Exercise logic.propositional.consequence
Description
Prove that formula is a logical consequence of a set of formulas
Firsts
Rule consequence.enter Location [1,1] Term "Just (TList [TList [TCon logic1.equivalent [TVar \"p\",TVar \"r\"],TCon logic1.equivalent [TVar \"q\",TVar \"s\"]],TCon logic1.and [TCon logic1.or [TCon logic1.and [TVar \"p\",TCon logic1.and [TVar \"q\",TCon logic1.and [TVar \"r\",TVar \"s\"]]],TCon logic1.not [TCon logic1.and [TVar \"p\",TVar \"q\"]]],TCon logic1.and [TCon logic1.or [TVar \"p\",TCon logic1.not [TCon logic1.and [TVar \"r\",TVar \"s\"]]],TCon logic1.and [TCon logic1.or [TVar \"q\",TCon logic1.not [TCon logic1.and [TVar \"r\",TVar \"s\"]]],TCon logic1.or [TCon logic1.and [TVar \"r\",TVar \"s\"],TCon logic1.not [TCon logic1.and [TVar \"r\",TVar \"s\"]]]]]]])" Focus "Just (TCon logic1.and [TCon logic1.or [TVar \"p\",TCon logic1.not [TCon logic1.and [TVar \"r\",TVar \"s\"]]],TCon logic1.and [TCon logic1.or [TVar \"q\",TCon logic1.not [TCon logic1.and [TVar \"r\",TVar \"s\"]]],TCon logic1.or [TCon logic1.and [TVar \"r\",TVar \"s\"],TCon logic1.not [TCon logic1.and [TVar \"r\",TVar \"s\"]]]]])" Environment