Suppose that a hyperbolic quadrilateral $ABCD$ satisfies
$h(A, B) = h(C, D), h(B, C) = h(A, D)$.
Mark each of the following claims about the quadrilateral as true or false:
- Opposite angles of the quadrilateral are supplementary. (FALSE)
Adjacent angles of the quadrilateral are supplementary (FALSE)
Opposite angles of the quadrilateral are equal (FALSE)
- The diagonals of the quadrilateral bisect each other. (TRUE)
- The diagonals of the quadrilateral are orthogonal. (TRUE)
- Opposite sides of the quadrilateral cannot intersect (TRUE)
I'm not sure about the last one but if anyone can confirm that would be great.
(I'm assuming $h$ means hyperbolic distance).
You can certainly have a situation like
where $|AB|=|CD|$ and $|BC|=|AD|$. Being in the hyperbolic plane doesn't prevent that.
For example you could construct it by drawing a circle with center $X$ and two diameters $AD$ and $BC$. Then triangles $AXB$ and $CXD$ are congruent (by SAS since the two angles at $X$ are vertical); in particular $|AB|=|CD|$.
Claims 4 and 5 are also false in this configuration.