Answer:
0.193 T
Inward direction
Explanation:
[tex]\frac{m}{L}[/tex] = Mass per unit length of wire = 1.50 g/cm = [tex]\frac{1.50\times 10^{-3}kg}{0.01 m}[/tex] = 0.15 kg/m
[tex]i[/tex] = magnitude of current = 1.52 A
[tex]B[/tex] = magnitude of magnetic field = ?
[tex]m[/tex] = mass of the wire
[tex]L[/tex] = length of the wire
μ = Coefficient of friction = 0.200
For the wire to move,
magnetic force = frictional force
[tex]i[/tex] [tex]B[/tex] [tex]L[/tex] = μ [tex]m[/tex] [tex]g[/tex]
(1.52) [tex]B[/tex] [tex]L[/tex] = (0.200) (9.8) [tex]m[/tex]
(1.52) [tex]B[/tex] = (0.200) (9.8) [tex]\frac{m}{L}[/tex]
(1.52) [tex]B[/tex] = (0.200) (9.8) (0.15)
[tex]B[/tex] = 0.193 T
Direction of magnetic force is towards north and current is directed towards east. hence using right hand rule, the direction of magnetic field comes out to be in inward direction.