Alternative names (1)
kurtosisExcessRandom triples
| Subject | Object |
|---|---|
| gptkb:Negative_binomial_distribution | 6/p + (p^2/(r(1-p))) |
| gptkb:Inverse_gamma_distribution | 6(5α-11)/((α-3)(α-4)), for α > 4 |
| gptkb:chi_distribution | 2(1 - (mean)^2/k) |
| gptkb:Chi-squared_distribution | 12/k |
| gptkb:Gumbel_distribution | 12/5 |
| gptkb:Lorentzian_distribution | undefined |
| gptkb:Cauchy_distribution | undefined |
| gptkb:multivariate_normal_distribution | 3 |
| gptkb:bernoulli_distribution | (1-6p(1-p))/(p(1-p)) |
| gptkb:binomial_distribution | (1-6p(1-p))/(n*p*(1-p)) |
| gptkb:gamma_distribution | 6/k |
| gptkb:student's_t-distribution | greater than normal distribution for small degrees of freedom |
| gptkb:chi-squared_distribution_(with_2_degrees_of_freedom) | 6 |
| gptkb:Student's_t-distribution_(ν=1) | undefined |
| gptkb:Normal_Distribution_Function | 3 |
| gptkb:univariate_normal_distribution | 3 |
| gptkb:lognormal_distribution | exp(4σ^2) + 2exp(3σ^2) + 3exp(2σ^2) - 6 |
| gptkb:circular_normal_distribution | depends on κ |
| gptkb:Student's_t-distribution | 6/(df-4) for df > 4 |
| gptkb:Arcsine_distribution_(when_alpha=beta=0.5) | 1.5 |