Cloud seeding has been studied for many decades as a weather modification procedure (for an interesting study of this subject, see the article in Technometrics, “A Bayesian Analysis of a Multiplicative Treatment Effect in Weather Modification," Vol. 17, pp. 161–166). The rainfall in acre-feet from 20 clouds that were selected at random and seeded with silver nitrate follows: 18.0, 30.7, 19.8, 27.1, 22.3, 18.8, 31.8, 23.4, 21.2, 27.9, 31.9, 27.1, 25.0, 24.7, 26.9, 21.8, 29.2, 34.8, 26.7, and 31.6. (a) Can you support a claim that mean rainfall from seeded clouds exceeds 25 acre-feet? Use a=0.01. Find the P-value. (b) Check that rainfall is normally distributed. (e) Explain how the question in part (a) could be answered by constructing a one-sided confidence bound on the mean diameter.
Cloud seeding has been studied for many decades as a weather modification procedure (for an interesting study of this subject, see the article in Technometrics, “A Bayesian Analysis of a Multiplicative Treatment Effect in Weather Modification," Vol. 17, pp. 161–166). The rainfall in acre-feet from 20 clouds that were selected at random and seeded with silver nitrate follows: 18.0, 30.7, 19.8, 27.1, 22.3, 18.8, 31.8, 23.4, 21.2, 27.9, 31.9, 27.1, 25.0, 24.7, 26.9, 21.8, 29.2, 34.8, 26.7, and 31.6. (a) Can you support a claim that mean rainfall from seeded clouds exceeds 25 acre-feet? Use a=0.01. Find the P-value. (b) Check that rainfall is normally distributed. (e) Explain how the question in part (a) could be answered by constructing a one-sided confidence bound on the mean diameter.
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You can perform this exercise in Minitab? the exercise is already solved!
But I just want to see how to do it in Minitab, please!
Note:
the exercise is already solved! as seen in the image I attached, I just want to see it solved in minitab!
(with pictures, or sreenshots) however, but I want to see the procedure :)
![+Cloud seeding has been studied for many decades as
a weather modification procedure (for an interesting study of this
subject, see the article in Technometrics, "A Bayesian Analysis of a
Multiplicative Treatment Effect in Weather Modification," Vol. 17,
pp. 161–166). The rainfall in acre-feet from 20 clouds that were
selected at random and seeded with silver nitrate follows: 18.0,
30.7, 19.8, 27.1, 22.3, 18.8, 31.8, 23.4, 21.2, 27.9, 31.9, 27.1, 25.0,
24.7, 26.9, 21.8, 29.2, 34.8, 26.7, and 31.6.
(a) Can you support a claim that mean rainfall from seeded
clouds exceeds 25 acre-feet? Use a=0.01. Find the P-value.
(b) Check that rainfall is normally distributed.
(e) Explain how the question in part (a) could be answered by
constructing a one-sided confidence bound on the mean
diameter.](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2Fec337c7c-30d6-4432-9db4-c6a9ca8069a9%2F3aa96d3f-3bb1-497d-8af6-07d6edda4049%2Flu2rqcn_processed.png&w=3840&q=75)
Transcribed Image Text:+Cloud seeding has been studied for many decades as
a weather modification procedure (for an interesting study of this
subject, see the article in Technometrics, "A Bayesian Analysis of a
Multiplicative Treatment Effect in Weather Modification," Vol. 17,
pp. 161–166). The rainfall in acre-feet from 20 clouds that were
selected at random and seeded with silver nitrate follows: 18.0,
30.7, 19.8, 27.1, 22.3, 18.8, 31.8, 23.4, 21.2, 27.9, 31.9, 27.1, 25.0,
24.7, 26.9, 21.8, 29.2, 34.8, 26.7, and 31.6.
(a) Can you support a claim that mean rainfall from seeded
clouds exceeds 25 acre-feet? Use a=0.01. Find the P-value.
(b) Check that rainfall is normally distributed.
(e) Explain how the question in part (a) could be answered by
constructing a one-sided confidence bound on the mean
diameter.
![a. 0.10 < P < 0.25 There is not sufficient evidence to support the claim that the mean rainfall from seeded
clouds exceeds 25 acre-feet
b. Satisfied
c. 0.25 < POWER < 0.40
d. n = 6
e. If 25 is less than or equal to the one-sided confidence bound, then we fail to reject the null hypothesis Ho.
If 25 is larger than the one-sided confidence bound, then we reject the null hypothesis Ho.](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2Fec337c7c-30d6-4432-9db4-c6a9ca8069a9%2F3aa96d3f-3bb1-497d-8af6-07d6edda4049%2Fsoau4mr_processed.png&w=3840&q=75)
Transcribed Image Text:a. 0.10 < P < 0.25 There is not sufficient evidence to support the claim that the mean rainfall from seeded
clouds exceeds 25 acre-feet
b. Satisfied
c. 0.25 < POWER < 0.40
d. n = 6
e. If 25 is less than or equal to the one-sided confidence bound, then we fail to reject the null hypothesis Ho.
If 25 is larger than the one-sided confidence bound, then we reject the null hypothesis Ho.
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