In: Statistics and Probability
One-way ANOVA is a procedure for comparing the means of several populations. It is the generalization of what procedure for comparing the means of two populations? A. nonpooled t-procedure B. pooled t-procedure C. paired t-test D. None of the above In One-way ANOVA, identify the statistics (SSTR, MSTR, SSE, MSE or F) used (a) as a measure of variation among the sample means (b) as a measure of variation within the samples (c) to compare the variation among the sample means to the variation within the samples
Answer:-
Given that:-
One-way ANOVA is a procedure for comparing the means of several populations. It is the generalization of what procedure for comparing the means of two populations? A. nonpooled t-procedure B. pooled t-procedure C. paired t-test D. None of the above n One-way ANOVA, identify the statistics (SSTR, MSTR, SSE, MSE or F) used (a) as a measure of variation among the sample means (b) as a measure of variation within the samples (c) to compare the variation among the sample means to the variation within the samples
1) One way ANOVA is procedure for comparing the means of the several populations. It is the generalization of what procedure for comparing the means of two populations
B) pooled t procedure
Variance value is same in one way ANOVA,
as one way ANOVA is a generalization of this pooled t test, t test compares only two means at a time and one way anova compares more than two means.
2) as a measure of variation among the sample means MSTR value
3) as a measure of variation within the sample MSE value
4) to compare variation among the sample means to the variation within the sample F value