A current I is flowing in a conductor of length L when it is bent in the form of a circular loop its magnetic moment

An iron rod of length L and magnetic moment M is bent in the form of a semicircle. Now its magnetic moment will be

A current I flows in a conducting wire of lenth L. If we bent it in a circular form, then calculate its magnetic dipole moment.

One of the two identical conducting wires of length L is bent in the form of a circular loop and the other one into a circular coil of N identical turns. If the same current passed in both, the ratio of the magnetic field at the central of the loop (B_(L)) to that at the central of the coil (B_(C)) , i.e. (B_(L))/(B_(C)) will be :

A bar magnet of magnetic moment M is bent in the form of quadrant of circular arc . The new magnetic moment is

A current i is flowing in a straight conductor of length L. The magnetic induction at a point distant L/4 from its centre will be-

A current i is flowing in a straight conductor of length L. The magnetic induction at a point distant L/4 from its centre will be-

A wire of length L metre , carrying a current I ampere is bent in the form of a circle . The magnitude of its magnetic moment is …………. MKS units .

A wire of length l meter carrying current i ampere is bent in form of circle. Magnetic moment is

A steady current flows in a long wire. It is bent into a circular lopp of one turn and the magnetic field at the centre of the coil is B. If the same wire is bent into a circular loop of n turns, the magnetic field at the centre of the coil is

A current carrying conductor of length l is bent into two loops one by one. First loop has one turn of wire and the second loop has two turns of wire. Compare the magnetic fields at the centre of the loops