STA 2201 s 2011 Assignment Five:

Your written answers and printouts are due at the beginning of class Friday on March 18. You may be asked to present your solution to the class before handing it in.

For this assignment, we have two independent random samples from normal distributions, and the interest is in testing H₀: σ²₁≤σ²₂ versus H₁: σ²₁>σ²₂

1. For n₁=n₂=50, suppose we obtain sample variances (with n-1 in the denominator) of s²₁=5.23 and s²₁=3.71. Calculate the F statistic and the p-value. Do you reject H₀ at α=0.05?
2. Explain why the power function of the F test is based on the central F distribution. Show a bit of calculation.
3. What is the power of the F test at σ²₁=5 and σ²₂=4? The answer is a single number.
4. Maintaining equal sample sizes, what total sample size is required for the test to have power of at lest 0.80 when σ²₁=5 and σ²₂=4? The answer is a single number.
5. Consider a large-sample likelihood ratio test of the same null hypothesis. To compare, what is the approximate power of this test at σ²₁=5 and σ²₂=4? The answer is a single number.