Time average of a sample function is defined as:
$$\bar{x} = \langle~x(t)~\rangle = \lim \limits_{T \to \infty}\frac{1}{2T} \int \limits_{-T}^{T} x(t) ~ dt$$
This is how I see it: A few sample functions of X(t)=A, would be:
$$x_1(t) =0.2$$
$$x_2(t) = 0.7$$
$$\cdots$$
$$\text{etc}$$
How do they come up with 'A' as the time average??? $\langle x(t) \rangle=A$
