A current `I = I_0 e^(-lambda t)` is flowing in a circuit consisting of a parallel combination of resistance R and capacitance C. The total charge over the entire pulse period is.

A Current I= I_(0) e^(- lambdat) is flowing in a circuit consisiting of a parallel combination of resistance R and capacitance C. The total charge over the entire pulse period is

A voltage V_0sinomegat is applied across a series combination of resistance R and inductor L. The peak value of the current in the circuit is

A potential difference of 20V is applied across a parallel combination of three identical capacitors. If the total charge in the combination be 30C, determine the capacitance of each capacitor. What will be the charge in the series combination of these three capacitors with the same potential difference?

A series combination of an inductor of self-inductance L, capacitor of capacitance C and resistor R is connected to an alternating voltage source of V=V_0sinomegat . The current through the circuit is I=I_0sin(omegat-theta) ,where I_0=V_0/(sqrt(R^2+(omega-1/(omegaC))^2)) and theta=tan^-1 ""1/R(omegaL-1/(omegaC)) . Now that, the frequency of both voltage and current is f=omega/(2pi) . The rms value of these parameters during one complete cycles are V_(rms)=V_0/sqrt2 and I_(rms)=I_0/sqrt2 respectively. These values are shown in alternating voltmeter and ammeter. The power consumed by the circuit P=VI. The mean value i.e., the effective power of the circuit in a complete cycle is overlineP=V_(rms)I_(rms)costheta . This costheta is termed the power factor. V=V_0sinomegat electromotive force is applied to an alternating circuit consisting of resistance R' and an inductor of self-inductance L. The phase difference between the voltage and current is

To the parallel combination of two resistances 3 Omega and 1 Omega , a series combination of resistances 2.15 Omega and 1 Omega and a battery are connected. The interval resistance of the battery is 0.1 Omega and the emf is 2V. Determine the values of current flowing through the resistances. Draw the diagram of the circuit.

In a circuit an e.m.f. E = E_0 sin wt and current I = I_0 sin + (wt+pi/6) Find the power of the circuit, in a fullcycle. Draw a phasor diagram for this voltage and the current. Which two components may be possible in this circuit?

An alternating emf of E=20sin 1000tV is applied on a circuit containing a pure resistance of 25Omega in series with a coil of self-inductance 40 mH and resistance 15Omega . Find out the phase difference between E and the current I.

n number of cells e.m.f of each is E and internal resistance is r connected in parallel or series combination and are connect to external resistance R.Same current flows through R in both cases. Then—

The internal resistance of two cells are I Omega and 2 Omega . Their e.m.fs are 1.5 V and 2 V respectively. The parallel combination of these two cells are connected to an external resistance 5 Omega . draw the circuit and find current thorough external resistance.