Answer:
1
Explanation:
Let's call the magnitude of the charge of 10000 electrons [tex]q[/tex].
Because A loses q, it has a net charge [tex]+q[/tex] (electrons are negative; losing them creates positive charges). Conversely, B has gained q, so it has a charge of [tex]-q[/tex]. The distance between them is 1 m.
By Coulomb's law, the force between them is
[tex]F_1 = \dfrac{kq \times q}{1^2}[/tex]
[tex]F_1 = kq^2[/tex]
When A loses an additional 10000 electrons, the charge on it becomes [tex]+2q[/tex] while that on B is [tex]-2q[/tex]. The distance is now 2 m.
The force is now
[tex]F_2 = \dfrac{k\times2q \times 2q}{2^2}[/tex]
[tex]F_2 = \dfrac{4kq^2}{4}[/tex]
[tex]F_2 = kq^2 = F_1[/tex]
[tex]\dfrac{F_2}{F_1}=1[/tex]
