$20.99
Add to Cart
HW-1896 Statistics Problems
More than 10 available, 2 sold
Details
Shipping: Australia: free (more destinations)
Condition: Used
The following information applies to the questions displayed below.]
A sample of 36 observations is selected from a normal population. The sample mean is 12, and the population standard deviation is 3. Conduct the following test of hypothesis using the 0.01 significance level.
H0: μ ≤ 10
H1: μ > 10
a. Is this a one- or two-tailed test?
Two-tailed test
One-tailed test
b. What is the decision rule?
Reject H0 when z ≤ 2.326
Reject H0 when z > 2.326
c. What is the value of the test statistic?
Value of the test statistic:
d. What is your decision regarding H0?
Fail to reject H0
Reject H0
e. What is the p-value?
p-value:
Question-2
Given the following hypotheses:
H0 : μ = 400
H1 : μ ≠ 400
A random sample of 12 observations is selected from a normal population. The sample mean was 407 and the sample standard deviation 6. Using the .01 significance level:
a. State the decision rule.
Reject H0 when the test statistic is
b. Compute the value of the test statistic.
c. What is your decision regarding the null hypothesis?
Reject
Do not reject
Question-3
The management of White Industries is considering a new method of assembling its golf cart. The present method requires 42.3 minutes, on the average, to assemble a cart. The mean assembly time for a random sample of 24 carts, using the new method, was 40.6 minutes, and the standard deviation of the sample was 2.7 minutes. Using the .10 level of significance, can we conclude that the assembly time using the new method is faster?
a. What is the decision rule?
b. Compute the value of the test statistic.
c. What is your decision regarding H0?
Question-4
Given the following hypotheses:
H0 : μ = 100
H1 : μ ≠ 100
A random sample of six resulted in the following values: 118, 105, 112, 119, 105, and 111. Assume a normal population.
a. Using the .05 significance level, determine the decision rule?
Reject H0 : μ = 100 when the test statistic is
b. Compute the value of the test statistic.
Value of the test statistic
c-1. What is your decision regarding the H0?
Reject
Do not reject
c-2. Can we conclude the mean is different from 100?
No
Yes
d. Estimate the p-value.
The p-value is :
Question-5
A sample of 65 observations is selected from one population with a population standard deviation of 0.75. The sample mean is 2.67. A sample of 50 observations is selected from a second population with a population standard deviation of 0.66. The sample mean is 2.59. Conduct the following test of hypothesis using the .08 significance level.
H0 : μ1 ≤ μ2
H1 : μ1 > μ2
a. This a
-tailed test.
b. State the decision rule.
The decision rule is to reject H0 if z is
.
c. Compute the value of the test statistic.
Value of the test statistic
d. What is your decision regarding H0?
H0.
e. What is the p-value?
Question-6
A random sample of 15 observations from the first population revealed a sample mean of 350 and a sample standard deviation of 12. A random sample of 17 observations from the second population revealed a sample mean of 342 and a sample standard deviation of 15.
At the .10 significance level, is there a difference in the population means?
a. This is a
-tailed test.
b. The decision rule is to reject if or .
C. The test statistic is t =
d. What is your decision regarding H0?
e. The p-value is
.
Question-7
The null and alternate hypotheses are:
H0: μ1 ≤ μ2
H1: μ1 > μ2
A random sample of 20 items from the first population showed a mean of 100 and a standard deviation of 15. A sample of 16 items for the second population showed a mean of 94 and a standard deviation of 8. Use the .05 significant level.
a. Find the degrees of freedom for unequal variance test.
b. State the decision rule for .05 significance level.
c. Compute the value of the test statistic.
d. What is your decision regarding the null hypothesis? Use the .05 significance level.
.
Question-8
The following are six observations collected from treatment 1, four observations collected from treatment 2, and five observations collected from treatment 3. Test the hypothesis at the 0.05 significance level that the treatment means are equal.
a. State the null and the alternate hypothesis.
H1 : Treatment means all the same.
b. What is the decision rule
Reject Ho if F >
c. Compute SST, SSE, and SS total.
d. Complete the ANOVA table.
e. State your decision regarding the null hypothesis.
Decision:
Question-9
A stock analyst wants to determine whether there is a difference in the mean rate of return for three types of stock: utility, retail, and banking stocks. The following output is obtained:
a. Using the .05 level of significance, is there a difference in the mean rate of return among the three types of stock?
b. Can the analyst conclude there is a difference between the mean rates of return for utility and retail stocks? For utility and banking stocks? For banking and retail stocks? Explain.
Question- 10
There are three hospitals in the Tulsa, Oklahoma, area. The following data show the number of outpatient surgeries performed on Monday, Tuesday, Wednesday, Thursday, and Friday at each hospital last week. At the 0.05 significance level, can we conclude there is a difference in the mean number of surgeries performed by hospital or by day of the week?
