Answer:
[tex]2.08\cdot 10^9 A[/tex]
Explanation:
The magnetic dipole moment of a circular coil with a current is given by
[tex]\mu = IA[/tex]
where
I is the current in the coil
[tex]A=\pi r^2[/tex] is the area enclosed by the coil, where
[tex]r[/tex] is the radius of the coil
So the magnetic dipole moment can be rewritten as
[tex]\mu = I\pi r^2[/tex] (1)
Here we can assume that the magnetic dipole moment of Earth is produced by charges flowing in Earth’s molten outer core, so by a current flowing in a circular path of radius
[tex]r=3500 km = 3.5\cdot 10^6 m[/tex]
Here we also know that the Earth's magnetic dipole moment is
[tex]\mu = 8.0\cdot 10^{22} J/T[/tex]
Therefore, we can re-arrange eq (1) to find the current that the charges produced:
[tex]I=\frac{\mu}{\pi r^2}=\frac{8.00\cdot 10^{22}}{\pi (3.5\cdot 10^6)^2}=2.08\cdot 10^9 A[/tex]
