I will list here some of the necessary mathematical operations used in precise calculations of the g-factor of electrons, muons, protons and neutrons with application only of the generated transcendental constants and pure integers. There is no need to apply ANY scientific formula to obtain these results. Pure mathematical action is all that is needed. It seems that these transcendental constants contain somehow physics (and maybe mathematical) formulae…
There will be a series of articles about a new tool I have discovered. This actually allows us to grasp the quantum equations. After many trials I realized that it is impossible to describe the complicated formulas in just one equation. So, I developed a design tool that greatly simplifies complicated quantum mechanics. It comprises a couple of important ideas.
15 March 2024 St. Longinus (1st century AD) St. Louise de Marillac (1660 AD)
The following two articles will deal with the G-Factor of Quarks and Neutrinos. G factor of a magnetic force – 'A g factor (also called g value) is a dimensionless quantity that characterizes the magnetic moment and the angular momentum of an atom, a particle or the nucleus.' If you are interested you can find out more at Wikipedia’s link here:
The third step is to do two scans of the universal equation at each integral point of the complex plane. One scan is done with a Real Vector (Real part positive, Imaginary part equals 0), and another scan with an Imaginary Vector (Imaginary part negative and Real part equals 0). These two vectors are substituted separately into the main equation, giving real and imaginary scans. Then the results are added together to form a sum that contains vector magnitude (i.e., magnetic moment vector) and mixing (oscillation angle) among other things (in polar and rectangular form).