a red target (( hanged - risc.jku.at filee aiting e y red target hanged: a: c:): b: c:): ^: a: b: _:...

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d

.A

.¬

.C

.⇒

.B

.C

.⇒

.∧

.A

.¬

.B

.∨

.C

.⇒

.A

.¬

.B

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.⇒

.A

.¬

.C

.⇒

.B

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.⇒

.∧

.⇒

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A⇒C

)∧(B

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))⇒

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C)⇒

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)∧(B

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)))

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d

.A

.C

.⇒

.B

.C

.⇒

.∧

.A

.B

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.C

.⇒

.A

.B

.∨

.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.⇒

.∧

(((A

⇒C

)∧(B

⇒C

))⇒

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)⇒C

))∧(

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)⇒C

)⇒((A⇒C

)∧(B

⇒C

)))

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d

.A

.C

.⇒

.B

.C

.⇒

.∧

.A

.B

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.C

.⇒

.A

.B

.∨

.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.⇒

.∧

(((A

⇒C

)∧(B

⇒C

))⇒

((A∨B

)⇒C

))∧(

((A∨B

)⇒C

)⇒((A⇒C

)∧(B

⇒C

)))

pas

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d

.A

.C

.⇒

.B

.C

.⇒

.∧

.A

.B

.∨

.C

.⇒

.A

.B

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.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.⇒

.∧

(((A

⇒C

)∧(B

⇒C

))⇒

((A∨B

)⇒C

))∧(

((A∨B

)⇒C

)⇒((A⇒C

)∧(B

⇒C

)))

pas

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tin

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red

targ

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d

.A

.C

.⇒

.B

.C

.⇒

.∧

.A

.B

.∨

.C

.⇒

.A

.B

.∨

.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.⇒

.∧

(((A

⇒C

)∧(B

⇒C

))⇒

((A∨B

)⇒C

))∧(

((A∨B

)⇒C

)⇒((A⇒C

)∧(B

⇒C

)))

pas

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red

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d

.A

.C

.⇒

.B

.C

.⇒

.∧

.A

.B

.∨

.C

.⇒

.A

.B

.∨

.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.⇒

.∧

(((A

⇒C

)∧(B

⇒C

))⇒

((A∨B

)⇒C

))∧(

((A∨B

)⇒C

)⇒((A⇒C

)∧(B

⇒C

)))

pas

sive

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tin

gac

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pri

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red

targ

etch

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d

.A

.C

.⇒

.B

.C

.⇒

.∧

.A

.B

.∨

.C

.⇒

.A

.B

.∨

.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.⇒

.∧

(((A

⇒C

)∧(B

⇒C

))⇒

((A∨B

)⇒C

))∧(

((A∨B

)⇒C

)⇒((A⇒C

)∧(B

⇒C

)))

pas

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tin

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pri

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red

targ

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d

.A

.C

.⇒

.B

.C

.⇒

.∧

.A

.B

.∨

.C

.⇒

.∨

.A

.B

.∨

.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.⇒

.∧

(((A

⇒C

)∧(B

⇒C

))∨(

(A∨B

)⇒C

))∧(

((A∨B

)⇒C

)⇒((A⇒C

)∧(B

⇒C

)))

pas

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tin

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red

targ

etch

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d

.A

.C

.⇒

.B

.C

.⇒

.∧

.A

.B

.∨

.C

.⇒

.∨

.A

.B

.∨

.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.⇒

.∧

(((A

⇒C

)∧(B

⇒C

))∨(

(A∨B

)⇒C

))∧(

((A∨B

)⇒C

)⇒((A⇒C

)∧(B

⇒C

)))

pas

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tin

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etch

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d

.A

.C

.⇒

.B

.C

.⇒

.∧

.A

.B

.∨

.C

.⇒

.∨

.A

.B

.∨

.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.⇒

.∧

(((A

⇒C

)∧(B

⇒C

))∨(

(A∨B

)⇒C

))∧(

((A∨B

)⇒C

)⇒((A⇒C

)∧(B

⇒C

)))

pas

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tin

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pri

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red

targ

etch

ange

d

.A

.C

.⇒

.B

.C

.⇒

.∨

.A

.B

.∨

.C

.⇒

.∨

.A

.B

.∨

.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.⇒

.∧

(((A

⇒C

)∨(B

⇒C

))∨(

(A∨B

)⇒C

))∧(

((A∨B

)⇒C

)⇒((A⇒C

)∧(B

⇒C

)))

