Answer:
- 8632.1N/C
- 17483.17N/C
Explanation:
Inside electric field magnitude is different of the outside electric field.
- Inside the sphere we have that the electric field is given by:
[tex]E=\frac{Qr}{4\pi \epsilon_oR^3}[/tex]
Where Q is the charge of the sphere, R is its radius and e0 is the dielectric permittivity of vacuum.
By replacing (r=5.00cm=5.00*10^{-3}m, e0=8.85*10^{-12}C^2/Nm^2) we get:
[tex]E(r=4.00cm)=\frac{(3.00*10^{-9}C)(0.04m)}{4\pi (8.85*10^{-12}C^2/Nm^2)(0.05m)^3}=8632.1N/C[/tex]
- Outside the sphere we have the formula:
[tex]E=\frac{Q}{4\pi \epsilom_or^2}\\\\E(r=6.00cm)=\frac{3.00*10^{-9}C}{4\pi (8.85*10^{-12}C^2/Nm^2)(0.06)^2}=17483.17N/C[/tex]
hope this helps!!
