Download Ex St 801 Statistical Methods Inference about a Single Population

Ex St 801
Statistical Methods
Inference about a
Single Population
Mean
TYPES OF
STATISTICAL INFERENCE
• ESTIMATION
Answers the question
What is the value of the population
parameter?
• HYPOTHESIS TESTING
Answers the question
Is the parameter equal to a specific
value?
PARAMETER ESTIMATION
TERMS AND DEFINITIONS
• An ESTIMATOR is a rule that tells us how to
calculate the estimate based on sample
information.
• A POINT ESTIMATOR of a parameter is a
rule that estimates the parameter with a
single value.
TERMS AND DEFINITIONS
(contd.)
• An ESTIMATE is a number calculated using
an estimator.
• An estimator is called UNBIASED if its
average value is equal to the parameter being
estimated. Otherwise, the estimator is called
BIASED.
BIASED AND LARGE STANDARD
ERROR

 


BIASED AND SMALL STANDARD
ERROR





UNBIASED AND LARGE STANDARD
ERROR



UNBIASED AND SMALL STANDARD
ERROR





SOME EXAMPLES OF UNBIASED
ESTIMATORS
• The SAMPLE MEAN is ALWAYS an
unbiased estimator of the population
mean.
• The SAMPLE MEDIAN is an unbiased
estimator of the population mean if the
distribution being sampled is symmetric
about the population mean.
SOME EXAMPLES OF UNBIASED
ESTIMATORS (contd.)
• The SAMPLE VARIANCE is ALWAYS an
unbiased estimator of the population
variance.
SOME EXAMPLES OF BIASED
ESTIMATORS
• The SAMPLE MEDIAN is a biased
estimator of the population mean if the
distribution being sampled is not symmetric
about the population mean.
• The SAMPLE VARIANCE is a biased
estimator of the population variance if we
use n in the denominator of the formula
rather than n-1.
TERMS AND DEFINITIONS
• An INTERVAL ESTIMATOR of a parameter
is a rule that provides two numbers that form
an interval that is likely to contain the
parameter. The interval is called a
CONFIDENCE INTERVAL.
(Smaller Value, Larger Value)
TERMS AND DEFINITIONS (contd.)
• The smaller value is called the LOWER
CONFIDENCE LIMIT (LCL) and the larger
value is called the UPPER CONFIDENCE
LIMIT (UCL).
• The CONFIDENCE COEFFICIENT is the
probability that a confidence interval will
capture the parameter being estimated.
WHAT MIGHT BE EXPECTED TO
HAPPEN IF 90% CONFIDENCE
INTERVALS ARE CALCULATED FOR THE
MEAN
SAMPLE 10
SAMPLE 9
SAMPLE 8
SAMPLE 7
SAMPLE 6
SAMPLE 5
SAMPLE 4
SAMPLE 3
SAMPLE 2
SAMPLE 1

CRITICAL VALUE Z

Z.025 = 1.96
LARGE SAMPLE CONFIDENCE
INTERVAL FOR A SINGLE
POPULATION MEAN
Yz



 /2 

s
n





FACTORS AFFECTING THE
“MARGIN OF ERROR”
• The value of the standard deviation (s).
• The value of the confidence coefficient (1-).
• The value of the sample size (n).
DETERMINING THE SAMPLE SIZE
FOR A CONFIDENCE INTERVAL
z / 2  s

n=
2






2
E
2





NORMAL AND
T-DISTRIBUTIONS
NORMAL
T-DISTRIBUTION
-4
-3
-2
-1
0
Z
1
2
3
4
SMALL SAMPLE CONFIDENCE
INTERVAL FOR A SINGLE
POPULATION MEAN
Yt



