Two differenct coils have self-inductances `L_(1)=16 mH` and `L_(2)=12mH`. At a certain instant, the current in the two coils is increasing at the same rate and power supplied to the two coils is the same. Find the ratio of
induced voltage

Two differenct coils have self-inductances L_(1)=16 mH and L_(2)=12mH . At a certain instant, the current in the two coils is increasing at the same rate and power supplied to the two coils is the same. Find the ratio of induced current

Two differenct coils have self-inductances L_(1)=16 mH and L_(2)=12mH . At a certain instant, the current in the two coils is increasing at the same rate and power supplied to the two coils is the same. Find the ratio of energy stored in the two coils at that instant.

The ratio of the inductances of two coils is 1 : 2 and that of the currents through them is 2 : 1. Find the ratio of energy stored in the coils.

Two wires of the same radius material have lengths in the ratio 1:2. If these are stretched by the same force the strain produced in the two cases will be in the ratio

The volumes of two right circular cylinders are same. The ratio of their height is 1 : 2. Find the ratio of their radii.

At any instant current i through a coil of self inductance 2 mH is given by i=t^(2)e^(-t) . The induced e.m.f. will be zero at time

Two coils of self-inductances 6mH and 8mH are connected in series and are adjusted for highest coefficient of coupling. Equivalent self-inductance L for the assembly is approximately

The current in a coil at time t is I = t^2e^(-t) . The self inductance of the coil is L= 2mH . How much time it will take to e.m.f. be zero?

The current in a coil increases by 10 A in 0.01s. If the average emf induced in the coil is 100 V, find out the self-inductance of the coil and the flux linked with it.