Number of Surgeries Performed
Day St. Luke's St. Vincent Mercy
Monday 14 18 24
Tuesday 20 24 14
Wednesday 16 22 14
Thursday 18 20 22
Friday 20 28 24
1. Set up the null hypothesis and the alternative hypothesis.
For Treatment:
Null hypothesis
H0: µSt. Luke's = µSt. Vincent = µMercy
H0: µSt. Luke's ≠ µSt. Vincent ≠ µMercy
2. Alternative hypothesis
H1: Not all means are equal.
H1: All means are equal.
3. For blocks:
Null hypothesis
H0: µMon = µTue = µWed = µThu = µFri
H0: µMon ≠ µTue ≠ µWed ≠ µThu ≠ µFri
4. Alternative hypothesis
H1: All means are equal.
H1: Not all means are equal.
5. State the decision rule for .05 significance level.
For Treatment:
Reject H0 if F>
For blocks:
Reject H0 if F>
6. Complete the ANOVA table.
7. What is your decision regarding the null hypothesis?
The decision for the F value (Treatment) at 0.05 significance is:
Reject H0
Do not Reject H0
8. The decision for the F value (Block) at 0.05 significance is:
Reject H0
Do not Reject H0
9. Can we conclude there is a difference in the mean number of surgeries performed by hospital or by day of the week?
Question-11
Mr. James McWhinney, president of Daniel-James Financial Services, believes there is a relationship between the number of client contacts and the dollar amount of sales. To document this assertion, Mr. McWhinney gathered the following sample information. The X column indicates the number of client contacts last month, and the Y column shows the value of sales ($ thousands) last month for each client sampled.
a. Determine the regression equation.
b. Determine the estimated sales if 40 contacts are made
Answer-12
We are studying mutual bond funds for the purpose of investing in several funds. For this particular study, we want to focus on the assets of a fund and its five-year performance. The question is: Can the five-year rate of return be estimated based on the assets of the fund? Nine mutual funds were selected at random, and their assets and rates of return are shown below.
b-1. Compute the coefficient of correlation.
r =
b-2. Compute the coefficient of determination.
r2 =
C. Give a description of the degree of association between the variables.
There is association between the variables.
d. Determine the regression equation. Use assets as the independent variable.
b =
a =
e. For a fund with $400.0 million in sales, determine the five-year rate of return (in percent).
Question - 13
On the first statistics exam, the coefficient of determination between the hours studied and the grade earned was 80%. The standard error of estimate was 10. There were 20 students in the class. Develop an ANOVA table for the regression analysis of hours studied as a predictor of the grade earned on the first statistics exam.
Answer will be sent by email as attachment.
A sample of 36 observations is selected from a normal population. The sample mean is 12, and the population standard deviation is 3. Conduct the following test of hypothesis using the 0.01 significance level.
H0: μ ≤ 10
H1: μ > 10
a. Is this a one- or two-tailed test?
Two-tailed test
One-tailed test
b. What is the decision rule?
Reject H0 when z ≤ 2.326
Reject H0 when z > 2.326
c. What is the value of the test statistic?
Value of the test statistic:
d. What is your decision regarding H0?
Fail to reject H0
Reject H0
e. What is the p-value?
p-value:
Question-2
Given the following hypotheses:
H0 : μ = 400
H1 : μ ≠ 400
A random sample of 12 observations is selected from a normal population. The sample mean was 407 and the sample standard deviation 6. Using the .01 significance level:
a. State the decision rule.
Reject H0 when the test statistic is
b. Compute the value of the test statistic.
c. What is your decision regarding the null hypothesis?
Reject
Do not reject
Question-3
The management of White Industries is considering a new method of assembling its golf cart. The present method requires 42.3 minutes, on the average, to assemble a cart. The mean assembly time for a random sample of 24 carts, using the new method, was 40.6 minutes, and the standard deviation of the sample was 2.7 minutes. Using the .10 level of significance, can we conclude that the assembly time using the new method is faster?
a. What is the decision rule?
b. Compute the value of the test statistic.
c. What is your decision regarding H0?
Question-4
Given the following hypotheses:
H0 : μ = 100
H1 : μ ≠ 100
A random sample of six resulted in the following values: 118, 105, 112, 119, 105, and 111. Assume a normal population.
a. Using the .05 significance level, determine the decision rule?
Reject H0 : μ = 100 when the test statistic is
b. Compute the value of the test statistic.
Value of the test statistic
c-1. What is your decision regarding the H0?
Reject
Do not reject
c-2. Can we conclude the mean is different from 100?
No
Yes
d. Estimate the p-value.
The p-value is :
Question-5
A sample of 65 observations is selected from one population with a population standard deviation of 0.75. The sample mean is 2.67. A sample of 50 observations is selected from a second population with a population standard deviation of 0.66. The sample mean is 2.59. Conduct the following test of hypothesis using the .08 significance level.
H0 : μ1 ≤ μ2
H1 : μ1 > μ2
a. This a
-tailed test.
b. State the decision rule.
