Let f"tg be a stationary process and xt = a + b t + "t with a and b
constants.
(a) Show that rxt is stationary.
(b) How would you obtain a stationary process stationary if the trend
were quadratic?
Let f_tg be a sequence of independent random variables normally distributed,
zero-mean and variance _2. Let a, b and c be constants Which of
the following processes are stationary? For each statiuonary process calculate
its expected value and its autocovariance function.
(a) xt = a + b _t + c_t1,
(b) xt = a + b _0,
(c) xt = _1 cos(ct) + _2 sin(ct),
(d) xt = _0 cos(ct),
(e) xt = _t cos(ct) + _t1 sin(ct),
(f) xt = _t_t1.