Final answer:
The strength of the electric field 0.1mm above the center of the top surface of the plate is -0.0067 N/C. The strength of the electric field 0.1mm below the center of the bottom surface of the plate is also -0.0067 N/C.
Step-by-step explanation:
To find the strength of the electric field above the center of the top surface of the plate, we can use the formula for electric field due to a uniformly charged plate:
E = σ/(2ε0)
Where E is the electric field, σ is the charge density (charge per unit area), and ε0 is the permittivity of free space.
Part A)
Since the charge is evenly distributed on the surface, the charge density can be calculated by dividing the total charge by the area:
σ = Q/A
where Q is the total charge and A is the surface area of the plate. Now we can substitute this value into the formula to find the electric field:
E = Q/(2ε0A)
Plugging in the given values, the electric field is:
E = (-3.8nC)/(2ε0 × (π × (9cm)^2))
E = -0.0067 N/C
Therefore, the strength of the electric field 0.1 mm above the center of the top surface of the plate is -0.0067 N/C.
Part B)
Similarly, to find the strength of the electric field below the center of the bottom surface of the plate, we can use the same formula:
E = σ/(2ε0)
The charge density is the same, but now we are interested in the electric field below the plate. Since the electric field is a vector quantity, the direction will change when we move to the bottom surface. Therefore, the strength of the electric field 0.1 mm below the center of the bottom surface of the plate is also -0.0067 N/C.