![anova stata anova stata](https://3.bp.blogspot.com/-G11mcxM6KBA/WmB_SS1kCSI/AAAAAAAAADQ/jK5DxBiRxSk0bDnFcB-KP9QBt_n4iJnHACEwYBhgL/s1600/Assign%2BValue%2BLbels%2B-%2BState.png)
This is a descriptive statistic that neither requires normality nor homogeneity. However, we can still interpret eta squared (often written as η 2). We can not interpret or report the F-testĪs discussed, we can't rely on this p-value for the usual F-test. The combination of these last 2 points implies that However, Levene’s test is statistically significant because its p Next, our sample sizes are sharply unequal so we really need to meet the homogeneity of variances assumption.We may therefore need the normality assumption. Second, sample sizes for “North” and “East” are rather small.This is due to some missing values in both region and salary. First off, note that our Descriptive Statistics table is based on N = 171 respondents (bottom row).The very first thing we inspect are the sample sizes used for our ANOVA and Levene’s test as shown below. UNIANOVA salary BY region /METHOD=SSTYPE(3) /INTERCEPT=INCLUDE /PRINT ETASQ DESCRIPTIVE HOMOGENEITY /CRITERIA=ALPHA(.05) /DESIGN=region. *ANOVA with descriptive statistics, Levene's test and effect size: (partial) eta squared. The best way to do so is inspecting a histogram which we'll create by running the syntax below. Quick Data Checkīefore running our ANOVA, let's first see if the reported salaries are even plausible. This procedure tests if 2+ population variances are all likely to be equal. Last, homogeneity is only needed if sample sizes are sharply unequal. We'll inspect if our data meet this requirement in a minute. Second, normality is only needed for small sample sizes of, say, N < 25 per subgroup.
![anova stata anova stata](https://statistics.laerd.com/stata-tutorials/img/owa/output-one-way-anova-pairwise-comparisons.png)
With regard to our data, independent observations seem plausible: each record represents a distinct person and people didn't interact in any way that's likely to affect their answers. homogeneity: the variance of the dependent variable must be equal over all subpopulations.normality: the dependent variable must follow a normal distribution within each subpopulation.A likely analysis for this is an ANOVA but this requires a couple of assumptions. We'll try to support this claim by rejecting the null hypothesis that all regions have equal mean population salaries. Our data contain some details on a sample of N = 179 employees.
![anova stata anova stata](https://i.ytimg.com/vi/LY0GSHhzbzU/maxresdefault.jpg)
#Anova stata download
We encourage you to download these data and replicate our analyses.