Question

What is the e/m ratio of an electron?

Answer 1

Hint: J.J Thomson measures the e/m ratio of an electron. e/m, the ratio of charge of an electron to the mass of an electron. Here m is the mass of the particle of cathode ray in kg and e is its charge in coulomb.

Complete step by step solution:
In 1897 J.J Thomson first measured the e/m ratio of an electron.
- He said when an electron enters a region in which there is a uniform magnetic field, B, perpendicular to the velocity, v, of the electron he electron experiences a force, F which is equal to $F= e × v × B$
The force is perpendicular to both v and B and its direction can be found by using the right-hand rule. This force will cause the electron to move in a circular orbit with radius r. According to Newton's law of Newton these two forces should be equal. So equating these two forces we get:$\text{e × v × B=m}\dfrac{{{\text{v}}^{\text{2}}}}{\text{r}}$
solving this equation we get $\dfrac{\text{e}}{\text{m}}\text{=}\dfrac{\text{v}}{\text{Br}}$
Now all we need is the velocity of the electron which can be calculated by the formula:
$\dfrac{\text{1}}{\text{2}}\text{m}{{\text{v}}^{\text{2}}}\text{=e}{{\text{V}}_{\text{acc}}}$
Solving the value of v from above step we get as:$\text{v=}\sqrt{\text{2e}{{\text{V}}_{\text{acc}}}}\text{ }\\!\\!\div\\!\\!\text{ }\sqrt{\text{m}}$
Now substituting this value of v in step 3 we get as $\dfrac{\text{e}}{\text{m}}\text{=}\dfrac{\text{2}{{\text{V}}_{\text{acc}}}}{{{\text{B}}^{\text{2}}}{{\text{r}}^{\text{2}}}}$ where ${{\text{V}}_{\text{acc}}}$ is the potential difference, B is the magnetic field and r is the radius of the electron's circuit orbit
So from above, we can say that e/m ratio of an electron is equal to $\text{1}\text{.758820 }\\!\\!\times\\!\\!\text{ 1}{{\text{0}}^{\text{11}}}\text{Ck}{{\text{g}}^{\text{-1}}}$

Note: The value of e/m remained constant irrespective of the nature of the gas. It means whether you use helium gas, neon gas, carbon gas and whatsoever the value of e/m ratio will remain constant.