lean2/tests/lean/interactive/t12.lean.expected.out

#   Set: pp::colors
  Set: pp::unicode
  Proved: T1
theorem T1 (A B : Bool) (assumption : A ∧ B) : B ∧ A :=
    let lemma1 : A := and_eliml assumption, lemma2 : B := and_elimr assumption in and_intro lemma2 lemma1
# Proof state:
A : Bool, B : Bool, assumption : A ∧ B ⊢ A
## Proof state:
no goals
## Proof state:
A : Bool, B : Bool, assumption : A ∧ B, lemma1 : A ⊢ B
## Proof state:
no goals
## Proof state:
A : Bool, B : Bool, assumption : A ∧ B, lemma1 : A, lemma2 : B ⊢ B ∧ A
## Proof state:
no goals
##   Proved: T2
# Proof state:
A : Bool, B : Bool, assumption : A ∧ B ⊢ A
## Proof state:
A : Bool, B : Bool, assumption::1 : A, assumption::2 : B ⊢ A
## Proof state:
no goals
## Proof state:
A : Bool, B : Bool, assumption : A ∧ B, lemma1 : A ⊢ B
## Proof state:
A : Bool, B : Bool, assumption::1 : A, assumption::2 : B, lemma1 : A ⊢ B
## Proof state:
no goals
## Proof state:
A : Bool, B : Bool, assumption : A ∧ B, lemma1 : A, lemma2 : B ⊢ B ∧ A
## Proof state:
A : Bool, B : Bool, assumption : A ∧ B, lemma1 : A, lemma2 : B ⊢ B
A : Bool, B : Bool, assumption : A ∧ B, lemma1 : A, lemma2 : B ⊢ A
## Proof state:
no goals
##   Proved: T3
# Proof state:
A : Bool, B : Bool, assumption : A ∧ B ⊢ A
## Proof state:
A : Bool, B : Bool, assumption::1 : A, assumption::2 : B ⊢ A
## Proof state:
no goals
## Proof state:
A : Bool, B : Bool, assumption : A ∧ B, lemma1 : A ⊢ B
## Proof state:
A : Bool, B : Bool, assumption::1 : A, assumption::2 : B, lemma1 : A ⊢ B
## Proof state:
no goals
##   Proved: T4
#
feat(frontends/lean): allow 'tactic hints' to be associated with 'holes' Signed-off-by: Leonardo de Moura <leonardo@microsoft.com> 2013-12-06 22:42:49 +00:00			`# Set: pp::colors`
			`Set: pp::unicode`
			`Proved: T1`
feat(frontends/lean): use lowercase commands, replace 'endscope' and 'endnamespace' with 'end' Signed-off-by: Leonardo de Moura <leonardo@microsoft.com> 2014-01-05 20:05:08 +00:00			`theorem T1 (A B : Bool) (assumption : A ∧ B) : B ∧ A :=`
chore(*): cleanup lean builtin symbols, replace :: with _ Signed-off-by: Leonardo de Moura <leonardo@microsoft.com> 2014-01-09 16:33:52 +00:00			`let lemma1 : A := and_eliml assumption, lemma2 : B := and_elimr assumption in and_intro lemma2 lemma1`
feat(library/tactic/boolean_tactics): avoid unnecessary Let expression in proof terms Signed-off-by: Leonardo de Moura <leonardo@microsoft.com> 2013-12-06 23:01:54 +00:00			`# Proof state:`
feat(frontends/lean): allow 'tactic hints' to be associated with 'holes' Signed-off-by: Leonardo de Moura <leonardo@microsoft.com> 2013-12-06 22:42:49 +00:00			`A : Bool, B : Bool, assumption : A ∧ B ⊢ A`
			`## Proof state:`
			`no goals`
			`## Proof state:`
			`A : Bool, B : Bool, assumption : A ∧ B, lemma1 : A ⊢ B`
			`## Proof state:`
			`no goals`
			`## Proof state:`
			`A : Bool, B : Bool, assumption : A ∧ B, lemma1 : A, lemma2 : B ⊢ B ∧ A`
			`## Proof state:`
			`no goals`
			`## Proved: T2`
			`# Proof state:`
			`A : Bool, B : Bool, assumption : A ∧ B ⊢ A`
			`## Proof state:`
			`A : Bool, B : Bool, assumption::1 : A, assumption::2 : B ⊢ A`
			`## Proof state:`
			`no goals`
			`## Proof state:`
			`A : Bool, B : Bool, assumption : A ∧ B, lemma1 : A ⊢ B`
			`## Proof state:`
			`A : Bool, B : Bool, assumption::1 : A, assumption::2 : B, lemma1 : A ⊢ B`
			`## Proof state:`
			`no goals`
			`## Proof state:`
			`A : Bool, B : Bool, assumption : A ∧ B, lemma1 : A, lemma2 : B ⊢ B ∧ A`
			`## Proof state:`
			`A : Bool, B : Bool, assumption : A ∧ B, lemma1 : A, lemma2 : B ⊢ B`
			`A : Bool, B : Bool, assumption : A ∧ B, lemma1 : A, lemma2 : B ⊢ A`
			`## Proof state:`
			`no goals`
			`## Proved: T3`
			`# Proof state:`
			`A : Bool, B : Bool, assumption : A ∧ B ⊢ A`
			`## Proof state:`
			`A : Bool, B : Bool, assumption::1 : A, assumption::2 : B ⊢ A`
			`## Proof state:`
			`no goals`
			`## Proof state:`
			`A : Bool, B : Bool, assumption : A ∧ B, lemma1 : A ⊢ B`
			`## Proof state:`
			`A : Bool, B : Bool, assumption::1 : A, assumption::2 : B, lemma1 : A ⊢ B`
			`## Proof state:`
			`no goals`
			`## Proved: T4`
			`#`