Two circular loops are placed with their centres separted by a fixed distance. How would you orient the loops to have (a) the largest mutual inductance (b) the smallest mutual inducatance?

How will you orient two circular loops to have (i) smallest mutual inductance (ii) largest mutual inductance?

you are given two circular loops. How would you orient the loops to have the largest mutual inductance?

Two coaxial circular loops of raadii r_(1) and r_(2) are separated by a distance x and carry currents i_(1) and i_(2) respectively. Calculate the mutual inductance. What is the force between the loops ?

A circular loop of radius r is placed at the center of current carrying conducting square loop of side a. If both loops are coplanar and a >> r, then the mutual inductance between the loops will be

A circular loop of radius r is placed at the center of current carrying conducting square loop of side a. If both loops are coplanar and a >> r, then the mutual inductance between the loops will be

A small square loop of side 'a' and one turn is placed inside a larger square loop of side b and one turn (b gtgt a) . The two loops are coplanar with their centres coinciding. If a current I is passed in the square loop of side 'b', then the coefficient of mutual inductance between the two loops is :

A circular loop of radius 0.3 cm lies parallel to amuch bigger circular loop of radius 20 cm. The centre of the small loop is on the axis of the bigger loop. Obtain the mutual inductance of the two loops.

A small circular loop of radius a is placed inside a large square loop of edge L(gt gta) . The loops are coplanar and concentric. Find mutual inductance.

A square conducting loop of side L is situated in gravity free space. A small conducting circular loop of redius r (rlt lt L) is placed at the center of the square loop, with its plane perpendicular to the plane of the square loop. The mutual inductance of the two coils is