let p be Element of CQC-WFF ; :: thesis: ( 'not' ('not' p) is valid iff p is valid )
thus ( 'not' ('not' p) is valid implies p is valid ) :: thesis: ( p is valid implies 'not' ('not' p) is valid )
proof
assume A1: 'not' ('not' p) is valid ; :: thesis: p is valid
('not' ('not' p)) => p is valid by Th65;
hence p is valid by A1, CQC_THE1:104; :: thesis: verum
end;
assume A2: p is valid ; :: thesis: 'not' ('not' p) is valid
p => ('not' ('not' p)) is valid by Th64;
hence 'not' ('not' p) is valid by A2, CQC_THE1:104; :: thesis: verum