Given a Lambert quadrilateral $AOBF$ where the angles $ \angle FAO , \angle AOB , \angle OBF $ are right, and $F$ is opposite $O , \angle AFB$ is the acute angle , and the Gaussian curvature = -1 (so all is standard)
Then a whole lot of equations hold see https://en.wikipedia.org/wiki/Lambert_quadrilateral#Lambert_quadrilateral_in_hyperbolic_geometry
(these are the relations I found in different sources)
There is also another relation (follows from the Klein Disk model)
$$ \tanh^2 OF =\tanh^2 OA +\tanh^2 OB $$
But I was not able to deduce this formula from the others.
How can $ \tanh^2 OF =\tanh^2 OA +\tanh^2 OB $ be deduced from the other formula's?