Difference between revisions of "Manuals/calci/HYPGEOMDIST"
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*<math>population s</math> is population's success. | *<math>population s</math> is population's success. | ||
*<math>number population</math> is the population size. | *<math>number population</math> is the population size. | ||
+ | **HYPGEOMDIST(),returns the hypergeometric distribution. | ||
==Description== | ==Description== | ||
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==ZOS== | ==ZOS== | ||
− | *The syntax is to calculate HYPGEOMDIST in ZOS is <math>HYPGEOMDIST( | + | *The syntax is to calculate HYPGEOMDIST in ZOS is <math>HYPGEOMDIST (sample s,number sample,population s,number population,cumulative) |
+ | </math> | ||
**<math>sample s</math> is the sample's success. | **<math>sample s</math> is the sample's success. | ||
**<math>number sample</math> is the sample's size. | **<math>number sample</math> is the sample's size. |
Latest revision as of 16:19, 7 August 2018
HYPGEOMDIST (sample_s,number_sample,population_s,number_population,cumulative)
- is the sample's success.
- is the sample's size.
- is population's success.
- is the population size.
- HYPGEOMDIST(),returns the hypergeometric distribution.
Description
- This function gives the result of Hypergeometric Distribution.
- This distribution is a discrete probability distribution which is contrast to the binomial distribution.
- A Hypergeometric random variable is the number of successes that result from a Hypergeometric experiment.
- The probability distribution of a Hypergeometric random variable is called a Hypergeometric Distribution.
- In HYPGEOMDIST (sample_s,number_sample,population_s,number_population,cumulative) where samples is the number of items in the Sample that are classified as successes.
- is the total number of items in the sample.
- is the number of items in the population that are classified as successes and is the total number of items in the sample.
- The following conditions are applied to the Hypergeometric distribution:
1.This distribution is applies to sampling without replacement from a finite population whose elements can be classified into two categories like Success or Failure. 2.The population or set to be sampled consists of N individuals, objects,or elements 3.Each individual can be success (S) or a failure (F), and there are M successes in the population. 4.A sample of individuals is selected without replacement in such a way that each subset of size is equally likely to be chosen.
- The Hyper geometric probability distribution is:
for is an integer satisfying . where is sample's success.
- is the sample's size.
- is population's success and is the population size.
- Here we can give any positive real numbers.
- Suppose we are assigning any decimals numbers it will change in to Integers.
- This function will give result as error when
1.Any one of the argument is non-numeric. 2. or samples is greater than the smaller value of numbersample or populations. 3. is less than the bigger of 0 or(numbersample-numberpopulation+populations) 4. or 5. or or
ZOS
- The syntax is to calculate HYPGEOMDIST in ZOS is
- is the sample's success.
- is the sample's size.
- is population's success.
- is the population size.
- For e.g.,HYPGEOMDIST(2..3,6..7,9..10,20)
Examples
- Draw 6 cards from a deck without replacement.What is the probability of getting two hearts?
Here M = 13 number of hearts N = 52 total number of cards so N-M= 52-13= 39 and x=2,n=6 so n-x=6-2=4 =HYPGEOMDIST(2,6,13,52)=0.315129882
- 42 balls are numbered 1 - 42.You select six numbers between 1 and 42. What is the probability that they contain (i)match 3, (ii) match 4
(i)Here M= 6,N=42,x=3and n=6 HYPGEOMDIST(3,6,6,42)=0.02722185 (ii)Here M= 6,N=42,x=4and n=6 HYPGEOMDIST(4,6,6,42)=0.001801446
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See Also
References