Law of sines/Elementary-geometric/Exercise

Prove by elementary geometric considerations the Sine theorem, i.e. the statement that in a triangle the equalities

${\displaystyle {}{\frac {\sin \alpha }{a}}={\frac {\sin \beta }{b}}={\frac {\sin \gamma }{c}}\,}$

hold, where ${\displaystyle {}a,b,c}$ are the side lengths of the edges and ${\displaystyle {}\alpha ,\beta ,\gamma }$ are respectively the opposite angles.