Concept explainers
Videos
Pain Medication
A researcher decides to see how effective a pain medication is. Eight randomly selected subjects were asked to determine the severity of their pain by using a scale of 1 to 10, with 1 being very minor and 10 being very severe. Then each was given the medication, and after 1 hour, they were asked to rate the severity of their pain, using the same scale.
1. What is the purpose of the study?
2. Are the samples independent or dependent?
3. What are the hypotheses?
4. What nonparametric test could be used to test the claim?
5. What significance level would you use?
6. What is your decision?
7. What parametric test could you use?
8. Would the results be the same?
1.
To explain: The purpose of the study.
Answer to Problem 1AC
The purpose of the study is to determine how effective the pain medication is.
Explanation of Solution
Justification:
The researcher had conducted a study for seeing the effectiveness of the pain medication and selected the subjects randomly and recorded on a scale of 1 to 10 about the severity of the pain. This implies that the purpose of the study is to know about the pain medication effectiveness.
Thus, the purpose of the study is to determine how effective the pain medication is.
2.
To explain: Whether the samples are independent or dependent.
Answer to Problem 1AC
The samples are dependent samples.
Explanation of Solution
Justification:
In this study the researcher has randomly selected 8 subjects to determine about the effectiveness of the pain medication. First the eight subjects are asked to give the scale about the pain and after one hour the same subjects are asked to give the scale based on the pain medication. This implies that the same subjects are treated twice for the study and the scale is recorded, and the samples are dependent samples.
Thus, the samples are dependent samples.
3.
To give: the hypotheses for the test.
Explanation of Solution
Justification:
The claim of the study is to determine the effectiveness of the pain medication. The hypotheses for the test are,
Null hypothesis:
Alternative hypothesis:
4.
What parametric test that can be used to test the claim.
Answer to Problem 1AC
The parametric test that can be used to test the claim is Wilcoxon signed rank test.
Explanation of Solution
Justification:
Wilcoxon sign rank test:
The Wilcoxon sign rank test is a non-parametric test that is used to compare ranks the population means of the paired samples or the matched samples. This implies that the Wilcoxon sign rank test is used to compare the matched pair groups that is, the same sample is measured two times. Wilcoxon signed-rank is used for testing two samples of the dependent groups come from the population having same distribution or not.
In this study the same subjects are treated before and after the medication and the samples are dependent samples.
Thus, the parametric test that can be used to test the claim is Wilcoxon signed rank test.
5.
What significance level that is used.
Answer to Problem 1AC
The significance level that can be used is 0.05.
Explanation of Solution
Justification:
In general when the confidence level is not mentioned the level that is used for any of the hypotheses testing is 95% and the level of significance is 0.05.
Thus, the significance level that can be used is 0.05.
6.
The decision of the study.
Answer to Problem 1AC
The Null hypothesis is rejected.
Explanation of Solution
Calculation:
Critical value:
The data represent the value for
From Table K, The Wilcoxon Signed-Rank Test, the critical value for
Hence, the critical value for is 6.
The sum of the signed ranks is obtained below:
| Before | After | Difference
|
Absolute value
|
Rank | Signed rank |
| 8 | 6 | 2 | 2 | 6 | 6 |
| 6 | 5 | 1 | 1 | 2.5 | 2.5 |
| 2 | 3 | –1 | 1 | 2.5 | –2.5 |
| 3 | 1 | 2 | 2 | 6 | 6 |
| 4 | 2 | 2 | 2 | 6 | 6 |
| 6 | 6 | 0 | 0 | – | – |
| 2 | 1 | 1 | 1 | 2.5 | 2.5 |
| 7 | 6 | –1 | 1 | 2.5 | –2.5 |
The sum of minus ranks is,
The sum of plus ranks is,
The test value is 5 which are taken as the smallest absolute values of the sums.
Thus, the test value is
Decision Rule:
If the test value is less than the critical value, then reject the null hypothesis
Conclusion:
It is clear that the critical value is 6 and the test value is 5.
Here, the test value is less than the critical value.
Therefore, by the rule, the null hypothesis
There is sufficient evidence to reject the claim that “the severity of the pain after medication is less than before the medication”.
7.
Which parametric test that can be used.
Answer to Problem 1AC
The parametric test that can be used is paired t test.
Explanation of Solution
In nonparametric tests the Wilcoxon signed rank test is used for testing two dependent samples. Likewise in parametric tests the paired t test is used to test the difference between two populations for dependent samples.
Thus, the parametric test that can be used is paired t test.
8.
Whether the results are same or not.
Answer to Problem 1AC
Yes, the results would be same.
Explanation of Solution
When the same data is used for testing for parametric paired t test the results would be same as obtained from nonparametric tests. But, the results obtained would be appropriate only if the assumptions for the parametric paired t test are satisfied.
Thus, the results would be the same.
Want to see more full solutions like this?
