# Exercise 6-1 .1 A random process has sample functions of the form X(t) =A =0 0 :::: t :::: 1 elsewhere where A is a random variable that is uniformly distributed from 0 to 1 0. Using the basic definition of the autocorrelation function as given by Equation (6- 1 ) , find the autocorrelation function of this process.

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• probabilistic methods of signal and system analysis
• Exercise 6-1 .1 A random process has sample functions of the form X(t) =A =0 0 :::: t :::: 1 elsewhere where A is a random variable that is uniformly distributed from 0 to 1 0. Using the basic definition of the autocorrelation function as given by Equation (6- 1 ) , find the autocorrelation function of this process.
 ▲ 0 ▼ ♥ 0 Exercise 6-1 .1 A random process has sample functions of the form X(t) =A =0 0 :::: t :::: 1 elsewhere where A is a random variable that is uniformly distributed from 0 to 1 0. Using the basic definition of the autocorrelation function as given by Equation (6- 1 ) , find the autocorrelation function of this process. Marked as spam Asked on 0 views Public question