Question: 3.16. Let V be a vector random variable with mean vector E(V) = #, and covariance matrix E(V - uv)(V - uv)' = E,. Show

3.16. Let V be a vector random variable with mean
3.16. Let V be a vector random variable with mean vector E(V) = #, and covariance matrix E(V - uv)(V - uv)' = E,. Show that E(VV' ) = Ev + Aviv

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