Database
SUPPLEMENTARY MATERIAL (USERS' MATHBOXES)
Mathbox for Peter Mazsa
Relations
elrelscnveq
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elrelscnveq2
Metamath Proof Explorer
Ascii
Unicode
Theorem
elrelscnveq
Description:
Two ways of saying a relation is symmetric.
(Contributed by
Peter Mazsa
, 22-Aug-2021)
Ref
Expression
Assertion
elrelscnveq
⊢
R
∈
Rels
→
R
-1
⊆
R
↔
R
-1
=
R
Proof
Step
Hyp
Ref
Expression
1
elrelscnveq3
⊢
R
∈
Rels
→
R
=
R
-1
↔
∀
x
∀
y
x
R
y
→
y
R
x
2
cnvsym
⊢
R
-1
⊆
R
↔
∀
x
∀
y
x
R
y
→
y
R
x
3
1
2
bitr4di
⊢
R
∈
Rels
→
R
=
R
-1
↔
R
-1
⊆
R
4
eqcom
⊢
R
=
R
-1
↔
R
-1
=
R
5
3
4
bitr3di
⊢
R
∈
Rels
→
R
-1
⊆
R
↔
R
-1
=
R