(A) The phase difference $\phi$ between the voltage and current in an $LCR$ series circuit is given by: $\tan \phi = \frac{X_L - X_C}{R}$.Given $\phi

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$\left(\frac{1+2 \pi fCR}{4 \pi^2 f^2 C}\right)$

(A) The phase difference $\phi$ between the voltage and current in an $LCR$ series circuit is given by: $\tan \phi = \frac{X_L - X_C}{R}$.Given $\phi = 45^{\circ}$,so $\tan 45^{\circ} = 1$.Thus,$\frac{\omega L - \frac{1}{\omega C}}{R} = 1$.$\omega L - \frac{1}{\omega C} = R$.$\omega L = R + \frac{1}{\omega C} = \frac{R \omega C + 1}{\omega C}$.Since $\omega = 2 \pi f$,we have $L = \frac{R \omega C + 1}{\omega^2 C} = \frac{R(2 \pi f)C + 1}{(2 \pi f)^2 C}$.$L = \frac{1 + 2 \pi fCR}{4 \pi^2 f^2 C}$.

Class 12 Physics Alternating Current RL, RC and LC AC Circuits

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With an alternating voltage source of frequency $f$,an inductor $L$,a capacitor $C$,and a resistor $R$ are connected in series. The voltage leads the current by $45^{\circ}$. The value of $L$ is $(\tan 45^{\circ} = 1)$.

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A
$\left(\frac{1+2 \pi fCR}{4 \pi^2 f^2 C}\right)$
B
$\left(\frac{1-2 \pi fCR}{4 \pi^2 f^2 C}\right)$
C
$\left(\frac{4 \pi^2 f^2 C}{1+2 \pi fCR}\right)$
D
$\left(\frac{4 \pi^2 f^2 C}{1-2 \pi fCR}\right)$

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An $ac$ source of angular frequency $\omega$ is connected across a resistor $R$ and a capacitor $C$ in series. The current registered is $I$. If the frequency of the source is changed to $\omega/3$ (while maintaining the same voltage),the current in the circuit is found to be halved. Calculate the ratio of reactance to resistance at the original frequency $\omega$.

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For a series $LCR$ circuit,$R = X_L = 2X_C$. The impedance of the circuit and the phase difference between $V$ and $i$ will be:

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An alternating e.m.f. having voltage $V = V_0 \sin \omega t$ is applied to a series $L-C-R$ circuit. Given: $|X_L - X_C| = R$. The r.m.s. value of potential difference across the capacitor will be:

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An inductance coil has a resistance of $80 \Omega$. When an $AC$ signal of frequency $480 \text{ Hz}$ is applied to the coil,the voltage leads the current by $45^{\circ}$. The inductance of the coil in henry is $\left[\sin 45^{\circ}=\cos 45^{\circ}=1 / \sqrt{2}\right]$

MediumMHT CET 2024

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If $i$ is the current in an $L-C-R$ series $AC$ circuit,what are the formulas for:
$(i)$ Voltage across resistance.
$(ii)$ Voltage across inductor.
$(iii)$ Voltage across capacitor.

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With an alternating voltage source of frequency $f$,an inductor $L$,a capacitor $C$,and a resistor $R$ are connected in series. The voltage leads the current by $45^{\circ}$. The value of $L$ is $(\tan 45^{\circ} = 1)$.

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For a series $LCR$ circuit,$R = X_L = 2X_C$. The impedance of the circuit and the phase difference between $V$ and $i$ will be:

An alternating e.m.f. having voltage $V = V_0 \sin \omega t$ is applied to a series $L-C-R$ circuit. Given: $|X_L - X_C| = R$. The r.m.s. value of potential difference across the capacitor will be:

An inductance coil has a resistance of $80 \Omega$. When an $AC$ signal of frequency $480 \text{ Hz}$ is applied to the coil,the voltage leads the current by $45^{\circ}$. The inductance of the coil in henry is $\left[\sin 45^{\circ}=\cos 45^{\circ}=1 / \sqrt{2}\right]$

If $i$ is the current in an $L-C-R$ series $AC$ circuit,what are the formulas for:$(i)$ Voltage across resistance.$(ii)$ Voltage across inductor.$(iii)$ Voltage across capacitor.

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If $i$ is the current in an $L-C-R$ series $AC$ circuit,what are the formulas for:
$(i)$ Voltage across resistance.
$(ii)$ Voltage across inductor.
$(iii)$ Voltage across capacitor.