kurtosis

URI: https://gptkb.org/prop/kurtosis
67 triples
GPTKB property
Alternative names (1)
kurtosisExcess
Random triples
Subject Object
gptkb:binomial_distribution (1-6p(1-p))/(n*p*(1-p))
gptkb:Normal_distribution_(standard_parameterization) 3
gptkb:normal_distribution_(precision_parameter) 3
gptkb:Inverse_gamma_distribution 6(5α-11)/((α-3)(α-4)), for α > 4
gptkb:Beta_distribution 6*((alpha-beta)^2*(alpha+beta+1)-alpha*beta*(alpha+beta+2))/ (alpha*beta*(alpha+beta+2)*(alpha+beta+3))
gptkb:univariate_standard_normal_distribution 3
gptkb:log-normal_distribution exp(4σ^2) + 2exp(3σ^2) + 3exp(2σ^2) - 6
gptkb:Exponential_distribution 6
gptkb:Normal_Distribution_Function 3
gptkb:Student's_t-distribution_(with_1_degree_of_freedom) undefined
gptkb:Extreme_Value_Type_I_distribution 12/5
gptkb:beta_distribution 6*((alpha-beta)^2*(alpha+beta+1)-alpha*beta*(alpha+beta+2))/ (alpha*beta*(alpha+beta+2)*(alpha+beta+3))
gptkb:Weibull_distribution depends on shape parameter k
gptkb:Normal_distribution_(precision_parameterization) 0
gptkb:chi_distribution 2(1 - (mean)^2/k)
gptkb:Rayleigh_distribution 0.2451
gptkb:triangular_distribution depends on parameters
gptkb:univariate_t-distribution 6/(df-4) for df > 4
gptkb:Fréchet_distribution exists for α > 4
gptkb:Chi-squared_distribution_(λ=0) 12/k