Negating ∃x∀z∃y(S(x,y) ∧ C(y,z)) would be logically equivalent to ¬∃x∀z∃y(S(x,y) ∧ C(y,z))
however would ∀x∃z∀y¬(S(x,y) ∧ C(y,z)) also be logically equivalent?
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2 Answers
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The final answer will use De Morgan's law to get
$$(\forall x )\;\;(\exists z) \;\; : $$ $$\;\; (\forall y ) \;\;\lnot S(x,y) \; \vee \lnot C(y,z).$$
answered Sep 19, 2019 at 19:04
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Yes. You can keep pushing the negation in:
$\neg \exists x \forall z \exists y (S(x,y) ∧ C(y,z)) \Leftrightarrow$
$\forall x \neg \forall z \exists y (S(x,y) ∧ C(y,z)) \Leftrightarrow$
$\forall x \exists z \neg \exists y (S(x,y) ∧ C(y,z)) \Leftrightarrow$
$\forall x \exists z \forall y \neg (S(x,y) ∧ C(y,z)) $
