STA 291Winter 09/10
Lecture 7Dustin Lueker
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Two Types of Estimators Point Estimate
◦ A single number that is the best guess for the parameter Sample mean is usually at good guess for the
population mean Interval Estimate
◦ Point estimator with error bound A range of numbers around the point estimate Gives an idea about the precision of the estimator
The proportion of people voting for A is between 67% and 73%
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Confidence Interval Inferential statement about a parameter
should always provide the accuracy of the estimate◦ How close is the estimate likely to fall to the true
parameter value? Within 1 unit? 2 units? 10 units?
◦ This can be determined using the sampling distribution of the estimator/sample statistic
◦ In particular, we need the standard error to make a statement about accuracy of the estimator
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Confidence Interval Range of numbers that is likely to cover (or
capture) the true parameter Probability that the confidence interval
captures the true parameter is called the confidence coefficient or more commonly the confidence level◦ Confidence level is a chosen number close to 1,
usually 0.90, 0.95 or 0.99◦ Level of significance = α = 1 – confidence level
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Confidence Interval To calculate the confidence interval, we
use the Central Limit Theorem◦ Substituting the sample standard deviation for
the population standard deviation
Also, we need a that is determined by the confidence level
Formula for 100(1-α)% confidence interval for μ
/ 2z
n
sZx 2/
STA 291 Winter 09/10 Lecture 7
90% confidence interval◦ Confidence level of 0.90
α=.10 Zα/2=1.645
95% confidence interval◦ Confidence level of 0.95
α=.05 Zα/2=1.96
99% confidence interval◦ Confidence level of 0.99
α=.01 Zα/2=2.576
Common Confidence Levels
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This interval will contain μ with a 100(1-α)% confidence◦ If we are estimating µ, then why it is
unreasonable for us to know σ? Thus we replace σ by s (sample standard deviation) This formula is used for large sample size (n≥30)
If we have a sample size less than 30 a different distribution is used, the t-distribution, we will get to this later
Confidence Intervals
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n
sZx 2/
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Compute a 95% confidence interval for μ if we know that s=12 and the sample of size 36 yielded a mean of 7
Example
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“Probability” means that in the long run 100(1-α)% of the intervals will contain the parameter◦ If repeated samples were taken and confidence
intervals calculated then 100(1-α)% of the intervals will contain the parameter
For one sample, we do not know whether the confidence interval contains the parameter
The 100(1-α)% probability only refers to the method that is being used
Interpreting Confidence Intervals
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Interpreting Confidence Intervals
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Incorrect statement◦ With 95% probability, the population mean will fall
in the interval from 3.5 to 5.2
To avoid the misleading word “probability” we say that we are “confident”◦ We are 95% confident that the true population
mean will fall between 3.5 and 5.2
Interpreting Confidence Intervals
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Confidence Intervals Changing our confidence level will change
our confidence interval◦ Increasing our confidence level will increase the
length of the confidence interval A confidence level of 100% would require a
confidence interval of infinite length Not informative
There is a tradeoff between length and accuracy◦ Ideally we would like a short interval with high
accuracy (high confidence level)
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The width of a confidence interval◦ as the confidence level increases◦ as the error probability decreases◦ as the standard error increases◦ as the sample size n decreases
Why?
Facts about Confidence Intervals
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Start with the confidence interval formula assuming that the population standard deviation is known
Mathematically we need to solve the above equation for n
Choice of Sample Size
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MExn
Zx
2/
2
2/2
ME
Zn
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Example About how large a sample would have been
adequate if we merely needed to estimate the mean to within 0.5, with 95% confidence? Assume
Note: We will always round the sample size up to ensure that we get within the desired error bound.
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To account for the extra variability of using a sample size of less than 30 the student’s t-distribution is used instead of the normal distribution
Confidence Interval for n<30
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n
stx 2/
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t-distributions are bell-shaped and symmetric around zero
The smaller the degrees of freedom the more spread out the distribution is
t-distribution look much like normal distributions
In face, the limit of the t-distribution is a normal distribution as n gets larger
t-distribution
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Need to know α and degrees of freedom (df)◦ df = n-1
α=.05, n=23◦ tα/2=
α=.01, n=17◦ tα/2=
α=.1, n=20◦ tα/2=
Finding tα/2
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A sample of 12 individuals yields a mean of 5.4 and a variance of 16. Estimate the population mean with 98% confidence.
Example
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Confidence Interval for a Proportion The sample proportion is an unbiased and
efficient estimator of the population proportion◦ The proportion is a special case of the mean
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n
ppZp
)ˆ1(ˆˆ 2/
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Sample Size As with a confidence interval for the sample
mean a desired sample size for a given margin of error (ME) and confidence level can be computed for a confidence interval about the sample proportion
◦ This formula requires guessing before taking the sample, or taking the safe but conservative approach of letting = .5 Why is this the worst case scenario? (conservative
approach)
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ME
Zppn 2/)ˆ1(ˆ
p̂
p̂
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Example ABC/Washington Post poll (December 2006)
◦ Sample size of 1005◦ Question
Do you approve or disapprove of the way George W. Bush is handling his job as president? 362 people approved
Construct a 95% confidence interval for p What is the margin of error?
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Example If we wanted B=2%, using the sample
proportion from the Washington Post poll, recall that the sample proportion was .36
◦ n=2212.7, so we need a sample of 2213 What do we get if we use the conservative
approach?
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21.96
0.36 (1 0.36)0.02
n
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