cumulativeDistributionFunction

87 triples
GPTKB property

Alternative names (3)
CDF cdf cumulative distribution function

Random triples
Subject Object
gptkb:Inverse_gamma_distribution Γ(α, β/x) / Γ(α)
gptkb:Standard_uniform_distribution F(x) = x for 0 ≤ x ≤ 1
gptkb:Noncentral_t-distribution no closed form
gptkb:Type_II_extreme_value_distribution F(x) = exp(-((x-m)/s)^-α) for x > m
gptkb:Noncentral_chi-squared_distribution No closed form
gptkb:double_exponential_distribution F(x|μ,b) = 0.5 * exp((x-μ)/b) for x < μ
gptkb:Generalized_extreme_value_distribution F(x) = exp(- (1 + ξ((x-μ)/σ))^{-1/ξ})
gptkb:Normal_distribution_(standard_parameterization) Φ((x-μ)/σ)
gptkb:Weibull_distribution F(x; k, λ) = 1 - e^{-(x/λ)^k} for x ≥ 0
gptkb:Log-normal_distribution F(x; μ, σ) = 0.5 + 0.5 erf[(ln x - μ)/(σ√2)]
gptkb:Exponential_distribution 1 - exp(-lambda * x)
gptkb:Binomial_distribution Sum_{i=0}^k C(n, i) p^i (1-p)^{n-i}
gptkb:chi-squared_distribution_(with_2_degrees_of_freedom) F(x) = 1 - exp(-x/2) for x > 0
gptkb:degenerate_distribution step function
gptkb:exponential_distribution 1 - exp(-lambda * x)
gptkb:generalized_gamma_distribution expressed in terms of incomplete gamma function
gptkb:Lorentz_distribution F(x; x0, γ) = (1/π) arctan((x - x0)/γ) + 1/2
gptkb:Lorentzian_distribution F(x; x0, γ) = (1/π) arctan((x - x0)/γ) + 1/2
gptkb:beta_distribution regularized incomplete beta function
gptkb:Hypergeometric_distribution Sum of PMF from lower bound to k