pas

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tin

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pri

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red

targ

etch

ange

d

.A

.C

.⇒

.B

.C

.⇒

.∨

.A

.B

.∨

.C

.⇒

.∨

.A

.B

.∨

.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.⇒

.∧

(((A

⇒C

)∨(B

⇒C

))∨(

(A∨B

)⇒C

))∧(

((A∨B

)⇒C

)⇒((A⇒C

)∧(B

⇒C

)))

pas

sive

wai

tin

gac

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pri

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yfi

red

targ

etch

ange

d

.A

.C

.⇒

.B

.C

.⇒

.∨

.A

.B

.∨

.C

.⇒

.∨

.A

.B

.∨

.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.⇒

.∧

(((A

⇒C

)∨(B

⇒C

))∨(

(A∨B

)⇒C

))∧(

((A∨B

)⇒C

)⇒((A⇒C

)∧(B

⇒C

)))

pas

sive

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tin

gac

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pri

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yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.⇒

.∨

.A

.B

.∨

.C

.⇒

.∨

.A

.B

.∨

.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.⇒

.∧

(((A

∧C)∨

(B⇒C

))∨(

(A∨B

)⇒C

))∧(

((A∨B

)⇒C

)⇒((A⇒C

)∧(B

⇒C

)))

pas

sive

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tin

gac

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pri

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yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.⇒

.∨

.A

.B

.∨

.C

.⇒

.∨

.A

.B

.∨

.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.⇒

.∧

(((A

∧C)∨

(B⇒C

))∨(

(A∨B

)⇒C

))∧(

((A∨B

)⇒C

)⇒((A⇒C

)∧(B

⇒C

)))

pas

sive

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tin

gac

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pri

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yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.⇒

.∨

.A

.B

.∨

.C

.⇒

.∨

.A

.B

.∨

.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.⇒

.∧

(((A

∧C)∨

(B⇒C

))∨(

(A∨B

)⇒C

))∧(

((A∨B

)⇒C

)⇒((A⇒C

)∧(B

⇒C

)))

pas

sive

wai

tin

gac

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pri

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yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.∧

.∨

.A

.B

.∨

.C

.⇒

.∨

.A

.B

.∨

.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.⇒

.∧

(((A

∧C)∨

(B∧C

))∨(

(A∨B

)⇒C

))∧(

((A∨B

)⇒C

)⇒((A⇒C

)∧(B

⇒C

)))

pas

sive

wai

tin

gac

tive

pri

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yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.∧

.∨

.A

.B

.∨

.C

.⇒

.∨

.A

.B

.∨

.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.⇒

.∧

(((A

∧C)∨

(B∧C

))∨(

(A∨B

)⇒C

))∧(

((A∨B

)⇒C

)⇒((A⇒C

)∧(B

⇒C

)))

pas

sive

wai

tin

gac

tive

pri

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yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.∧

.∨

.A

.B

.∨

.C

.⇒

.∨

.A

.B

.∨

.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.⇒

.∧

(((A

∧C)∨

(B∧C

))∨(

(A∨B

)⇒C

))∧(

((A∨B

)⇒C

)⇒((A⇒C

)∧(B

⇒C

)))

pas

sive

wai

tin

gac

tive

pri

orit

yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.∧

.∨

.A

.B

.∨

.C

.∨

.A

.B

.∨

.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.⇒

.∧

(((A

∧C)∨

(B∧C

))∨(

(A∨B

)∨C

))∧(

((A∨B

)⇒C

)⇒((A⇒C

)∧(B

⇒C

)))

pas

sive

wai

tin

gac

tive

pri

orit

yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.∧

.∨

.A

.B

.∨

.C

.∨

.A

.B

.∨

.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.⇒

.∧

(((A

∧C)∨

(B∧C

))∨(

(A∨B

)∨C

))∧(

((A∨B

)⇒C

)⇒((A⇒C

)∧(B

⇒C

)))

pas

sive

wai

tin

gac

tive

pri

orit

yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.∧

.∨

.A

.B

.∨

.C

.∨

.A

.B

.∨

.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.⇒

.∧

(((A

∧C)∨

(B∧C

))∨(

(A∨B

)∨C

))∧(

((A∨B

)⇒C

)⇒((A⇒C

)∧(B

⇒C

)))

