Search results
154 packages found
Poisson distribution cumulative distribution function (CDF).
- distributions.io
- distributions
- probability
- statistics
- stats
- cdf
- cumulative distribution
- distribution function
- counts
- discrete
Geometric distribution cumulative distribution function (CDF).
- distributions.io
- distributions
- probability
- statistics
- stats
- cdf
- cumulative distribution
- distribution function
- memoryless
- life-time
- discrete
Poisson distribution quantile function.
Poisson distribution probability mass function (PMF)
random number generator for specified confidence interval
- stats
- statistics
- sampling
- sampler
- dice
- monte carlo
- random
- random number generator
- distribution
- normal
- discrete
- gaussian
- lognormal
- weibull
Poisson distribution median.
- distributions.io
- distributions
- discrete
- counts
- probability
- statistics
- stats
- median
- location parameter
- centrality
- quantiles
Geometric distribution quantile function.
- distributions.io
- distributions
- probability
- statistics
- stats
- cdf
- inverse
- failure times
- memoryless property
- discrete
- success probability
Library for sampling of random values from a discrete probability distribution, using the Walker-Vose alias method.
Poisson distribution mean.
Binomial distribution moment-generating function (MGF)
- distributions.io
- distributions
- probability
- statistics
- stats
- mgf
- generating functions
- moments
- successes
- independent trials
- discrete
- bernoulli
- exponential family
Poisson distribution variance.
- distributions.io
- distributions
- probability
- discrete
- counts
- statistics
- stats
- variance
- standard deviation
- scale
- spread
Poisson distribution excess kurtosis.
- distributions.io
- distributions
- discrete
- counts
- probability
- statistics
- stats
- dispersion
- descriptive
- kurtosis
- shape
- peakedness
Library for sampling of random values from a discrete probability distribution, using the Walker-Vose alias method.
Sample arbitrary discrete probability distributions. Extremely fast.