The given angles fix triangles ABC and ABD.  Imagine the shared side of this triangle (AB) as a hinge.  No angles of the other two triangles are given, so this hinge is free to move.

Swing the hinge to make the triangles coplanar with C inside triangle ABD.  It took a surprising amount to trig to show angle ADC=30 but then the sides AB and CD are perpendicular.  

Now reflect C over AB to get C'.  Segments CC' and AB are perpendicular and ACBC' is a kite, so D, C, and C' are collinear.

Now looking straight down at triangle ABD, let C rotate about AB.  The image of C projected down on the plane of ABD lies along CC' so it is proved that AB and CD are orthogonal.