Answer:
The initial acceleration of the 59g particle is [tex]1062.7\frac{m}{s^{2}} [/tex]
Explanation:
Newton's second laws relates acceleration (a), net force(F) and mass (m) in the next way:
[tex] F=ma[/tex] (1)
We already know the mass of the particle so we should find the electric force on it to use on (1), the magnitude of the electric force between two charged objects by Columb's law is:
[tex]F=k\frac{\mid q_{1}q_{2}\mid}{r^{2}} [/tex]
with q1 and q2 the charge of the particles, r the distance between them and k the constant [tex]k=9.0\times10^{9}\,\frac{Nm^{2}}{C^{2}} [/tex]. So:
[tex]F=(9.0\times10^{9})\frac{\mid (51\times10^{-6})(-14\times10^{-6})\mid}{0.32^{2}} [/tex]
[tex]F=62.7 N [/tex]
Using that value on (1) and solving for a
[tex]a=\frac{F}{m}=\frac{62.7}{0.059}=1062.7\frac{m}{s^{2}} [/tex]
