For an LCR circuit driven at frequency `omega`, the equation reads `L(di)/(dt) + R_i +q/C=v_t = v_msinomegat`
Interpret each term physically.

For an LCR circuit driven at frequency omega , the equation reads L(di)/(dt) + R_i +q/C=v_t = v_msinomegat Cast the equation in the form of a conservation of energy statement.

For an LCR circuit driven at frequency omega , the equation reads L(di)/(dt) + R_i +q/C=v_t = v_msinomegat Multiply the equation by i and simplify where possible?

Figure shows a series LCR circuit connected to a variable frequency 230 V source. L = 5.0 H, C = 80 muF , R= 40 Omega . Determine the rms potential drops across the three elements of the circuit. Show that the potential drop across the LC combination is zero at the resonating frequency. :

Figure shows a series LCR circuit connected to a variable frequency 230 V source. L = 5.0 H, C = 80 muF , R= 40 Omega . Obtain the impedance of the circuit and the amplitude of current at the resonating frequency. :

LCR circuit connected to a variable frequency 230 V source . L=5.0 H, C=80 micro F and R=40 ohm. Keeping the source frequency equal to the resonating frequency of the series LCR circuit, if the three elements, L, C and R are arranged in parallel, show that the total current in the parallel LCR circuit is minimum at this frequency. Obtain the current rms value in each branch of the circuit for the elements and source.

In a series LCR circuit R = 200 Omega and the voltage and the frequency of the main supply is 220 V and 50 Hz respectively. On taking out the capacitance from the circuit the current lags behind the voltage by 30^@ . On taking out the inductor from the circuit the current leads the voltage by 30^@ . The power dissipated in the LCR circuit is

A resistor R, an inductor L, a capacitor C and voltmeters V_(1),V_(2) and V_(3) are connected to an oscillator in the circuit as shown in the adjoining diagram.When the frequency of the oscillator is increased, upto resonance frequency, the voltmeter reading (at resonance frequency) is zero in the case of:

The equation of electromotive force for an electric circuit contianing resistance and self inductance is E=Ri+L(di)/(dt) , where E is the electromotive force given to the circuit, R, the resistance and L, the coefficient of induction. Find the current 'i' at time t when E= 0

In a series LCR circuit, V_L=V_C=V_R what is the value of power factor?