pas

sive

wai

tin

gac

tive

pri

orit

yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.∧

.∨

.A

.B

.∧

.C

.∨

.A

.B

.∨

.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.⇒

.∧

(((A

∧C)∨

(B∧C

))∨(

(A∧B

)∨C

))∧(

((A∨B

)⇒C

)⇒((A⇒C

)∧(B

⇒C

)))

pas

sive

wai

tin

gac

tive

pri

orit

yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.∧

.∨

.A

.B

.∧

.C

.∨

.A

.B

.∨

.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.⇒

.∧

(((A

∧C)∨

(B∧C

))∨(

(A∧B

)∨C

))∧(

((A∨B

)⇒C

)⇒((A⇒C

)∧(B

⇒C

)))

pas

sive

wai

tin

gac

tive

pri

orit

yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.∧

.∨

.A

.B

.∧

.C

.∨

.A

.B

.∨

.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.⇒

.∧

(((A

∧C)∨

(B∧C

))∨(

(A∧B

)∨C

))∧(

((A∨B

)⇒C

)⇒((A⇒C

)∧(B

⇒C

)))

pas

sive

wai

tin

gac

tive

pri

orit

yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.∧

.∨

.A

.B

.∧

.C

.∨

.A

.B

.∨

.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.∨

.∧

(((A

∧C)∨

(B∧C

))∨(

(A∧B

)∨C

))∧(

((A∨B

)⇒C

)∨((A⇒C

)∧(B

⇒C

)))

pas

sive

wai

tin

gac

tive

pri

orit

yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.∧

.∨

.A

.B

.∧

.C

.∨

.A

.B

.∨

.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.∨

.∧

(((A

∧C)∨

(B∧C

))∨(

(A∧B

)∨C

))∧(

((A∨B

)⇒C

)∨((A⇒C

)∧(B

⇒C

)))

pas

sive

wai

tin

gac

tive

pri

orit

yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.∧

.∨

.A

.B

.∧

.C

.∨

.A

.B

.∨

.C

.⇒

.A

.C

.⇒

.B

.C

.⇒

.∧

.∨

.∧

(((A

∧C)∨

(B∧C

))∨(

(A∧B

)∨C

))∧(

((A∨B

)⇒C

)∨((A⇒C

)∧(B

⇒C

)))

pas

sive

wai

tin

gac

tive

pri

orit

yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.∧

.∨

.A

.B

.∧

.C

.∨

.A

.B

.∨

.C

.∧

.A

.C

.⇒

.B

.C

.⇒

.∧

.∨

.∧

(((A

∧C)∨

(B∧C

))∨(

(A∧B

)∨C

))∧(

((A∨B

)∧C

)∨((A⇒C

)∧(B

⇒C

)))

pas

sive

wai

tin

gac

tive

pri

orit

yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.∧

.∨

.A

.B

.∧

.C

.∨

.A

.B

.∨

.C

.∧

.A

.C

.⇒

.B

.C

.⇒

.∧

.∨

.∧

(((A

∧C)∨

(B∧C

))∨(

(A∧B

)∨C

))∧(

((A∨B

)∧C

)∨((A⇒C

)∧(B

⇒C

)))

pas

sive

wai

tin

gac

tive

pri

orit

yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.∧

.∨

.A

.B

.∧

.C

.∨

.A

.B

.∨

.C

.∧

.A

.C

.⇒

.B

.C

.⇒

.∧

.∨

.∧

(((A

∧C)∨

(B∧C

))∨(

(A∧B

)∨C

))∧(

((A∨B

)∧C

)∨((A⇒C

)∧(B

⇒C

)))

pas

sive

wai

tin

gac

tive

pri

orit

yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.∧

.∨

.A

.B

.∧

.C

.∨

.A

.B

.∨

.C

.∧

.A

.C

.⇒

.B

.C

.⇒

.∧

.∨

.∧

(((A

∧C)∨

(B∧C

))∨(

(A∧B

)∨C

))∧(

((A∨B

)∧C

)∨((A⇒C

)∧(B

⇒C

)))

pas

sive

wai

tin

gac

tive

pri

orit

yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.∧

.∨

.A

.B

.∧

.C

.∨

.A

.B

.∨

.C

.∧

.A

.C

.⇒

.B

.C

.⇒

.∧

.∨

.∧

(((A

∧C)∨

(B∧C

))∨(

(A∧B

)∨C

))∧(

((A∨B

)∧C

)∨((A⇒C

)∧(B

⇒C

)))

