Two inductances `L_(1)` & `L_(2)` are connected in series & are seperated by a large distance.
(a) Show that their equivalent inductance is `L_(1)+L_(2)`.
(b) Why must their seperation be larger ?

The inductors of self inductance L_(1) and L_(2) are put in series .

Two inductors L_(1) and L_(2) are connected in parallel and a time varying current flows as shown. the ratio of current i_(1)//i_(2)

Mutual inductance of two coils depends on their self inductance L_(1) and L_(2) as :

Two inductors of inductance L each are connected in series with opposite magnetic fluxes. The resultant inductance is (Ignore mutual inductance)

Two inductors L_(1) and L_(2) are connected in parallel and a time varying current flows as shown. The ratio of current i_(1)//i_(2) is?

There are two solenoid of same length and inductance L but their diameters differ to the extent that one can just fit into the other. They are connected in three different ways in series. (1) They are connected in series but separated by large distance. (2) They are connected in series with one inside the other and senses of the turns coinciding. (3) Both are connected in series with one inside the other with senses of the turns opposites, as depicted in figures 1, 2 and 3 respectively. The total inductance of the solenoids in each of the case 1, 2 and 3 are respectively.

In the network in given find l_(1), l_(2) and l.

Two inductances connected in parallel are equivalent to a single inductance of 1.5H and when connected in series are equivalent to a single inductance of 8 H. The difference in their inductance is

Two pure inductors each of self-inductance L are connected in parallel but are well separted from each other. The total inductance is

Two coils of self inductance L_(1) and L_(2) are connected in parallel and then connected to a cell of emf epsilon and internal resistance - R. Find the steady state current in the coils.