Question:
A 25 \(\Omega\) resistor and inductor in series with voltage \( V = 100\sin(100\pi t) \), impedance = 50 Ω. Find average power:
A 25 \(\Omega\) resistor and inductor in series with voltage \( V = 100\sin(100\pi t) \), impedance = 50 Ω. Find average power:
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In AC, average power is \( P = I^2 R \) using only resistive part.
Updated On: May 13, 2025
- 10 W
- 25 W
- 50 W
- 100 W
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The Correct Option is C
Solution and Explanation
RMS voltage \( V_{\text{rms}} = \frac{100}{\sqrt{2}} \), impedance \( Z = 50 \, \Omega \)
\( I_{\text{rms}} = \frac{V_{\text{rms}}}{Z} = \frac{100/\sqrt{2}}{50} = \frac{2}{\sqrt{2}} = \sqrt{2} \, A \)
Power = \( I_{\text{rms}}^2 R = 2 \cdot 25 = 50 \, W \)
\( I_{\text{rms}} = \frac{V_{\text{rms}}}{Z} = \frac{100/\sqrt{2}}{50} = \frac{2}{\sqrt{2}} = \sqrt{2} \, A \)
Power = \( I_{\text{rms}}^2 R = 2 \cdot 25 = 50 \, W \)
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