cumulativeDistributionFunction

87 triples

GPTKB property

CDF • cdf • cumulative distribution function

Subject	Object
gptkb:Exponential_distribution	1 - exp(-lambda * x)
gptkb:arcsine_distribution	F(x) = (2/π) arcsin(√x) for x in [0,1]
gptkb:Weibull_distribution_(with_shape_parameter_1)	F(x) = 1 - exp(-x/λ) for x ≥ 0
gptkb:Chi-squared_distribution	P(x; k) = γ(k/2, x/2)/Γ(k/2)
gptkb:Type_II_extreme_value_distribution	F(x) = exp(-((x-m)/s)^-α) for x > m
gptkb:uniform_distribution	(x-a)/(b-a) for a ≤ x ≤ b
gptkb:Fréchet_distribution	F(x; α, s, m) = exp(-((x-m)/s)^(-α)) for x > m
gptkb:Snedecor's_F-distribution	involves regularized incomplete beta function
gptkb:log-normal_distribution	Φ((ln x - μ)/σ), x > 0
gptkb:Johnson_SU_distribution	involves inverse hyperbolic sine
gptkb:geometric_distribution	P(X ≤ k) = 1 - (1-p)^k
gptkb:univariate_normal_distribution	Φ((x-μ)/σ)
gptkb:Student's_t-distribution	No simple closed form
gptkb:triangular_distribution	piecewise quadratic
gptkb:chi_distribution	P(x;k) = gamma(k/2, x^2/2) / Gamma(k/2)
gptkb:circular_normal_distribution	no closed form
gptkb:Delta_Distribution	Heaviside Step Function
gptkb:univariate_t-distribution	expressed in terms of the incomplete beta function
gptkb:Noncentral_t-distribution	no closed form
gptkb:Erlang_distribution	1 - Σ_{n=0}^{k-1} e^{-λx} (λx)^n / n!