Question

Weak magnetic fields can be measured at the surface of the brain. Although the currents causing these fields are quite complicated, we can estimate their size by modeling them as a current loop around the equator of a 16-cm-diameter (the width of a typical head) sphere. What current is needed to produce a 3.0 pT field—the strength measured for one subject—at the pole of this sphere?

Answer 1

To develop this problem it is necessary to apply the concepts related to a magnetic field in spheres.

By definition we know that the magnetic field in a sphere can be described as

`B = (\mu_0)/(2)(Ia^2)/((z^2+a^2)^(3/2))`

Where,

a = Radius

z = Distance to the magnetic field

I = Current

`\mu_0 =` Permeability constant in free space

Our values are given as

`D=2a = 16cm \rightarrow` diameter of the sphere then,

`a = 0.08m`

Thus z = a

`B = (\mu_0)/(2)(Ia^2)/((a^2+a^2)^(3/2))`

`B = (\mu_0I)/(2(2^(3/2))a)`

`B = (\mu_0 I)/(2^(5/2)a)`

Re-arrange to find I,

`I = (2^(5/2)Ba)/(\mu_0)`

`I = (2^(5/2)(3*10^(-12))(8*10^(-2)))/(4\pi*10^(-7))`

`I = 1.08*10^(-6)A`

Therefore the current at the pole of this sphere is
`1.08*10^(-6)A`