Tag: physics

Torque on the loop $\vec{\tau} = \vec{\mu} \times \vec{B}$ where $\vec{\mu}=i\vec{A}$ is the magnetic moment of the loop and $\vec{B}$  is the magnetic field.
$ \therefore \tau = i\vec{A} \times \vec{B}$
Since $\vec{B}$ is in the plane of the loop, $\vec{A} \perp \vec{B}$
$ \therefore \vec{\tau} = 10 \times ( 0.05 \times 0.08) \times( 1.5 \times 10^{-2})= 6 \times 10^{-4}N-m$

At  present situation force of magnetic moment = $ \vec{\mu} \times \vec{B} =0 $
If it is disturbed from this position, the force that would develop would take it away from this current position and destabilize the current equilibrium. Hence it is at untstable equilibrium.
In stable equilibrium, the force developed on the system upon disturbing brings the system back to its original position. Here the opposite is the case.
In neutral equilibrium, upon being disturbed from the original position, the system attains a new equilibrium at the new position.   

A current loop is a magnetic field is in equilibrium in two orientations one is stable and another unstable.
$\because \vec{\tau} = \vec M \times \vec B = M  B  sin  \theta$
If $\theta = 0^o \Rightarrow \tau = 0$    (stable)
If $\theta = \pi \Rightarrow \tau = 0$     (unstable)
Do not experience a torque in some orientations
Hence option (c) is correct.

As the loop is placed in horizontal plane, so area vector is along vertical direction. From $\vec {\tau}=I(\vec A\times \vec B)$, as $\vec A$ is in vertical direction, $\vec {\tau}$ would be the plane of loop only. So, option (a) is wrong because for rotation of loop about its own axis $\vec {\tau}$ must be along vertical direction. (b) is correct because we can produce torque in the plane of the loop and due to this the loop can tip over.

Torque $\tau$ acting on a current carrying coil of area A placed in a magnetic field of induction B is given by,

Given, $\vec{M} \nparallel \vec{B}$, It is anti parallel.
$\therefore \vec{M} \times \vec{B} =0$ since angle is $180^{\circ}$
Potential energy $U =-\vec{M}.\vec{B}= -MB \cos 180^{\circ}= MB \times 1= MB$
Potential energy is maximum is an equilibrium but is an unstable equilibrium.

As magnetic field is constant therefore there will be no change in flux therefore no induced emf. current carrying coil has magnetic dipole moment. Hence a torque p = m x B acts on it in magnetic field.

$\tau = (\vec M \times \vec B)$, where $|\vec M| = i .A$