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Torque on a Rectangular Loop Placed in Uniform Magnetic Field |
When a rectangular loop PQRS of sides 'a' and 'b' carrying current I is placed in uniform magnetic field \[\overrightarrow{B}\], such that area vector \[\overrightarrow{A}\] makes an anlge \[\theta \] with direction of magnetic field, then forces on the arms QR and SP of loop are equal, opposite and collinear, there by perfectly cancel each other, whereas forces on the arms PQ and RS of loop are equal andopposite but not collinear, they give rise to torque on the loop. |
Force on side PQ or RS of loop is F = Ib \[\sin \,90{}^\circ =Ib\,B\] and perpendicular distance between two non-collinear forces is \[{{r}_{\bot }}=a\,\sin \theta \] |
So, torque on the loop, \[\tau =I\,\,AB\,\sin \theta \] |
In vector form torque, \[\overrightarrow{\tau }=\overrightarrow{M}\times \overrightarrow{B}\] |
where \[\overrightarrow{M}\times \,NI\,\overrightarrow{A}\] is called magnetic dipole moment of current loop and is directed in direction of area vector \[\overrightarrow{A}\] i-e., normal to the plane of loop. |
A) zero
B) \[{{10}^{-4}}N\,m\]
C) \[{{10}^{-2}}\,\,N\,m\]
D) 1 N m
Correct Answer: A
Solution :
Torque on a current carrying loop in magnetic field, \[\tau =IBA\,\sin \theta \] Here, \[I=10\,A,\,B=0\,.\,1\,T,\,A=1\,c{{m}^{2}}={{10}^{2}}{{m}^{2}}\] \[\theta =0{}^\circ \] \[\therefore \,\,\,\tau =10\times \,0\,\,.1\times {{10}^{-4}}\,\sin 0{}^\circ \,=0\]You need to login to perform this action.
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