1 Answer

Ilians · Answer 1 · 2021-04-09T19:37:20+0000

Answer:

d. - peak

Step-by-step explanation:

In alternating current, the voltage is represented by the following formula:

$V=V_(max)sin(\omega t+\phi)$

where,

V_(max) =Maximum voltage

$\omega$ =Angular frequency

$\phi$ =phase shift

t=time

The angular frequency can be written in terms of the period (T), so:

$\omega=(2\pi)/(T)$

So the equation will now lok like this:

$V=V_(max)sin((2\pi)/(T) t+\phi)$

we know that
$\phi=(\pi)/(2)$ and that
t=(T)/(2) so the equation will now look like this:

$V=V_(max)sin((2\pi)/(T) ((T)/(2))+(\pi)/(2))$

which can be simplified to:

$V=V_(max)sin(\pi+(\pi)/(2))$

$V=V_(max)sin((3\pi)/(2))$

Which solves to:

V=-V_(max)

so the answer is d. -peak

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