Chapter 13 Solutions
Elementary Statistics: A Step By Step Approach
Additional Math Textbook Solutions
APPLIED STAT.IN BUS.+ECONOMICS
Calculus: Early Transcendentals (2nd Edition)
Introductory Statistics
Elementary Statistics ( 3rd International Edition ) Isbn:9781260092561
Elementary Statistics: Picturing the World (7th Edition)
Graphical Approach To College Algebra
- Using the accompanying Home Market Value data and associated regression line, Market ValueMarket Valueequals=$28,416plus+$37.066×Square Feet, compute the errors associated with each observation using the formula e Subscript ieiequals=Upper Y Subscript iYiminus−ModifyingAbove Upper Y with caret Subscript iYi and construct a frequency distribution and histogram. Square Feet Market Value1813 911001916 1043001842 934001814 909001836 1020002030 1085001731 877001852 960001793 893001665 884001852 1009001619 967001690 876002370 1139002373 1131001666 875002122 1161001619 946001729 863001667 871001522 833001484 798001589 814001600 871001484 825001483 787001522 877001703 942001485 820001468 881001519 882001518 885001483 765001522 844001668 909001587 810001782 912001483 812001519 1007001522 872001684 966001581 86200arrow_forwarda. Find the value of A.b. Find pX(x) and py(y).c. Find pX|y(x|y) and py|X(y|x)d. Are x and y independent? Why or why not?arrow_forwardThe PDF of an amplitude X of a Gaussian signal x(t) is given by:arrow_forward
- The PDF of a random variable X is given by the equation in the picture.arrow_forwardFor a binary asymmetric channel with Py|X(0|1) = 0.1 and Py|X(1|0) = 0.2; PX(0) = 0.4 isthe probability of a bit of “0” being transmitted. X is the transmitted digit, and Y is the received digit.a. Find the values of Py(0) and Py(1).b. What is the probability that only 0s will be received for a sequence of 10 digits transmitted?c. What is the probability that 8 1s and 2 0s will be received for the same sequence of 10 digits?d. What is the probability that at least 5 0s will be received for the same sequence of 10 digits?arrow_forwardV2 360 Step down + I₁ = I2 10KVA 120V 10KVA 1₂ = 360-120 or 2nd Ratio's V₂ m 120 Ratio= 360 √2 H I2 I, + I2 120arrow_forward
- Q2. [20 points] An amplitude X of a Gaussian signal x(t) has a mean value of 2 and an RMS value of √(10), i.e. square root of 10. Determine the PDF of x(t).arrow_forwardIn a network with 12 links, one of the links has failed. The failed link is randomlylocated. An electrical engineer tests the links one by one until the failed link is found.a. What is the probability that the engineer will find the failed link in the first test?b. What is the probability that the engineer will find the failed link in five tests?Note: You should assume that for Part b, the five tests are done consecutively.arrow_forwardProblem 3. Pricing a multi-stock option the Margrabe formula The purpose of this problem is to price a swap option in a 2-stock model, similarly as what we did in the example in the lectures. We consider a two-dimensional Brownian motion given by W₁ = (W(¹), W(2)) on a probability space (Q, F,P). Two stock prices are modeled by the following equations: dX = dY₁ = X₁ (rdt+ rdt+0₁dW!) (²)), Y₁ (rdt+dW+0zdW!"), with Xo xo and Yo =yo. This corresponds to the multi-stock model studied in class, but with notation (X+, Y₁) instead of (S(1), S(2)). Given the model above, the measure P is already the risk-neutral measure (Both stocks have rate of return r). We write σ = 0₁+0%. We consider a swap option, which gives you the right, at time T, to exchange one share of X for one share of Y. That is, the option has payoff F=(Yr-XT). (a) We first assume that r = 0 (for questions (a)-(f)). Write an explicit expression for the process Xt. Reminder before proceeding to question (b): Girsanov's theorem…arrow_forward
- Problem 1. Multi-stock model We consider a 2-stock model similar to the one studied in class. Namely, we consider = S(1) S(2) = S(¹) exp (σ1B(1) + (M1 - 0/1 ) S(²) exp (02B(2) + (H₂- M2 where (B(¹) ) +20 and (B(2) ) +≥o are two Brownian motions, with t≥0 Cov (B(¹), B(2)) = p min{t, s}. " The purpose of this problem is to prove that there indeed exists a 2-dimensional Brownian motion (W+)+20 (W(1), W(2))+20 such that = S(1) S(2) = = S(¹) exp (011W(¹) + (μ₁ - 01/1) t) 롱) S(²) exp (021W (1) + 022W(2) + (112 - 03/01/12) t). where σ11, 21, 22 are constants to be determined (as functions of σ1, σ2, p). Hint: The constants will follow the formulas developed in the lectures. (a) To show existence of (Ŵ+), first write the expression for both W. (¹) and W (2) functions of (B(1), B(²)). as (b) Using the formulas obtained in (a), show that the process (WA) is actually a 2- dimensional standard Brownian motion (i.e. show that each component is normal, with mean 0, variance t, and that their…arrow_forwardThe scores of 8 students on the midterm exam and final exam were as follows. Student Midterm Final Anderson 98 89 Bailey 88 74 Cruz 87 97 DeSana 85 79 Erickson 85 94 Francis 83 71 Gray 74 98 Harris 70 91 Find the value of the (Spearman's) rank correlation coefficient test statistic that would be used to test the claim of no correlation between midterm score and final exam score. Round your answer to 3 places after the decimal point, if necessary. Test statistic: rs =arrow_forwardBusiness discussarrow_forward
Big Ideas Math A Bridge To Success Algebra 1: Stu...AlgebraISBN:9781680331141Author:HOUGHTON MIFFLIN HARCOURTPublisher:Houghton Mifflin Harcourt
Holt Mcdougal Larson Pre-algebra: Student Edition...AlgebraISBN:9780547587776Author:HOLT MCDOUGALPublisher:HOLT MCDOUGAL
Glencoe Algebra 1, Student Edition, 9780079039897...AlgebraISBN:9780079039897Author:CarterPublisher:McGraw Hill