cumulativeDistributionFunction

87 triples

GPTKB property

CDF • cdf • cumulative distribution function

Subject	Object
gptkb:generalized_extreme_value_distribution	F(x) = exp(-[1 + ξ((x-μ)/σ)]^{-1/ξ})
gptkb:discrete_uniform_distribution	F(x) = (floor(x) - a + 1)/n for a ≤ x < b
gptkb:Lévy_distribution	F(x; μ, c) = erfc(sqrt(c / (2(x-μ)))), x > μ
gptkb:GEV_distribution	closed form
gptkb:inverse_gamma_distribution	Γ(α, β/x) / Γ(α)
gptkb:Log-gamma_distribution	F(x; μ, θ, k) = γ(k, exp((x-μ)/θ))/Γ(k)
gptkb:arcsine_distribution	F(x) = (2/π) arcsin(√x) for x in [0,1]
gptkb:Extreme_Value_Type_I_distribution	F(x) = exp(-exp(-(x-μ)/β))
gptkb:Fisher–Snedecor_distribution	I_{d1 x/(d1 x + d2)}(d1/2, d2/2)
gptkb:Generalized_extreme_value_distribution	F(x) = exp(- (1 + ξ((x-μ)/σ))^{-1/ξ})
gptkb:Pareto_distribution	F(x; xm, α) = 1 - (xm/x)^α
gptkb:Log-normal_distribution	F(x; μ, σ) = 0.5 + 0.5 erf[(ln x - μ)/(σ√2)]
gptkb:Student's_t-distribution	No simple closed form
gptkb:Weibull_distribution_(with_shape_parameter_1)	F(x) = 1 - exp(-x/λ) for x ≥ 0
gptkb:Standard_normal_distribution	Φ(x)
gptkb:Inverse_gamma_distribution	Γ(α, β/x) / Γ(α)
gptkb:gamma_distribution_(with_shape_n)	incomplete gamma function
gptkb:generalized_Pareto_distribution	F(x) = 1 - (1 + b(x-bc)/c)^{-1/b} for b
gptkb:chi-squared_distribution_(with_2_degrees_of_freedom)	F(x) = 1 - exp(-x/2) for x > 0
gptkb:Arcsine_distribution_(when_alpha=beta=0.5)	F(x) = (2/π) arcsin(√x) for 0 ≤ x ≤ 1