Home
Class 12
PHYSICS
Find the magnetic field at the origin du...

Find the magnetic field at the origin due to the combination of two semi infinite wires and a semicircular wire as shown.

Text Solution

Verified by Experts

The magnetic field at the centre O due to the two straight sent infinite parts of conductor is
`vec(B_(1)) = (mu_(0))/(4 pi) . (i)/(a) hat(k) + (mu_(0))/(4 pi). (i)/(a) hat(k) = (mu_(0))/(4 pi). (2i)/(a) hat(k)` …(1)
The magnetic field due to the semicircular part is
`vec(B_(2)) = (mu_(0))/(4 pi) . (pi i)/(a) (- hat(j))` ....(2)
`:.` The net magnetic field at the centre O is
`vec(B) = vev(B_(1)) + vec(B_(2)) = (mu_(0))/(4 pi). (i)/(a) (2 hat(k) - pi hat(j))` ......(3)
Promotional Banner

Similar Questions

Explore conceptually related problems

Find the magnetic field at the origin in the fig. Shown in fig.

The magnetic field at the origin due to the current flowing in the wire is

The magnetic field at the origin due to the current flowing in the wire is

Find the magnetic field at P due to the arrangement shown

Find the magnetic field at P due to the arrangement shown .

Find the magnetic force on loop PQRS due to the wire.

Find vecB at the origin due to the long wire carrying a current I

The magnetic field at O due to current in the infinite wire forming a loop as a shown in Fig.

the electric field at origin due to infinite number of changes as shown in figure is

Find vecB at the origin due to the long wire carrying current I.