CHAP.  61         ANALYSIS  AND  PROCESSING  OF RANDOM  PROCESSES                 233



               Verify Eq. (6.72).
                  From Eq. (6.71), we have




               Taking the Fourier transform of Rdk), we obtain




               Letting k + i - 1  = n, we get












               The discrete-time  system shown  in  Fig. 6-6 consists  of one  unit  delay  element and  one scalar
               multiplier  (a < 1). The input X(n) is discrete-time white noise with  average power  a2. Find the
               spectral density and average power of the output Y(n).















                                                   Fig. 6-6


                  From Fig. 6-6, Y(n) and X(n) are related by
                                             Y(n) = aY(n - 1) + X(n)
               The impulse response h(n) of the system is defined by
                                              h(n) = ah(n - 1) + 6(n)

               Solving Eq. (6.149), we obtain
                                                  h(n) = anu(n)
               where u(n) is the unit step sequence defined by



               Taking the Fourier transform of Eq. (6.150), we obtain