Difference between revisions of "Manuals/calci/CHIINV"

Latest revision as of 03:22, 25 August 2020

CHIINV (probability,degrees_freedom,Accuracy,DivisionDepthArray)

Where $probability$ is the value associated with the Chi-squared Distribution
$degreesfreedom$ is the number of Degrees of Freedom.
is the correct decimal places of the result.
- CHIINV(), returns the inverse of the one-tailed probability of the chi-squared distribution.

Description

This function gives the inverse value of One_tailed probability of the Chi-squared Distribution.
It is called Inverted-Chi-square Distribution and it is a Continuous Probability Distribution of a positive-valued random variable.

Degrees of freedom $df$ = $(r-1)(c-1)$ .
The $\chi ^{2}$ static used to compare the observed value in each table to the value which would be the expected under the assumption.
If $X$ has the chi-squared distribution with n degrees of freedom, then according to the definition, ${\frac {1}{X}}$ has the Inverse-chi-squared distribution with $n$ degrees of freedom;
If $CHIDIST(Number,DegreeOfFreedom)=probability$ , then $CHIINV(probability,degreesfreedom,Accuracy,DivisionDepthArray)=Number$ .
CHIINV 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.degrees freedom value is not an integer
3.degrees freedom < 1  or degrees freedom> $10^{10}$ 
4.Also  probability < 0  or probability>1.

ZOS

The syntax is to calculate CHIINV in ZOS is .
- Where $probability$ is the value associated with the Chi-squared Distribution
- $degreesfreedom$ is the number of Degrees of Freedom
For e.g.,CHIINV(0.0257,3)

Inverse Chi-Squared Distribution

Examples

CHIINV(0.0001234098,2) = 18
CHIINV(0.2547876,5) = 6.5669999999999655
CHIINV(0.157299207050,1) = 1.9991000000000005
CHIINV(0.6785412,-1) = #N/A (DEGREESOFFREEDOM < 1)

References

Inverse-chi-squared Distribution

List of Main Z Functions

Z3 home

@@ Line 1: / Line 1: @@
-<div style="font-size:30px">'''CHIINV(prob,df)'''</div><br/>
+<div style="font-size:30px">'''CHIINV (probability,degrees_freedom,Accuracy,DivisionDepthArray)'''</div><br/>
-*Where 'prob' is the probability value associated with the chisquared distribution and 'df' is the number of degrees of freedom
+*Where <math>probability</math> is the  value associated with the Chi-squared Distribution
+*<math>degrees freedom</math> is the number of Degrees of Freedom.
+*<math>Accuracy</math> is the correct decimal places of the result.
+**CHIINV(), returns the inverse of the one-tailed probability of the chi-squared distribution.
 ==Description==
-*This function gives the inverse value of one_tailed probability of the chi-squared distribution.
+*This function gives the inverse value of One_tailed probability of the Chi-squared Distribution.
-*It is called inverted-chi-square distributionand it is  a continuous probability distribution of a positive-valued random variable.
+*It is called Inverted-Chi-square Distribution and it is  a Continuous Probability Distribution of a positive-valued random variable.
-*In CHIINV(prob,df) where prob is the probability value associated with the chisquared distribution and df is the degrees of freedom.
-*Degrees of freedom=(r-1)(c-1).
+*Degrees of freedom <math>df</math>=<math>(r-1)(c-1)</math>.
-*The X^2 static used to compare the observed value in each table to the value which would be the expected  under the assumption.
+*The <math>\chi^2</math> static used to compare the observed value in each table to the value which would be the expected  under the assumption.
-*If X has the chi-squared distribution with \nu degrees of freedom, then according to the first definition, 1/X has the inverse-chi-squared distribution with \nu degrees of freedom;If CHIDIST(x,df)=prob, then CHIINV(prob,df)=x.
+*If <math>X</math> has the chi-squared distribution with n degrees of freedom, then according to the definition, <math>\frac{1}{X}</math> has the Inverse-chi-squared distribution with <math>n</math> degrees of freedom;
-*CHIINV using 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.
+*If <math>CHIDIST (Number,DegreeOfFreedom)=probability</math>, then <math>CHIINV (probability,degrees freedom,Accuracy,DivisionDepthArray)= Number</math>.
+*CHIINV use the iterating method to find the value of <math>x</math>.suppose the iteration has not converged after 100 searches, then the function gives the error result.
 *This function will give the error result when
-#Any one of the arguments are nonnumeric
+.Any one of the arguments are non-numeric
-#df value is not an integer
+.degrees freedom value is not an integer
-#The df <1or df>10^10
+.degrees freedom < 1  or degrees freedom><math>10^{10}</math>
-#Also prob<0 or prob>1.
+.Also  probability < 0  or probability>1.
+==ZOS==
+*The syntax is to calculate CHIINV in ZOS is <math>CHIINV (probability,degrees_freedom,Accuracy,DivisionDepthArray)</math>.
+**Where <math>probability</math> is the  value associated with the Chi-squared Distribution
+**<math>degrees freedom</math> is the number of Degrees of Freedom
+*For e.g.,CHIINV(0.0257,3)
+{{#ev:youtube|sfB2dLFPu1U|280|center|Inverse Chi-Squared Distribution}}
 ==Examples==
-#CHIINV(0.0001234098,2)=18
+#CHIINV(0.0001234098,2) = 18
-#CHIINV(0.2547876,5)=6.56699
+#CHIINV(0.2547876,5) = 6.5669999999999655
-#CHIINV(0.157299207050,1)=2
+#CHIINV(0.157299207050,1) = 1.9991000000000005
-#CHIINV(0.6785412,-1)=NAN
+#CHIINV(0.6785412,-1) = #N/A (DEGREESOFFREEDOM < 1)
+==Related Videos==
+{{#ev:youtube|UPawNLQOv-8|280|center|Chi-Square Test}}
 ==See Also==
 *[[Manuals/calci/CHIDIST  | CHIDIST ]]
@@ Line 27: / Line 43: @@
 ==References==
-[http://en.wikipedia.org/wiki/Bessel_function| Bessel Function]
+[http://en.wikipedia.org/wiki/Inverse-chi-squared_distribution| Inverse-chi-squared Distribution]
+*[[Z_API_Functions | List of Main Z Functions]]
+*[[ Z3 |   Z3 home ]]

Difference between revisions of "Manuals/calci/CHIINV"

Latest revision as of 03:22, 25 August 2020

Contents

Description

ZOS

Examples

Related Videos

See Also

References

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