Difference between revisions of "Manuals/calci/NEGBINOMDIST"

Latest revision as of 15:58, 8 August 2018

NEGBINOMDIST(x,r,p)

$x$ is the number of failures.
$r$ is the number of successes on an individual trial
is the probability of a success.
- NEGBINOMDIST(), returns the negative binomial distribution.

Description

This function gives the Negative Binomial Distribution.
Negative Binomial Distribution is the discrete probability distribution with the fixed probability of success.
It is also called Pascal Distribution.

This is the statistical experiment with the following conditions:

This experiment consists of a sequence of independent trials.
Each trial represents only two results(Success or failure)
The probability of success is constant from trial to trial
The trials are independent; ie, the outcome on one trial does not affect the outcome on other trials.
The experiment continues until  $r$  the successes is obtained, where  $r$  is a specified positive integer.

The random variable $x$ = the number of failures that precede the $r^{th}$ success;
$x$ is called a Negative Binomial Random variable because, in contrast to the

binomial random variable, the number of successes is fixed and the number of trials is random.

Then probability mass function of the negative binomial distribution is

nb(x;r,p)=(x+r-1p^{r}(1-p)^{x}r-1)

For example: If a fair coin is tossed repeatedly, what is the probability that at least 10 tosses are required.

to obtain heads 8 times

This function will give the result as error when:

Any argument is non-numeric
If $ps<0$ or $ps>1$
If $nf<0$ or $ns<1$

ZOS

The syntax is to calculate NEGBINOMDIST in ZOS is .
- where $x$ is the number of failures.
- $r$ is the number of successes on an individual trial
- $p$ is the probability of a success.
For e.g.,NEGBINOMDIST(8..9,5..7,0.5).

Negative Binomial Distribution

Examples

Find the probability that a man flipping a coin gets the fourth head on the ninth flip.

Here total number of events =9, r= 4(since we define Heads as a success) and x=9-4=5(number of failures)

p=1/2=0.5(Probability of success for any coin flip)

NEGBINOMDIST(5,4,0.5)=0.109375

A company conducts a geological study that indicates that an exploratory goods well should have a 20% chance of striking goods. What is the probability that the first strike comes on the third well drilled?

Here total number of events=3, r=1,x=3-1=2,and p=0.20 NEGBINOMDIST(2,1,0.20)=0.128

What is the probability that the fourth strike comes on the eighth well drilled?

Here total number of events=8, r=4, x=8-4=4 and p=0.20 NEGBINOMDIST(4,4,0.20)=0.0229376

References

Logarithm

List of Main Z Functions

Z3 home

@@ Line 1: / Line 1: @@
-<div style="font-size:30px">'''NEGBINOMDIST(nf,ns,ps)'''</div><br/>
+<div style="font-size:30px">'''NEGBINOMDIST(x,r,p)'''</div><br/>
-*<math>nf</math> is the number of failures.
+*<math>x</math> is the number of failures.
-*<math>ns</math> is the number of successes on an individual trial
+*<math>r</math> is the number of successes on an individual trial
-*<math>ps</math> is the probability of a success.
+*<math>p</math> is the probability of a success.
+**NEGBINOMDIST(), returns the negative binomial distribution.
 ==Description==
 *This function gives the Negative Binomial Distribution.
 *Negative Binomial Distribution is the discrete probability distribution with the fixed probability of success.
-*It is also called Pascal distribution.
+*It is also called Pascal Distribution.
 This is the statistical experiment with the following conditions:
   This experiment consists of a sequence of independent trials.
@@ Line 12: / Line 14: @@
   The probability of success is constant from trial to trial
   The trials are independent; ie, the outcome on one trial does not affect the outcome on other trials.
-  The experiment continues until <math>r</math> successes are observed, where <math>r</math> is a specified positive integer.
+  The experiment continues until <math>r</math> the successes is obtained, where <math>r</math> is a specified positive integer.
-*The random variable of  <math>x</math> = the number of failures that precede the <math>r^th</math> success;
+*The random variable <math>x</math> = the number of failures that precede the <math>r^{th}</math> success;
 *<math>x</math> is called a Negative Binomial Random variable because, in contrast to the
 binomial random variable, the number of successes is fixed and the number of trials is random.
-*Then  probability mass function of the negative binomial distribution is:
+*Then probability mass function of the negative binomial distribution is
-nb(x;r,p)=(x+r-1 p^r (1-p)^x   r-1)
+:<math>nb(x;r,p)=(x+r-1 p^r (1-p)^x r-1)</math>
 *For example: If a fair coin is tossed repeatedly, what is the probability that at least 10 tosses are required.
 to obtain heads 8 times
 *This function will give the result as error when:
-#Any argument is nonnumeric
+#Any argument is non-numeric
-#If ps<0 or ps>1
+#If <math>ps<0</math> or <math>ps>1</math>
-#If nf<0 or ns<1
+#If <math>nf<0</math> or <math>ns<1</math>
+==ZOS==
+*The syntax is to calculate NEGBINOMDIST in ZOS is <math>NEGBINOMDIST(x,r,p)</math>.
+**where <math>x</math> is the number of failures.
+**<math>r</math> is the number of successes on an individual trial
+**<math>p</math> is the probability of a success.
+*For e.g.,NEGBINOMDIST(8..9,5..7,0.5).
+{{#ev:youtube|GCR9HjTgLk4|280|center|Negative Binomial Distribution}}
 ==Examples==
@@ Line 36: / Line 46: @@
 Here total number of events=8, r=4, x=8-4=4 and p=0.20
 NEGBINOMDIST(4,4,0.20)=0.0229376
+==Related Videos==
+{{#ev:youtube|BPlmjp2ymxw|280|center|Negative Binomial Distribution}}
 ==See Also==
@@ Line 44: / Line 58: @@
 ==References==
-[http://en.wikipedia.org/wiki/Logarithm| Logarithm]
+[http://en.wikipedia.org/wiki/Logarithm   Logarithm]
+*[[Z_API_Functions | List of Main Z Functions]]
+*[[ Z3 |   Z3 home ]]

Difference between revisions of "Manuals/calci/NEGBINOMDIST"

Latest revision as of 15:58, 8 August 2018

Contents

Description

ZOS

Examples

Related Videos

See Also

References

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