Difference between revisions of "Manuals/calci/GAMMADIST"

Latest revision as of 16:08, 7 August 2018

GAMMADIST(x,alpha,beta,cumulative,accuracy)

$x$ is the value of the distribution.
$alpha$ and $beta$ are the value of the parameters.
$cumulative$ is the logical value like true or false.
gives accurate value of the solution.
- GAMMADIST(), returns the gamma distribution.

This function gives the value of the Gamma Distribution.
The Gamma Distribution can be used in a queuing models like, the amount of rainfall accumulated in a reservoir.
This distribution is the Continuous Probability Distribution with two parameters $\alpha$ and $\beta$ .
In $GAMMADIST(x,alpha,beta,cumulative,accuracy)$ , $x$ is the value of the distribution, $\alpha$ is called shape parameter and $\beta$ is the rate parameter of the distribution and $cumulative$ is the logical value like TRUE or FALSE.
If $cumulative$ is TRUE, then this function gives the Cumulative Distribution value and if is FALSE then it gives the Probability Density Function.
$cumulative$ gives accurate value of the solution.
The gamma function is defined by :

$Gamma(t)=\int \limits _{0}^{\infty }x^{t-1}e^{-x}dx$ .

It is for all complex numbers except the negative integers and zero.
The Probability Density Function of Gamma function using Shape, rate parameters is:

$f(x;\alpha ,\beta )={\frac {x^{\alpha -1}e^{-{\frac {x}{\beta }}}}{\beta ^{\alpha }\Gamma (\alpha )}}$ , for

x,\alpha ,\beta >0

, where

e

is the natural number(e = 2.71828...),

\alpha

is the number of occurrences of an event, and

\Gamma (\alpha )

is the Gamma function.

$f(x,\alpha )={\frac {x^{\alpha -1}e^{-x}}{\Gamma (\alpha )}}$ .

$F(x;\alpha ,\beta )={\frac {\gamma (\alpha ,{\frac {x}{\beta }})}{\Gamma (\alpha )}}$ , or

F(x;\alpha ,\beta )=e^{-{\frac {x}{\beta }}}\sum _{i=k}^{\infty }{\frac {1}{i!}}({\frac {x}{\beta }})^{i}

for any positive integer

k

.

When alpha is a positive integer, then the distribution is called Erlang distribution.
If the shape parameter $\alpha$ is held fixed, the resulting one-parameter family of distributions is a natural exponential family.
For a positive integer $n$ , when $\alpha ={\frac {n}{2}}$ , $\beta =2$ , and $cu=TRUE$ , GAMMADIST returns (1 - CHIDIST(x)) with $n$ degrees of freedom.
This function shows the result as error when

1.Any one of the argument is non numeric
2. $x<0$ ,  $\alpha \leq 0$  or  $\beta \leq 0$ .

The syntax is to calculate GAMMADIST in ZOS is .
- $x$ is the value of the distribution,
- $alpha$ and $beta$ are the value of the parameters
- $cumulative$ is the logical value like true or false.
- $accuracy$ gives accurate value of the solution.
For e.g.,GAMMADIST(10.45,2.8,6.4,TRUE,0.9)

GAMMADIST(10.45,2.8,6.4,FALSE,0.9)

Gamma Distribution

GAMMADIST(8.15372,5,7,TRUE)=0.006867292
GAMMADIST(20.78542,2,6,TRUE)=0.860283293
GAMMADIST(20.78542,2,6,FALSE)=0.01806997
GAMMADIST(45.6523,9,4,FALSE)=0.019724471
GAMMADIST(8.15372,5,7,TRUE,0.5)= 0.00693316259
GAMMADIST(8.15372,5,7,TRUE,0.9)=0.0067648564

@@ Line 4: / Line 4: @@
 *<math>cumulative</math> is the logical value like true or false.
 *<math>accuracy</math> gives accurate value of the solution.
+**GAMMADIST(), returns the gamma distribution.
 ==Description==
@@ Line 62: / Line 63: @@
-[[Z_API_Functions | List of Main Z Functions]]
+*[[Z_API_Functions | List of Main Z Functions]]
-[[ Z3 |   Z3 home ]]
+*[[ Z3 |   Z3 home ]]