 /2 , n-1 

s
n





HYPOTHESIS TESTING
STATISTICAL
EVIDENCE
102
95
STATING THE HYPOTHESES
• The NULL HYPOTHESIS (H0)
Is the statement that is assumed to be true
unless sufficient evidence is gathered to reject
the hypothesis.
• The ALTERNATIVE HYPOTHESIS (HA)
Is the statement that one wishes to support as
being true. This is done by gathering
evidence against the null hypothesis.
TYPES OF ERRORS
• A TYPE I ERROR
occurs by rejecting the null hypothesis when it is
true.
•  is the probability of making a Type I Error.
• A TYPE II ERROR
occurs by failing to reject the null hypothesis when
it is false.
• ß is the probability of making a Type II Error.
HYPOTHESIS TESTING TABLE
Actual Situation
Decision
Reject H 0
H0 Is True
Type I Error
(Prob. )
Fail to
Reject H 0
Good
Decision
(Prob. 1-)
H0 Is False
Good
Decision
(Prob. 1-)
Type II
Error
(Prob. )
OZONE DEPLETION EXAMPLE
Many scientists have become concerned that
there has been a depletion in the ozone level.
The mean concentration should be 100 PPM.
Suppose we wanted to test for a depletion in the
mean ozone level.
What would be the null and alternative
hypotheses?
H0:  = 100
HA:  < 100
OZONE DEPLETION EXAMPLE
What would be the TYPE I ERROR?
To conclude there was a depletion in the mean
ozone level, when actually there is no depletion.
What would be the TYPE II ERROR?
To conclude there was no depletion in the mean
ozone level, when actually there has been a
depletion.
OZONE DEPLETION PROBLEM
If you were given a choice between the
following probabilities, which would you
choose? Why?
A.  = .025 AND  = .10, OR
B.  = .10 AND  = .025.
BUNGEE JUMPING EXAMPLE
Suppose you were considering going bungee
jumping, but would only go if the mean
breaking strength of the cord was greater than
250 lbs.
What would be your null and alternative
hypotheses?
H0:  = 250
HA:  > 250
BUNGEE JUMPING EXAMPLE
What would be the TYPE I ERROR?
To conclude that it is safe to go bungee
jumping when it is actually dangerous.
What would be the TYPE II ERROR?
To conclude that it is dangerous to go bungee
jumping when it is actually safe.
BUNGEE JUMPING EXAMPLE
If you were given a choice between the
following probabilities, which would you
choose? Why?
A.  = .025 AND  = .10, OR
B.  = .10 AND  = .025.
HYPOTHESIS TESTING METHODS
• ORIGINAL SCALE
• STANDARDIZED SCALE
• P-VALUE
PROCEDURE FOR ORIGINAL AND
STANDARDIZED SCALE METHODS
• State the alternative hypothesis (HA) and the null
hypothesis (H0).
• State the TYPE I and II ERRORS.
• State level of significance (maximum acceptable ).
• Determine the rejection region.
• Compute the test statistic.
• Compare the test statistic and rejection region,
then make a decision.
• Draw a conclusion.
PROCEDURE FOR THE P-VALUE METHOD
• State the alternative hypothesis (HA) and the null
hypothesis (H0).
• State the TYPE I and II ERRORS.
• State level of significance (maximum acceptable ).
• Compute the test statistic.
• Calculate the p-value.
• Compare the p-value with the level of significance,
then make a decision.
• Draw a conclusion.
ORIGINAL SCALE METHOD
Sampling distribution if the null hypothesis is true
92
94
96
98
100
Y
102
104
106
108
STANDARDIZED SCALE METHOD
Sampling distribution if the null hypothesis is true
-4
-3
-2
-1
0
Z
1
2
3
4
P-VALUE METHOD
Sampling distribution if the null hypothesis is true
-4
-3
-2
-1
0
Z
1
2
3
4
HYPOTHESES
LOWER
TAIL
H 0 :  = 0
H a :   0
UPPER
TAIL
TWO
TAIL
H 0 :  = 0
H a :   0
H 0 :  = 0
H a :   0
TEST STATISTIC
LARGE SAMPLE
y - 0
Z OBS =
s/ n
SMALL SAMPLE
y - 0
t OBS =
s/ n
REJECTION REGION
• LARGE SAMPLE
Standard normal
distribution
• SMALL SAMPLE
t-distribution
with df=n-1
TYPE II ERROR AND THE POWER OF A
HYPOTHESIS TEST
• The TYPE II ERROR occurs by failing to
reject a null hypothesis that is false.
•  is the probability of making a TYPE II
ERROR.
• The power of a hypothesis test is the
probability of not making a TYPE II
ERROR. (1-)
DISTRIBUTION
WHEN H0 IS TRUE
DISTRIBUTION
WHEN HA IS TRUE


90
92
94
96
98
100
Y
102
104
106
108