ThmDex – An index of mathematical definitions, results, and conjectures.

▼	Set of symbols
▼	Alphabet
▼	Deduction system
▼	Theory
▼	Zermelo-Fraenkel set theory
▼	Set
▼	Collection of sets
▼	Set union
▼	Successor set
▼	Inductive set
▼	Set of inductive sets
▼	Set of natural numbers
▼	Set of integers
▼	Set of rademacher integers
▼	Rademacher integer
▼	Rademacher random integer
▼	Standard rademacher random integer
▼	Standard gaussian random real number

Definition D210

Gaussian random real number

Formulation 0

Let $Z \in \text{Gaussian}(0, 1)$ be a D211: Standard gaussian random real number.
A D3161: Random real number $X \in \text{Random}(\mathbb{R})$ is a gaussian random real number with parameters $\mu \in \mathbb{R}$ and $\sigma \in [0, \infty)$ if and only if \begin{equation} X \overset{d}{=} \sigma Z + \mu \end{equation}

Children

▶	Folded gaussian random unsigned real number
▶	Log-gaussian random basic real number

Results

▶	Expectation of the absolute value of a centred gaussian random real number
▶	Finite sum of I.I.D. gaussian random real numbers is a gaussian random real number
▶	Finite sum of independent gaussian random real numbers is a gaussian random real number
▶	Finite sum of uncorrelated identically distributed gaussian random real numbers is a gaussian random real number
▶	Sample mean of I.I.D. gaussian random real numbers is a gaussian random real number
▶	Sample mean of independent gaussian random real numbers is a gaussian random real number
▶	Sample mean of uncorrelated identically distributed gaussian random real numbers is a gaussian random real number