Formulas
From Socr
(Difference between revisions)
John guojun (Talk | contribs) (→Probability Density Functions (PDFs)) |
|||
| Line 63: | Line 63: | ||
* [http://socr.ucla.edu/htmls/dist/Noncentral-Beta.html Noncentral-Beta]: <math> f(x; \beta, \gamma, \delta) = \sum_{i=0}^{\infty}\frac{\Gamma(i+\beta+\gamma)}{\Gamma(\gamma) \Gamma(i+\beta)} \frac{exp(-\delta/2)}{i!} (\delta/2)^i x^{i+\beta-1} (1-x)^{\gamma-1}. (0 \leq x \leq 1). \!</math> | * [http://socr.ucla.edu/htmls/dist/Noncentral-Beta.html Noncentral-Beta]: <math> f(x; \beta, \gamma, \delta) = \sum_{i=0}^{\infty}\frac{\Gamma(i+\beta+\gamma)}{\Gamma(\gamma) \Gamma(i+\beta)} \frac{exp(-\delta/2)}{i!} (\delta/2)^i x^{i+\beta-1} (1-x)^{\gamma-1}. (0 \leq x \leq 1). \!</math> | ||
* [http://en.wikipedia.org/wiki/Inverse_Gaussian_distribution Inverse Gausian]: <math> f(x)=\sqrt{\frac{\lambda}{2\pi x^3}}e^{-\frac{\lambda}{2\mu^2 x}(x-\mu)^2}. (x>0) \!</math> | * [http://en.wikipedia.org/wiki/Inverse_Gaussian_distribution Inverse Gausian]: <math> f(x)=\sqrt{\frac{\lambda}{2\pi x^3}}e^{-\frac{\lambda}{2\mu^2 x}(x-\mu)^2}. (x>0) \!</math> | ||
| + | * [http://socr.ucla.edu/htmls/dist/Noncentral_chi-square.html Noncentral_chi-square]: <math> f(x; \delta, n) = \sum_{k=0}^{\infty}\ | ||
| + | frac{exp(-\delta/2)(\delta/2)^k}{k!} \frac{exp(-x/2)x^{\frac{n+2k}{2}-1}}{2^\frac{n+2k}{2}\Gamma(\frac{n+2k}{2})}. (x>0). \!</math> | ||
==Transformations== | ==Transformations== | ||
Revision as of 20:08, 22 April 2010
Probability Density Functions (PDFs)
- Standard Normal PDF:
- General Normal PDF:
- Chi-Square PDF:
- Gamma PDF:
- Beta PDF:
- Student's T PDF:
- Poisson PDF:
- Chi PDF:
- Cauchy PDF:
![\frac{1}{\pi\gamma \left[1 + \left(\frac{x-x_0}{\gamma}\right)^2\right]}](/socr/uploads/math/a/9/2/a9260c6814d86ac3231f3934db752577.png)
- Exponential PDF:
- F Distribution PDF:
- Bernoulli PMF:
- Binomial PMF:
- Multinomial PMF:
, where 
, 
, and 
.
- Negative Binomial PMF:
- Negative-Multinomial Binomial PMF:
- Geometric PMF:
- Erlang PDF:
- Laplace PDF:
- Continuous Uniform PDF:
- Discrete Uniform PMF:
- Logarithmic PDF:
- Logistic PDF:
- Logistic-Exponential PDF:
- Power Function PDF:
- Benford's Law:
- Pareto PDF:
- Non-Central Student T PDF:
![f(t)=\frac{\nu^{\nu/2}e^{-\nu\mu^2/2(t^2+\nu)}} {\sqrt{\pi}\Gamma(\nu/2)2^{(\nu-1)/2}(t^2+\nu)^{(\nu+1)/2}} \times\int\limits_0^\infty x^\nu\exp\left[-\frac{1}{2}\left(x-\frac{\mu t}{\sqrt{t^2+\nu}}\right)^2\right]dx](/socr/uploads/math/e/3/7/e37a9ea8dea4ca3d0d7d55f76aaa430b.png)
- ArcSine PDF:
- Circle PDF:
![f(x)={2\sqrt{r^2 - x^2}\over \pi r^2 }, \forall x \in [-r , r]](/socr/uploads/math/4/5/a/45a7876ef35972bf28385be926c52b62.png)
- U-Quadratic PDF:
- Standard Uniform PDF:
- Zipf:
- Inverse Gamma:
- Fisher-Tippett:
where
- Gumbel:
- HyperGeometric:
- Log-Normal:
![\frac{1}{x\sigma\sqrt{2\pi}}\exp\left[-\frac{\left(\ln(x)-\mu\right)^2}{2\sigma^2}\right]](/socr/uploads/math/b/3/f/b3f2a95779f28c24a5a265ba6498ceec.png)
- Gilbrats:
![\frac{1}{\sigma\sqrt{2\pi}}\exp\left[-\frac{\left(\ln(x)\right)^2}{2\sigma^2}\right]](/socr/uploads/math/d/0/3/d03d955b51d917ba307deef3c7e277a0.png)
- Hyperbolic Secant:
- Gompertz:
![b e^{-bx} e^{-\eta e^{-bx}}\left[1 + \eta\left(1 - e^{-bx}\right)\right]](/socr/uploads/math/4/e/f/4efe11d1016f67a67761bf1697fb5a9b.png)
- Standard Cauchy:
- Rectangular:
- Beta-Binomial:
- Negative Hypergeometric:
- Standard Power:
- Power_Series:
- Zeta:
- Logarithm:
- Beta_Pascal:
- Gamma_Poisson:
- Pascal:
- Polya:
- Normal-Gamma:
- Discrete_Weibull:
- Log Gamma:
![f(x)=[1/ \alpha^\beta \Gamma(\beta)]e^{\beta x}e^{-e^x/a}. (-\infty<x<\infty) \!](/socr/uploads/math/7/c/4/7c4a06b45d1e495c5a95fa4c34eb7e01.png)
- Generalized Gamma:
- Noncentral-Beta:
- Inverse Gausian:
- Noncentral_chi-square: Failed to parse (lexing error): f(x; \delta, n) = \sum_{k=0}^{\infty}\ frac{exp(-\delta/2)(\delta/2)^k}{k!} \frac{exp(-x/2)x^{\frac{n+2k}{2}-1}}{2^\frac{n+2k}{2}\Gamma(\frac{n+2k}{2})}. (x>0). \!
Transformations
- Standard Normal to General Normal Transformation:
- General Normal to Standard Normal Transformation:
- Standard Normal to Chi Transformation:
- Standard Normal to Chi-Square Transformation:
- Gamma to General Normal Transformation:
- Gamma to Exponential Transformation: The special case of
is equivalent to exponential Exp(λ).
- Gamma to Beta Transformation:
.
- Student's T to Standard Normal Transformation:
- Student's T to Cauchy Transformation:
- Cauchy to General Cauchy Transformation:
- General Cauchy to Cauchy Transformation:
- Fisher's F to Student's T:
- Student's T to Fisher's F: X2
- Bernoulli to Binomial Transformation:
(iid)
- Binomial to Bernoulli Transformation:
- Binomial to General Normal Transformation:
- Binomial to Poisson Transformation:
- Multinomial to Binomial Transformation:
- Negative Binomial to Geometric Transformation:
- Erlang to Exponential Transformation:
- Erlang to Chi-Square Transformation:
- Laplace to Exponential Transformation:
- Exponential to Laplace Transformation:
- Beta to Arcsine Transformation:
- Noncentral Student's T to Normal Transformation:
- Noncentral Student's T to Student's T Transformation:
- Standard Uniform to Pareto Transformation:
- Standard Uniform to Benford Transformation:
- Standard Uniform to Exponential Transformation:
- Standard Uniform to Log Logistic Transformation:
- Standard Uniform to Standard Triangular Transformation: X1 − X2
- Standard Uniform to Logistic Exponential Transformation:
![\frac{log[1+(\frac{X}{1-X})^{1/K}]}{\lambda}](/socr/uploads/math/b/b/1/bb14e96da3be11b8bee63fcfbb54fefa.png)
- Standard Uniform to Beta Transformation: If X has a standard uniform distribution,
has a beta distribution
- Beta to Standard Uniform Transformation: β = γ = 1
- Continuous Uniform to Standard Uniform Transformation:
- Pareto to Exponential:
- Logistic Exponential to Exponential:
- Zipf to Discrete Uniform:
- Discrete Uniform to Rectangular:
- Poisson to Normal:
- Binomial to Poisson:
- Gamma to Inverted Gamma:
- Fisher-Tippett to Gumbel:
- Hypergeometric to Binomial:
- Log-Normal to Normal:
- Normal to Log-Normal:
- Log-Normal to Gibrat's:
- Cauchy to Standard Cauchy:
- Standard Cauchy to Cauchy:
- Standard Cauchy to Hyperbolic Secant:
- Beta to Standard Power:
- SOCR Home page: http://www.socr.ucla.edu
Translate this page:
