let A be QC-alphabet ; for x being bound_QC-variable of A holds (VERUM A) . x = VERUM A
let x be bound_QC-variable of A; (VERUM A) . x = VERUM A
ex F being Function of (QC-WFF A),(QC-WFF A) st
( (VERUM A) . x = F . (VERUM A) & ( for q being Element of QC-WFF A holds
( F . (VERUM A) = VERUM A & ( q is atomic implies F . q = (the_pred_symbol_of q) ! (Subst ((the_arguments_of q),((A a. 0) .--> x))) ) & ( q is negative implies F . q = 'not' (F . (the_argument_of q)) ) & ( q is conjunctive implies F . q = (F . (the_left_argument_of q)) '&' (F . (the_right_argument_of q)) ) & ( q is universal implies F . q = IFEQ ((bound_in q),x,q,(All ((bound_in q),(F . (the_scope_of q))))) ) ) ) )
by Def3;
hence
(VERUM A) . x = VERUM A
; verum