IT233: Applied Statistics TIHE 2005
Confidence Intervals and Tests of Hypotheses
- Confidence intervals and tests for
- Confidence intervals and tests for
- Confidence intervals and tests for
- Confidence intervals and tests for
Confidence Intervals for
Theorem: If is the variance of a random sample of size from a normal population, a confidence interval for is
where and are - values with degrees of freedom, leaving areas and , respectively, to the right.
Proof:
The confidence interval for can be derived by using the statistic
Consider the following figure:
0
To derive the confidence interval, we begin by giving a probability statement based on the above figure that
Substituting for , we write
To isolate in the centre of the inequality, we divide each term by and then inverting each term, we obtain
The desired confidence interval for can be read as:
Example 1: A manufacturer of batteries claims that his batteries will last, on average, 3 years with a variance of 1 year. If 5 of these batteries have lifetimes years construct a 95% C.I. for and decide if the claim that is valid.
Solution:First we find the summary data:
= 5, = 15, = 48.26
= 0.815
NOTE: You could use your Calculator to find:We have,
To answer the last part of the problem, that is, “Is the claim that valid?”, we use the confidence interval method.
Answer:Since above interval reveals that the value lies in the internal, we can accept the claim with a 95% confidence.
Notes: (1) Do not use confidence interval method for testing any claim, if the test is one-tailed.(2) You could also use the following traditional method.
Test of Hypothesis for
The traditional method of hypothesis testing for the above example is as follows:
Null hypothesis:
Alternative hypothesis: (Two-tailed test)
Critical Region:
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=0.025
= 0.025
Acceptance
Region
0 0.484 11.1434
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Test Statistic
Conclusion: Since the value of test statistic falls in the acceptance region, we accept .
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