Database
ZF (ZERMELO-FRAENKEL) SET THEORY
ZF Set Theory - add the Axiom of Power Sets
Relations
coeq2
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coeq1i
Metamath Proof Explorer
Ascii
Unicode
Theorem
coeq2
Description:
Equality theorem for composition of two classes.
(Contributed by
NM
, 3-Jan-1997)
Ref
Expression
Assertion
coeq2
⊢
A
=
B
→
C
∘
A
=
C
∘
B
Proof
Step
Hyp
Ref
Expression
1
coss2
⊢
A
⊆
B
→
C
∘
A
⊆
C
∘
B
2
coss2
⊢
B
⊆
A
→
C
∘
B
⊆
C
∘
A
3
1
2
anim12i
⊢
A
⊆
B
∧
B
⊆
A
→
C
∘
A
⊆
C
∘
B
∧
C
∘
B
⊆
C
∘
A
4
eqss
⊢
A
=
B
↔
A
⊆
B
∧
B
⊆
A
5
eqss
⊢
C
∘
A
=
C
∘
B
↔
C
∘
A
⊆
C
∘
B
∧
C
∘
B
⊆
C
∘
A
6
3
4
5
3imtr4i
⊢
A
=
B
→
C
∘
A
=
C
∘
B