Cumulative Distribution Function (noun) Definition, Meaning & Examples

noun
  1. a function defined on the sample space of a distribution and taking as its value at each point the probability that the random variable has that value or less. The function F (x) = P (Xx) where X is the random variable, which is the sum or integral of the probability density function of the distribution
Cumulative Distribution Function (noun) Definition, Meaning & Examples

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