Difference between revisions of "Manuals/calci/NEGBINOMDIST"
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| − | <div style="font-size:30px">'''NEGBINOMDIST( | + | <div style="font-size:30px">'''NEGBINOMDIST(x,r,p)'''</div><br/> |
| − | * | + | *<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. |
| + | **NEGBINOMDIST(), returns the negative binomial distribution. | ||
| + | |||
==Description== | ==Description== | ||
| − | This function gives the | + | *This function gives the Negative Binomial Distribution. |
| − | Negative | + | *Negative Binomial Distribution is the discrete probability distribution with the fixed probability of success. |
| − | It is also called Pascal | + | *It is also called Pascal Distribution. |
This is the statistical experiment with the following conditions: | 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 <math>r</math> the successes is obtained, where <math>r</math> is a specified positive integer. | |
| − | *The random variable | + | *The random variable <math>x</math> = the number of failures that precede the <math>r^{th}</math> success; |
| − | *x is called a | + | *<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. | binomial random variable, the number of successes is fixed and the number of trials is random. | ||
| − | *Then | + | *Then probability mass function of the negative binomial distribution is |
| − | nb(x;r,p)=(x+r-1 p^r (1-p)^x | + | :<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. | + | *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 | to obtain heads 8 times | ||
*This function will give the result as error when: | *This function will give the result as error when: | ||
| − | #Any argument is | + | #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== | ==Examples== | ||
| Line 36: | Line 46: | ||
Here total number of events=8, r=4, x=8-4=4 and p=0.20 | Here total number of events=8, r=4, x=8-4=4 and p=0.20 | ||
NEGBINOMDIST(4,4,0.20)=0.0229376 | NEGBINOMDIST(4,4,0.20)=0.0229376 | ||
| + | |||
| + | ==Related Videos== | ||
| + | |||
| + | {{#ev:youtube|BPlmjp2ymxw|280|center|Negative Binomial Distribution}} | ||
==See Also== | ==See Also== | ||
| Line 44: | Line 58: | ||
==References== | ==References== | ||
| − | [http://en.wikipedia.org/wiki/Logarithm| | + | [http://en.wikipedia.org/wiki/Logarithm Logarithm] |
| + | |||
| + | |||
| + | |||
| + | *[[Z_API_Functions | List of Main Z Functions]] | ||
| + | |||
| + | *[[ Z3 | Z3 home ]] | ||
Latest revision as of 14:58, 8 August 2018
NEGBINOMDIST(x,r,p)
- is the number of failures.
- is the number of successes on an individual trial
- is the probability of a success.
- NEGBINOMDIST(), returns the negative binomial distribution.
is the number of failures.
is the number of successes on an individual trial
is the probability of a success.
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 the successes is obtained, where is a specified positive integer.
- The random variable = the number of failures that precede the success;
- is called a Negative Binomial Random variable because, in contrast to the
success;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
- 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 or
- If or
or 
or 
ZOS
- The syntax is to calculate NEGBINOMDIST in ZOS is .
- where is the number of failures.
- is the number of successes on an individual trial
- is the probability of a success.
- For e.g.,NEGBINOMDIST(8..9,5..7,0.5).
.
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
Related Videos
See Also
References