Medical researchers have developed a new artificial heart constructed primarily of titanium and plastic. The heart will last and operate almost indefinitely once it is implanted in the patient's body, but the battery pack needs to be recharged about every four hours. A random sample of 50 battery packs is selected and subjected to a life test. The average life of these batteries is 4.05 hours. Assume that battery life is normally distributed with standard deviation o = 0.2 hour. Use a = 0.05. (a) Is there evidence to support the claim that mean battery life exceeds 4 hours? (b) Compute the power of this test if the true mean battery life is 4.5 hours. Round your answer to two decimal places (e.g. 98.76). i (c) What sample size would be required if we want to detect a true mean battery life of 4.3 hours if we wanted the power of the test to be at least 0.90? IN

Medical researchers have developed a new artificial heart constructed primarily of titanium and plastic. The heart will last and operate almost indefinitely once it is implanted in the patient's body, but the battery pack needs to be recharged about every four hours. A random sample of 50 battery packs is selected and subjected to a life test. The average life of these batteries is 4.05 hours. Assume that battery life is normally distributed with standard deviation o = 0.2 hour. Use a = 0.05. (a) Is there evidence to support the claim that mean battery life exceeds 4 hours? (b) Compute the power of this test if the true mean battery life is 4.5 hours. Round your answer to two decimal places (e.g. 98.76). i (c) What sample size would be required if we want to detect a true mean battery life of 4.3 hours if we wanted the power of the test to be at least 0.90? IN

Glencoe Algebra 1, Student Edition, 9780079039897, 0079039898, 2018

18th Edition

ISBN:9780079039897

Author:Carter

Publisher:Carter

Chapter10: Statistics

Section10.5: Comparing Sets Of Data

Problem 4CYU

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Question

Q3)

Medical researchers have developed a new artificial heart constructed primarily of titanium and plastic. The heart will last and operate
almost indefinitely once it is implanted in the patient's body, but the battery pack needs to be recharged about every four hours. A
random sample of 50 battery packs is selected and subjected to a life test. The average life of these batteries is 4.05 hours. Assume
that battery life is normally distributed with standard deviation o = 0.2 hour. Use a = 0.05.
(a) Is there evidence to support the claim that mean battery life exceeds 4 hours?
(b) Compute the power of this test if the true mean battery life is 4.5 hours. Round your answer to two decimal places (e.g. 98.76).
i
(c) What sample size would be required if we want to detect a true mean battery life of 4.3 hours if we wanted the power of the test to
be at least 0.90?
IN

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