CHAP.  21                        RANDOM  VARIABLES


























                                   Fig. 2-6  Poisson distribution with A = 3.

             The mean and variance of the Poisson r.v. X are (Prob. 2.29)
                                             px = E(X) = A.
                                            ax2 = Var(X) = il
             The Poisson r.v.  has a tremendous range of  applications in diverse areas because it may be used
          as an approximation for a binomial r.v.  with parameters (n, p) when n is large and p  is small enough
          so that np is of a moderate size (Prob. 2.40).
             Some examples of Poisson r.v.'s include
          1.  The number of telephone calls arriving at a switching center during various intervals of time
          2.  The number of misprints on a page of a book
          3.  The number of customers entering a bank during various intervals of time

        D.  Uniform Distribution:

             A r.v. X is called a uniform r.v. over (a, b) if its pdf is given by



                                              (0       otherwise
          The corresponding cdf of X is


                                               x-a
                                       FX(x) =  -  a<x<b
                                              {h-a


          Figure 2-7 illustrates a uniform distribution.
             The mean and variance of the uniform r.v. X are (Prob. 2.31)