A random process X(t) is defined as X(1) = A.cos(27 fd)+A, sin(27fd) where A, and A, are independent Gaussian random variables with zero mean and variance o, respectively, where o? = o? = o². (a) Find the mean E[X].

Please answer the following question completely, I will upvote. 

 

Transcribed Image Text:

A random process X (t) is defined as X(t) = A. cos(27 fd)+A, sin(27fdt) where A, and A, are independent Gaussian random variables with zero mean and variance o? and o, respectively, where o? = o? = o?. (a) Find the mean E[X]. (b) Find autocorrelation function Rx(t+T,t). (c) Is X (t) stationary?