4.) A rectangular loop of wire is positioned in the xz plane with an infinite filament of current oriented in the z direction. The current filament is a distance s from the nearest edge of the wire loop. Use Ampere's Law to find the magnetic field incident on the loop. Then, the magnetic flux through the loop can be calculated.
vec(i)(t)=hat(z)1sin(4pi *10^(4)t)A
Let s=1cm,l_(x)=3cm, and l_(z)=5cm.
(a) Find the magnetic flux in the wire loop. Note the units should be webers ( Wb ).
(b) Find the induced voltage v_(l)(t).
(c) Find v_(l)(t) is s=0.1cm. That puts the edge of the loop a tenth of the original distance from the filament. You will need to recalculate the value for the flux and then the voltage.
4.) A rectangular loop of wire is positioned in the xz plane with an infinite filament of current oriented in the z direction. The current filament is a distance s from the nearest edge of the wire loop. Use Ampere's Law to find the magnetic field incident on the loop Then. the magnetic flux through the loop can be calculated
i(t)=2 1 sin(4T104t) A
Let s=1cm,lx=3cm,andl=5cm
(a) Find the magnetic flux in the wire loop. Note the units should be webers (Wb)
(b) Find the induced voltage v(t).
(c) Find vi(t) is s =0.1 cm. That puts the edge of the loop a tenth of the original distance from the filament. You will need to recalculate the value for the flux and then the voltage.