Database
CLASSICAL FIRST-ORDER LOGIC WITH EQUALITY
Propositional calculus
Logical conjunction
syl2anbr
Next ⟩
sylancb
Metamath Proof Explorer
Ascii
Unicode
Theorem
syl2anbr
Description:
A double syllogism inference.
(Contributed by
NM
, 29-Jul-1999)
Ref
Expression
Hypotheses
syl2anbr.1
⊢
ψ
↔
φ
syl2anbr.2
⊢
χ
↔
τ
syl2anbr.3
⊢
ψ
∧
χ
→
θ
Assertion
syl2anbr
⊢
φ
∧
τ
→
θ
Proof
Step
Hyp
Ref
Expression
1
syl2anbr.1
⊢
ψ
↔
φ
2
syl2anbr.2
⊢
χ
↔
τ
3
syl2anbr.3
⊢
ψ
∧
χ
→
θ
4
1
3
sylanbr
⊢
φ
∧
χ
→
θ
5
2
4
sylan2br
⊢
φ
∧
τ
→
θ