theorem
  (H is being_equality iff ex x,y st H = x '=' y) & (H is
being_membership iff ex x,y st H = x 'in' y) & (H is negative iff ex H1 st H =
'not' H1) & (H is conjunctive iff ex F,G st H = F '&' G) & (H is universal iff
  ex x,H1 st H = All(x,H1) );
