Revision #634 → #1491 · back to history
addedProbability density function2839a51151cf
addedBacteria lifespan example77c889b69bbf
addedDensity of an absolutely continuous random variablebd8207e82238
addedRelation between density and CDF3383868bd710
addedMeasure-theoretic density (Radon–Nikodym derivative)4c2a63dd9565
addedPMF as density with respect to counting measure1761e7b0b7a3
addedAlmost-everywhere uniqueness of densityee9f90149d93
addedUniform distribution with density greater than onedc9ad5985286
addedStandard normal density10a1f7407eaa
addedExpected value from density67c01d0683be
addedNot every distribution has a density1bb32e67a069
addedExistence of density via absolutely continuous CDF7d51004276f0
addedOne-point sets have zero probabilitye5a8455d5bb5
addedDensities equal up to a measure-zero setfa539c3e9ab0
addedStatistical physics definition of PDFd90f2da6a84a
addedGeneralized density via Dirac deltac0bf1a9be9e4
addedGeneralized density for a discrete variable18edd3a05900
addedParametrized families of densities526610e5444d
addedJoint probability density function075593560b7e
addedJoint PDF from CDF8952aedaf55b
addedMarginal density functionbc18efc78e7b
addedIndependence via joint density7c906cea741c
addedIndependence from factored joint densitya8bc2a6e30f0
addedTwo-variable density examplea789ff17b382
addedChange of variables in the PDF2242096feffb
addedLaw of the unconscious statistician (equal integrals)3b29caea5da3
addedDensity under a monotonic transformation073566875bf6
addedDensity under a non-monotonic transformationc972b104ea94
addedDensity under a vector bijective transformation83c42daabb19
addedTwo-dimensional change of variables09e635a5e7f3
addedDensity of a scalar function of a random vector9d2fbcbb0076
addedLaw of the unconscious statistician6d38480adb34
addedDensity of a sum is the convolutiond58c735c99ea
addedConvolution for N independent variables0866122cc278
addedDensity of products and quotientsba7d49cdde49
addedQuotient distribution derivation778b8ca2ec11
addedQuotient of two standard normals (Cauchy)89d4390c5dfe