Set A: n = 5; x = 7 Set B: n = 50; x = 7...

The following set of data is from a sample of n equals 7. 6 7 7...

The following set of data is from a sample of n equals 7. 6 7 7 10 12 13 15   a. Compute the​ mean, median, and mode. b. Compute the​ range, variance, standard​ deviation, and coefficient of variation. c. Compute the Z scores. Are there any​ outliers? d. Describe the shape of the data set.

From a set of n = 30 numbers, you find the sample mean is x =...

From a set of n = 30 numbers, you find the sample mean is x = 15.5 and the sample variance is s^2 = 3.1. Suppose you now make an additional measurement and get x = 15.5 (new data). Calculate the new sample variance.

Suppose data set X has mean μ = 400 and standard deviation σ = 50. If...

Suppose data set X has mean μ = 400 and standard deviation σ = 50. If a random sample of size 100 is collected and ̄x is the sample mean, compute P(395 ≤ x ̄ ≤ 410).

he following set of data is from a sample of n equals =6. 7 4 2...

he following set of data is from a sample of n equals =6. 7 4 2 7 1 13 a. Compute the​ mean, median, and mode. b. Compute the​ range, variance, standard​ deviation, and coefficient of variation. c. Compute the Z scores. Are there any​ outliers? d. Describe the shape of the data set.

The following is a set of data from a sample of n equals 5 n=5. 10,2,1,6,3   ...

The following is a set of data from a sample of n equals 5 n=5. 10,2,1,6,3    a. Compute the​ mean, median, and mode. b. Compute the​ range, variance, standard​ deviation, and coefficient of variation. c. Compute the Z scores. Are there any​ outliers? d. Describe the shape of the data set.

4. Let set U = { 1, 2, 3, 4, 5, 6, 7, 8, 9, 10,...

4. Let set U = { 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15, 16, 17, 18, 19, 20} set A = numbers in U that divide into 12 with no remainder, set B = numbers in U that divide into 16 with no remainder, and set C = the numbers in U that divide into 20 with no remainder. a. Made a Venn diagram showing the elements of the sets U, A,...

2. Suppose you have a data set of 7 numbers. If the constant 5 is added...

2. Suppose you have a data set of 7 numbers. If the constant 5 is added to each value in the set, what happens to the mean? What happens to the standard deviation? 3. There is a chowder eating contest in a small New England town. The distribution of the amount of chowder consumed is bell-shaped with mean 32 ounces and variance 64 ounces. If two hundred people participated in the contest, find the following. a. The number of people...

The following set of data is from a sample of n equals 7n=7. 13 4 1...

The following set of data is from a sample of n equals 7n=7. 13 4 1 10 3 4 713    4    1    10    3    4    7      a. Compute the​ mean, median, and mode. b. Compute the​ range, variance, standard​ deviation, and coefficient of variation. c. Compute the Z scores. Are there any​ outliers? d. Describe the shape of the data set. I am having a hard time getting the variance.

Define a set M recursively as follows. B. 3 and 7 are in M R. If...

Define a set M recursively as follows. B. 3 and 7 are in M R. If x and y are in M, so is x+y. (it is possible that x = y) Prove for every natural number n greater than or equal to 12, n is an element of M

A data set lists earthquake depths. The summary statistics are n=500​, x =5.77 ​km, s=4.75 km....

A data set lists earthquake depths. The summary statistics are n=500​, x =5.77 ​km, s=4.75 km. Use a 0.01 significance level to test the claim of a seismologist that these earthquakes are from a population with a mean equal to 5.00. Assume that a simple random sample has been selected. Identify the null and alternative​ hypotheses, test​ statistic, P-value, and state the final conclusion that addresses the original claim. a. Determine the test statistic. b. Determine the P-value 2. A...