Truncated normal distribution

	Probability density function Probability density function for the truncated normal distribution for different sets of parameters. In all cases, a = −10 and b = 10. For the black: μ = −8, σ = 2; blue: μ = 0, σ = 2; red: μ = 9, σ = 10; orange: μ = 0, σ = 10.
	Cumulative distribution function Cumulative distribution function for the truncated normal distribution for different sets of parameters. In all cases, a = −10 and b = 10. For the black: μ = −8, σ = 2; blue: μ = 0, σ = 2; red: μ = 9, σ = 10; orange: μ = 0, σ = 10.
Notation	;
Parameters	; (but see definition); — minimum value of ; — maximum value of ()
Support
PDF
CDF
Mean
Median
Mode
Variance
Entropy
MGF

In probability and statistics, the truncated normal distribution is the probability distribution derived from that of a normally distributed random variable by bounding the random variable from either below or above (or both). The truncated normal distribution has wide applications in statistics and econometrics.

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Probability density function Probability density function for the truncated normal distribution for different sets of parameters. In all cases, a = −10 and b = 10. For the black: μ = −8, σ = 2; blue: μ = 0, σ = 2; red: μ = 9, σ = 10; orange: μ = 0, σ = 10.
Cumulative distribution function Cumulative distribution function for the truncated normal distribution for different sets of parameters. In all cases, a = −10 and b = 10. For the black: μ = −8, σ = 2; blue: μ = 0, σ = 2; red: μ = 9, σ = 10; orange: μ = 0, σ = 10.
Notation	$\xi ={\frac {x-\mu }{\sigma }},\ \alpha ={\frac {a-\mu }{\sigma }},\ \beta ={\frac {b-\mu }{\sigma }}$ $Z=\Phi (\beta )-\Phi (\alpha )$
Parameters	$\mu \in \mathbb {R}$ $\sigma ^{2}\geq 0$ (but see definition) $a\in \mathbb {R}$ — minimum value of $x$ $b\in \mathbb {R}$ — maximum value of $x$ ( $b>a$ )
Support	$x\in [a,b]$
PDF	$f(x;\mu ,\sigma ,a,b)={\frac {\varphi (\xi )}{\sigma Z}}\,$
CDF	$F(x;\mu ,\sigma ,a,b)={\frac {\Phi (\xi )-\Phi (\alpha )}{Z}}$
Mean	$\mu +{\frac {\varphi (\alpha )-\varphi (\beta )}{Z}}\sigma$
Median	$\mu +\Phi ^{-1}\left({\frac {\Phi (\alpha )+\Phi (\beta )}{2}}\right)\sigma$
Mode	$\left\{{\begin{array}{ll}a,&\mathrm {if} \ \mu <a\\\mu ,&\mathrm {if} \ a\leq \mu \leq b\\b,&\mathrm {if} \ \mu >b\end{array}}\right.$
Variance	$\sigma ^{2}\left[1-{\frac {\beta \varphi (\beta )-\alpha \varphi (\alpha )}{Z}}-\left({\frac {\varphi (\alpha )-\varphi (\beta )}{Z}}\right)^{2}\right]$
Entropy	$\ln({\sqrt {2\pi e}}\sigma Z)+{\frac {\alpha \varphi (\alpha )-\beta \varphi (\beta )}{2Z}}$
MGF	$e^{\mu t+\sigma ^{2}t^{2}/2}\left[{\frac {\Phi (\beta -\sigma t)-\Phi (\alpha -\sigma t)}{\Phi (\beta )-\Phi (\alpha )}}\right]$