answer to the exercise.ONLY excercise e)Note:preferably, the answer in digital please, I usually do not understand when it is done by hand. a. 1.26 = z0 < za = 1.65, than we should fail to reject Ho.b. P-value=0.103835.c. B = 0.000325.d. n z 1.e. 39.85 < µ. + The life in hours of a battery is known to be approx-imately normally distributed with standard deviation o = 1.25hours. A random sample of 10 batteries has a mean life ofx = 40.5 hours.(a) Is there evidence to support the claim that battery lifeexceeds 40 hours? Use a = 0.05.(b) What is the P-value for the test in part (a)?(c) What is the B-error for the test in part (a) if the true meanlife is 42 hours?(d) What sample size would be required to ensure that B doesnot exceed 0.10 if the true mean life is 44 hours?(e) Explain how you could answer the question in part (a) bycalculating an appropriate confidence bound on life.

Given: Sample size (n) = 10 Population standard deviation (σ) = 1.25 hours Sample mean (x¯) = 40.5…

Answered: (e) Explain how you could answer the…

Math

Probability

(e) Explain how you could answer the question in part (a) by calculating an appropriate confidence bound on life.

A First Course in Probability (10th Edition)

10th Edition

ISBN:9780134753119

Author:Sheldon Ross

Publisher:Sheldon Ross

Chapter1: Combinatorial Analysis

Section: Chapter Questions

Problem 1.1P: a. How many different 7-place license plates are possible if the first 2 places are for letters and...

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Question

answer to the exercise.

ONLY excercise e)

Note:
preferably, the answer in digital please, I usually do not understand when it is done by hand.

a. 1.26 = z0 < za = 1.65, than we should fail to reject Ho.
b. P-value=0.103835.
c. B = 0.000325.
d. n z 1.
e. 39.85 < µ.

+ The life in hours of a battery is known to be approx-
imately normally distributed with standard deviation o = 1.25
hours. A random sample of 10 batteries has a mean life of
x = 40.5 hours.
(a) Is there evidence to support the claim that battery life
exceeds 40 hours? Use a = 0.05.
(b) What is the P-value for the test in part (a)?
(c) What is the B-error for the test in part (a) if the true mean
life is 42 hours?
(d) What sample size would be required to ensure that B does
not exceed 0.10 if the true mean life is 44 hours?
(e) Explain how you could answer the question in part (a) by
calculating an appropriate confidence bound on life.

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