Title: Error Function Distribution -- from Wolfram MathWorld
Open Graph Title: Error Function Distribution -- from Wolfram MathWorld
X Title: Error Function Distribution -- from Wolfram MathWorld
Description: A normal distribution with mean 0, P(x)=h/(sqrt(pi))e^(-h^2x^2). (1) The characteristic function is phi(t)=e^(-t^2/(4h^2)). (2) The mean, variance, skewness, and kurtosis excess are mu = 0 (3) sigma^2 = 1/(2h^2) (4) gamma_1 = 0 (5) gamma_2 = 0. (6) The cumulants are kappa_1 = 0 (7) kappa_2 = 1/(2h^2) (8) kappa_n = 0 (9) for n>=3.
Open Graph Description: A normal distribution with mean 0, P(x)=h/(sqrt(pi))e^(-h^2x^2). (1) The characteristic function is phi(t)=e^(-t^2/(4h^2)). (2) The mean, variance, skewness, and kurtosis excess are mu = 0 (3) sigma^2 = 1/(2h^2) (4) gamma_1 = 0 (5) gamma_2 = 0. (6) The cumulants are kappa_1 = 0 (7) kappa_2 = 1/(2h^2) (8) kappa_n = 0 (9) for n>=3.
X Description: A normal distribution with mean 0, P(x)=h/(sqrt(pi))e^(-h^2x^2). (1) The characteristic function is phi(t)=e^(-t^2/(4h^2)). (2) The mean, variance, skewness, and kurtosis excess are mu = 0 (3) sigma^2 = 1/(2h^2) (4) gamma_1 = 0 (5) gamma_2 = 0. (6) The cumulants are kappa_1 = 0 (7) kappa_2 = 1/(2h^2) (8) kappa_n = 0 (9) for n>=3.
Opengraph URL: https://mathworld.wolfram.com/ErrorFunctionDistribution.html
Domain: mathworld.wolfram.com
| DC.Title | Error Function Distribution |
| DC.Creator | Weisstein, Eric W. |
| DC.Description | A normal distribution with mean 0, P(x)=h/(sqrt(pi))e^(-h^2x^2). (1) The characteristic function is phi(t)=e^(-t^2/(4h^2)). (2) The mean, variance, skewness, and kurtosis excess are mu = 0 (3) sigma^2 = 1/(2h^2) (4) gamma_1 = 0 (5) gamma_2 = 0. (6) The cumulants are kappa_1 = 0 (7) kappa_2 = 1/(2h^2) (8) kappa_n = 0 (9) for n>=3. |
| DC.Subject | 62E |
| DC.Rights | Copyright 1999-2026 Wolfram Research, Inc. See https://mathworld.wolfram.com/about/terms.html for a full terms of use statement. |
| DC.Format | text/html |
| DC.Identifier | https://mathworld.wolfram.com/ErrorFunctionDistribution.html |
| DC.Language | en |
| DC.Publisher | Wolfram Research, Inc. |
| DC.Relation.IsPartOf | https://mathworld.wolfram.com/ |
| DC.Type | Text |
| og:image | https://mathworld.wolfram.com/images/socialmedia/share/ogimage_ErrorFunctionDistribution.png |
| og:type | website |
| twitter:card | summary_large_image |
| twitter:image:src | https://mathworld.wolfram.com/images/socialmedia/share/ogimage_ErrorFunctionDistribution.png |
| None | ie=edge |
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