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The sample covariance matrix has in the denominator rather than due to a variant of Bessel's correction: In short, the sample covariance relies on the difference between each observation and the sample mean, but the sample mean is slightly correlated with each observation since it is defined in terms of all observations.
It is fairly readily shown that the maximum-likelihood estimate of the mean vector μ is the "sample mean" vector: ¯ = + +. See the section on estimation in the article on the normal distribution for details; the process here is similar.
That is, for any constant vector , the random variable = has a univariate normal distribution, where a univariate normal distribution with zero variance is a point mass on its mean. There is a k-vector and a symmetric, positive semidefinite matrix , such that the characteristic function of is () = ().
Firstly, if the true population mean is unknown, then the sample variance (which uses the sample mean in place of the true mean) is a biased estimator: it underestimates the variance by a factor of (n − 1) / n; correcting this factor, resulting in the sum of squared deviations about the sample mean divided by n-1 instead of n, is called ...
Throughout this article, boldfaced unsubscripted and are used to refer to random vectors, and Roman subscripted and are used to refer to scalar random variables.. If the entries in the column vector = (,, …,) are random variables, each with finite variance and expected value, then the covariance matrix is the matrix whose (,) entry is the covariance [1]: 177 ...
1 Examples. Toggle Examples subsection ... This shows that the sample mean and sample variance are independent. ... is a standard multivariate normal random vector ...
The input into the normalized Gaussian function is the mean of sample means (~50) and the mean sample standard deviation divided by the square root of the sample size (~28.87/ √ n), which is called the standard deviation of the mean (since it refers to the spread of sample means).
The weighted mean in this case is: ¯ = ¯ (=), (where the order of the matrix–vector product is not commutative), in terms of the covariance of the weighted mean: ¯ = (=), For example, consider the weighted mean of the point [1 0] with high variance in the second component and [0 1] with high variance in the first component.