The decision rule is to reject H0 if z is
.
c. Compute the value of the test statistic.
Value of the test statistic
d. What is your decision regarding H0?
H0.
e. What is the p-value?
Question-6
A random sample of 15 observations from the first population revealed a sample mean of 350 and a sample standard deviation of 12. A random sample of 17 observations from the second population revealed a sample mean of 342 and a sample standard deviation of 15.
At the .10 significance level, is there a difference in the population means?
a. This is a
-tailed test.
b. The decision rule is to reject if or .
C. The test statistic is t =
d. What is your decision regarding H0?
e. The p-value is
.
Question-7
The null and alternate hypotheses are:
H0: μ1 ≤ μ2
H1: μ1 > μ2
A random sample of 20 items from the first population showed a mean of 100 and a standard deviation of 15. A sample of 16 items for the second population showed a mean of 94 and a standard deviation of 8. Use the .05 significant level.
a. Find the degrees of freedom for unequal variance test.
b. State the decision rule for .05 significance level.
c. Compute the value of the test statistic.
d. What is your decision regarding the null hypothesis? Use the .05 significance level.
.
Question-8
The following are six observations collected from treatment 1, four observations collected from treatment 2, and five observations collected from treatment 3. Test the hypothesis at the 0.05 significance level that the treatment means are equal.
a. State the null and the alternate hypothesis.
H1 : Treatment means all the same.
b. What is the decision rule
Reject Ho if F >
c. Compute SST, SSE, and SS total.
d. Complete the ANOVA table.
e. State your decision regarding the null hypothesis.
Decision:
Question-9
A stock analyst wants to determine whether there is a difference in the mean rate of return for three types of stock: utility, retail, and banking stocks. The following output is obtained:
a. Using the .05 level of significance, is there a difference in the mean rate of return among the three types of stock?
b. Can the analyst conclude there is a difference between the mean rates of return for utility and retail stocks? For utility and banking stocks? For banking and retail stocks? Explain.
Question- 10
There are three hospitals in the Tulsa, Oklahoma, area. The following data show the number of outpatient surgeries performed on Monday, Tuesday, Wednesday, Thursday, and Friday at each hospital last week. At the 0.05 significance level, can we conclude there is a difference in the mean number of surgeries performed by hospital or by day of the week?
Number of Surgeries Performed
Day St. Luke's St. Vincent Mercy
Monday 14 18 24
Tuesday 20 24 14
Wednesday 16 22 14
Thursday 18 20 22
Friday 20 28 24
1. Set up the null hypothesis and the alternative hypothesis.
For Treatment:
Null hypothesis
H0: µSt. Luke's = µSt. Vincent = µMercy
H0: µSt. Luke's ≠ µSt. Vincent ≠ µMercy
2. Alternative hypothesis
H1: Not all means are equal.
H1: All means are equal.
3. For blocks:
Null hypothesis
H0: µMon = µTue = µWed = µThu = µFri
H0: µMon ≠ µTue ≠ µWed ≠ µThu ≠ µFri
4. Alternative hypothesis
H1: All means are equal.
H1: Not all means are equal.
5. State the decision rule for .05 significance level.
For Treatment:
Reject H0 if F>
For blocks:
Reject H0 if F>
6. Complete the ANOVA table.
7. What is your decision regarding the null hypothesis?
The decision for the F value (Treatment) at 0.05 significance is:
Reject H0
Do not Reject H0
8. The decision for the F value (Block) at 0.05 significance is:
Reject H0
Do not Reject H0
9. Can we conclude there is a difference in the mean number of surgeries performed by hospital or by day of the week?
Question-11
Mr. James McWhinney, president of Daniel-James Financial Services, believes there is a relationship between the number of client contacts and the dollar amount of sales. To document this assertion, Mr. McWhinney gathered the following sample information. The X column indicates the number of client contacts last month, and the Y column shows the value of sales ($ thousands) last month for each client sampled.
a. Determine the regression equation.
b. Determine the estimated sales if 40 contacts are made
Answer-12
We are studying mutual bond funds for the purpose of investing in several funds. For this particular study, we want to focus on the assets of a fund and its five-year performance. The question is: Can the five-year rate of return be estimated based on the assets of the fund? Nine mutual funds were selected at random, and their assets and rates of return are shown below.
b-1. Compute the coefficient of correlation.
r =
b-2. Compute the coefficient of determination.
r2 =
C. Give a description of the degree of association between the variables.
There is association between the variables.
d. Determine the regression equation. Use assets as the independent variable.
b =
a =
e. For a fund with $400.0 million in sales, determine the five-year rate of return (in percent).
Question - 13
On the first statistics exam, the coefficient of determination between the hours studied and the grade earned was 80%. The standard error of estimate was 10. There were 20 students in the class. Develop an ANOVA table for the regression analysis of hours studied as a predictor of the grade earned on the first statistics exam.
Answer will be sent by email as attachment.
