let F, G be ZF-formula; ( F '&' ('not' G) is_proper_subformula_of F => G & F is_proper_subformula_of F => G & 'not' G is_proper_subformula_of F => G & G is_proper_subformula_of F => G )
F '&' ('not' G) is_immediate_constituent_of F => G
;
hence A1:
F '&' ('not' G) is_proper_subformula_of F => G
by ZF_LANG:61; ( F is_proper_subformula_of F => G & 'not' G is_proper_subformula_of F => G & G is_proper_subformula_of F => G )
( F is_immediate_constituent_of F '&' ('not' G) & 'not' G is_immediate_constituent_of F '&' ('not' G) )
;
hence A2:
( F is_proper_subformula_of F => G & 'not' G is_proper_subformula_of F => G )
by A1, Th40; G is_proper_subformula_of F => G
G is_immediate_constituent_of 'not' G
;
hence
G is_proper_subformula_of F => G
by A2, Th40; verum