_
4
P(X ³14) _at_
P(Y gt 13.5)
14
23
Approximate Sampling Distribution of a Sample
Proportion
  • From the laws of expected value and variance, it
    can be shown that E( ) p and V( )
  • p(1-p)/n
  • If both np gt 5 and np(1-p) gt 5, then
  • Z is approximately standard normally distributed.

24
  • Example 9.3
  • A state representative received 52 of the votes
    in the last election.
  • One year later the representative wanted to study
    his popularity.
  • If his popularity has not changed, what is the
    probability that more than half of a sample of
    300 voters would vote for him?

25
  • Example 9.3
  • Solution
  • The number of respondents who prefer the
    representative is binomial with n 300 and p
    .52. Thus, np 300(.52) 156 andn(1-p)
    300(1-.52) 144 (both greater than 5)
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