pas

sive

wai

tin

gac

tive

pri

orit

yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.∧

.∨

.A

.B

.∧

.C

.∨

.A

.B

.∨

.C

.∧

.A

.C

.⇒

.B

.C

.⇒

.∧

.∨

.∧

(((A

∧C)∨

(B∧C

))∨(

(A∧B

)∨C

))∧(

((A∨B

)∧C

)∨((A⇒C

)∧(B

⇒C

)))

pas

sive

wai

tin

gac

tive

pri

orit

yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.∧

.∨

.A

.B

.∧

.C

.∨

.A

.B

.∨

.C

.∧

.A

.C

.⇒

.B

.C

.⇒

.∧

.∨

.∧

(((A

∧C)∨

(B∧C

))∨(

(A∧B

)∨C

))∧(

((A∨B

)∧C

)∨((A⇒C

)∧(B

⇒C

)))

pas

sive

wai

tin

gac

tive

pri

orit

yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.∧

.∨

.A

.B

.∧

.C

.∨

.A

.B

.∨

.C

.∧

.A

.C

.⇒

.B

.C

.⇒

.∧

.∨

.∧

(((A

∧C)∨

(B∧C

))∨(

(A∧B

)∨C

))∧(

((A∨B

)∧C

)∨((A⇒C

)∧(B

⇒C

)))

pas

sive

wai

tin

gac

tive

pri

orit

yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.∧

.∨

.A

.B

.∧

.C

.∨

.A

.B

.∨

.C

.∧

.A

.C

.⇒

.B

.C

.⇒

.∧

.∨

.∧

(((A

∧C)∨

(B∧C

))∨(

(A∧B

)∨C

))∧(

((A∨B

)∧C

)∨((A⇒C

)∧(B

⇒C

)))

pas

sive

wai

tin

gac

tive

pri

orit

yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.∧

.∨

.A

.B

.∧

.C

.∨

.A

.B

.∨

.C

.∧

.A

.C

.∨

.B

.C

.⇒

.∧

.∨

.∧

(((A

∧C)∨

(B∧C

))∨(

(A∧B

)∨C

))∧(

((A∨B

)∧C

)∨((A∨C

)∧(B

⇒C

)))

pas

sive

wai

tin

gac

tive

pri

orit

yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.∧

.∨

.A

.B

.∧

.C

.∨

.A

.B

.∨

.C

.∧

.A

.C

.∨

.B

.C

.⇒

.∧

.∨

.∧

(((A

∧C)∨

(B∧C

))∨(

(A∧B

)∨C

))∧(

((A∨B

)∧C

)∨((A∨C

)∧(B

⇒C

)))

pas

sive

wai

tin

gac

tive

pri

orit

yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.∧

.∨

.A

.B

.∧

.C

.∨

.A

.B

.∨

.C

.∧

.A

.C

.∨

.B

.C

.⇒

.∧

.∨

.∧

(((A

∧C)∨

(B∧C

))∨(

(A∧B

)∨C

))∧(

((A∨B

)∧C

)∨((A∨C

)∧(B

⇒C

)))

pas

sive

wai

tin

gac

tive

pri

orit

yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.∧

.∨

.A

.B

.∧

.C

.∨

.A

.B

.∨

.C

.∧

.A

.C

.∨

.B

.C

.∨

.∧

.∨

.∧

(((A

∧C)∨

(B∧C

))∨(

(A∧B

)∨C

))∧(

((A∨B

)∧C

)∨((A∨C

)∧(B

∨C))

)

pas

sive

wai

tin

gac

tive

pri

orit

yfi

red

targ

etch

ange

d

.A

.C

.∧

.B

.C

.∧

.∨

.A

.B

.∧

.C

.∨

.A

.B

.∨

.C

.∧

.A

.C

.∨

.B

.C

.∨

.∧

.∨

.∧

(((A

∧C)∨

(B∧C

))∨(

(A∧B

)∨C

))∧(

((A∨B

)∧C

)∨((A∨C

)∧(B

∨C))

)

a red target (( hanged - risc.jku.at filee aiting e y red target hanged: a: c:): b: c:): ^: a: b: _:...

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