Chapter 3








                               Multiple Random Variables





         3.1  INTRODUCTION
               In many  applications  it  is  important  to study  two  or more  r.v.'s  defined  on  the  same sample
           space. In this chapter, we first consider the case of  two r.v.'s,  their associated distribution, and some
           properties, such as independence of  the r.v.'s.  These concepts are then extended to the case of  many
           r.v.'s  defined on the same sample space.





         3.2.  BIVARIATE  RANDOM  VARIABLES
         A.  Definition:

               Let S be the sample space of a random experiment. Let X and  Y be two r.v.'s.  Then the pair (X,
            Y)  is called a  bivariate r.v.  (or two-dimensional random vector) if  each of  X  and  Y associates a real
           number with every element of S. Thus, the bivariate r.v. (X, Y) can be considered as a function that to
           each point c in S  assigns a point (x, y) in the plane (Fig. 3-1). The range space of  the bivariate r.v. (X,
            Y) is denoted by R,,  and defined by



               If  the  r.v.'s  X  and  Y are  each, by  themselves, discrete r.v.'s,  then  (X,  Y)  is  called  a  discrete
           bivariate r.v. Similarly, if  X and  Y  are each, by  themselves, continuous r.v.'s,  then (X, Y) is called a
           continuous bivariate r.v.  If  one of  X  and  Y is discrete while the other is continuous, then  (X, Y)  is
           called a mixed bivariate r.v.


























                                  Fig. 3-1  (X, Y) as a function from S to the plane.
                                                   79