Consider a random sample from a Weibull distribution, Xi~WEI(1,2). Find approximate values a and b such...

5. You have a random sample of 1,627 for the random variable Xi. The sample mean...

5. You have a random sample of 1,627 for the random variable Xi. The sample mean is 26.2 and the sample standard deviation is 39.1. Define µ as the population mean for Xi. Assume that µ = 20. (LO4) a. Sketch the distribution of X ̅. b. Graphically illustrate the p-value associated with X̅= 26.2.

5-1. Consider a random sample of size 36 from a normal distribution (population) with a mean...

5-1. Consider a random sample of size 36 from a normal distribution (population) with a mean of 10 and a standard deviation of 6. Which of the following statement is false? (a) The mean of X¯ is 10. (b) The standard deviation of X¯ is 1. (c) X¯ approximately follows a normal distribution. (d) There is an incorrect statement in the alternatives above. 5-2. Let X1, . . . , X36 be a random sample from Bin(36, 0.5). Which of...

Develop an algorithm for generation a random sample of size N from a binomial random variable...

Develop an algorithm for generation a random sample of size N from a binomial random variable X with the parameter n, p. [Hint: X can be represented as the number of successes in n independent Bernoulli trials. Each success having probability p, and X = Si=1nXi , where Pr(Xi = 1) = p, and Pr(Xi = 0) = 1 – p.] (a) Generate a sample of size 32 from X ~ Binomial (n = 7, p = 0.2) (b) Compute...

Suppose that we have a random sample X1, ** , Xn drawn from a distribution that...

Suppose that we have a random sample X1, ** , Xn drawn from a distribution that only takes positive values. Suppose that the sample size n is sufficiently large. Consider the new random variable ∏ n i=1 Xi . Derive the distribution of this new random variable and explain your reasoning mathematically

Suppose that we have a random sample X1, · · , Xn drawn from a distribution...

Suppose that we have a random sample X1, · · , Xn drawn from a distribution that only takes positive values. Suppose that the sample size n is sufficiently large. Consider the new random variable ∏ n i=1 Xi . Derive the distribution of this new random variable and explain your reasoning mathematically

Consider a multivariate random sample X1, . . . , Xnwhich comes from p-dimensional multivariate distribution...

Consider a multivariate random sample X1, . . . , Xnwhich comes from p-dimensional multivariate distribution N(µ, Σ), with mean vector µ ∈ R p and the variance-covariance positive definite matrix Σ. Find the distribution and its parameters for the matrix nXTHX where H is the idempotent centering matrix H = In −1/n (1n ⊗ 1n ) and 1n is the n-dimensional vector of all 1’s.

A random sample of n=75 is taken from a population of values to test the statistical...

A random sample of n=75 is taken from a population of values to test the statistical hypotheses H0:μ=99HA:μ≠99 The mean, median, and standard deviation of this sample were found to be: X¯¯¯¯=100.01X˜=101.12S=8.61 (a) Find the value of the test statistic, using at least three decimals in your answer. Note: Minitab may only give you two digits, if that is the case then calculate by hand. test statistic = (b) The P-value was found to be 0.3129398, or 31.29398%. Select the...

A random sample of 25 values is drawn from a mound_shaped symmetric distribution. The sample mean...

A random sample of 25 values is drawn from a mound_shaped symmetric distribution. The sample mean is 10 and the sample standard deviation is 2. Use α = 0.05 to test the claim that the population mean is different from 9.5. A) Check the requirements. B) Set up the hypothesis.    C) Compute the test statistic. D) Find the p-value. E) Do we reject or do not reject Ho?

approximate p{23<x<31} wherr X us the mean of a random sample of size 36 with a...

approximate p{23<x<31} wherr X us the mean of a random sample of size 36 with a distribution with mesn u=35 and varience o^2= 16

Suppose that the random sample is taken from a normal distribution N(8,9), and the random sample...

Suppose that the random sample is taken from a normal distribution N(8,9), and the random sample is between 1 to 25. Find the distribution of the sample mean. Find probability that the sample mean is less than or equal to 8.8 and the sample variance is less than or equal to 12.45, where the probabilities are independent. Find probability that the sample mean is less than 8+(.5829)S, where S is the sample standard deviation.