Statistics Ch 13
Exhibit 13-4 In a completely randomized experimental design involving five treatments, 13 observations were recorded for each of the five treatments (a total of 65 observations). The following information is provided. SSTR = 200 (Sum Square Between Treatments) SST = 800 (Total Sum Square) Refer to Exhibit 13-4. The number of degrees of freedom corresponding to within treatments is
60
Exhibit 13-5 Part of an ANOVA table is shown below. Refer to Exhibit 13-5. The mean square between treatments (MSTR) is
60
In the ANOVA, treatment refers to
different levels of a factor
An experimental design that permits statistical conclusions about two or more factors is a
factorial design
Exhibit 13-5 Part of an ANOVA table is shown below. Refer to Exhibit 13-5. The mean square within treatments (MSE) is
20
Exhibit 13-5 Part of an ANOVA table is shown below. Refer to Exhibit 13-5. The test statistic is
3
An ANOVA procedure is used for data that was obtained from four sample groups each comprised of five observations. The degrees of freedom for the critical value of F are
3 and 16
The critical F value with 8 numerator and 29 denominator degrees of freedom at α = 0.01 is
3.20
In an analysis of variance problem if SST = 120 and SSTR = 80, then SSE is
40
In a completely randomized design involving three treatments, the following information is provided: The overall mean for all the treatments is
7.25
The F ratio in a completely randomized ANOVA is the ratio of
MSTR/MSE
Which of the following is not a required assumption for the analysis of variance?
Populations have equal means.
When an analysis of variance is performed on samples drawn from K populations, the mean square between treatments (MSTR) is
SSTR/(K - 1)
The variable of interest in an ANOVA procedure is called
a factor
The number of times each experimental condition is observed in a factorial design is known as
replication
In the analysis of variance procedure (ANOVA), "factor" refers to
the independent variable
Exhibit 13-1 SSTR = 6,750 H0: m1=m2=m3=m4 SSE = 8,000 Ha: at least one mean is different nT = 20 Refer to Exhibit 13-1. The mean square within treatments (MSE) equals
500
Exhibit 13-5 Part of an ANOVA table is shown below. Refer to Exhibit 13-5. If at 95% confidence, we want to determine whether or not the means of the populations are equal, the p-value is
between 0.05 to 0.1
An experimental design where the experimental units are randomly assigned to the treatments is known as
completely randomized design
Exhibit 13-4 In a completely randomized experimental design involving five treatments, 13 observations were recorded for each of the five treatments (a total of 65 observations). The following information is provided. SSTR = 200 (Sum Square Between Treatments) SST = 800 (Total Sum Square) Refer to Exhibit 13-4. The mean square within treatments (MSE) is
10
In an analysis of variance problem involving 3 treatments and 10 observations per treatment, SSE = 399.6. The MSE for this situation is
14.8
Exhibit 13-1 SSTR = 6,750 H0: m1=m2=m3=m4 SSE = 8,000 Ha: at least one mean is different nT = 20 Refer to Exhibit 13-1. The mean square between treatments (MSTR) equals
2,250
Exhibit 13-4 In a completely randomized experimental design involving five treatments, 13 observations were recorded for each of the five treatments (a total of 65 observations). The following information is provided. SSTR = 200 (Sum Square Between Treatments) SST = 800 (Total Sum Square) Refer to Exhibit 13-4. The number of degrees of freedom corresponding to between treatments is
4
Exhibit 13-1 SSTR = 6,750 H0: m1=m2=m3=m4 SSE = 8,000 Ha: at least one mean is different nT = 20 Refer to Exhibit 13-1. The test statistic to test the null hypothesis equals
4.5
Exhibit 13-4 In a completely randomized experimental design involving five treatments, 13 observations were recorded for each of the five treatments (a total of 65 observations). The following information is provided. SSTR = 200 (Sum Square Between Treatments) SST = 800 (Total Sum Square) Refer to Exhibit 13-4. The test statistic is
5.0
Exhibit 13-4 In a completely randomized experimental design involving five treatments, 13 observations were recorded for each of the five treatments (a total of 65 observations). The following information is provided. SSTR = 200 (Sum Square Between Treatments) SST = 800 (Total Sum Square) Refer to Exhibit 13-4. The mean square between treatments (MSTR) is
50.00
Exhibit 13-4 In a completely randomized experimental design involving five treatments, 13 observations were recorded for each of the five treatments (a total of 65 observations). The following information is provided. SSTR = 200 (Sum Square Between Treatments) SST = 800 (Total Sum Square Refer to Exhibit 13-4. The sum of squares within treatments (SSE) is
600
Exhibit 13-1 SSTR = 6,750 H0: m1=m2=m3=m4 SSE = 8,000 Ha: at least one mean is different nT = 20 Refer to Exhibit 13-1. The null hypothesis is to be tested at the 5% level of significance. The p-value is
between .01 and .025
Exhibit 13-1 SSTR = 6,750 H0: m1=m2=m3=m4 SSE = 8,000 Ha: at least one mean is different nT = 20 Refer to Exhibit 13-1. The null hypothesis
should be rejected
The ANOVA procedure is a statistical approach for determining whether or not
the means of two or more populations are equal
Exhibit 13-4 In a completely randomized experimental design involving five treatments, 13 observations were recorded for each of the five treatments (a total of 65 observations). The following information is provided. SSTR = 200 (Sum Square Between Treatments) SST = 800 (Total Sum Square) Refer to Exhibit 13-4. If at 95% confidence we want to determine whether or not the means of the five populations are equal, the p-value is
less than 0.01 Save
