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Transcript 
RESEARCH METHODOLOGY &
STATISTICS
LECTURE 6B: CONFIDENCE INTERVALS
Addictions Department
MSc(Addictions)
From sample to population…
units
population
inference
sample
RESEARCH METHODS
AND STATISTICS
Sampling
distributions
and
confidence
intervals
Sampling distributions
population
6
mean
sample
Sampling distributions
population
6
5
mean
sample
Sampling distributions
population
5
6
mean
sample
6
Sampling distributions
population
4
6
7
5
6
7
8
5
6
7
8
9
sampling distribution
sampling distribution of the mean
sample
Relationship between distributions
population
the distribution of the mean is normal
even if
the distribution of the variable is not
mean
mean
sample
mean
sampling distribution
Relationship between distributions
population
how precisely the population mean
is estimated by the sample mean
standard
error
deviation
standard
deviation
sampling distribution
√sample
size
sample
95% confidence interval for a mean
population
standard
error
mean
mean
mean
mean -1.96 x s.e.
sample
mean +1.96 x s.e.
95% probability that sample mean
is within 1.96 standard errors of the
population mean
95% confidence interval for a mean
population
mean?
mean
mean
mean -1.96 x s.e.
sample
mean +1.96 x s.e.
95% probability that population mean
is within 1.96 standard errors of the
sample mean
95% confidence interval for a mean
population
mean?
mean
mean
mean -1.96 x s.d.
√size
sample
mean +1.96 x s.d.
√size
95% probability that population mean
is within 1.96 standard errors of the
sample mean
Sampling and inference
population
mean?
mean
sample
mean
sampling
distribution
Interpreting confidence intervals
• An example result: mean = 6.7, 95% CI = 2.7 – 8.9
• Does not indicate:
“there is a 95% probability that the population mean lies
between 2.7 and 8.9”
• The population mean is unknown but it is a fixed
number
• The confidence interval varies between samples
1. Take multiple random, independent samples
2. For each, calculate 95% confidence interval
3. On average, 19/20 (95%) of the confidence intervals will
overlap the true population mean
COMPUTER EXERCISE
Confidence
intervals
Creating confidence intervals
http://tinyurl.com/oqwtguv
Exercises
1. How does altering the sample size affect the confidence
intervals calculated?
2. Select a Skewed Bimodal distribution. What happens to
the confidence intervals with a large sample size (>30)?
What happens when the sample size is <10?
3. Try creating different distributions to see how the
confidence interval calculation is affected
Modify Java settings
1. Go to the Java Control Panel (On Windows Click Start
and then type Configure Java)
2. Click on the Security tab
3. Click on the Edit Site List button
4. Click the Add button
5. Type http://wise.cgu.edu
6. Click the Add button again
7. Click Continue and OK on the security window dialogue
box
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