Physics 3 Marks Question

$\text{F}=\frac{1}{4\pi\in_0}\frac{\text{q}_1\text{q}_2}{\text{r}^2}$

$=\frac{9\times10^9\times1\times1}{\text{r}^2}$

$\therefore\text{mg}=\frac{9\times10^9}{\text{r}^2}$

$\Rightarrow\text{r}^2=\frac{9\times10^9}{\text{m}\times10}=\frac{9\times10^8}{\text{m}}$ (Taking g = 10m/s²)

$\Rightarrow\text{r}^2=\frac{9\times10^8}{\text{m}}$

$\Rightarrow\text{r}=\frac{3\times10^4}{\sqrt{\text{m}}}$

$\text{r}=\frac{3\times10^4}{\sqrt{81}}$

$=\frac{3}{9}\times10^4\text{m}$

$=3333.3\text{m}$

$\therefore$ The distance r is 3333.3m.

1. Coulomb force when the proton and the electron in a hydrogen atom in ground state

$\text{F}=9\times10^9\times\frac{\text{q}_1\text{q}_2}{\text{r}_2}$

$=\frac{9\times10^9\times(1.6\times10^{-19})^2}{(5.3\times10^{-11})^2}=8.2\times10^{-8}\text{N}$

2. Coulomb force when the average distance between the proton and the electron becomes 4 times that of its ground state

Coulomb force, $\text{F}=\frac{1}{4\pi\in_0}=\frac{\text{q}_1\text{q}_2}{(4\text{r})^2}$

$=\frac{9\times10^9\times(1.6\times10^{-19})^2}{16\times(5.3)^2\times10^{-22}}$

$=\frac{9\times(1.6)^2}{10\times(5.3)^2}\times10^{-7}$

$=0.0512\times10^{-7}$

$=5.1\times10^{-9}\text{N}$

$\text{g}'=\frac{\text{Gm}}{(\text{R + h})^2}.$

$\text{g}'=\frac{\text{Gm}}{(36000+6400)^2}$

$\text{g}=\frac{\text{Gm}}{(6400)^2}$

$\therefore\frac{\text{g}'}{\text{g}}=\frac{6400\times6400}{42400\times42400}$

$=\frac{256}{106\times106}=0.0228$

$\Rightarrow\text{g}'=0.0227\times9.8=0.223$ [Taking g = 9.8m/s² at the surface of the earth]

$\Rightarrow26.76\approx27\text{N}$