Abstract:  We will demonstrate a family of almost strongly minimal
non-Desarguesian projective planes as constructed in a paper by  
Baldwin. In particular we will show that there is such a projective  
plane which is the definable closure of any line.  Also we will  
discuss a non-Desarguesian projective plane constructed by Hilbert  
and show that it differs from any of those constructed by   
Baldwin in that it interprets the real field.