dask.array.random.binomial
dask.array.random.binomial¶
- dask.array.random.binomial(n, p, size=None, chunks='auto', **kwargs)¶
Draw samples from a binomial distribution.
This docstring was copied from numpy.random.mtrand.RandomState.binomial.
Some inconsistencies with the Dask version may exist.
Samples are drawn from a binomial distribution with specified parameters, n trials and p probability of success where n an integer >= 0 and p is in the interval [0,1]. (n may be input as a float, but it is truncated to an integer in use)
Note
New code should use the
binomial
method of adefault_rng()
instance instead; please see the Quick Start.- Parameters
- nint or array_like of ints
Parameter of the distribution, >= 0. Floats are also accepted, but they will be truncated to integers.
- pfloat or array_like of floats
Parameter of the distribution, >= 0 and <=1.
- sizeint or tuple of ints, optional
Output shape. If the given shape is, e.g.,
(m, n, k)
, thenm * n * k
samples are drawn. If size isNone
(default), a single value is returned ifn
andp
are both scalars. Otherwise,np.broadcast(n, p).size
samples are drawn.
- Returns
- outndarray or scalar
Drawn samples from the parameterized binomial distribution, where each sample is equal to the number of successes over the n trials.
See also
scipy.stats.binom
probability density function, distribution or cumulative density function, etc.
Generator.binomial
which should be used for new code.
Notes
The probability density for the binomial distribution is
\[P(N) = \binom{n}{N}p^N(1-p)^{n-N},\]where \(n\) is the number of trials, \(p\) is the probability of success, and \(N\) is the number of successes.
When estimating the standard error of a proportion in a population by using a random sample, the normal distribution works well unless the product p*n <=5, where p = population proportion estimate, and n = number of samples, in which case the binomial distribution is used instead. For example, a sample of 15 people shows 4 who are left handed, and 11 who are right handed. Then p = 4/15 = 27%. 0.27*15 = 4, so the binomial distribution should be used in this case.
References
- 1
Dalgaard, Peter, “Introductory Statistics with R”, Springer-Verlag, 2002.
- 2
Glantz, Stanton A. “Primer of Biostatistics.”, McGraw-Hill, Fifth Edition, 2002.
- 3
Lentner, Marvin, “Elementary Applied Statistics”, Bogden and Quigley, 1972.
- 4
Weisstein, Eric W. “Binomial Distribution.” From MathWorld–A Wolfram Web Resource. http://mathworld.wolfram.com/BinomialDistribution.html
- 5
Wikipedia, “Binomial distribution”, https://en.wikipedia.org/wiki/Binomial_distribution
Examples
Draw samples from the distribution:
>>> n, p = 10, .5 # number of trials, probability of each trial >>> s = np.random.binomial(n, p, 1000) # result of flipping a coin 10 times, tested 1000 times.
A real world example. A company drills 9 wild-cat oil exploration wells, each with an estimated probability of success of 0.1. All nine wells fail. What is the probability of that happening?
Let’s do 20,000 trials of the model, and count the number that generate zero positive results.
>>> sum(np.random.binomial(9, 0.1, 20000) == 0)/20000. # answer = 0.38885, or 38%.