Problem Statement
A series RLC circuit has $R = 10\,\Omega$, $L = 0.10\,\text{H}$, $C = 20\,\mu$F connected to $V_{rms} = 220\,\text{V}$ at $f = 50\,\text{Hz}$. Find (a) impedance, (b) rms current, (c) resonant frequency.
Given Information
- $R = 10\,\Omega$
- $L = 0.10\,\text{H}$
- $C = 20\,\mu\text{F}$
- $f = 50\,\text{Hz}$
- $V_{rms} = 220\,\text{V}$
Physical Concepts & Formulas
In a series RLC circuit, inductive reactance $X_L = \omega L$ and capacitive reactance $X_C = 1/(\omega C)$ partially cancel. The net reactance is $X = X_L – X_C$. Impedance $Z = \sqrt{R^2 + X^2}$. Resonance occurs at $f_0 = 1/(2\pi\sqrt{LC})$ where $Z = R_{min}$.
- $X_L = \omega L$, $X_C = 1/(\omega C)$
- $Z = \sqrt{R^2+(X_L-X_C)^2}$
- $f_0 = 1/(2\pi\sqrt{LC})$
Step-by-Step Solution
Step 1 — Reactances: $$X_L = 2\pi\times50\times0.10 = 31.42\,\Omega;\quad X_C = \frac{1}{2\pi\times50\times20\times10^{-6}} = 159.15\,\Omega$$
Step 2 — Impedance: $$Z = \sqrt{10^2+(31.42-159.15)^2} = \sqrt{100+16317.26} = 128.13\,\Omega$$
Step 3 — Current and resonance: $$I_{rms} = 220/128.13 = 1.717\,\text{A};\quad f_0 = \frac{1}{2\pi\sqrt{0.10\times20\times10^{-6}}} = 112.54\,\text{Hz}$$
Worked Calculation
$$Z = 128.13\,\Omega;\quad I_{rms} = 1.717\,\text{A};\quad f_0 = 112.54\,\text{Hz}$$
Answer
$$\boxed{Z = 128.13\,\Omega,\quad I_{rms} = 1.717\,\text{A},\quad f_0 = 112.54\,\text{Hz}}$$
At 50 Hz the impedance is 128.13Ω. At resonance (112.54 Hz), Z drops to 10Ω and current rises to 22.00A — below resonance now. Resonance is exploited in radio tuning and power factor correction.
Physical Interpretation
At 50 Hz the impedance is 128.13Ω. At resonance (112.54 Hz), Z drops to 10Ω and current rises to 22.00A — below resonance now. Resonance is exploited in radio tuning and power factor correction.
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