Difference between revisions of "Manuals/calci/LOGNORMDIST"

Latest revision as of 10:22, 2 June 2020

LOGNORMDIST(Number,Mean,StandardDeviation,Accuracy)

$Number$ is the value.
$Mean$ is the mean value of $log(x)$ ,
$StandardDeviation$ is the standard deviation value of $log(x)$ .
is correct decimal places for the result.
- LOGNORMDIST(), returns the cumulative lognormal distribution.

Description

This function gives the value of the cumulative log normal distribution.
This distribution is the continuous probability distribution.
Lognomal distribution is also called Galton's distribution.
A random variable which is log-normally distributed takes only positive real values.
Suppose $x$ is Normally Distributed function, then $y=ln(x)$ also Normally Distributed
$z=exp(y)$ also Normally Distributed.
Let the Normal Distribution function $x$ and its Mean= $\mu$ , Standard Deviation = $\sigma$
Then the lognormal cumulative distribution is calculated by:

$F(x,\mu ,\sigma )={\frac {1}{2}}\left[1+erf\left({\frac {ln(x)-\mu )}{\sigma {\sqrt {2}}}}\right)\right]=\varphi \left[{\frac {ln(x)-\mu }{\sigma }}\right]$ where $erf$ is the error function,. The error function (also called the Gauss error function) is a special function of sigmoid shape which occurs in probability, statistics and partial differential equations.

And $\phi$ is the Cumulative Distribution function of the Standard Normal distribution.
This function will give the result as error when

1. Any one of the argument is non-numeric.
2. Suppose  $Number\leq 0$  or  $StandardDeviation\leq 0$

ZOS

The syntax is to calculate cumulative log normal distribution in ZOS is .
- $Number$ is the value.
- $Mean$ is the mean value of $log(x)$ .
- $StandardDeviation$ is the standard deviation value of $log(x)$ .
For e.g.,LOGNORMDIST(10,8.002,4.501)

Log Normal Distribution

Examples

=LOGNORMDIST(2,5.4,2.76) = 0.044061652
=LOGNORMDIST(10,24.05,12.95) = 0.046543186
=LOGNORMDIST(50,87.0036,42.9784) = 0.026597569
=LOGNORMDIST(-10,5,2) = #N/A (NUMBER GREATER THAN (OR) NOT EQUAL TO 0)

References

Log-normal distribution

List of Main Z Functions

Z3 home

@@ Line 1: / Line 1: @@
-<div style="font-size:30px">'''LOGNORMDIST((x,m,sd)'''</div><br/>
+<div style="font-size:30px">'''LOGNORMDIST(Number,Mean,StandardDeviation,Accuracy)'''</div><br/>
-*<math>x</math> is the value ,<math> m </math> is the mean of <math>log(x)</math>,
+*<math>Number</math> is the value.
-*And <math> sd</math> is the standard deviation of <math>log(x)</math>.
+*<math>Mean </math> is the mean value of <math>log(x)</math>,
+*<math>StandardDeviation</math> is the standard deviation value of <math>log(x)</math>.
+*<math>Accuracy</math> is correct decimal places for the result.
+** LOGNORMDIST(), returns the cumulative lognormal distribution.
 ==Description==
 *This function gives the value of the cumulative log normal distribution.
 *This  distribution is the continuous probability distribution.
 *Lognomal distribution is also called Galton's distribution.
 *A random variable which is log-normally distributed takes only positive real values.
-*Suppose <math>x</math> is normally distributed function ,then <math> y=ln(x)</math> also normally distributed
+*Suppose <math>x</math> is Normally Distributed function, then <math> y=ln(x)</math> also Normally Distributed
-* <math> z=exp(y)</math> also normally distributed.
+*<math> z=exp(y)</math> also Normally Distributed.
-*Let the normal distribution function <math>x </math> and its mean= <math>μ</math>, standard deviation = <math>σ</math>
+*Let the Normal Distribution function <math>x</math> and its Mean= <math>\mu</math>, Standard Deviation = <math>\sigma</math>
-*Then the  lognormal cumulative distribution is calculated by:<math> F(x,μ,σ)=1/2[1+(erf(ln(x)-μ)/σsqrt(2)= φ[(ln(x)-μ)/σ]</math> where erf is the  error function( the error function (also called the Gauss error function) is a special function  of sigmoid shape which occurs in probability, statistics and partial differential equations)
+*Then the  lognormal cumulative distribution is calculated by:
-*And φ is the cumulative distribution function of the standard normal distribution.
+<math>F(x,\mu,\sigma)=\frac{1}{2} \left[1+ erf \left (\frac{ln(x)-\mu)}{\sigma \sqrt{2}}\right)\right ]= \varphi\left[\frac{ln(x)-\mu}{\sigma}\right ]</math>
+where <math>erf</math> is the  error function,. The error function (also called the Gauss error function) is a special function  of sigmoid shape which occurs in probability, statistics and partial differential equations.
+*And <math>\phi</math> is the Cumulative Distribution function of the Standard Normal distribution.
 *This function will give the result as error when
-*1. Any one of the argument is nonnumeric.
+. Any one of the argument is non-numeric.
-*2.suppose <math> x \le 0 </math> or <math> sd \le 0</math>
+. Suppose <math> Number \le 0 </math> or <math> StandardDeviation \le 0</math>
+==ZOS==
+*The syntax is to calculate cumulative log normal distribution in ZOS is <math>LOGNORMDIST(Number,Mean,StandardDeviation,Accuracy)</math>.
+**<math>Number</math> is the value.
+**<math>Mean </math> is the mean value of <math>log(x)</math>.
+**<math> StandardDeviation</math> is the standard deviation value of <math>log(x)</math>.
+*For e.g.,LOGNORMDIST(10,8.002,4.501)
+{{#ev:youtube|rFnzI4pLSuo|280|center|Log Normal Distribution}}
 ==Examples==
-#LOGNORMDIST(2,5.4,2.76)=0.044061652
+#=LOGNORMDIST(2,5.4,2.76) = 0.044061652
-#LOGNORMDIST(10,24.05,12.95)=0.046543186
+#=LOGNORMDIST(10,24.05,12.95) = 0.046543186
-#LOGNORMDIST(50,87.0036,42.9784)=0.026597569
+#=LOGNORMDIST(50,87.0036,42.9784) = 0.026597569
-#LOGNORMDIST(-10,5,2)=NAN
+#=LOGNORMDIST(-10,5,2) = #N/A (NUMBER GREATER THAN (OR) NOT EQUAL TO 0)
+==Related Videos==
+{{#ev:youtube|9rMpraPPQ2A|280|center|Lognormal Distribution}}
 ==See Also==
@@ Line 28: / Line 45: @@
 *[[Manuals/calci/EXP  | EXP ]]
+==References==
+[http://en.wikipedia.org/wiki/Log-normal_distribution Log-normal distribution]
+*[[Z_API_Functions | List of Main Z Functions]]
-*[[Manuals/calci/SKEW  | SKEW ]]
+*[[ Z3 |   Z3 home ]]
-*[[Manuals/calci/STDEV  | STDEV ]]
-*[[Manuals/calci/STDEVP  | STDEVP ]]

Difference between revisions of "Manuals/calci/LOGNORMDIST"

Latest revision as of 10:22, 2 June 2020

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