Random Variables and Discrete Probability Distribution
Discrete
The random variable assumes a countable number of distinct values.
expected value
mean
Continuous
The random variable is characterized by (infinitely) uncountable values within any interval.
property of discrete probability distributions
The probability of each value x is a value between 0 and 1, or equivalently 0 <= P(X= x) <= 1
property of discrete probability distributions
The sum of the probabilities equals 1. In other words, Σ P(X <= xi) = 1 where the sum extends over all values x of X.
Discrete Random Variable
assumes a countable number of distinct values
discrete uniform distribution characteristics
distribution has a finite number of specified values each value is equally likely distribution is symmetric
cumulative distribution function
for X is defined as P(X <= x)
probability mass function
for a discrete random variable X is a list of the values of X with the associated probabilities,
Random Variable
is a function that assigns numerical values to the outcomes of an experiment
Every random variable
is associated with a probability distribution that describes the variable completely.
E(X)
is the long-run average value of the random variable over infinitely many independent repetitions of an experiment.
probability density function
is used to describe continuous random variables.
probability mass function
is used to describe discrete random variables.
Values of Random Variable
lower case
discrete probability distribution
may be viewed as a table, algebraically, or graphically.
cumulative distribution function
maybe used to describe either discrete or continuous random variables.
probability mass function
the list of all possible pairs (x,P(X= x)
Random Variable
upper case
Values of Random Variable
x1, x2,x3...
E(X)
Σ xiP(X <= xi)
