Suppose x has a distribution with a mean of 90 and a standard deviation of 15. Random samples of size n = 36 are drawn. (a) Describe the distribution. has a binomial distribution. has a normal distribution. has an approximately normal distribution. has a Poisson distribution. has an unknown distribution. has a geometric distribution. Compute the mean and standard deviation of the distribution. (For each answer, enter a number.) = mu sub x bar = = sigma sub x bar = (b) Find the z value corresponding to = 95. (Enter an exact number.) z = (c) Find P( < 95). (Enter a number. Round your answer to four decimal places.) P( < 95) = P(x bar < 95) (d) Would it be unusual for a random sample of size 36 from the x distribution to have a sample mean less than 95? Explain. No, it would not be unusual because more than 5% of all such samples have means less than 95. No, it would not be unusual because less than 5% of all such samples have means less than 95. Yes, it would be unusual because more than 5% of all such samples have means less than 95. Yes, it would be unusual because less than 5% of all such samples have means less than 95.
Suppose x has a distribution with a mean of 90 and a standard deviation of 15. Random samples of size n = 36 are drawn. (a) Describe the distribution. has a binomial distribution. has a normal distribution. has an approximately normal distribution. has a Poisson distribution. has an unknown distribution. has a geometric distribution. Compute the mean and standard deviation of the distribution. (For each answer, enter a number.) = mu sub x bar = = sigma sub x bar = (b) Find the z value corresponding to = 95. (Enter an exact number.) z = (c) Find P( < 95). (Enter a number. Round your answer to four decimal places.) P( < 95) = P(x bar < 95) (d) Would it be unusual for a random sample of size 36 from the x distribution to have a sample mean less than 95? Explain. No, it would not be unusual because more than 5% of all such samples have means less than 95. No, it would not be unusual because less than 5% of all such samples have means less than 95. Yes, it would be unusual because more than 5% of all such samples have means less than 95. Yes, it would be unusual because less than 5% of all such samples have means less than 95.
MATLAB: An Introduction with Applications
6th Edition
ISBN:9781119256830
Author:Amos Gilat
Publisher:Amos Gilat
Chapter1: Starting With Matlab
Section: Chapter Questions
Problem 1P
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Suppose x has a distribution with a
(a)
Describe the distribution. has a binomial distribution.
has a normal distribution .
has an approximately normal distribution.
has a Poisson distribution.
has an unknown distribution.
has a geometric distribution.
Compute the mean and standard deviation of the distribution. (For each answer, enter a number.)
= mu sub x bar =
= sigma sub x bar =
z =
P( < 95) = P(x bar < 95)
sample of size 36 from the x distribution to have a sample mean less than 95? Explain.
= mu sub x bar =
= sigma sub x bar =
(b)
Find the z value corresponding to = 95. (Enter an exact number.)z =
(c)
Find P( < 95). (Enter a number. Round your answer to four decimal places.)P( < 95) = P(x bar < 95)
(d)
Would it be unusual for a randomNo, it would not be unusual because more than 5% of all such samples have means less than 95.
No, it would not be unusual because less than 5% of all such samples have means less than 95.
Yes, it would be unusual because more than 5% of all such samples have means less than 95.
Yes, it would be unusual because less than 5% of all such samples have means less than 95.
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