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The rms voltage is given by the following.
ΔVrms = ΔVmax/[tex]\sqrt{2}[/tex] = 0.707ΔVmax

Substituting the maximum voltage, we obtain
ΔVrms = ΔVmax/[tex]\sqrt{2}[/tex]

= 0.707ΔVmax = 0.707(165 V) = 117 V.
An rms voltage of 117 V corresponds to a maximum voltage of 165 V.


What is the maximum current Imax in the resistor?

Respuesta :

onyebuchinnaji

The maximum current in the resistor is determined by dividing root mean square current by 0.7071.

Maximum current in the resistor

The maximum current in the resistor is calculated as follows;

I₀ = I(rms)/0.7071

where;

  • I₀ is the peak current or maximum current in the resistor
  • I(rms) is the root mean - square current

Thus, the maximum current in the resistor is determined by dividing root mean square current by 0.7071.

Learn more about maximum current here: https://brainly.com/question/14562756

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