Show that (a) (overline{boldsymbol{R}}_{x}(-t)=overline{boldsymbol{R}}_{x}^{*}(t)); (b) if (x(t)=f(t)+m_{1}) and (y(t)=g(t)+m_{2}), show that (overline{boldsymbol{R}}_{x y}(t)=m_{1} m_{2}), where the average

Question:

Show that (a) $\overline{\boldsymbol{R}}_{x}(-t)=\overline{\boldsymbol{R}}_{x}^{*}(t)$; (b) if $x(t)=f(t)+m_{1}$ and $y(t)=g(t)+m_{2}$, show that $\overline{\boldsymbol{R}}_{x y}(t)=m_{1} m_{2}$, where the average values for $f(t)$ and $g(t)$ are zeroes.

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