torque on current loop magnetic dipole
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A magnetic dipole is the limit of either a closed loop of electric current or a pair of poles as the dimensions of the source are reduced to zero while keeping the magnetic moment constant. Now we shall show that a steady current I passing through a rectangular loop placed in a uniform magnetic field experiences a torque. It does not experience a net force. This behaviour is similar to the of an electric dipole in a uniform electric field.
Torque
A rectangular current carrying coil in the magnetic field
Case 1
Let’s consider a case when the rectangular loop is placed such that the uniform magnetic field B is the plane of the loop. The field exerts no force on both arms PS and QR of the loop. It is perpendicular to the arm PQ of the loop and exerts a force F1 on it which is directed into the plane of the loop. Its magnitude is,
F1= IzB
Similarly, it exerts a force F2 on the arm RS and F2 is directed out of the plane of the paper.
F2 = IzB = F1
Therefore, the net force on the loop is zero. As both the forces F1 and F2 nullify each other, there is a torque on the loop. Here, we can see that the torque on the loop tends to rotate it in an anti-clockwise direction.
τ = F1 (y/2) + F2 (y/2)
= IzB (y/2) + IzB (y/2)
= I (y × z) B
= IAB …….(1)
where A = y × z is the area of the rectangle.
Case 2
Now let us consider a case when the plane of the loop is not along the magnetic field but makes an angle with it. And let us consider the angle between the field and the normal to the coil is angle Θ.
The forces on both the arms QR and SP are equal, opposite and act along the axis of the coil, which connects the centres of mass of QR and SP. Being collinear along the axis they cancel out each other, resulting in no net force or torque. The forces on arms PQ and RS are F1 and F2. Furthermore, they too are equal and opposite, with magnitude,
F1 = F2 = IzB
As they are not collinear it results in a couple. The effect of torque is, however, less than the earlier case when the plane of the loop was along the magnetic field. The magnitude of the torque on the loop is,
τ= F1 (y/2) sinθ + F2 (y/2) sinθ
= I (y×z) B sinθ
= IABsinθ …….(2)
So, the torques in equations (1) and (2) can be expressed as the vector product of the magnetic moment of the coil and the magnetic field. Therefore, we can define the magnetic moment of the current loop as,
m = IA
where A is the direction of the area vector. The angle between m and B is θ, the equations (1) and (2) can be expressed by one expression
τ = m×B
where m is the magnetic moment and B is the uniform magnetic field.