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Another generalization of variance for vector-valued random variables , which results in a scalar value rather than in a matrix, is the generalized variance (), the determinant of the covariance matrix. The generalized variance can be shown to be related to the multidimensional scatter of points around their mean.
ANOVA is based on the law of total variance, where the observed variance in a particular variable is partitioned into components attributable to different sources of variation. In its simplest form, ANOVA provides a statistical test of whether two or more population means are equal, and therefore generalizes the t -test beyond two means.
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In statistics, one-way analysis of variance (or one-way ANOVA) is a technique to compare whether two or more samples' means are significantly different (using the F distribution). This analysis of variance technique requires a numeric response variable "Y" and a single explanatory variable "X", hence "one-way".
Variance (the square of the standard deviation) – location-invariant but not linear in scale. Variance-to-mean ratio – mostly used for count data when the term coefficient of dispersion is used and when this ratio is dimensionless, as count data are themselves dimensionless, not otherwise. Some measures of dispersion have specialized purposes.
Interpreting Mauchly's test is fairly straightforward. When the probability of Mauchly's test statistic is greater than or equal to α {\displaystyle \alpha } (i.e., p > α {\displaystyle \alpha } , with α {\displaystyle \alpha } commonly being set to .05), we fail to reject the null hypothesis that the variances are equal.
It tests the null hypothesis that the population variances are equal (called homogeneity of variance or homoscedasticity). If the resulting p -value of Levene's test is less than some significance level (typically 0.05), the obtained differences in sample variances are unlikely to have occurred based on random sampling from a population with ...
Often, variation is quantified as variance; then, the more specific term explained variance can be used. The complementary part of the total variation is called unexplained or residual variation ; likewise, when discussing variance as such, this is referred to as unexplained or residual variance .