Difference between revisions of "Manuals/calci/BETAINV"

Revision as of 15:50, 18 June 2018

BETAINV (Probability,Alpha,Beta,LowerBound,UpperBound,Accuracy,DivisionsAndDepthArray)

$Probability$ is the probability value associated with the beta distribution.
$Alpha$ & $Beta$ are the values of the shape parameter.
$LowerBound$ & $UpperBound$ the lower and upper limit to the interval of $x$ .
$Accuracy$ gives accurate value of the solution.
$DivisionsAndDepthArray$ is the value of the division.

Description

This function gives the inverse value of Cumulative Beta Probability Distribution.
It is called Inverted Beta Function or Beta Prime.
In $BETAINV(Probability,Alpha,Beta,LowerBound,UpperBound,Accuracy,DivisionsAndDepthArray)$ , $Probability$ is the probability value associated with Beta Distribution, $Alpha$ and $Beta$ are the values of two positive shape parameters and $LowerBound$ and $UpperBound$ are the lower and upper limit.
Normally the limit values are optional, i.e. when we are giving the values of $LowerBound$ & $UpperBound$ then the result value is from $a$ and $b$ .
When we are omitting the values $LowerBound$ and $UpperBound$ , by default it will consider $LowerBound=0$ and $UpperBound=1$ , so the result value is from $0$ and $1$ .
If $BETADIST(Number,Alpha,Beta,LowerBound,UpperBound)=Probability$ , then $BETAINV(Probability,Alpha,Beta,LowerBound,UpperBound,Accuracy,DivisionsAndDepthArray)=x$ .
$BETAINV$ use the iterating method to find the value of $x$ .suppose the iteration has not converged after 100 searches, then the function gives the error result.
This function will give the error result when

1.Any one of the arguments are non-numeric
2.Alpha or Beta  $\leq$  0 
3.Number<LowerBound ,Number>UpperBound or LowerBound = UpperBound
4.we are not mentioning the limit values  for LowerBound & UpperBound , 
  by default it will consider the Standard Cumulative Beta Distribution, LowerBound = 0 and UpperBound = 1

ZOS

The syntax is to calculate of this function in ZOS is .
- $probability$ is the probability value associated with the beta distribution.
- $Alpha$ and $Beta$ are the values of the shape parameter.
- For e.g.,BETAINV(0.30987,10,18,12,16)

Examples

BETAINV(0.2060381025,5,9,2,6) = 3
BETAINV(0.359492343,8,10) = 1.75
BETAINV(0.685470581,5,8,2,6) = 3.75
BETAINV(0.75267,1,7,7,9) = 7.25
BETAINV(0.5689,-2,4,3,5) = NAN, because $\alpha <0$ .

References

Beta Distribution

List of Main Z Functions

Z3 home

@@ Line 3: / Line 3: @@
 *<math>Alpha</math> & <math>Beta</math> are the values of  the shape parameter.
 *<math>LowerBound</math> & <math>UpperBound</math> the lower and upper limit to the interval of <math>x</math>.
+*<math>Accuracy</math> gives accurate value of the solution.
+*<math>DivisionsAndDepthArray</math> is the value of the division.
 ==Description==

Difference between revisions of "Manuals/calci/BETAINV"

Revision as of 15:50, 18 June 2018

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