Learning Materials
Features
Discover
Chapter 13: Q.13.34 (page 542)
Following are the notations for the three sums of squares. State the name of each sum of squares and the source of variation each sum of squares represents.
a. SSE
b. SSTR
c. SST
The notations for the three sums of squares:
a)..
b)..
c)..
Over 30 million students worldwide already upgrade their learning with Vaia!
All the tools & learning materials you need for study success - in one app.
Get started for free
Movie fans use the annual Leonard Maltin Movie Guide for facts, cast members, and reviews of more than films. The movies are rated from stars , indicating a very good movie, to 1 star , which Leonard Maltin refers to as a BOMB. The following table gives the running times, in minutes, of a random sample of films listed in one year's guide.
At the significance level, do the data provide sufficient evidence to conclude that a difference exists in mean running times among films in the four rating groups? (Note:,,
Minke Whales. Entanglement of marine mammals in fishing gear is a global issue and a significant threat to minke whales, in particular. In the article "Fishing gears involved in Entanglements of Minke Whales (Balaenoptera acutorostrata) in the East Sea of Korea" (Marine Mammal Science, Vol. , No. , Pp, ), K Song et al, studied the body lengths of minke whales entangled near Korea. The following table provides summary statistics for the body lengths of minke whales entangled at different ocean depths. Both variables, body length and ocean depth are in meters.
At the significance level, do the data provide sufficient evidence to conclude that a difference exists in mean body length among minke whales entangled at the four different depths? Note: For the degrees of freedom in this exercise:
Suppose that you want to compare the means of three populations by using one-way ANOVA. If the sample sizes are , , and , determine the degrees of freedom for the appropriate F-curve.
In Exercise \(13.42-13.47\) we provide data from independent simple random samples from several populations. In each case,
a. compute SST, SSTR and SSE by using the computing formulas given in Formula \(13.1\) on page \(535\).
b. compare your results in part (a) for SSTR and SSE with those you obtained in Exercises \(13.24-13.29\) where you employed the defining formulas.
c. construct a one-way ANOVA table.
d. decide at the \(5%\) significance level, whether the data provide sufficient evidence to conclude that the means of the populations from which the samples were drawn are not all the same.
Refer to Exercise 13.74. Suppose that you have obtained a confidence interval for each of the two differences, and . Can you be confident of both results simultaneously, that is, that both differences are contained in their corresponding confidence intervals? Explain your answer.
What do you think about this solution?
We value your feedback to improve our textbook solutions.
Explanations 
Textbooks 
Exams 
GCSE 
IGCSE 
AS 
A Level 
International A Level 
University Admissions Tests 
Flashcards 
Vaia AI 
Notes 
Study Plans 
Study Sets 
Find a job 
Find a degree 
Student Deals 
Magazine 
Mobile App