Answer Happy

4. (18 pts) Suppose that a person's daily income, X₁, on day i for i E {1,...,n}, is random. Assume that on day i, the person spends of his/her daily income of day i - 1. Let Y; be the person's net income on day i, Y₁ = X₁ - ²X₁-1, Assume that Xo = 0. (a) Assume that the person's daily income, X₁, are i.i.d random variables with mean 500 and variance 10000. Find the mean, autocorrelation, and autocovariance functions of Y₁. (b) Assume that the person's daily income, X₁, are taken from a Gaussian wide-sense stationary random process with mean 500 and autocovariance function given by Cx(j, k) = 10000e-3lj-kl. Find the mean, variance, autocorrelation and autocovariance functions of Y₁. (c) Find an expression for the joint probability density function of Y₂ and Y5 in (b). Hint: Use linearity of the expectation.