Database SUPPLEMENTARY MATERIAL (USERS' MATHBOXES) Mathbox for Alexander van der Vekens Unordered pairs Set of proper unordered pairs 2exopprim
Description: The existence of an ordered pair fulfilling a wff implies the existence of
an unordered pair fulfilling the wff. (Contributed by AV , 29-Jul-2023)
Ref
Expression
Assertion
2exopprim ⊢ ∃ a ∃ b A B = a b ∧ φ → ∃ a ∃ b A B = a b ∧ φ
Proof
Step
Hyp
Ref
Expression
1
oppr ⊢ a ∈ V ∧ b ∈ V → a b = A B → a b = A B
2
1
el2v ⊢ a b = A B → a b = A B
3
2
eqcomd ⊢ a b = A B → A B = a b
4
3
eqcoms ⊢ A B = a b → A B = a b
5
4
anim1i ⊢ A B = a b ∧ φ → A B = a b ∧ φ
6
5
2eximi ⊢ ∃ a ∃ b A B = a b ∧ φ → ∃ a ∃ b A B = a b ∧ φ