The current in ampere through an inductor is
i(10+20t)
Here t is in second. The induced emf in the inductor 4V.
The self inductance of the indicator is, L…..H,

The current in ampere through an inductor is i(10+20t) Here t is in second. The induced emf in the inductor 4V. Total flux linked with the inductor at t= 2 is a

The current in ampere in an inductor is given by I=5 +16 t where t is in s. The self induced e.m.f in it is 10mv. The self inductance is

The current in ampere in an inductor is given by I=4t^2+6t where is in s. The self induced e.m.f in it is 20 mV. The self inductance of the coil t=0

The current (in Ampere) in an inductor is given by l=5+16t , where t in seconds. The selft - induced emf in it is 10mV . Find (a) the self-inductance, and (b) the energy stored in the inductor and the power supplied to it at t =1s

The current in an inductor is given by i=alpha+betat , where t is time. The self-induced emf in it is V . Find (a) the self-inductance (b) the energy stored in the inductor and the power supplied to it at time t=t_(0)

In an inductor, the current / varies with time to l = 5A + 16.(A//s)t . If-induced emf in the induct is 5 mV, the self inductance of the inductor is

Current flowing through an inductor as a function of time is given as follows : I = 4 + 16 t. here I is in amperes and t is in seconds. Emf induced in the inductor is 20 mV. What is self-inductance of the inductor ?

If the current through an inductor of 2 H is given by I = t sin t A , then the voltage across the inductor is

Find the time in which the current changes from 3 A to 1 A through an inductor of 10 H. The emf induced in the inductor is 20 V. Also, find the magnetic flux linked with the inductor.

When the current in a coil changeg from 8 amperes to 2 amperes in 3xx10^(-2) seconds, the e.m.f. induced in the coil is 2 volt. The self-inductance of the coil (in millihenry) is