## Angular momentum during circular motion (angular velocity, radius, mass)

` $$ \class{green}{L} = m \, r^2 \, \class{brown}{\omega} $$ `

` $$ \class{green}{L} = m \, r^2 \, \class{brown}{\omega} $$ `

` $$ \class{green}{L} = m \, r \, \class{brown}{v} $$ `

` $$ I ~=~ \frac{1}{2} \, m \, r^2 $$ `

Here you will learn the basics of special relativity, such as time dilation and length contraction, and how they are illustrated in spacetime diagrams.

Here you will learn the theoretical physics of classical mechanics, which has the goal of finding out the trajectory of a body.

` $$ y ~=~ -\frac{g}{ 2\,{v_0}^2 } \, x^2 ~+~ y_0 $$ `

` $$ v ~=~ r \, \omega $$ `

` $$ F_{\text z} ~=~ m \, \omega^2 \, r $$ `