Table 1 shows data of speed $v$ and kinetic energy $E_k$ for electrons from a modern version of the Bertozzi experiment - AQA - A-Level Physics - Question 4 - 2019 - Paper 7

Einstein's theory of special relativity modifies the classical kinetic energy equation, especially at speeds close to the speed of light (c). The kinetic energy is given by:

$E_k = \left(\frac{mv}{\sqrt{1 - \frac{v^2}{c^2}}} - m \right) c^2$

Where $m$ is the rest mass and $v$ is the velocity. As $v$ approaches $c$, the denominator approaches zero, which results in a significant increase in kinetic energy. Thus, the data from Table 1 indicates that as the speed of the electrons increases (approaching the speed of light), the increase in kinetic energy is greater than predicted by classical mechanics, supporting Einstein's theory that mass increases with speed. The data clearly shows a nonlinear relationship that aligns with the relativistic model, especially where speeds are higher.

To calculate the kinetic energy of an electron moving at $0.95c$, we first need the rest mass energy of the electron, which can be given by:

$E_0 = mc^2 = (9.11 \times 10^{-31} \, kg)(3.00 \times 10^8 \, m/s)^2 = 8.187 \times 10^{-14} \, J$

Using the formula for relativistic kinetic energy:

$E_k = \left( \frac{m v}{\sqrt{1 - \frac{v^2}{c^2}}} - mc^2\right)$

Substituting $v = 0.95c$:

1. Calculate the Lorentz factor:

   $\gamma = \frac{1}{\sqrt{1 - (0.95)^2}} = 2.99$

2. Kinetic energy can then be computed as:

   $E_k = (\gamma - 1) mc^2 = (2.99 - 1) (9.11 \times 10^{-31})(3.00 \times 10^8)^2 = 1.43 \times 10^{-13} \, J$

Thus, the kinetic energy of one electron travelling at a speed of $0.95c$ is approximately $1.43 \times 10^{-13} \, J$.