The mean water temperature downstream from a power plant cooling tower discharge pipe should be no more than 100F. Past experience has indicated that the standard deviation of temperature is 2F. The water temperature is measured on nine randomly chosen days, and the average temperature is found to be 98F. (a) Should the water temperature be judged acceptable with 0.05? (b) What is the P-value for this test? (c) What is the probability of accepting the null hypothesis at 0.05 if the water has a true mean temperature of 104 F?
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Textbook Solutions for Applied Statistics and Probability for Engineers
Question
A manufacturer produces crankshafts for an automobile engine. The wear of the crankshaft after 100,000 miles (0.0001 inch) is of interest because it is likely to have an impact on warranty claims. A random sample of n 15 shafts is tested and 2.78. It is known that 0.9 and that wear is normally distributed. (a) Test H0: 3 versus using 0.05. (b) What is the power of this test if 3.25? (c) What sample size would be required to detect a true mean of 3.75 if we wanted the power to be at least 0.9?
Solution
The first step in solving 9-2 problem number 3 trying to solve the problem we have to refer to the textbook question: A manufacturer produces crankshafts for an automobile engine. The wear of the crankshaft after 100,000 miles (0.0001 inch) is of interest because it is likely to have an impact on warranty claims. A random sample of n 15 shafts is tested and 2.78. It is known that 0.9 and that wear is normally distributed. (a) Test H0: 3 versus using 0.05. (b) What is the power of this test if 3.25? (c) What sample size would be required to detect a true mean of 3.75 if we wanted the power to be at least 0.9?
From the textbook chapter TESTS ON THE MEAN OF A NORMAL DISTRIBUTION, VARIANCE KNOWN you will find a few key concepts needed to solve this.
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