E infinity and P infinity calculations - William Owens (wtowens) - Rhea

$x(t) = \sqrt(t)$

$x(t) = \cos(t) + \jmath\sin(t)$

$E_\infty = \int_{-\infty}^\infty |x(t)|^2\,dt$

     $=\int_{-\infty}^\infty |\sqrt(t)|^2\,dt$ 
     $=\int_0^\infty t\,dt$ 
     $=.5*t^2|_0^\infty$ 
     $=.5(\infty^2 - 0^2)$ 
     $E_\infty = \infty$

E infinity and P infinity calculations - William Owens (wtowens) - Rhea

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