Two inductors `L_(1)` and `L_(2)` are at a sufficient distance apart. Equivalent inductance when they are connected (i) in series (ii) in parallel are

G_(1), G_(2), G_(3) are the conductances of three conductors. What will be their equivalent conductance when they are connected, (i) in series (ii) in parallel.

" Two inductors each of inductance L are joined in parallel.Their equivalent inductance is "

Define self inductance. Find the relation for self inductance of two coils (i) in series (ii) in parallel.

Derive an expression for equivalent capacitance of three capacitors C_(1), C_(2) and C_(3) when connected (i) in series (ii) in parallel.

An inductor of inductance L is cut in three equal parts and two of these parts are interconnected (a) in series, (b) in parallel. Assuming the mutual inductance between the parts to be negligible, calculate the inductance of the combination of the combination in both the cases.

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)

Two pure inductors each of self inductance L are connected in series, the net inductance is